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| from sympy.core.numbers import pi | |
| from sympy.core.symbol import symbols | |
| from sympy.functions.elementary.trigonometric import (cos, sin) | |
| from sympy.matrices.immutable import ImmutableDenseMatrix as Matrix | |
| from sympy.simplify.simplify import simplify | |
| from sympy.vector import (CoordSys3D, Vector, Dyadic, | |
| DyadicAdd, DyadicMul, DyadicZero, | |
| BaseDyadic, express) | |
| A = CoordSys3D('A') | |
| def test_dyadic(): | |
| a, b = symbols('a, b') | |
| assert Dyadic.zero != 0 | |
| assert isinstance(Dyadic.zero, DyadicZero) | |
| assert BaseDyadic(A.i, A.j) != BaseDyadic(A.j, A.i) | |
| assert (BaseDyadic(Vector.zero, A.i) == | |
| BaseDyadic(A.i, Vector.zero) == Dyadic.zero) | |
| d1 = A.i | A.i | |
| d2 = A.j | A.j | |
| d3 = A.i | A.j | |
| assert isinstance(d1, BaseDyadic) | |
| d_mul = a*d1 | |
| assert isinstance(d_mul, DyadicMul) | |
| assert d_mul.base_dyadic == d1 | |
| assert d_mul.measure_number == a | |
| assert isinstance(a*d1 + b*d3, DyadicAdd) | |
| assert d1 == A.i.outer(A.i) | |
| assert d3 == A.i.outer(A.j) | |
| v1 = a*A.i - A.k | |
| v2 = A.i + b*A.j | |
| assert v1 | v2 == v1.outer(v2) == a * (A.i|A.i) + (a*b) * (A.i|A.j) +\ | |
| - (A.k|A.i) - b * (A.k|A.j) | |
| assert d1 * 0 == Dyadic.zero | |
| assert d1 != Dyadic.zero | |
| assert d1 * 2 == 2 * (A.i | A.i) | |
| assert d1 / 2. == 0.5 * d1 | |
| assert d1.dot(0 * d1) == Vector.zero | |
| assert d1 & d2 == Dyadic.zero | |
| assert d1.dot(A.i) == A.i == d1 & A.i | |
| assert d1.cross(Vector.zero) == Dyadic.zero | |
| assert d1.cross(A.i) == Dyadic.zero | |
| assert d1 ^ A.j == d1.cross(A.j) | |
| assert d1.cross(A.k) == - A.i | A.j | |
| assert d2.cross(A.i) == - A.j | A.k == d2 ^ A.i | |
| assert A.i ^ d1 == Dyadic.zero | |
| assert A.j.cross(d1) == - A.k | A.i == A.j ^ d1 | |
| assert Vector.zero.cross(d1) == Dyadic.zero | |
| assert A.k ^ d1 == A.j | A.i | |
| assert A.i.dot(d1) == A.i & d1 == A.i | |
| assert A.j.dot(d1) == Vector.zero | |
| assert Vector.zero.dot(d1) == Vector.zero | |
| assert A.j & d2 == A.j | |
| assert d1.dot(d3) == d1 & d3 == A.i | A.j == d3 | |
| assert d3 & d1 == Dyadic.zero | |
| q = symbols('q') | |
| B = A.orient_new_axis('B', q, A.k) | |
| assert express(d1, B) == express(d1, B, B) | |
| expr1 = ((cos(q)**2) * (B.i | B.i) + (-sin(q) * cos(q)) * | |
| (B.i | B.j) + (-sin(q) * cos(q)) * (B.j | B.i) + (sin(q)**2) * | |
| (B.j | B.j)) | |
| assert (express(d1, B) - expr1).simplify() == Dyadic.zero | |
| expr2 = (cos(q)) * (B.i | A.i) + (-sin(q)) * (B.j | A.i) | |
| assert (express(d1, B, A) - expr2).simplify() == Dyadic.zero | |
| expr3 = (cos(q)) * (A.i | B.i) + (-sin(q)) * (A.i | B.j) | |
| assert (express(d1, A, B) - expr3).simplify() == Dyadic.zero | |
| assert d1.to_matrix(A) == Matrix([[1, 0, 0], [0, 0, 0], [0, 0, 0]]) | |
| assert d1.to_matrix(A, B) == Matrix([[cos(q), -sin(q), 0], | |
| [0, 0, 0], | |
| [0, 0, 0]]) | |
| assert d3.to_matrix(A) == Matrix([[0, 1, 0], [0, 0, 0], [0, 0, 0]]) | |
| a, b, c, d, e, f = symbols('a, b, c, d, e, f') | |
| v1 = a * A.i + b * A.j + c * A.k | |
| v2 = d * A.i + e * A.j + f * A.k | |
| d4 = v1.outer(v2) | |
| assert d4.to_matrix(A) == Matrix([[a * d, a * e, a * f], | |
| [b * d, b * e, b * f], | |
| [c * d, c * e, c * f]]) | |
| d5 = v1.outer(v1) | |
| C = A.orient_new_axis('C', q, A.i) | |
| for expected, actual in zip(C.rotation_matrix(A) * d5.to_matrix(A) * \ | |
| C.rotation_matrix(A).T, d5.to_matrix(C)): | |
| assert (expected - actual).simplify() == 0 | |
| def test_dyadic_simplify(): | |
| x, y, z, k, n, m, w, f, s, A = symbols('x, y, z, k, n, m, w, f, s, A') | |
| N = CoordSys3D('N') | |
| dy = N.i | N.i | |
| test1 = (1 / x + 1 / y) * dy | |
| assert (N.i & test1 & N.i) != (x + y) / (x * y) | |
| test1 = test1.simplify() | |
| assert test1.simplify() == simplify(test1) | |
| assert (N.i & test1 & N.i) == (x + y) / (x * y) | |
| test2 = (A**2 * s**4 / (4 * pi * k * m**3)) * dy | |
| test2 = test2.simplify() | |
| assert (N.i & test2 & N.i) == (A**2 * s**4 / (4 * pi * k * m**3)) | |
| test3 = ((4 + 4 * x - 2 * (2 + 2 * x)) / (2 + 2 * x)) * dy | |
| test3 = test3.simplify() | |
| assert (N.i & test3 & N.i) == 0 | |
| test4 = ((-4 * x * y**2 - 2 * y**3 - 2 * x**2 * y) / (x + y)**2) * dy | |
| test4 = test4.simplify() | |
| assert (N.i & test4 & N.i) == -2 * y | |
| def test_dyadic_srepr(): | |
| from sympy.printing.repr import srepr | |
| N = CoordSys3D('N') | |
| dy = N.i | N.j | |
| res = "BaseDyadic(CoordSys3D(Str('N'), Tuple(ImmutableDenseMatrix([["\ | |
| "Integer(1), Integer(0), Integer(0)], [Integer(0), Integer(1), "\ | |
| "Integer(0)], [Integer(0), Integer(0), Integer(1)]]), "\ | |
| "VectorZero())).i, CoordSys3D(Str('N'), Tuple(ImmutableDenseMatrix("\ | |
| "[[Integer(1), Integer(0), Integer(0)], [Integer(0), Integer(1), "\ | |
| "Integer(0)], [Integer(0), Integer(0), Integer(1)]]), VectorZero())).j)" | |
| assert srepr(dy) == res | |