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923cd3675f80fe34c4b0698729fec995ca174f6b19d097351b3418947f87bf52 | """
Additional AST nodes for operations on matrices. The nodes in this module
are meant to represent optimization of matrix expressions within codegen's
target languages that cannot be represented by SymPy expressions.
As an example, we can use :meth:`sympy.codegen.rewriting.optimize` and the
``matin_opt`` optimization provided in :mod:`sympy.codegen.rewriting` to
transform matrix multiplication under certain assumptions:
>>> from sympy import symbols, MatrixSymbol
>>> n = symbols('n', integer=True)
>>> A = MatrixSymbol('A', n, n)
>>> x = MatrixSymbol('x', n, 1)
>>> expr = A**(-1) * x
>>> from sympy.assumptions import assuming, Q
>>> from sympy.codegen.rewriting import matinv_opt, optimize
>>> with assuming(Q.fullrank(A)):
... optimize(expr, [matinv_opt])
MatrixSolve(A, vector=x)
"""
from .ast import Token
from sympy.matrices import MatrixExpr
from sympy.core.sympify import sympify
class MatrixSolve(Token, MatrixExpr):
"""Represents an operation to solve a linear matrix equation.
Parameters
==========
matrix : MatrixSymbol
Matrix representing the coefficients of variables in the linear
equation. This matrix must be square and full-rank (i.e. all columns must
be linearly independent) for the solving operation to be valid.
vector : MatrixSymbol
One-column matrix representing the solutions to the equations
represented in ``matrix``.
Examples
========
>>> from sympy import symbols, MatrixSymbol
>>> from sympy.codegen.matrix_nodes import MatrixSolve
>>> n = symbols('n', integer=True)
>>> A = MatrixSymbol('A', n, n)
>>> x = MatrixSymbol('x', n, 1)
>>> from sympy.printing.pycode import NumPyPrinter
>>> NumPyPrinter().doprint(MatrixSolve(A, x))
'numpy.linalg.solve(A, x)'
>>> from sympy.printing import octave_code
>>> octave_code(MatrixSolve(A, x))
'A \\\\ x'
"""
__slots__ = ('matrix', 'vector')
_construct_matrix = staticmethod(sympify)
def __init__(self, matrix, vector):
self.shape = self.vector.shape
|
3aea00a460c0a4f489d8c96bfd6ef1f6a58c51f82bf8573851e9caa2cfe9e5dd | """
This file contains some classical ciphers and routines
implementing a linear-feedback shift register (LFSR)
and the Diffie-Hellman key exchange.
.. warning::
This module is intended for educational purposes only. Do not use the
functions in this module for real cryptographic applications. If you wish
to encrypt real data, we recommend using something like the `cryptography
<https://cryptography.io/en/latest/>`_ module.
"""
from __future__ import print_function
from string import whitespace, ascii_uppercase as uppercase, printable
from functools import reduce
import warnings
from itertools import cycle
from sympy import nextprime
from sympy.core import Rational, Symbol
from sympy.core.numbers import igcdex, mod_inverse, igcd
from sympy.core.compatibility import as_int
from sympy.matrices import Matrix
from sympy.ntheory import isprime, primitive_root, factorint
from sympy.polys.domains import FF
from sympy.polys.polytools import gcd, Poly
from sympy.utilities.misc import filldedent, translate
from sympy.utilities.iterables import uniq, multiset
from sympy.testing.randtest import _randrange, _randint
class NonInvertibleCipherWarning(RuntimeWarning):
"""A warning raised if the cipher is not invertible."""
def __init__(self, msg):
self.fullMessage = msg
def __str__(self):
return '\n\t' + self.fullMessage
def warn(self, stacklevel=2):
warnings.warn(self, stacklevel=stacklevel)
def AZ(s=None):
"""Return the letters of ``s`` in uppercase. In case more than
one string is passed, each of them will be processed and a list
of upper case strings will be returned.
Examples
========
>>> from sympy.crypto.crypto import AZ
>>> AZ('Hello, world!')
'HELLOWORLD'
>>> AZ('Hello, world!'.split())
['HELLO', 'WORLD']
See Also
========
check_and_join
"""
if not s:
return uppercase
t = type(s) is str
if t:
s = [s]
rv = [check_and_join(i.upper().split(), uppercase, filter=True)
for i in s]
if t:
return rv[0]
return rv
bifid5 = AZ().replace('J', '')
bifid6 = AZ() + '0123456789'
bifid10 = printable
def padded_key(key, symbols, filter=True):
"""Return a string of the distinct characters of ``symbols`` with
those of ``key`` appearing first, omitting characters in ``key``
that are not in ``symbols``. A ValueError is raised if a) there are
duplicate characters in ``symbols`` or b) there are characters
in ``key`` that are not in ``symbols``.
Examples
========
>>> from sympy.crypto.crypto import padded_key
>>> padded_key('PUPPY', 'OPQRSTUVWXY')
'PUYOQRSTVWX'
>>> padded_key('RSA', 'ARTIST')
Traceback (most recent call last):
...
ValueError: duplicate characters in symbols: T
"""
syms = list(uniq(symbols))
if len(syms) != len(symbols):
extra = ''.join(sorted(set(
[i for i in symbols if symbols.count(i) > 1])))
raise ValueError('duplicate characters in symbols: %s' % extra)
extra = set(key) - set(syms)
if extra:
raise ValueError(
'characters in key but not symbols: %s' % ''.join(
sorted(extra)))
key0 = ''.join(list(uniq(key)))
return key0 + ''.join([i for i in syms if i not in key0])
def check_and_join(phrase, symbols=None, filter=None):
"""
Joins characters of ``phrase`` and if ``symbols`` is given, raises
an error if any character in ``phrase`` is not in ``symbols``.
Parameters
==========
phrase
String or list of strings to be returned as a string.
symbols
Iterable of characters allowed in ``phrase``.
If ``symbols`` is ``None``, no checking is performed.
Examples
========
>>> from sympy.crypto.crypto import check_and_join
>>> check_and_join('a phrase')
'a phrase'
>>> check_and_join('a phrase'.upper().split())
'APHRASE'
>>> check_and_join('a phrase!'.upper().split(), 'ARE', filter=True)
'ARAE'
>>> check_and_join('a phrase!'.upper().split(), 'ARE')
Traceback (most recent call last):
...
ValueError: characters in phrase but not symbols: "!HPS"
"""
rv = ''.join(''.join(phrase))
if symbols is not None:
symbols = check_and_join(symbols)
missing = ''.join(list(sorted(set(rv) - set(symbols))))
if missing:
if not filter:
raise ValueError(
'characters in phrase but not symbols: "%s"' % missing)
rv = translate(rv, None, missing)
return rv
def _prep(msg, key, alp, default=None):
if not alp:
if not default:
alp = AZ()
msg = AZ(msg)
key = AZ(key)
else:
alp = default
else:
alp = ''.join(alp)
key = check_and_join(key, alp, filter=True)
msg = check_and_join(msg, alp, filter=True)
return msg, key, alp
def cycle_list(k, n):
"""
Returns the elements of the list ``range(n)`` shifted to the
left by ``k`` (so the list starts with ``k`` (mod ``n``)).
Examples
========
>>> from sympy.crypto.crypto import cycle_list
>>> cycle_list(3, 10)
[3, 4, 5, 6, 7, 8, 9, 0, 1, 2]
"""
k = k % n
return list(range(k, n)) + list(range(k))
######## shift cipher examples ############
def encipher_shift(msg, key, symbols=None):
"""
Performs shift cipher encryption on plaintext msg, and returns the
ciphertext.
Parameters
==========
key : int
The secret key.
msg : str
Plaintext of upper-case letters.
Returns
=======
str
Ciphertext of upper-case letters.
Examples
========
>>> from sympy.crypto.crypto import encipher_shift, decipher_shift
>>> msg = "GONAVYBEATARMY"
>>> ct = encipher_shift(msg, 1); ct
'HPOBWZCFBUBSNZ'
To decipher the shifted text, change the sign of the key:
>>> encipher_shift(ct, -1)
'GONAVYBEATARMY'
There is also a convenience function that does this with the
original key:
>>> decipher_shift(ct, 1)
'GONAVYBEATARMY'
Notes
=====
ALGORITHM:
STEPS:
0. Number the letters of the alphabet from 0, ..., N
1. Compute from the string ``msg`` a list ``L1`` of
corresponding integers.
2. Compute from the list ``L1`` a new list ``L2``, given by
adding ``(k mod 26)`` to each element in ``L1``.
3. Compute from the list ``L2`` a string ``ct`` of
corresponding letters.
The shift cipher is also called the Caesar cipher, after
Julius Caesar, who, according to Suetonius, used it with a
shift of three to protect messages of military significance.
Caesar's nephew Augustus reportedly used a similar cipher, but
with a right shift of 1.
References
==========
.. [1] https://en.wikipedia.org/wiki/Caesar_cipher
.. [2] http://mathworld.wolfram.com/CaesarsMethod.html
See Also
========
decipher_shift
"""
msg, _, A = _prep(msg, '', symbols)
shift = len(A) - key % len(A)
key = A[shift:] + A[:shift]
return translate(msg, key, A)
def decipher_shift(msg, key, symbols=None):
"""
Return the text by shifting the characters of ``msg`` to the
left by the amount given by ``key``.
Examples
========
>>> from sympy.crypto.crypto import encipher_shift, decipher_shift
>>> msg = "GONAVYBEATARMY"
>>> ct = encipher_shift(msg, 1); ct
'HPOBWZCFBUBSNZ'
To decipher the shifted text, change the sign of the key:
>>> encipher_shift(ct, -1)
'GONAVYBEATARMY'
Or use this function with the original key:
>>> decipher_shift(ct, 1)
'GONAVYBEATARMY'
"""
return encipher_shift(msg, -key, symbols)
def encipher_rot13(msg, symbols=None):
"""
Performs the ROT13 encryption on a given plaintext ``msg``.
Notes
=====
ROT13 is a substitution cipher which substitutes each letter
in the plaintext message for the letter furthest away from it
in the English alphabet.
Equivalently, it is just a Caeser (shift) cipher with a shift
key of 13 (midway point of the alphabet).
References
==========
.. [1] https://en.wikipedia.org/wiki/ROT13
See Also
========
decipher_rot13
encipher_shift
"""
return encipher_shift(msg, 13, symbols)
def decipher_rot13(msg, symbols=None):
"""
Performs the ROT13 decryption on a given plaintext ``msg``.
Notes
=====
``decipher_rot13`` is equivalent to ``encipher_rot13`` as both
``decipher_shift`` with a key of 13 and ``encipher_shift`` key with a
key of 13 will return the same results. Nonetheless,
``decipher_rot13`` has nonetheless been explicitly defined here for
consistency.
Examples
========
>>> from sympy.crypto.crypto import encipher_rot13, decipher_rot13
>>> msg = 'GONAVYBEATARMY'
>>> ciphertext = encipher_rot13(msg);ciphertext
'TBANILORNGNEZL'
>>> decipher_rot13(ciphertext)
'GONAVYBEATARMY'
>>> encipher_rot13(msg) == decipher_rot13(msg)
True
>>> msg == decipher_rot13(ciphertext)
True
"""
return decipher_shift(msg, 13, symbols)
######## affine cipher examples ############
def encipher_affine(msg, key, symbols=None, _inverse=False):
r"""
Performs the affine cipher encryption on plaintext ``msg``, and
returns the ciphertext.
Encryption is based on the map `x \rightarrow ax+b` (mod `N`)
where ``N`` is the number of characters in the alphabet.
Decryption is based on the map `x \rightarrow cx+d` (mod `N`),
where `c = a^{-1}` (mod `N`) and `d = -a^{-1}b` (mod `N`).
In particular, for the map to be invertible, we need
`\mathrm{gcd}(a, N) = 1` and an error will be raised if this is
not true.
Parameters
==========
msg : str
Characters that appear in ``symbols``.
a, b : int, int
A pair integers, with ``gcd(a, N) = 1`` (the secret key).
symbols
String of characters (default = uppercase letters).
When no symbols are given, ``msg`` is converted to upper case
letters and all other characters are ignored.
Returns
=======
ct
String of characters (the ciphertext message)
Notes
=====
ALGORITHM:
STEPS:
0. Number the letters of the alphabet from 0, ..., N
1. Compute from the string ``msg`` a list ``L1`` of
corresponding integers.
2. Compute from the list ``L1`` a new list ``L2``, given by
replacing ``x`` by ``a*x + b (mod N)``, for each element
``x`` in ``L1``.
3. Compute from the list ``L2`` a string ``ct`` of
corresponding letters.
This is a straightforward generalization of the shift cipher with
the added complexity of requiring 2 characters to be deciphered in
order to recover the key.
References
==========
.. [1] https://en.wikipedia.org/wiki/Affine_cipher
See Also
========
decipher_affine
"""
msg, _, A = _prep(msg, '', symbols)
N = len(A)
a, b = key
assert gcd(a, N) == 1
if _inverse:
c = mod_inverse(a, N)
d = -b*c
a, b = c, d
B = ''.join([A[(a*i + b) % N] for i in range(N)])
return translate(msg, A, B)
def decipher_affine(msg, key, symbols=None):
r"""
Return the deciphered text that was made from the mapping,
`x \rightarrow ax+b` (mod `N`), where ``N`` is the
number of characters in the alphabet. Deciphering is done by
reciphering with a new key: `x \rightarrow cx+d` (mod `N`),
where `c = a^{-1}` (mod `N`) and `d = -a^{-1}b` (mod `N`).
Examples
========
>>> from sympy.crypto.crypto import encipher_affine, decipher_affine
>>> msg = "GO NAVY BEAT ARMY"
>>> key = (3, 1)
>>> encipher_affine(msg, key)
'TROBMVENBGBALV'
>>> decipher_affine(_, key)
'GONAVYBEATARMY'
See Also
========
encipher_affine
"""
return encipher_affine(msg, key, symbols, _inverse=True)
def encipher_atbash(msg, symbols=None):
r"""
Enciphers a given ``msg`` into its Atbash ciphertext and returns it.
Notes
=====
Atbash is a substitution cipher originally used to encrypt the Hebrew
alphabet. Atbash works on the principle of mapping each alphabet to its
reverse / counterpart (i.e. a would map to z, b to y etc.)
Atbash is functionally equivalent to the affine cipher with ``a = 25``
and ``b = 25``
See Also
========
decipher_atbash
"""
return encipher_affine(msg, (25,25), symbols)
def decipher_atbash(msg, symbols=None):
r"""
Deciphers a given ``msg`` using Atbash cipher and returns it.
Notes
=====
``decipher_atbash`` is functionally equivalent to ``encipher_atbash``.
However, it has still been added as a separate function to maintain
consistency.
Examples
========
>>> from sympy.crypto.crypto import encipher_atbash, decipher_atbash
>>> msg = 'GONAVYBEATARMY'
>>> encipher_atbash(msg)
'TLMZEBYVZGZINB'
>>> decipher_atbash(msg)
'TLMZEBYVZGZINB'
>>> encipher_atbash(msg) == decipher_atbash(msg)
True
>>> msg == encipher_atbash(encipher_atbash(msg))
True
References
==========
.. [1] https://en.wikipedia.org/wiki/Atbash
See Also
========
encipher_atbash
"""
return decipher_affine(msg, (25,25), symbols)
#################### substitution cipher ###########################
def encipher_substitution(msg, old, new=None):
r"""
Returns the ciphertext obtained by replacing each character that
appears in ``old`` with the corresponding character in ``new``.
If ``old`` is a mapping, then new is ignored and the replacements
defined by ``old`` are used.
Notes
=====
This is a more general than the affine cipher in that the key can
only be recovered by determining the mapping for each symbol.
Though in practice, once a few symbols are recognized the mappings
for other characters can be quickly guessed.
Examples
========
>>> from sympy.crypto.crypto import encipher_substitution, AZ
>>> old = 'OEYAG'
>>> new = '034^6'
>>> msg = AZ("go navy! beat army!")
>>> ct = encipher_substitution(msg, old, new); ct
'60N^V4B3^T^RM4'
To decrypt a substitution, reverse the last two arguments:
>>> encipher_substitution(ct, new, old)
'GONAVYBEATARMY'
In the special case where ``old`` and ``new`` are a permutation of
order 2 (representing a transposition of characters) their order
is immaterial:
>>> old = 'NAVY'
>>> new = 'ANYV'
>>> encipher = lambda x: encipher_substitution(x, old, new)
>>> encipher('NAVY')
'ANYV'
>>> encipher(_)
'NAVY'
The substitution cipher, in general, is a method
whereby "units" (not necessarily single characters) of plaintext
are replaced with ciphertext according to a regular system.
>>> ords = dict(zip('abc', ['\\%i' % ord(i) for i in 'abc']))
>>> print(encipher_substitution('abc', ords))
\97\98\99
References
==========
.. [1] https://en.wikipedia.org/wiki/Substitution_cipher
"""
return translate(msg, old, new)
######################################################################
#################### Vigenere cipher examples ########################
######################################################################
def encipher_vigenere(msg, key, symbols=None):
"""
Performs the Vigenere cipher encryption on plaintext ``msg``, and
returns the ciphertext.
Examples
========
>>> from sympy.crypto.crypto import encipher_vigenere, AZ
>>> key = "encrypt"
>>> msg = "meet me on monday"
>>> encipher_vigenere(msg, key)
'QRGKKTHRZQEBPR'
Section 1 of the Kryptos sculpture at the CIA headquarters
uses this cipher and also changes the order of the the
alphabet [2]_. Here is the first line of that section of
the sculpture:
>>> from sympy.crypto.crypto import decipher_vigenere, padded_key
>>> alp = padded_key('KRYPTOS', AZ())
>>> key = 'PALIMPSEST'
>>> msg = 'EMUFPHZLRFAXYUSDJKZLDKRNSHGNFIVJ'
>>> decipher_vigenere(msg, key, alp)
'BETWEENSUBTLESHADINGANDTHEABSENC'
Notes
=====
The Vigenere cipher is named after Blaise de Vigenere, a sixteenth
century diplomat and cryptographer, by a historical accident.
Vigenere actually invented a different and more complicated cipher.
The so-called *Vigenere cipher* was actually invented
by Giovan Batista Belaso in 1553.
This cipher was used in the 1800's, for example, during the American
Civil War. The Confederacy used a brass cipher disk to implement the
Vigenere cipher (now on display in the NSA Museum in Fort
Meade) [1]_.
The Vigenere cipher is a generalization of the shift cipher.
Whereas the shift cipher shifts each letter by the same amount
(that amount being the key of the shift cipher) the Vigenere
cipher shifts a letter by an amount determined by the key (which is
a word or phrase known only to the sender and receiver).
For example, if the key was a single letter, such as "C", then the
so-called Vigenere cipher is actually a shift cipher with a
shift of `2` (since "C" is the 2nd letter of the alphabet, if
you start counting at `0`). If the key was a word with two
letters, such as "CA", then the so-called Vigenere cipher will
shift letters in even positions by `2` and letters in odd positions
are left alone (shifted by `0`, since "A" is the 0th letter, if
you start counting at `0`).
ALGORITHM:
INPUT:
``msg``: string of characters that appear in ``symbols``
(the plaintext)
``key``: a string of characters that appear in ``symbols``
(the secret key)
``symbols``: a string of letters defining the alphabet
OUTPUT:
``ct``: string of characters (the ciphertext message)
STEPS:
0. Number the letters of the alphabet from 0, ..., N
1. Compute from the string ``key`` a list ``L1`` of
corresponding integers. Let ``n1 = len(L1)``.
2. Compute from the string ``msg`` a list ``L2`` of
corresponding integers. Let ``n2 = len(L2)``.
3. Break ``L2`` up sequentially into sublists of size
``n1``; the last sublist may be smaller than ``n1``
4. For each of these sublists ``L`` of ``L2``, compute a
new list ``C`` given by ``C[i] = L[i] + L1[i] (mod N)``
to the ``i``-th element in the sublist, for each ``i``.
5. Assemble these lists ``C`` by concatenation into a new
list of length ``n2``.
6. Compute from the new list a string ``ct`` of
corresponding letters.
Once it is known that the key is, say, `n` characters long,
frequency analysis can be applied to every `n`-th letter of
the ciphertext to determine the plaintext. This method is
called *Kasiski examination* (although it was first discovered
by Babbage). If they key is as long as the message and is
comprised of randomly selected characters -- a one-time pad -- the
message is theoretically unbreakable.
The cipher Vigenere actually discovered is an "auto-key" cipher
described as follows.
ALGORITHM:
INPUT:
``key``: a string of letters (the secret key)
``msg``: string of letters (the plaintext message)
OUTPUT:
``ct``: string of upper-case letters (the ciphertext message)
STEPS:
0. Number the letters of the alphabet from 0, ..., N
1. Compute from the string ``msg`` a list ``L2`` of
corresponding integers. Let ``n2 = len(L2)``.
2. Let ``n1`` be the length of the key. Append to the
string ``key`` the first ``n2 - n1`` characters of
the plaintext message. Compute from this string (also of
length ``n2``) a list ``L1`` of integers corresponding
to the letter numbers in the first step.
3. Compute a new list ``C`` given by
``C[i] = L1[i] + L2[i] (mod N)``.
4. Compute from the new list a string ``ct`` of letters
corresponding to the new integers.
To decipher the auto-key ciphertext, the key is used to decipher
the first ``n1`` characters and then those characters become the
key to decipher the next ``n1`` characters, etc...:
>>> m = AZ('go navy, beat army! yes you can'); m
'GONAVYBEATARMYYESYOUCAN'
>>> key = AZ('gold bug'); n1 = len(key); n2 = len(m)
>>> auto_key = key + m[:n2 - n1]; auto_key
'GOLDBUGGONAVYBEATARMYYE'
>>> ct = encipher_vigenere(m, auto_key); ct
'MCYDWSHKOGAMKZCELYFGAYR'
>>> n1 = len(key)
>>> pt = []
>>> while ct:
... part, ct = ct[:n1], ct[n1:]
... pt.append(decipher_vigenere(part, key))
... key = pt[-1]
...
>>> ''.join(pt) == m
True
References
==========
.. [1] https://en.wikipedia.org/wiki/Vigenere_cipher
.. [2] http://web.archive.org/web/20071116100808/
.. [3] http://filebox.vt.edu/users/batman/kryptos.html
(short URL: https://goo.gl/ijr22d)
"""
msg, key, A = _prep(msg, key, symbols)
map = {c: i for i, c in enumerate(A)}
key = [map[c] for c in key]
N = len(map)
k = len(key)
rv = []
for i, m in enumerate(msg):
rv.append(A[(map[m] + key[i % k]) % N])
rv = ''.join(rv)
return rv
def decipher_vigenere(msg, key, symbols=None):
"""
Decode using the Vigenere cipher.
Examples
========
>>> from sympy.crypto.crypto import decipher_vigenere
>>> key = "encrypt"
>>> ct = "QRGK kt HRZQE BPR"
>>> decipher_vigenere(ct, key)
'MEETMEONMONDAY'
"""
msg, key, A = _prep(msg, key, symbols)
map = {c: i for i, c in enumerate(A)}
N = len(A) # normally, 26
K = [map[c] for c in key]
n = len(K)
C = [map[c] for c in msg]
rv = ''.join([A[(-K[i % n] + c) % N] for i, c in enumerate(C)])
return rv
#################### Hill cipher ########################
def encipher_hill(msg, key, symbols=None, pad="Q"):
r"""
Return the Hill cipher encryption of ``msg``.
Notes
=====
The Hill cipher [1]_, invented by Lester S. Hill in the 1920's [2]_,
was the first polygraphic cipher in which it was practical
(though barely) to operate on more than three symbols at once.
The following discussion assumes an elementary knowledge of
matrices.
First, each letter is first encoded as a number starting with 0.
Suppose your message `msg` consists of `n` capital letters, with no
spaces. This may be regarded an `n`-tuple M of elements of
`Z_{26}` (if the letters are those of the English alphabet). A key
in the Hill cipher is a `k x k` matrix `K`, all of whose entries
are in `Z_{26}`, such that the matrix `K` is invertible (i.e., the
linear transformation `K: Z_{N}^k \rightarrow Z_{N}^k`
is one-to-one).
Parameters
==========
msg
Plaintext message of `n` upper-case letters.
key
A `k \times k` invertible matrix `K`, all of whose entries are
in `Z_{26}` (or whatever number of symbols are being used).
pad
Character (default "Q") to use to make length of text be a
multiple of ``k``.
Returns
=======
ct
Ciphertext of upper-case letters.
Notes
=====
ALGORITHM:
STEPS:
0. Number the letters of the alphabet from 0, ..., N
1. Compute from the string ``msg`` a list ``L`` of
corresponding integers. Let ``n = len(L)``.
2. Break the list ``L`` up into ``t = ceiling(n/k)``
sublists ``L_1``, ..., ``L_t`` of size ``k`` (with
the last list "padded" to ensure its size is
``k``).
3. Compute new list ``C_1``, ..., ``C_t`` given by
``C[i] = K*L_i`` (arithmetic is done mod N), for each
``i``.
4. Concatenate these into a list ``C = C_1 + ... + C_t``.
5. Compute from ``C`` a string ``ct`` of corresponding
letters. This has length ``k*t``.
References
==========
.. [1] https://en.wikipedia.org/wiki/Hill_cipher
.. [2] Lester S. Hill, Cryptography in an Algebraic Alphabet,
The American Mathematical Monthly Vol.36, June-July 1929,
pp.306-312.
See Also
========
decipher_hill
"""
assert key.is_square
assert len(pad) == 1
msg, pad, A = _prep(msg, pad, symbols)
map = {c: i for i, c in enumerate(A)}
P = [map[c] for c in msg]
N = len(A)
k = key.cols
n = len(P)
m, r = divmod(n, k)
if r:
P = P + [map[pad]]*(k - r)
m += 1
rv = ''.join([A[c % N] for j in range(m) for c in
list(key*Matrix(k, 1, [P[i]
for i in range(k*j, k*(j + 1))]))])
return rv
def decipher_hill(msg, key, symbols=None):
"""
Deciphering is the same as enciphering but using the inverse of the
key matrix.
Examples
========
>>> from sympy.crypto.crypto import encipher_hill, decipher_hill
>>> from sympy import Matrix
>>> key = Matrix([[1, 2], [3, 5]])
>>> encipher_hill("meet me on monday", key)
'UEQDUEODOCTCWQ'
>>> decipher_hill(_, key)
'MEETMEONMONDAY'
When the length of the plaintext (stripped of invalid characters)
is not a multiple of the key dimension, extra characters will
appear at the end of the enciphered and deciphered text. In order to
decipher the text, those characters must be included in the text to
be deciphered. In the following, the key has a dimension of 4 but
the text is 2 short of being a multiple of 4 so two characters will
be added.
>>> key = Matrix([[1, 1, 1, 2], [0, 1, 1, 0],
... [2, 2, 3, 4], [1, 1, 0, 1]])
>>> msg = "ST"
>>> encipher_hill(msg, key)
'HJEB'
>>> decipher_hill(_, key)
'STQQ'
>>> encipher_hill(msg, key, pad="Z")
'ISPK'
>>> decipher_hill(_, key)
'STZZ'
If the last two characters of the ciphertext were ignored in
either case, the wrong plaintext would be recovered:
>>> decipher_hill("HD", key)
'ORMV'
>>> decipher_hill("IS", key)
'UIKY'
See Also
========
encipher_hill
"""
assert key.is_square
msg, _, A = _prep(msg, '', symbols)
map = {c: i for i, c in enumerate(A)}
C = [map[c] for c in msg]
N = len(A)
k = key.cols
n = len(C)
m, r = divmod(n, k)
if r:
C = C + [0]*(k - r)
m += 1
key_inv = key.inv_mod(N)
rv = ''.join([A[p % N] for j in range(m) for p in
list(key_inv*Matrix(
k, 1, [C[i] for i in range(k*j, k*(j + 1))]))])
return rv
#################### Bifid cipher ########################
def encipher_bifid(msg, key, symbols=None):
r"""
Performs the Bifid cipher encryption on plaintext ``msg``, and
returns the ciphertext.
This is the version of the Bifid cipher that uses an `n \times n`
Polybius square.
Parameters
==========
msg
Plaintext string.
key
Short string for key.
Duplicate characters are ignored and then it is padded with the
characters in ``symbols`` that were not in the short key.
symbols
`n \times n` characters defining the alphabet.
(default is string.printable)
Returns
=======
ciphertext
Ciphertext using Bifid5 cipher without spaces.
See Also
========
decipher_bifid, encipher_bifid5, encipher_bifid6
References
==========
.. [1] https://en.wikipedia.org/wiki/Bifid_cipher
"""
msg, key, A = _prep(msg, key, symbols, bifid10)
long_key = ''.join(uniq(key)) or A
n = len(A)**.5
if n != int(n):
raise ValueError(
'Length of alphabet (%s) is not a square number.' % len(A))
N = int(n)
if len(long_key) < N**2:
long_key = list(long_key) + [x for x in A if x not in long_key]
# the fractionalization
row_col = {ch: divmod(i, N) for i, ch in enumerate(long_key)}
r, c = zip(*[row_col[x] for x in msg])
rc = r + c
ch = {i: ch for ch, i in row_col.items()}
rv = ''.join((ch[i] for i in zip(rc[::2], rc[1::2])))
return rv
def decipher_bifid(msg, key, symbols=None):
r"""
Performs the Bifid cipher decryption on ciphertext ``msg``, and
returns the plaintext.
This is the version of the Bifid cipher that uses the `n \times n`
Polybius square.
Parameters
==========
msg
Ciphertext string.
key
Short string for key.
Duplicate characters are ignored and then it is padded with the
characters in symbols that were not in the short key.
symbols
`n \times n` characters defining the alphabet.
(default=string.printable, a `10 \times 10` matrix)
Returns
=======
deciphered
Deciphered text.
Examples
========
>>> from sympy.crypto.crypto import (
... encipher_bifid, decipher_bifid, AZ)
Do an encryption using the bifid5 alphabet:
>>> alp = AZ().replace('J', '')
>>> ct = AZ("meet me on monday!")
>>> key = AZ("gold bug")
>>> encipher_bifid(ct, key, alp)
'IEILHHFSTSFQYE'
When entering the text or ciphertext, spaces are ignored so it
can be formatted as desired. Re-entering the ciphertext from the
preceding, putting 4 characters per line and padding with an extra
J, does not cause problems for the deciphering:
>>> decipher_bifid('''
... IEILH
... HFSTS
... FQYEJ''', key, alp)
'MEETMEONMONDAY'
When no alphabet is given, all 100 printable characters will be
used:
>>> key = ''
>>> encipher_bifid('hello world!', key)
'bmtwmg-bIo*w'
>>> decipher_bifid(_, key)
'hello world!'
If the key is changed, a different encryption is obtained:
>>> key = 'gold bug'
>>> encipher_bifid('hello world!', 'gold_bug')
'hg2sfuei7t}w'
And if the key used to decrypt the message is not exact, the
original text will not be perfectly obtained:
>>> decipher_bifid(_, 'gold pug')
'heldo~wor6d!'
"""
msg, _, A = _prep(msg, '', symbols, bifid10)
long_key = ''.join(uniq(key)) or A
n = len(A)**.5
if n != int(n):
raise ValueError(
'Length of alphabet (%s) is not a square number.' % len(A))
N = int(n)
if len(long_key) < N**2:
long_key = list(long_key) + [x for x in A if x not in long_key]
# the reverse fractionalization
row_col = dict(
[(ch, divmod(i, N)) for i, ch in enumerate(long_key)])
rc = [i for c in msg for i in row_col[c]]
n = len(msg)
rc = zip(*(rc[:n], rc[n:]))
ch = {i: ch for ch, i in row_col.items()}
rv = ''.join((ch[i] for i in rc))
return rv
def bifid_square(key):
"""Return characters of ``key`` arranged in a square.
Examples
========
>>> from sympy.crypto.crypto import (
... bifid_square, AZ, padded_key, bifid5)
>>> bifid_square(AZ().replace('J', ''))
Matrix([
[A, B, C, D, E],
[F, G, H, I, K],
[L, M, N, O, P],
[Q, R, S, T, U],
[V, W, X, Y, Z]])
>>> bifid_square(padded_key(AZ('gold bug!'), bifid5))
Matrix([
[G, O, L, D, B],
[U, A, C, E, F],
[H, I, K, M, N],
[P, Q, R, S, T],
[V, W, X, Y, Z]])
See Also
========
padded_key
"""
A = ''.join(uniq(''.join(key)))
n = len(A)**.5
if n != int(n):
raise ValueError(
'Length of alphabet (%s) is not a square number.' % len(A))
n = int(n)
f = lambda i, j: Symbol(A[n*i + j])
rv = Matrix(n, n, f)
return rv
def encipher_bifid5(msg, key):
r"""
Performs the Bifid cipher encryption on plaintext ``msg``, and
returns the ciphertext.
This is the version of the Bifid cipher that uses the `5 \times 5`
Polybius square. The letter "J" is ignored so it must be replaced
with something else (traditionally an "I") before encryption.
ALGORITHM: (5x5 case)
STEPS:
0. Create the `5 \times 5` Polybius square ``S`` associated
to ``key`` as follows:
a) moving from left-to-right, top-to-bottom,
place the letters of the key into a `5 \times 5`
matrix,
b) if the key has less than 25 letters, add the
letters of the alphabet not in the key until the
`5 \times 5` square is filled.
1. Create a list ``P`` of pairs of numbers which are the
coordinates in the Polybius square of the letters in
``msg``.
2. Let ``L1`` be the list of all first coordinates of ``P``
(length of ``L1 = n``), let ``L2`` be the list of all
second coordinates of ``P`` (so the length of ``L2``
is also ``n``).
3. Let ``L`` be the concatenation of ``L1`` and ``L2``
(length ``L = 2*n``), except that consecutive numbers
are paired ``(L[2*i], L[2*i + 1])``. You can regard
``L`` as a list of pairs of length ``n``.
4. Let ``C`` be the list of all letters which are of the
form ``S[i, j]``, for all ``(i, j)`` in ``L``. As a
string, this is the ciphertext of ``msg``.
Parameters
==========
msg : str
Plaintext string.
Converted to upper case and filtered of anything but all letters
except J.
key
Short string for key; non-alphabetic letters, J and duplicated
characters are ignored and then, if the length is less than 25
characters, it is padded with other letters of the alphabet
(in alphabetical order).
Returns
=======
ct
Ciphertext (all caps, no spaces).
Examples
========
>>> from sympy.crypto.crypto import (
... encipher_bifid5, decipher_bifid5)
"J" will be omitted unless it is replaced with something else:
>>> round_trip = lambda m, k: \
... decipher_bifid5(encipher_bifid5(m, k), k)
>>> key = 'a'
>>> msg = "JOSIE"
>>> round_trip(msg, key)
'OSIE'
>>> round_trip(msg.replace("J", "I"), key)
'IOSIE'
>>> j = "QIQ"
>>> round_trip(msg.replace("J", j), key).replace(j, "J")
'JOSIE'
Notes
=====
The Bifid cipher was invented around 1901 by Felix Delastelle.
It is a *fractional substitution* cipher, where letters are
replaced by pairs of symbols from a smaller alphabet. The
cipher uses a `5 \times 5` square filled with some ordering of the
alphabet, except that "J" is replaced with "I" (this is a so-called
Polybius square; there is a `6 \times 6` analog if you add back in
"J" and also append onto the usual 26 letter alphabet, the digits
0, 1, ..., 9).
According to Helen Gaines' book *Cryptanalysis*, this type of cipher
was used in the field by the German Army during World War I.
See Also
========
decipher_bifid5, encipher_bifid
"""
msg, key, _ = _prep(msg.upper(), key.upper(), None, bifid5)
key = padded_key(key, bifid5)
return encipher_bifid(msg, '', key)
def decipher_bifid5(msg, key):
r"""
Return the Bifid cipher decryption of ``msg``.
This is the version of the Bifid cipher that uses the `5 \times 5`
Polybius square; the letter "J" is ignored unless a ``key`` of
length 25 is used.
Parameters
==========
msg
Ciphertext string.
key
Short string for key; duplicated characters are ignored and if
the length is less then 25 characters, it will be padded with
other letters from the alphabet omitting "J".
Non-alphabetic characters are ignored.
Returns
=======
plaintext
Plaintext from Bifid5 cipher (all caps, no spaces).
Examples
========
>>> from sympy.crypto.crypto import encipher_bifid5, decipher_bifid5
>>> key = "gold bug"
>>> encipher_bifid5('meet me on friday', key)
'IEILEHFSTSFXEE'
>>> encipher_bifid5('meet me on monday', key)
'IEILHHFSTSFQYE'
>>> decipher_bifid5(_, key)
'MEETMEONMONDAY'
"""
msg, key, _ = _prep(msg.upper(), key.upper(), None, bifid5)
key = padded_key(key, bifid5)
return decipher_bifid(msg, '', key)
def bifid5_square(key=None):
r"""
5x5 Polybius square.
Produce the Polybius square for the `5 \times 5` Bifid cipher.
Examples
========
>>> from sympy.crypto.crypto import bifid5_square
>>> bifid5_square("gold bug")
Matrix([
[G, O, L, D, B],
[U, A, C, E, F],
[H, I, K, M, N],
[P, Q, R, S, T],
[V, W, X, Y, Z]])
"""
if not key:
key = bifid5
else:
_, key, _ = _prep('', key.upper(), None, bifid5)
key = padded_key(key, bifid5)
return bifid_square(key)
def encipher_bifid6(msg, key):
r"""
Performs the Bifid cipher encryption on plaintext ``msg``, and
returns the ciphertext.
This is the version of the Bifid cipher that uses the `6 \times 6`
Polybius square.
Parameters
==========
msg
Plaintext string (digits okay).
key
Short string for key (digits okay).
If ``key`` is less than 36 characters long, the square will be
filled with letters A through Z and digits 0 through 9.
Returns
=======
ciphertext
Ciphertext from Bifid cipher (all caps, no spaces).
See Also
========
decipher_bifid6, encipher_bifid
"""
msg, key, _ = _prep(msg.upper(), key.upper(), None, bifid6)
key = padded_key(key, bifid6)
return encipher_bifid(msg, '', key)
def decipher_bifid6(msg, key):
r"""
Performs the Bifid cipher decryption on ciphertext ``msg``, and
returns the plaintext.
This is the version of the Bifid cipher that uses the `6 \times 6`
Polybius square.
Parameters
==========
msg
Ciphertext string (digits okay); converted to upper case
key
Short string for key (digits okay).
If ``key`` is less than 36 characters long, the square will be
filled with letters A through Z and digits 0 through 9.
All letters are converted to uppercase.
Returns
=======
plaintext
Plaintext from Bifid cipher (all caps, no spaces).
Examples
========
>>> from sympy.crypto.crypto import encipher_bifid6, decipher_bifid6
>>> key = "gold bug"
>>> encipher_bifid6('meet me on monday at 8am', key)
'KFKLJJHF5MMMKTFRGPL'
>>> decipher_bifid6(_, key)
'MEETMEONMONDAYAT8AM'
"""
msg, key, _ = _prep(msg.upper(), key.upper(), None, bifid6)
key = padded_key(key, bifid6)
return decipher_bifid(msg, '', key)
def bifid6_square(key=None):
r"""
6x6 Polybius square.
Produces the Polybius square for the `6 \times 6` Bifid cipher.
Assumes alphabet of symbols is "A", ..., "Z", "0", ..., "9".
Examples
========
>>> from sympy.crypto.crypto import bifid6_square
>>> key = "gold bug"
>>> bifid6_square(key)
Matrix([
[G, O, L, D, B, U],
[A, C, E, F, H, I],
[J, K, M, N, P, Q],
[R, S, T, V, W, X],
[Y, Z, 0, 1, 2, 3],
[4, 5, 6, 7, 8, 9]])
"""
if not key:
key = bifid6
else:
_, key, _ = _prep('', key.upper(), None, bifid6)
key = padded_key(key, bifid6)
return bifid_square(key)
#################### RSA #############################
def _decipher_rsa_crt(i, d, factors):
"""Decipher RSA using chinese remainder theorem from the information
of the relatively-prime factors of the modulus.
Parameters
==========
i : integer
Ciphertext
d : integer
The exponent component
factors : list of relatively-prime integers
The integers given must be coprime and the product must equal
the modulus component of the original RSA key.
Examples
========
How to decrypt RSA with CRT:
>>> from sympy.crypto.crypto import rsa_public_key, rsa_private_key
>>> primes = [61, 53]
>>> e = 17
>>> args = primes + [e]
>>> puk = rsa_public_key(*args)
>>> prk = rsa_private_key(*args)
>>> from sympy.crypto.crypto import encipher_rsa, _decipher_rsa_crt
>>> msg = 65
>>> crt_primes = primes
>>> encrypted = encipher_rsa(msg, puk)
>>> decrypted = _decipher_rsa_crt(encrypted, prk[1], primes)
>>> decrypted
65
"""
from sympy.ntheory.modular import crt
moduluses = [pow(i, d, p) for p in factors]
result = crt(factors, moduluses)
if not result:
raise ValueError("CRT failed")
return result[0]
def _rsa_key(*args, **kwargs):
r"""A private subroutine to generate RSA key
Parameters
==========
public, private : bool, optional
Flag to generate either a public key, a private key
totient : 'Euler' or 'Carmichael'
Different notation used for totient.
multipower : bool, optional
Flag to bypass warning for multipower RSA.
"""
from sympy.ntheory import totient as _euler
from sympy.ntheory import reduced_totient as _carmichael
public = kwargs.pop('public', True)
private = kwargs.pop('private', True)
totient = kwargs.pop('totient', 'Euler')
index = kwargs.pop('index', None)
multipower = kwargs.pop('multipower', None)
if len(args) < 2:
return False
if totient not in ('Euler', 'Carmichael'):
raise ValueError(
"The argument totient={} should either be " \
"'Euler', 'Carmichalel'." \
.format(totient))
if totient == 'Euler':
_totient = _euler
else:
_totient = _carmichael
if index is not None:
index = as_int(index)
if totient != 'Carmichael':
raise ValueError(
"Setting the 'index' keyword argument requires totient"
"notation to be specified as 'Carmichael'.")
primes, e = args[:-1], args[-1]
if any(not isprime(p) for p in primes):
new_primes = []
for i in primes:
new_primes.extend(factorint(i, multiple=True))
primes = new_primes
n = reduce(lambda i, j: i*j, primes)
tally = multiset(primes)
if all(v == 1 for v in tally.values()):
multiple = list(tally.keys())
phi = _totient._from_distinct_primes(*multiple)
else:
if not multipower:
NonInvertibleCipherWarning(
'Non-distinctive primes found in the factors {}. '
'The cipher may not be decryptable for some numbers '
'in the complete residue system Z[{}], but the cipher '
'can still be valid if you restrict the domain to be '
'the reduced residue system Z*[{}]. You can pass '
'the flag multipower=True if you want to suppress this '
'warning.'
.format(primes, n, n)
).warn()
phi = _totient._from_factors(tally)
if igcd(e, phi) == 1:
if public and not private:
if isinstance(index, int):
e = e % phi
e += index * phi
return n, e
if private and not public:
d = mod_inverse(e, phi)
if isinstance(index, int):
d += index * phi
return n, d
return False
def rsa_public_key(*args, **kwargs):
r"""Return the RSA *public key* pair, `(n, e)`
Parameters
==========
args : naturals
If specified as `p, q, e` where `p` and `q` are distinct primes
and `e` is a desired public exponent of the RSA, `n = p q` and
`e` will be verified against the totient
`\phi(n)` (Euler totient) or `\lambda(n)` (Carmichael totient)
to be `\gcd(e, \phi(n)) = 1` or `\gcd(e, \lambda(n)) = 1`.
If specified as `p_1, p_2, ..., p_n, e` where
`p_1, p_2, ..., p_n` are specified as primes,
and `e` is specified as a desired public exponent of the RSA,
it will be able to form a multi-prime RSA, which is a more
generalized form of the popular 2-prime RSA.
It can also be possible to form a single-prime RSA by specifying
the argument as `p, e`, which can be considered a trivial case
of a multiprime RSA.
Furthermore, it can be possible to form a multi-power RSA by
specifying two or more pairs of the primes to be same.
However, unlike the two-distinct prime RSA or multi-prime
RSA, not every numbers in the complete residue system
(`\mathbb{Z}_n`) will be decryptable since the mapping
`\mathbb{Z}_{n} \rightarrow \mathbb{Z}_{n}`
will not be bijective.
(Only except for the trivial case when
`e = 1`
or more generally,
.. math::
e \in \left \{ 1 + k \lambda(n)
\mid k \in \mathbb{Z} \land k \geq 0 \right \}
when RSA reduces to the identity.)
However, the RSA can still be decryptable for the numbers in the
reduced residue system (`\mathbb{Z}_n^{\times}`), since the
mapping
`\mathbb{Z}_{n}^{\times} \rightarrow \mathbb{Z}_{n}^{\times}`
can still be bijective.
If you pass a non-prime integer to the arguments
`p_1, p_2, ..., p_n`, the particular number will be
prime-factored and it will become either a multi-prime RSA or a
multi-power RSA in its canonical form, depending on whether the
product equals its radical or not.
`p_1 p_2 ... p_n = \text{rad}(p_1 p_2 ... p_n)`
totient : bool, optional
If ``'Euler'``, it uses Euler's totient `\phi(n)` which is
:meth:`sympy.ntheory.factor_.totient` in SymPy.
If ``'Carmichael'``, it uses Carmichael's totient `\lambda(n)`
which is :meth:`sympy.ntheory.factor_.reduced_totient` in SymPy.
Unlike private key generation, this is a trivial keyword for
public key generation because
`\gcd(e, \phi(n)) = 1 \iff \gcd(e, \lambda(n)) = 1`.
index : nonnegative integer, optional
Returns an arbitrary solution of a RSA public key at the index
specified at `0, 1, 2, ...`. This parameter needs to be
specified along with ``totient='Carmichael'``.
Similarly to the non-uniquenss of a RSA private key as described
in the ``index`` parameter documentation in
:meth:`rsa_private_key`, RSA public key is also not unique and
there is an infinite number of RSA public exponents which
can behave in the same manner.
From any given RSA public exponent `e`, there are can be an
another RSA public exponent `e + k \lambda(n)` where `k` is an
integer, `\lambda` is a Carmichael's totient function.
However, considering only the positive cases, there can be
a principal solution of a RSA public exponent `e_0` in
`0 < e_0 < \lambda(n)`, and all the other solutions
can be canonicalzed in a form of `e_0 + k \lambda(n)`.
``index`` specifies the `k` notation to yield any possible value
an RSA public key can have.
An example of computing any arbitrary RSA public key:
>>> from sympy.crypto.crypto import rsa_public_key
>>> rsa_public_key(61, 53, 17, totient='Carmichael', index=0)
(3233, 17)
>>> rsa_public_key(61, 53, 17, totient='Carmichael', index=1)
(3233, 797)
>>> rsa_public_key(61, 53, 17, totient='Carmichael', index=2)
(3233, 1577)
multipower : bool, optional
Any pair of non-distinct primes found in the RSA specification
will restrict the domain of the cryptosystem, as noted in the
explaination of the parameter ``args``.
SymPy RSA key generator may give a warning before dispatching it
as a multi-power RSA, however, you can disable the warning if
you pass ``True`` to this keyword.
Returns
=======
(n, e) : int, int
`n` is a product of any arbitrary number of primes given as
the argument.
`e` is relatively prime (coprime) to the Euler totient
`\phi(n)`.
False
Returned if less than two arguments are given, or `e` is
not relatively prime to the modulus.
Examples
========
>>> from sympy.crypto.crypto import rsa_public_key
A public key of a two-prime RSA:
>>> p, q, e = 3, 5, 7
>>> rsa_public_key(p, q, e)
(15, 7)
>>> rsa_public_key(p, q, 30)
False
A public key of a multiprime RSA:
>>> primes = [2, 3, 5, 7, 11, 13]
>>> e = 7
>>> args = primes + [e]
>>> rsa_public_key(*args)
(30030, 7)
Notes
=====
Although the RSA can be generalized over any modulus `n`, using
two large primes had became the most popular specification because a
product of two large primes is usually the hardest to factor
relatively to the digits of `n` can have.
However, it may need further understanding of the time complexities
of each prime-factoring algorithms to verify the claim.
See Also
========
rsa_private_key
encipher_rsa
decipher_rsa
References
==========
.. [1] https://en.wikipedia.org/wiki/RSA_%28cryptosystem%29
.. [2] http://cacr.uwaterloo.ca/techreports/2006/cacr2006-16.pdf
.. [3] https://link.springer.com/content/pdf/10.1007%2FBFb0055738.pdf
.. [4] http://www.itiis.org/digital-library/manuscript/1381
"""
return _rsa_key(*args, public=True, private=False, **kwargs)
def rsa_private_key(*args, **kwargs):
r"""Return the RSA *private key* pair, `(n, d)`
Parameters
==========
args : naturals
The keyword is identical to the ``args`` in
:meth:`rsa_public_key`.
totient : bool, optional
If ``'Euler'``, it uses Euler's totient convention `\phi(n)`
which is :meth:`sympy.ntheory.factor_.totient` in SymPy.
If ``'Carmichael'``, it uses Carmichael's totient convention
`\lambda(n)` which is
:meth:`sympy.ntheory.factor_.reduced_totient` in SymPy.
There can be some output differences for private key generation
as examples below.
Example using Euler's totient:
>>> from sympy.crypto.crypto import rsa_private_key
>>> rsa_private_key(61, 53, 17, totient='Euler')
(3233, 2753)
Example using Carmichael's totient:
>>> from sympy.crypto.crypto import rsa_private_key
>>> rsa_private_key(61, 53, 17, totient='Carmichael')
(3233, 413)
index : nonnegative integer, optional
Returns an arbitrary solution of a RSA private key at the index
specified at `0, 1, 2, ...`. This parameter needs to be
specified along with ``totient='Carmichael'``.
RSA private exponent is a non-unique solution of
`e d \mod \lambda(n) = 1` and it is possible in any form of
`d + k \lambda(n)`, where `d` is an another
already-computed private exponent, and `\lambda` is a
Carmichael's totient function, and `k` is any integer.
However, considering only the positive cases, there can be
a principal solution of a RSA private exponent `d_0` in
`0 < d_0 < \lambda(n)`, and all the other solutions
can be canonicalzed in a form of `d_0 + k \lambda(n)`.
``index`` specifies the `k` notation to yield any possible value
an RSA private key can have.
An example of computing any arbitrary RSA private key:
>>> from sympy.crypto.crypto import rsa_private_key
>>> rsa_private_key(61, 53, 17, totient='Carmichael', index=0)
(3233, 413)
>>> rsa_private_key(61, 53, 17, totient='Carmichael', index=1)
(3233, 1193)
>>> rsa_private_key(61, 53, 17, totient='Carmichael', index=2)
(3233, 1973)
multipower : bool, optional
The keyword is identical to the ``multipower`` in
:meth:`rsa_public_key`.
Returns
=======
(n, d) : int, int
`n` is a product of any arbitrary number of primes given as
the argument.
`d` is the inverse of `e` (mod `\phi(n)`) where `e` is the
exponent given, and `\phi` is a Euler totient.
False
Returned if less than two arguments are given, or `e` is
not relatively prime to the totient of the modulus.
Examples
========
>>> from sympy.crypto.crypto import rsa_private_key
A private key of a two-prime RSA:
>>> p, q, e = 3, 5, 7
>>> rsa_private_key(p, q, e)
(15, 7)
>>> rsa_private_key(p, q, 30)
False
A private key of a multiprime RSA:
>>> primes = [2, 3, 5, 7, 11, 13]
>>> e = 7
>>> args = primes + [e]
>>> rsa_private_key(*args)
(30030, 823)
See Also
========
rsa_public_key
encipher_rsa
decipher_rsa
References
==========
.. [1] https://en.wikipedia.org/wiki/RSA_%28cryptosystem%29
.. [2] http://cacr.uwaterloo.ca/techreports/2006/cacr2006-16.pdf
.. [3] https://link.springer.com/content/pdf/10.1007%2FBFb0055738.pdf
.. [4] http://www.itiis.org/digital-library/manuscript/1381
"""
return _rsa_key(*args, public=False, private=True, **kwargs)
def _encipher_decipher_rsa(i, key, factors=None):
n, d = key
if not factors:
return pow(i, d, n)
def _is_coprime_set(l):
is_coprime_set = True
for i in range(len(l)):
for j in range(i+1, len(l)):
if igcd(l[i], l[j]) != 1:
is_coprime_set = False
break
return is_coprime_set
prod = reduce(lambda i, j: i*j, factors)
if prod == n and _is_coprime_set(factors):
return _decipher_rsa_crt(i, d, factors)
return _encipher_decipher_rsa(i, key, factors=None)
def encipher_rsa(i, key, factors=None):
r"""Encrypt the plaintext with RSA.
Parameters
==========
i : integer
The plaintext to be encrypted for.
key : (n, e) where n, e are integers
`n` is the modulus of the key and `e` is the exponent of the
key. The encryption is computed by `i^e \bmod n`.
The key can either be a public key or a private key, however,
the message encrypted by a public key can only be decrypted by
a private key, and vice versa, as RSA is an asymmetric
cryptography system.
factors : list of coprime integers
This is identical to the keyword ``factors`` in
:meth:`decipher_rsa`.
Notes
=====
Some specifications may make the RSA not cryptographically
meaningful.
For example, `0`, `1` will remain always same after taking any
number of exponentiation, thus, should be avoided.
Furthermore, if `i^e < n`, `i` may easily be figured out by taking
`e` th root.
And also, specifying the exponent as `1` or in more generalized form
as `1 + k \lambda(n)` where `k` is an nonnegative integer,
`\lambda` is a carmichael totient, the RSA becomes an identity
mapping.
Examples
========
>>> from sympy.crypto.crypto import encipher_rsa
>>> from sympy.crypto.crypto import rsa_public_key, rsa_private_key
Public Key Encryption:
>>> p, q, e = 3, 5, 7
>>> puk = rsa_public_key(p, q, e)
>>> msg = 12
>>> encipher_rsa(msg, puk)
3
Private Key Encryption:
>>> p, q, e = 3, 5, 7
>>> prk = rsa_private_key(p, q, e)
>>> msg = 12
>>> encipher_rsa(msg, prk)
3
Encryption using chinese remainder theorem:
>>> encipher_rsa(msg, prk, factors=[p, q])
3
"""
return _encipher_decipher_rsa(i, key, factors=factors)
def decipher_rsa(i, key, factors=None):
r"""Decrypt the ciphertext with RSA.
Parameters
==========
i : integer
The ciphertext to be decrypted for.
key : (n, d) where n, d are integers
`n` is the modulus of the key and `d` is the exponent of the
key. The decryption is computed by `i^d \bmod n`.
The key can either be a public key or a private key, however,
the message encrypted by a public key can only be decrypted by
a private key, and vice versa, as RSA is an asymmetric
cryptography system.
factors : list of coprime integers
As the modulus `n` created from RSA key generation is composed
of arbitrary prime factors
`n = {p_1}^{k_1}{p_2}^{k_2}...{p_n}^{k_n}` where
`p_1, p_2, ..., p_n` are distinct primes and
`k_1, k_2, ..., k_n` are positive integers, chinese remainder
theorem can be used to compute `i^d \bmod n` from the
fragmented modulo operations like
.. math::
i^d \bmod {p_1}^{k_1}, i^d \bmod {p_2}^{k_2}, ... ,
i^d \bmod {p_n}^{k_n}
or like
.. math::
i^d \bmod {p_1}^{k_1}{p_2}^{k_2},
i^d \bmod {p_3}^{k_3}, ... ,
i^d \bmod {p_n}^{k_n}
as long as every moduli does not share any common divisor each
other.
The raw primes used in generating the RSA key pair can be a good
option.
Note that the speed advantage of using this is only viable for
very large cases (Like 2048-bit RSA keys) since the
overhead of using pure python implementation of
:meth:`sympy.ntheory.modular.crt` may overcompensate the
theoritical speed advantage.
Notes
=====
See the ``Notes`` section in the documentation of
:meth:`encipher_rsa`
Examples
========
>>> from sympy.crypto.crypto import decipher_rsa, encipher_rsa
>>> from sympy.crypto.crypto import rsa_public_key, rsa_private_key
Public Key Encryption and Decryption:
>>> p, q, e = 3, 5, 7
>>> prk = rsa_private_key(p, q, e)
>>> puk = rsa_public_key(p, q, e)
>>> msg = 12
>>> new_msg = encipher_rsa(msg, prk)
>>> new_msg
3
>>> decipher_rsa(new_msg, puk)
12
Private Key Encryption and Decryption:
>>> p, q, e = 3, 5, 7
>>> prk = rsa_private_key(p, q, e)
>>> puk = rsa_public_key(p, q, e)
>>> msg = 12
>>> new_msg = encipher_rsa(msg, puk)
>>> new_msg
3
>>> decipher_rsa(new_msg, prk)
12
Decryption using chinese remainder theorem:
>>> decipher_rsa(new_msg, prk, factors=[p, q])
12
"""
return _encipher_decipher_rsa(i, key, factors=factors)
#################### kid krypto (kid RSA) #############################
def kid_rsa_public_key(a, b, A, B):
r"""
Kid RSA is a version of RSA useful to teach grade school children
since it does not involve exponentiation.
Alice wants to talk to Bob. Bob generates keys as follows.
Key generation:
* Select positive integers `a, b, A, B` at random.
* Compute `M = a b - 1`, `e = A M + a`, `d = B M + b`,
`n = (e d - 1)//M`.
* The *public key* is `(n, e)`. Bob sends these to Alice.
* The *private key* is `(n, d)`, which Bob keeps secret.
Encryption: If `p` is the plaintext message then the
ciphertext is `c = p e \pmod n`.
Decryption: If `c` is the ciphertext message then the
plaintext is `p = c d \pmod n`.
Examples
========
>>> from sympy.crypto.crypto import kid_rsa_public_key
>>> a, b, A, B = 3, 4, 5, 6
>>> kid_rsa_public_key(a, b, A, B)
(369, 58)
"""
M = a*b - 1
e = A*M + a
d = B*M + b
n = (e*d - 1)//M
return n, e
def kid_rsa_private_key(a, b, A, B):
"""
Compute `M = a b - 1`, `e = A M + a`, `d = B M + b`,
`n = (e d - 1) / M`. The *private key* is `d`, which Bob
keeps secret.
Examples
========
>>> from sympy.crypto.crypto import kid_rsa_private_key
>>> a, b, A, B = 3, 4, 5, 6
>>> kid_rsa_private_key(a, b, A, B)
(369, 70)
"""
M = a*b - 1
e = A*M + a
d = B*M + b
n = (e*d - 1)//M
return n, d
def encipher_kid_rsa(msg, key):
"""
Here ``msg`` is the plaintext and ``key`` is the public key.
Examples
========
>>> from sympy.crypto.crypto import (
... encipher_kid_rsa, kid_rsa_public_key)
>>> msg = 200
>>> a, b, A, B = 3, 4, 5, 6
>>> key = kid_rsa_public_key(a, b, A, B)
>>> encipher_kid_rsa(msg, key)
161
"""
n, e = key
return (msg*e) % n
def decipher_kid_rsa(msg, key):
"""
Here ``msg`` is the plaintext and ``key`` is the private key.
Examples
========
>>> from sympy.crypto.crypto import (
... kid_rsa_public_key, kid_rsa_private_key,
... decipher_kid_rsa, encipher_kid_rsa)
>>> a, b, A, B = 3, 4, 5, 6
>>> d = kid_rsa_private_key(a, b, A, B)
>>> msg = 200
>>> pub = kid_rsa_public_key(a, b, A, B)
>>> pri = kid_rsa_private_key(a, b, A, B)
>>> ct = encipher_kid_rsa(msg, pub)
>>> decipher_kid_rsa(ct, pri)
200
"""
n, d = key
return (msg*d) % n
#################### Morse Code ######################################
morse_char = {
".-": "A", "-...": "B",
"-.-.": "C", "-..": "D",
".": "E", "..-.": "F",
"--.": "G", "....": "H",
"..": "I", ".---": "J",
"-.-": "K", ".-..": "L",
"--": "M", "-.": "N",
"---": "O", ".--.": "P",
"--.-": "Q", ".-.": "R",
"...": "S", "-": "T",
"..-": "U", "...-": "V",
".--": "W", "-..-": "X",
"-.--": "Y", "--..": "Z",
"-----": "0", ".----": "1",
"..---": "2", "...--": "3",
"....-": "4", ".....": "5",
"-....": "6", "--...": "7",
"---..": "8", "----.": "9",
".-.-.-": ".", "--..--": ",",
"---...": ":", "-.-.-.": ";",
"..--..": "?", "-....-": "-",
"..--.-": "_", "-.--.": "(",
"-.--.-": ")", ".----.": "'",
"-...-": "=", ".-.-.": "+",
"-..-.": "/", ".--.-.": "@",
"...-..-": "$", "-.-.--": "!"}
char_morse = {v: k for k, v in morse_char.items()}
def encode_morse(msg, sep='|', mapping=None):
"""
Encodes a plaintext into popular Morse Code with letters
separated by `sep` and words by a double `sep`.
Examples
========
>>> from sympy.crypto.crypto import encode_morse
>>> msg = 'ATTACK RIGHT FLANK'
>>> encode_morse(msg)
'.-|-|-|.-|-.-.|-.-||.-.|..|--.|....|-||..-.|.-..|.-|-.|-.-'
References
==========
.. [1] https://en.wikipedia.org/wiki/Morse_code
"""
mapping = mapping or char_morse
assert sep not in mapping
word_sep = 2*sep
mapping[" "] = word_sep
suffix = msg and msg[-1] in whitespace
# normalize whitespace
msg = (' ' if word_sep else '').join(msg.split())
# omit unmapped chars
chars = set(''.join(msg.split()))
ok = set(mapping.keys())
msg = translate(msg, None, ''.join(chars - ok))
morsestring = []
words = msg.split()
for word in words:
morseword = []
for letter in word:
morseletter = mapping[letter]
morseword.append(morseletter)
word = sep.join(morseword)
morsestring.append(word)
return word_sep.join(morsestring) + (word_sep if suffix else '')
def decode_morse(msg, sep='|', mapping=None):
"""
Decodes a Morse Code with letters separated by `sep`
(default is '|') and words by `word_sep` (default is '||)
into plaintext.
Examples
========
>>> from sympy.crypto.crypto import decode_morse
>>> mc = '--|---|...-|.||.|.-|...|-'
>>> decode_morse(mc)
'MOVE EAST'
References
==========
.. [1] https://en.wikipedia.org/wiki/Morse_code
"""
mapping = mapping or morse_char
word_sep = 2*sep
characterstring = []
words = msg.strip(word_sep).split(word_sep)
for word in words:
letters = word.split(sep)
chars = [mapping[c] for c in letters]
word = ''.join(chars)
characterstring.append(word)
rv = " ".join(characterstring)
return rv
#################### LFSRs ##########################################
def lfsr_sequence(key, fill, n):
r"""
This function creates an LFSR sequence.
Parameters
==========
key : list
A list of finite field elements, `[c_0, c_1, \ldots, c_k].`
fill : list
The list of the initial terms of the LFSR sequence,
`[x_0, x_1, \ldots, x_k].`
n
Number of terms of the sequence that the function returns.
Returns
=======
L
The LFSR sequence defined by
`x_{n+1} = c_k x_n + \ldots + c_0 x_{n-k}`, for
`n \leq k`.
Notes
=====
S. Golomb [G]_ gives a list of three statistical properties a
sequence of numbers `a = \{a_n\}_{n=1}^\infty`,
`a_n \in \{0,1\}`, should display to be considered
"random". Define the autocorrelation of `a` to be
.. math::
C(k) = C(k,a) = \lim_{N\rightarrow \infty} {1\over N}\sum_{n=1}^N (-1)^{a_n + a_{n+k}}.
In the case where `a` is periodic with period
`P` then this reduces to
.. math::
C(k) = {1\over P}\sum_{n=1}^P (-1)^{a_n + a_{n+k}}.
Assume `a` is periodic with period `P`.
- balance:
.. math::
\left|\sum_{n=1}^P(-1)^{a_n}\right| \leq 1.
- low autocorrelation:
.. math::
C(k) = \left\{ \begin{array}{cc} 1,& k = 0,\\ \epsilon, & k \ne 0. \end{array} \right.
(For sequences satisfying these first two properties, it is known
that `\epsilon = -1/P` must hold.)
- proportional runs property: In each period, half the runs have
length `1`, one-fourth have length `2`, etc.
Moreover, there are as many runs of `1`'s as there are of
`0`'s.
Examples
========
>>> from sympy.crypto.crypto import lfsr_sequence
>>> from sympy.polys.domains import FF
>>> F = FF(2)
>>> fill = [F(1), F(1), F(0), F(1)]
>>> key = [F(1), F(0), F(0), F(1)]
>>> lfsr_sequence(key, fill, 10)
[1 mod 2, 1 mod 2, 0 mod 2, 1 mod 2, 0 mod 2,
1 mod 2, 1 mod 2, 0 mod 2, 0 mod 2, 1 mod 2]
References
==========
.. [G] Solomon Golomb, Shift register sequences, Aegean Park Press,
Laguna Hills, Ca, 1967
"""
if not isinstance(key, list):
raise TypeError("key must be a list")
if not isinstance(fill, list):
raise TypeError("fill must be a list")
p = key[0].mod
F = FF(p)
s = fill
k = len(fill)
L = []
for i in range(n):
s0 = s[:]
L.append(s[0])
s = s[1:k]
x = sum([int(key[i]*s0[i]) for i in range(k)])
s.append(F(x))
return L # use [x.to_int() for x in L] for int version
def lfsr_autocorrelation(L, P, k):
"""
This function computes the LFSR autocorrelation function.
Parameters
==========
L
A periodic sequence of elements of `GF(2)`.
L must have length larger than P.
P
The period of L.
k : int
An integer `k` (`0 < k < P`).
Returns
=======
autocorrelation
The k-th value of the autocorrelation of the LFSR L.
Examples
========
>>> from sympy.crypto.crypto import (
... lfsr_sequence, lfsr_autocorrelation)
>>> from sympy.polys.domains import FF
>>> F = FF(2)
>>> fill = [F(1), F(1), F(0), F(1)]
>>> key = [F(1), F(0), F(0), F(1)]
>>> s = lfsr_sequence(key, fill, 20)
>>> lfsr_autocorrelation(s, 15, 7)
-1/15
>>> lfsr_autocorrelation(s, 15, 0)
1
"""
if not isinstance(L, list):
raise TypeError("L (=%s) must be a list" % L)
P = int(P)
k = int(k)
L0 = L[:P] # slices makes a copy
L1 = L0 + L0[:k]
L2 = [(-1)**(L1[i].to_int() + L1[i + k].to_int()) for i in range(P)]
tot = sum(L2)
return Rational(tot, P)
def lfsr_connection_polynomial(s):
"""
This function computes the LFSR connection polynomial.
Parameters
==========
s
A sequence of elements of even length, with entries in a finite
field.
Returns
=======
C(x)
The connection polynomial of a minimal LFSR yielding s.
This implements the algorithm in section 3 of J. L. Massey's
article [M]_.
Examples
========
>>> from sympy.crypto.crypto import (
... lfsr_sequence, lfsr_connection_polynomial)
>>> from sympy.polys.domains import FF
>>> F = FF(2)
>>> fill = [F(1), F(1), F(0), F(1)]
>>> key = [F(1), F(0), F(0), F(1)]
>>> s = lfsr_sequence(key, fill, 20)
>>> lfsr_connection_polynomial(s)
x**4 + x + 1
>>> fill = [F(1), F(0), F(0), F(1)]
>>> key = [F(1), F(1), F(0), F(1)]
>>> s = lfsr_sequence(key, fill, 20)
>>> lfsr_connection_polynomial(s)
x**3 + 1
>>> fill = [F(1), F(0), F(1)]
>>> key = [F(1), F(1), F(0)]
>>> s = lfsr_sequence(key, fill, 20)
>>> lfsr_connection_polynomial(s)
x**3 + x**2 + 1
>>> fill = [F(1), F(0), F(1)]
>>> key = [F(1), F(0), F(1)]
>>> s = lfsr_sequence(key, fill, 20)
>>> lfsr_connection_polynomial(s)
x**3 + x + 1
References
==========
.. [M] James L. Massey, "Shift-Register Synthesis and BCH Decoding."
IEEE Trans. on Information Theory, vol. 15(1), pp. 122-127,
Jan 1969.
"""
# Initialization:
p = s[0].mod
x = Symbol("x")
C = 1*x**0
B = 1*x**0
m = 1
b = 1*x**0
L = 0
N = 0
while N < len(s):
if L > 0:
dC = Poly(C).degree()
r = min(L + 1, dC + 1)
coeffsC = [C.subs(x, 0)] + [C.coeff(x**i)
for i in range(1, dC + 1)]
d = (s[N].to_int() + sum([coeffsC[i]*s[N - i].to_int()
for i in range(1, r)])) % p
if L == 0:
d = s[N].to_int()*x**0
if d == 0:
m += 1
N += 1
if d > 0:
if 2*L > N:
C = (C - d*((b**(p - 2)) % p)*x**m*B).expand()
m += 1
N += 1
else:
T = C
C = (C - d*((b**(p - 2)) % p)*x**m*B).expand()
L = N + 1 - L
m = 1
b = d
B = T
N += 1
dC = Poly(C).degree()
coeffsC = [C.subs(x, 0)] + [C.coeff(x**i) for i in range(1, dC + 1)]
return sum([coeffsC[i] % p*x**i for i in range(dC + 1)
if coeffsC[i] is not None])
#################### ElGamal #############################
def elgamal_private_key(digit=10, seed=None):
r"""
Return three number tuple as private key.
Elgamal encryption is based on the mathmatical problem
called the Discrete Logarithm Problem (DLP). For example,
`a^{b} \equiv c \pmod p`
In general, if ``a`` and ``b`` are known, ``ct`` is easily
calculated. If ``b`` is unknown, it is hard to use
``a`` and ``ct`` to get ``b``.
Parameters
==========
digit : int
Minimum number of binary digits for key.
Returns
=======
tuple : (p, r, d)
p = prime number.
r = primitive root.
d = random number.
Notes
=====
For testing purposes, the ``seed`` parameter may be set to control
the output of this routine. See sympy.testing.randtest._randrange.
Examples
========
>>> from sympy.crypto.crypto import elgamal_private_key
>>> from sympy.ntheory import is_primitive_root, isprime
>>> a, b, _ = elgamal_private_key()
>>> isprime(a)
True
>>> is_primitive_root(b, a)
True
"""
randrange = _randrange(seed)
p = nextprime(2**digit)
return p, primitive_root(p), randrange(2, p)
def elgamal_public_key(key):
r"""
Return three number tuple as public key.
Parameters
==========
key : (p, r, e)
Tuple generated by ``elgamal_private_key``.
Returns
=======
tuple : (p, r, e)
`e = r**d \bmod p`
`d` is a random number in private key.
Examples
========
>>> from sympy.crypto.crypto import elgamal_public_key
>>> elgamal_public_key((1031, 14, 636))
(1031, 14, 212)
"""
p, r, e = key
return p, r, pow(r, e, p)
def encipher_elgamal(i, key, seed=None):
r"""
Encrypt message with public key
``i`` is a plaintext message expressed as an integer.
``key`` is public key (p, r, e). In order to encrypt
a message, a random number ``a`` in ``range(2, p)``
is generated and the encryped message is returned as
`c_{1}` and `c_{2}` where:
`c_{1} \equiv r^{a} \pmod p`
`c_{2} \equiv m e^{a} \pmod p`
Parameters
==========
msg
int of encoded message.
key
Public key.
Returns
=======
tuple : (c1, c2)
Encipher into two number.
Notes
=====
For testing purposes, the ``seed`` parameter may be set to control
the output of this routine. See sympy.testing.randtest._randrange.
Examples
========
>>> from sympy.crypto.crypto import encipher_elgamal, elgamal_private_key, elgamal_public_key
>>> pri = elgamal_private_key(5, seed=[3]); pri
(37, 2, 3)
>>> pub = elgamal_public_key(pri); pub
(37, 2, 8)
>>> msg = 36
>>> encipher_elgamal(msg, pub, seed=[3])
(8, 6)
"""
p, r, e = key
if i < 0 or i >= p:
raise ValueError(
'Message (%s) should be in range(%s)' % (i, p))
randrange = _randrange(seed)
a = randrange(2, p)
return pow(r, a, p), i*pow(e, a, p) % p
def decipher_elgamal(msg, key):
r"""
Decrypt message with private key
`msg = (c_{1}, c_{2})`
`key = (p, r, d)`
According to extended Eucliden theorem,
`u c_{1}^{d} + p n = 1`
`u \equiv 1/{{c_{1}}^d} \pmod p`
`u c_{2} \equiv \frac{1}{c_{1}^d} c_{2} \equiv \frac{1}{r^{ad}} c_{2} \pmod p`
`\frac{1}{r^{ad}} m e^a \equiv \frac{1}{r^{ad}} m {r^{d a}} \equiv m \pmod p`
Examples
========
>>> from sympy.crypto.crypto import decipher_elgamal
>>> from sympy.crypto.crypto import encipher_elgamal
>>> from sympy.crypto.crypto import elgamal_private_key
>>> from sympy.crypto.crypto import elgamal_public_key
>>> pri = elgamal_private_key(5, seed=[3])
>>> pub = elgamal_public_key(pri); pub
(37, 2, 8)
>>> msg = 17
>>> decipher_elgamal(encipher_elgamal(msg, pub), pri) == msg
True
"""
p, _, d = key
c1, c2 = msg
u = igcdex(c1**d, p)[0]
return u * c2 % p
################ Diffie-Hellman Key Exchange #########################
def dh_private_key(digit=10, seed=None):
r"""
Return three integer tuple as private key.
Diffie-Hellman key exchange is based on the mathematical problem
called the Discrete Logarithm Problem (see ElGamal).
Diffie-Hellman key exchange is divided into the following steps:
* Alice and Bob agree on a base that consist of a prime ``p``
and a primitive root of ``p`` called ``g``
* Alice choses a number ``a`` and Bob choses a number ``b`` where
``a`` and ``b`` are random numbers in range `[2, p)`. These are
their private keys.
* Alice then publicly sends Bob `g^{a} \pmod p` while Bob sends
Alice `g^{b} \pmod p`
* They both raise the received value to their secretly chosen
number (``a`` or ``b``) and now have both as their shared key
`g^{ab} \pmod p`
Parameters
==========
digit
Minimum number of binary digits required in key.
Returns
=======
tuple : (p, g, a)
p = prime number.
g = primitive root of p.
a = random number from 2 through p - 1.
Notes
=====
For testing purposes, the ``seed`` parameter may be set to control
the output of this routine. See sympy.testing.randtest._randrange.
Examples
========
>>> from sympy.crypto.crypto import dh_private_key
>>> from sympy.ntheory import isprime, is_primitive_root
>>> p, g, _ = dh_private_key()
>>> isprime(p)
True
>>> is_primitive_root(g, p)
True
>>> p, g, _ = dh_private_key(5)
>>> isprime(p)
True
>>> is_primitive_root(g, p)
True
"""
p = nextprime(2**digit)
g = primitive_root(p)
randrange = _randrange(seed)
a = randrange(2, p)
return p, g, a
def dh_public_key(key):
r"""
Return three number tuple as public key.
This is the tuple that Alice sends to Bob.
Parameters
==========
key : (p, g, a)
A tuple generated by ``dh_private_key``.
Returns
=======
tuple : int, int, int
A tuple of `(p, g, g^a \mod p)` with `p`, `g` and `a` given as
parameters.s
Examples
========
>>> from sympy.crypto.crypto import dh_private_key, dh_public_key
>>> p, g, a = dh_private_key();
>>> _p, _g, x = dh_public_key((p, g, a))
>>> p == _p and g == _g
True
>>> x == pow(g, a, p)
True
"""
p, g, a = key
return p, g, pow(g, a, p)
def dh_shared_key(key, b):
"""
Return an integer that is the shared key.
This is what Bob and Alice can both calculate using the public
keys they received from each other and their private keys.
Parameters
==========
key : (p, g, x)
Tuple `(p, g, x)` generated by ``dh_public_key``.
b
Random number in the range of `2` to `p - 1`
(Chosen by second key exchange member (Bob)).
Returns
=======
int
A shared key.
Examples
========
>>> from sympy.crypto.crypto import (
... dh_private_key, dh_public_key, dh_shared_key)
>>> prk = dh_private_key();
>>> p, g, x = dh_public_key(prk);
>>> sk = dh_shared_key((p, g, x), 1000)
>>> sk == pow(x, 1000, p)
True
"""
p, _, x = key
if 1 >= b or b >= p:
raise ValueError(filldedent('''
Value of b should be greater 1 and less
than prime %s.''' % p))
return pow(x, b, p)
################ Goldwasser-Micali Encryption #########################
def _legendre(a, p):
"""
Returns the legendre symbol of a and p
assuming that p is a prime
i.e. 1 if a is a quadratic residue mod p
-1 if a is not a quadratic residue mod p
0 if a is divisible by p
Parameters
==========
a : int
The number to test.
p : prime
The prime to test ``a`` against.
Returns
=======
int
Legendre symbol (a / p).
"""
sig = pow(a, (p - 1)//2, p)
if sig == 1:
return 1
elif sig == 0:
return 0
else:
return -1
def _random_coprime_stream(n, seed=None):
randrange = _randrange(seed)
while True:
y = randrange(n)
if gcd(y, n) == 1:
yield y
def gm_private_key(p, q, a=None):
"""
Check if p and q can be used as private keys for
the Goldwasser-Micali encryption. The method works
roughly as follows.
Pick two large primes p ands q. Call their product N.
Given a message as an integer i, write i in its
bit representation b_0,...,b_n. For each k,
if b_k = 0:
let a_k be a random square
(quadratic residue) modulo p * q
such that jacobi_symbol(a, p * q) = 1
if b_k = 1:
let a_k be a random non-square
(non-quadratic residue) modulo p * q
such that jacobi_symbol(a, p * q) = 1
return [a_1, a_2,...]
b_k can be recovered by checking whether or not
a_k is a residue. And from the b_k's, the message
can be reconstructed.
The idea is that, while jacobi_symbol(a, p * q)
can be easily computed (and when it is equal to -1 will
tell you that a is not a square mod p * q), quadratic
residuosity modulo a composite number is hard to compute
without knowing its factorization.
Moreover, approximately half the numbers coprime to p * q have
jacobi_symbol equal to 1. And among those, approximately half
are residues and approximately half are not. This maximizes the
entropy of the code.
Parameters
==========
p, q, a
Initialization variables.
Returns
=======
tuple : (p, q)
The input value ``p`` and ``q``.
Raises
======
ValueError
If ``p`` and ``q`` are not distinct odd primes.
"""
if p == q:
raise ValueError("expected distinct primes, "
"got two copies of %i" % p)
elif not isprime(p) or not isprime(q):
raise ValueError("first two arguments must be prime, "
"got %i of %i" % (p, q))
elif p == 2 or q == 2:
raise ValueError("first two arguments must not be even, "
"got %i of %i" % (p, q))
return p, q
def gm_public_key(p, q, a=None, seed=None):
"""
Compute public keys for p and q.
Note that in Goldwasser-Micali Encryption,
public keys are randomly selected.
Parameters
==========
p, q, a : int, int, int
Initialization variables.
Returns
=======
tuple : (a, N)
``a`` is the input ``a`` if it is not ``None`` otherwise
some random integer coprime to ``p`` and ``q``.
``N`` is the product of ``p`` and ``q``.
"""
p, q = gm_private_key(p, q)
N = p * q
if a is None:
randrange = _randrange(seed)
while True:
a = randrange(N)
if _legendre(a, p) == _legendre(a, q) == -1:
break
else:
if _legendre(a, p) != -1 or _legendre(a, q) != -1:
return False
return (a, N)
def encipher_gm(i, key, seed=None):
"""
Encrypt integer 'i' using public_key 'key'
Note that gm uses random encryption.
Parameters
==========
i : int
The message to encrypt.
key : (a, N)
The public key.
Returns
=======
list : list of int
The randomized encrypted message.
"""
if i < 0:
raise ValueError(
"message must be a non-negative "
"integer: got %d instead" % i)
a, N = key
bits = []
while i > 0:
bits.append(i % 2)
i //= 2
gen = _random_coprime_stream(N, seed)
rev = reversed(bits)
encode = lambda b: next(gen)**2*pow(a, b) % N
return [ encode(b) for b in rev ]
def decipher_gm(message, key):
"""
Decrypt message 'message' using public_key 'key'.
Parameters
==========
message : list of int
The randomized encrypted message.
key : (p, q)
The private key.
Returns
=======
int
The encrypted message.
"""
p, q = key
res = lambda m, p: _legendre(m, p) > 0
bits = [res(m, p) * res(m, q) for m in message]
m = 0
for b in bits:
m <<= 1
m += not b
return m
########### RailFence Cipher #############
def encipher_railfence(message,rails):
"""
Performs Railfence Encryption on plaintext and returns ciphertext
Examples
========
>>> from sympy.crypto.crypto import encipher_railfence
>>> message = "hello world"
>>> encipher_railfence(message,3)
'horel ollwd'
Parameters
==========
message : string, the message to encrypt.
rails : int, the number of rails.
Returns
=======
The Encrypted string message.
References
==========
.. [1] https://en.wikipedia.org/wiki/Rail_fence_cipher
"""
r = list(range(rails))
p = cycle(r + r[-2:0:-1])
return ''.join(sorted(message, key=lambda i: next(p)))
def decipher_railfence(ciphertext,rails):
"""
Decrypt the message using the given rails
Examples
========
>>> from sympy.crypto.crypto import decipher_railfence
>>> decipher_railfence("horel ollwd",3)
'hello world'
Parameters
==========
message : string, the message to encrypt.
rails : int, the number of rails.
Returns
=======
The Decrypted string message.
"""
r = list(range(rails))
p = cycle(r + r[-2:0:-1])
idx = sorted(range(len(ciphertext)), key=lambda i: next(p))
res = [''] * len(ciphertext)
for i, c in zip(idx, ciphertext):
res[i] = c
return ''.join(res)
################ Blum-Goldwasser cryptosystem #########################
def bg_private_key(p, q):
"""
Check if p and q can be used as private keys for
the Blum-Goldwasser cryptosystem.
The three necessary checks for p and q to pass
so that they can be used as private keys:
1. p and q must both be prime
2. p and q must be distinct
3. p and q must be congruent to 3 mod 4
Parameters
==========
p, q
The keys to be checked.
Returns
=======
p, q
Input values.
Raises
======
ValueError
If p and q do not pass the above conditions.
"""
if not isprime(p) or not isprime(q):
raise ValueError("the two arguments must be prime, "
"got %i and %i" %(p, q))
elif p == q:
raise ValueError("the two arguments must be distinct, "
"got two copies of %i. " %p)
elif (p - 3) % 4 != 0 or (q - 3) % 4 != 0:
raise ValueError("the two arguments must be congruent to 3 mod 4, "
"got %i and %i" %(p, q))
return p, q
def bg_public_key(p, q):
"""
Calculates public keys from private keys.
The function first checks the validity of
private keys passed as arguments and
then returns their product.
Parameters
==========
p, q
The private keys.
Returns
=======
N
The public key.
"""
p, q = bg_private_key(p, q)
N = p * q
return N
def encipher_bg(i, key, seed=None):
"""
Encrypts the message using public key and seed.
ALGORITHM:
1. Encodes i as a string of L bits, m.
2. Select a random element r, where 1 < r < key, and computes
x = r^2 mod key.
3. Use BBS pseudo-random number generator to generate L random bits, b,
using the initial seed as x.
4. Encrypted message, c_i = m_i XOR b_i, 1 <= i <= L.
5. x_L = x^(2^L) mod key.
6. Return (c, x_L)
Parameters
==========
i
Message, a non-negative integer
key
The public key
Returns
=======
Tuple
(encrypted_message, x_L)
Raises
======
ValueError
If i is negative.
"""
if i < 0:
raise ValueError(
"message must be a non-negative "
"integer: got %d instead" % i)
enc_msg = []
while i > 0:
enc_msg.append(i % 2)
i //= 2
enc_msg.reverse()
L = len(enc_msg)
r = _randint(seed)(2, key - 1)
x = r**2 % key
x_L = pow(int(x), int(2**L), int(key))
rand_bits = []
for _ in range(L):
rand_bits.append(x % 2)
x = x**2 % key
encrypt_msg = [m ^ b for (m, b) in zip(enc_msg, rand_bits)]
return (encrypt_msg, x_L)
def decipher_bg(message, key):
"""
Decrypts the message using private keys.
ALGORITHM:
1. Let, c be the encrypted message, y the second number received,
and p and q be the private keys.
2. Compute, r_p = y^((p+1)/4 ^ L) mod p and
r_q = y^((q+1)/4 ^ L) mod q.
3. Compute x_0 = (q(q^-1 mod p)r_p + p(p^-1 mod q)r_q) mod N.
4. From, recompute the bits using the BBS generator, as in the
encryption algorithm.
5. Compute original message by XORing c and b.
Parameters
==========
message
Tuple of encrypted message and a non-negative integer.
key
Tuple of private keys.
Returns
=======
orig_msg
The original message
"""
p, q = key
encrypt_msg, y = message
public_key = p * q
L = len(encrypt_msg)
p_t = ((p + 1)/4)**L
q_t = ((q + 1)/4)**L
r_p = pow(int(y), int(p_t), int(p))
r_q = pow(int(y), int(q_t), int(q))
x = (q * mod_inverse(q, p) * r_p + p * mod_inverse(p, q) * r_q) % public_key
orig_bits = []
for _ in range(L):
orig_bits.append(x % 2)
x = x**2 % public_key
orig_msg = 0
for (m, b) in zip(encrypt_msg, orig_bits):
orig_msg = orig_msg * 2
orig_msg += (m ^ b)
return orig_msg
|
43ed6b6ea6294ab272c1440be175d66bb13769e494e9f7911e213caa745fcab0 | from __future__ import print_function, division
from typing import Dict, Callable
from sympy.core import S, Add, Expr, Basic, Mul
from sympy.logic.boolalg import Boolean
from sympy.assumptions import Q, ask # type: ignore
def refine(expr, assumptions=True):
"""
Simplify an expression using assumptions.
Gives the form of expr that would be obtained if symbols
in it were replaced by explicit numerical expressions satisfying
the assumptions.
Examples
========
>>> from sympy import refine, sqrt, Q
>>> from sympy.abc import x
>>> refine(sqrt(x**2), Q.real(x))
Abs(x)
>>> refine(sqrt(x**2), Q.positive(x))
x
"""
if not isinstance(expr, Basic):
return expr
if not expr.is_Atom:
args = [refine(arg, assumptions) for arg in expr.args]
# TODO: this will probably not work with Integral or Polynomial
expr = expr.func(*args)
if hasattr(expr, '_eval_refine'):
ref_expr = expr._eval_refine(assumptions)
if ref_expr is not None:
return ref_expr
name = expr.__class__.__name__
handler = handlers_dict.get(name, None)
if handler is None:
return expr
new_expr = handler(expr, assumptions)
if (new_expr is None) or (expr == new_expr):
return expr
if not isinstance(new_expr, Expr):
return new_expr
return refine(new_expr, assumptions)
def refine_abs(expr, assumptions):
"""
Handler for the absolute value.
Examples
========
>>> from sympy import Symbol, Q, refine, Abs
>>> from sympy.assumptions.refine import refine_abs
>>> from sympy.abc import x
>>> refine_abs(Abs(x), Q.real(x))
>>> refine_abs(Abs(x), Q.positive(x))
x
>>> refine_abs(Abs(x), Q.negative(x))
-x
"""
from sympy.core.logic import fuzzy_not
from sympy import Abs
arg = expr.args[0]
if ask(Q.real(arg), assumptions) and \
fuzzy_not(ask(Q.negative(arg), assumptions)):
# if it's nonnegative
return arg
if ask(Q.negative(arg), assumptions):
return -arg
# arg is Mul
if isinstance(arg, Mul):
r = [refine(abs(a), assumptions) for a in arg.args]
non_abs = []
in_abs = []
for i in r:
if isinstance(i, Abs):
in_abs.append(i.args[0])
else:
non_abs.append(i)
return Mul(*non_abs) * Abs(Mul(*in_abs))
def refine_Pow(expr, assumptions):
"""
Handler for instances of Pow.
>>> from sympy import Symbol, Q
>>> from sympy.assumptions.refine import refine_Pow
>>> from sympy.abc import x,y,z
>>> refine_Pow((-1)**x, Q.real(x))
>>> refine_Pow((-1)**x, Q.even(x))
1
>>> refine_Pow((-1)**x, Q.odd(x))
-1
For powers of -1, even parts of the exponent can be simplified:
>>> refine_Pow((-1)**(x+y), Q.even(x))
(-1)**y
>>> refine_Pow((-1)**(x+y+z), Q.odd(x) & Q.odd(z))
(-1)**y
>>> refine_Pow((-1)**(x+y+2), Q.odd(x))
(-1)**(y + 1)
>>> refine_Pow((-1)**(x+3), True)
(-1)**(x + 1)
"""
from sympy.core import Pow, Rational
from sympy.functions.elementary.complexes import Abs
from sympy.functions import sign
if isinstance(expr.base, Abs):
if ask(Q.real(expr.base.args[0]), assumptions) and \
ask(Q.even(expr.exp), assumptions):
return expr.base.args[0] ** expr.exp
if ask(Q.real(expr.base), assumptions):
if expr.base.is_number:
if ask(Q.even(expr.exp), assumptions):
return abs(expr.base) ** expr.exp
if ask(Q.odd(expr.exp), assumptions):
return sign(expr.base) * abs(expr.base) ** expr.exp
if isinstance(expr.exp, Rational):
if type(expr.base) is Pow:
return abs(expr.base.base) ** (expr.base.exp * expr.exp)
if expr.base is S.NegativeOne:
if expr.exp.is_Add:
old = expr
# For powers of (-1) we can remove
# - even terms
# - pairs of odd terms
# - a single odd term + 1
# - A numerical constant N can be replaced with mod(N,2)
coeff, terms = expr.exp.as_coeff_add()
terms = set(terms)
even_terms = set([])
odd_terms = set([])
initial_number_of_terms = len(terms)
for t in terms:
if ask(Q.even(t), assumptions):
even_terms.add(t)
elif ask(Q.odd(t), assumptions):
odd_terms.add(t)
terms -= even_terms
if len(odd_terms) % 2:
terms -= odd_terms
new_coeff = (coeff + S.One) % 2
else:
terms -= odd_terms
new_coeff = coeff % 2
if new_coeff != coeff or len(terms) < initial_number_of_terms:
terms.add(new_coeff)
expr = expr.base**(Add(*terms))
# Handle (-1)**((-1)**n/2 + m/2)
e2 = 2*expr.exp
if ask(Q.even(e2), assumptions):
if e2.could_extract_minus_sign():
e2 *= expr.base
if e2.is_Add:
i, p = e2.as_two_terms()
if p.is_Pow and p.base is S.NegativeOne:
if ask(Q.integer(p.exp), assumptions):
i = (i + 1)/2
if ask(Q.even(i), assumptions):
return expr.base**p.exp
elif ask(Q.odd(i), assumptions):
return expr.base**(p.exp + 1)
else:
return expr.base**(p.exp + i)
if old != expr:
return expr
def refine_atan2(expr, assumptions):
"""
Handler for the atan2 function
Examples
========
>>> from sympy import Symbol, Q, refine, atan2
>>> from sympy.assumptions.refine import refine_atan2
>>> from sympy.abc import x, y
>>> refine_atan2(atan2(y,x), Q.real(y) & Q.positive(x))
atan(y/x)
>>> refine_atan2(atan2(y,x), Q.negative(y) & Q.negative(x))
atan(y/x) - pi
>>> refine_atan2(atan2(y,x), Q.positive(y) & Q.negative(x))
atan(y/x) + pi
>>> refine_atan2(atan2(y,x), Q.zero(y) & Q.negative(x))
pi
>>> refine_atan2(atan2(y,x), Q.positive(y) & Q.zero(x))
pi/2
>>> refine_atan2(atan2(y,x), Q.negative(y) & Q.zero(x))
-pi/2
>>> refine_atan2(atan2(y,x), Q.zero(y) & Q.zero(x))
nan
"""
from sympy.functions.elementary.trigonometric import atan
from sympy.core import S
y, x = expr.args
if ask(Q.real(y) & Q.positive(x), assumptions):
return atan(y / x)
elif ask(Q.negative(y) & Q.negative(x), assumptions):
return atan(y / x) - S.Pi
elif ask(Q.positive(y) & Q.negative(x), assumptions):
return atan(y / x) + S.Pi
elif ask(Q.zero(y) & Q.negative(x), assumptions):
return S.Pi
elif ask(Q.positive(y) & Q.zero(x), assumptions):
return S.Pi/2
elif ask(Q.negative(y) & Q.zero(x), assumptions):
return -S.Pi/2
elif ask(Q.zero(y) & Q.zero(x), assumptions):
return S.NaN
else:
return expr
def refine_Relational(expr, assumptions):
"""
Handler for Relational
>>> from sympy.assumptions.refine import refine_Relational
>>> from sympy.assumptions.ask import Q
>>> from sympy.abc import x
>>> refine_Relational(x<0, ~Q.is_true(x<0))
False
"""
return ask(Q.is_true(expr), assumptions)
def refine_re(expr, assumptions):
"""
Handler for real part.
>>> from sympy.assumptions.refine import refine_re
>>> from sympy import Q, re
>>> from sympy.abc import x
>>> refine_re(re(x), Q.real(x))
x
>>> refine_re(re(x), Q.imaginary(x))
0
"""
arg = expr.args[0]
if ask(Q.real(arg), assumptions):
return arg
if ask(Q.imaginary(arg), assumptions):
return S.Zero
return _refine_reim(expr, assumptions)
def refine_im(expr, assumptions):
"""
Handler for imaginary part.
>>> from sympy.assumptions.refine import refine_im
>>> from sympy import Q, im
>>> from sympy.abc import x
>>> refine_im(im(x), Q.real(x))
0
>>> refine_im(im(x), Q.imaginary(x))
-I*x
"""
arg = expr.args[0]
if ask(Q.real(arg), assumptions):
return S.Zero
if ask(Q.imaginary(arg), assumptions):
return - S.ImaginaryUnit * arg
return _refine_reim(expr, assumptions)
def _refine_reim(expr, assumptions):
# Helper function for refine_re & refine_im
expanded = expr.expand(complex = True)
if expanded != expr:
refined = refine(expanded, assumptions)
if refined != expanded:
return refined
# Best to leave the expression as is
return None
def refine_sign(expr, assumptions):
"""
Handler for sign
Examples
========
>>> from sympy.assumptions.refine import refine_sign
>>> from sympy import Symbol, Q, sign, im
>>> x = Symbol('x', real = True)
>>> expr = sign(x)
>>> refine_sign(expr, Q.positive(x) & Q.nonzero(x))
1
>>> refine_sign(expr, Q.negative(x) & Q.nonzero(x))
-1
>>> refine_sign(expr, Q.zero(x))
0
>>> y = Symbol('y', imaginary = True)
>>> expr = sign(y)
>>> refine_sign(expr, Q.positive(im(y)))
I
>>> refine_sign(expr, Q.negative(im(y)))
-I
"""
arg = expr.args[0]
if ask(Q.zero(arg), assumptions):
return S.Zero
if ask(Q.real(arg)):
if ask(Q.positive(arg), assumptions):
return S.One
if ask(Q.negative(arg), assumptions):
return S.NegativeOne
if ask(Q.imaginary(arg)):
arg_re, arg_im = arg.as_real_imag()
if ask(Q.positive(arg_im), assumptions):
return S.ImaginaryUnit
if ask(Q.negative(arg_im), assumptions):
return -S.ImaginaryUnit
return expr
handlers_dict = {
'Abs': refine_abs,
'Pow': refine_Pow,
'atan2': refine_atan2,
'Equality': refine_Relational,
'Unequality': refine_Relational,
'GreaterThan': refine_Relational,
'LessThan': refine_Relational,
'StrictGreaterThan': refine_Relational,
'StrictLessThan': refine_Relational,
're': refine_re,
'im': refine_im,
'sign': refine_sign
} # type: Dict[str, Callable[[Expr, Boolean], Expr]]
|
c484c0e5a228a22972df152b3a3a23c02b3843087042cae72cc0104d3a845bc6 | """Module for querying SymPy objects about assumptions."""
from __future__ import print_function, division
from sympy.assumptions.assume import (global_assumptions, Predicate,
AppliedPredicate)
from sympy.core import sympify
from sympy.core.cache import cacheit
from sympy.core.relational import Relational
from sympy.logic.boolalg import (to_cnf, And, Not, Or, Implies, Equivalent,
BooleanFunction, BooleanAtom)
from sympy.logic.inference import satisfiable
from sympy.utilities.decorator import memoize_property
from sympy.assumptions.cnf import CNF, EncodedCNF, Literal
# Memoization is necessary for the properties of AssumptionKeys to
# ensure that only one object of Predicate objects are created.
# This is because assumption handlers are registered on those objects.
class AssumptionKeys(object):
"""
This class contains all the supported keys by ``ask``. It should be accessed via the instance ``sympy.Q``.
"""
@memoize_property
def hermitian(self):
"""
Hermitian predicate.
``ask(Q.hermitian(x))`` is true iff ``x`` belongs to the set of
Hermitian operators.
References
==========
.. [1] http://mathworld.wolfram.com/HermitianOperator.html
"""
# TODO: Add examples
return Predicate('hermitian')
@memoize_property
def antihermitian(self):
"""
Antihermitian predicate.
``Q.antihermitian(x)`` is true iff ``x`` belongs to the field of
antihermitian operators, i.e., operators in the form ``x*I``, where
``x`` is Hermitian.
References
==========
.. [1] http://mathworld.wolfram.com/HermitianOperator.html
"""
# TODO: Add examples
return Predicate('antihermitian')
@memoize_property
def real(self):
r"""
Real number predicate.
``Q.real(x)`` is true iff ``x`` is a real number, i.e., it is in the
interval `(-\infty, \infty)`. Note that, in particular the infinities
are not real. Use ``Q.extended_real`` if you want to consider those as
well.
A few important facts about reals:
- Every real number is positive, negative, or zero. Furthermore,
because these sets are pairwise disjoint, each real number is exactly
one of those three.
- Every real number is also complex.
- Every real number is finite.
- Every real number is either rational or irrational.
- Every real number is either algebraic or transcendental.
- The facts ``Q.negative``, ``Q.zero``, ``Q.positive``,
``Q.nonnegative``, ``Q.nonpositive``, ``Q.nonzero``, ``Q.integer``,
``Q.rational``, and ``Q.irrational`` all imply ``Q.real``, as do all
facts that imply those facts.
- The facts ``Q.algebraic``, and ``Q.transcendental`` do not imply
``Q.real``; they imply ``Q.complex``. An algebraic or transcendental
number may or may not be real.
- The "non" facts (i.e., ``Q.nonnegative``, ``Q.nonzero``,
``Q.nonpositive`` and ``Q.noninteger``) are not equivalent to not the
fact, but rather, not the fact *and* ``Q.real``. For example,
``Q.nonnegative`` means ``~Q.negative & Q.real``. So for example,
``I`` is not nonnegative, nonzero, or nonpositive.
Examples
========
>>> from sympy import Q, ask, symbols
>>> x = symbols('x')
>>> ask(Q.real(x), Q.positive(x))
True
>>> ask(Q.real(0))
True
References
==========
.. [1] https://en.wikipedia.org/wiki/Real_number
"""
return Predicate('real')
@memoize_property
def extended_real(self):
r"""
Extended real predicate.
``Q.extended_real(x)`` is true iff ``x`` is a real number or
`\{-\infty, \infty\}`.
See documentation of ``Q.real`` for more information about related facts.
Examples
========
>>> from sympy import ask, Q, oo, I
>>> ask(Q.extended_real(1))
True
>>> ask(Q.extended_real(I))
False
>>> ask(Q.extended_real(oo))
True
"""
return Predicate('extended_real')
@memoize_property
def imaginary(self):
"""
Imaginary number predicate.
``Q.imaginary(x)`` is true iff ``x`` can be written as a real
number multiplied by the imaginary unit ``I``. Please note that ``0``
is not considered to be an imaginary number.
Examples
========
>>> from sympy import Q, ask, I
>>> ask(Q.imaginary(3*I))
True
>>> ask(Q.imaginary(2 + 3*I))
False
>>> ask(Q.imaginary(0))
False
References
==========
.. [1] https://en.wikipedia.org/wiki/Imaginary_number
"""
return Predicate('imaginary')
@memoize_property
def complex(self):
"""
Complex number predicate.
``Q.complex(x)`` is true iff ``x`` belongs to the set of complex
numbers. Note that every complex number is finite.
Examples
========
>>> from sympy import Q, Symbol, ask, I, oo
>>> x = Symbol('x')
>>> ask(Q.complex(0))
True
>>> ask(Q.complex(2 + 3*I))
True
>>> ask(Q.complex(oo))
False
References
==========
.. [1] https://en.wikipedia.org/wiki/Complex_number
"""
return Predicate('complex')
@memoize_property
def algebraic(self):
r"""
Algebraic number predicate.
``Q.algebraic(x)`` is true iff ``x`` belongs to the set of
algebraic numbers. ``x`` is algebraic if there is some polynomial
in ``p(x)\in \mathbb\{Q\}[x]`` such that ``p(x) = 0``.
Examples
========
>>> from sympy import ask, Q, sqrt, I, pi
>>> ask(Q.algebraic(sqrt(2)))
True
>>> ask(Q.algebraic(I))
True
>>> ask(Q.algebraic(pi))
False
References
==========
.. [1] https://en.wikipedia.org/wiki/Algebraic_number
"""
return Predicate('algebraic')
@memoize_property
def transcendental(self):
"""
Transcedental number predicate.
``Q.transcendental(x)`` is true iff ``x`` belongs to the set of
transcendental numbers. A transcendental number is a real
or complex number that is not algebraic.
"""
# TODO: Add examples
return Predicate('transcendental')
@memoize_property
def integer(self):
"""
Integer predicate.
``Q.integer(x)`` is true iff ``x`` belongs to the set of integer numbers.
Examples
========
>>> from sympy import Q, ask, S
>>> ask(Q.integer(5))
True
>>> ask(Q.integer(S(1)/2))
False
References
==========
.. [1] https://en.wikipedia.org/wiki/Integer
"""
return Predicate('integer')
@memoize_property
def rational(self):
"""
Rational number predicate.
``Q.rational(x)`` is true iff ``x`` belongs to the set of
rational numbers.
Examples
========
>>> from sympy import ask, Q, pi, S
>>> ask(Q.rational(0))
True
>>> ask(Q.rational(S(1)/2))
True
>>> ask(Q.rational(pi))
False
References
==========
https://en.wikipedia.org/wiki/Rational_number
"""
return Predicate('rational')
@memoize_property
def irrational(self):
"""
Irrational number predicate.
``Q.irrational(x)`` is true iff ``x`` is any real number that
cannot be expressed as a ratio of integers.
Examples
========
>>> from sympy import ask, Q, pi, S, I
>>> ask(Q.irrational(0))
False
>>> ask(Q.irrational(S(1)/2))
False
>>> ask(Q.irrational(pi))
True
>>> ask(Q.irrational(I))
False
References
==========
.. [1] https://en.wikipedia.org/wiki/Irrational_number
"""
return Predicate('irrational')
@memoize_property
def finite(self):
"""
Finite predicate.
``Q.finite(x)`` is true if ``x`` is neither an infinity
nor a ``NaN``. In other words, ``ask(Q.finite(x))`` is true for all ``x``
having a bounded absolute value.
Examples
========
>>> from sympy import Q, ask, Symbol, S, oo, I
>>> x = Symbol('x')
>>> ask(Q.finite(S.NaN))
False
>>> ask(Q.finite(oo))
False
>>> ask(Q.finite(1))
True
>>> ask(Q.finite(2 + 3*I))
True
References
==========
.. [1] https://en.wikipedia.org/wiki/Finite
"""
return Predicate('finite')
@memoize_property
def infinite(self):
"""
Infinite number predicate.
``Q.infinite(x)`` is true iff the absolute value of ``x`` is
infinity.
"""
# TODO: Add examples
return Predicate('infinite')
@memoize_property
def positive(self):
r"""
Positive real number predicate.
``Q.positive(x)`` is true iff ``x`` is real and `x > 0`, that is if ``x``
is in the interval `(0, \infty)`. In particular, infinity is not
positive.
A few important facts about positive numbers:
- Note that ``Q.nonpositive`` and ``~Q.positive`` are *not* the same
thing. ``~Q.positive(x)`` simply means that ``x`` is not positive,
whereas ``Q.nonpositive(x)`` means that ``x`` is real and not
positive, i.e., ``Q.nonpositive(x)`` is logically equivalent to
`Q.negative(x) | Q.zero(x)``. So for example, ``~Q.positive(I)`` is
true, whereas ``Q.nonpositive(I)`` is false.
- See the documentation of ``Q.real`` for more information about
related facts.
Examples
========
>>> from sympy import Q, ask, symbols, I
>>> x = symbols('x')
>>> ask(Q.positive(x), Q.real(x) & ~Q.negative(x) & ~Q.zero(x))
True
>>> ask(Q.positive(1))
True
>>> ask(Q.nonpositive(I))
False
>>> ask(~Q.positive(I))
True
"""
return Predicate('positive')
@memoize_property
def negative(self):
r"""
Negative number predicate.
``Q.negative(x)`` is true iff ``x`` is a real number and :math:`x < 0`, that is,
it is in the interval :math:`(-\infty, 0)`. Note in particular that negative
infinity is not negative.
A few important facts about negative numbers:
- Note that ``Q.nonnegative`` and ``~Q.negative`` are *not* the same
thing. ``~Q.negative(x)`` simply means that ``x`` is not negative,
whereas ``Q.nonnegative(x)`` means that ``x`` is real and not
negative, i.e., ``Q.nonnegative(x)`` is logically equivalent to
``Q.zero(x) | Q.positive(x)``. So for example, ``~Q.negative(I)`` is
true, whereas ``Q.nonnegative(I)`` is false.
- See the documentation of ``Q.real`` for more information about
related facts.
Examples
========
>>> from sympy import Q, ask, symbols, I
>>> x = symbols('x')
>>> ask(Q.negative(x), Q.real(x) & ~Q.positive(x) & ~Q.zero(x))
True
>>> ask(Q.negative(-1))
True
>>> ask(Q.nonnegative(I))
False
>>> ask(~Q.negative(I))
True
"""
return Predicate('negative')
@memoize_property
def zero(self):
"""
Zero number predicate.
``ask(Q.zero(x))`` is true iff the value of ``x`` is zero.
Examples
========
>>> from sympy import ask, Q, oo, symbols
>>> x, y = symbols('x, y')
>>> ask(Q.zero(0))
True
>>> ask(Q.zero(1/oo))
True
>>> ask(Q.zero(0*oo))
False
>>> ask(Q.zero(1))
False
>>> ask(Q.zero(x*y), Q.zero(x) | Q.zero(y))
True
"""
return Predicate('zero')
@memoize_property
def nonzero(self):
"""
Nonzero real number predicate.
``ask(Q.nonzero(x))`` is true iff ``x`` is real and ``x`` is not zero. Note in
particular that ``Q.nonzero(x)`` is false if ``x`` is not real. Use
``~Q.zero(x)`` if you want the negation of being zero without any real
assumptions.
A few important facts about nonzero numbers:
- ``Q.nonzero`` is logically equivalent to ``Q.positive | Q.negative``.
- See the documentation of ``Q.real`` for more information about
related facts.
Examples
========
>>> from sympy import Q, ask, symbols, I, oo
>>> x = symbols('x')
>>> print(ask(Q.nonzero(x), ~Q.zero(x)))
None
>>> ask(Q.nonzero(x), Q.positive(x))
True
>>> ask(Q.nonzero(x), Q.zero(x))
False
>>> ask(Q.nonzero(0))
False
>>> ask(Q.nonzero(I))
False
>>> ask(~Q.zero(I))
True
>>> ask(Q.nonzero(oo))
False
"""
return Predicate('nonzero')
@memoize_property
def nonpositive(self):
"""
Nonpositive real number predicate.
``ask(Q.nonpositive(x))`` is true iff ``x`` belongs to the set of
negative numbers including zero.
- Note that ``Q.nonpositive`` and ``~Q.positive`` are *not* the same
thing. ``~Q.positive(x)`` simply means that ``x`` is not positive,
whereas ``Q.nonpositive(x)`` means that ``x`` is real and not
positive, i.e., ``Q.nonpositive(x)`` is logically equivalent to
`Q.negative(x) | Q.zero(x)``. So for example, ``~Q.positive(I)`` is
true, whereas ``Q.nonpositive(I)`` is false.
Examples
========
>>> from sympy import Q, ask, I
>>> ask(Q.nonpositive(-1))
True
>>> ask(Q.nonpositive(0))
True
>>> ask(Q.nonpositive(1))
False
>>> ask(Q.nonpositive(I))
False
>>> ask(Q.nonpositive(-I))
False
"""
return Predicate('nonpositive')
@memoize_property
def nonnegative(self):
"""
Nonnegative real number predicate.
``ask(Q.nonnegative(x))`` is true iff ``x`` belongs to the set of
positive numbers including zero.
- Note that ``Q.nonnegative`` and ``~Q.negative`` are *not* the same
thing. ``~Q.negative(x)`` simply means that ``x`` is not negative,
whereas ``Q.nonnegative(x)`` means that ``x`` is real and not
negative, i.e., ``Q.nonnegative(x)`` is logically equivalent to
``Q.zero(x) | Q.positive(x)``. So for example, ``~Q.negative(I)`` is
true, whereas ``Q.nonnegative(I)`` is false.
Examples
========
>>> from sympy import Q, ask, I
>>> ask(Q.nonnegative(1))
True
>>> ask(Q.nonnegative(0))
True
>>> ask(Q.nonnegative(-1))
False
>>> ask(Q.nonnegative(I))
False
>>> ask(Q.nonnegative(-I))
False
"""
return Predicate('nonnegative')
@memoize_property
def even(self):
"""
Even number predicate.
``ask(Q.even(x))`` is true iff ``x`` belongs to the set of even
integers.
Examples
========
>>> from sympy import Q, ask, pi
>>> ask(Q.even(0))
True
>>> ask(Q.even(2))
True
>>> ask(Q.even(3))
False
>>> ask(Q.even(pi))
False
"""
return Predicate('even')
@memoize_property
def odd(self):
"""
Odd number predicate.
``ask(Q.odd(x))`` is true iff ``x`` belongs to the set of odd numbers.
Examples
========
>>> from sympy import Q, ask, pi
>>> ask(Q.odd(0))
False
>>> ask(Q.odd(2))
False
>>> ask(Q.odd(3))
True
>>> ask(Q.odd(pi))
False
"""
return Predicate('odd')
@memoize_property
def prime(self):
"""
Prime number predicate.
``ask(Q.prime(x))`` is true iff ``x`` is a natural number greater
than 1 that has no positive divisors other than ``1`` and the
number itself.
Examples
========
>>> from sympy import Q, ask
>>> ask(Q.prime(0))
False
>>> ask(Q.prime(1))
False
>>> ask(Q.prime(2))
True
>>> ask(Q.prime(20))
False
>>> ask(Q.prime(-3))
False
"""
return Predicate('prime')
@memoize_property
def composite(self):
"""
Composite number predicate.
``ask(Q.composite(x))`` is true iff ``x`` is a positive integer and has
at least one positive divisor other than ``1`` and the number itself.
Examples
========
>>> from sympy import Q, ask
>>> ask(Q.composite(0))
False
>>> ask(Q.composite(1))
False
>>> ask(Q.composite(2))
False
>>> ask(Q.composite(20))
True
"""
return Predicate('composite')
@memoize_property
def commutative(self):
"""
Commutative predicate.
``ask(Q.commutative(x))`` is true iff ``x`` commutes with any other
object with respect to multiplication operation.
"""
# TODO: Add examples
return Predicate('commutative')
@memoize_property
def is_true(self):
"""
Generic predicate.
``ask(Q.is_true(x))`` is true iff ``x`` is true. This only makes
sense if ``x`` is a predicate.
Examples
========
>>> from sympy import ask, Q, symbols
>>> x = symbols('x')
>>> ask(Q.is_true(True))
True
"""
return Predicate('is_true')
@memoize_property
def symmetric(self):
"""
Symmetric matrix predicate.
``Q.symmetric(x)`` is true iff ``x`` is a square matrix and is equal to
its transpose. Every square diagonal matrix is a symmetric matrix.
Examples
========
>>> from sympy import Q, ask, MatrixSymbol
>>> X = MatrixSymbol('X', 2, 2)
>>> Y = MatrixSymbol('Y', 2, 3)
>>> Z = MatrixSymbol('Z', 2, 2)
>>> ask(Q.symmetric(X*Z), Q.symmetric(X) & Q.symmetric(Z))
True
>>> ask(Q.symmetric(X + Z), Q.symmetric(X) & Q.symmetric(Z))
True
>>> ask(Q.symmetric(Y))
False
References
==========
.. [1] https://en.wikipedia.org/wiki/Symmetric_matrix
"""
# TODO: Add handlers to make these keys work with
# actual matrices and add more examples in the docstring.
return Predicate('symmetric')
@memoize_property
def invertible(self):
"""
Invertible matrix predicate.
``Q.invertible(x)`` is true iff ``x`` is an invertible matrix.
A square matrix is called invertible only if its determinant is 0.
Examples
========
>>> from sympy import Q, ask, MatrixSymbol
>>> X = MatrixSymbol('X', 2, 2)
>>> Y = MatrixSymbol('Y', 2, 3)
>>> Z = MatrixSymbol('Z', 2, 2)
>>> ask(Q.invertible(X*Y), Q.invertible(X))
False
>>> ask(Q.invertible(X*Z), Q.invertible(X) & Q.invertible(Z))
True
>>> ask(Q.invertible(X), Q.fullrank(X) & Q.square(X))
True
References
==========
.. [1] https://en.wikipedia.org/wiki/Invertible_matrix
"""
return Predicate('invertible')
@memoize_property
def orthogonal(self):
"""
Orthogonal matrix predicate.
``Q.orthogonal(x)`` is true iff ``x`` is an orthogonal matrix.
A square matrix ``M`` is an orthogonal matrix if it satisfies
``M^TM = MM^T = I`` where ``M^T`` is the transpose matrix of
``M`` and ``I`` is an identity matrix. Note that an orthogonal
matrix is necessarily invertible.
Examples
========
>>> from sympy import Q, ask, MatrixSymbol, Identity
>>> X = MatrixSymbol('X', 2, 2)
>>> Y = MatrixSymbol('Y', 2, 3)
>>> Z = MatrixSymbol('Z', 2, 2)
>>> ask(Q.orthogonal(Y))
False
>>> ask(Q.orthogonal(X*Z*X), Q.orthogonal(X) & Q.orthogonal(Z))
True
>>> ask(Q.orthogonal(Identity(3)))
True
>>> ask(Q.invertible(X), Q.orthogonal(X))
True
References
==========
.. [1] https://en.wikipedia.org/wiki/Orthogonal_matrix
"""
return Predicate('orthogonal')
@memoize_property
def unitary(self):
"""
Unitary matrix predicate.
``Q.unitary(x)`` is true iff ``x`` is a unitary matrix.
Unitary matrix is an analogue to orthogonal matrix. A square
matrix ``M`` with complex elements is unitary if :math:``M^TM = MM^T= I``
where :math:``M^T`` is the conjugate transpose matrix of ``M``.
Examples
========
>>> from sympy import Q, ask, MatrixSymbol, Identity
>>> X = MatrixSymbol('X', 2, 2)
>>> Y = MatrixSymbol('Y', 2, 3)
>>> Z = MatrixSymbol('Z', 2, 2)
>>> ask(Q.unitary(Y))
False
>>> ask(Q.unitary(X*Z*X), Q.unitary(X) & Q.unitary(Z))
True
>>> ask(Q.unitary(Identity(3)))
True
References
==========
.. [1] https://en.wikipedia.org/wiki/Unitary_matrix
"""
return Predicate('unitary')
@memoize_property
def positive_definite(self):
r"""
Positive definite matrix predicate.
If ``M`` is a :math:``n \times n`` symmetric real matrix, it is said
to be positive definite if :math:`Z^TMZ` is positive for
every non-zero column vector ``Z`` of ``n`` real numbers.
Examples
========
>>> from sympy import Q, ask, MatrixSymbol, Identity
>>> X = MatrixSymbol('X', 2, 2)
>>> Y = MatrixSymbol('Y', 2, 3)
>>> Z = MatrixSymbol('Z', 2, 2)
>>> ask(Q.positive_definite(Y))
False
>>> ask(Q.positive_definite(Identity(3)))
True
>>> ask(Q.positive_definite(X + Z), Q.positive_definite(X) &
... Q.positive_definite(Z))
True
References
==========
.. [1] https://en.wikipedia.org/wiki/Positive-definite_matrix
"""
return Predicate('positive_definite')
@memoize_property
def upper_triangular(self):
"""
Upper triangular matrix predicate.
A matrix ``M`` is called upper triangular matrix if :math:`M_{ij}=0`
for :math:`i<j`.
Examples
========
>>> from sympy import Q, ask, ZeroMatrix, Identity
>>> ask(Q.upper_triangular(Identity(3)))
True
>>> ask(Q.upper_triangular(ZeroMatrix(3, 3)))
True
References
==========
.. [1] http://mathworld.wolfram.com/UpperTriangularMatrix.html
"""
return Predicate('upper_triangular')
@memoize_property
def lower_triangular(self):
"""
Lower triangular matrix predicate.
A matrix ``M`` is called lower triangular matrix if :math:`a_{ij}=0`
for :math:`i>j`.
Examples
========
>>> from sympy import Q, ask, ZeroMatrix, Identity
>>> ask(Q.lower_triangular(Identity(3)))
True
>>> ask(Q.lower_triangular(ZeroMatrix(3, 3)))
True
References
==========
.. [1] http://mathworld.wolfram.com/LowerTriangularMatrix.html
"""
return Predicate('lower_triangular')
@memoize_property
def diagonal(self):
"""
Diagonal matrix predicate.
``Q.diagonal(x)`` is true iff ``x`` is a diagonal matrix. A diagonal
matrix is a matrix in which the entries outside the main diagonal
are all zero.
Examples
========
>>> from sympy import Q, ask, MatrixSymbol, ZeroMatrix
>>> X = MatrixSymbol('X', 2, 2)
>>> ask(Q.diagonal(ZeroMatrix(3, 3)))
True
>>> ask(Q.diagonal(X), Q.lower_triangular(X) &
... Q.upper_triangular(X))
True
References
==========
.. [1] https://en.wikipedia.org/wiki/Diagonal_matrix
"""
return Predicate('diagonal')
@memoize_property
def fullrank(self):
"""
Fullrank matrix predicate.
``Q.fullrank(x)`` is true iff ``x`` is a full rank matrix.
A matrix is full rank if all rows and columns of the matrix
are linearly independent. A square matrix is full rank iff
its determinant is nonzero.
Examples
========
>>> from sympy import Q, ask, MatrixSymbol, ZeroMatrix, Identity
>>> X = MatrixSymbol('X', 2, 2)
>>> ask(Q.fullrank(X.T), Q.fullrank(X))
True
>>> ask(Q.fullrank(ZeroMatrix(3, 3)))
False
>>> ask(Q.fullrank(Identity(3)))
True
"""
return Predicate('fullrank')
@memoize_property
def square(self):
"""
Square matrix predicate.
``Q.square(x)`` is true iff ``x`` is a square matrix. A square matrix
is a matrix with the same number of rows and columns.
Examples
========
>>> from sympy import Q, ask, MatrixSymbol, ZeroMatrix, Identity
>>> X = MatrixSymbol('X', 2, 2)
>>> Y = MatrixSymbol('X', 2, 3)
>>> ask(Q.square(X))
True
>>> ask(Q.square(Y))
False
>>> ask(Q.square(ZeroMatrix(3, 3)))
True
>>> ask(Q.square(Identity(3)))
True
References
==========
.. [1] https://en.wikipedia.org/wiki/Square_matrix
"""
return Predicate('square')
@memoize_property
def integer_elements(self):
"""
Integer elements matrix predicate.
``Q.integer_elements(x)`` is true iff all the elements of ``x``
are integers.
Examples
========
>>> from sympy import Q, ask, MatrixSymbol
>>> X = MatrixSymbol('X', 4, 4)
>>> ask(Q.integer(X[1, 2]), Q.integer_elements(X))
True
"""
return Predicate('integer_elements')
@memoize_property
def real_elements(self):
"""
Real elements matrix predicate.
``Q.real_elements(x)`` is true iff all the elements of ``x``
are real numbers.
Examples
========
>>> from sympy import Q, ask, MatrixSymbol
>>> X = MatrixSymbol('X', 4, 4)
>>> ask(Q.real(X[1, 2]), Q.real_elements(X))
True
"""
return Predicate('real_elements')
@memoize_property
def complex_elements(self):
"""
Complex elements matrix predicate.
``Q.complex_elements(x)`` is true iff all the elements of ``x``
are complex numbers.
Examples
========
>>> from sympy import Q, ask, MatrixSymbol
>>> X = MatrixSymbol('X', 4, 4)
>>> ask(Q.complex(X[1, 2]), Q.complex_elements(X))
True
>>> ask(Q.complex_elements(X), Q.integer_elements(X))
True
"""
return Predicate('complex_elements')
@memoize_property
def singular(self):
"""
Singular matrix predicate.
A matrix is singular iff the value of its determinant is 0.
Examples
========
>>> from sympy import Q, ask, MatrixSymbol
>>> X = MatrixSymbol('X', 4, 4)
>>> ask(Q.singular(X), Q.invertible(X))
False
>>> ask(Q.singular(X), ~Q.invertible(X))
True
References
==========
.. [1] http://mathworld.wolfram.com/SingularMatrix.html
"""
return Predicate('singular')
@memoize_property
def normal(self):
"""
Normal matrix predicate.
A matrix is normal if it commutes with its conjugate transpose.
Examples
========
>>> from sympy import Q, ask, MatrixSymbol
>>> X = MatrixSymbol('X', 4, 4)
>>> ask(Q.normal(X), Q.unitary(X))
True
References
==========
.. [1] https://en.wikipedia.org/wiki/Normal_matrix
"""
return Predicate('normal')
@memoize_property
def triangular(self):
"""
Triangular matrix predicate.
``Q.triangular(X)`` is true if ``X`` is one that is either lower
triangular or upper triangular.
Examples
========
>>> from sympy import Q, ask, MatrixSymbol
>>> X = MatrixSymbol('X', 4, 4)
>>> ask(Q.triangular(X), Q.upper_triangular(X))
True
>>> ask(Q.triangular(X), Q.lower_triangular(X))
True
References
==========
.. [1] https://en.wikipedia.org/wiki/Triangular_matrix
"""
return Predicate('triangular')
@memoize_property
def unit_triangular(self):
"""
Unit triangular matrix predicate.
A unit triangular matrix is a triangular matrix with 1s
on the diagonal.
Examples
========
>>> from sympy import Q, ask, MatrixSymbol
>>> X = MatrixSymbol('X', 4, 4)
>>> ask(Q.triangular(X), Q.unit_triangular(X))
True
"""
return Predicate('unit_triangular')
Q = AssumptionKeys()
def _extract_facts(expr, symbol, check_reversed_rel=True):
"""
Helper for ask().
Extracts the facts relevant to the symbol from an assumption.
Returns None if there is nothing to extract.
"""
if isinstance(symbol, Relational):
if check_reversed_rel:
rev = _extract_facts(expr, symbol.reversed, False)
if rev is not None:
return rev
if isinstance(expr, bool):
return
if not expr.has(symbol):
return
if isinstance(expr, AppliedPredicate):
if expr.arg == symbol:
return expr.func
else:
return
if isinstance(expr, Not) and expr.args[0].func in (And, Or):
cls = Or if expr.args[0] == And else And
expr = cls(*[~arg for arg in expr.args[0].args])
args = [_extract_facts(arg, symbol) for arg in expr.args]
if isinstance(expr, And):
args = [x for x in args if x is not None]
if args:
return expr.func(*args)
if args and all(x is not None for x in args):
return expr.func(*args)
def _extract_all_facts(expr, symbol):
facts = set()
if isinstance(symbol, Relational):
symbols = (symbol, symbol.reversed)
else:
symbols = (symbol,)
for clause in expr.clauses:
args = []
for literal in clause:
if isinstance(literal.lit, AppliedPredicate):
if literal.lit.arg in symbols:
# Add literal if it has 'symbol' in it
args.append(Literal(literal.lit.func, literal.is_Not))
else:
# If any of the literals doesn't have 'symbol' don't add the whole clause.
break
else:
if args:
facts.add(frozenset(args))
return CNF(facts)
def ask(proposition, assumptions=True, context=global_assumptions):
"""
Method for inferring properties about objects.
**Syntax**
* ask(proposition)
* ask(proposition, assumptions)
where ``proposition`` is any boolean expression
Examples
========
>>> from sympy import ask, Q, pi
>>> from sympy.abc import x, y
>>> ask(Q.rational(pi))
False
>>> ask(Q.even(x*y), Q.even(x) & Q.integer(y))
True
>>> ask(Q.prime(4*x), Q.integer(x))
False
**Remarks**
Relations in assumptions are not implemented (yet), so the following
will not give a meaningful result.
>>> ask(Q.positive(x), Q.is_true(x > 0))
It is however a work in progress.
"""
from sympy.assumptions.satask import satask
if not isinstance(proposition, (BooleanFunction, AppliedPredicate, bool, BooleanAtom)):
raise TypeError("proposition must be a valid logical expression")
if not isinstance(assumptions, (BooleanFunction, AppliedPredicate, bool, BooleanAtom)):
raise TypeError("assumptions must be a valid logical expression")
if isinstance(proposition, AppliedPredicate):
key, expr = proposition.func, sympify(proposition.arg)
else:
key, expr = Q.is_true, sympify(proposition)
assump = CNF.from_prop(assumptions)
assump.extend(context)
local_facts = _extract_all_facts(assump, expr)
known_facts_cnf = get_all_known_facts()
known_facts_dict = get_known_facts_dict()
enc_cnf = EncodedCNF()
enc_cnf.from_cnf(CNF(known_facts_cnf))
enc_cnf.add_from_cnf(local_facts)
if local_facts.clauses and satisfiable(enc_cnf) is False:
raise ValueError("inconsistent assumptions %s" % assumptions)
if local_facts.clauses:
if len(local_facts.clauses) == 1:
cl, = local_facts.clauses
f, = cl if len(cl)==1 else [None]
if f and f.is_Not and f.arg in known_facts_dict.get(key, []):
return False
for clause in local_facts.clauses:
if len(clause) == 1:
f, = clause
fdict = known_facts_dict.get(f.arg, None) if not f.is_Not else None
if fdict and key in fdict:
return True
if fdict and Not(key) in known_facts_dict[f.arg]:
return False
# direct resolution method, no logic
res = key(expr)._eval_ask(assumptions)
if res is not None:
return bool(res)
# using satask (still costly)
res = satask(proposition, assumptions=assumptions, context=context)
return res
def ask_full_inference(proposition, assumptions, known_facts_cnf):
"""
Method for inferring properties about objects.
"""
if not satisfiable(And(known_facts_cnf, assumptions, proposition)):
return False
if not satisfiable(And(known_facts_cnf, assumptions, Not(proposition))):
return True
return None
def register_handler(key, handler):
"""
Register a handler in the ask system. key must be a string and handler a
class inheriting from AskHandler::
>>> from sympy.assumptions import register_handler, ask, Q
>>> from sympy.assumptions.handlers import AskHandler
>>> class MersenneHandler(AskHandler):
... # Mersenne numbers are in the form 2**n - 1, n integer
... @staticmethod
... def Integer(expr, assumptions):
... from sympy import log
... return ask(Q.integer(log(expr + 1, 2)))
>>> register_handler('mersenne', MersenneHandler)
>>> ask(Q.mersenne(7))
True
"""
if type(key) is Predicate:
key = key.name
Qkey = getattr(Q, key, None)
if Qkey is not None:
Qkey.add_handler(handler)
else:
setattr(Q, key, Predicate(key, handlers=[handler]))
def remove_handler(key, handler):
"""Removes a handler from the ask system. Same syntax as register_handler"""
if type(key) is Predicate:
key = key.name
getattr(Q, key).remove_handler(handler)
def single_fact_lookup(known_facts_keys, known_facts_cnf):
# Compute the quick lookup for single facts
mapping = {}
for key in known_facts_keys:
mapping[key] = {key}
for other_key in known_facts_keys:
if other_key != key:
if ask_full_inference(other_key, key, known_facts_cnf):
mapping[key].add(other_key)
return mapping
def compute_known_facts(known_facts, known_facts_keys):
"""Compute the various forms of knowledge compilation used by the
assumptions system.
This function is typically applied to the results of the ``get_known_facts``
and ``get_known_facts_keys`` functions defined at the bottom of
this file.
"""
from textwrap import dedent, wrap
fact_string = dedent('''\
"""
The contents of this file are the return value of
``sympy.assumptions.ask.compute_known_facts``.
Do NOT manually edit this file.
Instead, run ./bin/ask_update.py.
"""
from sympy.core.cache import cacheit
from sympy.logic.boolalg import And
from sympy.assumptions.cnf import Literal
from sympy.assumptions.ask import Q
# -{ Known facts as a set }-
@cacheit
def get_all_known_facts():
return {
%s
}
# -{ Known facts in Conjunctive Normal Form }-
@cacheit
def get_known_facts_cnf():
return And(
%s
)
# -{ Known facts in compressed sets }-
@cacheit
def get_known_facts_dict():
return {
%s
}
''')
# Compute the known facts in CNF form for logical inference
LINE = ",\n "
HANG = ' '*8
cnf = to_cnf(known_facts)
cnf_ = CNF.to_CNF(known_facts)
c = LINE.join([str(a) for a in cnf.args])
p = LINE.join(sorted(['frozenset((' + ', '.join(str(lit) for lit in sorted(clause, key=str)) +'))' for clause in cnf_.clauses]))
mapping = single_fact_lookup(known_facts_keys, cnf)
items = sorted(mapping.items(), key=str)
keys = [str(i[0]) for i in items]
values = ['set(%s)' % sorted(i[1], key=str) for i in items]
m = LINE.join(['\n'.join(
wrap("%s: %s" % (k, v),
subsequent_indent=HANG,
break_long_words=False))
for k, v in zip(keys, values)]) + ','
return fact_string % (p, c, m)
# handlers tells us what ask handler we should use
# for a particular key
_val_template = 'sympy.assumptions.handlers.%s'
_handlers = [
("antihermitian", "sets.AskAntiHermitianHandler"),
("finite", "calculus.AskFiniteHandler"),
("commutative", "AskCommutativeHandler"),
("complex", "sets.AskComplexHandler"),
("composite", "ntheory.AskCompositeHandler"),
("even", "ntheory.AskEvenHandler"),
("extended_real", "sets.AskExtendedRealHandler"),
("hermitian", "sets.AskHermitianHandler"),
("imaginary", "sets.AskImaginaryHandler"),
("integer", "sets.AskIntegerHandler"),
("irrational", "sets.AskIrrationalHandler"),
("rational", "sets.AskRationalHandler"),
("negative", "order.AskNegativeHandler"),
("nonzero", "order.AskNonZeroHandler"),
("nonpositive", "order.AskNonPositiveHandler"),
("nonnegative", "order.AskNonNegativeHandler"),
("zero", "order.AskZeroHandler"),
("positive", "order.AskPositiveHandler"),
("prime", "ntheory.AskPrimeHandler"),
("real", "sets.AskRealHandler"),
("odd", "ntheory.AskOddHandler"),
("algebraic", "sets.AskAlgebraicHandler"),
("is_true", "common.TautologicalHandler"),
("symmetric", "matrices.AskSymmetricHandler"),
("invertible", "matrices.AskInvertibleHandler"),
("orthogonal", "matrices.AskOrthogonalHandler"),
("unitary", "matrices.AskUnitaryHandler"),
("positive_definite", "matrices.AskPositiveDefiniteHandler"),
("upper_triangular", "matrices.AskUpperTriangularHandler"),
("lower_triangular", "matrices.AskLowerTriangularHandler"),
("diagonal", "matrices.AskDiagonalHandler"),
("fullrank", "matrices.AskFullRankHandler"),
("square", "matrices.AskSquareHandler"),
("integer_elements", "matrices.AskIntegerElementsHandler"),
("real_elements", "matrices.AskRealElementsHandler"),
("complex_elements", "matrices.AskComplexElementsHandler"),
]
for name, value in _handlers:
register_handler(name, _val_template % value)
@cacheit
def get_known_facts_keys():
return [
getattr(Q, attr)
for attr in Q.__class__.__dict__
if not attr.startswith('__')]
@cacheit
def get_known_facts():
return And(
Implies(Q.infinite, ~Q.finite),
Implies(Q.real, Q.complex),
Implies(Q.real, Q.hermitian),
Equivalent(Q.extended_real, Q.real | Q.infinite),
Equivalent(Q.even | Q.odd, Q.integer),
Implies(Q.even, ~Q.odd),
Implies(Q.prime, Q.integer & Q.positive & ~Q.composite),
Implies(Q.integer, Q.rational),
Implies(Q.rational, Q.algebraic),
Implies(Q.algebraic, Q.complex),
Implies(Q.algebraic, Q.finite),
Equivalent(Q.transcendental | Q.algebraic, Q.complex & Q.finite),
Implies(Q.transcendental, ~Q.algebraic),
Implies(Q.transcendental, Q.finite),
Implies(Q.imaginary, Q.complex & ~Q.real),
Implies(Q.imaginary, Q.antihermitian),
Implies(Q.antihermitian, ~Q.hermitian),
Equivalent(Q.irrational | Q.rational, Q.real & Q.finite),
Implies(Q.irrational, ~Q.rational),
Implies(Q.zero, Q.even),
Equivalent(Q.real, Q.negative | Q.zero | Q.positive),
Implies(Q.zero, ~Q.negative & ~Q.positive),
Implies(Q.negative, ~Q.positive),
Equivalent(Q.nonnegative, Q.zero | Q.positive),
Equivalent(Q.nonpositive, Q.zero | Q.negative),
Equivalent(Q.nonzero, Q.negative | Q.positive),
Implies(Q.orthogonal, Q.positive_definite),
Implies(Q.orthogonal, Q.unitary),
Implies(Q.unitary & Q.real, Q.orthogonal),
Implies(Q.unitary, Q.normal),
Implies(Q.unitary, Q.invertible),
Implies(Q.normal, Q.square),
Implies(Q.diagonal, Q.normal),
Implies(Q.positive_definite, Q.invertible),
Implies(Q.diagonal, Q.upper_triangular),
Implies(Q.diagonal, Q.lower_triangular),
Implies(Q.lower_triangular, Q.triangular),
Implies(Q.upper_triangular, Q.triangular),
Implies(Q.triangular, Q.upper_triangular | Q.lower_triangular),
Implies(Q.upper_triangular & Q.lower_triangular, Q.diagonal),
Implies(Q.diagonal, Q.symmetric),
Implies(Q.unit_triangular, Q.triangular),
Implies(Q.invertible, Q.fullrank),
Implies(Q.invertible, Q.square),
Implies(Q.symmetric, Q.square),
Implies(Q.fullrank & Q.square, Q.invertible),
Equivalent(Q.invertible, ~Q.singular),
Implies(Q.integer_elements, Q.real_elements),
Implies(Q.real_elements, Q.complex_elements),
)
from sympy.assumptions.ask_generated import (
get_known_facts_dict, get_all_known_facts)
|
a57702634b8c7ed019ce2299b46f5e66104ee4dbbfcd49df2bc889c0619c7980 | from __future__ import print_function, division
import inspect
from sympy.core.cache import cacheit
from sympy.core.singleton import S
from sympy.core.sympify import _sympify
from sympy.logic.boolalg import Boolean
from sympy.utilities.source import get_class
from contextlib import contextmanager
class AssumptionsContext(set):
"""Set representing assumptions.
This is used to represent global assumptions, but you can also use this
class to create your own local assumptions contexts. It is basically a thin
wrapper to Python's set, so see its documentation for advanced usage.
Examples
========
>>> from sympy import AppliedPredicate, Q
>>> from sympy.assumptions.assume import global_assumptions
>>> global_assumptions
AssumptionsContext()
>>> from sympy.abc import x
>>> global_assumptions.add(Q.real(x))
>>> global_assumptions
AssumptionsContext({Q.real(x)})
>>> global_assumptions.remove(Q.real(x))
>>> global_assumptions
AssumptionsContext()
>>> global_assumptions.clear()
"""
def add(self, *assumptions):
"""Add an assumption."""
for a in assumptions:
super(AssumptionsContext, self).add(a)
def _sympystr(self, printer):
if not self:
return "%s()" % self.__class__.__name__
return "%s(%s)" % (self.__class__.__name__, printer._print_set(self))
global_assumptions = AssumptionsContext()
class AppliedPredicate(Boolean):
"""The class of expressions resulting from applying a Predicate.
Examples
========
>>> from sympy import Q, Symbol
>>> x = Symbol('x')
>>> Q.integer(x)
Q.integer(x)
>>> type(Q.integer(x))
<class 'sympy.assumptions.assume.AppliedPredicate'>
"""
__slots__ = ()
def __new__(cls, predicate, arg):
arg = _sympify(arg)
return Boolean.__new__(cls, predicate, arg)
is_Atom = True # do not attempt to decompose this
@property
def arg(self):
"""
Return the expression used by this assumption.
Examples
========
>>> from sympy import Q, Symbol
>>> x = Symbol('x')
>>> a = Q.integer(x + 1)
>>> a.arg
x + 1
"""
return self._args[1]
@property
def args(self):
return self._args[1:]
@property
def func(self):
return self._args[0]
@cacheit
def sort_key(self, order=None):
return (self.class_key(), (2, (self.func.name, self.arg.sort_key())),
S.One.sort_key(), S.One)
def __eq__(self, other):
if type(other) is AppliedPredicate:
return self._args == other._args
return False
def __hash__(self):
return super(AppliedPredicate, self).__hash__()
def _eval_ask(self, assumptions):
return self.func.eval(self.arg, assumptions)
@property
def binary_symbols(self):
from sympy.core.relational import Eq, Ne
if self.func.name in ['is_true', 'is_false']:
i = self.arg
if i.is_Boolean or i.is_Symbol or isinstance(i, (Eq, Ne)):
return i.binary_symbols
return set()
class Predicate(Boolean):
"""A predicate is a function that returns a boolean value.
Predicates merely wrap their argument and remain unevaluated:
>>> from sympy import Q, ask
>>> type(Q.prime)
<class 'sympy.assumptions.assume.Predicate'>
>>> Q.prime.name
'prime'
>>> Q.prime(7)
Q.prime(7)
>>> _.func.name
'prime'
To obtain the truth value of an expression containing predicates, use
the function ``ask``:
>>> ask(Q.prime(7))
True
The tautological predicate ``Q.is_true`` can be used to wrap other objects:
>>> from sympy.abc import x
>>> Q.is_true(x > 1)
Q.is_true(x > 1)
"""
is_Atom = True
def __new__(cls, name, handlers=None):
obj = Boolean.__new__(cls)
obj.name = name
obj.handlers = handlers or []
return obj
def _hashable_content(self):
return (self.name,)
def __getnewargs__(self):
return (self.name,)
def __call__(self, expr):
return AppliedPredicate(self, expr)
def add_handler(self, handler):
self.handlers.append(handler)
def remove_handler(self, handler):
self.handlers.remove(handler)
@cacheit
def sort_key(self, order=None):
return self.class_key(), (1, (self.name,)), S.One.sort_key(), S.One
def eval(self, expr, assumptions=True):
"""
Evaluate self(expr) under the given assumptions.
This uses only direct resolution methods, not logical inference.
"""
res, _res = None, None
mro = inspect.getmro(type(expr))
for handler in self.handlers:
cls = get_class(handler)
for subclass in mro:
eval_ = getattr(cls, subclass.__name__, None)
if eval_ is None:
continue
res = eval_(expr, assumptions)
# Do not stop if value returned is None
# Try to check for higher classes
if res is None:
continue
if _res is None:
_res = res
elif res is None:
# since first resolutor was conclusive, we keep that value
res = _res
else:
# only check consistency if both resolutors have concluded
if _res != res:
raise ValueError('incompatible resolutors')
break
return res
@contextmanager
def assuming(*assumptions):
""" Context manager for assumptions
Examples
========
>>> from sympy.assumptions import assuming, Q, ask
>>> from sympy.abc import x, y
>>> print(ask(Q.integer(x + y)))
None
>>> with assuming(Q.integer(x), Q.integer(y)):
... print(ask(Q.integer(x + y)))
True
"""
old_global_assumptions = global_assumptions.copy()
global_assumptions.update(assumptions)
try:
yield
finally:
global_assumptions.clear()
global_assumptions.update(old_global_assumptions)
|
6d43d828a40ad1f9aaecf0230550380237f90a9cc94b2b656179f4bc5d60b04e | """
The classes used here are for the internal use of assumptions system
only and should not be used anywhere else as these don't possess the
signatures common to SymPy objects. For general use of logic constructs
please refer to sympy.logic classes And, Or, Not, etc.
"""
from itertools import combinations, product
from sympy import S, Nor, Nand, Xor, Implies, Equivalent, ITE
from sympy.logic.boolalg import Or, And, Not, Xnor
from itertools import zip_longest
class Literal(object):
"""
The smallest element of a CNF object
"""
def __new__(cls, lit, is_Not=False):
if isinstance(lit, Not):
lit = lit.args[0]
is_Not = True
elif isinstance(lit, (AND, OR, Literal)):
return ~lit if is_Not else lit
obj = super(Literal, cls).__new__(cls)
obj.lit = lit
obj.is_Not = is_Not
return obj
@property
def arg(self):
return self.lit
def rcall(self, expr):
if callable(self.lit):
lit = self.lit(expr)
else:
try:
lit = self.lit.apply(expr)
except AttributeError:
lit = self.lit.rcall(expr)
return type(self)(lit, self.is_Not)
def __invert__(self):
is_Not = not self.is_Not
return Literal(self.lit, is_Not)
def __str__(self):
return '%s(%s, %s)' % (type(self).__name__, self.lit, self.is_Not)
__repr__ = __str__
def __eq__(self, other):
return self.arg == other.arg and self.is_Not == other.is_Not
def __hash__(self):
h = hash((type(self).__name__, self.arg, self.is_Not))
return h
class OR(object):
"""
A low-level implementation for Or
"""
def __init__(self, *args):
self._args = args
@property
def args(self):
return sorted(self._args, key=str)
def rcall(self, expr):
return type(self)(*[arg.rcall(expr)
for arg in self._args
])
def __invert__(self):
return AND(*[~arg for arg in self._args])
def __hash__(self):
return hash((type(self).__name__,) + tuple(self.args))
def __eq__(self, other):
return self.args == other.args
def __str__(self):
s = '(' + ' | '.join([str(arg) for arg in self.args]) + ')'
return s
__repr__ = __str__
class AND(object):
"""
A low-level implementation for And
"""
def __init__(self, *args):
self._args = args
def __invert__(self):
return OR(*[~arg for arg in self._args])
@property
def args(self):
return sorted(self._args, key=str)
def rcall(self, expr):
return type(self)(*[arg.rcall(expr)
for arg in self._args
])
def __hash__(self):
return hash((type(self).__name__,) + tuple(self.args))
def __eq__(self, other):
return self.args == other.args
def __str__(self):
s = '('+' & '.join([str(arg) for arg in self.args])+')'
return s
__repr__ = __str__
def to_NNF(expr):
"""
Generates the Negation Normal Form of any boolean expression in terms
of AND, OR, and Literal objects.
"""
if isinstance(expr, Not):
arg = expr.args[0]
tmp = to_NNF(arg) # Strategy: negate the NNF of expr
return ~tmp
if isinstance(expr, Or):
return OR(*[to_NNF(x) for x in Or.make_args(expr)])
if isinstance(expr, And):
return AND(*[to_NNF(x) for x in And.make_args(expr)])
if isinstance(expr, Nand):
tmp = AND(*[to_NNF(x) for x in expr.args])
return ~tmp
if isinstance(expr, Nor):
tmp = OR(*[to_NNF(x) for x in expr.args])
return ~tmp
if isinstance(expr, Xor):
cnfs = []
for i in range(0, len(expr.args) + 1, 2):
for neg in combinations(expr.args, i):
clause = [~to_NNF(s) if s in neg else to_NNF(s)
for s in expr.args]
cnfs.append(OR(*clause))
return AND(*cnfs)
if isinstance(expr, Xnor):
cnfs = []
for i in range(0, len(expr.args) + 1, 2):
for neg in combinations(expr.args, i):
clause = [~to_NNF(s) if s in neg else to_NNF(s)
for s in expr.args]
cnfs.append(OR(*clause))
return ~AND(*cnfs)
if isinstance(expr, Implies):
L, R = to_NNF(expr.args[0]), to_NNF(expr.args[1])
return OR(~L, R)
if isinstance(expr, Equivalent):
cnfs = []
for a, b in zip_longest(expr.args, expr.args[1:], fillvalue=expr.args[0]):
a = to_NNF(a)
b = to_NNF(b)
cnfs.append(OR(~a, b))
return AND(*cnfs)
if isinstance(expr, ITE):
L = to_NNF(expr.args[0])
M = to_NNF(expr.args[1])
R = to_NNF(expr.args[2])
return AND(OR(~L, M), OR(L, R))
else:
return Literal(expr)
def distribute_AND_over_OR(expr):
"""
Distributes AND over OR in the NNF expression.
Returns the result( Conjunctive Normal Form of expression)
as a CNF object.
"""
if not isinstance(expr, (AND, OR)):
tmp = set()
tmp.add(frozenset((expr,)))
return CNF(tmp)
if isinstance(expr, OR):
return CNF.all_or(*[distribute_AND_over_OR(arg)
for arg in expr._args])
if isinstance(expr, AND):
return CNF.all_and(*[distribute_AND_over_OR(arg)
for arg in expr._args])
class CNF(object):
"""
Class to represent CNF of a Boolean expression.
Consists of set of clauses, which themselves are stored as
frozenset of Literal objects.
"""
def __init__(self, clauses=None):
if not clauses:
clauses = set()
self.clauses = clauses
def add(self, prop):
clauses = CNF.to_CNF(prop).clauses
self.add_clauses(clauses)
def __str__(self):
s = ' & '.join(
['(' + ' | '.join([str(lit) for lit in clause]) +')'
for clause in self.clauses]
)
return s
def extend(self, props):
for p in props:
self.add(p)
return self
def copy(self):
return CNF(set(self.clauses))
def add_clauses(self, clauses):
self.clauses |= clauses
@classmethod
def from_prop(cls, prop):
res = cls()
res.add(prop)
return res
def __iand__(self, other):
self.add_clauses(other.clauses)
return self
def all_predicates(self):
predicates = set()
for c in self.clauses:
predicates |= {arg.lit for arg in c}
return predicates
def _or(self, cnf):
clauses = set()
for a, b in product(self.clauses, cnf.clauses):
tmp = set(a)
for t in b:
tmp.add(t)
clauses.add(frozenset(tmp))
return CNF(clauses)
def _and(self, cnf):
clauses = self.clauses.union(cnf.clauses)
return CNF(clauses)
def _not(self):
clss = list(self.clauses)
ll = set()
for x in clss[-1]:
ll.add(frozenset((~x,)))
ll = CNF(ll)
for rest in clss[:-1]:
p = set()
for x in rest:
p.add(frozenset((~x,)))
ll = ll._or(CNF(p))
return ll
def rcall(self, expr):
clause_list = list()
for clause in self.clauses:
lits = [arg.rcall(expr) for arg in clause]
clause_list.append(OR(*lits))
expr = AND(*clause_list)
return distribute_AND_over_OR(expr)
@classmethod
def all_or(cls, *cnfs):
b = cnfs[0].copy()
for rest in cnfs[1:]:
b = b._or(rest)
return b
@classmethod
def all_and(cls, *cnfs):
b = cnfs[0].copy()
for rest in cnfs[1:]:
b = b._and(rest)
return b
@classmethod
def to_CNF(cls, expr):
expr = to_NNF(expr)
expr = distribute_AND_over_OR(expr)
return expr
@classmethod
def CNF_to_cnf(cls, cnf):
"""
Converts CNF object to SymPy's boolean expression
retaining the form of expression.
"""
def remove_literal(arg):
return Not(arg.lit) if arg.is_Not else arg.lit
return And(*(Or(*(remove_literal(arg) for arg in clause)) for clause in cnf.clauses))
class EncodedCNF(object):
"""
Class for encoding the CNF expression.
"""
def __init__(self, data=None, encoding=None):
if not data and not encoding:
data = list()
encoding = dict()
self.data = data
self.encoding = encoding
self._symbols = list(encoding.keys())
def from_cnf(self, cnf):
self._symbols = list(cnf.all_predicates())
n = len(self._symbols)
self.encoding = dict(list(zip(self._symbols, list(range(1, n + 1)))))
self.data = [self.encode(clause) for clause in cnf.clauses]
@property
def symbols(self):
return self._symbols
@property
def variables(self):
return range(1, len(self._symbols) + 1)
def copy(self):
new_data = [set(clause) for clause in self.data]
return EncodedCNF(new_data, dict(self.encoding))
def add_prop(self, prop):
cnf = CNF.from_prop(prop)
self.add_from_cnf(cnf)
def add_from_cnf(self, cnf):
clauses = [self.encode(clause) for clause in cnf.clauses]
self.data += clauses
def encode_arg(self, arg):
literal = arg.lit
value = self.encoding.get(literal, None)
if value is None:
n = len(self._symbols)
self._symbols.append(literal)
value = self.encoding[literal] = n + 1
if arg.is_Not:
return -value
else:
return value
def encode(self, clause):
return {self.encode_arg(arg) if not arg.lit == S.false else 0 for arg in clause}
|
c833b90bbd0eb1fcf3a2401c11d7238b51a5e395308d6a9e5431e584dc27e1b6 | from __future__ import print_function, division
from sympy.core.add import Add
from sympy.core.compatibility import ordered
from sympy.core.function import expand_log
from sympy.core.power import Pow
from sympy.core.singleton import S
from sympy.core.symbol import Dummy
from sympy.functions.elementary.exponential import (LambertW, exp, log)
from sympy.functions.elementary.miscellaneous import root
from sympy.polys.polyroots import roots
from sympy.polys.polytools import Poly, factor
from sympy.core.function import _mexpand
from sympy.simplify.simplify import separatevars
from sympy.simplify.radsimp import collect
from sympy.simplify.simplify import powsimp
from sympy.solvers.solvers import solve, _invert
from sympy.utilities.iterables import uniq
def _filtered_gens(poly, symbol):
"""process the generators of ``poly``, returning the set of generators that
have ``symbol``. If there are two generators that are inverses of each other,
prefer the one that has no denominator.
Examples
========
>>> from sympy.solvers.bivariate import _filtered_gens
>>> from sympy import Poly, exp
>>> from sympy.abc import x
>>> _filtered_gens(Poly(x + 1/x + exp(x)), x)
{x, exp(x)}
"""
gens = {g for g in poly.gens if symbol in g.free_symbols}
for g in list(gens):
ag = 1/g
if g in gens and ag in gens:
if ag.as_numer_denom()[1] is not S.One:
g = ag
gens.remove(g)
return gens
def _mostfunc(lhs, func, X=None):
"""Returns the term in lhs which contains the most of the
func-type things e.g. log(log(x)) wins over log(x) if both terms appear.
``func`` can be a function (exp, log, etc...) or any other SymPy object,
like Pow.
If ``X`` is not ``None``, then the function returns the term composed with the
most ``func`` having the specified variable.
Examples
========
>>> from sympy.solvers.bivariate import _mostfunc
>>> from sympy.functions.elementary.exponential import exp
>>> from sympy.testing.pytest import raises
>>> from sympy.abc import x, y
>>> _mostfunc(exp(x) + exp(exp(x) + 2), exp)
exp(exp(x) + 2)
>>> _mostfunc(exp(x) + exp(exp(y) + 2), exp)
exp(exp(y) + 2)
>>> _mostfunc(exp(x) + exp(exp(y) + 2), exp, x)
exp(x)
>>> _mostfunc(x, exp, x) is None
True
>>> _mostfunc(exp(x) + exp(x*y), exp, x)
exp(x)
"""
fterms = [tmp for tmp in lhs.atoms(func) if (not X or
X.is_Symbol and X in tmp.free_symbols or
not X.is_Symbol and tmp.has(X))]
if len(fterms) == 1:
return fterms[0]
elif fterms:
return max(list(ordered(fterms)), key=lambda x: x.count(func))
return None
def _linab(arg, symbol):
"""Return ``a, b, X`` assuming ``arg`` can be written as ``a*X + b``
where ``X`` is a symbol-dependent factor and ``a`` and ``b`` are
independent of ``symbol``.
Examples
========
>>> from sympy.functions.elementary.exponential import exp
>>> from sympy.solvers.bivariate import _linab
>>> from sympy.abc import x, y
>>> from sympy import S
>>> _linab(S(2), x)
(2, 0, 1)
>>> _linab(2*x, x)
(2, 0, x)
>>> _linab(y + y*x + 2*x, x)
(y + 2, y, x)
>>> _linab(3 + 2*exp(x), x)
(2, 3, exp(x))
"""
from sympy.core.exprtools import factor_terms
arg = factor_terms(arg.expand())
ind, dep = arg.as_independent(symbol)
if arg.is_Mul and dep.is_Add:
a, b, x = _linab(dep, symbol)
return ind*a, ind*b, x
if not arg.is_Add:
b = 0
a, x = ind, dep
else:
b = ind
a, x = separatevars(dep).as_independent(symbol, as_Add=False)
if x.could_extract_minus_sign():
a = -a
x = -x
return a, b, x
def _lambert(eq, x):
"""
Given an expression assumed to be in the form
``F(X, a..f) = a*log(b*X + c) + d*X + f = 0``
where X = g(x) and x = g^-1(X), return the Lambert solution,
``x = g^-1(-c/b + (a/d)*W(d/(a*b)*exp(c*d/a/b)*exp(-f/a)))``.
"""
eq = _mexpand(expand_log(eq))
mainlog = _mostfunc(eq, log, x)
if not mainlog:
return [] # violated assumptions
other = eq.subs(mainlog, 0)
if isinstance(-other, log):
eq = (eq - other).subs(mainlog, mainlog.args[0])
mainlog = mainlog.args[0]
if not isinstance(mainlog, log):
return [] # violated assumptions
other = -(-other).args[0]
eq += other
if not x in other.free_symbols:
return [] # violated assumptions
d, f, X2 = _linab(other, x)
logterm = collect(eq - other, mainlog)
a = logterm.as_coefficient(mainlog)
if a is None or x in a.free_symbols:
return [] # violated assumptions
logarg = mainlog.args[0]
b, c, X1 = _linab(logarg, x)
if X1 != X2:
return [] # violated assumptions
# invert the generator X1 so we have x(u)
u = Dummy('rhs')
xusolns = solve(X1 - u, x)
# There are infinitely many branches for LambertW
# but only branches for k = -1 and 0 might be real. The k = 0
# branch is real and the k = -1 branch is real if the LambertW argumen
# in in range [-1/e, 0]. Since `solve` does not return infinite
# solutions we will only include the -1 branch if it tests as real.
# Otherwise, inclusion of any LambertW in the solution indicates to
# the user that there are imaginary solutions corresponding to
# different k values.
lambert_real_branches = [-1, 0]
sol = []
# solution of the given Lambert equation is like
# sol = -c/b + (a/d)*LambertW(arg, k),
# where arg = d/(a*b)*exp((c*d-b*f)/a/b) and k in lambert_real_branches.
# Instead of considering the single arg, `d/(a*b)*exp((c*d-b*f)/a/b)`,
# the individual `p` roots obtained when writing `exp((c*d-b*f)/a/b)`
# as `exp(A/p) = exp(A)**(1/p)`, where `p` is an Integer, are used.
# calculating args for LambertW
num, den = ((c*d-b*f)/a/b).as_numer_denom()
p, den = den.as_coeff_Mul()
e = exp(num/den)
t = Dummy('t')
args = [d/(a*b)*t for t in roots(t**p - e, t).keys()]
# calculating solutions from args
for arg in args:
for k in lambert_real_branches:
w = LambertW(arg, k)
if k and not w.is_real:
continue
rhs = -c/b + (a/d)*w
for xu in xusolns:
sol.append(xu.subs(u, rhs))
return sol
def _solve_lambert(f, symbol, gens):
"""Return solution to ``f`` if it is a Lambert-type expression
else raise NotImplementedError.
For ``f(X, a..f) = a*log(b*X + c) + d*X - f = 0`` the solution
for ``X`` is ``X = -c/b + (a/d)*W(d/(a*b)*exp(c*d/a/b)*exp(f/a))``.
There are a variety of forms for `f(X, a..f)` as enumerated below:
1a1)
if B**B = R for R not in [0, 1] (since those cases would already
be solved before getting here) then log of both sides gives
log(B) + log(log(B)) = log(log(R)) and
X = log(B), a = 1, b = 1, c = 0, d = 1, f = log(log(R))
1a2)
if B*(b*log(B) + c)**a = R then log of both sides gives
log(B) + a*log(b*log(B) + c) = log(R) and
X = log(B), d=1, f=log(R)
1b)
if a*log(b*B + c) + d*B = R and
X = B, f = R
2a)
if (b*B + c)*exp(d*B + g) = R then log of both sides gives
log(b*B + c) + d*B + g = log(R) and
X = B, a = 1, f = log(R) - g
2b)
if g*exp(d*B + h) - b*B = c then the log form is
log(g) + d*B + h - log(b*B + c) = 0 and
X = B, a = -1, f = -h - log(g)
3)
if d*p**(a*B + g) - b*B = c then the log form is
log(d) + (a*B + g)*log(p) - log(b*B + c) = 0 and
X = B, a = -1, d = a*log(p), f = -log(d) - g*log(p)
"""
def _solve_even_degree_expr(expr, t, symbol):
"""Return the unique solutions of equations derived from
``expr`` by replacing ``t`` with ``+/- symbol``.
Parameters
==========
expr : Expr
The expression which includes a dummy variable t to be
replaced with +symbol and -symbol.
symbol : Symbol
The symbol for which a solution is being sought.
Returns
=======
List of unique solution of the two equations generated by
replacing ``t`` with positive and negative ``symbol``.
Notes
=====
If ``expr = 2*log(t) + x/2` then solutions for
``2*log(x) + x/2 = 0`` and ``2*log(-x) + x/2 = 0`` are
returned by this function. Though this may seem
counter-intuitive, one must note that the ``expr`` being
solved here has been derived from a different expression. For
an expression like ``eq = x**2*g(x) = 1``, if we take the
log of both sides we obtain ``log(x**2) + log(g(x)) = 0``. If
x is positive then this simplifies to
``2*log(x) + log(g(x)) = 0``; the Lambert-solving routines will
return solutions for this, but we must also consider the
solutions for ``2*log(-x) + log(g(x))`` since those must also
be a solution of ``eq`` which has the same value when the ``x``
in ``x**2`` is negated. If `g(x)` does not have even powers of
symbol then we don't want to replace the ``x`` there with
``-x``. So the role of the ``t`` in the expression received by
this function is to mark where ``+/-x`` should be inserted
before obtaining the Lambert solutions.
"""
nlhs, plhs = [
expr.xreplace({t: sgn*symbol}) for sgn in (-1, 1)]
sols = _solve_lambert(nlhs, symbol, gens)
if plhs != nlhs:
sols.extend(_solve_lambert(plhs, symbol, gens))
# uniq is needed for a case like
# 2*log(t) - log(-z**2) + log(z + log(x) + log(z))
# where subtituting t with +/-x gives all the same solution;
# uniq, rather than list(set()), is used to maintain canonical
# order
return list(uniq(sols))
nrhs, lhs = f.as_independent(symbol, as_Add=True)
rhs = -nrhs
lamcheck = [tmp for tmp in gens
if (tmp.func in [exp, log] or
(tmp.is_Pow and symbol in tmp.exp.free_symbols))]
if not lamcheck:
raise NotImplementedError()
if lhs.is_Add or lhs.is_Mul:
# replacing all even_degrees of symbol with dummy variable t
# since these will need special handling; non-Add/Mul do not
# need this handling
t = Dummy('t', **symbol.assumptions0)
lhs = lhs.replace(
lambda i: # find symbol**even
i.is_Pow and i.base == symbol and i.exp.is_even,
lambda i: # replace t**even
t**i.exp)
if lhs.is_Add and lhs.has(t):
t_indep = lhs.subs(t, 0)
t_term = lhs - t_indep
_rhs = rhs - t_indep
if not t_term.is_Add and _rhs and not (
t_term.has(S.ComplexInfinity, S.NaN)):
eq = expand_log(log(t_term) - log(_rhs))
return _solve_even_degree_expr(eq, t, symbol)
elif lhs.is_Mul and rhs:
# this needs to happen whether t is present or not
lhs = expand_log(log(lhs), force=True)
rhs = log(rhs)
if lhs.has(t) and lhs.is_Add:
# it expanded from Mul to Add
eq = lhs - rhs
return _solve_even_degree_expr(eq, t, symbol)
# restore symbol in lhs
lhs = lhs.xreplace({t: symbol})
lhs = powsimp(factor(lhs, deep=True))
# make sure we have inverted as completely as possible
r = Dummy()
i, lhs = _invert(lhs - r, symbol)
rhs = i.xreplace({r: rhs})
# For the first forms:
#
# 1a1) B**B = R will arrive here as B*log(B) = log(R)
# lhs is Mul so take log of both sides:
# log(B) + log(log(B)) = log(log(R))
# 1a2) B*(b*log(B) + c)**a = R will arrive unchanged so
# lhs is Mul, so take log of both sides:
# log(B) + a*log(b*log(B) + c) = log(R)
# 1b) d*log(a*B + b) + c*B = R will arrive unchanged so
# lhs is Add, so isolate c*B and expand log of both sides:
# log(c) + log(B) = log(R - d*log(a*B + b))
soln = []
if not soln:
mainlog = _mostfunc(lhs, log, symbol)
if mainlog:
if lhs.is_Mul and rhs != 0:
soln = _lambert(log(lhs) - log(rhs), symbol)
elif lhs.is_Add:
other = lhs.subs(mainlog, 0)
if other and not other.is_Add and [
tmp for tmp in other.atoms(Pow)
if symbol in tmp.free_symbols]:
if not rhs:
diff = log(other) - log(other - lhs)
else:
diff = log(lhs - other) - log(rhs - other)
soln = _lambert(expand_log(diff), symbol)
else:
#it's ready to go
soln = _lambert(lhs - rhs, symbol)
# For the next forms,
#
# collect on main exp
# 2a) (b*B + c)*exp(d*B + g) = R
# lhs is mul, so take log of both sides:
# log(b*B + c) + d*B = log(R) - g
# 2b) g*exp(d*B + h) - b*B = R
# lhs is add, so add b*B to both sides,
# take the log of both sides and rearrange to give
# log(R + b*B) - d*B = log(g) + h
if not soln:
mainexp = _mostfunc(lhs, exp, symbol)
if mainexp:
lhs = collect(lhs, mainexp)
if lhs.is_Mul and rhs != 0:
soln = _lambert(expand_log(log(lhs) - log(rhs)), symbol)
elif lhs.is_Add:
# move all but mainexp-containing term to rhs
other = lhs.subs(mainexp, 0)
mainterm = lhs - other
rhs = rhs - other
if (mainterm.could_extract_minus_sign() and
rhs.could_extract_minus_sign()):
mainterm *= -1
rhs *= -1
diff = log(mainterm) - log(rhs)
soln = _lambert(expand_log(diff), symbol)
# For the last form:
#
# 3) d*p**(a*B + g) - b*B = c
# collect on main pow, add b*B to both sides,
# take log of both sides and rearrange to give
# a*B*log(p) - log(b*B + c) = -log(d) - g*log(p)
if not soln:
mainpow = _mostfunc(lhs, Pow, symbol)
if mainpow and symbol in mainpow.exp.free_symbols:
lhs = collect(lhs, mainpow)
if lhs.is_Mul and rhs != 0:
# b*B = 0
soln = _lambert(expand_log(log(lhs) - log(rhs)), symbol)
elif lhs.is_Add:
# move all but mainpow-containing term to rhs
other = lhs.subs(mainpow, 0)
mainterm = lhs - other
rhs = rhs - other
diff = log(mainterm) - log(rhs)
soln = _lambert(expand_log(diff), symbol)
if not soln:
raise NotImplementedError('%s does not appear to have a solution in '
'terms of LambertW' % f)
return list(ordered(soln))
def bivariate_type(f, x, y, **kwargs):
"""Given an expression, f, 3 tests will be done to see what type
of composite bivariate it might be, options for u(x, y) are::
x*y
x+y
x*y+x
x*y+y
If it matches one of these types, ``u(x, y)``, ``P(u)`` and dummy
variable ``u`` will be returned. Solving ``P(u)`` for ``u`` and
equating the solutions to ``u(x, y)`` and then solving for ``x`` or
``y`` is equivalent to solving the original expression for ``x`` or
``y``. If ``x`` and ``y`` represent two functions in the same
variable, e.g. ``x = g(t)`` and ``y = h(t)``, then if ``u(x, y) - p``
can be solved for ``t`` then these represent the solutions to
``P(u) = 0`` when ``p`` are the solutions of ``P(u) = 0``.
Only positive values of ``u`` are considered.
Examples
========
>>> from sympy.solvers.solvers import solve
>>> from sympy.solvers.bivariate import bivariate_type
>>> from sympy.abc import x, y
>>> eq = (x**2 - 3).subs(x, x + y)
>>> bivariate_type(eq, x, y)
(x + y, _u**2 - 3, _u)
>>> uxy, pu, u = _
>>> usol = solve(pu, u); usol
[sqrt(3)]
>>> [solve(uxy - s) for s in solve(pu, u)]
[[{x: -y + sqrt(3)}]]
>>> all(eq.subs(s).equals(0) for sol in _ for s in sol)
True
"""
u = Dummy('u', positive=True)
if kwargs.pop('first', True):
p = Poly(f, x, y)
f = p.as_expr()
_x = Dummy()
_y = Dummy()
rv = bivariate_type(Poly(f.subs({x: _x, y: _y}), _x, _y), _x, _y, first=False)
if rv:
reps = {_x: x, _y: y}
return rv[0].xreplace(reps), rv[1].xreplace(reps), rv[2]
return
p = f
f = p.as_expr()
# f(x*y)
args = Add.make_args(p.as_expr())
new = []
for a in args:
a = _mexpand(a.subs(x, u/y))
free = a.free_symbols
if x in free or y in free:
break
new.append(a)
else:
return x*y, Add(*new), u
def ok(f, v, c):
new = _mexpand(f.subs(v, c))
free = new.free_symbols
return None if (x in free or y in free) else new
# f(a*x + b*y)
new = []
d = p.degree(x)
if p.degree(y) == d:
a = root(p.coeff_monomial(x**d), d)
b = root(p.coeff_monomial(y**d), d)
new = ok(f, x, (u - b*y)/a)
if new is not None:
return a*x + b*y, new, u
# f(a*x*y + b*y)
new = []
d = p.degree(x)
if p.degree(y) == d:
for itry in range(2):
a = root(p.coeff_monomial(x**d*y**d), d)
b = root(p.coeff_monomial(y**d), d)
new = ok(f, x, (u - b*y)/a/y)
if new is not None:
return a*x*y + b*y, new, u
x, y = y, x
|
b23c3333631968425280eca2b7a03ed307f4118384730272c726c44fadb412a1 | r"""
This module is intended for solving recurrences or, in other words,
difference equations. Currently supported are linear, inhomogeneous
equations with polynomial or rational coefficients.
The solutions are obtained among polynomials, rational functions,
hypergeometric terms, or combinations of hypergeometric term which
are pairwise dissimilar.
``rsolve_X`` functions were meant as a low level interface
for ``rsolve`` which would use Mathematica's syntax.
Given a recurrence relation:
.. math:: a_{k}(n) y(n+k) + a_{k-1}(n) y(n+k-1) +
... + a_{0}(n) y(n) = f(n)
where `k > 0` and `a_{i}(n)` are polynomials in `n`. To use
``rsolve_X`` we need to put all coefficients in to a list ``L`` of
`k+1` elements the following way:
``L = [a_{0}(n), ..., a_{k-1}(n), a_{k}(n)]``
where ``L[i]``, for `i=0, \ldots, k`, maps to
`a_{i}(n) y(n+i)` (`y(n+i)` is implicit).
For example if we would like to compute `m`-th Bernoulli polynomial
up to a constant (example was taken from rsolve_poly docstring),
then we would use `b(n+1) - b(n) = m n^{m-1}` recurrence, which
has solution `b(n) = B_m + C`.
Then ``L = [-1, 1]`` and `f(n) = m n^(m-1)` and finally for `m=4`:
>>> from sympy import Symbol, bernoulli, rsolve_poly
>>> n = Symbol('n', integer=True)
>>> rsolve_poly([-1, 1], 4*n**3, n)
C0 + n**4 - 2*n**3 + n**2
>>> bernoulli(4, n)
n**4 - 2*n**3 + n**2 - 1/30
For the sake of completeness, `f(n)` can be:
[1] a polynomial -> rsolve_poly
[2] a rational function -> rsolve_ratio
[3] a hypergeometric function -> rsolve_hyper
"""
from __future__ import print_function, division
from collections import defaultdict
from sympy.core.singleton import S
from sympy.core.numbers import Rational, I
from sympy.core.symbol import Symbol, Wild, Dummy
from sympy.core.relational import Equality
from sympy.core.add import Add
from sympy.core.mul import Mul
from sympy.core import sympify
from sympy.simplify import simplify, hypersimp, hypersimilar # type: ignore
from sympy.solvers import solve, solve_undetermined_coeffs
from sympy.polys import Poly, quo, gcd, lcm, roots, resultant
from sympy.functions import binomial, factorial, FallingFactorial, RisingFactorial
from sympy.matrices import Matrix, casoratian
from sympy.concrete import product
from sympy.core.compatibility import default_sort_key
from sympy.utilities.iterables import numbered_symbols
def rsolve_poly(coeffs, f, n, **hints):
r"""
Given linear recurrence operator `\operatorname{L}` of order
`k` with polynomial coefficients and inhomogeneous equation
`\operatorname{L} y = f`, where `f` is a polynomial, we seek for
all polynomial solutions over field `K` of characteristic zero.
The algorithm performs two basic steps:
(1) Compute degree `N` of the general polynomial solution.
(2) Find all polynomials of degree `N` or less
of `\operatorname{L} y = f`.
There are two methods for computing the polynomial solutions.
If the degree bound is relatively small, i.e. it's smaller than
or equal to the order of the recurrence, then naive method of
undetermined coefficients is being used. This gives system
of algebraic equations with `N+1` unknowns.
In the other case, the algorithm performs transformation of the
initial equation to an equivalent one, for which the system of
algebraic equations has only `r` indeterminates. This method is
quite sophisticated (in comparison with the naive one) and was
invented together by Abramov, Bronstein and Petkovsek.
It is possible to generalize the algorithm implemented here to
the case of linear q-difference and differential equations.
Lets say that we would like to compute `m`-th Bernoulli polynomial
up to a constant. For this we can use `b(n+1) - b(n) = m n^{m-1}`
recurrence, which has solution `b(n) = B_m + C`. For example:
>>> from sympy import Symbol, rsolve_poly
>>> n = Symbol('n', integer=True)
>>> rsolve_poly([-1, 1], 4*n**3, n)
C0 + n**4 - 2*n**3 + n**2
References
==========
.. [1] S. A. Abramov, M. Bronstein and M. Petkovsek, On polynomial
solutions of linear operator equations, in: T. Levelt, ed.,
Proc. ISSAC '95, ACM Press, New York, 1995, 290-296.
.. [2] M. Petkovsek, Hypergeometric solutions of linear recurrences
with polynomial coefficients, J. Symbolic Computation,
14 (1992), 243-264.
.. [3] M. Petkovsek, H. S. Wilf, D. Zeilberger, A = B, 1996.
"""
f = sympify(f)
if not f.is_polynomial(n):
return None
homogeneous = f.is_zero
r = len(coeffs) - 1
coeffs = [Poly(coeff, n) for coeff in coeffs]
polys = [Poly(0, n)]*(r + 1)
terms = [(S.Zero, S.NegativeInfinity)]*(r + 1)
for i in range(r + 1):
for j in range(i, r + 1):
polys[i] += coeffs[j]*(binomial(j, i).as_poly(n))
if not polys[i].is_zero:
(exp,), coeff = polys[i].LT()
terms[i] = (coeff, exp)
d = b = terms[0][1]
for i in range(1, r + 1):
if terms[i][1] > d:
d = terms[i][1]
if terms[i][1] - i > b:
b = terms[i][1] - i
d, b = int(d), int(b)
x = Dummy('x')
degree_poly = S.Zero
for i in range(r + 1):
if terms[i][1] - i == b:
degree_poly += terms[i][0]*FallingFactorial(x, i)
nni_roots = list(roots(degree_poly, x, filter='Z',
predicate=lambda r: r >= 0).keys())
if nni_roots:
N = [max(nni_roots)]
else:
N = []
if homogeneous:
N += [-b - 1]
else:
N += [f.as_poly(n).degree() - b, -b - 1]
N = int(max(N))
if N < 0:
if homogeneous:
if hints.get('symbols', False):
return (S.Zero, [])
else:
return S.Zero
else:
return None
if N <= r:
C = []
y = E = S.Zero
for i in range(N + 1):
C.append(Symbol('C' + str(i)))
y += C[i] * n**i
for i in range(r + 1):
E += coeffs[i].as_expr()*y.subs(n, n + i)
solutions = solve_undetermined_coeffs(E - f, C, n)
if solutions is not None:
C = [c for c in C if (c not in solutions)]
result = y.subs(solutions)
else:
return None # TBD
else:
A = r
U = N + A + b + 1
nni_roots = list(roots(polys[r], filter='Z',
predicate=lambda r: r >= 0).keys())
if nni_roots != []:
a = max(nni_roots) + 1
else:
a = S.Zero
def _zero_vector(k):
return [S.Zero] * k
def _one_vector(k):
return [S.One] * k
def _delta(p, k):
B = S.One
D = p.subs(n, a + k)
for i in range(1, k + 1):
B *= Rational(i - k - 1, i)
D += B * p.subs(n, a + k - i)
return D
alpha = {}
for i in range(-A, d + 1):
I = _one_vector(d + 1)
for k in range(1, d + 1):
I[k] = I[k - 1] * (x + i - k + 1)/k
alpha[i] = S.Zero
for j in range(A + 1):
for k in range(d + 1):
B = binomial(k, i + j)
D = _delta(polys[j].as_expr(), k)
alpha[i] += I[k]*B*D
V = Matrix(U, A, lambda i, j: int(i == j))
if homogeneous:
for i in range(A, U):
v = _zero_vector(A)
for k in range(1, A + b + 1):
if i - k < 0:
break
B = alpha[k - A].subs(x, i - k)
for j in range(A):
v[j] += B * V[i - k, j]
denom = alpha[-A].subs(x, i)
for j in range(A):
V[i, j] = -v[j] / denom
else:
G = _zero_vector(U)
for i in range(A, U):
v = _zero_vector(A)
g = S.Zero
for k in range(1, A + b + 1):
if i - k < 0:
break
B = alpha[k - A].subs(x, i - k)
for j in range(A):
v[j] += B * V[i - k, j]
g += B * G[i - k]
denom = alpha[-A].subs(x, i)
for j in range(A):
V[i, j] = -v[j] / denom
G[i] = (_delta(f, i - A) - g) / denom
P, Q = _one_vector(U), _zero_vector(A)
for i in range(1, U):
P[i] = (P[i - 1] * (n - a - i + 1)/i).expand()
for i in range(A):
Q[i] = Add(*[(v*p).expand() for v, p in zip(V[:, i], P)])
if not homogeneous:
h = Add(*[(g*p).expand() for g, p in zip(G, P)])
C = [Symbol('C' + str(i)) for i in range(A)]
g = lambda i: Add(*[c*_delta(q, i) for c, q in zip(C, Q)])
if homogeneous:
E = [g(i) for i in range(N + 1, U)]
else:
E = [g(i) + _delta(h, i) for i in range(N + 1, U)]
if E != []:
solutions = solve(E, *C)
if not solutions:
if homogeneous:
if hints.get('symbols', False):
return (S.Zero, [])
else:
return S.Zero
else:
return None
else:
solutions = {}
if homogeneous:
result = S.Zero
else:
result = h
for c, q in list(zip(C, Q)):
if c in solutions:
s = solutions[c]*q
C.remove(c)
else:
s = c*q
result += s.expand()
if hints.get('symbols', False):
return (result, C)
else:
return result
def rsolve_ratio(coeffs, f, n, **hints):
r"""
Given linear recurrence operator `\operatorname{L}` of order `k`
with polynomial coefficients and inhomogeneous equation
`\operatorname{L} y = f`, where `f` is a polynomial, we seek
for all rational solutions over field `K` of characteristic zero.
This procedure accepts only polynomials, however if you are
interested in solving recurrence with rational coefficients
then use ``rsolve`` which will pre-process the given equation
and run this procedure with polynomial arguments.
The algorithm performs two basic steps:
(1) Compute polynomial `v(n)` which can be used as universal
denominator of any rational solution of equation
`\operatorname{L} y = f`.
(2) Construct new linear difference equation by substitution
`y(n) = u(n)/v(n)` and solve it for `u(n)` finding all its
polynomial solutions. Return ``None`` if none were found.
Algorithm implemented here is a revised version of the original
Abramov's algorithm, developed in 1989. The new approach is much
simpler to implement and has better overall efficiency. This
method can be easily adapted to q-difference equations case.
Besides finding rational solutions alone, this functions is
an important part of Hyper algorithm were it is used to find
particular solution of inhomogeneous part of a recurrence.
Examples
========
>>> from sympy.abc import x
>>> from sympy.solvers.recurr import rsolve_ratio
>>> rsolve_ratio([-2*x**3 + x**2 + 2*x - 1, 2*x**3 + x**2 - 6*x,
... - 2*x**3 - 11*x**2 - 18*x - 9, 2*x**3 + 13*x**2 + 22*x + 8], 0, x)
C2*(2*x - 3)/(2*(x**2 - 1))
References
==========
.. [1] S. A. Abramov, Rational solutions of linear difference
and q-difference equations with polynomial coefficients,
in: T. Levelt, ed., Proc. ISSAC '95, ACM Press, New York,
1995, 285-289
See Also
========
rsolve_hyper
"""
f = sympify(f)
if not f.is_polynomial(n):
return None
coeffs = list(map(sympify, coeffs))
r = len(coeffs) - 1
A, B = coeffs[r], coeffs[0]
A = A.subs(n, n - r).expand()
h = Dummy('h')
res = resultant(A, B.subs(n, n + h), n)
if not res.is_polynomial(h):
p, q = res.as_numer_denom()
res = quo(p, q, h)
nni_roots = list(roots(res, h, filter='Z',
predicate=lambda r: r >= 0).keys())
if not nni_roots:
return rsolve_poly(coeffs, f, n, **hints)
else:
C, numers = S.One, [S.Zero]*(r + 1)
for i in range(int(max(nni_roots)), -1, -1):
d = gcd(A, B.subs(n, n + i), n)
A = quo(A, d, n)
B = quo(B, d.subs(n, n - i), n)
C *= Mul(*[d.subs(n, n - j) for j in range(i + 1)])
denoms = [C.subs(n, n + i) for i in range(r + 1)]
for i in range(r + 1):
g = gcd(coeffs[i], denoms[i], n)
numers[i] = quo(coeffs[i], g, n)
denoms[i] = quo(denoms[i], g, n)
for i in range(r + 1):
numers[i] *= Mul(*(denoms[:i] + denoms[i + 1:]))
result = rsolve_poly(numers, f * Mul(*denoms), n, **hints)
if result is not None:
if hints.get('symbols', False):
return (simplify(result[0] / C), result[1])
else:
return simplify(result / C)
else:
return None
def rsolve_hyper(coeffs, f, n, **hints):
r"""
Given linear recurrence operator `\operatorname{L}` of order `k`
with polynomial coefficients and inhomogeneous equation
`\operatorname{L} y = f` we seek for all hypergeometric solutions
over field `K` of characteristic zero.
The inhomogeneous part can be either hypergeometric or a sum
of a fixed number of pairwise dissimilar hypergeometric terms.
The algorithm performs three basic steps:
(1) Group together similar hypergeometric terms in the
inhomogeneous part of `\operatorname{L} y = f`, and find
particular solution using Abramov's algorithm.
(2) Compute generating set of `\operatorname{L}` and find basis
in it, so that all solutions are linearly independent.
(3) Form final solution with the number of arbitrary
constants equal to dimension of basis of `\operatorname{L}`.
Term `a(n)` is hypergeometric if it is annihilated by first order
linear difference equations with polynomial coefficients or, in
simpler words, if consecutive term ratio is a rational function.
The output of this procedure is a linear combination of fixed
number of hypergeometric terms. However the underlying method
can generate larger class of solutions - D'Alembertian terms.
Note also that this method not only computes the kernel of the
inhomogeneous equation, but also reduces in to a basis so that
solutions generated by this procedure are linearly independent
Examples
========
>>> from sympy.solvers import rsolve_hyper
>>> from sympy.abc import x
>>> rsolve_hyper([-1, -1, 1], 0, x)
C0*(1/2 - sqrt(5)/2)**x + C1*(1/2 + sqrt(5)/2)**x
>>> rsolve_hyper([-1, 1], 1 + x, x)
C0 + x*(x + 1)/2
References
==========
.. [1] M. Petkovsek, Hypergeometric solutions of linear recurrences
with polynomial coefficients, J. Symbolic Computation,
14 (1992), 243-264.
.. [2] M. Petkovsek, H. S. Wilf, D. Zeilberger, A = B, 1996.
"""
coeffs = list(map(sympify, coeffs))
f = sympify(f)
r, kernel, symbols = len(coeffs) - 1, [], set()
if not f.is_zero:
if f.is_Add:
similar = {}
for g in f.expand().args:
if not g.is_hypergeometric(n):
return None
for h in similar.keys():
if hypersimilar(g, h, n):
similar[h] += g
break
else:
similar[g] = S.Zero
inhomogeneous = []
for g, h in similar.items():
inhomogeneous.append(g + h)
elif f.is_hypergeometric(n):
inhomogeneous = [f]
else:
return None
for i, g in enumerate(inhomogeneous):
coeff, polys = S.One, coeffs[:]
denoms = [S.One]*(r + 1)
s = hypersimp(g, n)
for j in range(1, r + 1):
coeff *= s.subs(n, n + j - 1)
p, q = coeff.as_numer_denom()
polys[j] *= p
denoms[j] = q
for j in range(r + 1):
polys[j] *= Mul(*(denoms[:j] + denoms[j + 1:]))
R = rsolve_poly(polys, Mul(*denoms), n)
if not (R is None or R is S.Zero):
inhomogeneous[i] *= R
else:
return None
result = Add(*inhomogeneous)
else:
result = S.Zero
Z = Dummy('Z')
p, q = coeffs[0], coeffs[r].subs(n, n - r + 1)
p_factors = [z for z in roots(p, n).keys()]
q_factors = [z for z in roots(q, n).keys()]
factors = [(S.One, S.One)]
for p in p_factors:
for q in q_factors:
if p.is_integer and q.is_integer and p <= q:
continue
else:
factors += [(n - p, n - q)]
p = [(n - p, S.One) for p in p_factors]
q = [(S.One, n - q) for q in q_factors]
factors = p + factors + q
for A, B in factors:
polys, degrees = [], []
D = A*B.subs(n, n + r - 1)
for i in range(r + 1):
a = Mul(*[A.subs(n, n + j) for j in range(i)])
b = Mul(*[B.subs(n, n + j) for j in range(i, r)])
poly = quo(coeffs[i]*a*b, D, n)
polys.append(poly.as_poly(n))
if not poly.is_zero:
degrees.append(polys[i].degree())
if degrees:
d, poly = max(degrees), S.Zero
else:
return None
for i in range(r + 1):
coeff = polys[i].nth(d)
if coeff is not S.Zero:
poly += coeff * Z**i
for z in roots(poly, Z).keys():
if z.is_zero:
continue
(C, s) = rsolve_poly([polys[i].as_expr()*z**i for i in range(r + 1)], 0, n, symbols=True)
if C is not None and C is not S.Zero:
symbols |= set(s)
ratio = z * A * C.subs(n, n + 1) / B / C
ratio = simplify(ratio)
# If there is a nonnegative root in the denominator of the ratio,
# this indicates that the term y(n_root) is zero, and one should
# start the product with the term y(n_root + 1).
n0 = 0
for n_root in roots(ratio.as_numer_denom()[1], n).keys():
if n_root.has(I):
return None
elif (n0 < (n_root + 1)) == True:
n0 = n_root + 1
K = product(ratio, (n, n0, n - 1))
if K.has(factorial, FallingFactorial, RisingFactorial):
K = simplify(K)
if casoratian(kernel + [K], n, zero=False) != 0:
kernel.append(K)
kernel.sort(key=default_sort_key)
sk = list(zip(numbered_symbols('C'), kernel))
if sk:
for C, ker in sk:
result += C * ker
else:
return None
if hints.get('symbols', False):
symbols |= {s for s, k in sk}
return (result, list(symbols))
else:
return result
def rsolve(f, y, init=None):
r"""
Solve univariate recurrence with rational coefficients.
Given `k`-th order linear recurrence `\operatorname{L} y = f`,
or equivalently:
.. math:: a_{k}(n) y(n+k) + a_{k-1}(n) y(n+k-1) +
\cdots + a_{0}(n) y(n) = f(n)
where `a_{i}(n)`, for `i=0, \ldots, k`, are polynomials or rational
functions in `n`, and `f` is a hypergeometric function or a sum
of a fixed number of pairwise dissimilar hypergeometric terms in
`n`, finds all solutions or returns ``None``, if none were found.
Initial conditions can be given as a dictionary in two forms:
(1) ``{ n_0 : v_0, n_1 : v_1, ..., n_m : v_m}``
(2) ``{y(n_0) : v_0, y(n_1) : v_1, ..., y(n_m) : v_m}``
or as a list ``L`` of values:
``L = [v_0, v_1, ..., v_m]``
where ``L[i] = v_i``, for `i=0, \ldots, m`, maps to `y(n_i)`.
Examples
========
Lets consider the following recurrence:
.. math:: (n - 1) y(n + 2) - (n^2 + 3 n - 2) y(n + 1) +
2 n (n + 1) y(n) = 0
>>> from sympy import Function, rsolve
>>> from sympy.abc import n
>>> y = Function('y')
>>> f = (n - 1)*y(n + 2) - (n**2 + 3*n - 2)*y(n + 1) + 2*n*(n + 1)*y(n)
>>> rsolve(f, y(n))
2**n*C0 + C1*factorial(n)
>>> rsolve(f, y(n), {y(0):0, y(1):3})
3*2**n - 3*factorial(n)
See Also
========
rsolve_poly, rsolve_ratio, rsolve_hyper
"""
if isinstance(f, Equality):
f = f.lhs - f.rhs
n = y.args[0]
k = Wild('k', exclude=(n,))
# Preprocess user input to allow things like
# y(n) + a*(y(n + 1) + y(n - 1))/2
f = f.expand().collect(y.func(Wild('m', integer=True)))
h_part = defaultdict(lambda: S.Zero)
i_part = S.Zero
for g in Add.make_args(f):
coeff = S.One
kspec = None
for h in Mul.make_args(g):
if h.is_Function:
if h.func == y.func:
result = h.args[0].match(n + k)
if result is not None:
kspec = int(result[k])
else:
raise ValueError(
"'%s(%s + k)' expected, got '%s'" % (y.func, n, h))
else:
raise ValueError(
"'%s' expected, got '%s'" % (y.func, h.func))
else:
coeff *= h
if kspec is not None:
h_part[kspec] += coeff
else:
i_part += coeff
for k, coeff in h_part.items():
h_part[k] = simplify(coeff)
common = S.One
for coeff in h_part.values():
if coeff.is_rational_function(n):
if not coeff.is_polynomial(n):
common = lcm(common, coeff.as_numer_denom()[1], n)
else:
raise ValueError(
"Polynomial or rational function expected, got '%s'" % coeff)
i_numer, i_denom = i_part.as_numer_denom()
if i_denom.is_polynomial(n):
common = lcm(common, i_denom, n)
if common is not S.One:
for k, coeff in h_part.items():
numer, denom = coeff.as_numer_denom()
h_part[k] = numer*quo(common, denom, n)
i_part = i_numer*quo(common, i_denom, n)
K_min = min(h_part.keys())
if K_min < 0:
K = abs(K_min)
H_part = defaultdict(lambda: S.Zero)
i_part = i_part.subs(n, n + K).expand()
common = common.subs(n, n + K).expand()
for k, coeff in h_part.items():
H_part[k + K] = coeff.subs(n, n + K).expand()
else:
H_part = h_part
K_max = max(H_part.keys())
coeffs = [H_part[i] for i in range(K_max + 1)]
result = rsolve_hyper(coeffs, -i_part, n, symbols=True)
if result is None:
return None
solution, symbols = result
if init == {} or init == []:
init = None
if symbols and init is not None:
if isinstance(init, list):
init = {i: init[i] for i in range(len(init))}
equations = []
for k, v in init.items():
try:
i = int(k)
except TypeError:
if k.is_Function and k.func == y.func:
i = int(k.args[0])
else:
raise ValueError("Integer or term expected, got '%s'" % k)
eq = solution.subs(n, i) - v
if eq.has(S.NaN):
eq = solution.limit(n, i) - v
equations.append(eq)
result = solve(equations, *symbols)
if not result:
return None
else:
solution = solution.subs(result)
return solution
|
d56108f6eb11167ccfb93cc37611871d001018ca9422ea3ee7c4f4d62184e86f | """
This module contains functions to:
- solve a single equation for a single variable, in any domain either real or complex.
- solve a single transcendental equation for a single variable in any domain either real or complex.
(currently supports solving in real domain only)
- solve a system of linear equations with N variables and M equations.
- solve a system of Non Linear Equations with N variables and M equations
"""
from __future__ import print_function, division
from sympy.core.sympify import sympify
from sympy.core import (S, Pow, Dummy, pi, Expr, Wild, Mul, Equality,
Add)
from sympy.core.containers import Tuple
from sympy.core.facts import InconsistentAssumptions
from sympy.core.numbers import I, Number, Rational, oo
from sympy.core.function import (Lambda, expand_complex, AppliedUndef,
expand_log, _mexpand)
from sympy.core.mod import Mod
from sympy.core.numbers import igcd
from sympy.core.relational import Eq, Ne, Relational
from sympy.core.symbol import Symbol
from sympy.core.sympify import _sympify
from sympy.simplify.simplify import simplify, fraction, trigsimp
from sympy.simplify import powdenest, logcombine
from sympy.functions import (log, Abs, tan, cot, sin, cos, sec, csc, exp,
acos, asin, acsc, asec, arg,
piecewise_fold, Piecewise)
from sympy.functions.elementary.trigonometric import (TrigonometricFunction,
HyperbolicFunction)
from sympy.functions.elementary.miscellaneous import real_root
from sympy.logic.boolalg import And
from sympy.sets import (FiniteSet, EmptySet, imageset, Interval, Intersection,
Union, ConditionSet, ImageSet, Complement, Contains)
from sympy.sets.sets import Set, ProductSet
from sympy.matrices import Matrix, MatrixBase
from sympy.ntheory import totient
from sympy.ntheory.factor_ import divisors
from sympy.ntheory.residue_ntheory import discrete_log, nthroot_mod
from sympy.polys import (roots, Poly, degree, together, PolynomialError,
RootOf, factor)
from sympy.polys.polyerrors import CoercionFailed
from sympy.polys.polytools import invert
from sympy.solvers.solvers import (checksol, denoms, unrad,
_simple_dens, recast_to_symbols)
from sympy.solvers.polysys import solve_poly_system
from sympy.solvers.inequalities import solve_univariate_inequality
from sympy.utilities import filldedent
from sympy.utilities.iterables import numbered_symbols, has_dups
from sympy.calculus.util import periodicity, continuous_domain
from sympy.core.compatibility import ordered, default_sort_key, is_sequence
from types import GeneratorType
from collections import defaultdict
def _masked(f, *atoms):
"""Return ``f``, with all objects given by ``atoms`` replaced with
Dummy symbols, ``d``, and the list of replacements, ``(d, e)``,
where ``e`` is an object of type given by ``atoms`` in which
any other instances of atoms have been recursively replaced with
Dummy symbols, too. The tuples are ordered so that if they are
applied in sequence, the origin ``f`` will be restored.
Examples
========
>>> from sympy import cos
>>> from sympy.abc import x
>>> from sympy.solvers.solveset import _masked
>>> f = cos(cos(x) + 1)
>>> f, reps = _masked(cos(1 + cos(x)), cos)
>>> f
_a1
>>> reps
[(_a1, cos(_a0 + 1)), (_a0, cos(x))]
>>> for d, e in reps:
... f = f.xreplace({d: e})
>>> f
cos(cos(x) + 1)
"""
sym = numbered_symbols('a', cls=Dummy, real=True)
mask = []
for a in ordered(f.atoms(*atoms)):
for i in mask:
a = a.replace(*i)
mask.append((a, next(sym)))
for i, (o, n) in enumerate(mask):
f = f.replace(o, n)
mask[i] = (n, o)
mask = list(reversed(mask))
return f, mask
def _invert(f_x, y, x, domain=S.Complexes):
r"""
Reduce the complex valued equation ``f(x) = y`` to a set of equations
``{g(x) = h_1(y), g(x) = h_2(y), ..., g(x) = h_n(y) }`` where ``g(x)`` is
a simpler function than ``f(x)``. The return value is a tuple ``(g(x),
set_h)``, where ``g(x)`` is a function of ``x`` and ``set_h`` is
the set of function ``{h_1(y), h_2(y), ..., h_n(y)}``.
Here, ``y`` is not necessarily a symbol.
The ``set_h`` contains the functions, along with the information
about the domain in which they are valid, through set
operations. For instance, if ``y = Abs(x) - n`` is inverted
in the real domain, then ``set_h`` is not simply
`{-n, n}` as the nature of `n` is unknown; rather, it is:
`Intersection([0, oo) {n}) U Intersection((-oo, 0], {-n})`
By default, the complex domain is used which means that inverting even
seemingly simple functions like ``exp(x)`` will give very different
results from those obtained in the real domain.
(In the case of ``exp(x)``, the inversion via ``log`` is multi-valued
in the complex domain, having infinitely many branches.)
If you are working with real values only (or you are not sure which
function to use) you should probably set the domain to
``S.Reals`` (or use `invert\_real` which does that automatically).
Examples
========
>>> from sympy.solvers.solveset import invert_complex, invert_real
>>> from sympy.abc import x, y
>>> from sympy import exp, log
When does exp(x) == y?
>>> invert_complex(exp(x), y, x)
(x, ImageSet(Lambda(_n, I*(2*_n*pi + arg(y)) + log(Abs(y))), Integers))
>>> invert_real(exp(x), y, x)
(x, Intersection(FiniteSet(log(y)), Reals))
When does exp(x) == 1?
>>> invert_complex(exp(x), 1, x)
(x, ImageSet(Lambda(_n, 2*_n*I*pi), Integers))
>>> invert_real(exp(x), 1, x)
(x, FiniteSet(0))
See Also
========
invert_real, invert_complex
"""
x = sympify(x)
if not x.is_Symbol:
raise ValueError("x must be a symbol")
f_x = sympify(f_x)
if x not in f_x.free_symbols:
raise ValueError("Inverse of constant function doesn't exist")
y = sympify(y)
if x in y.free_symbols:
raise ValueError("y should be independent of x ")
if domain.is_subset(S.Reals):
x1, s = _invert_real(f_x, FiniteSet(y), x)
else:
x1, s = _invert_complex(f_x, FiniteSet(y), x)
if not isinstance(s, FiniteSet) or x1 != x:
return x1, s
# Avoid adding gratuitous intersections with S.Complexes. Actual
# conditions should be handled by the respective inverters.
if domain is S.Complexes:
return x1, s
else:
return x1, s.intersection(domain)
invert_complex = _invert
def invert_real(f_x, y, x, domain=S.Reals):
"""
Inverts a real-valued function. Same as _invert, but sets
the domain to ``S.Reals`` before inverting.
"""
return _invert(f_x, y, x, domain)
def _invert_real(f, g_ys, symbol):
"""Helper function for _invert."""
if f == symbol:
return (f, g_ys)
n = Dummy('n', real=True)
if hasattr(f, 'inverse') and not isinstance(f, (
TrigonometricFunction,
HyperbolicFunction,
)):
if len(f.args) > 1:
raise ValueError("Only functions with one argument are supported.")
return _invert_real(f.args[0],
imageset(Lambda(n, f.inverse()(n)), g_ys),
symbol)
if isinstance(f, Abs):
return _invert_abs(f.args[0], g_ys, symbol)
if f.is_Add:
# f = g + h
g, h = f.as_independent(symbol)
if g is not S.Zero:
return _invert_real(h, imageset(Lambda(n, n - g), g_ys), symbol)
if f.is_Mul:
# f = g*h
g, h = f.as_independent(symbol)
if g is not S.One:
return _invert_real(h, imageset(Lambda(n, n/g), g_ys), symbol)
if f.is_Pow:
base, expo = f.args
base_has_sym = base.has(symbol)
expo_has_sym = expo.has(symbol)
if not expo_has_sym:
res = imageset(Lambda(n, real_root(n, expo)), g_ys)
if expo.is_rational:
numer, denom = expo.as_numer_denom()
if denom % 2 == 0:
base_positive = solveset(base >= 0, symbol, S.Reals)
res = imageset(Lambda(n, real_root(n, expo)
), g_ys.intersect(
Interval.Ropen(S.Zero, S.Infinity)))
_inv, _set = _invert_real(base, res, symbol)
return (_inv, _set.intersect(base_positive))
elif numer % 2 == 0:
n = Dummy('n')
neg_res = imageset(Lambda(n, -n), res)
return _invert_real(base, res + neg_res, symbol)
else:
return _invert_real(base, res, symbol)
else:
if not base.is_positive:
raise ValueError("x**w where w is irrational is not "
"defined for negative x")
return _invert_real(base, res, symbol)
if not base_has_sym:
rhs = g_ys.args[0]
if base.is_positive:
return _invert_real(expo,
imageset(Lambda(n, log(n, base, evaluate=False)), g_ys), symbol)
elif base.is_negative:
from sympy.core.power import integer_log
s, b = integer_log(rhs, base)
if b:
return _invert_real(expo, FiniteSet(s), symbol)
else:
return _invert_real(expo, S.EmptySet, symbol)
elif base.is_zero:
one = Eq(rhs, 1)
if one == S.true:
# special case: 0**x - 1
return _invert_real(expo, FiniteSet(0), symbol)
elif one == S.false:
return _invert_real(expo, S.EmptySet, symbol)
if isinstance(f, TrigonometricFunction):
if isinstance(g_ys, FiniteSet):
def inv(trig):
if isinstance(f, (sin, csc)):
F = asin if isinstance(f, sin) else acsc
return (lambda a: n*pi + (-1)**n*F(a),)
if isinstance(f, (cos, sec)):
F = acos if isinstance(f, cos) else asec
return (
lambda a: 2*n*pi + F(a),
lambda a: 2*n*pi - F(a),)
if isinstance(f, (tan, cot)):
return (lambda a: n*pi + f.inverse()(a),)
n = Dummy('n', integer=True)
invs = S.EmptySet
for L in inv(f):
invs += Union(*[imageset(Lambda(n, L(g)), S.Integers) for g in g_ys])
return _invert_real(f.args[0], invs, symbol)
return (f, g_ys)
def _invert_complex(f, g_ys, symbol):
"""Helper function for _invert."""
if f == symbol:
return (f, g_ys)
n = Dummy('n')
if f.is_Add:
# f = g + h
g, h = f.as_independent(symbol)
if g is not S.Zero:
return _invert_complex(h, imageset(Lambda(n, n - g), g_ys), symbol)
if f.is_Mul:
# f = g*h
g, h = f.as_independent(symbol)
if g is not S.One:
if g in set([S.NegativeInfinity, S.ComplexInfinity, S.Infinity]):
return (h, S.EmptySet)
return _invert_complex(h, imageset(Lambda(n, n/g), g_ys), symbol)
if hasattr(f, 'inverse') and \
not isinstance(f, TrigonometricFunction) and \
not isinstance(f, HyperbolicFunction) and \
not isinstance(f, exp):
if len(f.args) > 1:
raise ValueError("Only functions with one argument are supported.")
return _invert_complex(f.args[0],
imageset(Lambda(n, f.inverse()(n)), g_ys), symbol)
if isinstance(f, exp):
if isinstance(g_ys, FiniteSet):
exp_invs = Union(*[imageset(Lambda(n, I*(2*n*pi + arg(g_y)) +
log(Abs(g_y))), S.Integers)
for g_y in g_ys if g_y != 0])
return _invert_complex(f.args[0], exp_invs, symbol)
return (f, g_ys)
def _invert_abs(f, g_ys, symbol):
"""Helper function for inverting absolute value functions.
Returns the complete result of inverting an absolute value
function along with the conditions which must also be satisfied.
If it is certain that all these conditions are met, a `FiniteSet`
of all possible solutions is returned. If any condition cannot be
satisfied, an `EmptySet` is returned. Otherwise, a `ConditionSet`
of the solutions, with all the required conditions specified, is
returned.
"""
if not g_ys.is_FiniteSet:
# this could be used for FiniteSet, but the
# results are more compact if they aren't, e.g.
# ConditionSet(x, Contains(n, Interval(0, oo)), {-n, n}) vs
# Union(Intersection(Interval(0, oo), {n}), Intersection(Interval(-oo, 0), {-n}))
# for the solution of abs(x) - n
pos = Intersection(g_ys, Interval(0, S.Infinity))
parg = _invert_real(f, pos, symbol)
narg = _invert_real(-f, pos, symbol)
if parg[0] != narg[0]:
raise NotImplementedError
return parg[0], Union(narg[1], parg[1])
# check conditions: all these must be true. If any are unknown
# then return them as conditions which must be satisfied
unknown = []
for a in g_ys.args:
ok = a.is_nonnegative if a.is_Number else a.is_positive
if ok is None:
unknown.append(a)
elif not ok:
return symbol, S.EmptySet
if unknown:
conditions = And(*[Contains(i, Interval(0, oo))
for i in unknown])
else:
conditions = True
n = Dummy('n', real=True)
# this is slightly different than above: instead of solving
# +/-f on positive values, here we solve for f on +/- g_ys
g_x, values = _invert_real(f, Union(
imageset(Lambda(n, n), g_ys),
imageset(Lambda(n, -n), g_ys)), symbol)
return g_x, ConditionSet(g_x, conditions, values)
def domain_check(f, symbol, p):
"""Returns False if point p is infinite or any subexpression of f
is infinite or becomes so after replacing symbol with p. If none of
these conditions is met then True will be returned.
Examples
========
>>> from sympy import Mul, oo
>>> from sympy.abc import x
>>> from sympy.solvers.solveset import domain_check
>>> g = 1/(1 + (1/(x + 1))**2)
>>> domain_check(g, x, -1)
False
>>> domain_check(x**2, x, 0)
True
>>> domain_check(1/x, x, oo)
False
* The function relies on the assumption that the original form
of the equation has not been changed by automatic simplification.
>>> domain_check(x/x, x, 0) # x/x is automatically simplified to 1
True
* To deal with automatic evaluations use evaluate=False:
>>> domain_check(Mul(x, 1/x, evaluate=False), x, 0)
False
"""
f, p = sympify(f), sympify(p)
if p.is_infinite:
return False
return _domain_check(f, symbol, p)
def _domain_check(f, symbol, p):
# helper for domain check
if f.is_Atom and f.is_finite:
return True
elif f.subs(symbol, p).is_infinite:
return False
else:
return all([_domain_check(g, symbol, p)
for g in f.args])
def _is_finite_with_finite_vars(f, domain=S.Complexes):
"""
Return True if the given expression is finite. For symbols that
don't assign a value for `complex` and/or `real`, the domain will
be used to assign a value; symbols that don't assign a value
for `finite` will be made finite. All other assumptions are
left unmodified.
"""
def assumptions(s):
A = s.assumptions0
A.setdefault('finite', A.get('finite', True))
if domain.is_subset(S.Reals):
# if this gets set it will make complex=True, too
A.setdefault('real', True)
else:
# don't change 'real' because being complex implies
# nothing about being real
A.setdefault('complex', True)
return A
reps = {s: Dummy(**assumptions(s)) for s in f.free_symbols}
return f.xreplace(reps).is_finite
def _is_function_class_equation(func_class, f, symbol):
""" Tests whether the equation is an equation of the given function class.
The given equation belongs to the given function class if it is
comprised of functions of the function class which are multiplied by
or added to expressions independent of the symbol. In addition, the
arguments of all such functions must be linear in the symbol as well.
Examples
========
>>> from sympy.solvers.solveset import _is_function_class_equation
>>> from sympy import tan, sin, tanh, sinh, exp
>>> from sympy.abc import x
>>> from sympy.functions.elementary.trigonometric import (TrigonometricFunction,
... HyperbolicFunction)
>>> _is_function_class_equation(TrigonometricFunction, exp(x) + tan(x), x)
False
>>> _is_function_class_equation(TrigonometricFunction, tan(x) + sin(x), x)
True
>>> _is_function_class_equation(TrigonometricFunction, tan(x**2), x)
False
>>> _is_function_class_equation(TrigonometricFunction, tan(x + 2), x)
True
>>> _is_function_class_equation(HyperbolicFunction, tanh(x) + sinh(x), x)
True
"""
if f.is_Mul or f.is_Add:
return all(_is_function_class_equation(func_class, arg, symbol)
for arg in f.args)
if f.is_Pow:
if not f.exp.has(symbol):
return _is_function_class_equation(func_class, f.base, symbol)
else:
return False
if not f.has(symbol):
return True
if isinstance(f, func_class):
try:
g = Poly(f.args[0], symbol)
return g.degree() <= 1
except PolynomialError:
return False
else:
return False
def _solve_as_rational(f, symbol, domain):
""" solve rational functions"""
f = together(f, deep=True)
g, h = fraction(f)
if not h.has(symbol):
try:
return _solve_as_poly(g, symbol, domain)
except NotImplementedError:
# The polynomial formed from g could end up having
# coefficients in a ring over which finding roots
# isn't implemented yet, e.g. ZZ[a] for some symbol a
return ConditionSet(symbol, Eq(f, 0), domain)
except CoercionFailed:
# contained oo, zoo or nan
return S.EmptySet
else:
valid_solns = _solveset(g, symbol, domain)
invalid_solns = _solveset(h, symbol, domain)
return valid_solns - invalid_solns
def _solve_trig(f, symbol, domain):
"""Function to call other helpers to solve trigonometric equations """
sol1 = sol = None
try:
sol1 = _solve_trig1(f, symbol, domain)
except NotImplementedError:
pass
if sol1 is None or isinstance(sol1, ConditionSet):
try:
sol = _solve_trig2(f, symbol, domain)
except ValueError:
sol = sol1
if isinstance(sol1, ConditionSet) and isinstance(sol, ConditionSet):
if sol1.count_ops() < sol.count_ops():
sol = sol1
else:
sol = sol1
if sol is None:
raise NotImplementedError(filldedent('''
Solution to this kind of trigonometric equations
is yet to be implemented'''))
return sol
def _solve_trig1(f, symbol, domain):
"""Primary helper to solve trigonometric and hyperbolic equations"""
if _is_function_class_equation(HyperbolicFunction, f, symbol):
cov = exp(symbol)
inverter = invert_real if domain.is_subset(S.Reals) else invert_complex
else:
cov = exp(I*symbol)
inverter = invert_complex
f = trigsimp(f)
f_original = f
f = f.rewrite(exp)
f = together(f)
g, h = fraction(f)
y = Dummy('y')
g, h = g.expand(), h.expand()
g, h = g.subs(cov, y), h.subs(cov, y)
if g.has(symbol) or h.has(symbol):
return ConditionSet(symbol, Eq(f, 0), domain)
solns = solveset_complex(g, y) - solveset_complex(h, y)
if isinstance(solns, ConditionSet):
raise NotImplementedError
if isinstance(solns, FiniteSet):
if any(isinstance(s, RootOf) for s in solns):
raise NotImplementedError
result = Union(*[inverter(cov, s, symbol)[1] for s in solns])
# avoid spurious intersections with C in solution set
if domain is S.Complexes:
return result
else:
return Intersection(result, domain)
elif solns is S.EmptySet:
return S.EmptySet
else:
return ConditionSet(symbol, Eq(f_original, 0), domain)
def _solve_trig2(f, symbol, domain):
"""Secondary helper to solve trigonometric equations,
called when first helper fails """
from sympy import ilcm, expand_trig, degree
f = trigsimp(f)
f_original = f
trig_functions = f.atoms(sin, cos, tan, sec, cot, csc)
trig_arguments = [e.args[0] for e in trig_functions]
denominators = []
numerators = []
for ar in trig_arguments:
try:
poly_ar = Poly(ar, symbol)
except ValueError:
raise ValueError("give up, we can't solve if this is not a polynomial in x")
if poly_ar.degree() > 1: # degree >1 still bad
raise ValueError("degree of variable inside polynomial should not exceed one")
if poly_ar.degree() == 0: # degree 0, don't care
continue
c = poly_ar.all_coeffs()[0] # got the coefficient of 'symbol'
numerators.append(Rational(c).p)
denominators.append(Rational(c).q)
x = Dummy('x')
# ilcm() and igcd() require more than one argument
if len(numerators) > 1:
mu = Rational(2)*ilcm(*denominators)/igcd(*numerators)
else:
assert len(numerators) == 1
mu = Rational(2)*denominators[0]/numerators[0]
f = f.subs(symbol, mu*x)
f = f.rewrite(tan)
f = expand_trig(f)
f = together(f)
g, h = fraction(f)
y = Dummy('y')
g, h = g.expand(), h.expand()
g, h = g.subs(tan(x), y), h.subs(tan(x), y)
if g.has(x) or h.has(x):
return ConditionSet(symbol, Eq(f_original, 0), domain)
solns = solveset(g, y, S.Reals) - solveset(h, y, S.Reals)
if isinstance(solns, FiniteSet):
result = Union(*[invert_real(tan(symbol/mu), s, symbol)[1]
for s in solns])
dsol = invert_real(tan(symbol/mu), oo, symbol)[1]
if degree(h) > degree(g): # If degree(denom)>degree(num) then there
result = Union(result, dsol) # would be another sol at Lim(denom-->oo)
return Intersection(result, domain)
elif solns is S.EmptySet:
return S.EmptySet
else:
return ConditionSet(symbol, Eq(f_original, 0), S.Reals)
def _solve_as_poly(f, symbol, domain=S.Complexes):
"""
Solve the equation using polynomial techniques if it already is a
polynomial equation or, with a change of variables, can be made so.
"""
result = None
if f.is_polynomial(symbol):
solns = roots(f, symbol, cubics=True, quartics=True,
quintics=True, domain='EX')
num_roots = sum(solns.values())
if degree(f, symbol) <= num_roots:
result = FiniteSet(*solns.keys())
else:
poly = Poly(f, symbol)
solns = poly.all_roots()
if poly.degree() <= len(solns):
result = FiniteSet(*solns)
else:
result = ConditionSet(symbol, Eq(f, 0), domain)
else:
poly = Poly(f)
if poly is None:
result = ConditionSet(symbol, Eq(f, 0), domain)
gens = [g for g in poly.gens if g.has(symbol)]
if len(gens) == 1:
poly = Poly(poly, gens[0])
gen = poly.gen
deg = poly.degree()
poly = Poly(poly.as_expr(), poly.gen, composite=True)
poly_solns = FiniteSet(*roots(poly, cubics=True, quartics=True,
quintics=True).keys())
if len(poly_solns) < deg:
result = ConditionSet(symbol, Eq(f, 0), domain)
if gen != symbol:
y = Dummy('y')
inverter = invert_real if domain.is_subset(S.Reals) else invert_complex
lhs, rhs_s = inverter(gen, y, symbol)
if lhs == symbol:
result = Union(*[rhs_s.subs(y, s) for s in poly_solns])
else:
result = ConditionSet(symbol, Eq(f, 0), domain)
else:
result = ConditionSet(symbol, Eq(f, 0), domain)
if result is not None:
if isinstance(result, FiniteSet):
# this is to simplify solutions like -sqrt(-I) to sqrt(2)/2
# - sqrt(2)*I/2. We are not expanding for solution with symbols
# or undefined functions because that makes the solution more complicated.
# For example, expand_complex(a) returns re(a) + I*im(a)
if all([s.atoms(Symbol, AppliedUndef) == set() and not isinstance(s, RootOf)
for s in result]):
s = Dummy('s')
result = imageset(Lambda(s, expand_complex(s)), result)
if isinstance(result, FiniteSet) and domain != S.Complexes:
# Avoid adding gratuitous intersections with S.Complexes. Actual
# conditions should be handled elsewhere.
result = result.intersection(domain)
return result
else:
return ConditionSet(symbol, Eq(f, 0), domain)
def _has_rational_power(expr, symbol):
"""
Returns (bool, den) where bool is True if the term has a
non-integer rational power and den is the denominator of the
expression's exponent.
Examples
========
>>> from sympy.solvers.solveset import _has_rational_power
>>> from sympy import sqrt
>>> from sympy.abc import x
>>> _has_rational_power(sqrt(x), x)
(True, 2)
>>> _has_rational_power(x**2, x)
(False, 1)
"""
a, p, q = Wild('a'), Wild('p'), Wild('q')
pattern_match = expr.match(a*p**q) or {}
if pattern_match.get(a, S.Zero).is_zero:
return (False, S.One)
elif p not in pattern_match.keys():
return (False, S.One)
elif isinstance(pattern_match[q], Rational) \
and pattern_match[p].has(symbol):
if not pattern_match[q].q == S.One:
return (True, pattern_match[q].q)
if not isinstance(pattern_match[a], Pow) \
or isinstance(pattern_match[a], Mul):
return (False, S.One)
else:
return _has_rational_power(pattern_match[a], symbol)
def _solve_radical(f, symbol, solveset_solver):
""" Helper function to solve equations with radicals """
res = unrad(f)
eq, cov = res if res else (f, [])
if not cov:
result = solveset_solver(eq, symbol) - \
Union(*[solveset_solver(g, symbol) for g in denoms(f, symbol)])
else:
y, yeq = cov
if not solveset_solver(y - I, y):
yreal = Dummy('yreal', real=True)
yeq = yeq.xreplace({y: yreal})
eq = eq.xreplace({y: yreal})
y = yreal
g_y_s = solveset_solver(yeq, symbol)
f_y_sols = solveset_solver(eq, y)
result = Union(*[imageset(Lambda(y, g_y), f_y_sols)
for g_y in g_y_s])
if isinstance(result, Complement) or isinstance(result,ConditionSet):
solution_set = result
else:
f_set = [] # solutions for FiniteSet
c_set = [] # solutions for ConditionSet
for s in result:
if checksol(f, symbol, s):
f_set.append(s)
else:
c_set.append(s)
solution_set = FiniteSet(*f_set) + ConditionSet(symbol, Eq(f, 0), FiniteSet(*c_set))
return solution_set
def _solve_abs(f, symbol, domain):
""" Helper function to solve equation involving absolute value function """
if not domain.is_subset(S.Reals):
raise ValueError(filldedent('''
Absolute values cannot be inverted in the
complex domain.'''))
p, q, r = Wild('p'), Wild('q'), Wild('r')
pattern_match = f.match(p*Abs(q) + r) or {}
f_p, f_q, f_r = [pattern_match.get(i, S.Zero) for i in (p, q, r)]
if not (f_p.is_zero or f_q.is_zero):
domain = continuous_domain(f_q, symbol, domain)
q_pos_cond = solve_univariate_inequality(f_q >= 0, symbol,
relational=False, domain=domain, continuous=True)
q_neg_cond = q_pos_cond.complement(domain)
sols_q_pos = solveset_real(f_p*f_q + f_r,
symbol).intersect(q_pos_cond)
sols_q_neg = solveset_real(f_p*(-f_q) + f_r,
symbol).intersect(q_neg_cond)
return Union(sols_q_pos, sols_q_neg)
else:
return ConditionSet(symbol, Eq(f, 0), domain)
def solve_decomposition(f, symbol, domain):
"""
Function to solve equations via the principle of "Decomposition
and Rewriting".
Examples
========
>>> from sympy import exp, sin, Symbol, pprint, S
>>> from sympy.solvers.solveset import solve_decomposition as sd
>>> x = Symbol('x')
>>> f1 = exp(2*x) - 3*exp(x) + 2
>>> sd(f1, x, S.Reals)
FiniteSet(0, log(2))
>>> f2 = sin(x)**2 + 2*sin(x) + 1
>>> pprint(sd(f2, x, S.Reals), use_unicode=False)
3*pi
{2*n*pi + ---- | n in Integers}
2
>>> f3 = sin(x + 2)
>>> pprint(sd(f3, x, S.Reals), use_unicode=False)
{2*n*pi - 2 | n in Integers} U {2*n*pi - 2 + pi | n in Integers}
"""
from sympy.solvers.decompogen import decompogen
from sympy.calculus.util import function_range
# decompose the given function
g_s = decompogen(f, symbol)
# `y_s` represents the set of values for which the function `g` is to be
# solved.
# `solutions` represent the solutions of the equations `g = y_s` or
# `g = 0` depending on the type of `y_s`.
# As we are interested in solving the equation: f = 0
y_s = FiniteSet(0)
for g in g_s:
frange = function_range(g, symbol, domain)
y_s = Intersection(frange, y_s)
result = S.EmptySet
if isinstance(y_s, FiniteSet):
for y in y_s:
solutions = solveset(Eq(g, y), symbol, domain)
if not isinstance(solutions, ConditionSet):
result += solutions
else:
if isinstance(y_s, ImageSet):
iter_iset = (y_s,)
elif isinstance(y_s, Union):
iter_iset = y_s.args
elif y_s is EmptySet:
# y_s is not in the range of g in g_s, so no solution exists
#in the given domain
return EmptySet
for iset in iter_iset:
new_solutions = solveset(Eq(iset.lamda.expr, g), symbol, domain)
dummy_var = tuple(iset.lamda.expr.free_symbols)[0]
(base_set,) = iset.base_sets
if isinstance(new_solutions, FiniteSet):
new_exprs = new_solutions
elif isinstance(new_solutions, Intersection):
if isinstance(new_solutions.args[1], FiniteSet):
new_exprs = new_solutions.args[1]
for new_expr in new_exprs:
result += ImageSet(Lambda(dummy_var, new_expr), base_set)
if result is S.EmptySet:
return ConditionSet(symbol, Eq(f, 0), domain)
y_s = result
return y_s
def _solveset(f, symbol, domain, _check=False):
"""Helper for solveset to return a result from an expression
that has already been sympify'ed and is known to contain the
given symbol."""
# _check controls whether the answer is checked or not
from sympy.simplify.simplify import signsimp
orig_f = f
if f.is_Mul:
coeff, f = f.as_independent(symbol, as_Add=False)
if coeff in set([S.ComplexInfinity, S.NegativeInfinity, S.Infinity]):
f = together(orig_f)
elif f.is_Add:
a, h = f.as_independent(symbol)
m, h = h.as_independent(symbol, as_Add=False)
if m not in set([S.ComplexInfinity, S.Zero, S.Infinity,
S.NegativeInfinity]):
f = a/m + h # XXX condition `m != 0` should be added to soln
# assign the solvers to use
solver = lambda f, x, domain=domain: _solveset(f, x, domain)
inverter = lambda f, rhs, symbol: _invert(f, rhs, symbol, domain)
result = EmptySet
if f.expand().is_zero:
return domain
elif not f.has(symbol):
return EmptySet
elif f.is_Mul and all(_is_finite_with_finite_vars(m, domain)
for m in f.args):
# if f(x) and g(x) are both finite we can say that the solution of
# f(x)*g(x) == 0 is same as Union(f(x) == 0, g(x) == 0) is not true in
# general. g(x) can grow to infinitely large for the values where
# f(x) == 0. To be sure that we are not silently allowing any
# wrong solutions we are using this technique only if both f and g are
# finite for a finite input.
result = Union(*[solver(m, symbol) for m in f.args])
elif _is_function_class_equation(TrigonometricFunction, f, symbol) or \
_is_function_class_equation(HyperbolicFunction, f, symbol):
result = _solve_trig(f, symbol, domain)
elif isinstance(f, arg):
a = f.args[0]
result = solveset_real(a > 0, symbol)
elif f.is_Piecewise:
result = EmptySet
expr_set_pairs = f.as_expr_set_pairs(domain)
for (expr, in_set) in expr_set_pairs:
if in_set.is_Relational:
in_set = in_set.as_set()
solns = solver(expr, symbol, in_set)
result += solns
elif isinstance(f, Eq):
result = solver(Add(f.lhs, - f.rhs, evaluate=False), symbol, domain)
elif f.is_Relational:
if not domain.is_subset(S.Reals):
raise NotImplementedError(filldedent('''
Inequalities in the complex domain are
not supported. Try the real domain by
setting domain=S.Reals'''))
try:
result = solve_univariate_inequality(
f, symbol, domain=domain, relational=False)
except NotImplementedError:
result = ConditionSet(symbol, f, domain)
return result
elif _is_modular(f, symbol):
result = _solve_modular(f, symbol, domain)
else:
lhs, rhs_s = inverter(f, 0, symbol)
if lhs == symbol:
# do some very minimal simplification since
# repeated inversion may have left the result
# in a state that other solvers (e.g. poly)
# would have simplified; this is done here
# rather than in the inverter since here it
# is only done once whereas there it would
# be repeated for each step of the inversion
if isinstance(rhs_s, FiniteSet):
rhs_s = FiniteSet(*[Mul(*
signsimp(i).as_content_primitive())
for i in rhs_s])
result = rhs_s
elif isinstance(rhs_s, FiniteSet):
for equation in [lhs - rhs for rhs in rhs_s]:
if equation == f:
if any(_has_rational_power(g, symbol)[0]
for g in equation.args) or _has_rational_power(
equation, symbol)[0]:
result += _solve_radical(equation,
symbol,
solver)
elif equation.has(Abs):
result += _solve_abs(f, symbol, domain)
else:
result_rational = _solve_as_rational(equation, symbol, domain)
if isinstance(result_rational, ConditionSet):
# may be a transcendental type equation
result += _transolve(equation, symbol, domain)
else:
result += result_rational
else:
result += solver(equation, symbol)
elif rhs_s is not S.EmptySet:
result = ConditionSet(symbol, Eq(f, 0), domain)
if isinstance(result, ConditionSet):
if isinstance(f, Expr):
num, den = f.as_numer_denom()
else:
num, den = f, S.One
if den.has(symbol):
_result = _solveset(num, symbol, domain)
if not isinstance(_result, ConditionSet):
singularities = _solveset(den, symbol, domain)
result = _result - singularities
if _check:
if isinstance(result, ConditionSet):
# it wasn't solved or has enumerated all conditions
# -- leave it alone
return result
# whittle away all but the symbol-containing core
# to use this for testing
if isinstance(orig_f, Expr):
fx = orig_f.as_independent(symbol, as_Add=True)[1]
fx = fx.as_independent(symbol, as_Add=False)[1]
else:
fx = orig_f
if isinstance(result, FiniteSet):
# check the result for invalid solutions
result = FiniteSet(*[s for s in result
if isinstance(s, RootOf)
or domain_check(fx, symbol, s)])
return result
def _is_modular(f, symbol):
"""
Helper function to check below mentioned types of modular equations.
``A - Mod(B, C) = 0``
A -> This can or cannot be a function of symbol.
B -> This is surely a function of symbol.
C -> It is an integer.
Parameters
==========
f : Expr
The equation to be checked.
symbol : Symbol
The concerned variable for which the equation is to be checked.
Examples
========
>>> from sympy import symbols, exp, Mod
>>> from sympy.solvers.solveset import _is_modular as check
>>> x, y = symbols('x y')
>>> check(Mod(x, 3) - 1, x)
True
>>> check(Mod(x, 3) - 1, y)
False
>>> check(Mod(x, 3)**2 - 5, x)
False
>>> check(Mod(x, 3)**2 - y, x)
False
>>> check(exp(Mod(x, 3)) - 1, x)
False
>>> check(Mod(3, y) - 1, y)
False
"""
if not f.has(Mod):
return False
# extract modterms from f.
modterms = list(f.atoms(Mod))
return (len(modterms) == 1 and # only one Mod should be present
modterms[0].args[0].has(symbol) and # B-> function of symbol
modterms[0].args[1].is_integer and # C-> to be an integer.
any(isinstance(term, Mod)
for term in list(_term_factors(f))) # free from other funcs
)
def _invert_modular(modterm, rhs, n, symbol):
"""
Helper function to invert modular equation.
``Mod(a, m) - rhs = 0``
Generally it is inverted as (a, ImageSet(Lambda(n, m*n + rhs), S.Integers)).
More simplified form will be returned if possible.
If it is not invertible then (modterm, rhs) is returned.
The following cases arise while inverting equation ``Mod(a, m) - rhs = 0``:
1. If a is symbol then m*n + rhs is the required solution.
2. If a is an instance of ``Add`` then we try to find two symbol independent
parts of a and the symbol independent part gets tranferred to the other
side and again the ``_invert_modular`` is called on the symbol
dependent part.
3. If a is an instance of ``Mul`` then same as we done in ``Add`` we separate
out the symbol dependent and symbol independent parts and transfer the
symbol independent part to the rhs with the help of invert and again the
``_invert_modular`` is called on the symbol dependent part.
4. If a is an instance of ``Pow`` then two cases arise as following:
- If a is of type (symbol_indep)**(symbol_dep) then the remainder is
evaluated with the help of discrete_log function and then the least
period is being found out with the help of totient function.
period*n + remainder is the required solution in this case.
For reference: (https://en.wikipedia.org/wiki/Euler's_theorem)
- If a is of type (symbol_dep)**(symbol_indep) then we try to find all
primitive solutions list with the help of nthroot_mod function.
m*n + rem is the general solution where rem belongs to solutions list
from nthroot_mod function.
Parameters
==========
modterm, rhs : Expr
The modular equation to be inverted, ``modterm - rhs = 0``
symbol : Symbol
The variable in the equation to be inverted.
n : Dummy
Dummy variable for output g_n.
Returns
=======
A tuple (f_x, g_n) is being returned where f_x is modular independent function
of symbol and g_n being set of values f_x can have.
Examples
========
>>> from sympy import symbols, exp, Mod, Dummy, S
>>> from sympy.solvers.solveset import _invert_modular as invert_modular
>>> x, y = symbols('x y')
>>> n = Dummy('n')
>>> invert_modular(Mod(exp(x), 7), S(5), n, x)
(Mod(exp(x), 7), 5)
>>> invert_modular(Mod(x, 7), S(5), n, x)
(x, ImageSet(Lambda(_n, 7*_n + 5), Integers))
>>> invert_modular(Mod(3*x + 8, 7), S(5), n, x)
(x, ImageSet(Lambda(_n, 7*_n + 6), Integers))
>>> invert_modular(Mod(x**4, 7), S(5), n, x)
(x, EmptySet)
>>> invert_modular(Mod(2**(x**2 + x + 1), 7), S(2), n, x)
(x**2 + x + 1, ImageSet(Lambda(_n, 3*_n + 1), Naturals0))
"""
a, m = modterm.args
if rhs.is_real is False or any(term.is_real is False
for term in list(_term_factors(a))):
# Check for complex arguments
return modterm, rhs
if abs(rhs) >= abs(m):
# if rhs has value greater than value of m.
return symbol, EmptySet
if a == symbol:
return symbol, ImageSet(Lambda(n, m*n + rhs), S.Integers)
if a.is_Add:
# g + h = a
g, h = a.as_independent(symbol)
if g is not S.Zero:
x_indep_term = rhs - Mod(g, m)
return _invert_modular(Mod(h, m), Mod(x_indep_term, m), n, symbol)
if a.is_Mul:
# g*h = a
g, h = a.as_independent(symbol)
if g is not S.One:
x_indep_term = rhs*invert(g, m)
return _invert_modular(Mod(h, m), Mod(x_indep_term, m), n, symbol)
if a.is_Pow:
# base**expo = a
base, expo = a.args
if expo.has(symbol) and not base.has(symbol):
# remainder -> solution independent of n of equation.
# m, rhs are made coprime by dividing igcd(m, rhs)
try:
remainder = discrete_log(m / igcd(m, rhs), rhs, a.base)
except ValueError: # log does not exist
return modterm, rhs
# period -> coefficient of n in the solution and also referred as
# the least period of expo in which it is repeats itself.
# (a**(totient(m)) - 1) divides m. Here is link of theorem:
# (https://en.wikipedia.org/wiki/Euler's_theorem)
period = totient(m)
for p in divisors(period):
# there might a lesser period exist than totient(m).
if pow(a.base, p, m / igcd(m, a.base)) == 1:
period = p
break
# recursion is not applied here since _invert_modular is currently
# not smart enough to handle infinite rhs as here expo has infinite
# rhs = ImageSet(Lambda(n, period*n + remainder), S.Naturals0).
return expo, ImageSet(Lambda(n, period*n + remainder), S.Naturals0)
elif base.has(symbol) and not expo.has(symbol):
try:
remainder_list = nthroot_mod(rhs, expo, m, all_roots=True)
if remainder_list == []:
return symbol, EmptySet
except (ValueError, NotImplementedError):
return modterm, rhs
g_n = EmptySet
for rem in remainder_list:
g_n += ImageSet(Lambda(n, m*n + rem), S.Integers)
return base, g_n
return modterm, rhs
def _solve_modular(f, symbol, domain):
r"""
Helper function for solving modular equations of type ``A - Mod(B, C) = 0``,
where A can or cannot be a function of symbol, B is surely a function of
symbol and C is an integer.
Currently ``_solve_modular`` is only able to solve cases
where A is not a function of symbol.
Parameters
==========
f : Expr
The modular equation to be solved, ``f = 0``
symbol : Symbol
The variable in the equation to be solved.
domain : Set
A set over which the equation is solved. It has to be a subset of
Integers.
Returns
=======
A set of integer solutions satisfying the given modular equation.
A ``ConditionSet`` if the equation is unsolvable.
Examples
========
>>> from sympy.solvers.solveset import _solve_modular as solve_modulo
>>> from sympy import S, Symbol, sin, Intersection, Range, Interval
>>> from sympy.core.mod import Mod
>>> x = Symbol('x')
>>> solve_modulo(Mod(5*x - 8, 7) - 3, x, S.Integers)
ImageSet(Lambda(_n, 7*_n + 5), Integers)
>>> solve_modulo(Mod(5*x - 8, 7) - 3, x, S.Reals) # domain should be subset of integers.
ConditionSet(x, Eq(Mod(5*x + 6, 7) - 3, 0), Reals)
>>> solve_modulo(-7 + Mod(x, 5), x, S.Integers)
EmptySet
>>> solve_modulo(Mod(12**x, 21) - 18, x, S.Integers)
ImageSet(Lambda(_n, 6*_n + 2), Naturals0)
>>> solve_modulo(Mod(sin(x), 7) - 3, x, S.Integers) # not solvable
ConditionSet(x, Eq(Mod(sin(x), 7) - 3, 0), Integers)
>>> solve_modulo(3 - Mod(x, 5), x, Intersection(S.Integers, Interval(0, 100)))
Intersection(ImageSet(Lambda(_n, 5*_n + 3), Integers), Range(0, 101, 1))
"""
# extract modterm and g_y from f
unsolved_result = ConditionSet(symbol, Eq(f, 0), domain)
modterm = list(f.atoms(Mod))[0]
rhs = -S.One*(f.subs(modterm, S.Zero))
if f.as_coefficients_dict()[modterm].is_negative:
# checks if coefficient of modterm is negative in main equation.
rhs *= -S.One
if not domain.is_subset(S.Integers):
return unsolved_result
if rhs.has(symbol):
# TODO Case: A-> function of symbol, can be extended here
# in future.
return unsolved_result
n = Dummy('n', integer=True)
f_x, g_n = _invert_modular(modterm, rhs, n, symbol)
if f_x is modterm and g_n is rhs:
return unsolved_result
if f_x is symbol:
if domain is not S.Integers:
return domain.intersect(g_n)
return g_n
if isinstance(g_n, ImageSet):
lamda_expr = g_n.lamda.expr
lamda_vars = g_n.lamda.variables
base_sets = g_n.base_sets
sol_set = _solveset(f_x - lamda_expr, symbol, S.Integers)
if isinstance(sol_set, FiniteSet):
tmp_sol = EmptySet
for sol in sol_set:
tmp_sol += ImageSet(Lambda(lamda_vars, sol), *base_sets)
sol_set = tmp_sol
else:
sol_set = ImageSet(Lambda(lamda_vars, sol_set), *base_sets)
return domain.intersect(sol_set)
return unsolved_result
def _term_factors(f):
"""
Iterator to get the factors of all terms present
in the given equation.
Parameters
==========
f : Expr
Equation that needs to be addressed
Returns
=======
Factors of all terms present in the equation.
Examples
========
>>> from sympy import symbols
>>> from sympy.solvers.solveset import _term_factors
>>> x = symbols('x')
>>> list(_term_factors(-2 - x**2 + x*(x + 1)))
[-2, -1, x**2, x, x + 1]
"""
for add_arg in Add.make_args(f):
for mul_arg in Mul.make_args(add_arg):
yield mul_arg
def _solve_exponential(lhs, rhs, symbol, domain):
r"""
Helper function for solving (supported) exponential equations.
Exponential equations are the sum of (currently) at most
two terms with one or both of them having a power with a
symbol-dependent exponent.
For example
.. math:: 5^{2x + 3} - 5^{3x - 1}
.. math:: 4^{5 - 9x} - e^{2 - x}
Parameters
==========
lhs, rhs : Expr
The exponential equation to be solved, `lhs = rhs`
symbol : Symbol
The variable in which the equation is solved
domain : Set
A set over which the equation is solved.
Returns
=======
A set of solutions satisfying the given equation.
A ``ConditionSet`` if the equation is unsolvable or
if the assumptions are not properly defined, in that case
a different style of ``ConditionSet`` is returned having the
solution(s) of the equation with the desired assumptions.
Examples
========
>>> from sympy.solvers.solveset import _solve_exponential as solve_expo
>>> from sympy import symbols, S
>>> x = symbols('x', real=True)
>>> a, b = symbols('a b')
>>> solve_expo(2**x + 3**x - 5**x, 0, x, S.Reals) # not solvable
ConditionSet(x, Eq(2**x + 3**x - 5**x, 0), Reals)
>>> solve_expo(a**x - b**x, 0, x, S.Reals) # solvable but incorrect assumptions
ConditionSet(x, (a > 0) & (b > 0), FiniteSet(0))
>>> solve_expo(3**(2*x) - 2**(x + 3), 0, x, S.Reals)
FiniteSet(-3*log(2)/(-2*log(3) + log(2)))
>>> solve_expo(2**x - 4**x, 0, x, S.Reals)
FiniteSet(0)
* Proof of correctness of the method
The logarithm function is the inverse of the exponential function.
The defining relation between exponentiation and logarithm is:
.. math:: {\log_b x} = y \enspace if \enspace b^y = x
Therefore if we are given an equation with exponent terms, we can
convert every term to its corresponding logarithmic form. This is
achieved by taking logarithms and expanding the equation using
logarithmic identities so that it can easily be handled by ``solveset``.
For example:
.. math:: 3^{2x} = 2^{x + 3}
Taking log both sides will reduce the equation to
.. math:: (2x)\log(3) = (x + 3)\log(2)
This form can be easily handed by ``solveset``.
"""
unsolved_result = ConditionSet(symbol, Eq(lhs - rhs, 0), domain)
newlhs = powdenest(lhs)
if lhs != newlhs:
# it may also be advantageous to factor the new expr
return _solveset(factor(newlhs - rhs), symbol, domain) # try again with _solveset
if not (isinstance(lhs, Add) and len(lhs.args) == 2):
# solving for the sum of more than two powers is possible
# but not yet implemented
return unsolved_result
if rhs != 0:
return unsolved_result
a, b = list(ordered(lhs.args))
a_term = a.as_independent(symbol)[1]
b_term = b.as_independent(symbol)[1]
a_base, a_exp = a_term.base, a_term.exp
b_base, b_exp = b_term.base, b_term.exp
from sympy.functions.elementary.complexes import im
if domain.is_subset(S.Reals):
conditions = And(
a_base > 0,
b_base > 0,
Eq(im(a_exp), 0),
Eq(im(b_exp), 0))
else:
conditions = And(
Ne(a_base, 0),
Ne(b_base, 0))
L, R = map(lambda i: expand_log(log(i), force=True), (a, -b))
solutions = _solveset(L - R, symbol, domain)
return ConditionSet(symbol, conditions, solutions)
def _is_exponential(f, symbol):
r"""
Return ``True`` if one or more terms contain ``symbol`` only in
exponents, else ``False``.
Parameters
==========
f : Expr
The equation to be checked
symbol : Symbol
The variable in which the equation is checked
Examples
========
>>> from sympy import symbols, cos, exp
>>> from sympy.solvers.solveset import _is_exponential as check
>>> x, y = symbols('x y')
>>> check(y, y)
False
>>> check(x**y - 1, y)
True
>>> check(x**y*2**y - 1, y)
True
>>> check(exp(x + 3) + 3**x, x)
True
>>> check(cos(2**x), x)
False
* Philosophy behind the helper
The function extracts each term of the equation and checks if it is
of exponential form w.r.t ``symbol``.
"""
rv = False
for expr_arg in _term_factors(f):
if symbol not in expr_arg.free_symbols:
continue
if (isinstance(expr_arg, Pow) and
symbol not in expr_arg.base.free_symbols or
isinstance(expr_arg, exp)):
rv = True # symbol in exponent
else:
return False # dependent on symbol in non-exponential way
return rv
def _solve_logarithm(lhs, rhs, symbol, domain):
r"""
Helper to solve logarithmic equations which are reducible
to a single instance of `\log`.
Logarithmic equations are (currently) the equations that contains
`\log` terms which can be reduced to a single `\log` term or
a constant using various logarithmic identities.
For example:
.. math:: \log(x) + \log(x - 4)
can be reduced to:
.. math:: \log(x(x - 4))
Parameters
==========
lhs, rhs : Expr
The logarithmic equation to be solved, `lhs = rhs`
symbol : Symbol
The variable in which the equation is solved
domain : Set
A set over which the equation is solved.
Returns
=======
A set of solutions satisfying the given equation.
A ``ConditionSet`` if the equation is unsolvable.
Examples
========
>>> from sympy import symbols, log, S
>>> from sympy.solvers.solveset import _solve_logarithm as solve_log
>>> x = symbols('x')
>>> f = log(x - 3) + log(x + 3)
>>> solve_log(f, 0, x, S.Reals)
FiniteSet(sqrt(10), -sqrt(10))
* Proof of correctness
A logarithm is another way to write exponent and is defined by
.. math:: {\log_b x} = y \enspace if \enspace b^y = x
When one side of the equation contains a single logarithm, the
equation can be solved by rewriting the equation as an equivalent
exponential equation as defined above. But if one side contains
more than one logarithm, we need to use the properties of logarithm
to condense it into a single logarithm.
Take for example
.. math:: \log(2x) - 15 = 0
contains single logarithm, therefore we can directly rewrite it to
exponential form as
.. math:: x = \frac{e^{15}}{2}
But if the equation has more than one logarithm as
.. math:: \log(x - 3) + \log(x + 3) = 0
we use logarithmic identities to convert it into a reduced form
Using,
.. math:: \log(a) + \log(b) = \log(ab)
the equation becomes,
.. math:: \log((x - 3)(x + 3))
This equation contains one logarithm and can be solved by rewriting
to exponents.
"""
new_lhs = logcombine(lhs, force=True)
new_f = new_lhs - rhs
return _solveset(new_f, symbol, domain)
def _is_logarithmic(f, symbol):
r"""
Return ``True`` if the equation is in the form
`a\log(f(x)) + b\log(g(x)) + ... + c` else ``False``.
Parameters
==========
f : Expr
The equation to be checked
symbol : Symbol
The variable in which the equation is checked
Returns
=======
``True`` if the equation is logarithmic otherwise ``False``.
Examples
========
>>> from sympy import symbols, tan, log
>>> from sympy.solvers.solveset import _is_logarithmic as check
>>> x, y = symbols('x y')
>>> check(log(x + 2) - log(x + 3), x)
True
>>> check(tan(log(2*x)), x)
False
>>> check(x*log(x), x)
False
>>> check(x + log(x), x)
False
>>> check(y + log(x), x)
True
* Philosophy behind the helper
The function extracts each term and checks whether it is
logarithmic w.r.t ``symbol``.
"""
rv = False
for term in Add.make_args(f):
saw_log = False
for term_arg in Mul.make_args(term):
if symbol not in term_arg.free_symbols:
continue
if isinstance(term_arg, log):
if saw_log:
return False # more than one log in term
saw_log = True
else:
return False # dependent on symbol in non-log way
if saw_log:
rv = True
return rv
def _transolve(f, symbol, domain):
r"""
Function to solve transcendental equations. It is a helper to
``solveset`` and should be used internally. ``_transolve``
currently supports the following class of equations:
- Exponential equations
- Logarithmic equations
Parameters
==========
f : Any transcendental equation that needs to be solved.
This needs to be an expression, which is assumed
to be equal to ``0``.
symbol : The variable for which the equation is solved.
This needs to be of class ``Symbol``.
domain : A set over which the equation is solved.
This needs to be of class ``Set``.
Returns
=======
Set
A set of values for ``symbol`` for which ``f`` is equal to
zero. An ``EmptySet`` is returned if ``f`` does not have solutions
in respective domain. A ``ConditionSet`` is returned as unsolved
object if algorithms to evaluate complete solution are not
yet implemented.
How to use ``_transolve``
=========================
``_transolve`` should not be used as an independent function, because
it assumes that the equation (``f``) and the ``symbol`` comes from
``solveset`` and might have undergone a few modification(s).
To use ``_transolve`` as an independent function the equation (``f``)
and the ``symbol`` should be passed as they would have been by
``solveset``.
Examples
========
>>> from sympy.solvers.solveset import _transolve as transolve
>>> from sympy.solvers.solvers import _tsolve as tsolve
>>> from sympy import symbols, S, pprint
>>> x = symbols('x', real=True) # assumption added
>>> transolve(5**(x - 3) - 3**(2*x + 1), x, S.Reals)
FiniteSet(-(log(3) + 3*log(5))/(-log(5) + 2*log(3)))
How ``_transolve`` works
========================
``_transolve`` uses two types of helper functions to solve equations
of a particular class:
Identifying helpers: To determine whether a given equation
belongs to a certain class of equation or not. Returns either
``True`` or ``False``.
Solving helpers: Once an equation is identified, a corresponding
helper either solves the equation or returns a form of the equation
that ``solveset`` might better be able to handle.
* Philosophy behind the module
The purpose of ``_transolve`` is to take equations which are not
already polynomial in their generator(s) and to either recast them
as such through a valid transformation or to solve them outright.
A pair of helper functions for each class of supported
transcendental functions are employed for this purpose. One
identifies the transcendental form of an equation and the other
either solves it or recasts it into a tractable form that can be
solved by ``solveset``.
For example, an equation in the form `ab^{f(x)} - cd^{g(x)} = 0`
can be transformed to
`\log(a) + f(x)\log(b) - \log(c) - g(x)\log(d) = 0`
(under certain assumptions) and this can be solved with ``solveset``
if `f(x)` and `g(x)` are in polynomial form.
How ``_transolve`` is better than ``_tsolve``
=============================================
1) Better output
``_transolve`` provides expressions in a more simplified form.
Consider a simple exponential equation
>>> f = 3**(2*x) - 2**(x + 3)
>>> pprint(transolve(f, x, S.Reals), use_unicode=False)
-3*log(2)
{------------------}
-2*log(3) + log(2)
>>> pprint(tsolve(f, x), use_unicode=False)
/ 3 \
| --------|
| log(2/9)|
[-log\2 /]
2) Extensible
The API of ``_transolve`` is designed such that it is easily
extensible, i.e. the code that solves a given class of
equations is encapsulated in a helper and not mixed in with
the code of ``_transolve`` itself.
3) Modular
``_transolve`` is designed to be modular i.e, for every class of
equation a separate helper for identification and solving is
implemented. This makes it easy to change or modify any of the
method implemented directly in the helpers without interfering
with the actual structure of the API.
4) Faster Computation
Solving equation via ``_transolve`` is much faster as compared to
``_tsolve``. In ``solve``, attempts are made computing every possibility
to get the solutions. This series of attempts makes solving a bit
slow. In ``_transolve``, computation begins only after a particular
type of equation is identified.
How to add new class of equations
=================================
Adding a new class of equation solver is a three-step procedure:
- Identify the type of the equations
Determine the type of the class of equations to which they belong:
it could be of ``Add``, ``Pow``, etc. types. Separate internal functions
are used for each type. Write identification and solving helpers
and use them from within the routine for the given type of equation
(after adding it, if necessary). Something like:
.. code-block:: python
def add_type(lhs, rhs, x):
....
if _is_exponential(lhs, x):
new_eq = _solve_exponential(lhs, rhs, x)
....
rhs, lhs = eq.as_independent(x)
if lhs.is_Add:
result = add_type(lhs, rhs, x)
- Define the identification helper.
- Define the solving helper.
Apart from this, a few other things needs to be taken care while
adding an equation solver:
- Naming conventions:
Name of the identification helper should be as
``_is_class`` where class will be the name or abbreviation
of the class of equation. The solving helper will be named as
``_solve_class``.
For example: for exponential equations it becomes
``_is_exponential`` and ``_solve_expo``.
- The identifying helpers should take two input parameters,
the equation to be checked and the variable for which a solution
is being sought, while solving helpers would require an additional
domain parameter.
- Be sure to consider corner cases.
- Add tests for each helper.
- Add a docstring to your helper that describes the method
implemented.
The documentation of the helpers should identify:
- the purpose of the helper,
- the method used to identify and solve the equation,
- a proof of correctness
- the return values of the helpers
"""
def add_type(lhs, rhs, symbol, domain):
"""
Helper for ``_transolve`` to handle equations of
``Add`` type, i.e. equations taking the form as
``a*f(x) + b*g(x) + .... = c``.
For example: 4**x + 8**x = 0
"""
result = ConditionSet(symbol, Eq(lhs - rhs, 0), domain)
# check if it is exponential type equation
if _is_exponential(lhs, symbol):
result = _solve_exponential(lhs, rhs, symbol, domain)
# check if it is logarithmic type equation
elif _is_logarithmic(lhs, symbol):
result = _solve_logarithm(lhs, rhs, symbol, domain)
return result
result = ConditionSet(symbol, Eq(f, 0), domain)
# invert_complex handles the call to the desired inverter based
# on the domain specified.
lhs, rhs_s = invert_complex(f, 0, symbol, domain)
if isinstance(rhs_s, FiniteSet):
assert (len(rhs_s.args)) == 1
rhs = rhs_s.args[0]
if lhs.is_Add:
result = add_type(lhs, rhs, symbol, domain)
else:
result = rhs_s
return result
def solveset(f, symbol=None, domain=S.Complexes):
r"""Solves a given inequality or equation with set as output
Parameters
==========
f : Expr or a relational.
The target equation or inequality
symbol : Symbol
The variable for which the equation is solved
domain : Set
The domain over which the equation is solved
Returns
=======
Set
A set of values for `symbol` for which `f` is True or is equal to
zero. An `EmptySet` is returned if `f` is False or nonzero.
A `ConditionSet` is returned as unsolved object if algorithms
to evaluate complete solution are not yet implemented.
`solveset` claims to be complete in the solution set that it returns.
Raises
======
NotImplementedError
The algorithms to solve inequalities in complex domain are
not yet implemented.
ValueError
The input is not valid.
RuntimeError
It is a bug, please report to the github issue tracker.
Notes
=====
Python interprets 0 and 1 as False and True, respectively, but
in this function they refer to solutions of an expression. So 0 and 1
return the Domain and EmptySet, respectively, while True and False
return the opposite (as they are assumed to be solutions of relational
expressions).
See Also
========
solveset_real: solver for real domain
solveset_complex: solver for complex domain
Examples
========
>>> from sympy import exp, sin, Symbol, pprint, S
>>> from sympy.solvers.solveset import solveset, solveset_real
* The default domain is complex. Not specifying a domain will lead
to the solving of the equation in the complex domain (and this
is not affected by the assumptions on the symbol):
>>> x = Symbol('x')
>>> pprint(solveset(exp(x) - 1, x), use_unicode=False)
{2*n*I*pi | n in Integers}
>>> x = Symbol('x', real=True)
>>> pprint(solveset(exp(x) - 1, x), use_unicode=False)
{2*n*I*pi | n in Integers}
* If you want to use `solveset` to solve the equation in the
real domain, provide a real domain. (Using ``solveset_real``
does this automatically.)
>>> R = S.Reals
>>> x = Symbol('x')
>>> solveset(exp(x) - 1, x, R)
FiniteSet(0)
>>> solveset_real(exp(x) - 1, x)
FiniteSet(0)
The solution is mostly unaffected by assumptions on the symbol,
but there may be some slight difference:
>>> pprint(solveset(sin(x)/x,x), use_unicode=False)
({2*n*pi | n in Integers} \ {0}) U ({2*n*pi + pi | n in Integers} \ {0})
>>> p = Symbol('p', positive=True)
>>> pprint(solveset(sin(p)/p, p), use_unicode=False)
{2*n*pi | n in Integers} U {2*n*pi + pi | n in Integers}
* Inequalities can be solved over the real domain only. Use of a complex
domain leads to a NotImplementedError.
>>> solveset(exp(x) > 1, x, R)
Interval.open(0, oo)
"""
f = sympify(f)
symbol = sympify(symbol)
if f is S.true:
return domain
if f is S.false:
return S.EmptySet
if not isinstance(f, (Expr, Relational, Number)):
raise ValueError("%s is not a valid SymPy expression" % f)
if not isinstance(symbol, (Expr, Relational)) and symbol is not None:
raise ValueError("%s is not a valid SymPy symbol" % symbol)
if not isinstance(domain, Set):
raise ValueError("%s is not a valid domain" %(domain))
free_symbols = f.free_symbols
if symbol is None and not free_symbols:
b = Eq(f, 0)
if b is S.true:
return domain
elif b is S.false:
return S.EmptySet
else:
raise NotImplementedError(filldedent('''
relationship between value and 0 is unknown: %s''' % b))
if symbol is None:
if len(free_symbols) == 1:
symbol = free_symbols.pop()
elif free_symbols:
raise ValueError(filldedent('''
The independent variable must be specified for a
multivariate equation.'''))
elif not isinstance(symbol, Symbol):
f, s, swap = recast_to_symbols([f], [symbol])
# the xreplace will be needed if a ConditionSet is returned
return solveset(f[0], s[0], domain).xreplace(swap)
if domain.is_subset(S.Reals):
if not symbol.is_real:
assumptions = symbol.assumptions0
assumptions['real'] = True
try:
r = Dummy('r', **assumptions)
return solveset(f.xreplace({symbol: r}), r, domain
).xreplace({r: symbol})
except InconsistentAssumptions:
pass
# Abs has its own handling method which avoids the
# rewriting property that the first piece of abs(x)
# is for x >= 0 and the 2nd piece for x < 0 -- solutions
# can look better if the 2nd condition is x <= 0. Since
# the solution is a set, duplication of results is not
# an issue, e.g. {y, -y} when y is 0 will be {0}
f, mask = _masked(f, Abs)
f = f.rewrite(Piecewise) # everything that's not an Abs
for d, e in mask:
# everything *in* an Abs
e = e.func(e.args[0].rewrite(Piecewise))
f = f.xreplace({d: e})
f = piecewise_fold(f)
return _solveset(f, symbol, domain, _check=True)
def solveset_real(f, symbol):
return solveset(f, symbol, S.Reals)
def solveset_complex(f, symbol):
return solveset(f, symbol, S.Complexes)
def _solveset_multi(eqs, syms, domains):
'''Basic implementation of a multivariate solveset.
For internal use (not ready for public consumption)'''
rep = {}
for sym, dom in zip(syms, domains):
if dom is S.Reals:
rep[sym] = Symbol(sym.name, real=True)
eqs = [eq.subs(rep) for eq in eqs]
syms = [sym.subs(rep) for sym in syms]
syms = tuple(syms)
if len(eqs) == 0:
return ProductSet(*domains)
if len(syms) == 1:
sym = syms[0]
domain = domains[0]
solsets = [solveset(eq, sym, domain) for eq in eqs]
solset = Intersection(*solsets)
return ImageSet(Lambda((sym,), (sym,)), solset).doit()
eqs = sorted(eqs, key=lambda eq: len(eq.free_symbols & set(syms)))
for n in range(len(eqs)):
sols = []
all_handled = True
for sym in syms:
if sym not in eqs[n].free_symbols:
continue
sol = solveset(eqs[n], sym, domains[syms.index(sym)])
if isinstance(sol, FiniteSet):
i = syms.index(sym)
symsp = syms[:i] + syms[i+1:]
domainsp = domains[:i] + domains[i+1:]
eqsp = eqs[:n] + eqs[n+1:]
for s in sol:
eqsp_sub = [eq.subs(sym, s) for eq in eqsp]
sol_others = _solveset_multi(eqsp_sub, symsp, domainsp)
fun = Lambda((symsp,), symsp[:i] + (s,) + symsp[i:])
sols.append(ImageSet(fun, sol_others).doit())
else:
all_handled = False
if all_handled:
return Union(*sols)
def solvify(f, symbol, domain):
"""Solves an equation using solveset and returns the solution in accordance
with the `solve` output API.
Returns
=======
We classify the output based on the type of solution returned by `solveset`.
Solution | Output
----------------------------------------
FiniteSet | list
ImageSet, | list (if `f` is periodic)
Union |
EmptySet | empty list
Others | None
Raises
======
NotImplementedError
A ConditionSet is the input.
Examples
========
>>> from sympy.solvers.solveset import solvify, solveset
>>> from sympy.abc import x
>>> from sympy import S, tan, sin, exp
>>> solvify(x**2 - 9, x, S.Reals)
[-3, 3]
>>> solvify(sin(x) - 1, x, S.Reals)
[pi/2]
>>> solvify(tan(x), x, S.Reals)
[0]
>>> solvify(exp(x) - 1, x, S.Complexes)
>>> solvify(exp(x) - 1, x, S.Reals)
[0]
"""
solution_set = solveset(f, symbol, domain)
result = None
if solution_set is S.EmptySet:
result = []
elif isinstance(solution_set, ConditionSet):
raise NotImplementedError('solveset is unable to solve this equation.')
elif isinstance(solution_set, FiniteSet):
result = list(solution_set)
else:
period = periodicity(f, symbol)
if period is not None:
solutions = S.EmptySet
iter_solutions = ()
if isinstance(solution_set, ImageSet):
iter_solutions = (solution_set,)
elif isinstance(solution_set, Union):
if all(isinstance(i, ImageSet) for i in solution_set.args):
iter_solutions = solution_set.args
for solution in iter_solutions:
solutions += solution.intersect(Interval(0, period, False, True))
if isinstance(solutions, FiniteSet):
result = list(solutions)
else:
solution = solution_set.intersect(domain)
if isinstance(solution, FiniteSet):
result += solution
return result
###############################################################################
################################ LINSOLVE #####################################
###############################################################################
def linear_coeffs(eq, *syms, **_kw):
"""Return a list whose elements are the coefficients of the
corresponding symbols in the sum of terms in ``eq``.
The additive constant is returned as the last element of the
list.
Examples
========
>>> from sympy.solvers.solveset import linear_coeffs
>>> from sympy.abc import x, y, z
>>> linear_coeffs(3*x + 2*y - 1, x, y)
[3, 2, -1]
It is not necessary to expand the expression:
>>> linear_coeffs(x + y*(z*(x*3 + 2) + 3), x)
[3*y*z + 1, y*(2*z + 3)]
But if there are nonlinear or cross terms -- even if they would
cancel after simplification -- an error is raised so the situation
does not pass silently past the caller's attention:
>>> eq = 1/x*(x - 1) + 1/x
>>> linear_coeffs(eq.expand(), x)
[0, 1]
>>> linear_coeffs(eq, x)
Traceback (most recent call last):
...
ValueError: nonlinear term encountered: 1/x
>>> linear_coeffs(x*(y + 1) - x*y, x, y)
Traceback (most recent call last):
...
ValueError: nonlinear term encountered: x*(y + 1)
"""
d = defaultdict(list)
eq = _sympify(eq)
if not eq.has(*syms):
return [S.Zero]*len(syms) + [eq]
c, terms = eq.as_coeff_add(*syms)
d[0].extend(Add.make_args(c))
for t in terms:
m, f = t.as_coeff_mul(*syms)
if len(f) != 1:
break
f = f[0]
if f in syms:
d[f].append(m)
elif f.is_Add:
d1 = linear_coeffs(f, *syms, **{'dict': True})
d[0].append(m*d1.pop(0))
for xf, vf in d1.items():
d[xf].append(m*vf)
else:
break
else:
for k, v in d.items():
d[k] = Add(*v)
if not _kw:
return [d.get(s, S.Zero) for s in syms] + [d[0]]
return d # default is still list but this won't matter
raise ValueError('nonlinear term encountered: %s' % t)
def linear_eq_to_matrix(equations, *symbols):
r"""
Converts a given System of Equations into Matrix form.
Here `equations` must be a linear system of equations in
`symbols`. Element M[i, j] corresponds to the coefficient
of the jth symbol in the ith equation.
The Matrix form corresponds to the augmented matrix form.
For example:
.. math:: 4x + 2y + 3z = 1
.. math:: 3x + y + z = -6
.. math:: 2x + 4y + 9z = 2
This system would return `A` & `b` as given below:
::
[ 4 2 3 ] [ 1 ]
A = [ 3 1 1 ] b = [-6 ]
[ 2 4 9 ] [ 2 ]
The only simplification performed is to convert
`Eq(a, b) -> a - b`.
Raises
======
ValueError
The equations contain a nonlinear term.
The symbols are not given or are not unique.
Examples
========
>>> from sympy import linear_eq_to_matrix, symbols
>>> c, x, y, z = symbols('c, x, y, z')
The coefficients (numerical or symbolic) of the symbols will
be returned as matrices:
>>> eqns = [c*x + z - 1 - c, y + z, x - y]
>>> A, b = linear_eq_to_matrix(eqns, [x, y, z])
>>> A
Matrix([
[c, 0, 1],
[0, 1, 1],
[1, -1, 0]])
>>> b
Matrix([
[c + 1],
[ 0],
[ 0]])
This routine does not simplify expressions and will raise an error
if nonlinearity is encountered:
>>> eqns = [
... (x**2 - 3*x)/(x - 3) - 3,
... y**2 - 3*y - y*(y - 4) + x - 4]
>>> linear_eq_to_matrix(eqns, [x, y])
Traceback (most recent call last):
...
ValueError:
The term (x**2 - 3*x)/(x - 3) is nonlinear in {x, y}
Simplifying these equations will discard the removable singularity
in the first, reveal the linear structure of the second:
>>> [e.simplify() for e in eqns]
[x - 3, x + y - 4]
Any such simplification needed to eliminate nonlinear terms must
be done before calling this routine.
"""
if not symbols:
raise ValueError(filldedent('''
Symbols must be given, for which coefficients
are to be found.
'''))
if hasattr(symbols[0], '__iter__'):
symbols = symbols[0]
for i in symbols:
if not isinstance(i, Symbol):
raise ValueError(filldedent('''
Expecting a Symbol but got %s
''' % i))
if has_dups(symbols):
raise ValueError('Symbols must be unique')
equations = sympify(equations)
if isinstance(equations, MatrixBase):
equations = list(equations)
elif isinstance(equations, (Expr, Eq)):
equations = [equations]
elif not is_sequence(equations):
raise ValueError(filldedent('''
Equation(s) must be given as a sequence, Expr,
Eq or Matrix.
'''))
A, b = [], []
for i, f in enumerate(equations):
if isinstance(f, Equality):
f = f.rewrite(Add, evaluate=False)
coeff_list = linear_coeffs(f, *symbols)
b.append(-coeff_list.pop())
A.append(coeff_list)
A, b = map(Matrix, (A, b))
return A, b
def linsolve(system, *symbols):
r"""
Solve system of N linear equations with M variables; both
underdetermined and overdetermined systems are supported.
The possible number of solutions is zero, one or infinite.
Zero solutions throws a ValueError, whereas infinite
solutions are represented parametrically in terms of the given
symbols. For unique solution a FiniteSet of ordered tuples
is returned.
All Standard input formats are supported:
For the given set of Equations, the respective input types
are given below:
.. math:: 3x + 2y - z = 1
.. math:: 2x - 2y + 4z = -2
.. math:: 2x - y + 2z = 0
* Augmented Matrix Form, `system` given below:
::
[3 2 -1 1]
system = [2 -2 4 -2]
[2 -1 2 0]
* List Of Equations Form
`system = [3x + 2y - z - 1, 2x - 2y + 4z + 2, 2x - y + 2z]`
* Input A & b Matrix Form (from Ax = b) are given as below:
::
[3 2 -1 ] [ 1 ]
A = [2 -2 4 ] b = [ -2 ]
[2 -1 2 ] [ 0 ]
`system = (A, b)`
Symbols can always be passed but are actually only needed
when 1) a system of equations is being passed and 2) the
system is passed as an underdetermined matrix and one wants
to control the name of the free variables in the result.
An error is raised if no symbols are used for case 1, but if
no symbols are provided for case 2, internally generated symbols
will be provided. When providing symbols for case 2, there should
be at least as many symbols are there are columns in matrix A.
The algorithm used here is Gauss-Jordan elimination, which
results, after elimination, in a row echelon form matrix.
Returns
=======
A FiniteSet containing an ordered tuple of values for the
unknowns for which the `system` has a solution. (Wrapping
the tuple in FiniteSet is used to maintain a consistent
output format throughout solveset.)
Returns EmptySet, if the linear system is inconsistent.
Raises
======
ValueError
The input is not valid.
The symbols are not given.
Examples
========
>>> from sympy import Matrix, S, linsolve, symbols
>>> x, y, z = symbols("x, y, z")
>>> A = Matrix([[1, 2, 3], [4, 5, 6], [7, 8, 10]])
>>> b = Matrix([3, 6, 9])
>>> A
Matrix([
[1, 2, 3],
[4, 5, 6],
[7, 8, 10]])
>>> b
Matrix([
[3],
[6],
[9]])
>>> linsolve((A, b), [x, y, z])
FiniteSet((-1, 2, 0))
* Parametric Solution: In case the system is underdetermined, the
function will return a parametric solution in terms of the given
symbols. Those that are free will be returned unchanged. e.g. in
the system below, `z` is returned as the solution for variable z;
it can take on any value.
>>> A = Matrix([[1, 2, 3], [4, 5, 6], [7, 8, 9]])
>>> b = Matrix([3, 6, 9])
>>> linsolve((A, b), x, y, z)
FiniteSet((z - 1, 2 - 2*z, z))
If no symbols are given, internally generated symbols will be used.
The `tau0` in the 3rd position indicates (as before) that the 3rd
variable -- whatever it's named -- can take on any value:
>>> linsolve((A, b))
FiniteSet((tau0 - 1, 2 - 2*tau0, tau0))
* List of Equations as input
>>> Eqns = [3*x + 2*y - z - 1, 2*x - 2*y + 4*z + 2, - x + y/2 - z]
>>> linsolve(Eqns, x, y, z)
FiniteSet((1, -2, -2))
* Augmented Matrix as input
>>> aug = Matrix([[2, 1, 3, 1], [2, 6, 8, 3], [6, 8, 18, 5]])
>>> aug
Matrix([
[2, 1, 3, 1],
[2, 6, 8, 3],
[6, 8, 18, 5]])
>>> linsolve(aug, x, y, z)
FiniteSet((3/10, 2/5, 0))
* Solve for symbolic coefficients
>>> a, b, c, d, e, f = symbols('a, b, c, d, e, f')
>>> eqns = [a*x + b*y - c, d*x + e*y - f]
>>> linsolve(eqns, x, y)
FiniteSet(((-b*f + c*e)/(a*e - b*d), (a*f - c*d)/(a*e - b*d)))
* A degenerate system returns solution as set of given
symbols.
>>> system = Matrix(([0, 0, 0], [0, 0, 0], [0, 0, 0]))
>>> linsolve(system, x, y)
FiniteSet((x, y))
* For an empty system linsolve returns empty set
>>> linsolve([], x)
EmptySet
* An error is raised if, after expansion, any nonlinearity
is detected:
>>> linsolve([x*(1/x - 1), (y - 1)**2 - y**2 + 1], x, y)
FiniteSet((1, 1))
>>> linsolve([x**2 - 1], x)
Traceback (most recent call last):
...
ValueError:
The term x**2 is nonlinear in {x}
"""
if not system:
return S.EmptySet
# If second argument is an iterable
if symbols and hasattr(symbols[0], '__iter__'):
symbols = symbols[0]
sym_gen = isinstance(symbols, GeneratorType)
swap = {}
b = None # if we don't get b the input was bad
syms_needed_msg = None
# unpack system
if hasattr(system, '__iter__'):
# 1). (A, b)
if len(system) == 2 and isinstance(system[0], MatrixBase):
A, b = system
# 2). (eq1, eq2, ...)
if not isinstance(system[0], MatrixBase):
if sym_gen or not symbols:
raise ValueError(filldedent('''
When passing a system of equations, the explicit
symbols for which a solution is being sought must
be given as a sequence, too.
'''))
system = [
_mexpand(i.lhs - i.rhs if isinstance(i, Eq) else i,
recursive=True) for i in system]
system, symbols, swap = recast_to_symbols(system, symbols)
A, b = linear_eq_to_matrix(system, symbols)
syms_needed_msg = 'free symbols in the equations provided'
elif isinstance(system, MatrixBase) and not (
symbols and not isinstance(symbols, GeneratorType) and
isinstance(symbols[0], MatrixBase)):
# 3). A augmented with b
A, b = system[:, :-1], system[:, -1:]
if b is None:
raise ValueError("Invalid arguments")
syms_needed_msg = syms_needed_msg or 'columns of A'
if sym_gen:
symbols = [next(symbols) for i in range(A.cols)]
if any(set(symbols) & (A.free_symbols | b.free_symbols)):
raise ValueError(filldedent('''
At least one of the symbols provided
already appears in the system to be solved.
One way to avoid this is to use Dummy symbols in
the generator, e.g. numbered_symbols('%s', cls=Dummy)
''' % symbols[0].name.rstrip('1234567890')))
try:
solution, params, free_syms = A.gauss_jordan_solve(b, freevar=True)
except ValueError:
# No solution
return S.EmptySet
# Replace free parameters with free symbols
if params:
if not symbols:
symbols = [_ for _ in params]
# re-use the parameters but put them in order
# params [x, y, z]
# free_symbols [2, 0, 4]
# idx [1, 0, 2]
idx = list(zip(*sorted(zip(free_syms, range(len(free_syms))))))[1]
# simultaneous replacements {y: x, x: y, z: z}
replace_dict = dict(zip(symbols, [symbols[i] for i in idx]))
elif len(symbols) >= A.cols:
replace_dict = {v: symbols[free_syms[k]] for k, v in enumerate(params)}
else:
raise IndexError(filldedent('''
the number of symbols passed should have a length
equal to the number of %s.
''' % syms_needed_msg))
solution = [sol.xreplace(replace_dict) for sol in solution]
solution = [simplify(sol).xreplace(swap) for sol in solution]
return FiniteSet(tuple(solution))
##############################################################################
# ------------------------------nonlinsolve ---------------------------------#
##############################################################################
def _return_conditionset(eqs, symbols):
# return conditionset
eqs = (Eq(lhs, 0) for lhs in eqs)
condition_set = ConditionSet(
Tuple(*symbols), And(*eqs), S.Complexes**len(symbols))
return condition_set
def substitution(system, symbols, result=[{}], known_symbols=[],
exclude=[], all_symbols=None):
r"""
Solves the `system` using substitution method. It is used in
`nonlinsolve`. This will be called from `nonlinsolve` when any
equation(s) is non polynomial equation.
Parameters
==========
system : list of equations
The target system of equations
symbols : list of symbols to be solved.
The variable(s) for which the system is solved
known_symbols : list of solved symbols
Values are known for these variable(s)
result : An empty list or list of dict
If No symbol values is known then empty list otherwise
symbol as keys and corresponding value in dict.
exclude : Set of expression.
Mostly denominator expression(s) of the equations of the system.
Final solution should not satisfy these expressions.
all_symbols : known_symbols + symbols(unsolved).
Returns
=======
A FiniteSet of ordered tuple of values of `all_symbols` for which the
`system` has solution. Order of values in the tuple is same as symbols
present in the parameter `all_symbols`. If parameter `all_symbols` is None
then same as symbols present in the parameter `symbols`.
Please note that general FiniteSet is unordered, the solution returned
here is not simply a FiniteSet of solutions, rather it is a FiniteSet of
ordered tuple, i.e. the first & only argument to FiniteSet is a tuple of
solutions, which is ordered, & hence the returned solution is ordered.
Also note that solution could also have been returned as an ordered tuple,
FiniteSet is just a wrapper `{}` around the tuple. It has no other
significance except for the fact it is just used to maintain a consistent
output format throughout the solveset.
Raises
======
ValueError
The input is not valid.
The symbols are not given.
AttributeError
The input symbols are not `Symbol` type.
Examples
========
>>> from sympy.core.symbol import symbols
>>> x, y = symbols('x, y', real=True)
>>> from sympy.solvers.solveset import substitution
>>> substitution([x + y], [x], [{y: 1}], [y], set([]), [x, y])
FiniteSet((-1, 1))
* when you want soln should not satisfy eq `x + 1 = 0`
>>> substitution([x + y], [x], [{y: 1}], [y], set([x + 1]), [y, x])
EmptySet
>>> substitution([x + y], [x], [{y: 1}], [y], set([x - 1]), [y, x])
FiniteSet((1, -1))
>>> substitution([x + y - 1, y - x**2 + 5], [x, y])
FiniteSet((-3, 4), (2, -1))
* Returns both real and complex solution
>>> x, y, z = symbols('x, y, z')
>>> from sympy import exp, sin
>>> substitution([exp(x) - sin(y), y**2 - 4], [x, y])
FiniteSet((ImageSet(Lambda(_n, 2*_n*I*pi + log(sin(2))), Integers), 2),
(ImageSet(Lambda(_n, I*(2*_n*pi + pi) + log(sin(2))), Integers), -2))
>>> eqs = [z**2 + exp(2*x) - sin(y), -3 + exp(-y)]
>>> substitution(eqs, [y, z])
FiniteSet((-log(3), sqrt(-exp(2*x) - sin(log(3)))),
(-log(3), -sqrt(-exp(2*x) - sin(log(3)))),
(ImageSet(Lambda(_n, 2*_n*I*pi - log(3)), Integers),
ImageSet(Lambda(_n, sqrt(-exp(2*x) + sin(2*_n*I*pi - log(3)))), Integers)),
(ImageSet(Lambda(_n, 2*_n*I*pi - log(3)), Integers),
ImageSet(Lambda(_n, -sqrt(-exp(2*x) + sin(2*_n*I*pi - log(3)))), Integers)))
"""
from sympy import Complement
from sympy.core.compatibility import is_sequence
if not system:
return S.EmptySet
if not symbols:
msg = ('Symbols must be given, for which solution of the '
'system is to be found.')
raise ValueError(filldedent(msg))
if not is_sequence(symbols):
msg = ('symbols should be given as a sequence, e.g. a list.'
'Not type %s: %s')
raise TypeError(filldedent(msg % (type(symbols), symbols)))
if not getattr(symbols[0], 'is_Symbol', False):
msg = ('Iterable of symbols must be given as '
'second argument, not type %s: %s')
raise ValueError(filldedent(msg % (type(symbols[0]), symbols[0])))
# By default `all_symbols` will be same as `symbols`
if all_symbols is None:
all_symbols = symbols
old_result = result
# storing complements and intersection for particular symbol
complements = {}
intersections = {}
# when total_solveset_call equals total_conditionset
# it means that solveset failed to solve all eqs.
total_conditionset = -1
total_solveset_call = -1
def _unsolved_syms(eq, sort=False):
"""Returns the unsolved symbol present
in the equation `eq`.
"""
free = eq.free_symbols
unsolved = (free - set(known_symbols)) & set(all_symbols)
if sort:
unsolved = list(unsolved)
unsolved.sort(key=default_sort_key)
return unsolved
# end of _unsolved_syms()
# sort such that equation with the fewest potential symbols is first.
# means eq with less number of variable first in the list.
eqs_in_better_order = list(
ordered(system, lambda _: len(_unsolved_syms(_))))
def add_intersection_complement(result, intersection_dict, complement_dict):
# If solveset has returned some intersection/complement
# for any symbol, it will be added in the final solution.
final_result = []
for res in result:
res_copy = res
for key_res, value_res in res.items():
intersect_set, complement_set = None, None
for key_sym, value_sym in intersection_dict.items():
if key_sym == key_res:
intersect_set = value_sym
for key_sym, value_sym in complement_dict.items():
if key_sym == key_res:
complement_set = value_sym
if intersect_set or complement_set:
new_value = FiniteSet(value_res)
if intersect_set and intersect_set != S.Complexes:
new_value = Intersection(new_value, intersect_set)
if complement_set:
new_value = Complement(new_value, complement_set)
if new_value is S.EmptySet:
res_copy = {}
elif new_value.is_FiniteSet and len(new_value) == 1:
res_copy[key_res] = set(new_value).pop()
else:
res_copy[key_res] = new_value
final_result.append(res_copy)
return final_result
# end of def add_intersection_complement()
def _extract_main_soln(sym, sol, soln_imageset):
"""Separate the Complements, Intersections, ImageSet lambda expr
and its base_set.
"""
# if there is union, then need to check
# Complement, Intersection, Imageset.
# Order should not be changed.
if isinstance(sol, Complement):
# extract solution and complement
complements[sym] = sol.args[1]
sol = sol.args[0]
# complement will be added at the end
# using `add_intersection_complement` method
if isinstance(sol, Intersection):
# Interval/Set will be at 0th index always
if sol.args[0] not in (S.Reals, S.Complexes):
# Sometimes solveset returns soln with intersection
# S.Reals or S.Complexes. We don't consider that
# intersection.
intersections[sym] = sol.args[0]
sol = sol.args[1]
# after intersection and complement Imageset should
# be checked.
if isinstance(sol, ImageSet):
soln_imagest = sol
expr2 = sol.lamda.expr
sol = FiniteSet(expr2)
soln_imageset[expr2] = soln_imagest
# if there is union of Imageset or other in soln.
# no testcase is written for this if block
if isinstance(sol, Union):
sol_args = sol.args
sol = S.EmptySet
# We need in sequence so append finteset elements
# and then imageset or other.
for sol_arg2 in sol_args:
if isinstance(sol_arg2, FiniteSet):
sol += sol_arg2
else:
# ImageSet, Intersection, complement then
# append them directly
sol += FiniteSet(sol_arg2)
if not isinstance(sol, FiniteSet):
sol = FiniteSet(sol)
return sol, soln_imageset
# end of def _extract_main_soln()
# helper function for _append_new_soln
def _check_exclude(rnew, imgset_yes):
rnew_ = rnew
if imgset_yes:
# replace all dummy variables (Imageset lambda variables)
# with zero before `checksol`. Considering fundamental soln
# for `checksol`.
rnew_copy = rnew.copy()
dummy_n = imgset_yes[0]
for key_res, value_res in rnew_copy.items():
rnew_copy[key_res] = value_res.subs(dummy_n, 0)
rnew_ = rnew_copy
# satisfy_exclude == true if it satisfies the expr of `exclude` list.
try:
# something like : `Mod(-log(3), 2*I*pi)` can't be
# simplified right now, so `checksol` returns `TypeError`.
# when this issue is fixed this try block should be
# removed. Mod(-log(3), 2*I*pi) == -log(3)
satisfy_exclude = any(
checksol(d, rnew_) for d in exclude)
except TypeError:
satisfy_exclude = None
return satisfy_exclude
# end of def _check_exclude()
# helper function for _append_new_soln
def _restore_imgset(rnew, original_imageset, newresult):
restore_sym = set(rnew.keys()) & \
set(original_imageset.keys())
for key_sym in restore_sym:
img = original_imageset[key_sym]
rnew[key_sym] = img
if rnew not in newresult:
newresult.append(rnew)
# end of def _restore_imgset()
def _append_eq(eq, result, res, delete_soln, n=None):
u = Dummy('u')
if n:
eq = eq.subs(n, 0)
satisfy = checksol(u, u, eq, minimal=True)
if satisfy is False:
delete_soln = True
res = {}
else:
result.append(res)
return result, res, delete_soln
def _append_new_soln(rnew, sym, sol, imgset_yes, soln_imageset,
original_imageset, newresult, eq=None):
"""If `rnew` (A dict <symbol: soln>) contains valid soln
append it to `newresult` list.
`imgset_yes` is (base, dummy_var) if there was imageset in previously
calculated result(otherwise empty tuple). `original_imageset` is dict
of imageset expr and imageset from this result.
`soln_imageset` dict of imageset expr and imageset of new soln.
"""
satisfy_exclude = _check_exclude(rnew, imgset_yes)
delete_soln = False
# soln should not satisfy expr present in `exclude` list.
if not satisfy_exclude:
local_n = None
# if it is imageset
if imgset_yes:
local_n = imgset_yes[0]
base = imgset_yes[1]
if sym and sol:
# when `sym` and `sol` is `None` means no new
# soln. In that case we will append rnew directly after
# substituting original imagesets in rnew values if present
# (second last line of this function using _restore_imgset)
dummy_list = list(sol.atoms(Dummy))
# use one dummy `n` which is in
# previous imageset
local_n_list = [
local_n for i in range(
0, len(dummy_list))]
dummy_zip = zip(dummy_list, local_n_list)
lam = Lambda(local_n, sol.subs(dummy_zip))
rnew[sym] = ImageSet(lam, base)
if eq is not None:
newresult, rnew, delete_soln = _append_eq(
eq, newresult, rnew, delete_soln, local_n)
elif eq is not None:
newresult, rnew, delete_soln = _append_eq(
eq, newresult, rnew, delete_soln)
elif soln_imageset:
rnew[sym] = soln_imageset[sol]
# restore original imageset
_restore_imgset(rnew, original_imageset, newresult)
else:
newresult.append(rnew)
elif satisfy_exclude:
delete_soln = True
rnew = {}
_restore_imgset(rnew, original_imageset, newresult)
return newresult, delete_soln
# end of def _append_new_soln()
def _new_order_result(result, eq):
# separate first, second priority. `res` that makes `eq` value equals
# to zero, should be used first then other result(second priority).
# If it is not done then we may miss some soln.
first_priority = []
second_priority = []
for res in result:
if not any(isinstance(val, ImageSet) for val in res.values()):
if eq.subs(res) == 0:
first_priority.append(res)
else:
second_priority.append(res)
if first_priority or second_priority:
return first_priority + second_priority
return result
def _solve_using_known_values(result, solver):
"""Solves the system using already known solution
(result contains the dict <symbol: value>).
solver is `solveset_complex` or `solveset_real`.
"""
# stores imageset <expr: imageset(Lambda(n, expr), base)>.
soln_imageset = {}
total_solvest_call = 0
total_conditionst = 0
# sort such that equation with the fewest potential symbols is first.
# means eq with less variable first
for index, eq in enumerate(eqs_in_better_order):
newresult = []
original_imageset = {}
# if imageset expr is used to solve other symbol
imgset_yes = False
result = _new_order_result(result, eq)
for res in result:
got_symbol = set() # symbols solved in one iteration
if soln_imageset:
# find the imageset and use its expr.
for key_res, value_res in res.items():
if isinstance(value_res, ImageSet):
res[key_res] = value_res.lamda.expr
original_imageset[key_res] = value_res
dummy_n = value_res.lamda.expr.atoms(Dummy).pop()
(base,) = value_res.base_sets
imgset_yes = (dummy_n, base)
# update eq with everything that is known so far
eq2 = eq.subs(res).expand()
unsolved_syms = _unsolved_syms(eq2, sort=True)
if not unsolved_syms:
if res:
newresult, delete_res = _append_new_soln(
res, None, None, imgset_yes, soln_imageset,
original_imageset, newresult, eq2)
if delete_res:
# `delete_res` is true, means substituting `res` in
# eq2 doesn't return `zero` or deleting the `res`
# (a soln) since it staisfies expr of `exclude`
# list.
result.remove(res)
continue # skip as it's independent of desired symbols
depen = eq2.as_independent(unsolved_syms)[0]
if depen.has(Abs) and solver == solveset_complex:
# Absolute values cannot be inverted in the
# complex domain
continue
soln_imageset = {}
for sym in unsolved_syms:
not_solvable = False
try:
soln = solver(eq2, sym)
total_solvest_call += 1
soln_new = S.EmptySet
if isinstance(soln, Complement):
# separate solution and complement
complements[sym] = soln.args[1]
soln = soln.args[0]
# complement will be added at the end
if isinstance(soln, Intersection):
# Interval will be at 0th index always
if soln.args[0] != Interval(-oo, oo):
# sometimes solveset returns soln
# with intersection S.Reals, to confirm that
# soln is in domain=S.Reals
intersections[sym] = soln.args[0]
soln_new += soln.args[1]
soln = soln_new if soln_new else soln
if index > 0 and solver == solveset_real:
# one symbol's real soln , another symbol may have
# corresponding complex soln.
if not isinstance(soln, (ImageSet, ConditionSet)):
soln += solveset_complex(eq2, sym)
except NotImplementedError:
# If sovleset is not able to solve equation `eq2`. Next
# time we may get soln using next equation `eq2`
continue
if isinstance(soln, ConditionSet):
soln = S.EmptySet
# don't do `continue` we may get soln
# in terms of other symbol(s)
not_solvable = True
total_conditionst += 1
if soln is not S.EmptySet:
soln, soln_imageset = _extract_main_soln(
sym, soln, soln_imageset)
for sol in soln:
# sol is not a `Union` since we checked it
# before this loop
sol, soln_imageset = _extract_main_soln(
sym, sol, soln_imageset)
sol = set(sol).pop()
free = sol.free_symbols
if got_symbol and any([
ss in free for ss in got_symbol
]):
# sol depends on previously solved symbols
# then continue
continue
rnew = res.copy()
# put each solution in res and append the new result
# in the new result list (solution for symbol `s`)
# along with old results.
for k, v in res.items():
if isinstance(v, Expr):
# if any unsolved symbol is present
# Then subs known value
rnew[k] = v.subs(sym, sol)
# and add this new solution
if soln_imageset:
# replace all lambda variables with 0.
imgst = soln_imageset[sol]
rnew[sym] = imgst.lamda(
*[0 for i in range(0, len(
imgst.lamda.variables))])
else:
rnew[sym] = sol
newresult, delete_res = _append_new_soln(
rnew, sym, sol, imgset_yes, soln_imageset,
original_imageset, newresult)
if delete_res:
# deleting the `res` (a soln) since it staisfies
# eq of `exclude` list
result.remove(res)
# solution got for sym
if not not_solvable:
got_symbol.add(sym)
# next time use this new soln
if newresult:
result = newresult
return result, total_solvest_call, total_conditionst
# end def _solve_using_know_values()
new_result_real, solve_call1, cnd_call1 = _solve_using_known_values(
old_result, solveset_real)
new_result_complex, solve_call2, cnd_call2 = _solve_using_known_values(
old_result, solveset_complex)
# when `total_solveset_call` is equals to `total_conditionset`
# means solvest fails to solve all the eq.
# return conditionset in this case
total_conditionset += (cnd_call1 + cnd_call2)
total_solveset_call += (solve_call1 + solve_call2)
if total_conditionset == total_solveset_call and total_solveset_call != -1:
return _return_conditionset(eqs_in_better_order, all_symbols)
# overall result
result = new_result_real + new_result_complex
result_all_variables = []
result_infinite = []
for res in result:
if not res:
# means {None : None}
continue
# If length < len(all_symbols) means infinite soln.
# Some or all the soln is dependent on 1 symbol.
# eg. {x: y+2} then final soln {x: y+2, y: y}
if len(res) < len(all_symbols):
solved_symbols = res.keys()
unsolved = list(filter(
lambda x: x not in solved_symbols, all_symbols))
for unsolved_sym in unsolved:
res[unsolved_sym] = unsolved_sym
result_infinite.append(res)
if res not in result_all_variables:
result_all_variables.append(res)
if result_infinite:
# we have general soln
# eg : [{x: -1, y : 1}, {x : -y , y: y}] then
# return [{x : -y, y : y}]
result_all_variables = result_infinite
if intersections or complements:
result_all_variables = add_intersection_complement(
result_all_variables, intersections, complements)
# convert to ordered tuple
result = S.EmptySet
for r in result_all_variables:
temp = [r[symb] for symb in all_symbols]
result += FiniteSet(tuple(temp))
return result
# end of def substitution()
def _solveset_work(system, symbols):
soln = solveset(system[0], symbols[0])
if isinstance(soln, FiniteSet):
_soln = FiniteSet(*[tuple((s,)) for s in soln])
return _soln
else:
return FiniteSet(tuple(FiniteSet(soln)))
def _handle_positive_dimensional(polys, symbols, denominators):
from sympy.polys.polytools import groebner
# substitution method where new system is groebner basis of the system
_symbols = list(symbols)
_symbols.sort(key=default_sort_key)
basis = groebner(polys, _symbols, polys=True)
new_system = []
for poly_eq in basis:
new_system.append(poly_eq.as_expr())
result = [{}]
result = substitution(
new_system, symbols, result, [],
denominators)
return result
# end of def _handle_positive_dimensional()
def _handle_zero_dimensional(polys, symbols, system):
# solve 0 dimensional poly system using `solve_poly_system`
result = solve_poly_system(polys, *symbols)
# May be some extra soln is added because
# we used `unrad` in `_separate_poly_nonpoly`, so
# need to check and remove if it is not a soln.
result_update = S.EmptySet
for res in result:
dict_sym_value = dict(list(zip(symbols, res)))
if all(checksol(eq, dict_sym_value) for eq in system):
result_update += FiniteSet(res)
return result_update
# end of def _handle_zero_dimensional()
def _separate_poly_nonpoly(system, symbols):
polys = []
polys_expr = []
nonpolys = []
denominators = set()
poly = None
for eq in system:
# Store denom expression if it contains symbol
denominators.update(_simple_dens(eq, symbols))
# try to remove sqrt and rational power
without_radicals = unrad(simplify(eq))
if without_radicals:
eq_unrad, cov = without_radicals
if not cov:
eq = eq_unrad
if isinstance(eq, Expr):
eq = eq.as_numer_denom()[0]
poly = eq.as_poly(*symbols, extension=True)
elif simplify(eq).is_number:
continue
if poly is not None:
polys.append(poly)
polys_expr.append(poly.as_expr())
else:
nonpolys.append(eq)
return polys, polys_expr, nonpolys, denominators
# end of def _separate_poly_nonpoly()
def nonlinsolve(system, *symbols):
r"""
Solve system of N non linear equations with M variables, which means both
under and overdetermined systems are supported. Positive dimensional
system is also supported (A system with infinitely many solutions is said
to be positive-dimensional). In Positive dimensional system solution will
be dependent on at least one symbol. Returns both real solution
and complex solution(If system have). The possible number of solutions
is zero, one or infinite.
Parameters
==========
system : list of equations
The target system of equations
symbols : list of Symbols
symbols should be given as a sequence eg. list
Returns
=======
A FiniteSet of ordered tuple of values of `symbols` for which the `system`
has solution. Order of values in the tuple is same as symbols present in
the parameter `symbols`.
Please note that general FiniteSet is unordered, the solution returned
here is not simply a FiniteSet of solutions, rather it is a FiniteSet of
ordered tuple, i.e. the first & only argument to FiniteSet is a tuple of
solutions, which is ordered, & hence the returned solution is ordered.
Also note that solution could also have been returned as an ordered tuple,
FiniteSet is just a wrapper `{}` around the tuple. It has no other
significance except for the fact it is just used to maintain a consistent
output format throughout the solveset.
For the given set of Equations, the respective input types
are given below:
.. math:: x*y - 1 = 0
.. math:: 4*x**2 + y**2 - 5 = 0
`system = [x*y - 1, 4*x**2 + y**2 - 5]`
`symbols = [x, y]`
Raises
======
ValueError
The input is not valid.
The symbols are not given.
AttributeError
The input symbols are not `Symbol` type.
Examples
========
>>> from sympy.core.symbol import symbols
>>> from sympy.solvers.solveset import nonlinsolve
>>> x, y, z = symbols('x, y, z', real=True)
>>> nonlinsolve([x*y - 1, 4*x**2 + y**2 - 5], [x, y])
FiniteSet((-1, -1), (-1/2, -2), (1/2, 2), (1, 1))
1. Positive dimensional system and complements:
>>> from sympy import pprint
>>> from sympy.polys.polytools import is_zero_dimensional
>>> a, b, c, d = symbols('a, b, c, d', extended_real=True)
>>> eq1 = a + b + c + d
>>> eq2 = a*b + b*c + c*d + d*a
>>> eq3 = a*b*c + b*c*d + c*d*a + d*a*b
>>> eq4 = a*b*c*d - 1
>>> system = [eq1, eq2, eq3, eq4]
>>> is_zero_dimensional(system)
False
>>> pprint(nonlinsolve(system, [a, b, c, d]), use_unicode=False)
-1 1 1 -1
{(---, -d, -, {d} \ {0}), (-, -d, ---, {d} \ {0})}
d d d d
>>> nonlinsolve([(x+y)**2 - 4, x + y - 2], [x, y])
FiniteSet((2 - y, y))
2. If some of the equations are non-polynomial then `nonlinsolve`
will call the `substitution` function and return real and complex solutions,
if present.
>>> from sympy import exp, sin
>>> nonlinsolve([exp(x) - sin(y), y**2 - 4], [x, y])
FiniteSet((ImageSet(Lambda(_n, 2*_n*I*pi + log(sin(2))), Integers), 2),
(ImageSet(Lambda(_n, I*(2*_n*pi + pi) + log(sin(2))), Integers), -2))
3. If system is non-linear polynomial and zero-dimensional then it
returns both solution (real and complex solutions, if present) using
`solve_poly_system`:
>>> from sympy import sqrt
>>> nonlinsolve([x**2 - 2*y**2 -2, x*y - 2], [x, y])
FiniteSet((-2, -1), (2, 1), (-sqrt(2)*I, sqrt(2)*I), (sqrt(2)*I, -sqrt(2)*I))
4. `nonlinsolve` can solve some linear (zero or positive dimensional)
system (because it uses the `groebner` function to get the
groebner basis and then uses the `substitution` function basis as the
new `system`). But it is not recommended to solve linear system using
`nonlinsolve`, because `linsolve` is better for general linear systems.
>>> nonlinsolve([x + 2*y -z - 3, x - y - 4*z + 9 , y + z - 4], [x, y, z])
FiniteSet((3*z - 5, 4 - z, z))
5. System having polynomial equations and only real solution is
solved using `solve_poly_system`:
>>> e1 = sqrt(x**2 + y**2) - 10
>>> e2 = sqrt(y**2 + (-x + 10)**2) - 3
>>> nonlinsolve((e1, e2), (x, y))
FiniteSet((191/20, -3*sqrt(391)/20), (191/20, 3*sqrt(391)/20))
>>> nonlinsolve([x**2 + 2/y - 2, x + y - 3], [x, y])
FiniteSet((1, 2), (1 - sqrt(5), 2 + sqrt(5)), (1 + sqrt(5), 2 - sqrt(5)))
>>> nonlinsolve([x**2 + 2/y - 2, x + y - 3], [y, x])
FiniteSet((2, 1), (2 - sqrt(5), 1 + sqrt(5)), (2 + sqrt(5), 1 - sqrt(5)))
6. It is better to use symbols instead of Trigonometric Function or
Function (e.g. replace `sin(x)` with symbol, replace `f(x)` with symbol
and so on. Get soln from `nonlinsolve` and then using `solveset` get
the value of `x`)
How nonlinsolve is better than old solver `_solve_system` :
===========================================================
1. A positive dimensional system solver : nonlinsolve can return
solution for positive dimensional system. It finds the
Groebner Basis of the positive dimensional system(calling it as
basis) then we can start solving equation(having least number of
variable first in the basis) using solveset and substituting that
solved solutions into other equation(of basis) to get solution in
terms of minimum variables. Here the important thing is how we
are substituting the known values and in which equations.
2. Real and Complex both solutions : nonlinsolve returns both real
and complex solution. If all the equations in the system are polynomial
then using `solve_poly_system` both real and complex solution is returned.
If all the equations in the system are not polynomial equation then goes to
`substitution` method with this polynomial and non polynomial equation(s),
to solve for unsolved variables. Here to solve for particular variable
solveset_real and solveset_complex is used. For both real and complex
solution function `_solve_using_know_values` is used inside `substitution`
function.(`substitution` function will be called when there is any non
polynomial equation(s) is present). When solution is valid then add its
general solution in the final result.
3. Complement and Intersection will be added if any : nonlinsolve maintains
dict for complements and Intersections. If solveset find complements or/and
Intersection with any Interval or set during the execution of
`substitution` function ,then complement or/and Intersection for that
variable is added before returning final solution.
"""
from sympy.polys.polytools import is_zero_dimensional
if not system:
return S.EmptySet
if not symbols:
msg = ('Symbols must be given, for which solution of the '
'system is to be found.')
raise ValueError(filldedent(msg))
if hasattr(symbols[0], '__iter__'):
symbols = symbols[0]
if not is_sequence(symbols) or not symbols:
msg = ('Symbols must be given, for which solution of the '
'system is to be found.')
raise IndexError(filldedent(msg))
system, symbols, swap = recast_to_symbols(system, symbols)
if swap:
soln = nonlinsolve(system, symbols)
return FiniteSet(*[tuple(i.xreplace(swap) for i in s) for s in soln])
if len(system) == 1 and len(symbols) == 1:
return _solveset_work(system, symbols)
# main code of def nonlinsolve() starts from here
polys, polys_expr, nonpolys, denominators = _separate_poly_nonpoly(
system, symbols)
if len(symbols) == len(polys):
# If all the equations in the system are poly
if is_zero_dimensional(polys, symbols):
# finite number of soln (Zero dimensional system)
try:
return _handle_zero_dimensional(polys, symbols, system)
except NotImplementedError:
# Right now it doesn't fail for any polynomial system of
# equation. If `solve_poly_system` fails then `substitution`
# method will handle it.
result = substitution(
polys_expr, symbols, exclude=denominators)
return result
# positive dimensional system
res = _handle_positive_dimensional(polys, symbols, denominators)
if res is EmptySet and any(not p.domain.is_Exact for p in polys):
raise NotImplementedError("Equation not in exact domain. Try converting to rational")
else:
return res
else:
# If all the equations are not polynomial.
# Use `substitution` method for the system
result = substitution(
polys_expr + nonpolys, symbols, exclude=denominators)
return result
|
7b85d25c3bd901c368aecbcbc5163c755702368eb9e8245abb6d08eed990ad93 | """
This module contains pdsolve() and different helper functions that it
uses. It is heavily inspired by the ode module and hence the basic
infrastructure remains the same.
**Functions in this module**
These are the user functions in this module:
- pdsolve() - Solves PDE's
- classify_pde() - Classifies PDEs into possible hints for dsolve().
- pde_separate() - Separate variables in partial differential equation either by
additive or multiplicative separation approach.
These are the helper functions in this module:
- pde_separate_add() - Helper function for searching additive separable solutions.
- pde_separate_mul() - Helper function for searching multiplicative
separable solutions.
**Currently implemented solver methods**
The following methods are implemented for solving partial differential
equations. See the docstrings of the various pde_hint() functions for
more information on each (run help(pde)):
- 1st order linear homogeneous partial differential equations
with constant coefficients.
- 1st order linear general partial differential equations
with constant coefficients.
- 1st order linear partial differential equations with
variable coefficients.
"""
from __future__ import print_function, division
from itertools import combinations_with_replacement
from sympy.simplify import simplify # type: ignore
from sympy.core import Add, S
from sympy.core.compatibility import reduce, is_sequence
from sympy.core.function import Function, expand, AppliedUndef, Subs
from sympy.core.relational import Equality, Eq
from sympy.core.symbol import Symbol, Wild, symbols
from sympy.functions import exp
from sympy.integrals.integrals import Integral
from sympy.utilities.iterables import has_dups
from sympy.utilities.misc import filldedent
from sympy.solvers.deutils import _preprocess, ode_order, _desolve
from sympy.solvers.solvers import solve
from sympy.simplify.radsimp import collect
import operator
allhints = (
"1st_linear_constant_coeff_homogeneous",
"1st_linear_constant_coeff",
"1st_linear_constant_coeff_Integral",
"1st_linear_variable_coeff"
)
def pdsolve(eq, func=None, hint='default', dict=False, solvefun=None, **kwargs):
"""
Solves any (supported) kind of partial differential equation.
**Usage**
pdsolve(eq, f(x,y), hint) -> Solve partial differential equation
eq for function f(x,y), using method hint.
**Details**
``eq`` can be any supported partial differential equation (see
the pde docstring for supported methods). This can either
be an Equality, or an expression, which is assumed to be
equal to 0.
``f(x,y)`` is a function of two variables whose derivatives in that
variable make up the partial differential equation. In many
cases it is not necessary to provide this; it will be autodetected
(and an error raised if it couldn't be detected).
``hint`` is the solving method that you want pdsolve to use. Use
classify_pde(eq, f(x,y)) to get all of the possible hints for
a PDE. The default hint, 'default', will use whatever hint
is returned first by classify_pde(). See Hints below for
more options that you can use for hint.
``solvefun`` is the convention used for arbitrary functions returned
by the PDE solver. If not set by the user, it is set by default
to be F.
**Hints**
Aside from the various solving methods, there are also some
meta-hints that you can pass to pdsolve():
"default":
This uses whatever hint is returned first by
classify_pde(). This is the default argument to
pdsolve().
"all":
To make pdsolve apply all relevant classification hints,
use pdsolve(PDE, func, hint="all"). This will return a
dictionary of hint:solution terms. If a hint causes
pdsolve to raise the NotImplementedError, value of that
hint's key will be the exception object raised. The
dictionary will also include some special keys:
- order: The order of the PDE. See also ode_order() in
deutils.py
- default: The solution that would be returned by
default. This is the one produced by the hint that
appears first in the tuple returned by classify_pde().
"all_Integral":
This is the same as "all", except if a hint also has a
corresponding "_Integral" hint, it only returns the
"_Integral" hint. This is useful if "all" causes
pdsolve() to hang because of a difficult or impossible
integral. This meta-hint will also be much faster than
"all", because integrate() is an expensive routine.
See also the classify_pde() docstring for more info on hints,
and the pde docstring for a list of all supported hints.
**Tips**
- You can declare the derivative of an unknown function this way:
>>> from sympy import Function, Derivative
>>> from sympy.abc import x, y # x and y are the independent variables
>>> f = Function("f")(x, y) # f is a function of x and y
>>> # fx will be the partial derivative of f with respect to x
>>> fx = Derivative(f, x)
>>> # fy will be the partial derivative of f with respect to y
>>> fy = Derivative(f, y)
- See test_pde.py for many tests, which serves also as a set of
examples for how to use pdsolve().
- pdsolve always returns an Equality class (except for the case
when the hint is "all" or "all_Integral"). Note that it is not possible
to get an explicit solution for f(x, y) as in the case of ODE's
- Do help(pde.pde_hintname) to get help more information on a
specific hint
Examples
========
>>> from sympy.solvers.pde import pdsolve
>>> from sympy import Function, diff, Eq
>>> from sympy.abc import x, y
>>> f = Function('f')
>>> u = f(x, y)
>>> ux = u.diff(x)
>>> uy = u.diff(y)
>>> eq = Eq(1 + (2*(ux/u)) + (3*(uy/u)), 0)
>>> pdsolve(eq)
Eq(f(x, y), F(3*x - 2*y)*exp(-2*x/13 - 3*y/13))
"""
if not solvefun:
solvefun = Function('F')
# See the docstring of _desolve for more details.
hints = _desolve(eq, func=func, hint=hint, simplify=True,
type='pde', **kwargs)
eq = hints.pop('eq', False)
all_ = hints.pop('all', False)
if all_:
# TODO : 'best' hint should be implemented when adequate
# number of hints are added.
pdedict = {}
failed_hints = {}
gethints = classify_pde(eq, dict=True)
pdedict.update({'order': gethints['order'],
'default': gethints['default']})
for hint in hints:
try:
rv = _helper_simplify(eq, hint, hints[hint]['func'],
hints[hint]['order'], hints[hint][hint], solvefun)
except NotImplementedError as detail:
failed_hints[hint] = detail
else:
pdedict[hint] = rv
pdedict.update(failed_hints)
return pdedict
else:
return _helper_simplify(eq, hints['hint'], hints['func'],
hints['order'], hints[hints['hint']], solvefun)
def _helper_simplify(eq, hint, func, order, match, solvefun):
"""Helper function of pdsolve that calls the respective
pde functions to solve for the partial differential
equations. This minimizes the computation in
calling _desolve multiple times.
"""
if hint.endswith("_Integral"):
solvefunc = globals()[
"pde_" + hint[:-len("_Integral")]]
else:
solvefunc = globals()["pde_" + hint]
return _handle_Integral(solvefunc(eq, func, order,
match, solvefun), func, order, hint)
def _handle_Integral(expr, func, order, hint):
r"""
Converts a solution with integrals in it into an actual solution.
Simplifies the integral mainly using doit()
"""
if hint.endswith("_Integral"):
return expr
elif hint == "1st_linear_constant_coeff":
return simplify(expr.doit())
else:
return expr
def classify_pde(eq, func=None, dict=False, **kwargs):
"""
Returns a tuple of possible pdsolve() classifications for a PDE.
The tuple is ordered so that first item is the classification that
pdsolve() uses to solve the PDE by default. In general,
classifications near the beginning of the list will produce
better solutions faster than those near the end, though there are
always exceptions. To make pdsolve use a different classification,
use pdsolve(PDE, func, hint=<classification>). See also the pdsolve()
docstring for different meta-hints you can use.
If ``dict`` is true, classify_pde() will return a dictionary of
hint:match expression terms. This is intended for internal use by
pdsolve(). Note that because dictionaries are ordered arbitrarily,
this will most likely not be in the same order as the tuple.
You can get help on different hints by doing help(pde.pde_hintname),
where hintname is the name of the hint without "_Integral".
See sympy.pde.allhints or the sympy.pde docstring for a list of all
supported hints that can be returned from classify_pde.
Examples
========
>>> from sympy.solvers.pde import classify_pde
>>> from sympy import Function, diff, Eq
>>> from sympy.abc import x, y
>>> f = Function('f')
>>> u = f(x, y)
>>> ux = u.diff(x)
>>> uy = u.diff(y)
>>> eq = Eq(1 + (2*(ux/u)) + (3*(uy/u)), 0)
>>> classify_pde(eq)
('1st_linear_constant_coeff_homogeneous',)
"""
prep = kwargs.pop('prep', True)
if func and len(func.args) != 2:
raise NotImplementedError("Right now only partial "
"differential equations of two variables are supported")
if prep or func is None:
prep, func_ = _preprocess(eq, func)
if func is None:
func = func_
if isinstance(eq, Equality):
if eq.rhs != 0:
return classify_pde(eq.lhs - eq.rhs, func)
eq = eq.lhs
f = func.func
x = func.args[0]
y = func.args[1]
fx = f(x,y).diff(x)
fy = f(x,y).diff(y)
# TODO : For now pde.py uses support offered by the ode_order function
# to find the order with respect to a multi-variable function. An
# improvement could be to classify the order of the PDE on the basis of
# individual variables.
order = ode_order(eq, f(x,y))
# hint:matchdict or hint:(tuple of matchdicts)
# Also will contain "default":<default hint> and "order":order items.
matching_hints = {'order': order}
if not order:
if dict:
matching_hints["default"] = None
return matching_hints
else:
return ()
eq = expand(eq)
a = Wild('a', exclude = [f(x,y)])
b = Wild('b', exclude = [f(x,y), fx, fy, x, y])
c = Wild('c', exclude = [f(x,y), fx, fy, x, y])
d = Wild('d', exclude = [f(x,y), fx, fy, x, y])
e = Wild('e', exclude = [f(x,y), fx, fy])
n = Wild('n', exclude = [x, y])
# Try removing the smallest power of f(x,y)
# from the highest partial derivatives of f(x,y)
reduced_eq = None
if eq.is_Add:
var = set(combinations_with_replacement((x,y), order))
dummyvar = var.copy()
power = None
for i in var:
coeff = eq.coeff(f(x,y).diff(*i))
if coeff != 1:
match = coeff.match(a*f(x,y)**n)
if match and match[a]:
power = match[n]
dummyvar.remove(i)
break
dummyvar.remove(i)
for i in dummyvar:
coeff = eq.coeff(f(x,y).diff(*i))
if coeff != 1:
match = coeff.match(a*f(x,y)**n)
if match and match[a] and match[n] < power:
power = match[n]
if power:
den = f(x,y)**power
reduced_eq = Add(*[arg/den for arg in eq.args])
if not reduced_eq:
reduced_eq = eq
if order == 1:
reduced_eq = collect(reduced_eq, f(x, y))
r = reduced_eq.match(b*fx + c*fy + d*f(x,y) + e)
if r:
if not r[e]:
## Linear first-order homogeneous partial-differential
## equation with constant coefficients
r.update({'b': b, 'c': c, 'd': d})
matching_hints["1st_linear_constant_coeff_homogeneous"] = r
else:
if r[b]**2 + r[c]**2 != 0:
## Linear first-order general partial-differential
## equation with constant coefficients
r.update({'b': b, 'c': c, 'd': d, 'e': e})
matching_hints["1st_linear_constant_coeff"] = r
matching_hints[
"1st_linear_constant_coeff_Integral"] = r
else:
b = Wild('b', exclude=[f(x, y), fx, fy])
c = Wild('c', exclude=[f(x, y), fx, fy])
d = Wild('d', exclude=[f(x, y), fx, fy])
r = reduced_eq.match(b*fx + c*fy + d*f(x,y) + e)
if r:
r.update({'b': b, 'c': c, 'd': d, 'e': e})
matching_hints["1st_linear_variable_coeff"] = r
# Order keys based on allhints.
retlist = []
for i in allhints:
if i in matching_hints:
retlist.append(i)
if dict:
# Dictionaries are ordered arbitrarily, so make note of which
# hint would come first for pdsolve(). Use an ordered dict in Py 3.
matching_hints["default"] = None
matching_hints["ordered_hints"] = tuple(retlist)
for i in allhints:
if i in matching_hints:
matching_hints["default"] = i
break
return matching_hints
else:
return tuple(retlist)
def checkpdesol(pde, sol, func=None, solve_for_func=True):
"""
Checks if the given solution satisfies the partial differential
equation.
pde is the partial differential equation which can be given in the
form of an equation or an expression. sol is the solution for which
the pde is to be checked. This can also be given in an equation or
an expression form. If the function is not provided, the helper
function _preprocess from deutils is used to identify the function.
If a sequence of solutions is passed, the same sort of container will be
used to return the result for each solution.
The following methods are currently being implemented to check if the
solution satisfies the PDE:
1. Directly substitute the solution in the PDE and check. If the
solution hasn't been solved for f, then it will solve for f
provided solve_for_func hasn't been set to False.
If the solution satisfies the PDE, then a tuple (True, 0) is returned.
Otherwise a tuple (False, expr) where expr is the value obtained
after substituting the solution in the PDE. However if a known solution
returns False, it may be due to the inability of doit() to simplify it to zero.
Examples
========
>>> from sympy import Function, symbols, diff
>>> from sympy.solvers.pde import checkpdesol, pdsolve
>>> x, y = symbols('x y')
>>> f = Function('f')
>>> eq = 2*f(x,y) + 3*f(x,y).diff(x) + 4*f(x,y).diff(y)
>>> sol = pdsolve(eq)
>>> assert checkpdesol(eq, sol)[0]
>>> eq = x*f(x,y) + f(x,y).diff(x)
>>> checkpdesol(eq, sol)
(False, (x*F(4*x - 3*y) - 6*F(4*x - 3*y)/25 + 4*Subs(Derivative(F(_xi_1), _xi_1), _xi_1, 4*x - 3*y))*exp(-6*x/25 - 8*y/25))
"""
# Converting the pde into an equation
if not isinstance(pde, Equality):
pde = Eq(pde, 0)
# If no function is given, try finding the function present.
if func is None:
try:
_, func = _preprocess(pde.lhs)
except ValueError:
funcs = [s.atoms(AppliedUndef) for s in (
sol if is_sequence(sol, set) else [sol])]
funcs = set().union(funcs)
if len(funcs) != 1:
raise ValueError(
'must pass func arg to checkpdesol for this case.')
func = funcs.pop()
# If the given solution is in the form of a list or a set
# then return a list or set of tuples.
if is_sequence(sol, set):
return type(sol)([checkpdesol(
pde, i, func=func,
solve_for_func=solve_for_func) for i in sol])
# Convert solution into an equation
if not isinstance(sol, Equality):
sol = Eq(func, sol)
elif sol.rhs == func:
sol = sol.reversed
# Try solving for the function
solved = sol.lhs == func and not sol.rhs.has(func)
if solve_for_func and not solved:
solved = solve(sol, func)
if solved:
if len(solved) == 1:
return checkpdesol(pde, Eq(func, solved[0]),
func=func, solve_for_func=False)
else:
return checkpdesol(pde, [Eq(func, t) for t in solved],
func=func, solve_for_func=False)
# try direct substitution of the solution into the PDE and simplify
if sol.lhs == func:
pde = pde.lhs - pde.rhs
s = simplify(pde.subs(func, sol.rhs).doit())
return s is S.Zero, s
raise NotImplementedError(filldedent('''
Unable to test if %s is a solution to %s.''' % (sol, pde)))
def pde_1st_linear_constant_coeff_homogeneous(eq, func, order, match, solvefun):
r"""
Solves a first order linear homogeneous
partial differential equation with constant coefficients.
The general form of this partial differential equation is
.. math:: a \frac{\partial f(x,y)}{\partial x}
+ b \frac{\partial f(x,y)}{\partial y} + c f(x,y) = 0
where `a`, `b` and `c` are constants.
The general solution is of the form:
.. math::
f(x, y) = F(- a y + b x ) e^{- \frac{c (a x + b y)}{a^2 + b^2}}
and can be found in SymPy with ``pdsolve``::
>>> from sympy.solvers import pdsolve
>>> from sympy.abc import x, y, a, b, c
>>> from sympy import Function, pprint
>>> f = Function('f')
>>> u = f(x,y)
>>> ux = u.diff(x)
>>> uy = u.diff(y)
>>> genform = a*ux + b*uy + c*u
>>> pprint(genform)
d d
a*--(f(x, y)) + b*--(f(x, y)) + c*f(x, y)
dx dy
>>> pprint(pdsolve(genform))
-c*(a*x + b*y)
---------------
2 2
a + b
f(x, y) = F(-a*y + b*x)*e
Examples
========
>>> from sympy.solvers.pde import (
... pde_1st_linear_constant_coeff_homogeneous)
>>> from sympy import pdsolve
>>> from sympy import Function, diff, pprint
>>> from sympy.abc import x,y
>>> f = Function('f')
>>> pdsolve(f(x,y) + f(x,y).diff(x) + f(x,y).diff(y))
Eq(f(x, y), F(x - y)*exp(-x/2 - y/2))
>>> pprint(pdsolve(f(x,y) + f(x,y).diff(x) + f(x,y).diff(y)))
x y
- - - -
2 2
f(x, y) = F(x - y)*e
References
==========
- Viktor Grigoryan, "Partial Differential Equations"
Math 124A - Fall 2010, pp.7
"""
# TODO : For now homogeneous first order linear PDE's having
# two variables are implemented. Once there is support for
# solving systems of ODE's, this can be extended to n variables.
f = func.func
x = func.args[0]
y = func.args[1]
b = match[match['b']]
c = match[match['c']]
d = match[match['d']]
return Eq(f(x,y), exp(-S(d)/(b**2 + c**2)*(b*x + c*y))*solvefun(c*x - b*y))
def pde_1st_linear_constant_coeff(eq, func, order, match, solvefun):
r"""
Solves a first order linear partial differential equation
with constant coefficients.
The general form of this partial differential equation is
.. math:: a \frac{\partial f(x,y)}{\partial x}
+ b \frac{\partial f(x,y)}{\partial y}
+ c f(x,y) = G(x,y)
where `a`, `b` and `c` are constants and `G(x, y)` can be an arbitrary
function in `x` and `y`.
The general solution of the PDE is:
.. math::
f(x, y) = \left. \left[F(\eta) + \frac{1}{a^2 + b^2}
\int\limits^{a x + b y} G\left(\frac{a \xi + b \eta}{a^2 + b^2},
\frac{- a \eta + b \xi}{a^2 + b^2} \right)
e^{\frac{c \xi}{a^2 + b^2}}\, d\xi\right]
e^{- \frac{c \xi}{a^2 + b^2}}
\right|_{\substack{\eta=- a y + b x\\ \xi=a x + b y }}\, ,
where `F(\eta)` is an arbitrary single-valued function. The solution
can be found in SymPy with ``pdsolve``::
>>> from sympy.solvers import pdsolve
>>> from sympy.abc import x, y, a, b, c
>>> from sympy import Function, pprint
>>> f = Function('f')
>>> G = Function('G')
>>> u = f(x,y)
>>> ux = u.diff(x)
>>> uy = u.diff(y)
>>> genform = a*ux + b*uy + c*u - G(x,y)
>>> pprint(genform)
d d
a*--(f(x, y)) + b*--(f(x, y)) + c*f(x, y) - G(x, y)
dx dy
>>> pprint(pdsolve(genform, hint='1st_linear_constant_coeff_Integral'))
// a*x + b*y \
|| / |
|| | |
|| | c*xi |
|| | ------- |
|| | 2 2 |
|| | /a*xi + b*eta -a*eta + b*xi\ a + b |
|| | G|------------, -------------|*e d(xi)|
|| | | 2 2 2 2 | |
|| | \ a + b a + b / |
|| | |
|| / |
|| |
f(x, y) = ||F(eta) + -------------------------------------------------------|*
|| 2 2 |
\\ a + b /
<BLANKLINE>
\|
||
||
||
||
||
||
||
||
-c*xi ||
-------||
2 2||
a + b ||
e ||
||
/|eta=-a*y + b*x, xi=a*x + b*y
Examples
========
>>> from sympy.solvers.pde import pdsolve
>>> from sympy import Function, diff, pprint, exp
>>> from sympy.abc import x,y
>>> f = Function('f')
>>> eq = -2*f(x,y).diff(x) + 4*f(x,y).diff(y) + 5*f(x,y) - exp(x + 3*y)
>>> pdsolve(eq)
Eq(f(x, y), (F(4*x + 2*y) + exp(x/2 + 4*y)/15)*exp(x/2 - y))
References
==========
- Viktor Grigoryan, "Partial Differential Equations"
Math 124A - Fall 2010, pp.7
"""
# TODO : For now homogeneous first order linear PDE's having
# two variables are implemented. Once there is support for
# solving systems of ODE's, this can be extended to n variables.
xi, eta = symbols("xi eta")
f = func.func
x = func.args[0]
y = func.args[1]
b = match[match['b']]
c = match[match['c']]
d = match[match['d']]
e = -match[match['e']]
expterm = exp(-S(d)/(b**2 + c**2)*xi)
functerm = solvefun(eta)
solvedict = solve((b*x + c*y - xi, c*x - b*y - eta), x, y)
# Integral should remain as it is in terms of xi,
# doit() should be done in _handle_Integral.
genterm = (1/S(b**2 + c**2))*Integral(
(1/expterm*e).subs(solvedict), (xi, b*x + c*y))
return Eq(f(x,y), Subs(expterm*(functerm + genterm),
(eta, xi), (c*x - b*y, b*x + c*y)))
def pde_1st_linear_variable_coeff(eq, func, order, match, solvefun):
r"""
Solves a first order linear partial differential equation
with variable coefficients. The general form of this partial
differential equation is
.. math:: a(x, y) \frac{\partial f(x, y)}{\partial x}
+ b(x, y) \frac{\partial f(x, y)}{\partial y}
+ c(x, y) f(x, y) = G(x, y)
where `a(x, y)`, `b(x, y)`, `c(x, y)` and `G(x, y)` are arbitrary
functions in `x` and `y`. This PDE is converted into an ODE by
making the following transformation:
1. `\xi` as `x`
2. `\eta` as the constant in the solution to the differential
equation `\frac{dy}{dx} = -\frac{b}{a}`
Making the previous substitutions reduces it to the linear ODE
.. math:: a(\xi, \eta)\frac{du}{d\xi} + c(\xi, \eta)u - G(\xi, \eta) = 0
which can be solved using ``dsolve``.
>>> from sympy.solvers.pde import pdsolve
>>> from sympy.abc import x, y
>>> from sympy import Function, pprint
>>> a, b, c, G, f= [Function(i) for i in ['a', 'b', 'c', 'G', 'f']]
>>> u = f(x,y)
>>> ux = u.diff(x)
>>> uy = u.diff(y)
>>> genform = a(x, y)*u + b(x, y)*ux + c(x, y)*uy - G(x,y)
>>> pprint(genform)
d d
-G(x, y) + a(x, y)*f(x, y) + b(x, y)*--(f(x, y)) + c(x, y)*--(f(x, y))
dx dy
Examples
========
>>> from sympy.solvers.pde import pdsolve
>>> from sympy import Function, diff, pprint, exp
>>> from sympy.abc import x,y
>>> f = Function('f')
>>> eq = x*(u.diff(x)) - y*(u.diff(y)) + y**2*u - y**2
>>> pdsolve(eq)
Eq(f(x, y), F(x*y)*exp(y**2/2) + 1)
References
==========
- Viktor Grigoryan, "Partial Differential Equations"
Math 124A - Fall 2010, pp.7
"""
from sympy.integrals.integrals import integrate
from sympy.solvers.ode import dsolve
xi, eta = symbols("xi eta")
f = func.func
x = func.args[0]
y = func.args[1]
b = match[match['b']]
c = match[match['c']]
d = match[match['d']]
e = -match[match['e']]
if not d:
# To deal with cases like b*ux = e or c*uy = e
if not (b and c):
if c:
try:
tsol = integrate(e/c, y)
except NotImplementedError:
raise NotImplementedError("Unable to find a solution"
" due to inability of integrate")
else:
return Eq(f(x,y), solvefun(x) + tsol)
if b:
try:
tsol = integrate(e/b, x)
except NotImplementedError:
raise NotImplementedError("Unable to find a solution"
" due to inability of integrate")
else:
return Eq(f(x,y), solvefun(y) + tsol)
if not c:
# To deal with cases when c is 0, a simpler method is used.
# The PDE reduces to b*(u.diff(x)) + d*u = e, which is a linear ODE in x
plode = f(x).diff(x)*b + d*f(x) - e
sol = dsolve(plode, f(x))
syms = sol.free_symbols - plode.free_symbols - {x, y}
rhs = _simplify_variable_coeff(sol.rhs, syms, solvefun, y)
return Eq(f(x, y), rhs)
if not b:
# To deal with cases when b is 0, a simpler method is used.
# The PDE reduces to c*(u.diff(y)) + d*u = e, which is a linear ODE in y
plode = f(y).diff(y)*c + d*f(y) - e
sol = dsolve(plode, f(y))
syms = sol.free_symbols - plode.free_symbols - {x, y}
rhs = _simplify_variable_coeff(sol.rhs, syms, solvefun, x)
return Eq(f(x, y), rhs)
dummy = Function('d')
h = (c/b).subs(y, dummy(x))
sol = dsolve(dummy(x).diff(x) - h, dummy(x))
if isinstance(sol, list):
sol = sol[0]
solsym = sol.free_symbols - h.free_symbols - {x, y}
if len(solsym) == 1:
solsym = solsym.pop()
etat = (solve(sol, solsym)[0]).subs(dummy(x), y)
ysub = solve(eta - etat, y)[0]
deq = (b*(f(x).diff(x)) + d*f(x) - e).subs(y, ysub)
final = (dsolve(deq, f(x), hint='1st_linear')).rhs
if isinstance(final, list):
final = final[0]
finsyms = final.free_symbols - deq.free_symbols - {x, y}
rhs = _simplify_variable_coeff(final, finsyms, solvefun, etat)
return Eq(f(x, y), rhs)
else:
raise NotImplementedError("Cannot solve the partial differential equation due"
" to inability of constantsimp")
def _simplify_variable_coeff(sol, syms, func, funcarg):
r"""
Helper function to replace constants by functions in 1st_linear_variable_coeff
"""
eta = Symbol("eta")
if len(syms) == 1:
sym = syms.pop()
final = sol.subs(sym, func(funcarg))
else:
for key, sym in enumerate(syms):
final = sol.subs(sym, func(funcarg))
return simplify(final.subs(eta, funcarg))
def pde_separate(eq, fun, sep, strategy='mul'):
"""Separate variables in partial differential equation either by additive
or multiplicative separation approach. It tries to rewrite an equation so
that one of the specified variables occurs on a different side of the
equation than the others.
:param eq: Partial differential equation
:param fun: Original function F(x, y, z)
:param sep: List of separated functions [X(x), u(y, z)]
:param strategy: Separation strategy. You can choose between additive
separation ('add') and multiplicative separation ('mul') which is
default.
Examples
========
>>> from sympy import E, Eq, Function, pde_separate, Derivative as D
>>> from sympy.abc import x, t
>>> u, X, T = map(Function, 'uXT')
>>> eq = Eq(D(u(x, t), x), E**(u(x, t))*D(u(x, t), t))
>>> pde_separate(eq, u(x, t), [X(x), T(t)], strategy='add')
[exp(-X(x))*Derivative(X(x), x), exp(T(t))*Derivative(T(t), t)]
>>> eq = Eq(D(u(x, t), x, 2), D(u(x, t), t, 2))
>>> pde_separate(eq, u(x, t), [X(x), T(t)], strategy='mul')
[Derivative(X(x), (x, 2))/X(x), Derivative(T(t), (t, 2))/T(t)]
See Also
========
pde_separate_add, pde_separate_mul
"""
do_add = False
if strategy == 'add':
do_add = True
elif strategy == 'mul':
do_add = False
else:
raise ValueError('Unknown strategy: %s' % strategy)
if isinstance(eq, Equality):
if eq.rhs != 0:
return pde_separate(Eq(eq.lhs - eq.rhs, 0), fun, sep, strategy)
else:
return pde_separate(Eq(eq, 0), fun, sep, strategy)
if eq.rhs != 0:
raise ValueError("Value should be 0")
# Handle arguments
orig_args = list(fun.args)
subs_args = []
for s in sep:
for j in range(0, len(s.args)):
subs_args.append(s.args[j])
if do_add:
functions = reduce(operator.add, sep)
else:
functions = reduce(operator.mul, sep)
# Check whether variables match
if len(subs_args) != len(orig_args):
raise ValueError("Variable counts do not match")
# Check for duplicate arguments like [X(x), u(x, y)]
if has_dups(subs_args):
raise ValueError("Duplicate substitution arguments detected")
# Check whether the variables match
if set(orig_args) != set(subs_args):
raise ValueError("Arguments do not match")
# Substitute original function with separated...
result = eq.lhs.subs(fun, functions).doit()
# Divide by terms when doing multiplicative separation
if not do_add:
eq = 0
for i in result.args:
eq += i/functions
result = eq
svar = subs_args[0]
dvar = subs_args[1:]
return _separate(result, svar, dvar)
def pde_separate_add(eq, fun, sep):
"""
Helper function for searching additive separable solutions.
Consider an equation of two independent variables x, y and a dependent
variable w, we look for the product of two functions depending on different
arguments:
`w(x, y, z) = X(x) + y(y, z)`
Examples
========
>>> from sympy import E, Eq, Function, pde_separate_add, Derivative as D
>>> from sympy.abc import x, t
>>> u, X, T = map(Function, 'uXT')
>>> eq = Eq(D(u(x, t), x), E**(u(x, t))*D(u(x, t), t))
>>> pde_separate_add(eq, u(x, t), [X(x), T(t)])
[exp(-X(x))*Derivative(X(x), x), exp(T(t))*Derivative(T(t), t)]
"""
return pde_separate(eq, fun, sep, strategy='add')
def pde_separate_mul(eq, fun, sep):
"""
Helper function for searching multiplicative separable solutions.
Consider an equation of two independent variables x, y and a dependent
variable w, we look for the product of two functions depending on different
arguments:
`w(x, y, z) = X(x)*u(y, z)`
Examples
========
>>> from sympy import Function, Eq, pde_separate_mul, Derivative as D
>>> from sympy.abc import x, y
>>> u, X, Y = map(Function, 'uXY')
>>> eq = Eq(D(u(x, y), x, 2), D(u(x, y), y, 2))
>>> pde_separate_mul(eq, u(x, y), [X(x), Y(y)])
[Derivative(X(x), (x, 2))/X(x), Derivative(Y(y), (y, 2))/Y(y)]
"""
return pde_separate(eq, fun, sep, strategy='mul')
def _separate(eq, dep, others):
"""Separate expression into two parts based on dependencies of variables."""
# FIRST PASS
# Extract derivatives depending our separable variable...
terms = set()
for term in eq.args:
if term.is_Mul:
for i in term.args:
if i.is_Derivative and not i.has(*others):
terms.add(term)
continue
elif term.is_Derivative and not term.has(*others):
terms.add(term)
# Find the factor that we need to divide by
div = set()
for term in terms:
ext, sep = term.expand().as_independent(dep)
# Failed?
if sep.has(*others):
return None
div.add(ext)
# FIXME: Find lcm() of all the divisors and divide with it, instead of
# current hack :(
# https://github.com/sympy/sympy/issues/4597
if len(div) > 0:
final = 0
for term in eq.args:
eqn = 0
for i in div:
eqn += term / i
final += simplify(eqn)
eq = final
# SECOND PASS - separate the derivatives
div = set()
lhs = rhs = 0
for term in eq.args:
# Check, whether we have already term with independent variable...
if not term.has(*others):
lhs += term
continue
# ...otherwise, try to separate
temp, sep = term.expand().as_independent(dep)
# Failed?
if sep.has(*others):
return None
# Extract the divisors
div.add(sep)
rhs -= term.expand()
# Do the division
fulldiv = reduce(operator.add, div)
lhs = simplify(lhs/fulldiv).expand()
rhs = simplify(rhs/fulldiv).expand()
# ...and check whether we were successful :)
if lhs.has(*others) or rhs.has(dep):
return None
return [lhs, rhs]
|
1f903c7f7ed60fca25024ae5997f069d2dfe893346dbefc443d88600f6e16372 | """Solvers of systems of polynomial equations. """
from __future__ import print_function, division
from sympy.core import S
from sympy.polys import Poly, groebner, roots
from sympy.polys.polytools import parallel_poly_from_expr
from sympy.polys.polyerrors import (ComputationFailed,
PolificationFailed, CoercionFailed)
from sympy.simplify import rcollect
from sympy.utilities import default_sort_key, postfixes
from sympy.utilities.misc import filldedent
class SolveFailed(Exception):
"""Raised when solver's conditions weren't met. """
def solve_poly_system(seq, *gens, **args):
"""
Solve a system of polynomial equations.
Parameters
==========
seq: a list/tuple/set
Listing all the equations that are needed to be solved
gens: generators
generators of the equations in seq for which we want the
solutions
args: Keyword arguments
Special options for solving the equations
Returns
=======
List[Tuple]
A List of tuples. Solutions for symbols that satisfy the
equations listed in seq
Examples
========
>>> from sympy import solve_poly_system
>>> from sympy.abc import x, y
>>> solve_poly_system([x*y - 2*y, 2*y**2 - x**2], x, y)
[(0, 0), (2, -sqrt(2)), (2, sqrt(2))]
"""
try:
polys, opt = parallel_poly_from_expr(seq, *gens, **args)
except PolificationFailed as exc:
raise ComputationFailed('solve_poly_system', len(seq), exc)
if len(polys) == len(opt.gens) == 2:
f, g = polys
if all(i <= 2 for i in f.degree_list() + g.degree_list()):
try:
return solve_biquadratic(f, g, opt)
except SolveFailed:
pass
return solve_generic(polys, opt)
def solve_biquadratic(f, g, opt):
"""Solve a system of two bivariate quadratic polynomial equations.
Parameters
==========
f: a single Expr or Poly
First equation
g: a single Expr or Poly
Second Equation
opt: an Options object
For specifying keyword arguments and generators
Returns
=======
List[Tuple]
A List of tuples. Solutions for symbols that satisfy the
equations listed in seq.
Examples
========
>>> from sympy.polys import Options, Poly
>>> from sympy.abc import x, y
>>> from sympy.solvers.polysys import solve_biquadratic
>>> NewOption = Options((x, y), {'domain': 'ZZ'})
>>> a = Poly(y**2 - 4 + x, y, x, domain='ZZ')
>>> b = Poly(y*2 + 3*x - 7, y, x, domain='ZZ')
>>> solve_biquadratic(a, b, NewOption)
[(1/3, 3), (41/27, 11/9)]
>>> a = Poly(y + x**2 - 3, y, x, domain='ZZ')
>>> b = Poly(-y + x - 4, y, x, domain='ZZ')
>>> solve_biquadratic(a, b, NewOption)
[(7/2 - sqrt(29)/2, -sqrt(29)/2 - 1/2), (sqrt(29)/2 + 7/2, -1/2 + \
sqrt(29)/2)]
"""
G = groebner([f, g])
if len(G) == 1 and G[0].is_ground:
return None
if len(G) != 2:
raise SolveFailed
x, y = opt.gens
p, q = G
if not p.gcd(q).is_ground:
# not 0-dimensional
raise SolveFailed
p = Poly(p, x, expand=False)
p_roots = [rcollect(expr, y) for expr in roots(p).keys()]
q = q.ltrim(-1)
q_roots = list(roots(q).keys())
solutions = []
for q_root in q_roots:
for p_root in p_roots:
solution = (p_root.subs(y, q_root), q_root)
solutions.append(solution)
return sorted(solutions, key=default_sort_key)
def solve_generic(polys, opt):
"""
Solve a generic system of polynomial equations.
Returns all possible solutions over C[x_1, x_2, ..., x_m] of a
set F = { f_1, f_2, ..., f_n } of polynomial equations, using
Groebner basis approach. For now only zero-dimensional systems
are supported, which means F can have at most a finite number
of solutions.
The algorithm works by the fact that, supposing G is the basis
of F with respect to an elimination order (here lexicographic
order is used), G and F generate the same ideal, they have the
same set of solutions. By the elimination property, if G is a
reduced, zero-dimensional Groebner basis, then there exists an
univariate polynomial in G (in its last variable). This can be
solved by computing its roots. Substituting all computed roots
for the last (eliminated) variable in other elements of G, new
polynomial system is generated. Applying the above procedure
recursively, a finite number of solutions can be found.
The ability of finding all solutions by this procedure depends
on the root finding algorithms. If no solutions were found, it
means only that roots() failed, but the system is solvable. To
overcome this difficulty use numerical algorithms instead.
Parameters
==========
polys: a list/tuple/set
Listing all the polynomial equations that are needed to be solved
opt: an Options object
For specifying keyword arguments and generators
Returns
=======
List[Tuple]
A List of tuples. Solutions for symbols that satisfy the
equations listed in seq
References
==========
.. [Buchberger01] B. Buchberger, Groebner Bases: A Short
Introduction for Systems Theorists, In: R. Moreno-Diaz,
B. Buchberger, J.L. Freire, Proceedings of EUROCAST'01,
February, 2001
.. [Cox97] D. Cox, J. Little, D. O'Shea, Ideals, Varieties
and Algorithms, Springer, Second Edition, 1997, pp. 112
Examples
========
>>> from sympy.polys import Poly, Options
>>> from sympy.solvers.polysys import solve_generic
>>> from sympy.abc import x, y
>>> NewOption = Options((x, y), {'domain': 'ZZ'})
>>> a = Poly(x - y + 5, x, y, domain='ZZ')
>>> b = Poly(x + y - 3, x, y, domain='ZZ')
>>> solve_generic([a, b], NewOption)
[(-1, 4)]
>>> a = Poly(x - 2*y + 5, x, y, domain='ZZ')
>>> b = Poly(2*x - y - 3, x, y, domain='ZZ')
>>> solve_generic([a, b], NewOption)
[(11/3, 13/3)]
>>> a = Poly(x**2 + y, x, y, domain='ZZ')
>>> b = Poly(x + y*4, x, y, domain='ZZ')
>>> solve_generic([a, b], NewOption)
[(0, 0), (1/4, -1/16)]
"""
def _is_univariate(f):
"""Returns True if 'f' is univariate in its last variable. """
for monom in f.monoms():
if any(monom[:-1]):
return False
return True
def _subs_root(f, gen, zero):
"""Replace generator with a root so that the result is nice. """
p = f.as_expr({gen: zero})
if f.degree(gen) >= 2:
p = p.expand(deep=False)
return p
def _solve_reduced_system(system, gens, entry=False):
"""Recursively solves reduced polynomial systems. """
if len(system) == len(gens) == 1:
zeros = list(roots(system[0], gens[-1]).keys())
return [(zero,) for zero in zeros]
basis = groebner(system, gens, polys=True)
if len(basis) == 1 and basis[0].is_ground:
if not entry:
return []
else:
return None
univariate = list(filter(_is_univariate, basis))
if len(univariate) == 1:
f = univariate.pop()
else:
raise NotImplementedError(filldedent('''
only zero-dimensional systems supported
(finite number of solutions)
'''))
gens = f.gens
gen = gens[-1]
zeros = list(roots(f.ltrim(gen)).keys())
if not zeros:
return []
if len(basis) == 1:
return [(zero,) for zero in zeros]
solutions = []
for zero in zeros:
new_system = []
new_gens = gens[:-1]
for b in basis[:-1]:
eq = _subs_root(b, gen, zero)
if eq is not S.Zero:
new_system.append(eq)
for solution in _solve_reduced_system(new_system, new_gens):
solutions.append(solution + (zero,))
if solutions and len(solutions[0]) != len(gens):
raise NotImplementedError(filldedent('''
only zero-dimensional systems supported
(finite number of solutions)
'''))
return solutions
try:
result = _solve_reduced_system(polys, opt.gens, entry=True)
except CoercionFailed:
raise NotImplementedError
if result is not None:
return sorted(result, key=default_sort_key)
else:
return None
def solve_triangulated(polys, *gens, **args):
"""
Solve a polynomial system using Gianni-Kalkbrenner algorithm.
The algorithm proceeds by computing one Groebner basis in the ground
domain and then by iteratively computing polynomial factorizations in
appropriately constructed algebraic extensions of the ground domain.
Parameters
==========
polys: a list/tuple/set
Listing all the equations that are needed to be solved
gens: generators
generators of the equations in polys for which we want the
solutions
args: Keyword arguments
Special options for solving the equations
Returns
=======
List[Tuple]
A List of tuples. Solutions for symbols that satisfy the
equations listed in polys
Examples
========
>>> from sympy.solvers.polysys import solve_triangulated
>>> from sympy.abc import x, y, z
>>> F = [x**2 + y + z - 1, x + y**2 + z - 1, x + y + z**2 - 1]
>>> solve_triangulated(F, x, y, z)
[(0, 0, 1), (0, 1, 0), (1, 0, 0)]
References
==========
1. Patrizia Gianni, Teo Mora, Algebraic Solution of System of
Polynomial Equations using Groebner Bases, AAECC-5 on Applied Algebra,
Algebraic Algorithms and Error-Correcting Codes, LNCS 356 247--257, 1989
"""
G = groebner(polys, gens, polys=True)
G = list(reversed(G))
domain = args.get('domain')
if domain is not None:
for i, g in enumerate(G):
G[i] = g.set_domain(domain)
f, G = G[0].ltrim(-1), G[1:]
dom = f.get_domain()
zeros = f.ground_roots()
solutions = set([])
for zero in zeros:
solutions.add(((zero,), dom))
var_seq = reversed(gens[:-1])
vars_seq = postfixes(gens[1:])
for var, vars in zip(var_seq, vars_seq):
_solutions = set([])
for values, dom in solutions:
H, mapping = [], list(zip(vars, values))
for g in G:
_vars = (var,) + vars
if g.has_only_gens(*_vars) and g.degree(var) != 0:
h = g.ltrim(var).eval(dict(mapping))
if g.degree(var) == h.degree():
H.append(h)
p = min(H, key=lambda h: h.degree())
zeros = p.ground_roots()
for zero in zeros:
if not zero.is_Rational:
dom_zero = dom.algebraic_field(zero)
else:
dom_zero = dom
_solutions.add(((zero,) + values, dom_zero))
solutions = _solutions
solutions = list(solutions)
for i, (solution, _) in enumerate(solutions):
solutions[i] = solution
return sorted(solutions, key=default_sort_key)
|
ad7df0728ac665c41ee1970165fdbd5087fe931b969a41c9a7d54ec0d7bcb7f8 | """Tools for solving inequalities and systems of inequalities. """
from __future__ import print_function, division
from sympy.core import Symbol, Dummy, sympify
from sympy.core.compatibility import iterable
from sympy.core.exprtools import factor_terms
from sympy.core.relational import Relational, Eq, Ge, Lt
from sympy.sets import Interval
from sympy.sets.sets import FiniteSet, Union, EmptySet, Intersection
from sympy.core.singleton import S
from sympy.core.function import expand_mul
from sympy.functions import Abs
from sympy.logic import And
from sympy.polys import Poly, PolynomialError, parallel_poly_from_expr
from sympy.polys.polyutils import _nsort
from sympy.utilities.iterables import sift
from sympy.utilities.misc import filldedent
def solve_poly_inequality(poly, rel):
"""Solve a polynomial inequality with rational coefficients.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x
>>> from sympy.solvers.inequalities import solve_poly_inequality
>>> solve_poly_inequality(Poly(x, x, domain='ZZ'), '==')
[FiniteSet(0)]
>>> solve_poly_inequality(Poly(x**2 - 1, x, domain='ZZ'), '!=')
[Interval.open(-oo, -1), Interval.open(-1, 1), Interval.open(1, oo)]
>>> solve_poly_inequality(Poly(x**2 - 1, x, domain='ZZ'), '==')
[FiniteSet(-1), FiniteSet(1)]
See Also
========
solve_poly_inequalities
"""
if not isinstance(poly, Poly):
raise ValueError(
'For efficiency reasons, `poly` should be a Poly instance')
if poly.as_expr().is_number:
t = Relational(poly.as_expr(), 0, rel)
if t is S.true:
return [S.Reals]
elif t is S.false:
return [S.EmptySet]
else:
raise NotImplementedError(
"could not determine truth value of %s" % t)
reals, intervals = poly.real_roots(multiple=False), []
if rel == '==':
for root, _ in reals:
interval = Interval(root, root)
intervals.append(interval)
elif rel == '!=':
left = S.NegativeInfinity
for right, _ in reals + [(S.Infinity, 1)]:
interval = Interval(left, right, True, True)
intervals.append(interval)
left = right
else:
if poly.LC() > 0:
sign = +1
else:
sign = -1
eq_sign, equal = None, False
if rel == '>':
eq_sign = +1
elif rel == '<':
eq_sign = -1
elif rel == '>=':
eq_sign, equal = +1, True
elif rel == '<=':
eq_sign, equal = -1, True
else:
raise ValueError("'%s' is not a valid relation" % rel)
right, right_open = S.Infinity, True
for left, multiplicity in reversed(reals):
if multiplicity % 2:
if sign == eq_sign:
intervals.insert(
0, Interval(left, right, not equal, right_open))
sign, right, right_open = -sign, left, not equal
else:
if sign == eq_sign and not equal:
intervals.insert(
0, Interval(left, right, True, right_open))
right, right_open = left, True
elif sign != eq_sign and equal:
intervals.insert(0, Interval(left, left))
if sign == eq_sign:
intervals.insert(
0, Interval(S.NegativeInfinity, right, True, right_open))
return intervals
def solve_poly_inequalities(polys):
"""Solve polynomial inequalities with rational coefficients.
Examples
========
>>> from sympy.solvers.inequalities import solve_poly_inequalities
>>> from sympy.polys import Poly
>>> from sympy.abc import x
>>> solve_poly_inequalities(((
... Poly(x**2 - 3), ">"), (
... Poly(-x**2 + 1), ">")))
Union(Interval.open(-oo, -sqrt(3)), Interval.open(-1, 1), Interval.open(sqrt(3), oo))
"""
from sympy import Union
return Union(*[s for p in polys for s in solve_poly_inequality(*p)])
def solve_rational_inequalities(eqs):
"""Solve a system of rational inequalities with rational coefficients.
Examples
========
>>> from sympy.abc import x
>>> from sympy import Poly
>>> from sympy.solvers.inequalities import solve_rational_inequalities
>>> solve_rational_inequalities([[
... ((Poly(-x + 1), Poly(1, x)), '>='),
... ((Poly(-x + 1), Poly(1, x)), '<=')]])
FiniteSet(1)
>>> solve_rational_inequalities([[
... ((Poly(x), Poly(1, x)), '!='),
... ((Poly(-x + 1), Poly(1, x)), '>=')]])
Union(Interval.open(-oo, 0), Interval.Lopen(0, 1))
See Also
========
solve_poly_inequality
"""
result = S.EmptySet
for _eqs in eqs:
if not _eqs:
continue
global_intervals = [Interval(S.NegativeInfinity, S.Infinity)]
for (numer, denom), rel in _eqs:
numer_intervals = solve_poly_inequality(numer*denom, rel)
denom_intervals = solve_poly_inequality(denom, '==')
intervals = []
for numer_interval in numer_intervals:
for global_interval in global_intervals:
interval = numer_interval.intersect(global_interval)
if interval is not S.EmptySet:
intervals.append(interval)
global_intervals = intervals
intervals = []
for global_interval in global_intervals:
for denom_interval in denom_intervals:
global_interval -= denom_interval
if global_interval is not S.EmptySet:
intervals.append(global_interval)
global_intervals = intervals
if not global_intervals:
break
for interval in global_intervals:
result = result.union(interval)
return result
def reduce_rational_inequalities(exprs, gen, relational=True):
"""Reduce a system of rational inequalities with rational coefficients.
Examples
========
>>> from sympy import Poly, Symbol
>>> from sympy.solvers.inequalities import reduce_rational_inequalities
>>> x = Symbol('x', real=True)
>>> reduce_rational_inequalities([[x**2 <= 0]], x)
Eq(x, 0)
>>> reduce_rational_inequalities([[x + 2 > 0]], x)
-2 < x
>>> reduce_rational_inequalities([[(x + 2, ">")]], x)
-2 < x
>>> reduce_rational_inequalities([[x + 2]], x)
Eq(x, -2)
This function find the non-infinite solution set so if the unknown symbol
is declared as extended real rather than real then the result may include
finiteness conditions:
>>> y = Symbol('y', extended_real=True)
>>> reduce_rational_inequalities([[y + 2 > 0]], y)
(-2 < y) & (y < oo)
"""
exact = True
eqs = []
solution = S.Reals if exprs else S.EmptySet
for _exprs in exprs:
_eqs = []
for expr in _exprs:
if isinstance(expr, tuple):
expr, rel = expr
else:
if expr.is_Relational:
expr, rel = expr.lhs - expr.rhs, expr.rel_op
else:
expr, rel = expr, '=='
if expr is S.true:
numer, denom, rel = S.Zero, S.One, '=='
elif expr is S.false:
numer, denom, rel = S.One, S.One, '=='
else:
numer, denom = expr.together().as_numer_denom()
try:
(numer, denom), opt = parallel_poly_from_expr(
(numer, denom), gen)
except PolynomialError:
raise PolynomialError(filldedent('''
only polynomials and rational functions are
supported in this context.
'''))
if not opt.domain.is_Exact:
numer, denom, exact = numer.to_exact(), denom.to_exact(), False
domain = opt.domain.get_exact()
if not (domain.is_ZZ or domain.is_QQ):
expr = numer/denom
expr = Relational(expr, 0, rel)
solution &= solve_univariate_inequality(expr, gen, relational=False)
else:
_eqs.append(((numer, denom), rel))
if _eqs:
eqs.append(_eqs)
if eqs:
solution &= solve_rational_inequalities(eqs)
exclude = solve_rational_inequalities([[((d, d.one), '==')
for i in eqs for ((n, d), _) in i if d.has(gen)]])
solution -= exclude
if not exact and solution:
solution = solution.evalf()
if relational:
solution = solution.as_relational(gen)
return solution
def reduce_abs_inequality(expr, rel, gen):
"""Reduce an inequality with nested absolute values.
Examples
========
>>> from sympy import Abs, Symbol
>>> from sympy.solvers.inequalities import reduce_abs_inequality
>>> x = Symbol('x', real=True)
>>> reduce_abs_inequality(Abs(x - 5) - 3, '<', x)
(2 < x) & (x < 8)
>>> reduce_abs_inequality(Abs(x + 2)*3 - 13, '<', x)
(-19/3 < x) & (x < 7/3)
See Also
========
reduce_abs_inequalities
"""
if gen.is_extended_real is False:
raise TypeError(filldedent('''
can't solve inequalities with absolute values containing
non-real variables.
'''))
def _bottom_up_scan(expr):
exprs = []
if expr.is_Add or expr.is_Mul:
op = expr.func
for arg in expr.args:
_exprs = _bottom_up_scan(arg)
if not exprs:
exprs = _exprs
else:
args = []
for expr, conds in exprs:
for _expr, _conds in _exprs:
args.append((op(expr, _expr), conds + _conds))
exprs = args
elif expr.is_Pow:
n = expr.exp
if not n.is_Integer:
raise ValueError("Only Integer Powers are allowed on Abs.")
_exprs = _bottom_up_scan(expr.base)
for expr, conds in _exprs:
exprs.append((expr**n, conds))
elif isinstance(expr, Abs):
_exprs = _bottom_up_scan(expr.args[0])
for expr, conds in _exprs:
exprs.append(( expr, conds + [Ge(expr, 0)]))
exprs.append((-expr, conds + [Lt(expr, 0)]))
else:
exprs = [(expr, [])]
return exprs
exprs = _bottom_up_scan(expr)
mapping = {'<': '>', '<=': '>='}
inequalities = []
for expr, conds in exprs:
if rel not in mapping.keys():
expr = Relational( expr, 0, rel)
else:
expr = Relational(-expr, 0, mapping[rel])
inequalities.append([expr] + conds)
return reduce_rational_inequalities(inequalities, gen)
def reduce_abs_inequalities(exprs, gen):
"""Reduce a system of inequalities with nested absolute values.
Examples
========
>>> from sympy import Abs, Symbol
>>> from sympy.abc import x
>>> from sympy.solvers.inequalities import reduce_abs_inequalities
>>> x = Symbol('x', extended_real=True)
>>> reduce_abs_inequalities([(Abs(3*x - 5) - 7, '<'),
... (Abs(x + 25) - 13, '>')], x)
(-2/3 < x) & (x < 4) & (((-oo < x) & (x < -38)) | ((-12 < x) & (x < oo)))
>>> reduce_abs_inequalities([(Abs(x - 4) + Abs(3*x - 5) - 7, '<')], x)
(1/2 < x) & (x < 4)
See Also
========
reduce_abs_inequality
"""
return And(*[ reduce_abs_inequality(expr, rel, gen)
for expr, rel in exprs ])
def solve_univariate_inequality(expr, gen, relational=True, domain=S.Reals, continuous=False):
"""Solves a real univariate inequality.
Parameters
==========
expr : Relational
The target inequality
gen : Symbol
The variable for which the inequality is solved
relational : bool
A Relational type output is expected or not
domain : Set
The domain over which the equation is solved
continuous: bool
True if expr is known to be continuous over the given domain
(and so continuous_domain() doesn't need to be called on it)
Raises
======
NotImplementedError
The solution of the inequality cannot be determined due to limitation
in :func:`sympy.solvers.solveset.solvify`.
Notes
=====
Currently, we cannot solve all the inequalities due to limitations in
:func:`sympy.solvers.solveset.solvify`. Also, the solution returned for trigonometric inequalities
are restricted in its periodic interval.
See Also
========
sympy.solvers.solveset.solvify: solver returning solveset solutions with solve's output API
Examples
========
>>> from sympy.solvers.inequalities import solve_univariate_inequality
>>> from sympy import Symbol, sin, Interval, S
>>> x = Symbol('x')
>>> solve_univariate_inequality(x**2 >= 4, x)
((2 <= x) & (x < oo)) | ((x <= -2) & (-oo < x))
>>> solve_univariate_inequality(x**2 >= 4, x, relational=False)
Union(Interval(-oo, -2), Interval(2, oo))
>>> domain = Interval(0, S.Infinity)
>>> solve_univariate_inequality(x**2 >= 4, x, False, domain)
Interval(2, oo)
>>> solve_univariate_inequality(sin(x) > 0, x, relational=False)
Interval.open(0, pi)
"""
from sympy import im
from sympy.calculus.util import (continuous_domain, periodicity,
function_range)
from sympy.solvers.solvers import denoms
from sympy.solvers.solveset import solvify, solveset
# This keeps the function independent of the assumptions about `gen`.
# `solveset` makes sure this function is called only when the domain is
# real.
_gen = gen
_domain = domain
if gen.is_extended_real is False:
rv = S.EmptySet
return rv if not relational else rv.as_relational(_gen)
elif gen.is_extended_real is None:
gen = Dummy('gen', extended_real=True)
try:
expr = expr.xreplace({_gen: gen})
except TypeError:
raise TypeError(filldedent('''
When gen is real, the relational has a complex part
which leads to an invalid comparison like I < 0.
'''))
rv = None
if expr is S.true:
rv = domain
elif expr is S.false:
rv = S.EmptySet
else:
e = expr.lhs - expr.rhs
period = periodicity(e, gen)
if period == S.Zero:
e = expand_mul(e)
const = expr.func(e, 0)
if const is S.true:
rv = domain
elif const is S.false:
rv = S.EmptySet
elif period is not None:
frange = function_range(e, gen, domain)
rel = expr.rel_op
if rel == '<' or rel == '<=':
if expr.func(frange.sup, 0):
rv = domain
elif not expr.func(frange.inf, 0):
rv = S.EmptySet
elif rel == '>' or rel == '>=':
if expr.func(frange.inf, 0):
rv = domain
elif not expr.func(frange.sup, 0):
rv = S.EmptySet
inf, sup = domain.inf, domain.sup
if sup - inf is S.Infinity:
domain = Interval(0, period, False, True)
if rv is None:
n, d = e.as_numer_denom()
try:
if gen not in n.free_symbols and len(e.free_symbols) > 1:
raise ValueError
# this might raise ValueError on its own
# or it might give None...
solns = solvify(e, gen, domain)
if solns is None:
# in which case we raise ValueError
raise ValueError
except (ValueError, NotImplementedError):
# replace gen with generic x since it's
# univariate anyway
raise NotImplementedError(filldedent('''
The inequality, %s, cannot be solved using
solve_univariate_inequality.
''' % expr.subs(gen, Symbol('x'))))
expanded_e = expand_mul(e)
def valid(x):
# this is used to see if gen=x satisfies the
# relational by substituting it into the
# expanded form and testing against 0, e.g.
# if expr = x*(x + 1) < 2 then e = x*(x + 1) - 2
# and expanded_e = x**2 + x - 2; the test is
# whether a given value of x satisfies
# x**2 + x - 2 < 0
#
# expanded_e, expr and gen used from enclosing scope
v = expanded_e.subs(gen, expand_mul(x))
try:
r = expr.func(v, 0)
except TypeError:
r = S.false
if r in (S.true, S.false):
return r
if v.is_extended_real is False:
return S.false
else:
v = v.n(2)
if v.is_comparable:
return expr.func(v, 0)
# not comparable or couldn't be evaluated
raise NotImplementedError(
'relationship did not evaluate: %s' % r)
singularities = []
for d in denoms(expr, gen):
singularities.extend(solvify(d, gen, domain))
if not continuous:
domain = continuous_domain(expanded_e, gen, domain)
include_x = '=' in expr.rel_op and expr.rel_op != '!='
try:
discontinuities = set(domain.boundary -
FiniteSet(domain.inf, domain.sup))
# remove points that are not between inf and sup of domain
critical_points = FiniteSet(*(solns + singularities + list(
discontinuities))).intersection(
Interval(domain.inf, domain.sup,
domain.inf not in domain, domain.sup not in domain))
if all(r.is_number for r in critical_points):
reals = _nsort(critical_points, separated=True)[0]
else:
sifted = sift(critical_points, lambda x: x.is_extended_real)
if sifted[None]:
# there were some roots that weren't known
# to be real
raise NotImplementedError
try:
reals = sifted[True]
if len(reals) > 1:
reals = list(sorted(reals))
except TypeError:
raise NotImplementedError
except NotImplementedError:
raise NotImplementedError('sorting of these roots is not supported')
# If expr contains imaginary coefficients, only take real
# values of x for which the imaginary part is 0
make_real = S.Reals
if im(expanded_e) != S.Zero:
check = True
im_sol = FiniteSet()
try:
a = solveset(im(expanded_e), gen, domain)
if not isinstance(a, Interval):
for z in a:
if z not in singularities and valid(z) and z.is_extended_real:
im_sol += FiniteSet(z)
else:
start, end = a.inf, a.sup
for z in _nsort(critical_points + FiniteSet(end)):
valid_start = valid(start)
if start != end:
valid_z = valid(z)
pt = _pt(start, z)
if pt not in singularities and pt.is_extended_real and valid(pt):
if valid_start and valid_z:
im_sol += Interval(start, z)
elif valid_start:
im_sol += Interval.Ropen(start, z)
elif valid_z:
im_sol += Interval.Lopen(start, z)
else:
im_sol += Interval.open(start, z)
start = z
for s in singularities:
im_sol -= FiniteSet(s)
except (TypeError):
im_sol = S.Reals
check = False
if isinstance(im_sol, EmptySet):
raise ValueError(filldedent('''
%s contains imaginary parts which cannot be
made 0 for any value of %s satisfying the
inequality, leading to relations like I < 0.
''' % (expr.subs(gen, _gen), _gen)))
make_real = make_real.intersect(im_sol)
sol_sets = [S.EmptySet]
start = domain.inf
if valid(start) and start.is_finite:
sol_sets.append(FiniteSet(start))
for x in reals:
end = x
if valid(_pt(start, end)):
sol_sets.append(Interval(start, end, True, True))
if x in singularities:
singularities.remove(x)
else:
if x in discontinuities:
discontinuities.remove(x)
_valid = valid(x)
else: # it's a solution
_valid = include_x
if _valid:
sol_sets.append(FiniteSet(x))
start = end
end = domain.sup
if valid(end) and end.is_finite:
sol_sets.append(FiniteSet(end))
if valid(_pt(start, end)):
sol_sets.append(Interval.open(start, end))
if im(expanded_e) != S.Zero and check:
rv = (make_real).intersect(_domain)
else:
rv = Intersection(
(Union(*sol_sets)), make_real, _domain).subs(gen, _gen)
return rv if not relational else rv.as_relational(_gen)
def _pt(start, end):
"""Return a point between start and end"""
if not start.is_infinite and not end.is_infinite:
pt = (start + end)/2
elif start.is_infinite and end.is_infinite:
pt = S.Zero
else:
if (start.is_infinite and start.is_extended_positive is None or
end.is_infinite and end.is_extended_positive is None):
raise ValueError('cannot proceed with unsigned infinite values')
if (end.is_infinite and end.is_extended_negative or
start.is_infinite and start.is_extended_positive):
start, end = end, start
# if possible, use a multiple of self which has
# better behavior when checking assumptions than
# an expression obtained by adding or subtracting 1
if end.is_infinite:
if start.is_extended_positive:
pt = start*2
elif start.is_extended_negative:
pt = start*S.Half
else:
pt = start + 1
elif start.is_infinite:
if end.is_extended_positive:
pt = end*S.Half
elif end.is_extended_negative:
pt = end*2
else:
pt = end - 1
return pt
def _solve_inequality(ie, s, linear=False):
"""Return the inequality with s isolated on the left, if possible.
If the relationship is non-linear, a solution involving And or Or
may be returned. False or True are returned if the relationship
is never True or always True, respectively.
If `linear` is True (default is False) an `s`-dependent expression
will be isolated on the left, if possible
but it will not be solved for `s` unless the expression is linear
in `s`. Furthermore, only "safe" operations which don't change the
sense of the relationship are applied: no division by an unsigned
value is attempted unless the relationship involves Eq or Ne and
no division by a value not known to be nonzero is ever attempted.
Examples
========
>>> from sympy import Eq, Symbol
>>> from sympy.solvers.inequalities import _solve_inequality as f
>>> from sympy.abc import x, y
For linear expressions, the symbol can be isolated:
>>> f(x - 2 < 0, x)
x < 2
>>> f(-x - 6 < x, x)
x > -3
Sometimes nonlinear relationships will be False
>>> f(x**2 + 4 < 0, x)
False
Or they may involve more than one region of values:
>>> f(x**2 - 4 < 0, x)
(-2 < x) & (x < 2)
To restrict the solution to a relational, set linear=True
and only the x-dependent portion will be isolated on the left:
>>> f(x**2 - 4 < 0, x, linear=True)
x**2 < 4
Division of only nonzero quantities is allowed, so x cannot
be isolated by dividing by y:
>>> y.is_nonzero is None # it is unknown whether it is 0 or not
True
>>> f(x*y < 1, x)
x*y < 1
And while an equality (or inequality) still holds after dividing by a
non-zero quantity
>>> nz = Symbol('nz', nonzero=True)
>>> f(Eq(x*nz, 1), x)
Eq(x, 1/nz)
the sign must be known for other inequalities involving > or <:
>>> f(x*nz <= 1, x)
nz*x <= 1
>>> p = Symbol('p', positive=True)
>>> f(x*p <= 1, x)
x <= 1/p
When there are denominators in the original expression that
are removed by expansion, conditions for them will be returned
as part of the result:
>>> f(x < x*(2/x - 1), x)
(x < 1) & Ne(x, 0)
"""
from sympy.solvers.solvers import denoms
if s not in ie.free_symbols:
return ie
if ie.rhs == s:
ie = ie.reversed
if ie.lhs == s and s not in ie.rhs.free_symbols:
return ie
def classify(ie, s, i):
# return True or False if ie evaluates when substituting s with
# i else None (if unevaluated) or NaN (when there is an error
# in evaluating)
try:
v = ie.subs(s, i)
if v is S.NaN:
return v
elif v not in (True, False):
return
return v
except TypeError:
return S.NaN
rv = None
oo = S.Infinity
expr = ie.lhs - ie.rhs
try:
p = Poly(expr, s)
if p.degree() == 0:
rv = ie.func(p.as_expr(), 0)
elif not linear and p.degree() > 1:
# handle in except clause
raise NotImplementedError
except (PolynomialError, NotImplementedError):
if not linear:
try:
rv = reduce_rational_inequalities([[ie]], s)
except PolynomialError:
rv = solve_univariate_inequality(ie, s)
# remove restrictions wrt +/-oo that may have been
# applied when using sets to simplify the relationship
okoo = classify(ie, s, oo)
if okoo is S.true and classify(rv, s, oo) is S.false:
rv = rv.subs(s < oo, True)
oknoo = classify(ie, s, -oo)
if (oknoo is S.true and
classify(rv, s, -oo) is S.false):
rv = rv.subs(-oo < s, True)
rv = rv.subs(s > -oo, True)
if rv is S.true:
rv = (s <= oo) if okoo is S.true else (s < oo)
if oknoo is not S.true:
rv = And(-oo < s, rv)
else:
p = Poly(expr)
conds = []
if rv is None:
e = p.as_expr() # this is in expanded form
# Do a safe inversion of e, moving non-s terms
# to the rhs and dividing by a nonzero factor if
# the relational is Eq/Ne; for other relationals
# the sign must also be positive or negative
rhs = 0
b, ax = e.as_independent(s, as_Add=True)
e -= b
rhs -= b
ef = factor_terms(e)
a, e = ef.as_independent(s, as_Add=False)
if (a.is_zero != False or # don't divide by potential 0
a.is_negative ==
a.is_positive is None and # if sign is not known then
ie.rel_op not in ('!=', '==')): # reject if not Eq/Ne
e = ef
a = S.One
rhs /= a
if a.is_positive:
rv = ie.func(e, rhs)
else:
rv = ie.reversed.func(e, rhs)
# return conditions under which the value is
# valid, too.
beginning_denoms = denoms(ie.lhs) | denoms(ie.rhs)
current_denoms = denoms(rv)
for d in beginning_denoms - current_denoms:
c = _solve_inequality(Eq(d, 0), s, linear=linear)
if isinstance(c, Eq) and c.lhs == s:
if classify(rv, s, c.rhs) is S.true:
# rv is permitting this value but it shouldn't
conds.append(~c)
for i in (-oo, oo):
if (classify(rv, s, i) is S.true and
classify(ie, s, i) is not S.true):
conds.append(s < i if i is oo else i < s)
conds.append(rv)
return And(*conds)
def _reduce_inequalities(inequalities, symbols):
# helper for reduce_inequalities
poly_part, abs_part = {}, {}
other = []
for inequality in inequalities:
expr, rel = inequality.lhs, inequality.rel_op # rhs is 0
# check for gens using atoms which is more strict than free_symbols to
# guard against EX domain which won't be handled by
# reduce_rational_inequalities
gens = expr.atoms(Symbol)
if len(gens) == 1:
gen = gens.pop()
else:
common = expr.free_symbols & symbols
if len(common) == 1:
gen = common.pop()
other.append(_solve_inequality(Relational(expr, 0, rel), gen))
continue
else:
raise NotImplementedError(filldedent('''
inequality has more than one symbol of interest.
'''))
if expr.is_polynomial(gen):
poly_part.setdefault(gen, []).append((expr, rel))
else:
components = expr.find(lambda u:
u.has(gen) and (
u.is_Function or u.is_Pow and not u.exp.is_Integer))
if components and all(isinstance(i, Abs) for i in components):
abs_part.setdefault(gen, []).append((expr, rel))
else:
other.append(_solve_inequality(Relational(expr, 0, rel), gen))
poly_reduced = []
abs_reduced = []
for gen, exprs in poly_part.items():
poly_reduced.append(reduce_rational_inequalities([exprs], gen))
for gen, exprs in abs_part.items():
abs_reduced.append(reduce_abs_inequalities(exprs, gen))
return And(*(poly_reduced + abs_reduced + other))
def reduce_inequalities(inequalities, symbols=[]):
"""Reduce a system of inequalities with rational coefficients.
Examples
========
>>> from sympy import sympify as S, Symbol
>>> from sympy.abc import x, y
>>> from sympy.solvers.inequalities import reduce_inequalities
>>> reduce_inequalities(0 <= x + 3, [])
(-3 <= x) & (x < oo)
>>> reduce_inequalities(0 <= x + y*2 - 1, [x])
(x < oo) & (x >= 1 - 2*y)
"""
if not iterable(inequalities):
inequalities = [inequalities]
inequalities = [sympify(i) for i in inequalities]
gens = set().union(*[i.free_symbols for i in inequalities])
if not iterable(symbols):
symbols = [symbols]
symbols = (set(symbols) or gens) & gens
if any(i.is_extended_real is False for i in symbols):
raise TypeError(filldedent('''
inequalities cannot contain symbols that are not real.
'''))
# make vanilla symbol real
recast = {i: Dummy(i.name, extended_real=True)
for i in gens if i.is_extended_real is None}
inequalities = [i.xreplace(recast) for i in inequalities]
symbols = {i.xreplace(recast) for i in symbols}
# prefilter
keep = []
for i in inequalities:
if isinstance(i, Relational):
i = i.func(i.lhs.as_expr() - i.rhs.as_expr(), 0)
elif i not in (True, False):
i = Eq(i, 0)
if i == True:
continue
elif i == False:
return S.false
if i.lhs.is_number:
raise NotImplementedError(
"could not determine truth value of %s" % i)
keep.append(i)
inequalities = keep
del keep
# solve system
rv = _reduce_inequalities(inequalities, symbols)
# restore original symbols and return
return rv.xreplace({v: k for k, v in recast.items()})
|
ed22add94c71738ca9381841d8035ef72a629e96088c3067cd6a78a877610e32 | """
This module contain solvers for all kinds of equations:
- algebraic or transcendental, use solve()
- recurrence, use rsolve()
- differential, use dsolve()
- nonlinear (numerically), use nsolve()
(you will need a good starting point)
"""
from __future__ import print_function, division
from sympy import divisors
from sympy.core.compatibility import (iterable, is_sequence, ordered,
default_sort_key)
from sympy.core.sympify import sympify
from sympy.core import (S, Add, Symbol, Equality, Dummy, Expr, Mul,
Pow, Unequality)
from sympy.core.exprtools import factor_terms
from sympy.core.function import (expand_mul, expand_log,
Derivative, AppliedUndef, UndefinedFunction, nfloat,
Function, expand_power_exp, _mexpand, expand)
from sympy.integrals.integrals import Integral
from sympy.core.numbers import ilcm, Float, Rational
from sympy.core.relational import Relational
from sympy.core.logic import fuzzy_not, fuzzy_and
from sympy.core.power import integer_log
from sympy.logic.boolalg import And, Or, BooleanAtom
from sympy.core.basic import preorder_traversal
from sympy.functions import (log, exp, LambertW, cos, sin, tan, acos, asin, atan,
Abs, re, im, arg, sqrt, atan2)
from sympy.functions.elementary.trigonometric import (TrigonometricFunction,
HyperbolicFunction)
from sympy.simplify import (simplify, collect, powsimp, posify, # type: ignore
powdenest, nsimplify, denom, logcombine, sqrtdenest, fraction,
separatevars)
from sympy.simplify.sqrtdenest import sqrt_depth
from sympy.simplify.fu import TR1
from sympy.matrices import Matrix, zeros
from sympy.polys import roots, cancel, factor, Poly, degree
from sympy.polys.polyerrors import GeneratorsNeeded, PolynomialError
from sympy.functions.elementary.piecewise import piecewise_fold, Piecewise
from sympy.utilities.lambdify import lambdify
from sympy.utilities.misc import filldedent
from sympy.utilities.iterables import uniq, generate_bell, flatten
from sympy.utilities.decorator import conserve_mpmath_dps
from mpmath import findroot
from sympy.solvers.polysys import solve_poly_system
from sympy.solvers.inequalities import reduce_inequalities
from types import GeneratorType
from collections import defaultdict
import warnings
def recast_to_symbols(eqs, symbols):
"""
Return (e, s, d) where e and s are versions of *eqs* and
*symbols* in which any non-Symbol objects in *symbols* have
been replaced with generic Dummy symbols and d is a dictionary
that can be used to restore the original expressions.
Examples
========
>>> from sympy.solvers.solvers import recast_to_symbols
>>> from sympy import symbols, Function
>>> x, y = symbols('x y')
>>> fx = Function('f')(x)
>>> eqs, syms = [fx + 1, x, y], [fx, y]
>>> e, s, d = recast_to_symbols(eqs, syms); (e, s, d)
([_X0 + 1, x, y], [_X0, y], {_X0: f(x)})
The original equations and symbols can be restored using d:
>>> assert [i.xreplace(d) for i in eqs] == eqs
>>> assert [d.get(i, i) for i in s] == syms
"""
if not iterable(eqs) and iterable(symbols):
raise ValueError('Both eqs and symbols must be iterable')
new_symbols = list(symbols)
swap_sym = {}
for i, s in enumerate(symbols):
if not isinstance(s, Symbol) and s not in swap_sym:
swap_sym[s] = Dummy('X%d' % i)
new_symbols[i] = swap_sym[s]
new_f = []
for i in eqs:
isubs = getattr(i, 'subs', None)
if isubs is not None:
new_f.append(isubs(swap_sym))
else:
new_f.append(i)
swap_sym = {v: k for k, v in swap_sym.items()}
return new_f, new_symbols, swap_sym
def _ispow(e):
"""Return True if e is a Pow or is exp."""
return isinstance(e, Expr) and (e.is_Pow or isinstance(e, exp))
def _simple_dens(f, symbols):
# when checking if a denominator is zero, we can just check the
# base of powers with nonzero exponents since if the base is zero
# the power will be zero, too. To keep it simple and fast, we
# limit simplification to exponents that are Numbers
dens = set()
for d in denoms(f, symbols):
if d.is_Pow and d.exp.is_Number:
if d.exp.is_zero:
continue # foo**0 is never 0
d = d.base
dens.add(d)
return dens
def denoms(eq, *symbols):
"""
Return (recursively) set of all denominators that appear in *eq*
that contain any symbol in *symbols*; if *symbols* are not
provided then all denominators will be returned.
Examples
========
>>> from sympy.solvers.solvers import denoms
>>> from sympy.abc import x, y, z
>>> from sympy import sqrt
>>> denoms(x/y)
{y}
>>> denoms(x/(y*z))
{y, z}
>>> denoms(3/x + y/z)
{x, z}
>>> denoms(x/2 + y/z)
{2, z}
If *symbols* are provided then only denominators containing
those symbols will be returned:
>>> denoms(1/x + 1/y + 1/z, y, z)
{y, z}
"""
pot = preorder_traversal(eq)
dens = set()
for p in pot:
# lhs and rhs will be traversed after anyway
if isinstance(p, Relational):
continue
den = denom(p)
if den is S.One:
continue
for d in Mul.make_args(den):
dens.add(d)
if not symbols:
return dens
elif len(symbols) == 1:
if iterable(symbols[0]):
symbols = symbols[0]
rv = []
for d in dens:
free = d.free_symbols
if any(s in free for s in symbols):
rv.append(d)
return set(rv)
def checksol(f, symbol, sol=None, **flags):
"""
Checks whether sol is a solution of equation f == 0.
Explanation
===========
Input can be either a single symbol and corresponding value
or a dictionary of symbols and values. When given as a dictionary
and flag ``simplify=True``, the values in the dictionary will be
simplified. *f* can be a single equation or an iterable of equations.
A solution must satisfy all equations in *f* to be considered valid;
if a solution does not satisfy any equation, False is returned; if one or
more checks are inconclusive (and none are False) then None is returned.
Examples
========
>>> from sympy import symbols
>>> from sympy.solvers import checksol
>>> x, y = symbols('x,y')
>>> checksol(x**4 - 1, x, 1)
True
>>> checksol(x**4 - 1, x, 0)
False
>>> checksol(x**2 + y**2 - 5**2, {x: 3, y: 4})
True
To check if an expression is zero using ``checksol()``, pass it
as *f* and send an empty dictionary for *symbol*:
>>> checksol(x**2 + x - x*(x + 1), {})
True
None is returned if ``checksol()`` could not conclude.
flags:
'numerical=True (default)'
do a fast numerical check if ``f`` has only one symbol.
'minimal=True (default is False)'
a very fast, minimal testing.
'warn=True (default is False)'
show a warning if checksol() could not conclude.
'simplify=True (default)'
simplify solution before substituting into function and
simplify the function before trying specific simplifications
'force=True (default is False)'
make positive all symbols without assumptions regarding sign.
"""
from sympy.physics.units import Unit
minimal = flags.get('minimal', False)
if sol is not None:
sol = {symbol: sol}
elif isinstance(symbol, dict):
sol = symbol
else:
msg = 'Expecting (sym, val) or ({sym: val}, None) but got (%s, %s)'
raise ValueError(msg % (symbol, sol))
if iterable(f):
if not f:
raise ValueError('no functions to check')
rv = True
for fi in f:
check = checksol(fi, sol, **flags)
if check:
continue
if check is False:
return False
rv = None # don't return, wait to see if there's a False
return rv
if isinstance(f, Poly):
f = f.as_expr()
elif isinstance(f, (Equality, Unequality)):
if f.rhs in (S.true, S.false):
f = f.reversed
B, E = f.args
if B in (S.true, S.false):
f = f.subs(sol)
if f not in (S.true, S.false):
return
else:
f = f.rewrite(Add, evaluate=False)
if isinstance(f, BooleanAtom):
return bool(f)
elif not f.is_Relational and not f:
return True
if sol and not f.free_symbols & set(sol.keys()):
# if f(y) == 0, x=3 does not set f(y) to zero...nor does it not
return None
illegal = set([S.NaN,
S.ComplexInfinity,
S.Infinity,
S.NegativeInfinity])
if any(sympify(v).atoms() & illegal for k, v in sol.items()):
return False
was = f
attempt = -1
numerical = flags.get('numerical', True)
while 1:
attempt += 1
if attempt == 0:
val = f.subs(sol)
if isinstance(val, Mul):
val = val.as_independent(Unit)[0]
if val.atoms() & illegal:
return False
elif attempt == 1:
if not val.is_number:
if not val.is_constant(*list(sol.keys()), simplify=not minimal):
return False
# there are free symbols -- simple expansion might work
_, val = val.as_content_primitive()
val = _mexpand(val.as_numer_denom()[0], recursive=True)
elif attempt == 2:
if minimal:
return
if flags.get('simplify', True):
for k in sol:
sol[k] = simplify(sol[k])
# start over without the failed expanded form, possibly
# with a simplified solution
val = simplify(f.subs(sol))
if flags.get('force', True):
val, reps = posify(val)
# expansion may work now, so try again and check
exval = _mexpand(val, recursive=True)
if exval.is_number:
# we can decide now
val = exval
else:
# if there are no radicals and no functions then this can't be
# zero anymore -- can it?
pot = preorder_traversal(expand_mul(val))
seen = set()
saw_pow_func = False
for p in pot:
if p in seen:
continue
seen.add(p)
if p.is_Pow and not p.exp.is_Integer:
saw_pow_func = True
elif p.is_Function:
saw_pow_func = True
elif isinstance(p, UndefinedFunction):
saw_pow_func = True
if saw_pow_func:
break
if saw_pow_func is False:
return False
if flags.get('force', True):
# don't do a zero check with the positive assumptions in place
val = val.subs(reps)
nz = fuzzy_not(val.is_zero)
if nz is not None:
# issue 5673: nz may be True even when False
# so these are just hacks to keep a false positive
# from being returned
# HACK 1: LambertW (issue 5673)
if val.is_number and val.has(LambertW):
# don't eval this to verify solution since if we got here,
# numerical must be False
return None
# add other HACKs here if necessary, otherwise we assume
# the nz value is correct
return not nz
break
if val == was:
continue
elif val.is_Rational:
return val == 0
if numerical and val.is_number:
if val in (S.true, S.false):
return bool(val)
return (abs(val.n(18).n(12, chop=True)) < 1e-9) is S.true
was = val
if flags.get('warn', False):
warnings.warn("\n\tWarning: could not verify solution %s." % sol)
# returns None if it can't conclude
# TODO: improve solution testing
def failing_assumptions(expr, **assumptions):
"""
Return a dictionary containing assumptions with values not
matching those of the passed assumptions.
Examples
========
>>> from sympy import failing_assumptions, Symbol
>>> x = Symbol('x', real=True, positive=True)
>>> y = Symbol('y')
>>> failing_assumptions(6*x + y, real=True, positive=True)
{'positive': None, 'real': None}
>>> failing_assumptions(x**2 - 1, positive=True)
{'positive': None}
If *expr* satisfies all of the assumptions, an empty dictionary is returned.
>>> failing_assumptions(x**2, positive=True)
{}
"""
expr = sympify(expr)
failed = {}
for key in list(assumptions.keys()):
test = getattr(expr, 'is_%s' % key, None)
if test is not assumptions[key]:
failed[key] = test
return failed # {} or {assumption: value != desired}
def check_assumptions(expr, against=None, **assumptions):
"""
Checks whether expression *expr* satisfies all assumptions.
Explanation
===========
*assumptions* is a dict of assumptions: {'assumption': True|False, ...}.
Examples
========
>>> from sympy import Symbol, pi, I, exp, check_assumptions
>>> check_assumptions(-5, integer=True)
True
>>> check_assumptions(pi, real=True, integer=False)
True
>>> check_assumptions(pi, real=True, negative=True)
False
>>> check_assumptions(exp(I*pi/7), real=False)
True
>>> x = Symbol('x', real=True, positive=True)
>>> check_assumptions(2*x + 1, real=True, positive=True)
True
>>> check_assumptions(-2*x - 5, real=True, positive=True)
False
To check assumptions of *expr* against another variable or expression,
pass the expression or variable as ``against``.
>>> check_assumptions(2*x + 1, x)
True
``None`` is returned if ``check_assumptions()`` could not conclude.
>>> check_assumptions(2*x - 1, real=True, positive=True)
>>> z = Symbol('z')
>>> check_assumptions(z, real=True)
See Also
========
failing_assumptions
"""
expr = sympify(expr)
if against:
if not isinstance(against, Symbol):
raise TypeError('against should be of type Symbol')
if assumptions:
raise AssertionError('No assumptions should be specified')
assumptions = against.assumptions0
def _test(key):
v = getattr(expr, 'is_' + key, None)
if v is not None:
return assumptions[key] is v
return fuzzy_and(_test(key) for key in assumptions)
def solve(f, *symbols, **flags):
r"""
Algebraically solves equations and systems of equations.
Explanation
===========
Currently supported:
- polynomial
- transcendental
- piecewise combinations of the above
- systems of linear and polynomial equations
- systems containing relational expressions
Examples
========
The output varies according to the input and can be seen by example:
>>> from sympy import solve, Poly, Eq, Function, exp
>>> from sympy.abc import x, y, z, a, b
>>> f = Function('f')
Boolean or univariate Relational:
>>> solve(x < 3)
(-oo < x) & (x < 3)
To always get a list of solution mappings, use flag dict=True:
>>> solve(x - 3, dict=True)
[{x: 3}]
>>> sol = solve([x - 3, y - 1], dict=True)
>>> sol
[{x: 3, y: 1}]
>>> sol[0][x]
3
>>> sol[0][y]
1
To get a list of *symbols* and set of solution(s) use flag set=True:
>>> solve([x**2 - 3, y - 1], set=True)
([x, y], {(-sqrt(3), 1), (sqrt(3), 1)})
Single expression and single symbol that is in the expression:
>>> solve(x - y, x)
[y]
>>> solve(x - 3, x)
[3]
>>> solve(Eq(x, 3), x)
[3]
>>> solve(Poly(x - 3), x)
[3]
>>> solve(x**2 - y**2, x, set=True)
([x], {(-y,), (y,)})
>>> solve(x**4 - 1, x, set=True)
([x], {(-1,), (1,), (-I,), (I,)})
Single expression with no symbol that is in the expression:
>>> solve(3, x)
[]
>>> solve(x - 3, y)
[]
Single expression with no symbol given. In this case, all free *symbols*
will be selected as potential *symbols* to solve for. If the equation is
univariate then a list of solutions is returned; otherwise - as is the case
when *symbols* are given as an iterable of length greater than 1 - a list of
mappings will be returned:
>>> solve(x - 3)
[3]
>>> solve(x**2 - y**2)
[{x: -y}, {x: y}]
>>> solve(z**2*x**2 - z**2*y**2)
[{x: -y}, {x: y}, {z: 0}]
>>> solve(z**2*x - z**2*y**2)
[{x: y**2}, {z: 0}]
When an object other than a Symbol is given as a symbol, it is
isolated algebraically and an implicit solution may be obtained.
This is mostly provided as a convenience to save you from replacing
the object with a Symbol and solving for that Symbol. It will only
work if the specified object can be replaced with a Symbol using the
subs method:
>>> solve(f(x) - x, f(x))
[x]
>>> solve(f(x).diff(x) - f(x) - x, f(x).diff(x))
[x + f(x)]
>>> solve(f(x).diff(x) - f(x) - x, f(x))
[-x + Derivative(f(x), x)]
>>> solve(x + exp(x)**2, exp(x), set=True)
([exp(x)], {(-sqrt(-x),), (sqrt(-x),)})
>>> from sympy import Indexed, IndexedBase, Tuple, sqrt
>>> A = IndexedBase('A')
>>> eqs = Tuple(A[1] + A[2] - 3, A[1] - A[2] + 1)
>>> solve(eqs, eqs.atoms(Indexed))
{A[1]: 1, A[2]: 2}
* To solve for a symbol implicitly, use implicit=True:
>>> solve(x + exp(x), x)
[-LambertW(1)]
>>> solve(x + exp(x), x, implicit=True)
[-exp(x)]
* It is possible to solve for anything that can be targeted with
subs:
>>> solve(x + 2 + sqrt(3), x + 2)
[-sqrt(3)]
>>> solve((x + 2 + sqrt(3), x + 4 + y), y, x + 2)
{y: -2 + sqrt(3), x + 2: -sqrt(3)}
* Nothing heroic is done in this implicit solving so you may end up
with a symbol still in the solution:
>>> eqs = (x*y + 3*y + sqrt(3), x + 4 + y)
>>> solve(eqs, y, x + 2)
{y: -sqrt(3)/(x + 3), x + 2: (-2*x - 6 + sqrt(3))/(x + 3)}
>>> solve(eqs, y*x, x)
{x: -y - 4, x*y: -3*y - sqrt(3)}
* If you attempt to solve for a number remember that the number
you have obtained does not necessarily mean that the value is
equivalent to the expression obtained:
>>> solve(sqrt(2) - 1, 1)
[sqrt(2)]
>>> solve(x - y + 1, 1) # /!\ -1 is targeted, too
[x/(y - 1)]
>>> [_.subs(z, -1) for _ in solve((x - y + 1).subs(-1, z), 1)]
[-x + y]
* To solve for a function within a derivative, use ``dsolve``.
Single expression and more than one symbol:
* When there is a linear solution:
>>> solve(x - y**2, x, y)
[(y**2, y)]
>>> solve(x**2 - y, x, y)
[(x, x**2)]
>>> solve(x**2 - y, x, y, dict=True)
[{y: x**2}]
* When undetermined coefficients are identified:
* That are linear:
>>> solve((a + b)*x - b + 2, a, b)
{a: -2, b: 2}
* That are nonlinear:
>>> solve((a + b)*x - b**2 + 2, a, b, set=True)
([a, b], {(-sqrt(2), sqrt(2)), (sqrt(2), -sqrt(2))})
* If there is no linear solution, then the first successful
attempt for a nonlinear solution will be returned:
>>> solve(x**2 - y**2, x, y, dict=True)
[{x: -y}, {x: y}]
>>> solve(x**2 - y**2/exp(x), x, y, dict=True)
[{x: 2*LambertW(-y/2)}, {x: 2*LambertW(y/2)}]
>>> solve(x**2 - y**2/exp(x), y, x)
[(-x*sqrt(exp(x)), x), (x*sqrt(exp(x)), x)]
Iterable of one or more of the above:
* Involving relationals or bools:
>>> solve([x < 3, x - 2])
Eq(x, 2)
>>> solve([x > 3, x - 2])
False
* When the system is linear:
* With a solution:
>>> solve([x - 3], x)
{x: 3}
>>> solve((x + 5*y - 2, -3*x + 6*y - 15), x, y)
{x: -3, y: 1}
>>> solve((x + 5*y - 2, -3*x + 6*y - 15), x, y, z)
{x: -3, y: 1}
>>> solve((x + 5*y - 2, -3*x + 6*y - z), z, x, y)
{x: 2 - 5*y, z: 21*y - 6}
* Without a solution:
>>> solve([x + 3, x - 3])
[]
* When the system is not linear:
>>> solve([x**2 + y -2, y**2 - 4], x, y, set=True)
([x, y], {(-2, -2), (0, 2), (2, -2)})
* If no *symbols* are given, all free *symbols* will be selected and a
list of mappings returned:
>>> solve([x - 2, x**2 + y])
[{x: 2, y: -4}]
>>> solve([x - 2, x**2 + f(x)], {f(x), x})
[{x: 2, f(x): -4}]
* If any equation does not depend on the symbol(s) given, it will be
eliminated from the equation set and an answer may be given
implicitly in terms of variables that were not of interest:
>>> solve([x - y, y - 3], x)
{x: y}
**Additional Examples**
``solve()`` with check=True (default) will run through the symbol tags to
elimate unwanted solutions. If no assumptions are included, all possible
solutions will be returned:
>>> from sympy import Symbol, solve
>>> x = Symbol("x")
>>> solve(x**2 - 1)
[-1, 1]
By using the positive tag, only one solution will be returned:
>>> pos = Symbol("pos", positive=True)
>>> solve(pos**2 - 1)
[1]
Assumptions are not checked when ``solve()`` input involves
relationals or bools.
When the solutions are checked, those that make any denominator zero
are automatically excluded. If you do not want to exclude such solutions,
then use the check=False option:
>>> from sympy import sin, limit
>>> solve(sin(x)/x) # 0 is excluded
[pi]
If check=False, then a solution to the numerator being zero is found: x = 0.
In this case, this is a spurious solution since $\sin(x)/x$ has the well
known limit (without dicontinuity) of 1 at x = 0:
>>> solve(sin(x)/x, check=False)
[0, pi]
In the following case, however, the limit exists and is equal to the
value of x = 0 that is excluded when check=True:
>>> eq = x**2*(1/x - z**2/x)
>>> solve(eq, x)
[]
>>> solve(eq, x, check=False)
[0]
>>> limit(eq, x, 0, '-')
0
>>> limit(eq, x, 0, '+')
0
**Disabling High-Order Explicit Solutions**
When solving polynomial expressions, you might not want explicit solutions
(which can be quite long). If the expression is univariate, ``CRootOf``
instances will be returned instead:
>>> solve(x**3 - x + 1)
[-1/((-1/2 - sqrt(3)*I/2)*(3*sqrt(69)/2 + 27/2)**(1/3)) - (-1/2 -
sqrt(3)*I/2)*(3*sqrt(69)/2 + 27/2)**(1/3)/3, -(-1/2 +
sqrt(3)*I/2)*(3*sqrt(69)/2 + 27/2)**(1/3)/3 - 1/((-1/2 +
sqrt(3)*I/2)*(3*sqrt(69)/2 + 27/2)**(1/3)), -(3*sqrt(69)/2 +
27/2)**(1/3)/3 - 1/(3*sqrt(69)/2 + 27/2)**(1/3)]
>>> solve(x**3 - x + 1, cubics=False)
[CRootOf(x**3 - x + 1, 0),
CRootOf(x**3 - x + 1, 1),
CRootOf(x**3 - x + 1, 2)]
If the expression is multivariate, no solution might be returned:
>>> solve(x**3 - x + a, x, cubics=False)
[]
Sometimes solutions will be obtained even when a flag is False because the
expression could be factored. In the following example, the equation can
be factored as the product of a linear and a quadratic factor so explicit
solutions (which did not require solving a cubic expression) are obtained:
>>> eq = x**3 + 3*x**2 + x - 1
>>> solve(eq, cubics=False)
[-1, -1 + sqrt(2), -sqrt(2) - 1]
**Solving Equations Involving Radicals**
Because of SymPy's use of the principle root, some solutions
to radical equations will be missed unless check=False:
>>> from sympy import root
>>> eq = root(x**3 - 3*x**2, 3) + 1 - x
>>> solve(eq)
[]
>>> solve(eq, check=False)
[1/3]
In the above example, there is only a single solution to the
equation. Other expressions will yield spurious roots which
must be checked manually; roots which give a negative argument
to odd-powered radicals will also need special checking:
>>> from sympy import real_root, S
>>> eq = root(x, 3) - root(x, 5) + S(1)/7
>>> solve(eq) # this gives 2 solutions but misses a 3rd
[CRootOf(7*_p**5 - 7*_p**3 + 1, 1)**15,
CRootOf(7*_p**5 - 7*_p**3 + 1, 2)**15]
>>> sol = solve(eq, check=False)
>>> [abs(eq.subs(x,i).n(2)) for i in sol]
[0.48, 0.e-110, 0.e-110, 0.052, 0.052]
The first solution is negative so ``real_root`` must be used to see that it
satisfies the expression:
>>> abs(real_root(eq.subs(x, sol[0])).n(2))
0.e-110
If the roots of the equation are not real then more care will be
necessary to find the roots, especially for higher order equations.
Consider the following expression:
>>> expr = root(x, 3) - root(x, 5)
We will construct a known value for this expression at x = 3 by selecting
the 1-th root for each radical:
>>> expr1 = root(x, 3, 1) - root(x, 5, 1)
>>> v = expr1.subs(x, -3)
The ``solve`` function is unable to find any exact roots to this equation:
>>> eq = Eq(expr, v); eq1 = Eq(expr1, v)
>>> solve(eq, check=False), solve(eq1, check=False)
([], [])
The function ``unrad``, however, can be used to get a form of the equation
for which numerical roots can be found:
>>> from sympy.solvers.solvers import unrad
>>> from sympy import nroots
>>> e, (p, cov) = unrad(eq)
>>> pvals = nroots(e)
>>> inversion = solve(cov, x)[0]
>>> xvals = [inversion.subs(p, i) for i in pvals]
Although ``eq`` or ``eq1`` could have been used to find ``xvals``, the
solution can only be verified with ``expr1``:
>>> z = expr - v
>>> [xi.n(chop=1e-9) for xi in xvals if abs(z.subs(x, xi).n()) < 1e-9]
[]
>>> z1 = expr1 - v
>>> [xi.n(chop=1e-9) for xi in xvals if abs(z1.subs(x, xi).n()) < 1e-9]
[-3.0]
Parameters
==========
f :
- a single Expr or Poly that must be zero
- an Equality
- a Relational expression
- a Boolean
- iterable of one or more of the above
symbols : (object(s) to solve for) specified as
- none given (other non-numeric objects will be used)
- single symbol
- denested list of symbols
(e.g., ``solve(f, x, y)``)
- ordered iterable of symbols
(e.g., ``solve(f, [x, y])``)
flags :
dict=True (default is False)
Return list (perhaps empty) of solution mappings.
set=True (default is False)
Return list of symbols and set of tuple(s) of solution(s).
exclude=[] (default)
Do not try to solve for any of the free symbols in exclude;
if expressions are given, the free symbols in them will
be extracted automatically.
check=True (default)
If False, do not do any testing of solutions. This can be
useful if you want to include solutions that make any
denominator zero.
numerical=True (default)
Do a fast numerical check if *f* has only one symbol.
minimal=True (default is False)
A very fast, minimal testing.
warn=True (default is False)
Show a warning if ``checksol()`` could not conclude.
simplify=True (default)
Simplify all but polynomials of order 3 or greater before
returning them and (if check is not False) use the
general simplify function on the solutions and the
expression obtained when they are substituted into the
function which should be zero.
force=True (default is False)
Make positive all symbols without assumptions regarding sign.
rational=True (default)
Recast Floats as Rational; if this option is not used, the
system containing Floats may fail to solve because of issues
with polys. If rational=None, Floats will be recast as
rationals but the answer will be recast as Floats. If the
flag is False then nothing will be done to the Floats.
manual=True (default is False)
Do not use the polys/matrix method to solve a system of
equations, solve them one at a time as you might "manually."
implicit=True (default is False)
Allows ``solve`` to return a solution for a pattern in terms of
other functions that contain that pattern; this is only
needed if the pattern is inside of some invertible function
like cos, exp, ect.
particular=True (default is False)
Instructs ``solve`` to try to find a particular solution to a linear
system with as many zeros as possible; this is very expensive.
quick=True (default is False)
When using particular=True, use a fast heuristic to find a
solution with many zeros (instead of using the very slow method
guaranteed to find the largest number of zeros possible).
cubics=True (default)
Return explicit solutions when cubic expressions are encountered.
quartics=True (default)
Return explicit solutions when quartic expressions are encountered.
quintics=True (default)
Return explicit solutions (if possible) when quintic expressions
are encountered.
See Also
========
rsolve: For solving recurrence relationships
dsolve: For solving differential equations
"""
# keeping track of how f was passed since if it is a list
# a dictionary of results will be returned.
###########################################################################
def _sympified_list(w):
return list(map(sympify, w if iterable(w) else [w]))
bare_f = not iterable(f)
ordered_symbols = (symbols and
symbols[0] and
(isinstance(symbols[0], Symbol) or
is_sequence(symbols[0],
include=GeneratorType)
)
)
f, symbols = (_sympified_list(w) for w in [f, symbols])
if isinstance(f, list):
f = [s for s in f if s is not S.true and s is not True]
implicit = flags.get('implicit', False)
# preprocess symbol(s)
###########################################################################
if not symbols:
# get symbols from equations
symbols = set().union(*[fi.free_symbols for fi in f])
if len(symbols) < len(f):
for fi in f:
pot = preorder_traversal(fi)
for p in pot:
if isinstance(p, AppliedUndef):
flags['dict'] = True # better show symbols
symbols.add(p)
pot.skip() # don't go any deeper
symbols = list(symbols)
ordered_symbols = False
elif len(symbols) == 1 and iterable(symbols[0]):
symbols = symbols[0]
# remove symbols the user is not interested in
exclude = flags.pop('exclude', set())
if exclude:
if isinstance(exclude, Expr):
exclude = [exclude]
exclude = set().union(*[e.free_symbols for e in sympify(exclude)])
symbols = [s for s in symbols if s not in exclude]
# preprocess equation(s)
###########################################################################
for i, fi in enumerate(f):
if isinstance(fi, (Equality, Unequality)):
if 'ImmutableDenseMatrix' in [type(a).__name__ for a in fi.args]:
fi = fi.lhs - fi.rhs
else:
args = fi.args
if args[1] in (S.true, S.false):
args = args[1], args[0]
L, R = args
if L in (S.false, S.true):
if isinstance(fi, Unequality):
L = ~L
if R.is_Relational:
fi = ~R if L is S.false else R
elif R.is_Symbol:
return L
elif R.is_Boolean and (~R).is_Symbol:
return ~L
else:
raise NotImplementedError(filldedent('''
Unanticipated argument of Eq when other arg
is True or False.
'''))
else:
fi = fi.rewrite(Add, evaluate=False)
f[i] = fi
if fi.is_Relational:
return reduce_inequalities(f, symbols=symbols)
if isinstance(fi, Poly):
f[i] = fi.as_expr()
# rewrite hyperbolics in terms of exp
f[i] = f[i].replace(lambda w: isinstance(w, HyperbolicFunction),
lambda w: w.rewrite(exp))
# if we have a Matrix, we need to iterate over its elements again
if f[i].is_Matrix:
bare_f = False
f.extend(list(f[i]))
f[i] = S.Zero
# if we can split it into real and imaginary parts then do so
freei = f[i].free_symbols
if freei and all(s.is_extended_real or s.is_imaginary for s in freei):
fr, fi = f[i].as_real_imag()
# accept as long as new re, im, arg or atan2 are not introduced
had = f[i].atoms(re, im, arg, atan2)
if fr and fi and fr != fi and not any(
i.atoms(re, im, arg, atan2) - had for i in (fr, fi)):
if bare_f:
bare_f = False
f[i: i + 1] = [fr, fi]
# real/imag handling -----------------------------
if any(isinstance(fi, (bool, BooleanAtom)) for fi in f):
if flags.get('set', False):
return [], set()
return []
for i, fi in enumerate(f):
# Abs
while True:
was = fi
fi = fi.replace(Abs, lambda arg:
separatevars(Abs(arg)).rewrite(Piecewise) if arg.has(*symbols)
else Abs(arg))
if was == fi:
break
for e in fi.find(Abs):
if e.has(*symbols):
raise NotImplementedError('solving %s when the argument '
'is not real or imaginary.' % e)
# arg
_arg = [a for a in fi.atoms(arg) if a.has(*symbols)]
fi = fi.xreplace(dict(list(zip(_arg,
[atan(im(a.args[0])/re(a.args[0])) for a in _arg]))))
# save changes
f[i] = fi
# see if re(s) or im(s) appear
irf = []
for s in symbols:
if s.is_extended_real or s.is_imaginary:
continue # neither re(x) nor im(x) will appear
# if re(s) or im(s) appear, the auxiliary equation must be present
if any(fi.has(re(s), im(s)) for fi in f):
irf.append((s, re(s) + S.ImaginaryUnit*im(s)))
if irf:
for s, rhs in irf:
for i, fi in enumerate(f):
f[i] = fi.xreplace({s: rhs})
f.append(s - rhs)
symbols.extend([re(s), im(s)])
if bare_f:
bare_f = False
flags['dict'] = True
# end of real/imag handling -----------------------------
symbols = list(uniq(symbols))
if not ordered_symbols:
# we do this to make the results returned canonical in case f
# contains a system of nonlinear equations; all other cases should
# be unambiguous
symbols = sorted(symbols, key=default_sort_key)
# we can solve for non-symbol entities by replacing them with Dummy symbols
f, symbols, swap_sym = recast_to_symbols(f, symbols)
# this is needed in the next two events
symset = set(symbols)
# get rid of equations that have no symbols of interest; we don't
# try to solve them because the user didn't ask and they might be
# hard to solve; this means that solutions may be given in terms
# of the eliminated equations e.g. solve((x-y, y-3), x) -> {x: y}
newf = []
for fi in f:
# let the solver handle equations that..
# - have no symbols but are expressions
# - have symbols of interest
# - have no symbols of interest but are constant
# but when an expression is not constant and has no symbols of
# interest, it can't change what we obtain for a solution from
# the remaining equations so we don't include it; and if it's
# zero it can be removed and if it's not zero, there is no
# solution for the equation set as a whole
#
# The reason for doing this filtering is to allow an answer
# to be obtained to queries like solve((x - y, y), x); without
# this mod the return value is []
ok = False
if fi.has(*symset):
ok = True
else:
if fi.is_number:
if fi.is_Number:
if fi.is_zero:
continue
return []
ok = True
else:
if fi.is_constant():
ok = True
if ok:
newf.append(fi)
if not newf:
return []
f = newf
del newf
# mask off any Object that we aren't going to invert: Derivative,
# Integral, etc... so that solving for anything that they contain will
# give an implicit solution
seen = set()
non_inverts = set()
for fi in f:
pot = preorder_traversal(fi)
for p in pot:
if not isinstance(p, Expr) or isinstance(p, Piecewise):
pass
elif (isinstance(p, bool) or
not p.args or
p in symset or
p.is_Add or p.is_Mul or
p.is_Pow and not implicit or
p.is_Function and not implicit) and p.func not in (re, im):
continue
elif not p in seen:
seen.add(p)
if p.free_symbols & symset:
non_inverts.add(p)
else:
continue
pot.skip()
del seen
non_inverts = dict(list(zip(non_inverts, [Dummy() for _ in non_inverts])))
f = [fi.subs(non_inverts) for fi in f]
# Both xreplace and subs are needed below: xreplace to force substitution
# inside Derivative, subs to handle non-straightforward substitutions
non_inverts = [(v, k.xreplace(swap_sym).subs(swap_sym)) for k, v in non_inverts.items()]
# rationalize Floats
floats = False
if flags.get('rational', True) is not False:
for i, fi in enumerate(f):
if fi.has(Float):
floats = True
f[i] = nsimplify(fi, rational=True)
# capture any denominators before rewriting since
# they may disappear after the rewrite, e.g. issue 14779
flags['_denominators'] = _simple_dens(f[0], symbols)
# Any embedded piecewise functions need to be brought out to the
# top level so that the appropriate strategy gets selected.
# However, this is necessary only if one of the piecewise
# functions depends on one of the symbols we are solving for.
def _has_piecewise(e):
if e.is_Piecewise:
return e.has(*symbols)
return any([_has_piecewise(a) for a in e.args])
for i, fi in enumerate(f):
if _has_piecewise(fi):
f[i] = piecewise_fold(fi)
#
# try to get a solution
###########################################################################
if bare_f:
solution = _solve(f[0], *symbols, **flags)
else:
solution = _solve_system(f, symbols, **flags)
#
# postprocessing
###########################################################################
# Restore masked-off objects
if non_inverts:
def _do_dict(solution):
return {k: v.subs(non_inverts) for k, v in
solution.items()}
for i in range(1):
if isinstance(solution, dict):
solution = _do_dict(solution)
break
elif solution and isinstance(solution, list):
if isinstance(solution[0], dict):
solution = [_do_dict(s) for s in solution]
break
elif isinstance(solution[0], tuple):
solution = [tuple([v.subs(non_inverts) for v in s]) for s
in solution]
break
else:
solution = [v.subs(non_inverts) for v in solution]
break
elif not solution:
break
else:
raise NotImplementedError(filldedent('''
no handling of %s was implemented''' % solution))
# Restore original "symbols" if a dictionary is returned.
# This is not necessary for
# - the single univariate equation case
# since the symbol will have been removed from the solution;
# - the nonlinear poly_system since that only supports zero-dimensional
# systems and those results come back as a list
#
# ** unless there were Derivatives with the symbols, but those were handled
# above.
if swap_sym:
symbols = [swap_sym.get(k, k) for k in symbols]
if isinstance(solution, dict):
solution = {swap_sym.get(k, k): v.subs(swap_sym)
for k, v in solution.items()}
elif solution and isinstance(solution, list) and isinstance(solution[0], dict):
for i, sol in enumerate(solution):
solution[i] = {swap_sym.get(k, k): v.subs(swap_sym)
for k, v in sol.items()}
# undo the dictionary solutions returned when the system was only partially
# solved with poly-system if all symbols are present
if (
not flags.get('dict', False) and
solution and
ordered_symbols and
not isinstance(solution, dict) and
all(isinstance(sol, dict) for sol in solution)
):
solution = [tuple([r.get(s, s).subs(r) for s in symbols])
for r in solution]
# Get assumptions about symbols, to filter solutions.
# Note that if assumptions about a solution can't be verified, it is still
# returned.
check = flags.get('check', True)
# restore floats
if floats and solution and flags.get('rational', None) is None:
solution = nfloat(solution, exponent=False)
if check and solution: # assumption checking
warn = flags.get('warn', False)
got_None = [] # solutions for which one or more symbols gave None
no_False = [] # solutions for which no symbols gave False
if isinstance(solution, tuple):
# this has already been checked and is in as_set form
return solution
elif isinstance(solution, list):
if isinstance(solution[0], tuple):
for sol in solution:
for symb, val in zip(symbols, sol):
test = check_assumptions(val, **symb.assumptions0)
if test is False:
break
if test is None:
got_None.append(sol)
else:
no_False.append(sol)
elif isinstance(solution[0], dict):
for sol in solution:
a_None = False
for symb, val in sol.items():
test = check_assumptions(val, **symb.assumptions0)
if test:
continue
if test is False:
break
a_None = True
else:
no_False.append(sol)
if a_None:
got_None.append(sol)
else: # list of expressions
for sol in solution:
test = check_assumptions(sol, **symbols[0].assumptions0)
if test is False:
continue
no_False.append(sol)
if test is None:
got_None.append(sol)
elif isinstance(solution, dict):
a_None = False
for symb, val in solution.items():
test = check_assumptions(val, **symb.assumptions0)
if test:
continue
if test is False:
no_False = None
break
a_None = True
else:
no_False = solution
if a_None:
got_None.append(solution)
elif isinstance(solution, (Relational, And, Or)):
if len(symbols) != 1:
raise ValueError("Length should be 1")
if warn and symbols[0].assumptions0:
warnings.warn(filldedent("""
\tWarning: assumptions about variable '%s' are
not handled currently.""" % symbols[0]))
# TODO: check also variable assumptions for inequalities
else:
raise TypeError('Unrecognized solution') # improve the checker
solution = no_False
if warn and got_None:
warnings.warn(filldedent("""
\tWarning: assumptions concerning following solution(s)
can't be checked:""" + '\n\t' +
', '.join(str(s) for s in got_None)))
#
# done
###########################################################################
as_dict = flags.get('dict', False)
as_set = flags.get('set', False)
if not as_set and isinstance(solution, list):
# Make sure that a list of solutions is ordered in a canonical way.
solution.sort(key=default_sort_key)
if not as_dict and not as_set:
return solution or []
# return a list of mappings or []
if not solution:
solution = []
else:
if isinstance(solution, dict):
solution = [solution]
elif iterable(solution[0]):
solution = [dict(list(zip(symbols, s))) for s in solution]
elif isinstance(solution[0], dict):
pass
else:
if len(symbols) != 1:
raise ValueError("Length should be 1")
solution = [{symbols[0]: s} for s in solution]
if as_dict:
return solution
assert as_set
if not solution:
return [], set()
k = list(ordered(solution[0].keys()))
return k, {tuple([s[ki] for ki in k]) for s in solution}
def _solve(f, *symbols, **flags):
"""
Return a checked solution for *f* in terms of one or more of the
symbols. A list should be returned except for the case when a linear
undetermined-coefficients equation is encountered (in which case
a dictionary is returned).
If no method is implemented to solve the equation, a NotImplementedError
will be raised. In the case that conversion of an expression to a Poly
gives None a ValueError will be raised.
"""
not_impl_msg = "No algorithms are implemented to solve equation %s"
if len(symbols) != 1:
soln = None
free = f.free_symbols
ex = free - set(symbols)
if len(ex) != 1:
ind, dep = f.as_independent(*symbols)
ex = ind.free_symbols & dep.free_symbols
if len(ex) == 1:
ex = ex.pop()
try:
# soln may come back as dict, list of dicts or tuples, or
# tuple of symbol list and set of solution tuples
soln = solve_undetermined_coeffs(f, symbols, ex, **flags)
except NotImplementedError:
pass
if soln:
if flags.get('simplify', True):
if isinstance(soln, dict):
for k in soln:
soln[k] = simplify(soln[k])
elif isinstance(soln, list):
if isinstance(soln[0], dict):
for d in soln:
for k in d:
d[k] = simplify(d[k])
elif isinstance(soln[0], tuple):
soln = [tuple(simplify(i) for i in j) for j in soln]
else:
raise TypeError('unrecognized args in list')
elif isinstance(soln, tuple):
sym, sols = soln
soln = sym, {tuple(simplify(i) for i in j) for j in sols}
else:
raise TypeError('unrecognized solution type')
return soln
# find first successful solution
failed = []
got_s = set([])
result = []
for s in symbols:
xi, v = solve_linear(f, symbols=[s])
if xi == s:
# no need to check but we should simplify if desired
if flags.get('simplify', True):
v = simplify(v)
vfree = v.free_symbols
if got_s and any([ss in vfree for ss in got_s]):
# sol depends on previously solved symbols: discard it
continue
got_s.add(xi)
result.append({xi: v})
elif xi: # there might be a non-linear solution if xi is not 0
failed.append(s)
if not failed:
return result
for s in failed:
try:
soln = _solve(f, s, **flags)
for sol in soln:
if got_s and any([ss in sol.free_symbols for ss in got_s]):
# sol depends on previously solved symbols: discard it
continue
got_s.add(s)
result.append({s: sol})
except NotImplementedError:
continue
if got_s:
return result
else:
raise NotImplementedError(not_impl_msg % f)
symbol = symbols[0]
# /!\ capture this flag then set it to False so that no checking in
# recursive calls will be done; only the final answer is checked
flags['check'] = checkdens = check = flags.pop('check', True)
# build up solutions if f is a Mul
if f.is_Mul:
result = set()
for m in f.args:
if m in set([S.NegativeInfinity, S.ComplexInfinity, S.Infinity]):
result = set()
break
soln = _solve(m, symbol, **flags)
result.update(set(soln))
result = list(result)
if check:
# all solutions have been checked but now we must
# check that the solutions do not set denominators
# in any factor to zero
dens = flags.get('_denominators', _simple_dens(f, symbols))
result = [s for s in result if
all(not checksol(den, {symbol: s}, **flags) for den in
dens)]
# set flags for quick exit at end; solutions for each
# factor were already checked and simplified
check = False
flags['simplify'] = False
elif f.is_Piecewise:
result = set()
for i, (expr, cond) in enumerate(f.args):
if expr.is_zero:
raise NotImplementedError(
'solve cannot represent interval solutions')
candidates = _solve(expr, symbol, **flags)
# the explicit condition for this expr is the current cond
# and none of the previous conditions
args = [~c for _, c in f.args[:i]] + [cond]
cond = And(*args)
for candidate in candidates:
if candidate in result:
# an unconditional value was already there
continue
try:
v = cond.subs(symbol, candidate)
_eval_simplify = getattr(v, '_eval_simplify', None)
if _eval_simplify is not None:
# unconditionally take the simpification of v
v = _eval_simplify(ratio=2, measure=lambda x: 1)
except TypeError:
# incompatible type with condition(s)
continue
if v == False:
continue
if v == True:
result.add(candidate)
else:
result.add(Piecewise(
(candidate, v),
(S.NaN, True)))
# set flags for quick exit at end; solutions for each
# piece were already checked and simplified
check = False
flags['simplify'] = False
else:
# first see if it really depends on symbol and whether there
# is only a linear solution
f_num, sol = solve_linear(f, symbols=symbols)
if f_num.is_zero or sol is S.NaN:
return []
elif f_num.is_Symbol:
# no need to check but simplify if desired
if flags.get('simplify', True):
sol = simplify(sol)
return [sol]
result = False # no solution was obtained
msg = '' # there is no failure message
# Poly is generally robust enough to convert anything to
# a polynomial and tell us the different generators that it
# contains, so we will inspect the generators identified by
# polys to figure out what to do.
# try to identify a single generator that will allow us to solve this
# as a polynomial, followed (perhaps) by a change of variables if the
# generator is not a symbol
try:
poly = Poly(f_num)
if poly is None:
raise ValueError('could not convert %s to Poly' % f_num)
except GeneratorsNeeded:
simplified_f = simplify(f_num)
if simplified_f != f_num:
return _solve(simplified_f, symbol, **flags)
raise ValueError('expression appears to be a constant')
gens = [g for g in poly.gens if g.has(symbol)]
def _as_base_q(x):
"""Return (b**e, q) for x = b**(p*e/q) where p/q is the leading
Rational of the exponent of x, e.g. exp(-2*x/3) -> (exp(x), 3)
"""
b, e = x.as_base_exp()
if e.is_Rational:
return b, e.q
if not e.is_Mul:
return x, 1
c, ee = e.as_coeff_Mul()
if c.is_Rational and c is not S.One: # c could be a Float
return b**ee, c.q
return x, 1
if len(gens) > 1:
# If there is more than one generator, it could be that the
# generators have the same base but different powers, e.g.
# >>> Poly(exp(x) + 1/exp(x))
# Poly(exp(-x) + exp(x), exp(-x), exp(x), domain='ZZ')
#
# If unrad was not disabled then there should be no rational
# exponents appearing as in
# >>> Poly(sqrt(x) + sqrt(sqrt(x)))
# Poly(sqrt(x) + x**(1/4), sqrt(x), x**(1/4), domain='ZZ')
bases, qs = list(zip(*[_as_base_q(g) for g in gens]))
bases = set(bases)
if len(bases) > 1 or not all(q == 1 for q in qs):
funcs = set(b for b in bases if b.is_Function)
trig = set([_ for _ in funcs if
isinstance(_, TrigonometricFunction)])
other = funcs - trig
if not other and len(funcs.intersection(trig)) > 1:
newf = TR1(f_num).rewrite(tan)
if newf != f_num:
# don't check the rewritten form --check
# solutions in the un-rewritten form below
flags['check'] = False
result = _solve(newf, symbol, **flags)
flags['check'] = check
# just a simple case - see if replacement of single function
# clears all symbol-dependent functions, e.g.
# log(x) - log(log(x) - 1) - 3 can be solved even though it has
# two generators.
if result is False and funcs:
funcs = list(ordered(funcs)) # put shallowest function first
f1 = funcs[0]
t = Dummy('t')
# perform the substitution
ftry = f_num.subs(f1, t)
# if no Functions left, we can proceed with usual solve
if not ftry.has(symbol):
cv_sols = _solve(ftry, t, **flags)
cv_inv = _solve(t - f1, symbol, **flags)[0]
sols = list()
for sol in cv_sols:
sols.append(cv_inv.subs(t, sol))
result = list(ordered(sols))
if result is False:
msg = 'multiple generators %s' % gens
else:
# e.g. case where gens are exp(x), exp(-x)
u = bases.pop()
t = Dummy('t')
inv = _solve(u - t, symbol, **flags)
if isinstance(u, (Pow, exp)):
# this will be resolved by factor in _tsolve but we might
# as well try a simple expansion here to get things in
# order so something like the following will work now without
# having to factor:
#
# >>> eq = (exp(I*(-x-2))+exp(I*(x+2)))
# >>> eq.subs(exp(x),y) # fails
# exp(I*(-x - 2)) + exp(I*(x + 2))
# >>> eq.expand().subs(exp(x),y) # works
# y**I*exp(2*I) + y**(-I)*exp(-2*I)
def _expand(p):
b, e = p.as_base_exp()
e = expand_mul(e)
return expand_power_exp(b**e)
ftry = f_num.replace(
lambda w: w.is_Pow or isinstance(w, exp),
_expand).subs(u, t)
if not ftry.has(symbol):
soln = _solve(ftry, t, **flags)
sols = list()
for sol in soln:
for i in inv:
sols.append(i.subs(t, sol))
result = list(ordered(sols))
elif len(gens) == 1:
# There is only one generator that we are interested in, but
# there may have been more than one generator identified by
# polys (e.g. for symbols other than the one we are interested
# in) so recast the poly in terms of our generator of interest.
# Also use composite=True with f_num since Poly won't update
# poly as documented in issue 8810.
poly = Poly(f_num, gens[0], composite=True)
# if we aren't on the tsolve-pass, use roots
if not flags.pop('tsolve', False):
soln = None
deg = poly.degree()
flags['tsolve'] = True
solvers = {k: flags.get(k, True) for k in
('cubics', 'quartics', 'quintics')}
soln = roots(poly, **solvers)
if sum(soln.values()) < deg:
# e.g. roots(32*x**5 + 400*x**4 + 2032*x**3 +
# 5000*x**2 + 6250*x + 3189) -> {}
# so all_roots is used and RootOf instances are
# returned *unless* the system is multivariate
# or high-order EX domain.
try:
soln = poly.all_roots()
except NotImplementedError:
if not flags.get('incomplete', True):
raise NotImplementedError(
filldedent('''
Neither high-order multivariate polynomials
nor sorting of EX-domain polynomials is supported.
If you want to see any results, pass keyword incomplete=True to
solve; to see numerical values of roots
for univariate expressions, use nroots.
'''))
else:
pass
else:
soln = list(soln.keys())
if soln is not None:
u = poly.gen
if u != symbol:
try:
t = Dummy('t')
iv = _solve(u - t, symbol, **flags)
soln = list(ordered({i.subs(t, s) for i in iv for s in soln}))
except NotImplementedError:
# perhaps _tsolve can handle f_num
soln = None
else:
check = False # only dens need to be checked
if soln is not None:
if len(soln) > 2:
# if the flag wasn't set then unset it since high-order
# results are quite long. Perhaps one could base this
# decision on a certain critical length of the
# roots. In addition, wester test M2 has an expression
# whose roots can be shown to be real with the
# unsimplified form of the solution whereas only one of
# the simplified forms appears to be real.
flags['simplify'] = flags.get('simplify', False)
result = soln
# fallback if above fails
# -----------------------
if result is False:
# try unrad
if flags.pop('_unrad', True):
try:
u = unrad(f_num, symbol)
except (ValueError, NotImplementedError):
u = False
if u:
eq, cov = u
if cov:
isym, ieq = cov
inv = _solve(ieq, symbol, **flags)[0]
rv = {inv.subs(isym, xi) for xi in _solve(eq, isym, **flags)}
else:
try:
rv = set(_solve(eq, symbol, **flags))
except NotImplementedError:
rv = None
if rv is not None:
result = list(ordered(rv))
# if the flag wasn't set then unset it since unrad results
# can be quite long or of very high order
flags['simplify'] = flags.get('simplify', False)
else:
pass # for coverage
# try _tsolve
if result is False:
flags.pop('tsolve', None) # allow tsolve to be used on next pass
try:
soln = _tsolve(f_num, symbol, **flags)
if soln is not None:
result = soln
except PolynomialError:
pass
# ----------- end of fallback ----------------------------
if result is False:
raise NotImplementedError('\n'.join([msg, not_impl_msg % f]))
if flags.get('simplify', True):
result = list(map(simplify, result))
# we just simplified the solution so we now set the flag to
# False so the simplification doesn't happen again in checksol()
flags['simplify'] = False
if checkdens:
# reject any result that makes any denom. affirmatively 0;
# if in doubt, keep it
dens = _simple_dens(f, symbols)
result = [s for s in result if
all(not checksol(d, {symbol: s}, **flags)
for d in dens)]
if check:
# keep only results if the check is not False
result = [r for r in result if
checksol(f_num, {symbol: r}, **flags) is not False]
return result
def _solve_system(exprs, symbols, **flags):
if not exprs:
return []
polys = []
dens = set()
failed = []
result = False
linear = False
manual = flags.get('manual', False)
checkdens = check = flags.get('check', True)
for j, g in enumerate(exprs):
dens.update(_simple_dens(g, symbols))
i, d = _invert(g, *symbols)
g = d - i
g = g.as_numer_denom()[0]
if manual:
failed.append(g)
continue
poly = g.as_poly(*symbols, extension=True)
if poly is not None:
polys.append(poly)
else:
failed.append(g)
if not polys:
solved_syms = []
else:
if all(p.is_linear for p in polys):
n, m = len(polys), len(symbols)
matrix = zeros(n, m + 1)
for i, poly in enumerate(polys):
for monom, coeff in poly.terms():
try:
j = monom.index(1)
matrix[i, j] = coeff
except ValueError:
matrix[i, m] = -coeff
# returns a dictionary ({symbols: values}) or None
if flags.pop('particular', False):
result = minsolve_linear_system(matrix, *symbols, **flags)
else:
result = solve_linear_system(matrix, *symbols, **flags)
if failed:
if result:
solved_syms = list(result.keys())
else:
solved_syms = []
else:
linear = True
else:
if len(symbols) > len(polys):
from sympy.utilities.iterables import subsets
free = set().union(*[p.free_symbols for p in polys])
free = list(ordered(free.intersection(symbols)))
got_s = set()
result = []
for syms in subsets(free, len(polys)):
try:
# returns [] or list of tuples of solutions for syms
res = solve_poly_system(polys, *syms)
if res:
for r in res:
skip = False
for r1 in r:
if got_s and any([ss in r1.free_symbols
for ss in got_s]):
# sol depends on previously
# solved symbols: discard it
skip = True
if not skip:
got_s.update(syms)
result.extend([dict(list(zip(syms, r)))])
except NotImplementedError:
pass
if got_s:
solved_syms = list(got_s)
else:
raise NotImplementedError('no valid subset found')
else:
try:
result = solve_poly_system(polys, *symbols)
if result:
solved_syms = symbols
# we don't know here if the symbols provided
# were given or not, so let solve resolve that.
# A list of dictionaries is going to always be
# returned from here.
result = [dict(list(zip(solved_syms, r))) for r in result]
except NotImplementedError:
failed.extend([g.as_expr() for g in polys])
solved_syms = []
result = None
if result:
if isinstance(result, dict):
result = [result]
else:
result = [{}]
if failed:
# For each failed equation, see if we can solve for one of the
# remaining symbols from that equation. If so, we update the
# solution set and continue with the next failed equation,
# repeating until we are done or we get an equation that can't
# be solved.
def _ok_syms(e, sort=False):
rv = (e.free_symbols - solved_syms) & legal
if sort:
rv = list(rv)
rv.sort(key=default_sort_key)
return rv
solved_syms = set(solved_syms) # set of symbols we have solved for
legal = set(symbols) # what we are interested in
# sort so equation with the fewest potential symbols is first
u = Dummy() # used in solution checking
for eq in ordered(failed, lambda _: len(_ok_syms(_))):
newresult = []
bad_results = []
got_s = set()
hit = False
for r in result:
# update eq with everything that is known so far
eq2 = eq.subs(r)
# if check is True then we see if it satisfies this
# equation, otherwise we just accept it
if check and r:
b = checksol(u, u, eq2, minimal=True)
if b is not None:
# this solution is sufficient to know whether
# it is valid or not so we either accept or
# reject it, then continue
if b:
newresult.append(r)
else:
bad_results.append(r)
continue
# search for a symbol amongst those available that
# can be solved for
ok_syms = _ok_syms(eq2, sort=True)
if not ok_syms:
if r:
newresult.append(r)
break # skip as it's independent of desired symbols
for s in ok_syms:
try:
soln = _solve(eq2, s, **flags)
except NotImplementedError:
continue
# put each solution in r and append the now-expanded
# result in the new result list; use copy since the
# solution for s in being added in-place
for sol in soln:
if got_s and any([ss in sol.free_symbols for ss in got_s]):
# sol depends on previously solved symbols: discard it
continue
rnew = r.copy()
for k, v in r.items():
rnew[k] = v.subs(s, sol)
# and add this new solution
rnew[s] = sol
newresult.append(rnew)
hit = True
got_s.add(s)
if not hit:
raise NotImplementedError('could not solve %s' % eq2)
else:
result = newresult
for b in bad_results:
if b in result:
result.remove(b)
default_simplify = bool(failed) # rely on system-solvers to simplify
if flags.get('simplify', default_simplify):
for r in result:
for k in r:
r[k] = simplify(r[k])
flags['simplify'] = False # don't need to do so in checksol now
if checkdens:
result = [r for r in result
if not any(checksol(d, r, **flags) for d in dens)]
if check and not linear:
result = [r for r in result
if not any(checksol(e, r, **flags) is False for e in exprs)]
result = [r for r in result if r]
if linear and result:
result = result[0]
return result
def solve_linear(lhs, rhs=0, symbols=[], exclude=[]):
r"""
Return a tuple derived from ``f = lhs - rhs`` that is one of
the following: ``(0, 1)``, ``(0, 0)``, ``(symbol, solution)``, ``(n, d)``.
Explanation
===========
``(0, 1)`` meaning that ``f`` is independent of the symbols in *symbols*
that are not in *exclude*.
``(0, 0)`` meaning that there is no solution to the equation amongst the
symbols given. If the first element of the tuple is not zero, then the
function is guaranteed to be dependent on a symbol in *symbols*.
``(symbol, solution)`` where symbol appears linearly in the numerator of
``f``, is in *symbols* (if given), and is not in *exclude* (if given). No
simplification is done to ``f`` other than a ``mul=True`` expansion, so the
solution will correspond strictly to a unique solution.
``(n, d)`` where ``n`` and ``d`` are the numerator and denominator of ``f``
when the numerator was not linear in any symbol of interest; ``n`` will
never be a symbol unless a solution for that symbol was found (in which case
the second element is the solution, not the denominator).
Examples
========
>>> from sympy.core.power import Pow
>>> from sympy.polys.polytools import cancel
``f`` is independent of the symbols in *symbols* that are not in
*exclude*:
>>> from sympy.solvers.solvers import solve_linear
>>> from sympy.abc import x, y, z
>>> from sympy import cos, sin
>>> eq = y*cos(x)**2 + y*sin(x)**2 - y # = y*(1 - 1) = 0
>>> solve_linear(eq)
(0, 1)
>>> eq = cos(x)**2 + sin(x)**2 # = 1
>>> solve_linear(eq)
(0, 1)
>>> solve_linear(x, exclude=[x])
(0, 1)
The variable ``x`` appears as a linear variable in each of the
following:
>>> solve_linear(x + y**2)
(x, -y**2)
>>> solve_linear(1/x - y**2)
(x, y**(-2))
When not linear in ``x`` or ``y`` then the numerator and denominator are
returned:
>>> solve_linear(x**2/y**2 - 3)
(x**2 - 3*y**2, y**2)
If the numerator of the expression is a symbol, then ``(0, 0)`` is
returned if the solution for that symbol would have set any
denominator to 0:
>>> eq = 1/(1/x - 2)
>>> eq.as_numer_denom()
(x, 1 - 2*x)
>>> solve_linear(eq)
(0, 0)
But automatic rewriting may cause a symbol in the denominator to
appear in the numerator so a solution will be returned:
>>> (1/x)**-1
x
>>> solve_linear((1/x)**-1)
(x, 0)
Use an unevaluated expression to avoid this:
>>> solve_linear(Pow(1/x, -1, evaluate=False))
(0, 0)
If ``x`` is allowed to cancel in the following expression, then it
appears to be linear in ``x``, but this sort of cancellation is not
done by ``solve_linear`` so the solution will always satisfy the
original expression without causing a division by zero error.
>>> eq = x**2*(1/x - z**2/x)
>>> solve_linear(cancel(eq))
(x, 0)
>>> solve_linear(eq)
(x**2*(1 - z**2), x)
A list of symbols for which a solution is desired may be given:
>>> solve_linear(x + y + z, symbols=[y])
(y, -x - z)
A list of symbols to ignore may also be given:
>>> solve_linear(x + y + z, exclude=[x])
(y, -x - z)
(A solution for ``y`` is obtained because it is the first variable
from the canonically sorted list of symbols that had a linear
solution.)
"""
if isinstance(lhs, Equality):
if rhs:
raise ValueError(filldedent('''
If lhs is an Equality, rhs must be 0 but was %s''' % rhs))
rhs = lhs.rhs
lhs = lhs.lhs
dens = None
eq = lhs - rhs
n, d = eq.as_numer_denom()
if not n:
return S.Zero, S.One
free = n.free_symbols
if not symbols:
symbols = free
else:
bad = [s for s in symbols if not s.is_Symbol]
if bad:
if len(bad) == 1:
bad = bad[0]
if len(symbols) == 1:
eg = 'solve(%s, %s)' % (eq, symbols[0])
else:
eg = 'solve(%s, *%s)' % (eq, list(symbols))
raise ValueError(filldedent('''
solve_linear only handles symbols, not %s. To isolate
non-symbols use solve, e.g. >>> %s <<<.
''' % (bad, eg)))
symbols = free.intersection(symbols)
symbols = symbols.difference(exclude)
if not symbols:
return S.Zero, S.One
# derivatives are easy to do but tricky to analyze to see if they
# are going to disallow a linear solution, so for simplicity we
# just evaluate the ones that have the symbols of interest
derivs = defaultdict(list)
for der in n.atoms(Derivative):
csym = der.free_symbols & symbols
for c in csym:
derivs[c].append(der)
all_zero = True
for xi in sorted(symbols, key=default_sort_key): # canonical order
# if there are derivatives in this var, calculate them now
if isinstance(derivs[xi], list):
derivs[xi] = {der: der.doit() for der in derivs[xi]}
newn = n.subs(derivs[xi])
dnewn_dxi = newn.diff(xi)
# dnewn_dxi can be nonzero if it survives differentation by any
# of its free symbols
free = dnewn_dxi.free_symbols
if dnewn_dxi and (not free or any(dnewn_dxi.diff(s) for s in free)):
all_zero = False
if dnewn_dxi is S.NaN:
break
if xi not in dnewn_dxi.free_symbols:
vi = -1/dnewn_dxi*(newn.subs(xi, 0))
if dens is None:
dens = _simple_dens(eq, symbols)
if not any(checksol(di, {xi: vi}, minimal=True) is True
for di in dens):
# simplify any trivial integral
irep = [(i, i.doit()) for i in vi.atoms(Integral) if
i.function.is_number]
# do a slight bit of simplification
vi = expand_mul(vi.subs(irep))
return xi, vi
if all_zero:
return S.Zero, S.One
if n.is_Symbol: # no solution for this symbol was found
return S.Zero, S.Zero
return n, d
def minsolve_linear_system(system, *symbols, **flags):
r"""
Find a particular solution to a linear system.
Explanation
===========
In particular, try to find a solution with the minimal possible number
of non-zero variables using a naive algorithm with exponential complexity.
If ``quick=True``, a heuristic is used.
"""
quick = flags.get('quick', False)
# Check if there are any non-zero solutions at all
s0 = solve_linear_system(system, *symbols, **flags)
if not s0 or all(v == 0 for v in s0.values()):
return s0
if quick:
# We just solve the system and try to heuristically find a nice
# solution.
s = solve_linear_system(system, *symbols)
def update(determined, solution):
delete = []
for k, v in solution.items():
solution[k] = v.subs(determined)
if not solution[k].free_symbols:
delete.append(k)
determined[k] = solution[k]
for k in delete:
del solution[k]
determined = {}
update(determined, s)
while s:
# NOTE sort by default_sort_key to get deterministic result
k = max((k for k in s.values()),
key=lambda x: (len(x.free_symbols), default_sort_key(x)))
x = max(k.free_symbols, key=default_sort_key)
if len(k.free_symbols) != 1:
determined[x] = S.Zero
else:
val = solve(k)[0]
if val == 0 and all(v.subs(x, val) == 0 for v in s.values()):
determined[x] = S.One
else:
determined[x] = val
update(determined, s)
return determined
else:
# We try to select n variables which we want to be non-zero.
# All others will be assumed zero. We try to solve the modified system.
# If there is a non-trivial solution, just set the free variables to
# one. If we do this for increasing n, trying all combinations of
# variables, we will find an optimal solution.
# We speed up slightly by starting at one less than the number of
# variables the quick method manages.
from itertools import combinations
from sympy.utilities.misc import debug
N = len(symbols)
bestsol = minsolve_linear_system(system, *symbols, quick=True)
n0 = len([x for x in bestsol.values() if x != 0])
for n in range(n0 - 1, 1, -1):
debug('minsolve: %s' % n)
thissol = None
for nonzeros in combinations(list(range(N)), n):
subm = Matrix([system.col(i).T for i in nonzeros] + [system.col(-1).T]).T
s = solve_linear_system(subm, *[symbols[i] for i in nonzeros])
if s and not all(v == 0 for v in s.values()):
subs = [(symbols[v], S.One) for v in nonzeros]
for k, v in s.items():
s[k] = v.subs(subs)
for sym in symbols:
if sym not in s:
if symbols.index(sym) in nonzeros:
s[sym] = S.One
else:
s[sym] = S.Zero
thissol = s
break
if thissol is None:
break
bestsol = thissol
return bestsol
def solve_linear_system(system, *symbols, **flags):
r"""
Solve system of $N$ linear equations with $M$ variables, which means
both under- and overdetermined systems are supported.
Explanation
===========
The possible number of solutions is zero, one, or infinite. Respectively,
this procedure will return None or a dictionary with solutions. In the
case of underdetermined systems, all arbitrary parameters are skipped.
This may cause a situation in which an empty dictionary is returned.
In that case, all symbols can be assigned arbitrary values.
Input to this function is a $N\times M + 1$ matrix, which means it has
to be in augmented form. If you prefer to enter $N$ equations and $M$
unknowns then use ``solve(Neqs, *Msymbols)`` instead. Note: a local
copy of the matrix is made by this routine so the matrix that is
passed will not be modified.
The algorithm used here is fraction-free Gaussian elimination,
which results, after elimination, in an upper-triangular matrix.
Then solutions are found using back-substitution. This approach
is more efficient and compact than the Gauss-Jordan method.
Examples
========
>>> from sympy import Matrix, solve_linear_system
>>> from sympy.abc import x, y
Solve the following system::
x + 4 y == 2
-2 x + y == 14
>>> system = Matrix(( (1, 4, 2), (-2, 1, 14)))
>>> solve_linear_system(system, x, y)
{x: -6, y: 2}
A degenerate system returns an empty dictionary:
>>> system = Matrix(( (0,0,0), (0,0,0) ))
>>> solve_linear_system(system, x, y)
{}
"""
do_simplify = flags.get('simplify', True)
if system.rows == system.cols - 1 == len(symbols):
try:
# well behaved n-equations and n-unknowns
inv = inv_quick(system[:, :-1])
rv = dict(zip(symbols, inv*system[:, -1]))
if do_simplify:
for k, v in rv.items():
rv[k] = simplify(v)
if not all(i.is_zero for i in rv.values()):
# non-trivial solution
return rv
except ValueError:
pass
matrix = system[:, :]
syms = list(symbols)
i, m = 0, matrix.cols - 1 # don't count augmentation
while i < matrix.rows:
if i == m:
# an overdetermined system
if any(matrix[i:, m]):
return None # no solutions
else:
# remove trailing rows
matrix = matrix[:i, :]
break
if not matrix[i, i]:
# there is no pivot in current column
# so try to find one in other columns
for k in range(i + 1, m):
if matrix[i, k]:
break
else:
if matrix[i, m]:
# We need to know if this is always zero or not. We
# assume that if there are free symbols that it is not
# identically zero (or that there is more than one way
# to make this zero). Otherwise, if there are none, this
# is a constant and we assume that it does not simplify
# to zero XXX are there better (fast) ways to test this?
# The .equals(0) method could be used but that can be
# slow; numerical testing is prone to errors of scaling.
if not matrix[i, m].free_symbols:
return None # no solution
# A row of zeros with a non-zero rhs can only be accepted
# if there is another equivalent row. Any such rows will
# be deleted.
nrows = matrix.rows
rowi = matrix.row(i)
ip = None
j = i + 1
while j < matrix.rows:
# do we need to see if the rhs of j
# is a constant multiple of i's rhs?
rowj = matrix.row(j)
if rowj == rowi:
matrix.row_del(j)
elif rowj[:-1] == rowi[:-1]:
if ip is None:
_, ip = rowi[-1].as_content_primitive()
_, jp = rowj[-1].as_content_primitive()
if not (simplify(jp - ip) or simplify(jp + ip)):
matrix.row_del(j)
j += 1
if nrows == matrix.rows:
# no solution
return None
# zero row or was a linear combination of
# other rows or was a row with a symbolic
# expression that matched other rows, e.g. [0, 0, x - y]
# so now we can safely skip it
matrix.row_del(i)
if not matrix:
# every choice of variable values is a solution
# so we return an empty dict instead of None
return dict()
continue
# we want to change the order of columns so
# the order of variables must also change
syms[i], syms[k] = syms[k], syms[i]
matrix.col_swap(i, k)
pivot_inv = S.One/matrix[i, i]
# divide all elements in the current row by the pivot
matrix.row_op(i, lambda x, _: x * pivot_inv)
for k in range(i + 1, matrix.rows):
if matrix[k, i]:
coeff = matrix[k, i]
# subtract from the current row the row containing
# pivot and multiplied by extracted coefficient
matrix.row_op(k, lambda x, j: simplify(x - matrix[i, j]*coeff))
i += 1
# if there weren't any problems, augmented matrix is now
# in row-echelon form so we can check how many solutions
# there are and extract them using back substitution
if len(syms) == matrix.rows:
# this system is Cramer equivalent so there is
# exactly one solution to this system of equations
k, solutions = i - 1, {}
while k >= 0:
content = matrix[k, m]
# run back-substitution for variables
for j in range(k + 1, m):
content -= matrix[k, j]*solutions[syms[j]]
if do_simplify:
solutions[syms[k]] = simplify(content)
else:
solutions[syms[k]] = content
k -= 1
return solutions
elif len(syms) > matrix.rows:
# this system will have infinite number of solutions
# dependent on exactly len(syms) - i parameters
k, solutions = i - 1, {}
while k >= 0:
content = matrix[k, m]
# run back-substitution for variables
for j in range(k + 1, i):
content -= matrix[k, j]*solutions[syms[j]]
# run back-substitution for parameters
for j in range(i, m):
content -= matrix[k, j]*syms[j]
if do_simplify:
solutions[syms[k]] = simplify(content)
else:
solutions[syms[k]] = content
k -= 1
return solutions
else:
return [] # no solutions
def solve_undetermined_coeffs(equ, coeffs, sym, **flags):
r"""
Solve equation of a type $p(x; a_1, \ldots, a_k) = q(x)$ where both
$p$ and $q$ are univariate polynomials that depend on $k$ parameters.
Explanation
===========
The result of this function is a dictionary with symbolic values of those
parameters with respect to coefficients in $q$.
This function accepts both equations class instances and ordinary
SymPy expressions. Specification of parameters and variables is
obligatory for efficiency and simplicity reasons.
Examples
========
>>> from sympy import Eq
>>> from sympy.abc import a, b, c, x
>>> from sympy.solvers import solve_undetermined_coeffs
>>> solve_undetermined_coeffs(Eq(2*a*x + a+b, x), [a, b], x)
{a: 1/2, b: -1/2}
>>> solve_undetermined_coeffs(Eq(a*c*x + a+b, x), [a, b], x)
{a: 1/c, b: -1/c}
"""
if isinstance(equ, Equality):
# got equation, so move all the
# terms to the left hand side
equ = equ.lhs - equ.rhs
equ = cancel(equ).as_numer_denom()[0]
system = list(collect(equ.expand(), sym, evaluate=False).values())
if not any(equ.has(sym) for equ in system):
# consecutive powers in the input expressions have
# been successfully collected, so solve remaining
# system using Gaussian elimination algorithm
return solve(system, *coeffs, **flags)
else:
return None # no solutions
def solve_linear_system_LU(matrix, syms):
"""
Solves the augmented matrix system using ``LUsolve`` and returns a
dictionary in which solutions are keyed to the symbols of *syms* as ordered.
Explanation
===========
The matrix must be invertible.
Examples
========
>>> from sympy import Matrix
>>> from sympy.abc import x, y, z
>>> from sympy.solvers.solvers import solve_linear_system_LU
>>> solve_linear_system_LU(Matrix([
... [1, 2, 0, 1],
... [3, 2, 2, 1],
... [2, 0, 0, 1]]), [x, y, z])
{x: 1/2, y: 1/4, z: -1/2}
See Also
========
LUsolve
"""
if matrix.rows != matrix.cols - 1:
raise ValueError("Rows should be equal to columns - 1")
A = matrix[:matrix.rows, :matrix.rows]
b = matrix[:, matrix.cols - 1:]
soln = A.LUsolve(b)
solutions = {}
for i in range(soln.rows):
solutions[syms[i]] = soln[i, 0]
return solutions
def det_perm(M):
"""
Return the determinant of *M* by using permutations to select factors.
Explanation
===========
For sizes larger than 8 the number of permutations becomes prohibitively
large, or if there are no symbols in the matrix, it is better to use the
standard determinant routines (e.g., ``M.det()``.)
See Also
========
det_minor
det_quick
"""
args = []
s = True
n = M.rows
list_ = getattr(M, '_mat', None)
if list_ is None:
list_ = flatten(M.tolist())
for perm in generate_bell(n):
fac = []
idx = 0
for j in perm:
fac.append(list_[idx + j])
idx += n
term = Mul(*fac) # disaster with unevaluated Mul -- takes forever for n=7
args.append(term if s else -term)
s = not s
return Add(*args)
def det_minor(M):
"""
Return the ``det(M)`` computed from minors without
introducing new nesting in products.
See Also
========
det_perm
det_quick
"""
n = M.rows
if n == 2:
return M[0, 0]*M[1, 1] - M[1, 0]*M[0, 1]
else:
return sum([(1, -1)[i % 2]*Add(*[M[0, i]*d for d in
Add.make_args(det_minor(M.minor_submatrix(0, i)))])
if M[0, i] else S.Zero for i in range(n)])
def det_quick(M, method=None):
"""
Return ``det(M)`` assuming that either
there are lots of zeros or the size of the matrix
is small. If this assumption is not met, then the normal
Matrix.det function will be used with method = ``method``.
See Also
========
det_minor
det_perm
"""
if any(i.has(Symbol) for i in M):
if M.rows < 8 and all(i.has(Symbol) for i in M):
return det_perm(M)
return det_minor(M)
else:
return M.det(method=method) if method else M.det()
def inv_quick(M):
"""Return the inverse of ``M``, assuming that either
there are lots of zeros or the size of the matrix
is small.
"""
from sympy.matrices import zeros
if not all(i.is_Number for i in M):
if not any(i.is_Number for i in M):
det = lambda _: det_perm(_)
else:
det = lambda _: det_minor(_)
else:
return M.inv()
n = M.rows
d = det(M)
if d == S.Zero:
raise ValueError("Matrix det == 0; not invertible.")
ret = zeros(n)
s1 = -1
for i in range(n):
s = s1 = -s1
for j in range(n):
di = det(M.minor_submatrix(i, j))
ret[j, i] = s*di/d
s = -s
return ret
# these are functions that have multiple inverse values per period
multi_inverses = {
sin: lambda x: (asin(x), S.Pi - asin(x)),
cos: lambda x: (acos(x), 2*S.Pi - acos(x)),
}
def _tsolve(eq, sym, **flags):
"""
Helper for ``_solve`` that solves a transcendental equation with respect
to the given symbol. Various equations containing powers and logarithms,
can be solved.
There is currently no guarantee that all solutions will be returned or
that a real solution will be favored over a complex one.
Either a list of potential solutions will be returned or None will be
returned (in the case that no method was known to get a solution
for the equation). All other errors (like the inability to cast an
expression as a Poly) are unhandled.
Examples
========
>>> from sympy import log
>>> from sympy.solvers.solvers import _tsolve as tsolve
>>> from sympy.abc import x
>>> tsolve(3**(2*x + 5) - 4, x)
[-5/2 + log(2)/log(3), (-5*log(3)/2 + log(2) + I*pi)/log(3)]
>>> tsolve(log(x) + 2*x, x)
[LambertW(2)/2]
"""
if 'tsolve_saw' not in flags:
flags['tsolve_saw'] = []
if eq in flags['tsolve_saw']:
return None
else:
flags['tsolve_saw'].append(eq)
rhs, lhs = _invert(eq, sym)
if lhs == sym:
return [rhs]
try:
if lhs.is_Add:
# it's time to try factoring; powdenest is used
# to try get powers in standard form for better factoring
f = factor(powdenest(lhs - rhs))
if f.is_Mul:
return _solve(f, sym, **flags)
if rhs:
f = logcombine(lhs, force=flags.get('force', True))
if f.count(log) != lhs.count(log):
if isinstance(f, log):
return _solve(f.args[0] - exp(rhs), sym, **flags)
return _tsolve(f - rhs, sym, **flags)
elif lhs.is_Pow:
if lhs.exp.is_Integer:
if lhs - rhs != eq:
return _solve(lhs - rhs, sym, **flags)
if sym not in lhs.exp.free_symbols:
return _solve(lhs.base - rhs**(1/lhs.exp), sym, **flags)
# _tsolve calls this with Dummy before passing the actual number in.
if any(t.is_Dummy for t in rhs.free_symbols):
raise NotImplementedError # _tsolve will call here again...
# a ** g(x) == 0
if not rhs:
# f(x)**g(x) only has solutions where f(x) == 0 and g(x) != 0 at
# the same place
sol_base = _solve(lhs.base, sym, **flags)
return [s for s in sol_base if lhs.exp.subs(sym, s) != 0]
# a ** g(x) == b
if not lhs.base.has(sym):
if lhs.base == 0:
return _solve(lhs.exp, sym, **flags) if rhs != 0 else []
# Gets most solutions...
if lhs.base == rhs.as_base_exp()[0]:
# handles case when bases are equal
sol = _solve(lhs.exp - rhs.as_base_exp()[1], sym, **flags)
else:
# handles cases when bases are not equal and exp
# may or may not be equal
sol = _solve(exp(log(lhs.base)*lhs.exp)-exp(log(rhs)), sym, **flags)
# Check for duplicate solutions
def equal(expr1, expr2):
_ = Dummy()
eq = checksol(expr1 - _, _, expr2)
if eq is None:
if nsimplify(expr1) != nsimplify(expr2):
return False
# they might be coincidentally the same
# so check more rigorously
eq = expr1.equals(expr2)
return eq
# Guess a rational exponent
e_rat = nsimplify(log(abs(rhs))/log(abs(lhs.base)))
e_rat = simplify(posify(e_rat)[0])
n, d = fraction(e_rat)
if expand(lhs.base**n - rhs**d) == 0:
sol = [s for s in sol if not equal(lhs.exp.subs(sym, s), e_rat)]
sol.extend(_solve(lhs.exp - e_rat, sym, **flags))
return list(ordered(set(sol)))
# f(x) ** g(x) == c
else:
sol = []
logform = lhs.exp*log(lhs.base) - log(rhs)
if logform != lhs - rhs:
try:
sol.extend(_solve(logform, sym, **flags))
except NotImplementedError:
pass
# Collect possible solutions and check with substitution later.
check = []
if rhs == 1:
# f(x) ** g(x) = 1 -- g(x)=0 or f(x)=+-1
check.extend(_solve(lhs.exp, sym, **flags))
check.extend(_solve(lhs.base - 1, sym, **flags))
check.extend(_solve(lhs.base + 1, sym, **flags))
elif rhs.is_Rational:
for d in (i for i in divisors(abs(rhs.p)) if i != 1):
e, t = integer_log(rhs.p, d)
if not t:
continue # rhs.p != d**b
for s in divisors(abs(rhs.q)):
if s**e== rhs.q:
r = Rational(d, s)
check.extend(_solve(lhs.base - r, sym, **flags))
check.extend(_solve(lhs.base + r, sym, **flags))
check.extend(_solve(lhs.exp - e, sym, **flags))
elif rhs.is_irrational:
b_l, e_l = lhs.base.as_base_exp()
n, d = (e_l*lhs.exp).as_numer_denom()
b, e = sqrtdenest(rhs).as_base_exp()
check = [sqrtdenest(i) for i in (_solve(lhs.base - b, sym, **flags))]
check.extend([sqrtdenest(i) for i in (_solve(lhs.exp - e, sym, **flags))])
if e_l*d != 1:
check.extend(_solve(b_l**n - rhs**(e_l*d), sym, **flags))
for s in check:
ok = checksol(eq, sym, s)
if ok is None:
ok = eq.subs(sym, s).equals(0)
if ok:
sol.append(s)
return list(ordered(set(sol)))
elif lhs.is_Function and len(lhs.args) == 1:
if lhs.func in multi_inverses:
# sin(x) = 1/3 -> x - asin(1/3) & x - (pi - asin(1/3))
soln = []
for i in multi_inverses[lhs.func](rhs):
soln.extend(_solve(lhs.args[0] - i, sym, **flags))
return list(ordered(soln))
elif lhs.func == LambertW:
return _solve(lhs.args[0] - rhs*exp(rhs), sym, **flags)
rewrite = lhs.rewrite(exp)
if rewrite != lhs:
return _solve(rewrite - rhs, sym, **flags)
except NotImplementedError:
pass
# maybe it is a lambert pattern
if flags.pop('bivariate', True):
# lambert forms may need some help being recognized, e.g. changing
# 2**(3*x) + x**3*log(2)**3 + 3*x**2*log(2)**2 + 3*x*log(2) + 1
# to 2**(3*x) + (x*log(2) + 1)**3
g = _filtered_gens(eq.as_poly(), sym)
up_or_log = set()
for gi in g:
if isinstance(gi, exp) or isinstance(gi, log):
up_or_log.add(gi)
elif gi.is_Pow:
gisimp = powdenest(expand_power_exp(gi))
if gisimp.is_Pow and sym in gisimp.exp.free_symbols:
up_or_log.add(gi)
eq_down = expand_log(expand_power_exp(eq)).subs(
dict(list(zip(up_or_log, [0]*len(up_or_log)))))
eq = expand_power_exp(factor(eq_down, deep=True) + (eq - eq_down))
rhs, lhs = _invert(eq, sym)
if lhs.has(sym):
try:
poly = lhs.as_poly()
g = _filtered_gens(poly, sym)
_eq = lhs - rhs
sols = _solve_lambert(_eq, sym, g)
# use a simplified form if it satisfies eq
# and has fewer operations
for n, s in enumerate(sols):
ns = nsimplify(s)
if ns != s and ns.count_ops() <= s.count_ops():
ok = checksol(_eq, sym, ns)
if ok is None:
ok = _eq.subs(sym, ns).equals(0)
if ok:
sols[n] = ns
return sols
except NotImplementedError:
# maybe it's a convoluted function
if len(g) == 2:
try:
gpu = bivariate_type(lhs - rhs, *g)
if gpu is None:
raise NotImplementedError
g, p, u = gpu
flags['bivariate'] = False
inversion = _tsolve(g - u, sym, **flags)
if inversion:
sol = _solve(p, u, **flags)
return list(ordered(set([i.subs(u, s)
for i in inversion for s in sol])))
except NotImplementedError:
pass
else:
pass
if flags.pop('force', True):
flags['force'] = False
pos, reps = posify(lhs - rhs)
if rhs == S.ComplexInfinity:
return []
for u, s in reps.items():
if s == sym:
break
else:
u = sym
if pos.has(u):
try:
soln = _solve(pos, u, **flags)
return list(ordered([s.subs(reps) for s in soln]))
except NotImplementedError:
pass
else:
pass # here for coverage
return # here for coverage
# TODO: option for calculating J numerically
@conserve_mpmath_dps
def nsolve(*args, **kwargs):
r"""
Solve a nonlinear equation system numerically: ``nsolve(f, [args,] x0,
modules=['mpmath'], **kwargs)``.
Explanation
===========
``f`` is a vector function of symbolic expressions representing the system.
*args* are the variables. If there is only one variable, this argument can
be omitted. ``x0`` is a starting vector close to a solution.
Use the modules keyword to specify which modules should be used to
evaluate the function and the Jacobian matrix. Make sure to use a module
that supports matrices. For more information on the syntax, please see the
docstring of ``lambdify``.
If the keyword arguments contain ``dict=True`` (default is False) ``nsolve``
will return a list (perhaps empty) of solution mappings. This might be
especially useful if you want to use ``nsolve`` as a fallback to solve since
using the dict argument for both methods produces return values of
consistent type structure. Please note: to keep this consistent with
``solve``, the solution will be returned in a list even though ``nsolve``
(currently at least) only finds one solution at a time.
Overdetermined systems are supported.
Examples
========
>>> from sympy import Symbol, nsolve
>>> import sympy
>>> import mpmath
>>> mpmath.mp.dps = 15
>>> x1 = Symbol('x1')
>>> x2 = Symbol('x2')
>>> f1 = 3 * x1**2 - 2 * x2**2 - 1
>>> f2 = x1**2 - 2 * x1 + x2**2 + 2 * x2 - 8
>>> print(nsolve((f1, f2), (x1, x2), (-1, 1)))
Matrix([[-1.19287309935246], [1.27844411169911]])
For one-dimensional functions the syntax is simplified:
>>> from sympy import sin, nsolve
>>> from sympy.abc import x
>>> nsolve(sin(x), x, 2)
3.14159265358979
>>> nsolve(sin(x), 2)
3.14159265358979
To solve with higher precision than the default, use the prec argument:
>>> from sympy import cos
>>> nsolve(cos(x) - x, 1)
0.739085133215161
>>> nsolve(cos(x) - x, 1, prec=50)
0.73908513321516064165531208767387340401341175890076
>>> cos(_)
0.73908513321516064165531208767387340401341175890076
To solve for complex roots of real functions, a nonreal initial point
must be specified:
>>> from sympy import I
>>> nsolve(x**2 + 2, I)
1.4142135623731*I
``mpmath.findroot`` is used and you can find their more extensive
documentation, especially concerning keyword parameters and
available solvers. Note, however, that functions which are very
steep near the root, the verification of the solution may fail. In
this case you should use the flag ``verify=False`` and
independently verify the solution.
>>> from sympy import cos, cosh
>>> from sympy.abc import i
>>> f = cos(x)*cosh(x) - 1
>>> nsolve(f, 3.14*100)
Traceback (most recent call last):
...
ValueError: Could not find root within given tolerance. (1.39267e+230 > 2.1684e-19)
>>> ans = nsolve(f, 3.14*100, verify=False); ans
312.588469032184
>>> f.subs(x, ans).n(2)
2.1e+121
>>> (f/f.diff(x)).subs(x, ans).n(2)
7.4e-15
One might safely skip the verification if bounds of the root are known
and a bisection method is used:
>>> bounds = lambda i: (3.14*i, 3.14*(i + 1))
>>> nsolve(f, bounds(100), solver='bisect', verify=False)
315.730061685774
Alternatively, a function may be better behaved when the
denominator is ignored. Since this is not always the case, however,
the decision of what function to use is left to the discretion of
the user.
>>> eq = x**2/(1 - x)/(1 - 2*x)**2 - 100
>>> nsolve(eq, 0.46)
Traceback (most recent call last):
...
ValueError: Could not find root within given tolerance. (10000 > 2.1684e-19)
Try another starting point or tweak arguments.
>>> nsolve(eq.as_numer_denom()[0], 0.46)
0.46792545969349058
"""
# there are several other SymPy functions that use method= so
# guard against that here
if 'method' in kwargs:
raise ValueError(filldedent('''
Keyword "method" should not be used in this context. When using
some mpmath solvers directly, the keyword "method" is
used, but when using nsolve (and findroot) the keyword to use is
"solver".'''))
if 'prec' in kwargs:
prec = kwargs.pop('prec')
import mpmath
mpmath.mp.dps = prec
else:
prec = None
# keyword argument to return result as a dictionary
as_dict = kwargs.pop('dict', False)
# interpret arguments
if len(args) == 3:
f = args[0]
fargs = args[1]
x0 = args[2]
if iterable(fargs) and iterable(x0):
if len(x0) != len(fargs):
raise TypeError('nsolve expected exactly %i guess vectors, got %i'
% (len(fargs), len(x0)))
elif len(args) == 2:
f = args[0]
fargs = None
x0 = args[1]
if iterable(f):
raise TypeError('nsolve expected 3 arguments, got 2')
elif len(args) < 2:
raise TypeError('nsolve expected at least 2 arguments, got %i'
% len(args))
else:
raise TypeError('nsolve expected at most 3 arguments, got %i'
% len(args))
modules = kwargs.get('modules', ['mpmath'])
if iterable(f):
f = list(f)
for i, fi in enumerate(f):
if isinstance(fi, Equality):
f[i] = fi.lhs - fi.rhs
f = Matrix(f).T
if iterable(x0):
x0 = list(x0)
if not isinstance(f, Matrix):
# assume it's a sympy expression
if isinstance(f, Equality):
f = f.lhs - f.rhs
syms = f.free_symbols
if fargs is None:
fargs = syms.copy().pop()
if not (len(syms) == 1 and (fargs in syms or fargs[0] in syms)):
raise ValueError(filldedent('''
expected a one-dimensional and numerical function'''))
# the function is much better behaved if there is no denominator
# but sending the numerator is left to the user since sometimes
# the function is better behaved when the denominator is present
# e.g., issue 11768
f = lambdify(fargs, f, modules)
x = sympify(findroot(f, x0, **kwargs))
if as_dict:
return [{fargs: x}]
return x
if len(fargs) > f.cols:
raise NotImplementedError(filldedent('''
need at least as many equations as variables'''))
verbose = kwargs.get('verbose', False)
if verbose:
print('f(x):')
print(f)
# derive Jacobian
J = f.jacobian(fargs)
if verbose:
print('J(x):')
print(J)
# create functions
f = lambdify(fargs, f.T, modules)
J = lambdify(fargs, J, modules)
# solve the system numerically
x = findroot(f, x0, J=J, **kwargs)
if as_dict:
return [dict(zip(fargs, [sympify(xi) for xi in x]))]
return Matrix(x)
def _invert(eq, *symbols, **kwargs):
"""
Return tuple (i, d) where ``i`` is independent of *symbols* and ``d``
contains symbols.
Explanation
===========
``i`` and ``d`` are obtained after recursively using algebraic inversion
until an uninvertible ``d`` remains. If there are no free symbols then
``d`` will be zero. Some (but not necessarily all) solutions to the
expression ``i - d`` will be related to the solutions of the original
expression.
Examples
========
>>> from sympy.solvers.solvers import _invert as invert
>>> from sympy import sqrt, cos
>>> from sympy.abc import x, y
>>> invert(x - 3)
(3, x)
>>> invert(3)
(3, 0)
>>> invert(2*cos(x) - 1)
(1/2, cos(x))
>>> invert(sqrt(x) - 3)
(3, sqrt(x))
>>> invert(sqrt(x) + y, x)
(-y, sqrt(x))
>>> invert(sqrt(x) + y, y)
(-sqrt(x), y)
>>> invert(sqrt(x) + y, x, y)
(0, sqrt(x) + y)
If there is more than one symbol in a power's base and the exponent
is not an Integer, then the principal root will be used for the
inversion:
>>> invert(sqrt(x + y) - 2)
(4, x + y)
>>> invert(sqrt(x + y) - 2)
(4, x + y)
If the exponent is an Integer, setting ``integer_power`` to True
will force the principal root to be selected:
>>> invert(x**2 - 4, integer_power=True)
(2, x)
"""
eq = sympify(eq)
if eq.args:
# make sure we are working with flat eq
eq = eq.func(*eq.args)
free = eq.free_symbols
if not symbols:
symbols = free
if not free & set(symbols):
return eq, S.Zero
dointpow = bool(kwargs.get('integer_power', False))
lhs = eq
rhs = S.Zero
while True:
was = lhs
while True:
indep, dep = lhs.as_independent(*symbols)
# dep + indep == rhs
if lhs.is_Add:
# this indicates we have done it all
if indep.is_zero:
break
lhs = dep
rhs -= indep
# dep * indep == rhs
else:
# this indicates we have done it all
if indep is S.One:
break
lhs = dep
rhs /= indep
# collect like-terms in symbols
if lhs.is_Add:
terms = {}
for a in lhs.args:
i, d = a.as_independent(*symbols)
terms.setdefault(d, []).append(i)
if any(len(v) > 1 for v in terms.values()):
args = []
for d, i in terms.items():
if len(i) > 1:
args.append(Add(*i)*d)
else:
args.append(i[0]*d)
lhs = Add(*args)
# if it's a two-term Add with rhs = 0 and two powers we can get the
# dependent terms together, e.g. 3*f(x) + 2*g(x) -> f(x)/g(x) = -2/3
if lhs.is_Add and not rhs and len(lhs.args) == 2 and \
not lhs.is_polynomial(*symbols):
a, b = ordered(lhs.args)
ai, ad = a.as_independent(*symbols)
bi, bd = b.as_independent(*symbols)
if any(_ispow(i) for i in (ad, bd)):
a_base, a_exp = ad.as_base_exp()
b_base, b_exp = bd.as_base_exp()
if a_base == b_base:
# a = -b
lhs = powsimp(powdenest(ad/bd))
rhs = -bi/ai
else:
rat = ad/bd
_lhs = powsimp(ad/bd)
if _lhs != rat:
lhs = _lhs
rhs = -bi/ai
elif ai == -bi:
if isinstance(ad, Function) and ad.func == bd.func:
if len(ad.args) == len(bd.args) == 1:
lhs = ad.args[0] - bd.args[0]
elif len(ad.args) == len(bd.args):
# should be able to solve
# f(x, y) - f(2 - x, 0) == 0 -> x == 1
raise NotImplementedError(
'equal function with more than 1 argument')
else:
raise ValueError(
'function with different numbers of args')
elif lhs.is_Mul and any(_ispow(a) for a in lhs.args):
lhs = powsimp(powdenest(lhs))
if lhs.is_Function:
if hasattr(lhs, 'inverse') and len(lhs.args) == 1:
# -1
# f(x) = g -> x = f (g)
#
# /!\ inverse should not be defined if there are multiple values
# for the function -- these are handled in _tsolve
#
rhs = lhs.inverse()(rhs)
lhs = lhs.args[0]
elif isinstance(lhs, atan2):
y, x = lhs.args
lhs = 2*atan(y/(sqrt(x**2 + y**2) + x))
elif lhs.func == rhs.func:
if len(lhs.args) == len(rhs.args) == 1:
lhs = lhs.args[0]
rhs = rhs.args[0]
elif len(lhs.args) == len(rhs.args):
# should be able to solve
# f(x, y) == f(2, 3) -> x == 2
# f(x, x + y) == f(2, 3) -> x == 2
raise NotImplementedError(
'equal function with more than 1 argument')
else:
raise ValueError(
'function with different numbers of args')
if rhs and lhs.is_Pow and lhs.exp.is_Integer and lhs.exp < 0:
lhs = 1/lhs
rhs = 1/rhs
# base**a = b -> base = b**(1/a) if
# a is an Integer and dointpow=True (this gives real branch of root)
# a is not an Integer and the equation is multivariate and the
# base has more than 1 symbol in it
# The rationale for this is that right now the multi-system solvers
# doesn't try to resolve generators to see, for example, if the whole
# system is written in terms of sqrt(x + y) so it will just fail, so we
# do that step here.
if lhs.is_Pow and (
lhs.exp.is_Integer and dointpow or not lhs.exp.is_Integer and
len(symbols) > 1 and len(lhs.base.free_symbols & set(symbols)) > 1):
rhs = rhs**(1/lhs.exp)
lhs = lhs.base
if lhs == was:
break
return rhs, lhs
def unrad(eq, *syms, **flags):
"""
Remove radicals with symbolic arguments and return (eq, cov),
None, or raise an error.
Explanation
===========
None is returned if there are no radicals to remove.
NotImplementedError is raised if there are radicals and they cannot be
removed or if the relationship between the original symbols and the
change of variable needed to rewrite the system as a polynomial cannot
be solved.
Otherwise the tuple, ``(eq, cov)``, is returned where:
*eq*, ``cov``
*eq* is an equation without radicals (in the symbol(s) of
interest) whose solutions are a superset of the solutions to the
original expression. *eq* might be rewritten in terms of a new
variable; the relationship to the original variables is given by
``cov`` which is a list containing ``v`` and ``v**p - b`` where
``p`` is the power needed to clear the radical and ``b`` is the
radical now expressed as a polynomial in the symbols of interest.
For example, for sqrt(2 - x) the tuple would be
``(c, c**2 - 2 + x)``. The solutions of *eq* will contain
solutions to the original equation (if there are any).
*syms*
An iterable of symbols which, if provided, will limit the focus of
radical removal: only radicals with one or more of the symbols of
interest will be cleared. All free symbols are used if *syms* is not
set.
*flags* are used internally for communication during recursive calls.
Two options are also recognized:
``take``, when defined, is interpreted as a single-argument function
that returns True if a given Pow should be handled.
Radicals can be removed from an expression if:
* All bases of the radicals are the same; a change of variables is
done in this case.
* If all radicals appear in one term of the expression.
* There are only four terms with sqrt() factors or there are less than
four terms having sqrt() factors.
* There are only two terms with radicals.
Examples
========
>>> from sympy.solvers.solvers import unrad
>>> from sympy.abc import x
>>> from sympy import sqrt, Rational, root, real_roots, solve
>>> unrad(sqrt(x)*x**Rational(1, 3) + 2)
(x**5 - 64, [])
>>> unrad(sqrt(x) + root(x + 1, 3))
(x**3 - x**2 - 2*x - 1, [])
>>> eq = sqrt(x) + root(x, 3) - 2
>>> unrad(eq)
(_p**3 + _p**2 - 2, [_p, _p**6 - x])
"""
uflags = dict(check=False, simplify=False)
def _cov(p, e):
if cov:
# XXX - uncovered
oldp, olde = cov
if Poly(e, p).degree(p) in (1, 2):
cov[:] = [p, olde.subs(oldp, _solve(e, p, **uflags)[0])]
else:
raise NotImplementedError
else:
cov[:] = [p, e]
def _canonical(eq, cov):
if cov:
# change symbol to vanilla so no solutions are eliminated
p, e = cov
rep = {p: Dummy(p.name)}
eq = eq.xreplace(rep)
cov = [p.xreplace(rep), e.xreplace(rep)]
# remove constants and powers of factors since these don't change
# the location of the root; XXX should factor or factor_terms be used?
eq = factor_terms(_mexpand(eq.as_numer_denom()[0], recursive=True), clear=True)
if eq.is_Mul:
args = []
for f in eq.args:
if f.is_number:
continue
if f.is_Pow and _take(f, True):
args.append(f.base)
else:
args.append(f)
eq = Mul(*args) # leave as Mul for more efficient solving
# make the sign canonical
free = eq.free_symbols
if len(free) == 1:
if eq.coeff(free.pop()**degree(eq)).could_extract_minus_sign():
eq = -eq
elif eq.could_extract_minus_sign():
eq = -eq
return eq, cov
def _Q(pow):
# return leading Rational of denominator of Pow's exponent
c = pow.as_base_exp()[1].as_coeff_Mul()[0]
if not c.is_Rational:
return S.One
return c.q
# define the _take method that will determine whether a term is of interest
def _take(d, take_int_pow):
# return True if coefficient of any factor's exponent's den is not 1
for pow in Mul.make_args(d):
if not (pow.is_Symbol or pow.is_Pow):
continue
b, e = pow.as_base_exp()
if not b.has(*syms):
continue
if not take_int_pow and _Q(pow) == 1:
continue
free = pow.free_symbols
if free.intersection(syms):
return True
return False
_take = flags.setdefault('_take', _take)
cov, nwas, rpt = [flags.setdefault(k, v) for k, v in
sorted(dict(cov=[], n=None, rpt=0).items())]
# preconditioning
eq = powdenest(factor_terms(eq, radical=True, clear=True))
if isinstance(eq, Relational):
eq, d = eq, 1
else:
eq, d = eq.as_numer_denom()
eq = _mexpand(eq, recursive=True)
if eq.is_number:
return
syms = set(syms) or eq.free_symbols
poly = eq.as_poly()
gens = [g for g in poly.gens if _take(g, True)]
if not gens:
return
# check for trivial case
# - already a polynomial in integer powers
if all(_Q(g) == 1 for g in gens):
if (len(gens) == len(poly.gens) and d!=1):
return eq, []
else:
return
# - an exponent has a symbol of interest (don't handle)
if any(g.as_base_exp()[1].has(*syms) for g in gens):
return
def _rads_bases_lcm(poly):
# if all the bases are the same or all the radicals are in one
# term, `lcm` will be the lcm of the denominators of the
# exponents of the radicals
lcm = 1
rads = set()
bases = set()
for g in poly.gens:
if not _take(g, False):
continue
q = _Q(g)
if q != 1:
rads.add(g)
lcm = ilcm(lcm, q)
bases.add(g.base)
return rads, bases, lcm
rads, bases, lcm = _rads_bases_lcm(poly)
if not rads:
return
covsym = Dummy('p', nonnegative=True)
# only keep in syms symbols that actually appear in radicals;
# and update gens
newsyms = set()
for r in rads:
newsyms.update(syms & r.free_symbols)
if newsyms != syms:
syms = newsyms
gens = [g for g in gens if g.free_symbols & syms]
# get terms together that have common generators
drad = dict(list(zip(rads, list(range(len(rads))))))
rterms = {(): []}
args = Add.make_args(poly.as_expr())
for t in args:
if _take(t, False):
common = set(t.as_poly().gens).intersection(rads)
key = tuple(sorted([drad[i] for i in common]))
else:
key = ()
rterms.setdefault(key, []).append(t)
others = Add(*rterms.pop(()))
rterms = [Add(*rterms[k]) for k in rterms.keys()]
# the output will depend on the order terms are processed, so
# make it canonical quickly
rterms = list(reversed(list(ordered(rterms))))
ok = False # we don't have a solution yet
depth = sqrt_depth(eq)
if len(rterms) == 1 and not (rterms[0].is_Add and lcm > 2):
eq = rterms[0]**lcm - ((-others)**lcm)
ok = True
else:
if len(rterms) == 1 and rterms[0].is_Add:
rterms = list(rterms[0].args)
if len(bases) == 1:
b = bases.pop()
if len(syms) > 1:
free = b.free_symbols
x = {g for g in gens if g.is_Symbol} & free
if not x:
x = free
x = ordered(x)
else:
x = syms
x = list(x)[0]
try:
inv = _solve(covsym**lcm - b, x, **uflags)
if not inv:
raise NotImplementedError
eq = poly.as_expr().subs(b, covsym**lcm).subs(x, inv[0])
_cov(covsym, covsym**lcm - b)
return _canonical(eq, cov)
except NotImplementedError:
pass
else:
# no longer consider integer powers as generators
gens = [g for g in gens if _Q(g) != 1]
if len(rterms) == 2:
if not others:
eq = rterms[0]**lcm - (-rterms[1])**lcm
ok = True
elif not log(lcm, 2).is_Integer:
# the lcm-is-power-of-two case is handled below
r0, r1 = rterms
if flags.get('_reverse', False):
r1, r0 = r0, r1
i0 = _rads0, _bases0, lcm0 = _rads_bases_lcm(r0.as_poly())
i1 = _rads1, _bases1, lcm1 = _rads_bases_lcm(r1.as_poly())
for reverse in range(2):
if reverse:
i0, i1 = i1, i0
r0, r1 = r1, r0
_rads1, _, lcm1 = i1
_rads1 = Mul(*_rads1)
t1 = _rads1**lcm1
c = covsym**lcm1 - t1
for x in syms:
try:
sol = _solve(c, x, **uflags)
if not sol:
raise NotImplementedError
neweq = r0.subs(x, sol[0]) + covsym*r1/_rads1 + \
others
tmp = unrad(neweq, covsym)
if tmp:
eq, newcov = tmp
if newcov:
newp, newc = newcov
_cov(newp, c.subs(covsym,
_solve(newc, covsym, **uflags)[0]))
else:
_cov(covsym, c)
else:
eq = neweq
_cov(covsym, c)
ok = True
break
except NotImplementedError:
if reverse:
raise NotImplementedError(
'no successful change of variable found')
else:
pass
if ok:
break
elif len(rterms) == 3:
# two cube roots and another with order less than 5
# (so an analytical solution can be found) or a base
# that matches one of the cube root bases
info = [_rads_bases_lcm(i.as_poly()) for i in rterms]
RAD = 0
BASES = 1
LCM = 2
if info[0][LCM] != 3:
info.append(info.pop(0))
rterms.append(rterms.pop(0))
elif info[1][LCM] != 3:
info.append(info.pop(1))
rterms.append(rterms.pop(1))
if info[0][LCM] == info[1][LCM] == 3:
if info[1][BASES] != info[2][BASES]:
info[0], info[1] = info[1], info[0]
rterms[0], rterms[1] = rterms[1], rterms[0]
if info[1][BASES] == info[2][BASES]:
eq = rterms[0]**3 + (rterms[1] + rterms[2] + others)**3
ok = True
elif info[2][LCM] < 5:
# a*root(A, 3) + b*root(B, 3) + others = c
a, b, c, d, A, B = [Dummy(i) for i in 'abcdAB']
# zz represents the unraded expression into which the
# specifics for this case are substituted
zz = (c - d)*(A**3*a**9 + 3*A**2*B*a**6*b**3 -
3*A**2*a**6*c**3 + 9*A**2*a**6*c**2*d - 9*A**2*a**6*c*d**2 +
3*A**2*a**6*d**3 + 3*A*B**2*a**3*b**6 + 21*A*B*a**3*b**3*c**3 -
63*A*B*a**3*b**3*c**2*d + 63*A*B*a**3*b**3*c*d**2 -
21*A*B*a**3*b**3*d**3 + 3*A*a**3*c**6 - 18*A*a**3*c**5*d +
45*A*a**3*c**4*d**2 - 60*A*a**3*c**3*d**3 + 45*A*a**3*c**2*d**4 -
18*A*a**3*c*d**5 + 3*A*a**3*d**6 + B**3*b**9 - 3*B**2*b**6*c**3 +
9*B**2*b**6*c**2*d - 9*B**2*b**6*c*d**2 + 3*B**2*b**6*d**3 +
3*B*b**3*c**6 - 18*B*b**3*c**5*d + 45*B*b**3*c**4*d**2 -
60*B*b**3*c**3*d**3 + 45*B*b**3*c**2*d**4 - 18*B*b**3*c*d**5 +
3*B*b**3*d**6 - c**9 + 9*c**8*d - 36*c**7*d**2 + 84*c**6*d**3 -
126*c**5*d**4 + 126*c**4*d**5 - 84*c**3*d**6 + 36*c**2*d**7 -
9*c*d**8 + d**9)
def _t(i):
b = Mul(*info[i][RAD])
return cancel(rterms[i]/b), Mul(*info[i][BASES])
aa, AA = _t(0)
bb, BB = _t(1)
cc = -rterms[2]
dd = others
eq = zz.xreplace(dict(zip(
(a, A, b, B, c, d),
(aa, AA, bb, BB, cc, dd))))
ok = True
# handle power-of-2 cases
if not ok:
if log(lcm, 2).is_Integer and (not others and
len(rterms) == 4 or len(rterms) < 4):
def _norm2(a, b):
return a**2 + b**2 + 2*a*b
if len(rterms) == 4:
# (r0+r1)**2 - (r2+r3)**2
r0, r1, r2, r3 = rterms
eq = _norm2(r0, r1) - _norm2(r2, r3)
ok = True
elif len(rterms) == 3:
# (r1+r2)**2 - (r0+others)**2
r0, r1, r2 = rterms
eq = _norm2(r1, r2) - _norm2(r0, others)
ok = True
elif len(rterms) == 2:
# r0**2 - (r1+others)**2
r0, r1 = rterms
eq = r0**2 - _norm2(r1, others)
ok = True
new_depth = sqrt_depth(eq) if ok else depth
rpt += 1 # XXX how many repeats with others unchanging is enough?
if not ok or (
nwas is not None and len(rterms) == nwas and
new_depth is not None and new_depth == depth and
rpt > 3):
raise NotImplementedError('Cannot remove all radicals')
flags.update(dict(cov=cov, n=len(rterms), rpt=rpt))
neq = unrad(eq, *syms, **flags)
if neq:
eq, cov = neq
eq, cov = _canonical(eq, cov)
return eq, cov
from sympy.solvers.bivariate import (
bivariate_type, _solve_lambert, _filtered_gens)
|
ae6c7723d5f28a5226b59b89db103b50e1b9ae7bfb4454a68de408324bf5346d | """
Discrete Fourier Transform, Number Theoretic Transform,
Walsh Hadamard Transform, Mobius Transform
"""
from __future__ import print_function, division, unicode_literals
from sympy.core import S, Symbol, sympify
from sympy.core.compatibility import as_int, iterable
from sympy.core.function import expand_mul
from sympy.core.numbers import pi, I
from sympy.functions.elementary.trigonometric import sin, cos
from sympy.ntheory import isprime, primitive_root
from sympy.utilities.iterables import ibin
#----------------------------------------------------------------------------#
# #
# Discrete Fourier Transform #
# #
#----------------------------------------------------------------------------#
def _fourier_transform(seq, dps, inverse=False):
"""Utility function for the Discrete Fourier Transform"""
if not iterable(seq):
raise TypeError("Expected a sequence of numeric coefficients "
"for Fourier Transform")
a = [sympify(arg) for arg in seq]
if any(x.has(Symbol) for x in a):
raise ValueError("Expected non-symbolic coefficients")
n = len(a)
if n < 2:
return a
b = n.bit_length() - 1
if n&(n - 1): # not a power of 2
b += 1
n = 2**b
a += [S.Zero]*(n - len(a))
for i in range(1, n):
j = int(ibin(i, b, str=True)[::-1], 2)
if i < j:
a[i], a[j] = a[j], a[i]
ang = -2*pi/n if inverse else 2*pi/n
if dps is not None:
ang = ang.evalf(dps + 2)
w = [cos(ang*i) + I*sin(ang*i) for i in range(n // 2)]
h = 2
while h <= n:
hf, ut = h // 2, n // h
for i in range(0, n, h):
for j in range(hf):
u, v = a[i + j], expand_mul(a[i + j + hf]*w[ut * j])
a[i + j], a[i + j + hf] = u + v, u - v
h *= 2
if inverse:
a = [(x/n).evalf(dps) for x in a] if dps is not None \
else [x/n for x in a]
return a
def fft(seq, dps=None):
r"""
Performs the Discrete Fourier Transform (**DFT**) in the complex domain.
The sequence is automatically padded to the right with zeros, as the
*radix-2 FFT* requires the number of sample points to be a power of 2.
This method should be used with default arguments only for short sequences
as the complexity of expressions increases with the size of the sequence.
Parameters
==========
seq : iterable
The sequence on which **DFT** is to be applied.
dps : Integer
Specifies the number of decimal digits for precision.
Examples
========
>>> from sympy import fft, ifft
>>> fft([1, 2, 3, 4])
[10, -2 - 2*I, -2, -2 + 2*I]
>>> ifft(_)
[1, 2, 3, 4]
>>> ifft([1, 2, 3, 4])
[5/2, -1/2 + I/2, -1/2, -1/2 - I/2]
>>> fft(_)
[1, 2, 3, 4]
>>> ifft([1, 7, 3, 4], dps=15)
[3.75, -0.5 - 0.75*I, -1.75, -0.5 + 0.75*I]
>>> fft(_)
[1.0, 7.0, 3.0, 4.0]
References
==========
.. [1] https://en.wikipedia.org/wiki/Cooley%E2%80%93Tukey_FFT_algorithm
.. [2] http://mathworld.wolfram.com/FastFourierTransform.html
"""
return _fourier_transform(seq, dps=dps)
def ifft(seq, dps=None):
return _fourier_transform(seq, dps=dps, inverse=True)
ifft.__doc__ = fft.__doc__
#----------------------------------------------------------------------------#
# #
# Number Theoretic Transform #
# #
#----------------------------------------------------------------------------#
def _number_theoretic_transform(seq, prime, inverse=False):
"""Utility function for the Number Theoretic Transform"""
if not iterable(seq):
raise TypeError("Expected a sequence of integer coefficients "
"for Number Theoretic Transform")
p = as_int(prime)
if not isprime(p):
raise ValueError("Expected prime modulus for "
"Number Theoretic Transform")
a = [as_int(x) % p for x in seq]
n = len(a)
if n < 1:
return a
b = n.bit_length() - 1
if n&(n - 1):
b += 1
n = 2**b
if (p - 1) % n:
raise ValueError("Expected prime modulus of the form (m*2**k + 1)")
a += [0]*(n - len(a))
for i in range(1, n):
j = int(ibin(i, b, str=True)[::-1], 2)
if i < j:
a[i], a[j] = a[j], a[i]
pr = primitive_root(p)
rt = pow(pr, (p - 1) // n, p)
if inverse:
rt = pow(rt, p - 2, p)
w = [1]*(n // 2)
for i in range(1, n // 2):
w[i] = w[i - 1]*rt % p
h = 2
while h <= n:
hf, ut = h // 2, n // h
for i in range(0, n, h):
for j in range(hf):
u, v = a[i + j], a[i + j + hf]*w[ut * j]
a[i + j], a[i + j + hf] = (u + v) % p, (u - v) % p
h *= 2
if inverse:
rv = pow(n, p - 2, p)
a = [x*rv % p for x in a]
return a
def ntt(seq, prime):
r"""
Performs the Number Theoretic Transform (**NTT**), which specializes the
Discrete Fourier Transform (**DFT**) over quotient ring `Z/pZ` for prime
`p` instead of complex numbers `C`.
The sequence is automatically padded to the right with zeros, as the
*radix-2 NTT* requires the number of sample points to be a power of 2.
Parameters
==========
seq : iterable
The sequence on which **DFT** is to be applied.
prime : Integer
Prime modulus of the form `(m 2^k + 1)` to be used for performing
**NTT** on the sequence.
Examples
========
>>> from sympy import ntt, intt
>>> ntt([1, 2, 3, 4], prime=3*2**8 + 1)
[10, 643, 767, 122]
>>> intt(_, 3*2**8 + 1)
[1, 2, 3, 4]
>>> intt([1, 2, 3, 4], prime=3*2**8 + 1)
[387, 415, 384, 353]
>>> ntt(_, prime=3*2**8 + 1)
[1, 2, 3, 4]
References
==========
.. [1] http://www.apfloat.org/ntt.html
.. [2] http://mathworld.wolfram.com/NumberTheoreticTransform.html
.. [3] https://en.wikipedia.org/wiki/Discrete_Fourier_transform_(general%29
"""
return _number_theoretic_transform(seq, prime=prime)
def intt(seq, prime):
return _number_theoretic_transform(seq, prime=prime, inverse=True)
intt.__doc__ = ntt.__doc__
#----------------------------------------------------------------------------#
# #
# Walsh Hadamard Transform #
# #
#----------------------------------------------------------------------------#
def _walsh_hadamard_transform(seq, inverse=False):
"""Utility function for the Walsh Hadamard Transform"""
if not iterable(seq):
raise TypeError("Expected a sequence of coefficients "
"for Walsh Hadamard Transform")
a = [sympify(arg) for arg in seq]
n = len(a)
if n < 2:
return a
if n&(n - 1):
n = 2**n.bit_length()
a += [S.Zero]*(n - len(a))
h = 2
while h <= n:
hf = h // 2
for i in range(0, n, h):
for j in range(hf):
u, v = a[i + j], a[i + j + hf]
a[i + j], a[i + j + hf] = u + v, u - v
h *= 2
if inverse:
a = [x/n for x in a]
return a
def fwht(seq):
r"""
Performs the Walsh Hadamard Transform (**WHT**), and uses Hadamard
ordering for the sequence.
The sequence is automatically padded to the right with zeros, as the
*radix-2 FWHT* requires the number of sample points to be a power of 2.
Parameters
==========
seq : iterable
The sequence on which WHT is to be applied.
Examples
========
>>> from sympy import fwht, ifwht
>>> fwht([4, 2, 2, 0, 0, 2, -2, 0])
[8, 0, 8, 0, 8, 8, 0, 0]
>>> ifwht(_)
[4, 2, 2, 0, 0, 2, -2, 0]
>>> ifwht([19, -1, 11, -9, -7, 13, -15, 5])
[2, 0, 4, 0, 3, 10, 0, 0]
>>> fwht(_)
[19, -1, 11, -9, -7, 13, -15, 5]
References
==========
.. [1] https://en.wikipedia.org/wiki/Hadamard_transform
.. [2] https://en.wikipedia.org/wiki/Fast_Walsh%E2%80%93Hadamard_transform
"""
return _walsh_hadamard_transform(seq)
def ifwht(seq):
return _walsh_hadamard_transform(seq, inverse=True)
ifwht.__doc__ = fwht.__doc__
#----------------------------------------------------------------------------#
# #
# Mobius Transform for Subset Lattice #
# #
#----------------------------------------------------------------------------#
def _mobius_transform(seq, sgn, subset):
r"""Utility function for performing Mobius Transform using
Yate's Dynamic Programming method"""
if not iterable(seq):
raise TypeError("Expected a sequence of coefficients")
a = [sympify(arg) for arg in seq]
n = len(a)
if n < 2:
return a
if n&(n - 1):
n = 2**n.bit_length()
a += [S.Zero]*(n - len(a))
if subset:
i = 1
while i < n:
for j in range(n):
if j & i:
a[j] += sgn*a[j ^ i]
i *= 2
else:
i = 1
while i < n:
for j in range(n):
if j & i:
continue
a[j] += sgn*a[j ^ i]
i *= 2
return a
def mobius_transform(seq, subset=True):
r"""
Performs the Mobius Transform for subset lattice with indices of
sequence as bitmasks.
The indices of each argument, considered as bit strings, correspond
to subsets of a finite set.
The sequence is automatically padded to the right with zeros, as the
definition of subset/superset based on bitmasks (indices) requires
the size of sequence to be a power of 2.
Parameters
==========
seq : iterable
The sequence on which Mobius Transform is to be applied.
subset : bool
Specifies if Mobius Transform is applied by enumerating subsets
or supersets of the given set.
Examples
========
>>> from sympy import symbols
>>> from sympy import mobius_transform, inverse_mobius_transform
>>> x, y, z = symbols('x y z')
>>> mobius_transform([x, y, z])
[x, x + y, x + z, x + y + z]
>>> inverse_mobius_transform(_)
[x, y, z, 0]
>>> mobius_transform([x, y, z], subset=False)
[x + y + z, y, z, 0]
>>> inverse_mobius_transform(_, subset=False)
[x, y, z, 0]
>>> mobius_transform([1, 2, 3, 4])
[1, 3, 4, 10]
>>> inverse_mobius_transform(_)
[1, 2, 3, 4]
>>> mobius_transform([1, 2, 3, 4], subset=False)
[10, 6, 7, 4]
>>> inverse_mobius_transform(_, subset=False)
[1, 2, 3, 4]
References
==========
.. [1] https://en.wikipedia.org/wiki/M%C3%B6bius_inversion_formula
.. [2] https://people.csail.mit.edu/rrw/presentations/subset-conv.pdf
.. [3] https://arxiv.org/pdf/1211.0189.pdf
"""
return _mobius_transform(seq, sgn=+1, subset=subset)
def inverse_mobius_transform(seq, subset=True):
return _mobius_transform(seq, sgn=-1, subset=subset)
inverse_mobius_transform.__doc__ = mobius_transform.__doc__
|
5a9d363aa3e259589c9af3786b69a5313c6dc4c74b23f0e6bd6d85be858e8349 | """
Convolution (using **FFT**, **NTT**, **FWHT**), Subset Convolution,
Covering Product, Intersecting Product
"""
from __future__ import print_function, division
from sympy.core import S, sympify
from sympy.core.compatibility import as_int, iterable
from sympy.core.function import expand_mul
from sympy.discrete.transforms import (
fft, ifft, ntt, intt, fwht, ifwht,
mobius_transform, inverse_mobius_transform)
def convolution(a, b, cycle=0, dps=None, prime=None, dyadic=None, subset=None):
"""
Performs convolution by determining the type of desired
convolution using hints.
Exactly one of ``dps``, ``prime``, ``dyadic``, ``subset`` arguments
should be specified explicitly for identifying the type of convolution,
and the argument ``cycle`` can be specified optionally.
For the default arguments, linear convolution is performed using **FFT**.
Parameters
==========
a, b : iterables
The sequences for which convolution is performed.
cycle : Integer
Specifies the length for doing cyclic convolution.
dps : Integer
Specifies the number of decimal digits for precision for
performing **FFT** on the sequence.
prime : Integer
Prime modulus of the form `(m 2^k + 1)` to be used for
performing **NTT** on the sequence.
dyadic : bool
Identifies the convolution type as dyadic (*bitwise-XOR*)
convolution, which is performed using **FWHT**.
subset : bool
Identifies the convolution type as subset convolution.
Examples
========
>>> from sympy import convolution, symbols, S, I
>>> u, v, w, x, y, z = symbols('u v w x y z')
>>> convolution([1 + 2*I, 4 + 3*I], [S(5)/4, 6], dps=3)
[1.25 + 2.5*I, 11.0 + 15.8*I, 24.0 + 18.0*I]
>>> convolution([1, 2, 3], [4, 5, 6], cycle=3)
[31, 31, 28]
>>> convolution([111, 777], [888, 444], prime=19*2**10 + 1)
[1283, 19351, 14219]
>>> convolution([111, 777], [888, 444], prime=19*2**10 + 1, cycle=2)
[15502, 19351]
>>> convolution([u, v], [x, y, z], dyadic=True)
[u*x + v*y, u*y + v*x, u*z, v*z]
>>> convolution([u, v], [x, y, z], dyadic=True, cycle=2)
[u*x + u*z + v*y, u*y + v*x + v*z]
>>> convolution([u, v, w], [x, y, z], subset=True)
[u*x, u*y + v*x, u*z + w*x, v*z + w*y]
>>> convolution([u, v, w], [x, y, z], subset=True, cycle=3)
[u*x + v*z + w*y, u*y + v*x, u*z + w*x]
"""
c = as_int(cycle)
if c < 0:
raise ValueError("The length for cyclic convolution "
"must be non-negative")
dyadic = True if dyadic else None
subset = True if subset else None
if sum(x is not None for x in (prime, dps, dyadic, subset)) > 1:
raise TypeError("Ambiguity in determining the type of convolution")
if prime is not None:
ls = convolution_ntt(a, b, prime=prime)
return ls if not c else [sum(ls[i::c]) % prime for i in range(c)]
if dyadic:
ls = convolution_fwht(a, b)
elif subset:
ls = convolution_subset(a, b)
else:
ls = convolution_fft(a, b, dps=dps)
return ls if not c else [sum(ls[i::c]) for i in range(c)]
#----------------------------------------------------------------------------#
# #
# Convolution for Complex domain #
# #
#----------------------------------------------------------------------------#
def convolution_fft(a, b, dps=None):
"""
Performs linear convolution using Fast Fourier Transform.
Parameters
==========
a, b : iterables
The sequences for which convolution is performed.
dps : Integer
Specifies the number of decimal digits for precision.
Examples
========
>>> from sympy import S, I
>>> from sympy.discrete.convolutions import convolution_fft
>>> convolution_fft([2, 3], [4, 5])
[8, 22, 15]
>>> convolution_fft([2, 5], [6, 7, 3])
[12, 44, 41, 15]
>>> convolution_fft([1 + 2*I, 4 + 3*I], [S(5)/4, 6])
[5/4 + 5*I/2, 11 + 63*I/4, 24 + 18*I]
References
==========
.. [1] https://en.wikipedia.org/wiki/Convolution_theorem
.. [2] https://en.wikipedia.org/wiki/Discrete_Fourier_transform_(general%29
"""
a, b = a[:], b[:]
n = m = len(a) + len(b) - 1 # convolution size
if n > 0 and n&(n - 1): # not a power of 2
n = 2**n.bit_length()
# padding with zeros
a += [S.Zero]*(n - len(a))
b += [S.Zero]*(n - len(b))
a, b = fft(a, dps), fft(b, dps)
a = [expand_mul(x*y) for x, y in zip(a, b)]
a = ifft(a, dps)[:m]
return a
#----------------------------------------------------------------------------#
# #
# Convolution for GF(p) #
# #
#----------------------------------------------------------------------------#
def convolution_ntt(a, b, prime):
"""
Performs linear convolution using Number Theoretic Transform.
Parameters
==========
a, b : iterables
The sequences for which convolution is performed.
prime : Integer
Prime modulus of the form `(m 2^k + 1)` to be used for performing
**NTT** on the sequence.
Examples
========
>>> from sympy.discrete.convolutions import convolution_ntt
>>> convolution_ntt([2, 3], [4, 5], prime=19*2**10 + 1)
[8, 22, 15]
>>> convolution_ntt([2, 5], [6, 7, 3], prime=19*2**10 + 1)
[12, 44, 41, 15]
>>> convolution_ntt([333, 555], [222, 666], prime=19*2**10 + 1)
[15555, 14219, 19404]
References
==========
.. [1] https://en.wikipedia.org/wiki/Convolution_theorem
.. [2] https://en.wikipedia.org/wiki/Discrete_Fourier_transform_(general%29
"""
a, b, p = a[:], b[:], as_int(prime)
n = m = len(a) + len(b) - 1 # convolution size
if n > 0 and n&(n - 1): # not a power of 2
n = 2**n.bit_length()
# padding with zeros
a += [0]*(n - len(a))
b += [0]*(n - len(b))
a, b = ntt(a, p), ntt(b, p)
a = [x*y % p for x, y in zip(a, b)]
a = intt(a, p)[:m]
return a
#----------------------------------------------------------------------------#
# #
# Convolution for 2**n-group #
# #
#----------------------------------------------------------------------------#
def convolution_fwht(a, b):
"""
Performs dyadic (*bitwise-XOR*) convolution using Fast Walsh Hadamard
Transform.
The convolution is automatically padded to the right with zeros, as the
*radix-2 FWHT* requires the number of sample points to be a power of 2.
Parameters
==========
a, b : iterables
The sequences for which convolution is performed.
Examples
========
>>> from sympy import symbols, S, I
>>> from sympy.discrete.convolutions import convolution_fwht
>>> u, v, x, y = symbols('u v x y')
>>> convolution_fwht([u, v], [x, y])
[u*x + v*y, u*y + v*x]
>>> convolution_fwht([2, 3], [4, 5])
[23, 22]
>>> convolution_fwht([2, 5 + 4*I, 7], [6*I, 7, 3 + 4*I])
[56 + 68*I, -10 + 30*I, 6 + 50*I, 48 + 32*I]
>>> convolution_fwht([S(33)/7, S(55)/6, S(7)/4], [S(2)/3, 5])
[2057/42, 1870/63, 7/6, 35/4]
References
==========
.. [1] https://www.radioeng.cz/fulltexts/2002/02_03_40_42.pdf
.. [2] https://en.wikipedia.org/wiki/Hadamard_transform
"""
if not a or not b:
return []
a, b = a[:], b[:]
n = max(len(a), len(b))
if n&(n - 1): # not a power of 2
n = 2**n.bit_length()
# padding with zeros
a += [S.Zero]*(n - len(a))
b += [S.Zero]*(n - len(b))
a, b = fwht(a), fwht(b)
a = [expand_mul(x*y) for x, y in zip(a, b)]
a = ifwht(a)
return a
#----------------------------------------------------------------------------#
# #
# Subset Convolution #
# #
#----------------------------------------------------------------------------#
def convolution_subset(a, b):
"""
Performs Subset Convolution of given sequences.
The indices of each argument, considered as bit strings, correspond to
subsets of a finite set.
The sequence is automatically padded to the right with zeros, as the
definition of subset based on bitmasks (indices) requires the size of
sequence to be a power of 2.
Parameters
==========
a, b : iterables
The sequences for which convolution is performed.
Examples
========
>>> from sympy import symbols, S, I
>>> from sympy.discrete.convolutions import convolution_subset
>>> u, v, x, y, z = symbols('u v x y z')
>>> convolution_subset([u, v], [x, y])
[u*x, u*y + v*x]
>>> convolution_subset([u, v, x], [y, z])
[u*y, u*z + v*y, x*y, x*z]
>>> convolution_subset([1, S(2)/3], [3, 4])
[3, 6]
>>> convolution_subset([1, 3, S(5)/7], [7])
[7, 21, 5, 0]
References
==========
.. [1] https://people.csail.mit.edu/rrw/presentations/subset-conv.pdf
"""
if not a or not b:
return []
if not iterable(a) or not iterable(b):
raise TypeError("Expected a sequence of coefficients for convolution")
a = [sympify(arg) for arg in a]
b = [sympify(arg) for arg in b]
n = max(len(a), len(b))
if n&(n - 1): # not a power of 2
n = 2**n.bit_length()
# padding with zeros
a += [S.Zero]*(n - len(a))
b += [S.Zero]*(n - len(b))
c = [S.Zero]*n
for mask in range(n):
smask = mask
while smask > 0:
c[mask] += expand_mul(a[smask] * b[mask^smask])
smask = (smask - 1)&mask
c[mask] += expand_mul(a[smask] * b[mask^smask])
return c
#----------------------------------------------------------------------------#
# #
# Covering Product #
# #
#----------------------------------------------------------------------------#
def covering_product(a, b):
"""
Returns the covering product of given sequences.
The indices of each argument, considered as bit strings, correspond to
subsets of a finite set.
The covering product of given sequences is a sequence which contains
the sum of products of the elements of the given sequences grouped by
the *bitwise-OR* of the corresponding indices.
The sequence is automatically padded to the right with zeros, as the
definition of subset based on bitmasks (indices) requires the size of
sequence to be a power of 2.
Parameters
==========
a, b : iterables
The sequences for which covering product is to be obtained.
Examples
========
>>> from sympy import symbols, S, I, covering_product
>>> u, v, x, y, z = symbols('u v x y z')
>>> covering_product([u, v], [x, y])
[u*x, u*y + v*x + v*y]
>>> covering_product([u, v, x], [y, z])
[u*y, u*z + v*y + v*z, x*y, x*z]
>>> covering_product([1, S(2)/3], [3, 4 + 5*I])
[3, 26/3 + 25*I/3]
>>> covering_product([1, 3, S(5)/7], [7, 8])
[7, 53, 5, 40/7]
References
==========
.. [1] https://people.csail.mit.edu/rrw/presentations/subset-conv.pdf
"""
if not a or not b:
return []
a, b = a[:], b[:]
n = max(len(a), len(b))
if n&(n - 1): # not a power of 2
n = 2**n.bit_length()
# padding with zeros
a += [S.Zero]*(n - len(a))
b += [S.Zero]*(n - len(b))
a, b = mobius_transform(a), mobius_transform(b)
a = [expand_mul(x*y) for x, y in zip(a, b)]
a = inverse_mobius_transform(a)
return a
#----------------------------------------------------------------------------#
# #
# Intersecting Product #
# #
#----------------------------------------------------------------------------#
def intersecting_product(a, b):
"""
Returns the intersecting product of given sequences.
The indices of each argument, considered as bit strings, correspond to
subsets of a finite set.
The intersecting product of given sequences is the sequence which
contains the sum of products of the elements of the given sequences
grouped by the *bitwise-AND* of the corresponding indices.
The sequence is automatically padded to the right with zeros, as the
definition of subset based on bitmasks (indices) requires the size of
sequence to be a power of 2.
Parameters
==========
a, b : iterables
The sequences for which intersecting product is to be obtained.
Examples
========
>>> from sympy import symbols, S, I, intersecting_product
>>> u, v, x, y, z = symbols('u v x y z')
>>> intersecting_product([u, v], [x, y])
[u*x + u*y + v*x, v*y]
>>> intersecting_product([u, v, x], [y, z])
[u*y + u*z + v*y + x*y + x*z, v*z, 0, 0]
>>> intersecting_product([1, S(2)/3], [3, 4 + 5*I])
[9 + 5*I, 8/3 + 10*I/3]
>>> intersecting_product([1, 3, S(5)/7], [7, 8])
[327/7, 24, 0, 0]
References
==========
.. [1] https://people.csail.mit.edu/rrw/presentations/subset-conv.pdf
"""
if not a or not b:
return []
a, b = a[:], b[:]
n = max(len(a), len(b))
if n&(n - 1): # not a power of 2
n = 2**n.bit_length()
# padding with zeros
a += [S.Zero]*(n - len(a))
b += [S.Zero]*(n - len(b))
a, b = mobius_transform(a, subset=False), mobius_transform(b, subset=False)
a = [expand_mul(x*y) for x, y in zip(a, b)]
a = inverse_mobius_transform(a, subset=False)
return a
|
3930b34ebe50f23c6d5f30d1bebfdb1e7a8de6fa3b0dcdacf515de2fd48acaee | """
Recurrences
"""
from __future__ import print_function, division
from sympy.core import S, sympify
from sympy.core.compatibility import as_int, iterable
def linrec(coeffs, init, n):
r"""
Evaluation of univariate linear recurrences of homogeneous type
having coefficients independent of the recurrence variable.
Parameters
==========
coeffs : iterable
Coefficients of the recurrence
init : iterable
Initial values of the recurrence
n : Integer
Point of evaluation for the recurrence
Notes
=====
Let `y(n)` be the recurrence of given type, ``c`` be the sequence
of coefficients, ``b`` be the sequence of initial/base values of the
recurrence and ``k`` (equal to ``len(c)``) be the order of recurrence.
Then,
.. math :: y(n) = \begin{cases} b_n & 0 \le n < k \\
c_0 y(n-1) + c_1 y(n-2) + \cdots + c_{k-1} y(n-k) & n \ge k
\end{cases}
Let `x_0, x_1, \ldots, x_n` be a sequence and consider the transformation
that maps each polynomial `f(x)` to `T(f(x))` where each power `x^i` is
replaced by the corresponding value `x_i`. The sequence is then a solution
of the recurrence if and only if `T(x^i p(x)) = 0` for each `i \ge 0` where
`p(x) = x^k - c_0 x^(k-1) - \cdots - c_{k-1}` is the characteristic
polynomial.
Then `T(f(x)p(x)) = 0` for each polynomial `f(x)` (as it is a linear
combination of powers `x^i`). Now, if `x^n` is congruent to
`g(x) = a_0 x^0 + a_1 x^1 + \cdots + a_{k-1} x^{k-1}` modulo `p(x)`, then
`T(x^n) = x_n` is equal to
`T(g(x)) = a_0 x_0 + a_1 x_1 + \cdots + a_{k-1} x_{k-1}`.
Computation of `x^n`,
given `x^k = c_0 x^{k-1} + c_1 x^{k-2} + \cdots + c_{k-1}`
is performed using exponentiation by squaring (refer to [1]_) with
an additional reduction step performed to retain only first `k` powers
of `x` in the representation of `x^n`.
Examples
========
>>> from sympy.discrete.recurrences import linrec
>>> from sympy.abc import x, y, z
>>> linrec(coeffs=[1, 1], init=[0, 1], n=10)
55
>>> linrec(coeffs=[1, 1], init=[x, y], n=10)
34*x + 55*y
>>> linrec(coeffs=[x, y], init=[0, 1], n=5)
x**2*y + x*(x**3 + 2*x*y) + y**2
>>> linrec(coeffs=[1, 2, 3, 0, 0, 4], init=[x, y, z], n=16)
13576*x + 5676*y + 2356*z
References
==========
.. [1] https://en.wikipedia.org/wiki/Exponentiation_by_squaring
.. [2] https://en.wikipedia.org/w/index.php?title=Modular_exponentiation§ion=6#Matrices
See Also
========
sympy.polys.agca.extensions.ExtensionElement.__pow__
"""
if not coeffs:
return S.Zero
if not iterable(coeffs):
raise TypeError("Expected a sequence of coefficients for"
" the recurrence")
if not iterable(init):
raise TypeError("Expected a sequence of values for the initialization"
" of the recurrence")
n = as_int(n)
if n < 0:
raise ValueError("Point of evaluation of recurrence must be a "
"non-negative integer")
c = [sympify(arg) for arg in coeffs]
b = [sympify(arg) for arg in init]
k = len(c)
if len(b) > k:
raise TypeError("Count of initial values should not exceed the "
"order of the recurrence")
else:
b += [S.Zero]*(k - len(b)) # remaining initial values default to zero
if n < k:
return b[n]
terms = [u*v for u, v in zip(linrec_coeffs(c, n), b)]
return sum(terms[:-1], terms[-1])
def linrec_coeffs(c, n):
r"""
Compute the coefficients of n'th term in linear recursion
sequence defined by c.
`x^k = c_0 x^{k-1} + c_1 x^{k-2} + \cdots + c_{k-1}`.
It computes the coefficients by using binary exponentiation.
This function is used by `linrec` and `_eval_pow_by_cayley`.
Parameters
==========
c = coefficients of the divisor polynomial
n = exponent of x, so dividend is x^n
"""
k = len(c)
def _square_and_reduce(u, offset):
# squares `(u_0 + u_1 x + u_2 x^2 + \cdots + u_{k-1} x^k)` (and
# multiplies by `x` if offset is 1) and reduces the above result of
# length upto `2k` to `k` using the characteristic equation of the
# recurrence given by, `x^k = c_0 x^{k-1} + c_1 x^{k-2} + \cdots + c_{k-1}`
w = [S.Zero]*(2*len(u) - 1 + offset)
for i, p in enumerate(u):
for j, q in enumerate(u):
w[offset + i + j] += p*q
for j in range(len(w) - 1, k - 1, -1):
for i in range(k):
w[j - i - 1] += w[j]*c[i]
return w[:k]
def _final_coeffs(n):
# computes the final coefficient list - `cf` corresponding to the
# point at which recurrence is to be evalauted - `n`, such that,
# `y(n) = cf_0 y(k-1) + cf_1 y(k-2) + \cdots + cf_{k-1} y(0)`
if n < k:
return [S.Zero]*n + [S.One] + [S.Zero]*(k - n - 1)
else:
return _square_and_reduce(_final_coeffs(n // 2), n % 2)
return _final_coeffs(n)
|
1433b87b19886d819be75f18dc4436bab4bd5f7b8d3f1d8464371af9da75d997 | from .cartan_type import Standard_Cartan
from sympy.core.backend import eye
class TypeC(Standard_Cartan):
def __new__(cls, n):
if n < 3:
raise ValueError("n can not be less than 3")
return Standard_Cartan.__new__(cls, "C", n)
def dimension(self):
"""Dimension of the vector space V underlying the Lie algebra
Examples
========
>>> from sympy.liealgebras.cartan_type import CartanType
>>> c = CartanType("C3")
>>> c.dimension()
3
"""
n = self.n
return n
def basic_root(self, i, j):
"""Generate roots with 1 in ith position and a -1 in jth position
"""
n = self.n
root = [0]*n
root[i] = 1
root[j] = -1
return root
def simple_root(self, i):
"""The ith simple root for the C series
Every lie algebra has a unique root system.
Given a root system Q, there is a subset of the
roots such that an element of Q is called a
simple root if it cannot be written as the sum
of two elements in Q. If we let D denote the
set of simple roots, then it is clear that every
element of Q can be written as a linear combination
of elements of D with all coefficients non-negative.
In C_n, the first n-1 simple roots are the same as
the roots in A_(n-1) (a 1 in the ith position, a -1
in the (i+1)th position, and zeroes elsewhere). The
nth simple root is the root in which there is a 2 in
the nth position and zeroes elsewhere.
Examples
========
>>> from sympy.liealgebras.cartan_type import CartanType
>>> c = CartanType("C3")
>>> c.simple_root(2)
[0, 1, -1]
"""
n = self.n
if i < n:
return self.basic_root(i-1,i)
else:
root = [0]*self.n
root[n-1] = 2
return root
def positive_roots(self):
"""Generates all the positive roots of A_n
This is half of all of the roots of C_n; by multiplying all the
positive roots by -1 we get the negative roots.
Examples
========
>>> from sympy.liealgebras.cartan_type import CartanType
>>> c = CartanType("A3")
>>> c.positive_roots()
{1: [1, -1, 0, 0], 2: [1, 0, -1, 0], 3: [1, 0, 0, -1], 4: [0, 1, -1, 0],
5: [0, 1, 0, -1], 6: [0, 0, 1, -1]}
"""
n = self.n
posroots = {}
k = 0
for i in range(0, n-1):
for j in range(i+1, n):
k += 1
posroots[k] = self.basic_root(i, j)
k += 1
root = self.basic_root(i, j)
root[j] = 1
posroots[k] = root
for i in range(0, n):
k += 1
root = [0]*n
root[i] = 2
posroots[k] = root
return posroots
def roots(self):
"""
Returns the total number of roots for C_n"
"""
n = self.n
return 2*(n**2)
def cartan_matrix(self):
"""The Cartan matrix for C_n
The Cartan matrix matrix for a Lie algebra is
generated by assigning an ordering to the simple
roots, (alpha[1], ...., alpha[l]). Then the ijth
entry of the Cartan matrix is (<alpha[i],alpha[j]>).
Examples
========
>>> from sympy.liealgebras.cartan_type import CartanType
>>> c = CartanType('C4')
>>> c.cartan_matrix()
Matrix([
[ 2, -1, 0, 0],
[-1, 2, -1, 0],
[ 0, -1, 2, -1],
[ 0, 0, -2, 2]])
"""
n = self.n
m = 2 * eye(n)
i = 1
while i < n-1:
m[i, i+1] = -1
m[i, i-1] = -1
i += 1
m[0,1] = -1
m[n-1, n-2] = -2
return m
def basis(self):
"""
Returns the number of independent generators of C_n
"""
n = self.n
return n*(2*n + 1)
def lie_algebra(self):
"""
Returns the Lie algebra associated with C_n"
"""
n = self.n
return "sp(" + str(2*n) + ")"
def dynkin_diagram(self):
n = self.n
diag = "---".join("0" for i in range(1, n)) + "=<=0\n"
diag += " ".join(str(i) for i in range(1, n+1))
return diag
|
3114e5f3ac79c8b49c4f57c8756afb835286bf3d027d8b74609da94f2759106d | from .cartan_type import Standard_Cartan
from sympy.core.backend import eye, Rational
class TypeE(Standard_Cartan):
def __new__(cls, n):
if n < 6 or n > 8:
raise ValueError("Invalid value of n")
return Standard_Cartan.__new__(cls, "E", n)
def dimension(self):
"""Dimension of the vector space V underlying the Lie algebra
Examples
========
>>> from sympy.liealgebras.cartan_type import CartanType
>>> c = CartanType("E6")
>>> c.dimension()
8
"""
return 8
def basic_root(self, i, j):
"""
This is a method just to generate roots
with a -1 in the ith position and a 1
in the jth position.
"""
root = [0]*8
root[i] = -1
root[j] = 1
return root
def simple_root(self, i):
"""
Every lie algebra has a unique root system.
Given a root system Q, there is a subset of the
roots such that an element of Q is called a
simple root if it cannot be written as the sum
of two elements in Q. If we let D denote the
set of simple roots, then it is clear that every
element of Q can be written as a linear combination
of elements of D with all coefficients non-negative.
This method returns the ith simple root for E_n.
Examples
========
>>> from sympy.liealgebras.cartan_type import CartanType
>>> c = CartanType("E6")
>>> c.simple_root(2)
[1, 1, 0, 0, 0, 0, 0, 0]
"""
n = self.n
if i == 1:
root = [-0.5]*8
root[0] = 0.5
root[7] = 0.5
return root
elif i == 2:
root = [0]*8
root[1] = 1
root[0] = 1
return root
else:
if i == 7 or i == 8 and n == 6:
raise ValueError("E6 only has six simple roots!")
if i == 8 and n == 7:
raise ValueError("E7 has only 7 simple roots!")
return self.basic_root(i-3, i-2)
def positive_roots(self):
"""
This method generates all the positive roots of
A_n. This is half of all of the roots of E_n;
by multiplying all the positive roots by -1 we
get the negative roots.
Examples
========
>>> from sympy.liealgebras.cartan_type import CartanType
>>> c = CartanType("A3")
>>> c.positive_roots()
{1: [1, -1, 0, 0], 2: [1, 0, -1, 0], 3: [1, 0, 0, -1], 4: [0, 1, -1, 0],
5: [0, 1, 0, -1], 6: [0, 0, 1, -1]}
"""
n = self.n
if n == 6:
posroots = {}
k = 0
for i in range(n-1):
for j in range(i+1, n-1):
k += 1
root = self.basic_root(i, j)
posroots[k] = root
k += 1
root = self.basic_root(i, j)
root[i] = 1
posroots[k] = root
root = [Rational(1, 2), Rational(1, 2), Rational(1, 2), Rational(1, 2), Rational(1, 2),
Rational(-1, 2), Rational(-1, 2), Rational(1, 2)]
for a in range(0, 2):
for b in range(0, 2):
for c in range(0, 2):
for d in range(0, 2):
for e in range(0, 2):
if (a + b + c + d + e)%2 == 0:
k += 1
if a == 1:
root[0] = Rational(-1, 2)
if b == 1:
root[1] = Rational(-1, 2)
if c == 1:
root[2] = Rational(-1, 2)
if d == 1:
root[3] = Rational(-1, 2)
if e == 1:
root[4] = Rational(-1, 2)
posroots[k] = root
return posroots
if n == 7:
posroots = {}
k = 0
for i in range(n-1):
for j in range(i+1, n-1):
k += 1
root = self.basic_root(i, j)
posroots[k] = root
k += 1
root = self.basic_root(i, j)
root[i] = 1
posroots[k] = root
k += 1
posroots[k] = [0, 0, 0, 0, 0, 1, 1, 0]
root = [Rational(1, 2), Rational(1, 2), Rational(1, 2), Rational(1, 2), Rational(1, 2),
Rational(-1, 2), Rational(-1, 2), Rational(1, 2)]
for a in range(0, 2):
for b in range(0, 2):
for c in range(0, 2):
for d in range(0, 2):
for e in range(0, 2):
for f in range(0, 2):
if (a + b + c + d + e + f)%2 == 0:
k += 1
if a == 1:
root[0] = Rational(-1, 2)
if b == 1:
root[1] = Rational(-1, 2)
if c == 1:
root[2] = Rational(-1, 2)
if d == 1:
root[3] = Rational(-1, 2)
if e == 1:
root[4] = Rational(-1, 2)
if f == 1:
root[5] = Rational(1, 2)
posroots[k] = root
return posroots
if n == 8:
posroots = {}
k = 0
for i in range(n):
for j in range(i+1, n):
k += 1
root = self.basic_root(i, j)
posroots[k] = root
k += 1
root = self.basic_root(i, j)
root[i] = 1
posroots[k] = root
root = [Rational(1, 2), Rational(1, 2), Rational(1, 2), Rational(1, 2), Rational(1, 2),
Rational(-1, 2), Rational(-1, 2), Rational(1, 2)]
for a in range(0, 2):
for b in range(0, 2):
for c in range(0, 2):
for d in range(0, 2):
for e in range(0, 2):
for f in range(0, 2):
for g in range(0, 2):
if (a + b + c + d + e + f + g)%2 == 0:
k += 1
if a == 1:
root[0] = Rational(-1, 2)
if b == 1:
root[1] = Rational(-1, 2)
if c == 1:
root[2] = Rational(-1, 2)
if d == 1:
root[3] = Rational(-1, 2)
if e == 1:
root[4] = Rational(-1, 2)
if f == 1:
root[5] = Rational(1, 2)
if g == 1:
root[6] = Rational(1, 2)
posroots[k] = root
return posroots
def roots(self):
"""
Returns the total number of roots of E_n
"""
n = self.n
if n == 6:
return 72
if n == 7:
return 126
if n == 8:
return 240
def cartan_matrix(self):
"""
Returns the Cartan matrix for G_2
The Cartan matrix matrix for a Lie algebra is
generated by assigning an ordering to the simple
roots, (alpha[1], ...., alpha[l]). Then the ijth
entry of the Cartan matrix is (<alpha[i],alpha[j]>).
Examples
========
>>> from sympy.liealgebras.cartan_type import CartanType
>>> c = CartanType('A4')
>>> c.cartan_matrix()
Matrix([
[ 2, -1, 0, 0],
[-1, 2, -1, 0],
[ 0, -1, 2, -1],
[ 0, 0, -1, 2]])
"""
n = self.n
m = 2*eye(n)
i = 3
while i < n-1:
m[i, i+1] = -1
m[i, i-1] = -1
i += 1
m[0, 2] = m[2, 0] = -1
m[1, 3] = m[3, 1] = -1
m[2, 3] = -1
m[n-1, n-2] = -1
return m
def basis(self):
"""
Returns the number of independent generators of E_n
"""
n = self.n
if n == 6:
return 78
if n == 7:
return 133
if n == 8:
return 248
def dynkin_diagram(self):
n = self.n
diag = " "*8 + str(2) + "\n"
diag += " "*8 + "0\n"
diag += " "*8 + "|\n"
diag += " "*8 + "|\n"
diag += "---".join("0" for i in range(1, n)) + "\n"
diag += "1 " + " ".join(str(i) for i in range(3, n+1))
return diag
|
6e828384ec51700583047b04624e23d78bd4bd3d263b752446ae90ceaa0f39eb | from .cartan_type import Standard_Cartan
from sympy.core.backend import Matrix, Rational
class TypeF(Standard_Cartan):
def __new__(cls, n):
if n != 4:
raise ValueError("n should be 4")
return Standard_Cartan.__new__(cls, "F", 4)
def dimension(self):
"""Dimension of the vector space V underlying the Lie algebra
Examples
========
>>> from sympy.liealgebras.cartan_type import CartanType
>>> c = CartanType("F4")
>>> c.dimension()
4
"""
return 4
def basic_root(self, i, j):
"""Generate roots with 1 in ith position and -1 in jth position
"""
n = self.n
root = [0]*n
root[i] = 1
root[j] = -1
return root
def simple_root(self, i):
"""The ith simple root of F_4
Every lie algebra has a unique root system.
Given a root system Q, there is a subset of the
roots such that an element of Q is called a
simple root if it cannot be written as the sum
of two elements in Q. If we let D denote the
set of simple roots, then it is clear that every
element of Q can be written as a linear combination
of elements of D with all coefficients non-negative.
Examples
========
>>> from sympy.liealgebras.cartan_type import CartanType
>>> c = CartanType("F4")
>>> c.simple_root(3)
[0, 0, 0, 1]
"""
if i < 3:
return self.basic_root(i-1, i)
if i == 3:
root = [0]*4
root[3] = 1
return root
if i == 4:
root = [Rational(-1, 2)]*4
return root
def positive_roots(self):
"""Generate all the positive roots of A_n
This is half of all of the roots of F_4; by multiplying all the
positive roots by -1 we get the negative roots.
Examples
========
>>> from sympy.liealgebras.cartan_type import CartanType
>>> c = CartanType("A3")
>>> c.positive_roots()
{1: [1, -1, 0, 0], 2: [1, 0, -1, 0], 3: [1, 0, 0, -1], 4: [0, 1, -1, 0],
5: [0, 1, 0, -1], 6: [0, 0, 1, -1]}
"""
n = self.n
posroots = {}
k = 0
for i in range(0, n-1):
for j in range(i+1, n):
k += 1
posroots[k] = self.basic_root(i, j)
k += 1
root = self.basic_root(i, j)
root[j] = 1
posroots[k] = root
for i in range(0, n):
k += 1
root = [0]*n
root[i] = 1
posroots[k] = root
k += 1
root = [Rational(1, 2)]*n
posroots[k] = root
for i in range(1, 4):
k += 1
root = [Rational(1, 2)]*n
root[i] = Rational(-1, 2)
posroots[k] = root
posroots[k+1] = [Rational(1, 2), Rational(1, 2), Rational(-1, 2), Rational(-1, 2)]
posroots[k+2] = [Rational(1, 2), Rational(-1, 2), Rational(1, 2), Rational(-1, 2)]
posroots[k+3] = [Rational(1, 2), Rational(-1, 2), Rational(-1, 2), Rational(1, 2)]
posroots[k+4] = [Rational(1, 2), Rational(-1, 2), Rational(-1, 2), Rational(-1, 2)]
return posroots
def roots(self):
"""
Returns the total number of roots for F_4
"""
return 48
def cartan_matrix(self):
"""The Cartan matrix for F_4
The Cartan matrix matrix for a Lie algebra is
generated by assigning an ordering to the simple
roots, (alpha[1], ...., alpha[l]). Then the ijth
entry of the Cartan matrix is (<alpha[i],alpha[j]>).
Examples
========
>>> from sympy.liealgebras.cartan_type import CartanType
>>> c = CartanType('A4')
>>> c.cartan_matrix()
Matrix([
[ 2, -1, 0, 0],
[-1, 2, -1, 0],
[ 0, -1, 2, -1],
[ 0, 0, -1, 2]])
"""
m = Matrix( 4, 4, [2, -1, 0, 0, -1, 2, -2, 0, 0,
-1, 2, -1, 0, 0, -1, 2])
return m
def basis(self):
"""
Returns the number of independent generators of F_4
"""
return 52
def dynkin_diagram(self):
diag = "0---0=>=0---0\n"
diag += " ".join(str(i) for i in range(1, 5))
return diag
|
d7b2536bfe4101795af215715e573abc617f6abb6c13045a69ff61a9fab1bc23 | from __future__ import print_function, division
from .cartan_type import Standard_Cartan
from sympy.core.backend import eye
class TypeB(Standard_Cartan):
def __new__(cls, n):
if n < 2:
raise ValueError("n can not be less than 2")
return Standard_Cartan.__new__(cls, "B", n)
def dimension(self):
"""Dimension of the vector space V underlying the Lie algebra
Examples
========
>>> from sympy.liealgebras.cartan_type import CartanType
>>> c = CartanType("B3")
>>> c.dimension()
3
"""
return self.n
def basic_root(self, i, j):
"""
This is a method just to generate roots
with a 1 iin the ith position and a -1
in the jth position.
"""
root = [0]*self.n
root[i] = 1
root[j] = -1
return root
def simple_root(self, i):
"""
Every lie algebra has a unique root system.
Given a root system Q, there is a subset of the
roots such that an element of Q is called a
simple root if it cannot be written as the sum
of two elements in Q. If we let D denote the
set of simple roots, then it is clear that every
element of Q can be written as a linear combination
of elements of D with all coefficients non-negative.
In B_n the first n-1 simple roots are the same as the
roots in A_(n-1) (a 1 in the ith position, a -1 in
the (i+1)th position, and zeroes elsewhere). The n-th
simple root is the root with a 1 in the nth position
and zeroes elsewhere.
This method returns the ith simple root for the B series.
Examples
========
>>> from sympy.liealgebras.cartan_type import CartanType
>>> c = CartanType("B3")
>>> c.simple_root(2)
[0, 1, -1]
"""
n = self.n
if i < n:
return self.basic_root(i-1, i)
else:
root = [0]*self.n
root[n-1] = 1
return root
def positive_roots(self):
"""
This method generates all the positive roots of
A_n. This is half of all of the roots of B_n;
by multiplying all the positive roots by -1 we
get the negative roots.
Examples
========
>>> from sympy.liealgebras.cartan_type import CartanType
>>> c = CartanType("A3")
>>> c.positive_roots()
{1: [1, -1, 0, 0], 2: [1, 0, -1, 0], 3: [1, 0, 0, -1], 4: [0, 1, -1, 0],
5: [0, 1, 0, -1], 6: [0, 0, 1, -1]}
"""
n = self.n
posroots = {}
k = 0
for i in range(0, n-1):
for j in range(i+1, n):
k += 1
posroots[k] = self.basic_root(i, j)
k += 1
root = self.basic_root(i, j)
root[j] = 1
posroots[k] = root
for i in range(0, n):
k += 1
root = [0]*n
root[i] = 1
posroots[k] = root
return posroots
def roots(self):
"""
Returns the total number of roots for B_n"
"""
n = self.n
return 2*(n**2)
def cartan_matrix(self):
"""
Returns the Cartan matrix for B_n.
The Cartan matrix matrix for a Lie algebra is
generated by assigning an ordering to the simple
roots, (alpha[1], ...., alpha[l]). Then the ijth
entry of the Cartan matrix is (<alpha[i],alpha[j]>).
Examples
========
>>> from sympy.liealgebras.cartan_type import CartanType
>>> c = CartanType('B4')
>>> c.cartan_matrix()
Matrix([
[ 2, -1, 0, 0],
[-1, 2, -1, 0],
[ 0, -1, 2, -2],
[ 0, 0, -1, 2]])
"""
n = self.n
m = 2* eye(n)
i = 1
while i < n-1:
m[i, i+1] = -1
m[i, i-1] = -1
i += 1
m[0, 1] = -1
m[n-2, n-1] = -2
m[n-1, n-2] = -1
return m
def basis(self):
"""
Returns the number of independent generators of B_n
"""
n = self.n
return (n**2 - n)/2
def lie_algebra(self):
"""
Returns the Lie algebra associated with B_n
"""
n = self.n
return "so(" + str(2*n) + ")"
def dynkin_diagram(self):
n = self.n
diag = "---".join("0" for i in range(1, n)) + "=>=0\n"
diag += " ".join(str(i) for i in range(1, n+1))
return diag
|
841d1891b9e225962d337a575e0654f3a199fa9bdd2a24532eb4f65d3dd458b8 | from __future__ import print_function, division
from sympy.liealgebras.cartan_type import Standard_Cartan
from sympy.core.backend import eye
class TypeA(Standard_Cartan):
"""
This class contains the information about
the A series of simple Lie algebras.
====
"""
def __new__(cls, n):
if n < 1:
raise ValueError("n can not be less than 1")
return Standard_Cartan.__new__(cls, "A", n)
def dimension(self):
"""Dimension of the vector space V underlying the Lie algebra
Examples
========
>>> from sympy.liealgebras.cartan_type import CartanType
>>> c = CartanType("A4")
>>> c.dimension()
5
"""
return self.n+1
def basic_root(self, i, j):
"""
This is a method just to generate roots
with a 1 iin the ith position and a -1
in the jth position.
"""
n = self.n
root = [0]*(n+1)
root[i] = 1
root[j] = -1
return root
def simple_root(self, i):
"""
Every lie algebra has a unique root system.
Given a root system Q, there is a subset of the
roots such that an element of Q is called a
simple root if it cannot be written as the sum
of two elements in Q. If we let D denote the
set of simple roots, then it is clear that every
element of Q can be written as a linear combination
of elements of D with all coefficients non-negative.
In A_n the ith simple root is the root which has a 1
in the ith position, a -1 in the (i+1)th position,
and zeroes elsewhere.
This method returns the ith simple root for the A series.
Examples
========
>>> from sympy.liealgebras.cartan_type import CartanType
>>> c = CartanType("A4")
>>> c.simple_root(1)
[1, -1, 0, 0, 0]
"""
return self.basic_root(i-1, i)
def positive_roots(self):
"""
This method generates all the positive roots of
A_n. This is half of all of the roots of A_n;
by multiplying all the positive roots by -1 we
get the negative roots.
Examples
========
>>> from sympy.liealgebras.cartan_type import CartanType
>>> c = CartanType("A3")
>>> c.positive_roots()
{1: [1, -1, 0, 0], 2: [1, 0, -1, 0], 3: [1, 0, 0, -1], 4: [0, 1, -1, 0],
5: [0, 1, 0, -1], 6: [0, 0, 1, -1]}
"""
n = self.n
posroots = {}
k = 0
for i in range(0, n):
for j in range(i+1, n+1):
k += 1
posroots[k] = self.basic_root(i, j)
return posroots
def highest_root(self):
"""
Returns the highest weight root for A_n
"""
return self.basic_root(0, self.n)
def roots(self):
"""
Returns the total number of roots for A_n
"""
n = self.n
return n*(n+1)
def cartan_matrix(self):
"""
Returns the Cartan matrix for A_n.
The Cartan matrix matrix for a Lie algebra is
generated by assigning an ordering to the simple
roots, (alpha[1], ...., alpha[l]). Then the ijth
entry of the Cartan matrix is (<alpha[i],alpha[j]>).
Examples
========
>>> from sympy.liealgebras.cartan_type import CartanType
>>> c = CartanType('A4')
>>> c.cartan_matrix()
Matrix([
[ 2, -1, 0, 0],
[-1, 2, -1, 0],
[ 0, -1, 2, -1],
[ 0, 0, -1, 2]])
"""
n = self.n
m = 2 * eye(n)
i = 1
while i < n-1:
m[i, i+1] = -1
m[i, i-1] = -1
i += 1
m[0,1] = -1
m[n-1, n-2] = -1
return m
def basis(self):
"""
Returns the number of independent generators of A_n
"""
n = self.n
return n**2 - 1
def lie_algebra(self):
"""
Returns the Lie algebra associated with A_n
"""
n = self.n
return "su(" + str(n + 1) + ")"
def dynkin_diagram(self):
n = self.n
diag = "---".join("0" for i in range(1, n+1)) + "\n"
diag += " ".join(str(i) for i in range(1, n+1))
return diag
|
46087b2a92391509c36a2e8a55fa33fd344461a2b1aaf20d0d7bba65dbbeec44 | from .cartan_type import Standard_Cartan
from sympy.core.backend import eye
class TypeD(Standard_Cartan):
def __new__(cls, n):
if n < 3:
raise ValueError("n cannot be less than 3")
return Standard_Cartan.__new__(cls, "D", n)
def dimension(self):
"""Dmension of the vector space V underlying the Lie algebra
Examples
========
>>> from sympy.liealgebras.cartan_type import CartanType
>>> c = CartanType("D4")
>>> c.dimension()
4
"""
return self.n
def basic_root(self, i, j):
"""
This is a method just to generate roots
with a 1 iin the ith position and a -1
in the jth position.
"""
n = self.n
root = [0]*n
root[i] = 1
root[j] = -1
return root
def simple_root(self, i):
"""
Every lie algebra has a unique root system.
Given a root system Q, there is a subset of the
roots such that an element of Q is called a
simple root if it cannot be written as the sum
of two elements in Q. If we let D denote the
set of simple roots, then it is clear that every
element of Q can be written as a linear combination
of elements of D with all coefficients non-negative.
In D_n, the first n-1 simple roots are the same as
the roots in A_(n-1) (a 1 in the ith position, a -1
in the (i+1)th position, and zeroes elsewhere).
The nth simple root is the root in which there 1s in
the nth and (n-1)th positions, and zeroes elsewhere.
This method returns the ith simple root for the D series.
Examples
========
>>> from sympy.liealgebras.cartan_type import CartanType
>>> c = CartanType("D4")
>>> c.simple_root(2)
[0, 1, -1, 0]
"""
n = self.n
if i < n:
return self.basic_root(i-1, i)
else:
root = [0]*n
root[n-2] = 1
root[n-1] = 1
return root
def positive_roots(self):
"""
This method generates all the positive roots of
A_n. This is half of all of the roots of D_n
by multiplying all the positive roots by -1 we
get the negative roots.
Examples
========
>>> from sympy.liealgebras.cartan_type import CartanType
>>> c = CartanType("A3")
>>> c.positive_roots()
{1: [1, -1, 0, 0], 2: [1, 0, -1, 0], 3: [1, 0, 0, -1], 4: [0, 1, -1, 0],
5: [0, 1, 0, -1], 6: [0, 0, 1, -1]}
"""
n = self.n
posroots = {}
k = 0
for i in range(0, n-1):
for j in range(i+1, n):
k += 1
posroots[k] = self.basic_root(i, j)
k += 1
root = self.basic_root(i, j)
root[j] = 1
posroots[k] = root
return posroots
def roots(self):
"""
Returns the total number of roots for D_n"
"""
n = self.n
return 2*n*(n-1)
def cartan_matrix(self):
"""
Returns the Cartan matrix for D_n.
The Cartan matrix matrix for a Lie algebra is
generated by assigning an ordering to the simple
roots, (alpha[1], ...., alpha[l]). Then the ijth
entry of the Cartan matrix is (<alpha[i],alpha[j]>).
Examples
========
>>> from sympy.liealgebras.cartan_type import CartanType
>>> c = CartanType('D4')
>>> c.cartan_matrix()
Matrix([
[ 2, -1, 0, 0],
[-1, 2, -1, -1],
[ 0, -1, 2, 0],
[ 0, -1, 0, 2]])
"""
n = self.n
m = 2*eye(n)
i = 1
while i < n-2:
m[i,i+1] = -1
m[i,i-1] = -1
i += 1
m[n-2, n-3] = -1
m[n-3, n-1] = -1
m[n-1, n-3] = -1
m[0, 1] = -1
return m
def basis(self):
"""
Returns the number of independent generators of D_n
"""
n = self.n
return n*(n-1)/2
def lie_algebra(self):
"""
Returns the Lie algebra associated with D_n"
"""
n = self.n
return "so(" + str(2*n) + ")"
def dynkin_diagram(self):
n = self.n
diag = " "*4*(n-3) + str(n-1) + "\n"
diag += " "*4*(n-3) + "0\n"
diag += " "*4*(n-3) +"|\n"
diag += " "*4*(n-3) + "|\n"
diag += "---".join("0" for i in range(1,n)) + "\n"
diag += " ".join(str(i) for i in range(1, n-1)) + " "+str(n)
return diag
|
6874b34f8ceb69b85c77284f1cb003f0f5ea535b87fca0579e109c60a0a13a32 | from .cartan_type import CartanType
from sympy.core.backend import Basic
class RootSystem(Basic):
"""Represent the root system of a simple Lie algebra
Every simple Lie algebra has a unique root system. To find the root
system, we first consider the Cartan subalgebra of g, which is the maximal
abelian subalgebra, and consider the adjoint action of g on this
subalgebra. There is a root system associated with this action. Now, a
root system over a vector space V is a set of finite vectors Phi (called
roots), which satisfy:
1. The roots span V
2. The only scalar multiples of x in Phi are x and -x
3. For every x in Phi, the set Phi is closed under reflection
through the hyperplane perpendicular to x.
4. If x and y are roots in Phi, then the projection of y onto
the line through x is a half-integral multiple of x.
Now, there is a subset of Phi, which we will call Delta, such that:
1. Delta is a basis of V
2. Each root x in Phi can be written x = sum k_y y for y in Delta
The elements of Delta are called the simple roots.
Therefore, we see that the simple roots span the root space of a given
simple Lie algebra.
References: https://en.wikipedia.org/wiki/Root_system
Lie Algebras and Representation Theory - Humphreys
"""
def __new__(cls, cartantype):
"""Create a new RootSystem object
This method assigns an attribute called cartan_type to each instance of
a RootSystem object. When an instance of RootSystem is called, it
needs an argument, which should be an instance of a simple Lie algebra.
We then take the CartanType of this argument and set it as the
cartan_type attribute of the RootSystem instance.
"""
obj = Basic.__new__(cls, cartantype)
obj.cartan_type = CartanType(cartantype)
return obj
def simple_roots(self):
"""Generate the simple roots of the Lie algebra
The rank of the Lie algebra determines the number of simple roots that
it has. This method obtains the rank of the Lie algebra, and then uses
the simple_root method from the Lie algebra classes to generate all the
simple roots.
Examples
========
>>> from sympy.liealgebras.root_system import RootSystem
>>> c = RootSystem("A3")
>>> roots = c.simple_roots()
>>> roots
{1: [1, -1, 0, 0], 2: [0, 1, -1, 0], 3: [0, 0, 1, -1]}
"""
n = self.cartan_type.rank()
roots = {}
for i in range(1, n+1):
root = self.cartan_type.simple_root(i)
roots[i] = root
return roots
def all_roots(self):
"""Generate all the roots of a given root system
The result is a dictionary where the keys are integer numbers. It
generates the roots by getting the dictionary of all positive roots
from the bases classes, and then taking each root, and multiplying it
by -1 and adding it to the dictionary. In this way all the negative
roots are generated.
"""
alpha = self.cartan_type.positive_roots()
keys = list(alpha.keys())
k = max(keys)
for val in keys:
k += 1
root = alpha[val]
newroot = [-x for x in root]
alpha[k] = newroot
return alpha
def root_space(self):
"""Return the span of the simple roots
The root space is the vector space spanned by the simple roots, i.e. it
is a vector space with a distinguished basis, the simple roots. This
method returns a string that represents the root space as the span of
the simple roots, alpha[1],...., alpha[n].
Examples
========
>>> from sympy.liealgebras.root_system import RootSystem
>>> c = RootSystem("A3")
>>> c.root_space()
'alpha[1] + alpha[2] + alpha[3]'
"""
n = self.cartan_type.rank()
rs = " + ".join("alpha["+str(i) +"]" for i in range(1, n+1))
return rs
def add_simple_roots(self, root1, root2):
"""Add two simple roots together
The function takes as input two integers, root1 and root2. It then
uses these integers as keys in the dictionary of simple roots, and gets
the corresponding simple roots, and then adds them together.
Examples
========
>>> from sympy.liealgebras.root_system import RootSystem
>>> c = RootSystem("A3")
>>> newroot = c.add_simple_roots(1, 2)
>>> newroot
[1, 0, -1, 0]
"""
alpha = self.simple_roots()
if root1 > len(alpha) or root2 > len(alpha):
raise ValueError("You've used a root that doesn't exist!")
a1 = alpha[root1]
a2 = alpha[root2]
newroot = []
length = len(a1)
for i in range(length):
newroot.append(a1[i] + a2[i])
return newroot
def add_as_roots(self, root1, root2):
"""Add two roots together if and only if their sum is also a root
It takes as input two vectors which should be roots. It then computes
their sum and checks if it is in the list of all possible roots. If it
is, it returns the sum. Otherwise it returns a string saying that the
sum is not a root.
Examples
========
>>> from sympy.liealgebras.root_system import RootSystem
>>> c = RootSystem("A3")
>>> c.add_as_roots([1, 0, -1, 0], [0, 0, 1, -1])
[1, 0, 0, -1]
>>> c.add_as_roots([1, -1, 0, 0], [0, 0, -1, 1])
'The sum of these two roots is not a root'
"""
alpha = self.all_roots()
newroot = []
for entry in range(len(root1)):
newroot.append(root1[entry] + root2[entry])
if newroot in alpha.values():
return newroot
else:
return "The sum of these two roots is not a root"
def cartan_matrix(self):
"""Cartan matrix of Lie algebra associated with this root system
Examples
========
>>> from sympy.liealgebras.root_system import RootSystem
>>> c = RootSystem("A3")
>>> c.cartan_matrix()
Matrix([
[ 2, -1, 0],
[-1, 2, -1],
[ 0, -1, 2]])
"""
return self.cartan_type.cartan_matrix()
def dynkin_diagram(self):
"""Dynkin diagram of the Lie algebra associated with this root system
Examples
========
>>> from sympy.liealgebras.root_system import RootSystem
>>> c = RootSystem("A3")
>>> print(c.dynkin_diagram())
0---0---0
1 2 3
"""
return self.cartan_type.dynkin_diagram()
|
f3637c40806c75d3e48f98aea6cc9c10fc29aee551fd372c03c45b6dc9f13d17 | # -*- coding: utf-8 -*-
from .cartan_type import CartanType
from mpmath import fac
from sympy.core.backend import Matrix, eye, Rational, Basic, igcd
class WeylGroup(Basic):
"""
For each semisimple Lie group, we have a Weyl group. It is a subgroup of
the isometry group of the root system. Specifically, it's the subgroup
that is generated by reflections through the hyperplanes orthogonal to
the roots. Therefore, Weyl groups are reflection groups, and so a Weyl
group is a finite Coxeter group.
"""
def __new__(cls, cartantype):
obj = Basic.__new__(cls, cartantype)
obj.cartan_type = CartanType(cartantype)
return obj
def generators(self):
"""
This method creates the generating reflections of the Weyl group for
a given Lie algebra. For a Lie algebra of rank n, there are n
different generating reflections. This function returns them as
a list.
Examples
========
>>> from sympy.liealgebras.weyl_group import WeylGroup
>>> c = WeylGroup("F4")
>>> c.generators()
['r1', 'r2', 'r3', 'r4']
"""
n = self.cartan_type.rank()
generators = []
for i in range(1, n+1):
reflection = "r"+str(i)
generators.append(reflection)
return generators
def group_order(self):
"""
This method returns the order of the Weyl group.
For types A, B, C, D, and E the order depends on
the rank of the Lie algebra. For types F and G,
the order is fixed.
Examples
========
>>> from sympy.liealgebras.weyl_group import WeylGroup
>>> c = WeylGroup("D4")
>>> c.group_order()
192.0
"""
n = self.cartan_type.rank()
if self.cartan_type.series == "A":
return fac(n+1)
if self.cartan_type.series == "B" or self.cartan_type.series == "C":
return fac(n)*(2**n)
if self.cartan_type.series == "D":
return fac(n)*(2**(n-1))
if self.cartan_type.series == "E":
if n == 6:
return 51840
if n == 7:
return 2903040
if n == 8:
return 696729600
if self.cartan_type.series == "F":
return 1152
if self.cartan_type.series == "G":
return 12
def group_name(self):
"""
This method returns some general information about the Weyl group for
a given Lie algebra. It returns the name of the group and the elements
it acts on, if relevant.
"""
n = self.cartan_type.rank()
if self.cartan_type.series == "A":
return "S"+str(n+1) + ": the symmetric group acting on " + str(n+1) + " elements."
if self.cartan_type.series == "B" or self.cartan_type.series == "C":
return "The hyperoctahedral group acting on " + str(2*n) + " elements."
if self.cartan_type.series == "D":
return "The symmetry group of the " + str(n) + "-dimensional demihypercube."
if self.cartan_type.series == "E":
if n == 6:
return "The symmetry group of the 6-polytope."
if n == 7:
return "The symmetry group of the 7-polytope."
if n == 8:
return "The symmetry group of the 8-polytope."
if self.cartan_type.series == "F":
return "The symmetry group of the 24-cell, or icositetrachoron."
if self.cartan_type.series == "G":
return "D6, the dihedral group of order 12, and symmetry group of the hexagon."
def element_order(self, weylelt):
"""
This method returns the order of a given Weyl group element, which should
be specified by the user in the form of products of the generating
reflections, i.e. of the form r1*r2 etc.
For types A-F, this method current works by taking the matrix form of
the specified element, and then finding what power of the matrix is the
identity. It then returns this power.
Examples
========
>>> from sympy.liealgebras.weyl_group import WeylGroup
>>> b = WeylGroup("B4")
>>> b.element_order('r1*r4*r2')
4
"""
n = self.cartan_type.rank()
if self.cartan_type.series == "A":
a = self.matrix_form(weylelt)
order = 1
while a != eye(n+1):
a *= self.matrix_form(weylelt)
order += 1
return order
if self.cartan_type.series == "D":
a = self.matrix_form(weylelt)
order = 1
while a != eye(n):
a *= self.matrix_form(weylelt)
order += 1
return order
if self.cartan_type.series == "E":
a = self.matrix_form(weylelt)
order = 1
while a != eye(8):
a *= self.matrix_form(weylelt)
order += 1
return order
if self.cartan_type.series == "G":
elts = list(weylelt)
reflections = elts[1::3]
m = self.delete_doubles(reflections)
while self.delete_doubles(m) != m:
m = self.delete_doubles(m)
reflections = m
if len(reflections) % 2 == 1:
return 2
elif len(reflections) == 0:
return 1
else:
if len(reflections) == 1:
return 2
else:
m = len(reflections) // 2
lcm = (6 * m)/ igcd(m, 6)
order = lcm / m
return order
if self.cartan_type.series == 'F':
a = self.matrix_form(weylelt)
order = 1
while a != eye(4):
a *= self.matrix_form(weylelt)
order += 1
return order
if self.cartan_type.series == "B" or self.cartan_type.series == "C":
a = self.matrix_form(weylelt)
order = 1
while a != eye(n):
a *= self.matrix_form(weylelt)
order += 1
return order
def delete_doubles(self, reflections):
"""
This is a helper method for determining the order of an element in the
Weyl group of G2. It takes a Weyl element and if repeated simple reflections
in it, it deletes them.
"""
counter = 0
copy = list(reflections)
for elt in copy:
if counter < len(copy)-1:
if copy[counter + 1] == elt:
del copy[counter]
del copy[counter]
counter += 1
return copy
def matrix_form(self, weylelt):
"""
This method takes input from the user in the form of products of the
generating reflections, and returns the matrix corresponding to the
element of the Weyl group. Since each element of the Weyl group is
a reflection of some type, there is a corresponding matrix representation.
This method uses the standard representation for all the generating
reflections.
Examples
========
>>> from sympy.liealgebras.weyl_group import WeylGroup
>>> f = WeylGroup("F4")
>>> f.matrix_form('r2*r3')
Matrix([
[1, 0, 0, 0],
[0, 1, 0, 0],
[0, 0, 0, -1],
[0, 0, 1, 0]])
"""
elts = list(weylelt)
reflections = elts[1::3]
n = self.cartan_type.rank()
if self.cartan_type.series == 'A':
matrixform = eye(n+1)
for elt in reflections:
a = int(elt)
mat = eye(n+1)
mat[a-1, a-1] = 0
mat[a-1, a] = 1
mat[a, a-1] = 1
mat[a, a] = 0
matrixform *= mat
return matrixform
if self.cartan_type.series == 'D':
matrixform = eye(n)
for elt in reflections:
a = int(elt)
mat = eye(n)
if a < n:
mat[a-1, a-1] = 0
mat[a-1, a] = 1
mat[a, a-1] = 1
mat[a, a] = 0
matrixform *= mat
else:
mat[n-2, n-1] = -1
mat[n-2, n-2] = 0
mat[n-1, n-2] = -1
mat[n-1, n-1] = 0
matrixform *= mat
return matrixform
if self.cartan_type.series == 'G':
matrixform = eye(3)
for elt in reflections:
a = int(elt)
if a == 1:
gen1 = Matrix([[1, 0, 0], [0, 0, 1], [0, 1, 0]])
matrixform *= gen1
else:
gen2 = Matrix([[Rational(2, 3), Rational(2, 3), Rational(-1, 3)],
[Rational(2, 3), Rational(-1, 3), Rational(2, 3)],
[Rational(-1, 3), Rational(2, 3), Rational(2, 3)]])
matrixform *= gen2
return matrixform
if self.cartan_type.series == 'F':
matrixform = eye(4)
for elt in reflections:
a = int(elt)
if a == 1:
mat = Matrix([[1, 0, 0, 0], [0, 0, 1, 0], [0, 1, 0, 0], [0, 0, 0, 1]])
matrixform *= mat
elif a == 2:
mat = Matrix([[1, 0, 0, 0], [0, 1, 0, 0], [0, 0, 0, 1], [0, 0, 1, 0]])
matrixform *= mat
elif a == 3:
mat = Matrix([[1, 0, 0, 0], [0, 1, 0, 0], [0, 0, 1, 0], [0, 0, 0, -1]])
matrixform *= mat
else:
mat = Matrix([[Rational(1, 2), Rational(1, 2), Rational(1, 2), Rational(1, 2)],
[Rational(1, 2), Rational(1, 2), Rational(-1, 2), Rational(-1, 2)],
[Rational(1, 2), Rational(-1, 2), Rational(1, 2), Rational(-1, 2)],
[Rational(1, 2), Rational(-1, 2), Rational(-1, 2), Rational(1, 2)]])
matrixform *= mat
return matrixform
if self.cartan_type.series == 'E':
matrixform = eye(8)
for elt in reflections:
a = int(elt)
if a == 1:
mat = Matrix([[Rational(3, 4), Rational(1, 4), Rational(1, 4), Rational(1, 4),
Rational(1, 4), Rational(1, 4), Rational(1, 4), Rational(-1, 4)],
[Rational(1, 4), Rational(3, 4), Rational(-1, 4), Rational(-1, 4),
Rational(-1, 4), Rational(-1, 4), Rational(1, 4), Rational(-1, 4)],
[Rational(1, 4), Rational(-1, 4), Rational(3, 4), Rational(-1, 4),
Rational(-1, 4), Rational(-1, 4), Rational(-1, 4), Rational(1, 4)],
[Rational(1, 4), Rational(-1, 4), Rational(-1, 4), Rational(3, 4),
Rational(-1, 4), Rational(-1, 4), Rational(-1, 4), Rational(1, 4)],
[Rational(1, 4), Rational(-1, 4), Rational(-1, 4), Rational(-1, 4),
Rational(3, 4), Rational(-1, 4), Rational(-1, 4), Rational(1, 4)],
[Rational(1, 4), Rational(-1, 4), Rational(-1, 4), Rational(-1, 4),
Rational(-1, 4), Rational(3, 4), Rational(-1, 4), Rational(1, 4)],
[Rational(1, 4), Rational(-1, 4), Rational(-1, 4), Rational(-1, 4),
Rational(-1, 4), Rational(-1, 4), Rational(-3, 4), Rational(1, 4)],
[Rational(1, 4), Rational(-1, 4), Rational(-1, 4), Rational(-1, 4),
Rational(-1, 4), Rational(-1, 4), Rational(-1, 4), Rational(3, 4)]])
matrixform *= mat
elif a == 2:
mat = eye(8)
mat[0, 0] = 0
mat[0, 1] = -1
mat[1, 0] = -1
mat[1, 1] = 0
matrixform *= mat
else:
mat = eye(8)
mat[a-3, a-3] = 0
mat[a-3, a-2] = 1
mat[a-2, a-3] = 1
mat[a-2, a-2] = 0
matrixform *= mat
return matrixform
if self.cartan_type.series == 'B' or self.cartan_type.series == 'C':
matrixform = eye(n)
for elt in reflections:
a = int(elt)
mat = eye(n)
if a == 1:
mat[0, 0] = -1
matrixform *= mat
else:
mat[a - 2, a - 2] = 0
mat[a-2, a-1] = 1
mat[a - 1, a - 2] = 1
mat[a -1, a - 1] = 0
matrixform *= mat
return matrixform
def coxeter_diagram(self):
"""
This method returns the Coxeter diagram corresponding to a Weyl group.
The Coxeter diagram can be obtained from a Lie algebra's Dynkin diagram
by deleting all arrows; the Coxeter diagram is the undirected graph.
The vertices of the Coxeter diagram represent the generating reflections
of the Weyl group, , s_i. An edge is drawn between s_i and s_j if the order
m(i, j) of s_i*s_j is greater than two. If there is one edge, the order
m(i, j) is 3. If there are two edges, the order m(i, j) is 4, and if there
are three edges, the order m(i, j) is 6.
Examples
========
>>> from sympy.liealgebras.weyl_group import WeylGroup
>>> c = WeylGroup("B3")
>>> print(c.coxeter_diagram())
0---0===0
1 2 3
"""
n = self.cartan_type.rank()
if self.cartan_type.series == "A" or self.cartan_type.series == "D" or self.cartan_type.series == "E":
return self.cartan_type.dynkin_diagram()
if self.cartan_type.series == "B" or self.cartan_type.series == "C":
diag = "---".join("0" for i in range(1, n)) + "===0\n"
diag += " ".join(str(i) for i in range(1, n+1))
return diag
if self.cartan_type.series == "F":
diag = "0---0===0---0\n"
diag += " ".join(str(i) for i in range(1, 5))
return diag
if self.cartan_type.series == "G":
diag = "0≡≡≡0\n1 2"
return diag
|
8822644292557c8cf7e8caf3a4617a1cb300548923e5de89daded548598e0c2a | """
This module implements a method to find
Euler-Lagrange Equations for given Lagrangian.
"""
from itertools import combinations_with_replacement
from sympy import Function, sympify, diff, Eq, S, Symbol, Derivative
from sympy.core.compatibility import iterable
def euler_equations(L, funcs=(), vars=()):
r"""
Find the Euler-Lagrange equations [1]_ for a given Lagrangian.
Parameters
==========
L : Expr
The Lagrangian that should be a function of the functions listed
in the second argument and their derivatives.
For example, in the case of two functions `f(x,y)`, `g(x,y)` and
two independent variables `x`, `y` the Lagrangian would have the form:
.. math:: L\left(f(x,y),g(x,y),\frac{\partial f(x,y)}{\partial x},
\frac{\partial f(x,y)}{\partial y},
\frac{\partial g(x,y)}{\partial x},
\frac{\partial g(x,y)}{\partial y},x,y\right)
In many cases it is not necessary to provide anything, except the
Lagrangian, it will be auto-detected (and an error raised if this
couldn't be done).
funcs : Function or an iterable of Functions
The functions that the Lagrangian depends on. The Euler equations
are differential equations for each of these functions.
vars : Symbol or an iterable of Symbols
The Symbols that are the independent variables of the functions.
Returns
=======
eqns : list of Eq
The list of differential equations, one for each function.
Examples
========
>>> from sympy import Symbol, Function
>>> from sympy.calculus.euler import euler_equations
>>> x = Function('x')
>>> t = Symbol('t')
>>> L = (x(t).diff(t))**2/2 - x(t)**2/2
>>> euler_equations(L, x(t), t)
[Eq(-x(t) - Derivative(x(t), (t, 2)), 0)]
>>> u = Function('u')
>>> x = Symbol('x')
>>> L = (u(t, x).diff(t))**2/2 - (u(t, x).diff(x))**2/2
>>> euler_equations(L, u(t, x), [t, x])
[Eq(-Derivative(u(t, x), (t, 2)) + Derivative(u(t, x), (x, 2)), 0)]
References
==========
.. [1] https://en.wikipedia.org/wiki/Euler%E2%80%93Lagrange_equation
"""
funcs = tuple(funcs) if iterable(funcs) else (funcs,)
if not funcs:
funcs = tuple(L.atoms(Function))
else:
for f in funcs:
if not isinstance(f, Function):
raise TypeError('Function expected, got: %s' % f)
vars = tuple(vars) if iterable(vars) else (vars,)
if not vars:
vars = funcs[0].args
else:
vars = tuple(sympify(var) for var in vars)
if not all(isinstance(v, Symbol) for v in vars):
raise TypeError('Variables are not symbols, got %s' % vars)
for f in funcs:
if not vars == f.args:
raise ValueError("Variables %s don't match args: %s" % (vars, f))
order = max(len(d.variables) for d in L.atoms(Derivative)
if d.expr in funcs)
eqns = []
for f in funcs:
eq = diff(L, f)
for i in range(1, order + 1):
for p in combinations_with_replacement(vars, i):
eq = eq + S.NegativeOne**i*diff(L, diff(f, *p), *p)
eqns.append(Eq(eq, 0))
return eqns
|
e6f688ebbb4ad92280ab9e2167cd055f0b2e524aa3a197623a6aaa47312ed93d | """
Finite difference weights
=========================
This module implements an algorithm for efficient generation of finite
difference weights for ordinary differentials of functions for
derivatives from 0 (interpolation) up to arbitrary order.
The core algorithm is provided in the finite difference weight generating
function (``finite_diff_weights``), and two convenience functions are provided
for:
- estimating a derivative (or interpolate) directly from a series of points
is also provided (``apply_finite_diff``).
- differentiating by using finite difference approximations
(``differentiate_finite``).
"""
from sympy import Derivative, S
from sympy.core.basic import preorder_traversal
from sympy.core.compatibility import iterable
from sympy.core.decorators import deprecated
from sympy.core.function import Subs
from sympy.utilities.exceptions import SymPyDeprecationWarning
def finite_diff_weights(order, x_list, x0=S.One):
"""
Calculates the finite difference weights for an arbitrarily spaced
one-dimensional grid (``x_list``) for derivatives at ``x0`` of order
0, 1, ..., up to ``order`` using a recursive formula. Order of accuracy
is at least ``len(x_list) - order``, if ``x_list`` is defined correctly.
Parameters
==========
order: int
Up to what derivative order weights should be calculated.
0 corresponds to interpolation.
x_list: sequence
Sequence of (unique) values for the independent variable.
It is useful (but not necessary) to order ``x_list`` from
nearest to furthest from ``x0``; see examples below.
x0: Number or Symbol
Root or value of the independent variable for which the finite
difference weights should be generated. Default is ``S.One``.
Returns
=======
list
A list of sublists, each corresponding to coefficients for
increasing derivative order, and each containing lists of
coefficients for increasing subsets of x_list.
Examples
========
>>> from sympy import S
>>> from sympy.calculus import finite_diff_weights
>>> res = finite_diff_weights(1, [-S(1)/2, S(1)/2, S(3)/2, S(5)/2], 0)
>>> res
[[[1, 0, 0, 0],
[1/2, 1/2, 0, 0],
[3/8, 3/4, -1/8, 0],
[5/16, 15/16, -5/16, 1/16]],
[[0, 0, 0, 0],
[-1, 1, 0, 0],
[-1, 1, 0, 0],
[-23/24, 7/8, 1/8, -1/24]]]
>>> res[0][-1] # FD weights for 0th derivative, using full x_list
[5/16, 15/16, -5/16, 1/16]
>>> res[1][-1] # FD weights for 1st derivative
[-23/24, 7/8, 1/8, -1/24]
>>> res[1][-2] # FD weights for 1st derivative, using x_list[:-1]
[-1, 1, 0, 0]
>>> res[1][-1][0] # FD weight for 1st deriv. for x_list[0]
-23/24
>>> res[1][-1][1] # FD weight for 1st deriv. for x_list[1], etc.
7/8
Each sublist contains the most accurate formula at the end.
Note, that in the above example ``res[1][1]`` is the same as ``res[1][2]``.
Since res[1][2] has an order of accuracy of
``len(x_list[:3]) - order = 3 - 1 = 2``, the same is true for ``res[1][1]``!
>>> from sympy import S
>>> from sympy.calculus import finite_diff_weights
>>> res = finite_diff_weights(1, [S(0), S(1), -S(1), S(2), -S(2)], 0)[1]
>>> res
[[0, 0, 0, 0, 0],
[-1, 1, 0, 0, 0],
[0, 1/2, -1/2, 0, 0],
[-1/2, 1, -1/3, -1/6, 0],
[0, 2/3, -2/3, -1/12, 1/12]]
>>> res[0] # no approximation possible, using x_list[0] only
[0, 0, 0, 0, 0]
>>> res[1] # classic forward step approximation
[-1, 1, 0, 0, 0]
>>> res[2] # classic centered approximation
[0, 1/2, -1/2, 0, 0]
>>> res[3:] # higher order approximations
[[-1/2, 1, -1/3, -1/6, 0], [0, 2/3, -2/3, -1/12, 1/12]]
Let us compare this to a differently defined ``x_list``. Pay attention to
``foo[i][k]`` corresponding to the gridpoint defined by ``x_list[k]``.
>>> from sympy import S
>>> from sympy.calculus import finite_diff_weights
>>> foo = finite_diff_weights(1, [-S(2), -S(1), S(0), S(1), S(2)], 0)[1]
>>> foo
[[0, 0, 0, 0, 0],
[-1, 1, 0, 0, 0],
[1/2, -2, 3/2, 0, 0],
[1/6, -1, 1/2, 1/3, 0],
[1/12, -2/3, 0, 2/3, -1/12]]
>>> foo[1] # not the same and of lower accuracy as res[1]!
[-1, 1, 0, 0, 0]
>>> foo[2] # classic double backward step approximation
[1/2, -2, 3/2, 0, 0]
>>> foo[4] # the same as res[4]
[1/12, -2/3, 0, 2/3, -1/12]
Note that, unless you plan on using approximations based on subsets of
``x_list``, the order of gridpoints does not matter.
The capability to generate weights at arbitrary points can be
used e.g. to minimize Runge's phenomenon by using Chebyshev nodes:
>>> from sympy import cos, symbols, pi, simplify
>>> from sympy.calculus import finite_diff_weights
>>> N, (h, x) = 4, symbols('h x')
>>> x_list = [x+h*cos(i*pi/(N)) for i in range(N,-1,-1)] # chebyshev nodes
>>> print(x_list)
[-h + x, -sqrt(2)*h/2 + x, x, sqrt(2)*h/2 + x, h + x]
>>> mycoeffs = finite_diff_weights(1, x_list, 0)[1][4]
>>> [simplify(c) for c in mycoeffs] #doctest: +NORMALIZE_WHITESPACE
[(h**3/2 + h**2*x - 3*h*x**2 - 4*x**3)/h**4,
(-sqrt(2)*h**3 - 4*h**2*x + 3*sqrt(2)*h*x**2 + 8*x**3)/h**4,
6*x/h**2 - 8*x**3/h**4,
(sqrt(2)*h**3 - 4*h**2*x - 3*sqrt(2)*h*x**2 + 8*x**3)/h**4,
(-h**3/2 + h**2*x + 3*h*x**2 - 4*x**3)/h**4]
Notes
=====
If weights for a finite difference approximation of 3rd order
derivative is wanted, weights for 0th, 1st and 2nd order are
calculated "for free", so are formulae using subsets of ``x_list``.
This is something one can take advantage of to save computational cost.
Be aware that one should define ``x_list`` from nearest to furthest from
``x0``. If not, subsets of ``x_list`` will yield poorer approximations,
which might not grand an order of accuracy of ``len(x_list) - order``.
See also
========
sympy.calculus.finite_diff.apply_finite_diff
References
==========
.. [1] Generation of Finite Difference Formulas on Arbitrarily Spaced
Grids, Bengt Fornberg; Mathematics of computation; 51; 184;
(1988); 699-706; doi:10.1090/S0025-5718-1988-0935077-0
"""
# The notation below closely corresponds to the one used in the paper.
order = S(order)
if not order.is_number:
raise ValueError("Cannot handle symbolic order.")
if order < 0:
raise ValueError("Negative derivative order illegal.")
if int(order) != order:
raise ValueError("Non-integer order illegal")
M = order
N = len(x_list) - 1
delta = [[[0 for nu in range(N+1)] for n in range(N+1)] for
m in range(M+1)]
delta[0][0][0] = S.One
c1 = S.One
for n in range(1, N+1):
c2 = S.One
for nu in range(0, n):
c3 = x_list[n]-x_list[nu]
c2 = c2 * c3
if n <= M:
delta[n][n-1][nu] = 0
for m in range(0, min(n, M)+1):
delta[m][n][nu] = (x_list[n]-x0)*delta[m][n-1][nu] -\
m*delta[m-1][n-1][nu]
delta[m][n][nu] /= c3
for m in range(0, min(n, M)+1):
delta[m][n][n] = c1/c2*(m*delta[m-1][n-1][n-1] -
(x_list[n-1]-x0)*delta[m][n-1][n-1])
c1 = c2
return delta
def apply_finite_diff(order, x_list, y_list, x0=S.Zero):
"""
Calculates the finite difference approximation of
the derivative of requested order at ``x0`` from points
provided in ``x_list`` and ``y_list``.
Parameters
==========
order: int
order of derivative to approximate. 0 corresponds to interpolation.
x_list: sequence
Sequence of (unique) values for the independent variable.
y_list: sequence
The function value at corresponding values for the independent
variable in x_list.
x0: Number or Symbol
At what value of the independent variable the derivative should be
evaluated. Defaults to 0.
Returns
=======
sympy.core.add.Add or sympy.core.numbers.Number
The finite difference expression approximating the requested
derivative order at ``x0``.
Examples
========
>>> from sympy.calculus import apply_finite_diff
>>> cube = lambda arg: (1.0*arg)**3
>>> xlist = range(-3,3+1)
>>> apply_finite_diff(2, xlist, map(cube, xlist), 2) - 12 # doctest: +SKIP
-3.55271367880050e-15
we see that the example above only contain rounding errors.
apply_finite_diff can also be used on more abstract objects:
>>> from sympy import IndexedBase, Idx
>>> from sympy.calculus import apply_finite_diff
>>> x, y = map(IndexedBase, 'xy')
>>> i = Idx('i')
>>> x_list, y_list = zip(*[(x[i+j], y[i+j]) for j in range(-1,2)])
>>> apply_finite_diff(1, x_list, y_list, x[i])
((x[i + 1] - x[i])/(-x[i - 1] + x[i]) - 1)*y[i]/(x[i + 1] - x[i]) -
(x[i + 1] - x[i])*y[i - 1]/((x[i + 1] - x[i - 1])*(-x[i - 1] + x[i])) +
(-x[i - 1] + x[i])*y[i + 1]/((x[i + 1] - x[i - 1])*(x[i + 1] - x[i]))
Notes
=====
Order = 0 corresponds to interpolation.
Only supply so many points you think makes sense
to around x0 when extracting the derivative (the function
need to be well behaved within that region). Also beware
of Runge's phenomenon.
See also
========
sympy.calculus.finite_diff.finite_diff_weights
References
==========
Fortran 90 implementation with Python interface for numerics: finitediff_
.. _finitediff: https://github.com/bjodah/finitediff
"""
# In the original paper the following holds for the notation:
# M = order
# N = len(x_list) - 1
N = len(x_list) - 1
if len(x_list) != len(y_list):
raise ValueError("x_list and y_list not equal in length.")
delta = finite_diff_weights(order, x_list, x0)
derivative = 0
for nu in range(0, len(x_list)):
derivative += delta[order][N][nu]*y_list[nu]
return derivative
def _as_finite_diff(derivative, points=1, x0=None, wrt=None):
"""
Returns an approximation of a derivative of a function in
the form of a finite difference formula. The expression is a
weighted sum of the function at a number of discrete values of
(one of) the independent variable(s).
Parameters
==========
derivative: a Derivative instance
points: sequence or coefficient, optional
If sequence: discrete values (length >= order+1) of the
independent variable used for generating the finite
difference weights.
If it is a coefficient, it will be used as the step-size
for generating an equidistant sequence of length order+1
centered around ``x0``. default: 1 (step-size 1)
x0: number or Symbol, optional
the value of the independent variable (``wrt``) at which the
derivative is to be approximated. Default: same as ``wrt``.
wrt: Symbol, optional
"with respect to" the variable for which the (partial)
derivative is to be approximated for. If not provided it
is required that the Derivative is ordinary. Default: ``None``.
Examples
========
>>> from sympy import symbols, Function, exp, sqrt, Symbol, as_finite_diff
>>> from sympy.utilities.exceptions import SymPyDeprecationWarning
>>> import warnings
>>> warnings.simplefilter("ignore", SymPyDeprecationWarning)
>>> x, h = symbols('x h')
>>> f = Function('f')
>>> as_finite_diff(f(x).diff(x))
-f(x - 1/2) + f(x + 1/2)
The default step size and number of points are 1 and ``order + 1``
respectively. We can change the step size by passing a symbol
as a parameter:
>>> as_finite_diff(f(x).diff(x), h)
-f(-h/2 + x)/h + f(h/2 + x)/h
We can also specify the discretized values to be used in a sequence:
>>> as_finite_diff(f(x).diff(x), [x, x+h, x+2*h])
-3*f(x)/(2*h) + 2*f(h + x)/h - f(2*h + x)/(2*h)
The algorithm is not restricted to use equidistant spacing, nor
do we need to make the approximation around ``x0``, but we can get
an expression estimating the derivative at an offset:
>>> e, sq2 = exp(1), sqrt(2)
>>> xl = [x-h, x+h, x+e*h]
>>> as_finite_diff(f(x).diff(x, 1), xl, x+h*sq2)
2*h*((h + sqrt(2)*h)/(2*h) - (-sqrt(2)*h + h)/(2*h))*f(E*h + x)/((-h + E*h)*(h + E*h)) +
(-(-sqrt(2)*h + h)/(2*h) - (-sqrt(2)*h + E*h)/(2*h))*f(-h + x)/(h + E*h) +
(-(h + sqrt(2)*h)/(2*h) + (-sqrt(2)*h + E*h)/(2*h))*f(h + x)/(-h + E*h)
Partial derivatives are also supported:
>>> y = Symbol('y')
>>> d2fdxdy=f(x,y).diff(x,y)
>>> as_finite_diff(d2fdxdy, wrt=x)
-Derivative(f(x - 1/2, y), y) + Derivative(f(x + 1/2, y), y)
See also
========
sympy.calculus.finite_diff.apply_finite_diff
sympy.calculus.finite_diff.finite_diff_weights
"""
if derivative.is_Derivative:
pass
elif derivative.is_Atom:
return derivative
else:
return derivative.fromiter(
[_as_finite_diff(ar, points, x0, wrt) for ar
in derivative.args], **derivative.assumptions0)
if wrt is None:
old = None
for v in derivative.variables:
if old is v:
continue
derivative = _as_finite_diff(derivative, points, x0, v)
old = v
return derivative
order = derivative.variables.count(wrt)
if x0 is None:
x0 = wrt
if not iterable(points):
if getattr(points, 'is_Function', False) and wrt in points.args:
points = points.subs(wrt, x0)
# points is simply the step-size, let's make it a
# equidistant sequence centered around x0
if order % 2 == 0:
# even order => odd number of points, grid point included
points = [x0 + points*i for i
in range(-order//2, order//2 + 1)]
else:
# odd order => even number of points, half-way wrt grid point
points = [x0 + points*S(i)/2 for i
in range(-order, order + 1, 2)]
others = [wrt, 0]
for v in set(derivative.variables):
if v == wrt:
continue
others += [v, derivative.variables.count(v)]
if len(points) < order+1:
raise ValueError("Too few points for order %d" % order)
return apply_finite_diff(order, points, [
Derivative(derivative.expr.subs({wrt: x}), *others) for
x in points], x0)
as_finite_diff = deprecated(
useinstead="Derivative.as_finite_difference",
deprecated_since_version="1.1", issue=11410)(_as_finite_diff)
as_finite_diff.__doc__ = """
Deprecated function. Use Diff.as_finite_difference instead.
"""
def differentiate_finite(expr, *symbols,
# points=1, x0=None, wrt=None, evaluate=True, #Py2:
**kwargs):
r""" Differentiate expr and replace Derivatives with finite differences.
Parameters
==========
expr : expression
\*symbols : differentiate with respect to symbols
points: sequence, coefficient or undefined function, optional
see ``Derivative.as_finite_difference``
x0: number or Symbol, optional
see ``Derivative.as_finite_difference``
wrt: Symbol, optional
see ``Derivative.as_finite_difference``
Examples
========
>>> from sympy import cos, sin, Function, differentiate_finite
>>> from sympy.abc import x, y, h
>>> f, g = Function('f'), Function('g')
>>> differentiate_finite(f(x)*g(x), x, points=[x-h, x+h])
-f(-h + x)*g(-h + x)/(2*h) + f(h + x)*g(h + x)/(2*h)
``differentiate_finite`` works on any expression, including the expressions
with embedded derivatives:
>>> differentiate_finite(f(x) + sin(x), x, 2)
-2*f(x) + f(x - 1) + f(x + 1) - 2*sin(x) + sin(x - 1) + sin(x + 1)
>>> differentiate_finite(f(x, y), x, y)
f(x - 1/2, y - 1/2) - f(x - 1/2, y + 1/2) - f(x + 1/2, y - 1/2) + f(x + 1/2, y + 1/2)
>>> differentiate_finite(f(x)*g(x).diff(x), x)
(-g(x) + g(x + 1))*f(x + 1/2) - (g(x) - g(x - 1))*f(x - 1/2)
To make finite difference with non-constant discretization step use
undefined functions:
>>> dx = Function('dx')
>>> differentiate_finite(f(x)*g(x).diff(x), points=dx(x))
-(-g(x - dx(x)/2 - dx(x - dx(x)/2)/2)/dx(x - dx(x)/2) +
g(x - dx(x)/2 + dx(x - dx(x)/2)/2)/dx(x - dx(x)/2))*f(x - dx(x)/2)/dx(x) +
(-g(x + dx(x)/2 - dx(x + dx(x)/2)/2)/dx(x + dx(x)/2) +
g(x + dx(x)/2 + dx(x + dx(x)/2)/2)/dx(x + dx(x)/2))*f(x + dx(x)/2)/dx(x)
"""
# Key-word only arguments only available in Python 3
points = kwargs.pop('points', 1)
x0 = kwargs.pop('x0', None)
wrt = kwargs.pop('wrt', None)
evaluate = kwargs.pop('evaluate', False)
if any(term.is_Derivative for term in list(preorder_traversal(expr))):
evaluate = False
if kwargs:
raise ValueError("Unknown kwargs: %s" % kwargs)
Dexpr = expr.diff(*symbols, evaluate=evaluate)
if evaluate:
SymPyDeprecationWarning(feature="``evaluate`` flag",
issue=17881,
deprecated_since_version="1.5").warn()
return Dexpr.replace(
lambda arg: arg.is_Derivative,
lambda arg: arg.as_finite_difference(points=points, x0=x0, wrt=wrt))
else:
DFexpr = Dexpr.as_finite_difference(points=points, x0=x0, wrt=wrt)
return DFexpr.replace(
lambda arg: isinstance(arg, Subs),
lambda arg: arg.expr.as_finite_difference(
points=points, x0=arg.point[0], wrt=arg.variables[0]))
|
a9c1a6085311482743040bacd73f3ddddf9827d18ca3479001d84e36771c2668 | from sympy import Order, S, log, limit, lcm_list, Abs, im, re, Dummy
from sympy.core import Add, Mul, Pow
from sympy.core.basic import Basic
from sympy.core.compatibility import iterable
from sympy.core.expr import AtomicExpr, Expr
from sympy.core.numbers import _sympifyit, oo
from sympy.core.sympify import _sympify
from sympy.functions.elementary.miscellaneous import Min, Max
from sympy.logic.boolalg import And
from sympy.polys.rationaltools import together
from sympy.sets.sets import (Interval, Intersection, FiniteSet, Union,
Complement, EmptySet)
from sympy.sets.fancysets import ImageSet
from sympy.simplify.radsimp import denom
from sympy.solvers.inequalities import solve_univariate_inequality
from sympy.utilities import filldedent
def continuous_domain(f, symbol, domain):
"""
Returns the intervals in the given domain for which the function
is continuous.
This method is limited by the ability to determine the various
singularities and discontinuities of the given function.
Parameters
==========
f : Expr
The concerned function.
symbol : Symbol
The variable for which the intervals are to be determined.
domain : Interval
The domain over which the continuity of the symbol has to be checked.
Examples
========
>>> from sympy import Symbol, S, tan, log, pi, sqrt
>>> from sympy.sets import Interval
>>> from sympy.calculus.util import continuous_domain
>>> x = Symbol('x')
>>> continuous_domain(1/x, x, S.Reals)
Union(Interval.open(-oo, 0), Interval.open(0, oo))
>>> continuous_domain(tan(x), x, Interval(0, pi))
Union(Interval.Ropen(0, pi/2), Interval.Lopen(pi/2, pi))
>>> continuous_domain(sqrt(x - 2), x, Interval(-5, 5))
Interval(2, 5)
>>> continuous_domain(log(2*x - 1), x, S.Reals)
Interval.open(1/2, oo)
Returns
=======
Interval
Union of all intervals where the function is continuous.
Raises
======
NotImplementedError
If the method to determine continuity of such a function
has not yet been developed.
"""
from sympy.solvers.inequalities import solve_univariate_inequality
from sympy.solvers.solveset import solveset, _has_rational_power
if domain.is_subset(S.Reals):
constrained_interval = domain
for atom in f.atoms(Pow):
predicate, denomin = _has_rational_power(atom, symbol)
if predicate and denomin == 2:
constraint = solve_univariate_inequality(atom.base >= 0,
symbol).as_set()
constrained_interval = Intersection(constraint,
constrained_interval)
for atom in f.atoms(log):
constraint = solve_univariate_inequality(atom.args[0] > 0,
symbol).as_set()
constrained_interval = Intersection(constraint,
constrained_interval)
domain = constrained_interval
try:
if f.has(Abs):
sings = solveset(1/f, symbol, domain) + \
solveset(denom(together(f)), symbol, domain)
else:
for atom in f.atoms(Pow):
predicate, denomin = _has_rational_power(atom, symbol)
if predicate and denomin == 2:
sings = solveset(1/f, symbol, domain) +\
solveset(denom(together(f)), symbol, domain)
break
else:
sings = Intersection(solveset(1/f, symbol), domain) + \
solveset(denom(together(f)), symbol, domain)
except NotImplementedError:
raise NotImplementedError("Methods for determining the continuous domains"
" of this function have not been developed.")
return domain - sings
def function_range(f, symbol, domain):
"""
Finds the range of a function in a given domain.
This method is limited by the ability to determine the singularities and
determine limits.
Parameters
==========
f : Expr
The concerned function.
symbol : Symbol
The variable for which the range of function is to be determined.
domain : Interval
The domain under which the range of the function has to be found.
Examples
========
>>> from sympy import Symbol, S, exp, log, pi, sqrt, sin, tan
>>> from sympy.sets import Interval
>>> from sympy.calculus.util import function_range
>>> x = Symbol('x')
>>> function_range(sin(x), x, Interval(0, 2*pi))
Interval(-1, 1)
>>> function_range(tan(x), x, Interval(-pi/2, pi/2))
Interval(-oo, oo)
>>> function_range(1/x, x, S.Reals)
Union(Interval.open(-oo, 0), Interval.open(0, oo))
>>> function_range(exp(x), x, S.Reals)
Interval.open(0, oo)
>>> function_range(log(x), x, S.Reals)
Interval(-oo, oo)
>>> function_range(sqrt(x), x , Interval(-5, 9))
Interval(0, 3)
Returns
=======
Interval
Union of all ranges for all intervals under domain where function is
continuous.
Raises
======
NotImplementedError
If any of the intervals, in the given domain, for which function
is continuous are not finite or real,
OR if the critical points of the function on the domain can't be found.
"""
from sympy.solvers.solveset import solveset
if isinstance(domain, EmptySet):
return S.EmptySet
period = periodicity(f, symbol)
if period == S.Zero:
# the expression is constant wrt symbol
return FiniteSet(f.expand())
if period is not None:
if isinstance(domain, Interval):
if (domain.inf - domain.sup).is_infinite:
domain = Interval(0, period)
elif isinstance(domain, Union):
for sub_dom in domain.args:
if isinstance(sub_dom, Interval) and \
((sub_dom.inf - sub_dom.sup).is_infinite):
domain = Interval(0, period)
intervals = continuous_domain(f, symbol, domain)
range_int = S.EmptySet
if isinstance(intervals,(Interval, FiniteSet)):
interval_iter = (intervals,)
elif isinstance(intervals, Union):
interval_iter = intervals.args
else:
raise NotImplementedError(filldedent('''
Unable to find range for the given domain.
'''))
for interval in interval_iter:
if isinstance(interval, FiniteSet):
for singleton in interval:
if singleton in domain:
range_int += FiniteSet(f.subs(symbol, singleton))
elif isinstance(interval, Interval):
vals = S.EmptySet
critical_points = S.EmptySet
critical_values = S.EmptySet
bounds = ((interval.left_open, interval.inf, '+'),
(interval.right_open, interval.sup, '-'))
for is_open, limit_point, direction in bounds:
if is_open:
critical_values += FiniteSet(limit(f, symbol, limit_point, direction))
vals += critical_values
else:
vals += FiniteSet(f.subs(symbol, limit_point))
solution = solveset(f.diff(symbol), symbol, interval)
if not iterable(solution):
raise NotImplementedError(
'Unable to find critical points for {}'.format(f))
if isinstance(solution, ImageSet):
raise NotImplementedError(
'Infinite number of critical points for {}'.format(f))
critical_points += solution
for critical_point in critical_points:
vals += FiniteSet(f.subs(symbol, critical_point))
left_open, right_open = False, False
if critical_values is not S.EmptySet:
if critical_values.inf == vals.inf:
left_open = True
if critical_values.sup == vals.sup:
right_open = True
range_int += Interval(vals.inf, vals.sup, left_open, right_open)
else:
raise NotImplementedError(filldedent('''
Unable to find range for the given domain.
'''))
return range_int
def not_empty_in(finset_intersection, *syms):
"""
Finds the domain of the functions in `finite_set` in which the
`finite_set` is not-empty
Parameters
==========
finset_intersection : The unevaluated intersection of FiniteSet containing
real-valued functions with Union of Sets
syms : Tuple of symbols
Symbol for which domain is to be found
Raises
======
NotImplementedError
The algorithms to find the non-emptiness of the given FiniteSet are
not yet implemented.
ValueError
The input is not valid.
RuntimeError
It is a bug, please report it to the github issue tracker
(https://github.com/sympy/sympy/issues).
Examples
========
>>> from sympy import FiniteSet, Interval, not_empty_in, oo
>>> from sympy.abc import x
>>> not_empty_in(FiniteSet(x/2).intersect(Interval(0, 1)), x)
Interval(0, 2)
>>> not_empty_in(FiniteSet(x, x**2).intersect(Interval(1, 2)), x)
Union(Interval(1, 2), Interval(-sqrt(2), -1))
>>> not_empty_in(FiniteSet(x**2/(x + 2)).intersect(Interval(1, oo)), x)
Union(Interval.Lopen(-2, -1), Interval(2, oo))
"""
# TODO: handle piecewise defined functions
# TODO: handle transcendental functions
# TODO: handle multivariate functions
if len(syms) == 0:
raise ValueError("One or more symbols must be given in syms.")
if finset_intersection is S.EmptySet:
return S.EmptySet
if isinstance(finset_intersection, Union):
elm_in_sets = finset_intersection.args[0]
return Union(not_empty_in(finset_intersection.args[1], *syms),
elm_in_sets)
if isinstance(finset_intersection, FiniteSet):
finite_set = finset_intersection
_sets = S.Reals
else:
finite_set = finset_intersection.args[1]
_sets = finset_intersection.args[0]
if not isinstance(finite_set, FiniteSet):
raise ValueError('A FiniteSet must be given, not %s: %s' %
(type(finite_set), finite_set))
if len(syms) == 1:
symb = syms[0]
else:
raise NotImplementedError('more than one variables %s not handled' %
(syms,))
def elm_domain(expr, intrvl):
""" Finds the domain of an expression in any given interval """
from sympy.solvers.solveset import solveset
_start = intrvl.start
_end = intrvl.end
_singularities = solveset(expr.as_numer_denom()[1], symb,
domain=S.Reals)
if intrvl.right_open:
if _end is S.Infinity:
_domain1 = S.Reals
else:
_domain1 = solveset(expr < _end, symb, domain=S.Reals)
else:
_domain1 = solveset(expr <= _end, symb, domain=S.Reals)
if intrvl.left_open:
if _start is S.NegativeInfinity:
_domain2 = S.Reals
else:
_domain2 = solveset(expr > _start, symb, domain=S.Reals)
else:
_domain2 = solveset(expr >= _start, symb, domain=S.Reals)
# domain in the interval
expr_with_sing = Intersection(_domain1, _domain2)
expr_domain = Complement(expr_with_sing, _singularities)
return expr_domain
if isinstance(_sets, Interval):
return Union(*[elm_domain(element, _sets) for element in finite_set])
if isinstance(_sets, Union):
_domain = S.EmptySet
for intrvl in _sets.args:
_domain_element = Union(*[elm_domain(element, intrvl)
for element in finite_set])
_domain = Union(_domain, _domain_element)
return _domain
def periodicity(f, symbol, check=False):
"""
Tests the given function for periodicity in the given symbol.
Parameters
==========
f : Expr.
The concerned function.
symbol : Symbol
The variable for which the period is to be determined.
check : Boolean, optional
The flag to verify whether the value being returned is a period or not.
Returns
=======
period
The period of the function is returned.
`None` is returned when the function is aperiodic or has a complex period.
The value of `0` is returned as the period of a constant function.
Raises
======
NotImplementedError
The value of the period computed cannot be verified.
Notes
=====
Currently, we do not support functions with a complex period.
The period of functions having complex periodic values such
as `exp`, `sinh` is evaluated to `None`.
The value returned might not be the "fundamental" period of the given
function i.e. it may not be the smallest periodic value of the function.
The verification of the period through the `check` flag is not reliable
due to internal simplification of the given expression. Hence, it is set
to `False` by default.
Examples
========
>>> from sympy import Symbol, sin, cos, tan, exp
>>> from sympy.calculus.util import periodicity
>>> x = Symbol('x')
>>> f = sin(x) + sin(2*x) + sin(3*x)
>>> periodicity(f, x)
2*pi
>>> periodicity(sin(x)*cos(x), x)
pi
>>> periodicity(exp(tan(2*x) - 1), x)
pi/2
>>> periodicity(sin(4*x)**cos(2*x), x)
pi
>>> periodicity(exp(x), x)
"""
from sympy.core.mod import Mod
from sympy.core.relational import Relational
from sympy.functions.elementary.exponential import exp
from sympy.functions.elementary.complexes import Abs
from sympy.functions.elementary.trigonometric import (
TrigonometricFunction, sin, cos, csc, sec)
from sympy.simplify.simplify import simplify
from sympy.solvers.decompogen import decompogen
from sympy.polys.polytools import degree
temp = Dummy('x', real=True)
f = f.subs(symbol, temp)
symbol = temp
def _check(orig_f, period):
'''Return the checked period or raise an error.'''
new_f = orig_f.subs(symbol, symbol + period)
if new_f.equals(orig_f):
return period
else:
raise NotImplementedError(filldedent('''
The period of the given function cannot be verified.
When `%s` was replaced with `%s + %s` in `%s`, the result
was `%s` which was not recognized as being the same as
the original function.
So either the period was wrong or the two forms were
not recognized as being equal.
Set check=False to obtain the value.''' %
(symbol, symbol, period, orig_f, new_f)))
orig_f = f
period = None
if isinstance(f, Relational):
f = f.lhs - f.rhs
f = simplify(f)
if symbol not in f.free_symbols:
return S.Zero
if isinstance(f, TrigonometricFunction):
try:
period = f.period(symbol)
except NotImplementedError:
pass
if isinstance(f, Abs):
arg = f.args[0]
if isinstance(arg, (sec, csc, cos)):
# all but tan and cot might have a
# a period that is half as large
# so recast as sin
arg = sin(arg.args[0])
period = periodicity(arg, symbol)
if period is not None and isinstance(arg, sin):
# the argument of Abs was a trigonometric other than
# cot or tan; test to see if the half-period
# is valid. Abs(arg) has behaviour equivalent to
# orig_f, so use that for test:
orig_f = Abs(arg)
try:
return _check(orig_f, period/2)
except NotImplementedError as err:
if check:
raise NotImplementedError(err)
# else let new orig_f and period be
# checked below
if isinstance(f, exp):
if im(f) != 0:
period_real = periodicity(re(f), symbol)
period_imag = periodicity(im(f), symbol)
if period_real is not None and period_imag is not None:
period = lcim([period_real, period_imag])
if f.is_Pow:
base, expo = f.args
base_has_sym = base.has(symbol)
expo_has_sym = expo.has(symbol)
if base_has_sym and not expo_has_sym:
period = periodicity(base, symbol)
elif expo_has_sym and not base_has_sym:
period = periodicity(expo, symbol)
else:
period = _periodicity(f.args, symbol)
elif f.is_Mul:
coeff, g = f.as_independent(symbol, as_Add=False)
if isinstance(g, TrigonometricFunction) or coeff is not S.One:
period = periodicity(g, symbol)
else:
period = _periodicity(g.args, symbol)
elif f.is_Add:
k, g = f.as_independent(symbol)
if k is not S.Zero:
return periodicity(g, symbol)
period = _periodicity(g.args, symbol)
elif isinstance(f, Mod):
a, n = f.args
if a == symbol:
period = n
elif isinstance(a, TrigonometricFunction):
period = periodicity(a, symbol)
#check if 'f' is linear in 'symbol'
elif (a.is_polynomial(symbol) and degree(a, symbol) == 1 and
symbol not in n.free_symbols):
period = Abs(n / a.diff(symbol))
elif period is None:
from sympy.solvers.decompogen import compogen
g_s = decompogen(f, symbol)
num_of_gs = len(g_s)
if num_of_gs > 1:
for index, g in enumerate(reversed(g_s)):
start_index = num_of_gs - 1 - index
g = compogen(g_s[start_index:], symbol)
if g != orig_f and g != f: # Fix for issue 12620
period = periodicity(g, symbol)
if period is not None:
break
if period is not None:
if check:
return _check(orig_f, period)
return period
return None
def _periodicity(args, symbol):
"""
Helper for `periodicity` to find the period of a list of simpler
functions.
It uses the `lcim` method to find the least common period of
all the functions.
Parameters
==========
args : Tuple of Symbol
All the symbols present in a function.
symbol : Symbol
The symbol over which the function is to be evaluated.
Returns
=======
period
The least common period of the function for all the symbols
of the function.
None if for at least one of the symbols the function is aperiodic
"""
periods = []
for f in args:
period = periodicity(f, symbol)
if period is None:
return None
if period is not S.Zero:
periods.append(period)
if len(periods) > 1:
return lcim(periods)
if periods:
return periods[0]
def lcim(numbers):
"""Returns the least common integral multiple of a list of numbers.
The numbers can be rational or irrational or a mixture of both.
`None` is returned for incommensurable numbers.
Parameters
==========
numbers : list
Numbers (rational and/or irrational) for which lcim is to be found.
Returns
=======
number
lcim if it exists, otherwise `None` for incommensurable numbers.
Examples
========
>>> from sympy import S, pi
>>> from sympy.calculus.util import lcim
>>> lcim([S(1)/2, S(3)/4, S(5)/6])
15/2
>>> lcim([2*pi, 3*pi, pi, pi/2])
6*pi
>>> lcim([S(1), 2*pi])
"""
result = None
if all(num.is_irrational for num in numbers):
factorized_nums = list(map(lambda num: num.factor(), numbers))
factors_num = list(
map(lambda num: num.as_coeff_Mul(),
factorized_nums))
term = factors_num[0][1]
if all(factor == term for coeff, factor in factors_num):
common_term = term
coeffs = [coeff for coeff, factor in factors_num]
result = lcm_list(coeffs) * common_term
elif all(num.is_rational for num in numbers):
result = lcm_list(numbers)
else:
pass
return result
def is_convex(f, *syms, **kwargs):
"""Determines the convexity of the function passed in the argument.
Parameters
==========
f : Expr
The concerned function.
syms : Tuple of symbols
The variables with respect to which the convexity is to be determined.
domain : Interval, optional
The domain over which the convexity of the function has to be checked.
If unspecified, S.Reals will be the default domain.
Returns
=======
Boolean
The method returns `True` if the function is convex otherwise it
returns `False`.
Raises
======
NotImplementedError
The check for the convexity of multivariate functions is not implemented yet.
Notes
=====
To determine concavity of a function pass `-f` as the concerned function.
To determine logarithmic convexity of a function pass log(f) as
concerned function.
To determine logartihmic concavity of a function pass -log(f) as
concerned function.
Currently, convexity check of multivariate functions is not handled.
Examples
========
>>> from sympy import symbols, exp, oo, Interval
>>> from sympy.calculus.util import is_convex
>>> x = symbols('x')
>>> is_convex(exp(x), x)
True
>>> is_convex(x**3, x, domain = Interval(-1, oo))
False
References
==========
.. [1] https://en.wikipedia.org/wiki/Convex_function
.. [2] http://www.ifp.illinois.edu/~angelia/L3_convfunc.pdf
.. [3] https://en.wikipedia.org/wiki/Logarithmically_convex_function
.. [4] https://en.wikipedia.org/wiki/Logarithmically_concave_function
.. [5] https://en.wikipedia.org/wiki/Concave_function
"""
if len(syms) > 1:
raise NotImplementedError(
"The check for the convexity of multivariate functions is not implemented yet.")
f = _sympify(f)
domain = kwargs.get('domain', S.Reals)
var = syms[0]
condition = f.diff(var, 2) < 0
if solve_univariate_inequality(condition, var, False, domain):
return False
return True
def stationary_points(f, symbol, domain=S.Reals):
"""
Returns the stationary points of a function (where derivative of the
function is 0) in the given domain.
Parameters
==========
f : Expr
The concerned function.
symbol : Symbol
The variable for which the stationary points are to be determined.
domain : Interval
The domain over which the stationary points have to be checked.
If unspecified, S.Reals will be the default domain.
Returns
=======
Set
A set of stationary points for the function. If there are no
stationary point, an EmptySet is returned.
Examples
========
>>> from sympy import Symbol, S, sin, log, pi, pprint, stationary_points
>>> from sympy.sets import Interval
>>> x = Symbol('x')
>>> stationary_points(1/x, x, S.Reals)
EmptySet
>>> pprint(stationary_points(sin(x), x), use_unicode=False)
pi 3*pi
{2*n*pi + -- | n in Integers} U {2*n*pi + ---- | n in Integers}
2 2
>>> stationary_points(sin(x),x, Interval(0, 4*pi))
FiniteSet(pi/2, 3*pi/2, 5*pi/2, 7*pi/2)
"""
from sympy import solveset, diff
if isinstance(domain, EmptySet):
return S.EmptySet
domain = continuous_domain(f, symbol, domain)
set = solveset(diff(f, symbol), symbol, domain)
return set
def maximum(f, symbol, domain=S.Reals):
"""
Returns the maximum value of a function in the given domain.
Parameters
==========
f : Expr
The concerned function.
symbol : Symbol
The variable for maximum value needs to be determined.
domain : Interval
The domain over which the maximum have to be checked.
If unspecified, then Global maximum is returned.
Returns
=======
number
Maximum value of the function in given domain.
Examples
========
>>> from sympy import Symbol, S, sin, cos, pi, maximum
>>> from sympy.sets import Interval
>>> x = Symbol('x')
>>> f = -x**2 + 2*x + 5
>>> maximum(f, x, S.Reals)
6
>>> maximum(sin(x), x, Interval(-pi, pi/4))
sqrt(2)/2
>>> maximum(sin(x)*cos(x), x)
1/2
"""
from sympy import Symbol
if isinstance(symbol, Symbol):
if isinstance(domain, EmptySet):
raise ValueError("Maximum value not defined for empty domain.")
return function_range(f, symbol, domain).sup
else:
raise ValueError("%s is not a valid symbol." % symbol)
def minimum(f, symbol, domain=S.Reals):
"""
Returns the minimum value of a function in the given domain.
Parameters
==========
f : Expr
The concerned function.
symbol : Symbol
The variable for minimum value needs to be determined.
domain : Interval
The domain over which the minimum have to be checked.
If unspecified, then Global minimum is returned.
Returns
=======
number
Minimum value of the function in the given domain.
Examples
========
>>> from sympy import Symbol, S, sin, cos, minimum
>>> from sympy.sets import Interval
>>> x = Symbol('x')
>>> f = x**2 + 2*x + 5
>>> minimum(f, x, S.Reals)
4
>>> minimum(sin(x), x, Interval(2, 3))
sin(3)
>>> minimum(sin(x)*cos(x), x)
-1/2
"""
from sympy import Symbol
if isinstance(symbol, Symbol):
if isinstance(domain, EmptySet):
raise ValueError("Minimum value not defined for empty domain.")
return function_range(f, symbol, domain).inf
else:
raise ValueError("%s is not a valid symbol." % symbol)
class AccumulationBounds(AtomicExpr):
r"""
# Note AccumulationBounds has an alias: AccumBounds
AccumulationBounds represent an interval `[a, b]`, which is always closed
at the ends. Here `a` and `b` can be any value from extended real numbers.
The intended meaning of AccummulationBounds is to give an approximate
location of the accumulation points of a real function at a limit point.
Let `a` and `b` be reals such that a <= b.
`\left\langle a, b\right\rangle = \{x \in \mathbb{R} \mid a \le x \le b\}`
`\left\langle -\infty, b\right\rangle = \{x \in \mathbb{R} \mid x \le b\} \cup \{-\infty, \infty\}`
`\left\langle a, \infty \right\rangle = \{x \in \mathbb{R} \mid a \le x\} \cup \{-\infty, \infty\}`
`\left\langle -\infty, \infty \right\rangle = \mathbb{R} \cup \{-\infty, \infty\}`
`oo` and `-oo` are added to the second and third definition respectively,
since if either `-oo` or `oo` is an argument, then the other one should
be included (though not as an end point). This is forced, since we have,
for example, `1/AccumBounds(0, 1) = AccumBounds(1, oo)`, and the limit at
`0` is not one-sided. As x tends to `0-`, then `1/x -> -oo`, so `-oo`
should be interpreted as belonging to `AccumBounds(1, oo)` though it need
not appear explicitly.
In many cases it suffices to know that the limit set is bounded.
However, in some other cases more exact information could be useful.
For example, all accumulation values of cos(x) + 1 are non-negative.
(AccumBounds(-1, 1) + 1 = AccumBounds(0, 2))
A AccumulationBounds object is defined to be real AccumulationBounds,
if its end points are finite reals.
Let `X`, `Y` be real AccumulationBounds, then their sum, difference,
product are defined to be the following sets:
`X + Y = \{ x+y \mid x \in X \cap y \in Y\}`
`X - Y = \{ x-y \mid x \in X \cap y \in Y\}`
`X * Y = \{ x*y \mid x \in X \cap y \in Y\}`
There is, however, no consensus on Interval division.
`X / Y = \{ z \mid \exists x \in X, y \in Y \mid y \neq 0, z = x/y\}`
Note: According to this definition the quotient of two AccumulationBounds
may not be a AccumulationBounds object but rather a union of
AccumulationBounds.
Note
====
The main focus in the interval arithmetic is on the simplest way to
calculate upper and lower endpoints for the range of values of a
function in one or more variables. These barriers are not necessarily
the supremum or infimum, since the precise calculation of those values
can be difficult or impossible.
Examples
========
>>> from sympy import AccumBounds, sin, exp, log, pi, E, S, oo
>>> from sympy.abc import x
>>> AccumBounds(0, 1) + AccumBounds(1, 2)
AccumBounds(1, 3)
>>> AccumBounds(0, 1) - AccumBounds(0, 2)
AccumBounds(-2, 1)
>>> AccumBounds(-2, 3)*AccumBounds(-1, 1)
AccumBounds(-3, 3)
>>> AccumBounds(1, 2)*AccumBounds(3, 5)
AccumBounds(3, 10)
The exponentiation of AccumulationBounds is defined
as follows:
If 0 does not belong to `X` or `n > 0` then
`X^n = \{ x^n \mid x \in X\}`
otherwise
`X^n = \{ x^n \mid x \neq 0, x \in X\} \cup \{-\infty, \infty\}`
Here for fractional `n`, the part of `X` resulting in a complex
AccumulationBounds object is neglected.
>>> AccumBounds(-1, 4)**(S(1)/2)
AccumBounds(0, 2)
>>> AccumBounds(1, 2)**2
AccumBounds(1, 4)
>>> AccumBounds(-1, oo)**(-1)
AccumBounds(-oo, oo)
Note: `<a, b>^2` is not same as `<a, b>*<a, b>`
>>> AccumBounds(-1, 1)**2
AccumBounds(0, 1)
>>> AccumBounds(1, 3) < 4
True
>>> AccumBounds(1, 3) < -1
False
Some elementary functions can also take AccumulationBounds as input.
A function `f` evaluated for some real AccumulationBounds `<a, b>`
is defined as `f(\left\langle a, b\right\rangle) = \{ f(x) \mid a \le x \le b \}`
>>> sin(AccumBounds(pi/6, pi/3))
AccumBounds(1/2, sqrt(3)/2)
>>> exp(AccumBounds(0, 1))
AccumBounds(1, E)
>>> log(AccumBounds(1, E))
AccumBounds(0, 1)
Some symbol in an expression can be substituted for a AccumulationBounds
object. But it doesn't necessarily evaluate the AccumulationBounds for
that expression.
Same expression can be evaluated to different values depending upon
the form it is used for substitution. For example:
>>> (x**2 + 2*x + 1).subs(x, AccumBounds(-1, 1))
AccumBounds(-1, 4)
>>> ((x + 1)**2).subs(x, AccumBounds(-1, 1))
AccumBounds(0, 4)
References
==========
.. [1] https://en.wikipedia.org/wiki/Interval_arithmetic
.. [2] http://fab.cba.mit.edu/classes/S62.12/docs/Hickey_interval.pdf
Notes
=====
Do not use ``AccumulationBounds`` for floating point interval arithmetic
calculations, use ``mpmath.iv`` instead.
"""
is_extended_real = True
def __new__(cls, min, max):
min = _sympify(min)
max = _sympify(max)
# Only allow real intervals (use symbols with 'is_extended_real=True').
if not min.is_extended_real or not max.is_extended_real:
raise ValueError("Only real AccumulationBounds are supported")
# Make sure that the created AccumBounds object will be valid.
if max.is_comparable and min.is_comparable:
if max < min:
raise ValueError(
"Lower limit should be smaller than upper limit")
if max == min:
return max
return Basic.__new__(cls, min, max)
# setting the operation priority
_op_priority = 11.0
def _eval_is_real(self):
if self.min.is_real and self.max.is_real:
return True
@property
def min(self):
"""
Returns the minimum possible value attained by AccumulationBounds
object.
Examples
========
>>> from sympy import AccumBounds
>>> AccumBounds(1, 3).min
1
"""
return self.args[0]
@property
def max(self):
"""
Returns the maximum possible value attained by AccumulationBounds
object.
Examples
========
>>> from sympy import AccumBounds
>>> AccumBounds(1, 3).max
3
"""
return self.args[1]
@property
def delta(self):
"""
Returns the difference of maximum possible value attained by
AccumulationBounds object and minimum possible value attained
by AccumulationBounds object.
Examples
========
>>> from sympy import AccumBounds
>>> AccumBounds(1, 3).delta
2
"""
return self.max - self.min
@property
def mid(self):
"""
Returns the mean of maximum possible value attained by
AccumulationBounds object and minimum possible value
attained by AccumulationBounds object.
Examples
========
>>> from sympy import AccumBounds
>>> AccumBounds(1, 3).mid
2
"""
return (self.min + self.max) / 2
@_sympifyit('other', NotImplemented)
def _eval_power(self, other):
return self.__pow__(other)
@_sympifyit('other', NotImplemented)
def __add__(self, other):
if isinstance(other, Expr):
if isinstance(other, AccumBounds):
return AccumBounds(
Add(self.min, other.min),
Add(self.max, other.max))
if other is S.Infinity and self.min is S.NegativeInfinity or \
other is S.NegativeInfinity and self.max is S.Infinity:
return AccumBounds(-oo, oo)
elif other.is_extended_real:
return AccumBounds(Add(self.min, other), Add(self.max, other))
return Add(self, other, evaluate=False)
return NotImplemented
__radd__ = __add__
def __neg__(self):
return AccumBounds(-self.max, -self.min)
@_sympifyit('other', NotImplemented)
def __sub__(self, other):
if isinstance(other, Expr):
if isinstance(other, AccumBounds):
return AccumBounds(
Add(self.min, -other.max),
Add(self.max, -other.min))
if other is S.NegativeInfinity and self.min is S.NegativeInfinity or \
other is S.Infinity and self.max is S.Infinity:
return AccumBounds(-oo, oo)
elif other.is_extended_real:
return AccumBounds(
Add(self.min, -other),
Add(self.max, -other))
return Add(self, -other, evaluate=False)
return NotImplemented
@_sympifyit('other', NotImplemented)
def __rsub__(self, other):
return self.__neg__() + other
@_sympifyit('other', NotImplemented)
def __mul__(self, other):
if isinstance(other, Expr):
if isinstance(other, AccumBounds):
return AccumBounds(Min(Mul(self.min, other.min),
Mul(self.min, other.max),
Mul(self.max, other.min),
Mul(self.max, other.max)),
Max(Mul(self.min, other.min),
Mul(self.min, other.max),
Mul(self.max, other.min),
Mul(self.max, other.max)))
if other is S.Infinity:
if self.min.is_zero:
return AccumBounds(0, oo)
if self.max.is_zero:
return AccumBounds(-oo, 0)
if other is S.NegativeInfinity:
if self.min.is_zero:
return AccumBounds(-oo, 0)
if self.max.is_zero:
return AccumBounds(0, oo)
if other.is_extended_real:
if other.is_zero:
if self == AccumBounds(-oo, oo):
return AccumBounds(-oo, oo)
if self.max is S.Infinity:
return AccumBounds(0, oo)
if self.min is S.NegativeInfinity:
return AccumBounds(-oo, 0)
return S.Zero
if other.is_extended_positive:
return AccumBounds(
Mul(self.min, other),
Mul(self.max, other))
elif other.is_extended_negative:
return AccumBounds(
Mul(self.max, other),
Mul(self.min, other))
if isinstance(other, Order):
return other
return Mul(self, other, evaluate=False)
return NotImplemented
__rmul__ = __mul__
@_sympifyit('other', NotImplemented)
def __div__(self, other):
if isinstance(other, Expr):
if isinstance(other, AccumBounds):
if S.Zero not in other:
return self * AccumBounds(1/other.max, 1/other.min)
if S.Zero in self and S.Zero in other:
if self.min.is_zero and other.min.is_zero:
return AccumBounds(0, oo)
if self.max.is_zero and other.min.is_zero:
return AccumBounds(-oo, 0)
return AccumBounds(-oo, oo)
if self.max.is_extended_negative:
if other.min.is_extended_negative:
if other.max.is_zero:
return AccumBounds(self.max / other.min, oo)
if other.max.is_extended_positive:
# the actual answer is a Union of AccumBounds,
# Union(AccumBounds(-oo, self.max/other.max),
# AccumBounds(self.max/other.min, oo))
return AccumBounds(-oo, oo)
if other.min.is_zero and other.max.is_extended_positive:
return AccumBounds(-oo, self.max / other.max)
if self.min.is_extended_positive:
if other.min.is_extended_negative:
if other.max.is_zero:
return AccumBounds(-oo, self.min / other.min)
if other.max.is_extended_positive:
# the actual answer is a Union of AccumBounds,
# Union(AccumBounds(-oo, self.min/other.min),
# AccumBounds(self.min/other.max, oo))
return AccumBounds(-oo, oo)
if other.min.is_zero and other.max.is_extended_positive:
return AccumBounds(self.min / other.max, oo)
elif other.is_extended_real:
if other is S.Infinity or other is S.NegativeInfinity:
if self == AccumBounds(-oo, oo):
return AccumBounds(-oo, oo)
if self.max is S.Infinity:
return AccumBounds(Min(0, other), Max(0, other))
if self.min is S.NegativeInfinity:
return AccumBounds(Min(0, -other), Max(0, -other))
if other.is_extended_positive:
return AccumBounds(self.min / other, self.max / other)
elif other.is_extended_negative:
return AccumBounds(self.max / other, self.min / other)
return Mul(self, 1 / other, evaluate=False)
return NotImplemented
__truediv__ = __div__
@_sympifyit('other', NotImplemented)
def __rdiv__(self, other):
if isinstance(other, Expr):
if other.is_extended_real:
if other.is_zero:
return S.Zero
if S.Zero in self:
if self.min.is_zero:
if other.is_extended_positive:
return AccumBounds(Mul(other, 1 / self.max), oo)
if other.is_extended_negative:
return AccumBounds(-oo, Mul(other, 1 / self.max))
if self.max.is_zero:
if other.is_extended_positive:
return AccumBounds(-oo, Mul(other, 1 / self.min))
if other.is_extended_negative:
return AccumBounds(Mul(other, 1 / self.min), oo)
return AccumBounds(-oo, oo)
else:
return AccumBounds(Min(other / self.min, other / self.max),
Max(other / self.min, other / self.max))
return Mul(other, 1 / self, evaluate=False)
else:
return NotImplemented
__rtruediv__ = __rdiv__
@_sympifyit('other', NotImplemented)
def __pow__(self, other):
from sympy.functions.elementary.miscellaneous import real_root
if isinstance(other, Expr):
if other is S.Infinity:
if self.min.is_extended_nonnegative:
if self.max < 1:
return S.Zero
if self.min > 1:
return S.Infinity
return AccumBounds(0, oo)
elif self.max.is_extended_negative:
if self.min > -1:
return S.Zero
if self.max < -1:
return FiniteSet(-oo, oo)
return AccumBounds(-oo, oo)
else:
if self.min > -1:
if self.max < 1:
return S.Zero
return AccumBounds(0, oo)
return AccumBounds(-oo, oo)
if other is S.NegativeInfinity:
return (1 / self)**oo
if other.is_extended_real and other.is_number:
if other.is_zero:
return S.One
if other.is_Integer:
if self.min.is_extended_positive:
return AccumBounds(
Min(self.min ** other, self.max ** other),
Max(self.min ** other, self.max ** other))
elif self.max.is_extended_negative:
return AccumBounds(
Min(self.max ** other, self.min ** other),
Max(self.max ** other, self.min ** other))
if other % 2 == 0:
if other.is_extended_negative:
if self.min.is_zero:
return AccumBounds(self.max**other, oo)
if self.max.is_zero:
return AccumBounds(self.min**other, oo)
return AccumBounds(0, oo)
return AccumBounds(
S.Zero, Max(self.min**other, self.max**other))
else:
if other.is_extended_negative:
if self.min.is_zero:
return AccumBounds(self.max**other, oo)
if self.max.is_zero:
return AccumBounds(-oo, self.min**other)
return AccumBounds(-oo, oo)
return AccumBounds(self.min**other, self.max**other)
num, den = other.as_numer_denom()
if num == S.One:
if den % 2 == 0:
if S.Zero in self:
if self.min.is_extended_negative:
return AccumBounds(0, real_root(self.max, den))
return AccumBounds(real_root(self.min, den),
real_root(self.max, den))
if den!=1:
num_pow = self**num
return num_pow**(1 / den)
return AccumBounds(-oo, oo)
return NotImplemented
def __abs__(self):
if self.max.is_extended_negative:
return self.__neg__()
elif self.min.is_extended_negative:
return AccumBounds(S.Zero, Max(abs(self.min), self.max))
else:
return self
def __lt__(self, other):
"""
Returns True if range of values attained by `self` AccumulationBounds
object is less than the range of values attained by `other`, where
other may be any value of type AccumulationBounds object or extended
real number value, False if `other` satisfies the same property, else
an unevaluated Relational
Examples
========
>>> from sympy import AccumBounds, oo
>>> AccumBounds(1, 3) < AccumBounds(4, oo)
True
>>> AccumBounds(1, 4) < AccumBounds(3, 4)
AccumBounds(1, 4) < AccumBounds(3, 4)
>>> AccumBounds(1, oo) < -1
False
"""
other = _sympify(other)
if isinstance(other, AccumBounds):
if self.max < other.min:
return True
if self.min >= other.max:
return False
elif not other.is_extended_real:
raise TypeError(
"Invalid comparison of %s %s" %
(type(other), other))
elif other.is_comparable:
if self.max < other:
return True
if self.min >= other:
return False
return super(AccumulationBounds, self).__lt__(other)
def __le__(self, other):
"""
Returns True if range of values attained by `self` AccumulationBounds
object is less than or equal to the range of values attained by
`other`, where other may be any value of type AccumulationBounds
object or extended real number value, False if `other`
satisfies the same property, else an unevaluated Relational.
Examples
========
>>> from sympy import AccumBounds, oo
>>> AccumBounds(1, 3) <= AccumBounds(4, oo)
True
>>> AccumBounds(1, 4) <= AccumBounds(3, 4)
AccumBounds(1, 4) <= AccumBounds(3, 4)
>>> AccumBounds(1, 3) <= 0
False
"""
other = _sympify(other)
if isinstance(other, AccumBounds):
if self.max <= other.min:
return True
if self.min > other.max:
return False
elif not other.is_extended_real:
raise TypeError(
"Invalid comparison of %s %s" %
(type(other), other))
elif other.is_comparable:
if self.max <= other:
return True
if self.min > other:
return False
return super(AccumulationBounds, self).__le__(other)
def __gt__(self, other):
"""
Returns True if range of values attained by `self` AccumulationBounds
object is greater than the range of values attained by `other`,
where other may be any value of type AccumulationBounds object or
extended real number value, False if `other` satisfies
the same property, else an unevaluated Relational.
Examples
========
>>> from sympy import AccumBounds, oo
>>> AccumBounds(1, 3) > AccumBounds(4, oo)
False
>>> AccumBounds(1, 4) > AccumBounds(3, 4)
AccumBounds(1, 4) > AccumBounds(3, 4)
>>> AccumBounds(1, oo) > -1
True
"""
other = _sympify(other)
if isinstance(other, AccumBounds):
if self.min > other.max:
return True
if self.max <= other.min:
return False
elif not other.is_extended_real:
raise TypeError(
"Invalid comparison of %s %s" %
(type(other), other))
elif other.is_comparable:
if self.min > other:
return True
if self.max <= other:
return False
return super(AccumulationBounds, self).__gt__(other)
def __ge__(self, other):
"""
Returns True if range of values attained by `self` AccumulationBounds
object is less that the range of values attained by `other`, where
other may be any value of type AccumulationBounds object or extended
real number value, False if `other` satisfies the same
property, else an unevaluated Relational.
Examples
========
>>> from sympy import AccumBounds, oo
>>> AccumBounds(1, 3) >= AccumBounds(4, oo)
False
>>> AccumBounds(1, 4) >= AccumBounds(3, 4)
AccumBounds(1, 4) >= AccumBounds(3, 4)
>>> AccumBounds(1, oo) >= 1
True
"""
other = _sympify(other)
if isinstance(other, AccumBounds):
if self.min >= other.max:
return True
if self.max < other.min:
return False
elif not other.is_extended_real:
raise TypeError(
"Invalid comparison of %s %s" %
(type(other), other))
elif other.is_comparable:
if self.min >= other:
return True
if self.max < other:
return False
return super(AccumulationBounds, self).__ge__(other)
def __contains__(self, other):
"""
Returns True if other is contained in self, where other
belongs to extended real numbers, False if not contained,
otherwise TypeError is raised.
Examples
========
>>> from sympy import AccumBounds, oo
>>> 1 in AccumBounds(-1, 3)
True
-oo and oo go together as limits (in AccumulationBounds).
>>> -oo in AccumBounds(1, oo)
True
>>> oo in AccumBounds(-oo, 0)
True
"""
other = _sympify(other)
if other is S.Infinity or other is S.NegativeInfinity:
if self.min is S.NegativeInfinity or self.max is S.Infinity:
return True
return False
rv = And(self.min <= other, self.max >= other)
if rv not in (True, False):
raise TypeError("input failed to evaluate")
return rv
def intersection(self, other):
"""
Returns the intersection of 'self' and 'other'.
Here other can be an instance of FiniteSet or AccumulationBounds.
Parameters
==========
other: AccumulationBounds
Another AccumulationBounds object with which the intersection
has to be computed.
Returns
=======
AccumulationBounds
Intersection of 'self' and 'other'.
Examples
========
>>> from sympy import AccumBounds, FiniteSet
>>> AccumBounds(1, 3).intersection(AccumBounds(2, 4))
AccumBounds(2, 3)
>>> AccumBounds(1, 3).intersection(AccumBounds(4, 6))
EmptySet
>>> AccumBounds(1, 4).intersection(FiniteSet(1, 2, 5))
FiniteSet(1, 2)
"""
if not isinstance(other, (AccumBounds, FiniteSet)):
raise TypeError(
"Input must be AccumulationBounds or FiniteSet object")
if isinstance(other, FiniteSet):
fin_set = S.EmptySet
for i in other:
if i in self:
fin_set = fin_set + FiniteSet(i)
return fin_set
if self.max < other.min or self.min > other.max:
return S.EmptySet
if self.min <= other.min:
if self.max <= other.max:
return AccumBounds(other.min, self.max)
if self.max > other.max:
return other
if other.min <= self.min:
if other.max < self.max:
return AccumBounds(self.min, other.max)
if other.max > self.max:
return self
def union(self, other):
# TODO : Devise a better method for Union of AccumBounds
# this method is not actually correct and
# can be made better
if not isinstance(other, AccumBounds):
raise TypeError(
"Input must be AccumulationBounds or FiniteSet object")
if self.min <= other.min and self.max >= other.min:
return AccumBounds(self.min, Max(self.max, other.max))
if other.min <= self.min and other.max >= self.min:
return AccumBounds(other.min, Max(self.max, other.max))
# setting an alias for AccumulationBounds
AccumBounds = AccumulationBounds
|
7b6f05e10368bcb4f048fda1773d901763619210ead7b815e8794d64c9071f6c | """ Generic SymPy-Independent Strategies """
from __future__ import print_function, division
from sympy.core.compatibility import get_function_name
identity = lambda x: x
def exhaust(rule):
""" Apply a rule repeatedly until it has no effect """
def exhaustive_rl(expr):
new, old = rule(expr), expr
while new != old:
new, old = rule(new), new
return new
return exhaustive_rl
def memoize(rule):
""" Memoized version of a rule """
cache = {}
def memoized_rl(expr):
if expr in cache:
return cache[expr]
else:
result = rule(expr)
cache[expr] = result
return result
return memoized_rl
def condition(cond, rule):
""" Only apply rule if condition is true """
def conditioned_rl(expr):
if cond(expr):
return rule(expr)
else:
return expr
return conditioned_rl
def chain(*rules):
"""
Compose a sequence of rules so that they apply to the expr sequentially
"""
def chain_rl(expr):
for rule in rules:
expr = rule(expr)
return expr
return chain_rl
def debug(rule, file=None):
""" Print out before and after expressions each time rule is used """
if file is None:
from sys import stdout
file = stdout
def debug_rl(*args, **kwargs):
expr = args[0]
result = rule(*args, **kwargs)
if result != expr:
file.write("Rule: %s\n" % get_function_name(rule))
file.write("In: %s\nOut: %s\n\n"%(expr, result))
return result
return debug_rl
def null_safe(rule):
""" Return original expr if rule returns None """
def null_safe_rl(expr):
result = rule(expr)
if result is None:
return expr
else:
return result
return null_safe_rl
def tryit(rule, exception):
""" Return original expr if rule raises exception """
def try_rl(expr):
try:
return rule(expr)
except exception:
return expr
return try_rl
def do_one(*rules):
""" Try each of the rules until one works. Then stop. """
def do_one_rl(expr):
for rl in rules:
result = rl(expr)
if result != expr:
return result
return expr
return do_one_rl
def switch(key, ruledict):
""" Select a rule based on the result of key called on the function """
def switch_rl(expr):
rl = ruledict.get(key(expr), identity)
return rl(expr)
return switch_rl
def minimize(*rules, **kwargs):
""" Select result of rules that minimizes objective
>>> from sympy.strategies import minimize
>>> inc = lambda x: x + 1
>>> dec = lambda x: x - 1
>>> rl = minimize(inc, dec)
>>> rl(4)
3
>>> rl = minimize(inc, dec, objective=lambda x: -x) # maximize
>>> rl(4)
5
"""
objective = kwargs.get('objective', identity)
def minrule(expr):
return min([rule(expr) for rule in rules], key=objective)
return minrule
|
d3ad0a13ed94ed0c331fddaece7d5102ecbda33ed98fbee5f6dec05dcb125621 | """ Generic Rules for SymPy
This file assumes knowledge of Basic and little else.
"""
from __future__ import print_function, division
from sympy.utilities.iterables import sift
from .util import new
# Functions that create rules
def rm_id(isid, new=new):
""" Create a rule to remove identities
isid - fn :: x -> Bool --- whether or not this element is an identity
>>> from sympy.strategies import rm_id
>>> from sympy import Basic
>>> remove_zeros = rm_id(lambda x: x==0)
>>> remove_zeros(Basic(1, 0, 2))
Basic(1, 2)
>>> remove_zeros(Basic(0, 0)) # If only identites then we keep one
Basic(0)
See Also:
unpack
"""
def ident_remove(expr):
""" Remove identities """
ids = list(map(isid, expr.args))
if sum(ids) == 0: # No identities. Common case
return expr
elif sum(ids) != len(ids): # there is at least one non-identity
return new(expr.__class__,
*[arg for arg, x in zip(expr.args, ids) if not x])
else:
return new(expr.__class__, expr.args[0])
return ident_remove
def glom(key, count, combine):
""" Create a rule to conglomerate identical args
>>> from sympy.strategies import glom
>>> from sympy import Add
>>> from sympy.abc import x
>>> key = lambda x: x.as_coeff_Mul()[1]
>>> count = lambda x: x.as_coeff_Mul()[0]
>>> combine = lambda cnt, arg: cnt * arg
>>> rl = glom(key, count, combine)
>>> rl(Add(x, -x, 3*x, 2, 3, evaluate=False))
3*x + 5
Wait, how are key, count and combine supposed to work?
>>> key(2*x)
x
>>> count(2*x)
2
>>> combine(2, x)
2*x
"""
def conglomerate(expr):
""" Conglomerate together identical args x + x -> 2x """
groups = sift(expr.args, key)
counts = dict((k, sum(map(count, args))) for k, args in groups.items())
newargs = [combine(cnt, mat) for mat, cnt in counts.items()]
if set(newargs) != set(expr.args):
return new(type(expr), *newargs)
else:
return expr
return conglomerate
def sort(key, new=new):
""" Create a rule to sort by a key function
>>> from sympy.strategies import sort
>>> from sympy import Basic
>>> sort_rl = sort(str)
>>> sort_rl(Basic(3, 1, 2))
Basic(1, 2, 3)
"""
def sort_rl(expr):
return new(expr.__class__, *sorted(expr.args, key=key))
return sort_rl
def distribute(A, B):
""" Turns an A containing Bs into a B of As
where A, B are container types
>>> from sympy.strategies import distribute
>>> from sympy import Add, Mul, symbols
>>> x, y = symbols('x,y')
>>> dist = distribute(Mul, Add)
>>> expr = Mul(2, x+y, evaluate=False)
>>> expr
2*(x + y)
>>> dist(expr)
2*x + 2*y
"""
def distribute_rl(expr):
for i, arg in enumerate(expr.args):
if isinstance(arg, B):
first, b, tail = expr.args[:i], expr.args[i], expr.args[i+1:]
return B(*[A(*(first + (arg,) + tail)) for arg in b.args])
return expr
return distribute_rl
def subs(a, b):
""" Replace expressions exactly """
def subs_rl(expr):
if expr == a:
return b
else:
return expr
return subs_rl
# Functions that are rules
def unpack(expr):
""" Rule to unpack singleton args
>>> from sympy.strategies import unpack
>>> from sympy import Basic
>>> unpack(Basic(2))
2
"""
if len(expr.args) == 1:
return expr.args[0]
else:
return expr
def flatten(expr, new=new):
""" Flatten T(a, b, T(c, d), T2(e)) to T(a, b, c, d, T2(e)) """
cls = expr.__class__
args = []
for arg in expr.args:
if arg.__class__ == cls:
args.extend(arg.args)
else:
args.append(arg)
return new(expr.__class__, *args)
def rebuild(expr):
""" Rebuild a SymPy tree
This function recursively calls constructors in the expression tree.
This forces canonicalization and removes ugliness introduced by the use of
Basic.__new__
"""
if expr.is_Atom:
return expr
else:
return expr.func(*list(map(rebuild, expr.args)))
|
d2736f1ff82eb0ddddac9bd9f28165e3508973d2b0f1207c2a834fbf33a117f4 | """
module for generating C, C++, Fortran77, Fortran90, Julia, Rust
and Octave/Matlab routines that evaluate sympy expressions.
This module is work in progress.
Only the milestones with a '+' character in the list below have been completed.
--- How is sympy.utilities.codegen different from sympy.printing.ccode? ---
We considered the idea to extend the printing routines for sympy functions in
such a way that it prints complete compilable code, but this leads to a few
unsurmountable issues that can only be tackled with dedicated code generator:
- For C, one needs both a code and a header file, while the printing routines
generate just one string. This code generator can be extended to support
.pyf files for f2py.
- SymPy functions are not concerned with programming-technical issues, such
as input, output and input-output arguments. Other examples are contiguous
or non-contiguous arrays, including headers of other libraries such as gsl
or others.
- It is highly interesting to evaluate several sympy functions in one C
routine, eventually sharing common intermediate results with the help
of the cse routine. This is more than just printing.
- From the programming perspective, expressions with constants should be
evaluated in the code generator as much as possible. This is different
for printing.
--- Basic assumptions ---
* A generic Routine data structure describes the routine that must be
translated into C/Fortran/... code. This data structure covers all
features present in one or more of the supported languages.
* Descendants from the CodeGen class transform multiple Routine instances
into compilable code. Each derived class translates into a specific
language.
* In many cases, one wants a simple workflow. The friendly functions in the
last part are a simple api on top of the Routine/CodeGen stuff. They are
easier to use, but are less powerful.
--- Milestones ---
+ First working version with scalar input arguments, generating C code,
tests
+ Friendly functions that are easier to use than the rigorous
Routine/CodeGen workflow.
+ Integer and Real numbers as input and output
+ Output arguments
+ InputOutput arguments
+ Sort input/output arguments properly
+ Contiguous array arguments (numpy matrices)
+ Also generate .pyf code for f2py (in autowrap module)
+ Isolate constants and evaluate them beforehand in double precision
+ Fortran 90
+ Octave/Matlab
- Common Subexpression Elimination
- User defined comments in the generated code
- Optional extra include lines for libraries/objects that can eval special
functions
- Test other C compilers and libraries: gcc, tcc, libtcc, gcc+gsl, ...
- Contiguous array arguments (sympy matrices)
- Non-contiguous array arguments (sympy matrices)
- ccode must raise an error when it encounters something that can not be
translated into c. ccode(integrate(sin(x)/x, x)) does not make sense.
- Complex numbers as input and output
- A default complex datatype
- Include extra information in the header: date, user, hostname, sha1
hash, ...
- Fortran 77
- C++
- Python
- Julia
- Rust
- ...
"""
from __future__ import print_function, division
import os
import textwrap
from sympy import __version__ as sympy_version
from sympy.core import Symbol, S, Tuple, Equality, Function, Basic
from sympy.core.compatibility import is_sequence, StringIO
from sympy.printing.ccode import c_code_printers
from sympy.printing.codeprinter import AssignmentError
from sympy.printing.fcode import FCodePrinter
from sympy.printing.julia import JuliaCodePrinter
from sympy.printing.octave import OctaveCodePrinter
from sympy.printing.rust import RustCodePrinter
from sympy.tensor import Idx, Indexed, IndexedBase
from sympy.matrices import (MatrixSymbol, ImmutableMatrix, MatrixBase,
MatrixExpr, MatrixSlice)
__all__ = [
# description of routines
"Routine", "DataType", "default_datatypes", "get_default_datatype",
"Argument", "InputArgument", "OutputArgument", "Result",
# routines -> code
"CodeGen", "CCodeGen", "FCodeGen", "JuliaCodeGen", "OctaveCodeGen",
"RustCodeGen",
# friendly functions
"codegen", "make_routine",
]
#
# Description of routines
#
class Routine(object):
"""Generic description of evaluation routine for set of expressions.
A CodeGen class can translate instances of this class into code in a
particular language. The routine specification covers all the features
present in these languages. The CodeGen part must raise an exception
when certain features are not present in the target language. For
example, multiple return values are possible in Python, but not in C or
Fortran. Another example: Fortran and Python support complex numbers,
while C does not.
"""
def __init__(self, name, arguments, results, local_vars, global_vars):
"""Initialize a Routine instance.
Parameters
==========
name : string
Name of the routine.
arguments : list of Arguments
These are things that appear in arguments of a routine, often
appearing on the right-hand side of a function call. These are
commonly InputArguments but in some languages, they can also be
OutputArguments or InOutArguments (e.g., pass-by-reference in C
code).
results : list of Results
These are the return values of the routine, often appearing on
the left-hand side of a function call. The difference between
Results and OutputArguments and when you should use each is
language-specific.
local_vars : list of Results
These are variables that will be defined at the beginning of the
function.
global_vars : list of Symbols
Variables which will not be passed into the function.
"""
# extract all input symbols and all symbols appearing in an expression
input_symbols = set([])
symbols = set([])
for arg in arguments:
if isinstance(arg, OutputArgument):
symbols.update(arg.expr.free_symbols - arg.expr.atoms(Indexed))
elif isinstance(arg, InputArgument):
input_symbols.add(arg.name)
elif isinstance(arg, InOutArgument):
input_symbols.add(arg.name)
symbols.update(arg.expr.free_symbols - arg.expr.atoms(Indexed))
else:
raise ValueError("Unknown Routine argument: %s" % arg)
for r in results:
if not isinstance(r, Result):
raise ValueError("Unknown Routine result: %s" % r)
symbols.update(r.expr.free_symbols - r.expr.atoms(Indexed))
local_symbols = set()
for r in local_vars:
if isinstance(r, Result):
symbols.update(r.expr.free_symbols - r.expr.atoms(Indexed))
local_symbols.add(r.name)
else:
local_symbols.add(r)
symbols = set([s.label if isinstance(s, Idx) else s for s in symbols])
# Check that all symbols in the expressions are covered by
# InputArguments/InOutArguments---subset because user could
# specify additional (unused) InputArguments or local_vars.
notcovered = symbols.difference(
input_symbols.union(local_symbols).union(global_vars))
if notcovered != set([]):
raise ValueError("Symbols needed for output are not in input " +
", ".join([str(x) for x in notcovered]))
self.name = name
self.arguments = arguments
self.results = results
self.local_vars = local_vars
self.global_vars = global_vars
def __str__(self):
return self.__class__.__name__ + "({name!r}, {arguments}, {results}, {local_vars}, {global_vars})".format(**self.__dict__)
__repr__ = __str__
@property
def variables(self):
"""Returns a set of all variables possibly used in the routine.
For routines with unnamed return values, the dummies that may or
may not be used will be included in the set.
"""
v = set(self.local_vars)
for arg in self.arguments:
v.add(arg.name)
for res in self.results:
v.add(res.result_var)
return v
@property
def result_variables(self):
"""Returns a list of OutputArgument, InOutArgument and Result.
If return values are present, they are at the end ot the list.
"""
args = [arg for arg in self.arguments if isinstance(
arg, (OutputArgument, InOutArgument))]
args.extend(self.results)
return args
class DataType(object):
"""Holds strings for a certain datatype in different languages."""
def __init__(self, cname, fname, pyname, jlname, octname, rsname):
self.cname = cname
self.fname = fname
self.pyname = pyname
self.jlname = jlname
self.octname = octname
self.rsname = rsname
default_datatypes = {
"int": DataType("int", "INTEGER*4", "int", "", "", "i32"),
"float": DataType("double", "REAL*8", "float", "", "", "f64"),
"complex": DataType("double", "COMPLEX*16", "complex", "", "", "float") #FIXME:
# complex is only supported in fortran, python, julia, and octave.
# So to not break c or rust code generation, we stick with double or
# float, respecitvely (but actually should raise an exception for
# explicitly complex variables (x.is_complex==True))
}
COMPLEX_ALLOWED = False
def get_default_datatype(expr, complex_allowed=None):
"""Derives an appropriate datatype based on the expression."""
if complex_allowed is None:
complex_allowed = COMPLEX_ALLOWED
if complex_allowed:
final_dtype = "complex"
else:
final_dtype = "float"
if expr.is_integer:
return default_datatypes["int"]
elif expr.is_real:
return default_datatypes["float"]
elif isinstance(expr, MatrixBase):
#check all entries
dt = "int"
for element in expr:
if dt == "int" and not element.is_integer:
dt = "float"
if dt == "float" and not element.is_real:
return default_datatypes[final_dtype]
return default_datatypes[dt]
else:
return default_datatypes[final_dtype]
class Variable(object):
"""Represents a typed variable."""
def __init__(self, name, datatype=None, dimensions=None, precision=None):
"""Return a new variable.
Parameters
==========
name : Symbol or MatrixSymbol
datatype : optional
When not given, the data type will be guessed based on the
assumptions on the symbol argument.
dimension : sequence containing tupes, optional
If present, the argument is interpreted as an array, where this
sequence of tuples specifies (lower, upper) bounds for each
index of the array.
precision : int, optional
Controls the precision of floating point constants.
"""
if not isinstance(name, (Symbol, MatrixSymbol)):
raise TypeError("The first argument must be a sympy symbol.")
if datatype is None:
datatype = get_default_datatype(name)
elif not isinstance(datatype, DataType):
raise TypeError("The (optional) `datatype' argument must be an "
"instance of the DataType class.")
if dimensions and not isinstance(dimensions, (tuple, list)):
raise TypeError(
"The dimension argument must be a sequence of tuples")
self._name = name
self._datatype = {
'C': datatype.cname,
'FORTRAN': datatype.fname,
'JULIA': datatype.jlname,
'OCTAVE': datatype.octname,
'PYTHON': datatype.pyname,
'RUST': datatype.rsname,
}
self.dimensions = dimensions
self.precision = precision
def __str__(self):
return "%s(%r)" % (self.__class__.__name__, self.name)
__repr__ = __str__
@property
def name(self):
return self._name
def get_datatype(self, language):
"""Returns the datatype string for the requested language.
Examples
========
>>> from sympy import Symbol
>>> from sympy.utilities.codegen import Variable
>>> x = Variable(Symbol('x'))
>>> x.get_datatype('c')
'double'
>>> x.get_datatype('fortran')
'REAL*8'
"""
try:
return self._datatype[language.upper()]
except KeyError:
raise CodeGenError("Has datatypes for languages: %s" %
", ".join(self._datatype))
class Argument(Variable):
"""An abstract Argument data structure: a name and a data type.
This structure is refined in the descendants below.
"""
pass
class InputArgument(Argument):
pass
class ResultBase(object):
"""Base class for all "outgoing" information from a routine.
Objects of this class stores a sympy expression, and a sympy object
representing a result variable that will be used in the generated code
only if necessary.
"""
def __init__(self, expr, result_var):
self.expr = expr
self.result_var = result_var
def __str__(self):
return "%s(%r, %r)" % (self.__class__.__name__, self.expr,
self.result_var)
__repr__ = __str__
class OutputArgument(Argument, ResultBase):
"""OutputArgument are always initialized in the routine."""
def __init__(self, name, result_var, expr, datatype=None, dimensions=None, precision=None):
"""Return a new variable.
Parameters
==========
name : Symbol, MatrixSymbol
The name of this variable. When used for code generation, this
might appear, for example, in the prototype of function in the
argument list.
result_var : Symbol, Indexed
Something that can be used to assign a value to this variable.
Typically the same as `name` but for Indexed this should be e.g.,
"y[i]" whereas `name` should be the Symbol "y".
expr : object
The expression that should be output, typically a SymPy
expression.
datatype : optional
When not given, the data type will be guessed based on the
assumptions on the symbol argument.
dimension : sequence containing tupes, optional
If present, the argument is interpreted as an array, where this
sequence of tuples specifies (lower, upper) bounds for each
index of the array.
precision : int, optional
Controls the precision of floating point constants.
"""
Argument.__init__(self, name, datatype, dimensions, precision)
ResultBase.__init__(self, expr, result_var)
def __str__(self):
return "%s(%r, %r, %r)" % (self.__class__.__name__, self.name, self.result_var, self.expr)
__repr__ = __str__
class InOutArgument(Argument, ResultBase):
"""InOutArgument are never initialized in the routine."""
def __init__(self, name, result_var, expr, datatype=None, dimensions=None, precision=None):
if not datatype:
datatype = get_default_datatype(expr)
Argument.__init__(self, name, datatype, dimensions, precision)
ResultBase.__init__(self, expr, result_var)
__init__.__doc__ = OutputArgument.__init__.__doc__
def __str__(self):
return "%s(%r, %r, %r)" % (self.__class__.__name__, self.name, self.expr,
self.result_var)
__repr__ = __str__
class Result(Variable, ResultBase):
"""An expression for a return value.
The name result is used to avoid conflicts with the reserved word
"return" in the python language. It is also shorter than ReturnValue.
These may or may not need a name in the destination (e.g., "return(x*y)"
might return a value without ever naming it).
"""
def __init__(self, expr, name=None, result_var=None, datatype=None,
dimensions=None, precision=None):
"""Initialize a return value.
Parameters
==========
expr : SymPy expression
name : Symbol, MatrixSymbol, optional
The name of this return variable. When used for code generation,
this might appear, for example, in the prototype of function in a
list of return values. A dummy name is generated if omitted.
result_var : Symbol, Indexed, optional
Something that can be used to assign a value to this variable.
Typically the same as `name` but for Indexed this should be e.g.,
"y[i]" whereas `name` should be the Symbol "y". Defaults to
`name` if omitted.
datatype : optional
When not given, the data type will be guessed based on the
assumptions on the expr argument.
dimension : sequence containing tupes, optional
If present, this variable is interpreted as an array,
where this sequence of tuples specifies (lower, upper)
bounds for each index of the array.
precision : int, optional
Controls the precision of floating point constants.
"""
# Basic because it is the base class for all types of expressions
if not isinstance(expr, (Basic, MatrixBase)):
raise TypeError("The first argument must be a sympy expression.")
if name is None:
name = 'result_%d' % abs(hash(expr))
if datatype is None:
#try to infer data type from the expression
datatype = get_default_datatype(expr)
if isinstance(name, str):
if isinstance(expr, (MatrixBase, MatrixExpr)):
name = MatrixSymbol(name, *expr.shape)
else:
name = Symbol(name)
if result_var is None:
result_var = name
Variable.__init__(self, name, datatype=datatype,
dimensions=dimensions, precision=precision)
ResultBase.__init__(self, expr, result_var)
def __str__(self):
return "%s(%r, %r, %r)" % (self.__class__.__name__, self.expr, self.name,
self.result_var)
__repr__ = __str__
#
# Transformation of routine objects into code
#
class CodeGen(object):
"""Abstract class for the code generators."""
printer = None # will be set to an instance of a CodePrinter subclass
def _indent_code(self, codelines):
return self.printer.indent_code(codelines)
def _printer_method_with_settings(self, method, settings=None, *args, **kwargs):
settings = settings or {}
ori = {k: self.printer._settings[k] for k in settings}
for k, v in settings.items():
self.printer._settings[k] = v
result = getattr(self.printer, method)(*args, **kwargs)
for k, v in ori.items():
self.printer._settings[k] = v
return result
def _get_symbol(self, s):
"""Returns the symbol as fcode prints it."""
if self.printer._settings['human']:
expr_str = self.printer.doprint(s)
else:
constants, not_supported, expr_str = self.printer.doprint(s)
if constants or not_supported:
raise ValueError("Failed to print %s" % str(s))
return expr_str.strip()
def __init__(self, project="project", cse=False):
"""Initialize a code generator.
Derived classes will offer more options that affect the generated
code.
"""
self.project = project
self.cse = cse
def routine(self, name, expr, argument_sequence=None, global_vars=None):
"""Creates an Routine object that is appropriate for this language.
This implementation is appropriate for at least C/Fortran. Subclasses
can override this if necessary.
Here, we assume at most one return value (the l-value) which must be
scalar. Additional outputs are OutputArguments (e.g., pointers on
right-hand-side or pass-by-reference). Matrices are always returned
via OutputArguments. If ``argument_sequence`` is None, arguments will
be ordered alphabetically, but with all InputArguments first, and then
OutputArgument and InOutArguments.
"""
if self.cse:
from sympy.simplify.cse_main import cse
if is_sequence(expr) and not isinstance(expr, (MatrixBase, MatrixExpr)):
if not expr:
raise ValueError("No expression given")
for e in expr:
if not e.is_Equality:
raise CodeGenError("Lists of expressions must all be Equalities. {} is not.".format(e))
# create a list of right hand sides and simplify them
rhs = [e.rhs for e in expr]
common, simplified = cse(rhs)
# pack the simplified expressions back up with their left hand sides
expr = [Equality(e.lhs, rhs) for e, rhs in zip(expr, simplified)]
else:
rhs = [expr]
if isinstance(expr, Equality):
common, simplified = cse(expr.rhs) #, ignore=in_out_args)
expr = Equality(expr.lhs, simplified[0])
else:
common, simplified = cse(expr)
expr = simplified
local_vars = [Result(b,a) for a,b in common]
local_symbols = set([a for a,_ in common])
local_expressions = Tuple(*[b for _,b in common])
else:
local_expressions = Tuple()
if is_sequence(expr) and not isinstance(expr, (MatrixBase, MatrixExpr)):
if not expr:
raise ValueError("No expression given")
expressions = Tuple(*expr)
else:
expressions = Tuple(expr)
if self.cse:
if {i.label for i in expressions.atoms(Idx)} != set():
raise CodeGenError("CSE and Indexed expressions do not play well together yet")
else:
# local variables for indexed expressions
local_vars = {i.label for i in expressions.atoms(Idx)}
local_symbols = local_vars
# global variables
global_vars = set() if global_vars is None else set(global_vars)
# symbols that should be arguments
symbols = (expressions.free_symbols | local_expressions.free_symbols) - local_symbols - global_vars
new_symbols = set([])
new_symbols.update(symbols)
for symbol in symbols:
if isinstance(symbol, Idx):
new_symbols.remove(symbol)
new_symbols.update(symbol.args[1].free_symbols)
if isinstance(symbol, Indexed):
new_symbols.remove(symbol)
symbols = new_symbols
# Decide whether to use output argument or return value
return_val = []
output_args = []
for expr in expressions:
if isinstance(expr, Equality):
out_arg = expr.lhs
expr = expr.rhs
if isinstance(out_arg, Indexed):
dims = tuple([ (S.Zero, dim - 1) for dim in out_arg.shape])
symbol = out_arg.base.label
elif isinstance(out_arg, Symbol):
dims = []
symbol = out_arg
elif isinstance(out_arg, MatrixSymbol):
dims = tuple([ (S.Zero, dim - 1) for dim in out_arg.shape])
symbol = out_arg
else:
raise CodeGenError("Only Indexed, Symbol, or MatrixSymbol "
"can define output arguments.")
if expr.has(symbol):
output_args.append(
InOutArgument(symbol, out_arg, expr, dimensions=dims))
else:
output_args.append(
OutputArgument(symbol, out_arg, expr, dimensions=dims))
# remove duplicate arguments when they are not local variables
if symbol not in local_vars:
# avoid duplicate arguments
symbols.remove(symbol)
elif isinstance(expr, (ImmutableMatrix, MatrixSlice)):
# Create a "dummy" MatrixSymbol to use as the Output arg
out_arg = MatrixSymbol('out_%s' % abs(hash(expr)), *expr.shape)
dims = tuple([(S.Zero, dim - 1) for dim in out_arg.shape])
output_args.append(
OutputArgument(out_arg, out_arg, expr, dimensions=dims))
else:
return_val.append(Result(expr))
arg_list = []
# setup input argument list
# helper to get dimensions for data for array-like args
def dimensions(s):
return [(S.Zero, dim - 1) for dim in s.shape]
array_symbols = {}
for array in expressions.atoms(Indexed) | local_expressions.atoms(Indexed):
array_symbols[array.base.label] = array
for array in expressions.atoms(MatrixSymbol) | local_expressions.atoms(MatrixSymbol):
array_symbols[array] = array
for symbol in sorted(symbols, key=str):
if symbol in array_symbols:
array = array_symbols[symbol]
metadata = {'dimensions': dimensions(array)}
else:
metadata = {}
arg_list.append(InputArgument(symbol, **metadata))
output_args.sort(key=lambda x: str(x.name))
arg_list.extend(output_args)
if argument_sequence is not None:
# if the user has supplied IndexedBase instances, we'll accept that
new_sequence = []
for arg in argument_sequence:
if isinstance(arg, IndexedBase):
new_sequence.append(arg.label)
else:
new_sequence.append(arg)
argument_sequence = new_sequence
missing = [x for x in arg_list if x.name not in argument_sequence]
if missing:
msg = "Argument list didn't specify: {0} "
msg = msg.format(", ".join([str(m.name) for m in missing]))
raise CodeGenArgumentListError(msg, missing)
# create redundant arguments to produce the requested sequence
name_arg_dict = {x.name: x for x in arg_list}
new_args = []
for symbol in argument_sequence:
try:
new_args.append(name_arg_dict[symbol])
except KeyError:
if isinstance(symbol, (IndexedBase, MatrixSymbol)):
metadata = {'dimensions': dimensions(symbol)}
else:
metadata = {}
new_args.append(InputArgument(symbol, **metadata))
arg_list = new_args
return Routine(name, arg_list, return_val, local_vars, global_vars)
def write(self, routines, prefix, to_files=False, header=True, empty=True):
"""Writes all the source code files for the given routines.
The generated source is returned as a list of (filename, contents)
tuples, or is written to files (see below). Each filename consists
of the given prefix, appended with an appropriate extension.
Parameters
==========
routines : list
A list of Routine instances to be written
prefix : string
The prefix for the output files
to_files : bool, optional
When True, the output is written to files. Otherwise, a list
of (filename, contents) tuples is returned. [default: False]
header : bool, optional
When True, a header comment is included on top of each source
file. [default: True]
empty : bool, optional
When True, empty lines are included to structure the source
files. [default: True]
"""
if to_files:
for dump_fn in self.dump_fns:
filename = "%s.%s" % (prefix, dump_fn.extension)
with open(filename, "w") as f:
dump_fn(self, routines, f, prefix, header, empty)
else:
result = []
for dump_fn in self.dump_fns:
filename = "%s.%s" % (prefix, dump_fn.extension)
contents = StringIO()
dump_fn(self, routines, contents, prefix, header, empty)
result.append((filename, contents.getvalue()))
return result
def dump_code(self, routines, f, prefix, header=True, empty=True):
"""Write the code by calling language specific methods.
The generated file contains all the definitions of the routines in
low-level code and refers to the header file if appropriate.
Parameters
==========
routines : list
A list of Routine instances.
f : file-like
Where to write the file.
prefix : string
The filename prefix, used to refer to the proper header file.
Only the basename of the prefix is used.
header : bool, optional
When True, a header comment is included on top of each source
file. [default : True]
empty : bool, optional
When True, empty lines are included to structure the source
files. [default : True]
"""
code_lines = self._preprocessor_statements(prefix)
for routine in routines:
if empty:
code_lines.append("\n")
code_lines.extend(self._get_routine_opening(routine))
code_lines.extend(self._declare_arguments(routine))
code_lines.extend(self._declare_globals(routine))
code_lines.extend(self._declare_locals(routine))
if empty:
code_lines.append("\n")
code_lines.extend(self._call_printer(routine))
if empty:
code_lines.append("\n")
code_lines.extend(self._get_routine_ending(routine))
code_lines = self._indent_code(''.join(code_lines))
if header:
code_lines = ''.join(self._get_header() + [code_lines])
if code_lines:
f.write(code_lines)
class CodeGenError(Exception):
pass
class CodeGenArgumentListError(Exception):
@property
def missing_args(self):
return self.args[1]
header_comment = """Code generated with sympy %(version)s
See http://www.sympy.org/ for more information.
This file is part of '%(project)s'
"""
class CCodeGen(CodeGen):
"""Generator for C code.
The .write() method inherited from CodeGen will output a code file and
an interface file, <prefix>.c and <prefix>.h respectively.
"""
code_extension = "c"
interface_extension = "h"
standard = 'c99'
def __init__(self, project="project", printer=None,
preprocessor_statements=None, cse=False):
super(CCodeGen, self).__init__(project=project, cse=cse)
self.printer = printer or c_code_printers[self.standard.lower()]()
self.preprocessor_statements = preprocessor_statements
if preprocessor_statements is None:
self.preprocessor_statements = ['#include <math.h>']
def _get_header(self):
"""Writes a common header for the generated files."""
code_lines = []
code_lines.append("/" + "*"*78 + '\n')
tmp = header_comment % {"version": sympy_version,
"project": self.project}
for line in tmp.splitlines():
code_lines.append(" *%s*\n" % line.center(76))
code_lines.append(" " + "*"*78 + "/\n")
return code_lines
def get_prototype(self, routine):
"""Returns a string for the function prototype of the routine.
If the routine has multiple result objects, an CodeGenError is
raised.
See: https://en.wikipedia.org/wiki/Function_prototype
"""
if len(routine.results) > 1:
raise CodeGenError("C only supports a single or no return value.")
elif len(routine.results) == 1:
ctype = routine.results[0].get_datatype('C')
else:
ctype = "void"
type_args = []
for arg in routine.arguments:
name = self.printer.doprint(arg.name)
if arg.dimensions or isinstance(arg, ResultBase):
type_args.append((arg.get_datatype('C'), "*%s" % name))
else:
type_args.append((arg.get_datatype('C'), name))
arguments = ", ".join([ "%s %s" % t for t in type_args])
return "%s %s(%s)" % (ctype, routine.name, arguments)
def _preprocessor_statements(self, prefix):
code_lines = []
code_lines.append('#include "{}.h"'.format(os.path.basename(prefix)))
code_lines.extend(self.preprocessor_statements)
code_lines = ['{}\n'.format(l) for l in code_lines]
return code_lines
def _get_routine_opening(self, routine):
prototype = self.get_prototype(routine)
return ["%s {\n" % prototype]
def _declare_arguments(self, routine):
# arguments are declared in prototype
return []
def _declare_globals(self, routine):
# global variables are not explicitly declared within C functions
return []
def _declare_locals(self, routine):
# Compose a list of symbols to be dereferenced in the function
# body. These are the arguments that were passed by a reference
# pointer, excluding arrays.
dereference = []
for arg in routine.arguments:
if isinstance(arg, ResultBase) and not arg.dimensions:
dereference.append(arg.name)
code_lines = []
for result in routine.local_vars:
# local variables that are simple symbols such as those used as indices into
# for loops are defined declared elsewhere.
if not isinstance(result, Result):
continue
if result.name != result.result_var:
raise CodeGen("Result variable and name should match: {}".format(result))
assign_to = result.name
t = result.get_datatype('c')
if isinstance(result.expr, (MatrixBase, MatrixExpr)):
dims = result.expr.shape
if dims[1] != 1:
raise CodeGenError("Only column vectors are supported in local variabels. Local result {} has dimensions {}".format(result, dims))
code_lines.append("{0} {1}[{2}];\n".format(t, str(assign_to), dims[0]))
prefix = ""
else:
prefix = "const {0} ".format(t)
constants, not_c, c_expr = self._printer_method_with_settings(
'doprint', dict(human=False, dereference=dereference),
result.expr, assign_to=assign_to)
for name, value in sorted(constants, key=str):
code_lines.append("double const %s = %s;\n" % (name, value))
code_lines.append("{}{}\n".format(prefix, c_expr))
return code_lines
def _call_printer(self, routine):
code_lines = []
# Compose a list of symbols to be dereferenced in the function
# body. These are the arguments that were passed by a reference
# pointer, excluding arrays.
dereference = []
for arg in routine.arguments:
if isinstance(arg, ResultBase) and not arg.dimensions:
dereference.append(arg.name)
return_val = None
for result in routine.result_variables:
if isinstance(result, Result):
assign_to = routine.name + "_result"
t = result.get_datatype('c')
code_lines.append("{0} {1};\n".format(t, str(assign_to)))
return_val = assign_to
else:
assign_to = result.result_var
try:
constants, not_c, c_expr = self._printer_method_with_settings(
'doprint', dict(human=False, dereference=dereference),
result.expr, assign_to=assign_to)
except AssignmentError:
assign_to = result.result_var
code_lines.append(
"%s %s;\n" % (result.get_datatype('c'), str(assign_to)))
constants, not_c, c_expr = self._printer_method_with_settings(
'doprint', dict(human=False, dereference=dereference),
result.expr, assign_to=assign_to)
for name, value in sorted(constants, key=str):
code_lines.append("double const %s = %s;\n" % (name, value))
code_lines.append("%s\n" % c_expr)
if return_val:
code_lines.append(" return %s;\n" % return_val)
return code_lines
def _get_routine_ending(self, routine):
return ["}\n"]
def dump_c(self, routines, f, prefix, header=True, empty=True):
self.dump_code(routines, f, prefix, header, empty)
dump_c.extension = code_extension # type: ignore
dump_c.__doc__ = CodeGen.dump_code.__doc__
def dump_h(self, routines, f, prefix, header=True, empty=True):
"""Writes the C header file.
This file contains all the function declarations.
Parameters
==========
routines : list
A list of Routine instances.
f : file-like
Where to write the file.
prefix : string
The filename prefix, used to construct the include guards.
Only the basename of the prefix is used.
header : bool, optional
When True, a header comment is included on top of each source
file. [default : True]
empty : bool, optional
When True, empty lines are included to structure the source
files. [default : True]
"""
if header:
print(''.join(self._get_header()), file=f)
guard_name = "%s__%s__H" % (self.project.replace(
" ", "_").upper(), prefix.replace("/", "_").upper())
# include guards
if empty:
print(file=f)
print("#ifndef %s" % guard_name, file=f)
print("#define %s" % guard_name, file=f)
if empty:
print(file=f)
# declaration of the function prototypes
for routine in routines:
prototype = self.get_prototype(routine)
print("%s;" % prototype, file=f)
# end if include guards
if empty:
print(file=f)
print("#endif", file=f)
if empty:
print(file=f)
dump_h.extension = interface_extension # type: ignore
# This list of dump functions is used by CodeGen.write to know which dump
# functions it has to call.
dump_fns = [dump_c, dump_h]
class C89CodeGen(CCodeGen):
standard = 'C89'
class C99CodeGen(CCodeGen):
standard = 'C99'
class FCodeGen(CodeGen):
"""Generator for Fortran 95 code
The .write() method inherited from CodeGen will output a code file and
an interface file, <prefix>.f90 and <prefix>.h respectively.
"""
code_extension = "f90"
interface_extension = "h"
def __init__(self, project='project', printer=None):
super(FCodeGen, self).__init__(project)
self.printer = printer or FCodePrinter()
def _get_header(self):
"""Writes a common header for the generated files."""
code_lines = []
code_lines.append("!" + "*"*78 + '\n')
tmp = header_comment % {"version": sympy_version,
"project": self.project}
for line in tmp.splitlines():
code_lines.append("!*%s*\n" % line.center(76))
code_lines.append("!" + "*"*78 + '\n')
return code_lines
def _preprocessor_statements(self, prefix):
return []
def _get_routine_opening(self, routine):
"""Returns the opening statements of the fortran routine."""
code_list = []
if len(routine.results) > 1:
raise CodeGenError(
"Fortran only supports a single or no return value.")
elif len(routine.results) == 1:
result = routine.results[0]
code_list.append(result.get_datatype('fortran'))
code_list.append("function")
else:
code_list.append("subroutine")
args = ", ".join("%s" % self._get_symbol(arg.name)
for arg in routine.arguments)
call_sig = "{0}({1})\n".format(routine.name, args)
# Fortran 95 requires all lines be less than 132 characters, so wrap
# this line before appending.
call_sig = ' &\n'.join(textwrap.wrap(call_sig,
width=60,
break_long_words=False)) + '\n'
code_list.append(call_sig)
code_list = [' '.join(code_list)]
code_list.append('implicit none\n')
return code_list
def _declare_arguments(self, routine):
# argument type declarations
code_list = []
array_list = []
scalar_list = []
for arg in routine.arguments:
if isinstance(arg, InputArgument):
typeinfo = "%s, intent(in)" % arg.get_datatype('fortran')
elif isinstance(arg, InOutArgument):
typeinfo = "%s, intent(inout)" % arg.get_datatype('fortran')
elif isinstance(arg, OutputArgument):
typeinfo = "%s, intent(out)" % arg.get_datatype('fortran')
else:
raise CodeGenError("Unknown Argument type: %s" % type(arg))
fprint = self._get_symbol
if arg.dimensions:
# fortran arrays start at 1
dimstr = ", ".join(["%s:%s" % (
fprint(dim[0] + 1), fprint(dim[1] + 1))
for dim in arg.dimensions])
typeinfo += ", dimension(%s)" % dimstr
array_list.append("%s :: %s\n" % (typeinfo, fprint(arg.name)))
else:
scalar_list.append("%s :: %s\n" % (typeinfo, fprint(arg.name)))
# scalars first, because they can be used in array declarations
code_list.extend(scalar_list)
code_list.extend(array_list)
return code_list
def _declare_globals(self, routine):
# Global variables not explicitly declared within Fortran 90 functions.
# Note: a future F77 mode may need to generate "common" blocks.
return []
def _declare_locals(self, routine):
code_list = []
for var in sorted(routine.local_vars, key=str):
typeinfo = get_default_datatype(var)
code_list.append("%s :: %s\n" % (
typeinfo.fname, self._get_symbol(var)))
return code_list
def _get_routine_ending(self, routine):
"""Returns the closing statements of the fortran routine."""
if len(routine.results) == 1:
return ["end function\n"]
else:
return ["end subroutine\n"]
def get_interface(self, routine):
"""Returns a string for the function interface.
The routine should have a single result object, which can be None.
If the routine has multiple result objects, a CodeGenError is
raised.
See: https://en.wikipedia.org/wiki/Function_prototype
"""
prototype = [ "interface\n" ]
prototype.extend(self._get_routine_opening(routine))
prototype.extend(self._declare_arguments(routine))
prototype.extend(self._get_routine_ending(routine))
prototype.append("end interface\n")
return "".join(prototype)
def _call_printer(self, routine):
declarations = []
code_lines = []
for result in routine.result_variables:
if isinstance(result, Result):
assign_to = routine.name
elif isinstance(result, (OutputArgument, InOutArgument)):
assign_to = result.result_var
constants, not_fortran, f_expr = self._printer_method_with_settings(
'doprint', dict(human=False, source_format='free', standard=95),
result.expr, assign_to=assign_to)
for obj, v in sorted(constants, key=str):
t = get_default_datatype(obj)
declarations.append(
"%s, parameter :: %s = %s\n" % (t.fname, obj, v))
for obj in sorted(not_fortran, key=str):
t = get_default_datatype(obj)
if isinstance(obj, Function):
name = obj.func
else:
name = obj
declarations.append("%s :: %s\n" % (t.fname, name))
code_lines.append("%s\n" % f_expr)
return declarations + code_lines
def _indent_code(self, codelines):
return self._printer_method_with_settings(
'indent_code', dict(human=False, source_format='free'), codelines)
def dump_f95(self, routines, f, prefix, header=True, empty=True):
# check that symbols are unique with ignorecase
for r in routines:
lowercase = {str(x).lower() for x in r.variables}
orig_case = {str(x) for x in r.variables}
if len(lowercase) < len(orig_case):
raise CodeGenError("Fortran ignores case. Got symbols: %s" %
(", ".join([str(var) for var in r.variables])))
self.dump_code(routines, f, prefix, header, empty)
dump_f95.extension = code_extension # type: ignore
dump_f95.__doc__ = CodeGen.dump_code.__doc__
def dump_h(self, routines, f, prefix, header=True, empty=True):
"""Writes the interface to a header file.
This file contains all the function declarations.
Parameters
==========
routines : list
A list of Routine instances.
f : file-like
Where to write the file.
prefix : string
The filename prefix.
header : bool, optional
When True, a header comment is included on top of each source
file. [default : True]
empty : bool, optional
When True, empty lines are included to structure the source
files. [default : True]
"""
if header:
print(''.join(self._get_header()), file=f)
if empty:
print(file=f)
# declaration of the function prototypes
for routine in routines:
prototype = self.get_interface(routine)
f.write(prototype)
if empty:
print(file=f)
dump_h.extension = interface_extension # type: ignore
# This list of dump functions is used by CodeGen.write to know which dump
# functions it has to call.
dump_fns = [dump_f95, dump_h]
class JuliaCodeGen(CodeGen):
"""Generator for Julia code.
The .write() method inherited from CodeGen will output a code file
<prefix>.jl.
"""
code_extension = "jl"
def __init__(self, project='project', printer=None):
super(JuliaCodeGen, self).__init__(project)
self.printer = printer or JuliaCodePrinter()
def routine(self, name, expr, argument_sequence, global_vars):
"""Specialized Routine creation for Julia."""
if is_sequence(expr) and not isinstance(expr, (MatrixBase, MatrixExpr)):
if not expr:
raise ValueError("No expression given")
expressions = Tuple(*expr)
else:
expressions = Tuple(expr)
# local variables
local_vars = {i.label for i in expressions.atoms(Idx)}
# global variables
global_vars = set() if global_vars is None else set(global_vars)
# symbols that should be arguments
old_symbols = expressions.free_symbols - local_vars - global_vars
symbols = set([])
for s in old_symbols:
if isinstance(s, Idx):
symbols.update(s.args[1].free_symbols)
elif not isinstance(s, Indexed):
symbols.add(s)
# Julia supports multiple return values
return_vals = []
output_args = []
for (i, expr) in enumerate(expressions):
if isinstance(expr, Equality):
out_arg = expr.lhs
expr = expr.rhs
symbol = out_arg
if isinstance(out_arg, Indexed):
dims = tuple([ (S.One, dim) for dim in out_arg.shape])
symbol = out_arg.base.label
output_args.append(InOutArgument(symbol, out_arg, expr, dimensions=dims))
if not isinstance(out_arg, (Indexed, Symbol, MatrixSymbol)):
raise CodeGenError("Only Indexed, Symbol, or MatrixSymbol "
"can define output arguments.")
return_vals.append(Result(expr, name=symbol, result_var=out_arg))
if not expr.has(symbol):
# this is a pure output: remove from the symbols list, so
# it doesn't become an input.
symbols.remove(symbol)
else:
# we have no name for this output
return_vals.append(Result(expr, name='out%d' % (i+1)))
# setup input argument list
output_args.sort(key=lambda x: str(x.name))
arg_list = list(output_args)
array_symbols = {}
for array in expressions.atoms(Indexed):
array_symbols[array.base.label] = array
for array in expressions.atoms(MatrixSymbol):
array_symbols[array] = array
for symbol in sorted(symbols, key=str):
arg_list.append(InputArgument(symbol))
if argument_sequence is not None:
# if the user has supplied IndexedBase instances, we'll accept that
new_sequence = []
for arg in argument_sequence:
if isinstance(arg, IndexedBase):
new_sequence.append(arg.label)
else:
new_sequence.append(arg)
argument_sequence = new_sequence
missing = [x for x in arg_list if x.name not in argument_sequence]
if missing:
msg = "Argument list didn't specify: {0} "
msg = msg.format(", ".join([str(m.name) for m in missing]))
raise CodeGenArgumentListError(msg, missing)
# create redundant arguments to produce the requested sequence
name_arg_dict = {x.name: x for x in arg_list}
new_args = []
for symbol in argument_sequence:
try:
new_args.append(name_arg_dict[symbol])
except KeyError:
new_args.append(InputArgument(symbol))
arg_list = new_args
return Routine(name, arg_list, return_vals, local_vars, global_vars)
def _get_header(self):
"""Writes a common header for the generated files."""
code_lines = []
tmp = header_comment % {"version": sympy_version,
"project": self.project}
for line in tmp.splitlines():
if line == '':
code_lines.append("#\n")
else:
code_lines.append("# %s\n" % line)
return code_lines
def _preprocessor_statements(self, prefix):
return []
def _get_routine_opening(self, routine):
"""Returns the opening statements of the routine."""
code_list = []
code_list.append("function ")
# Inputs
args = []
for i, arg in enumerate(routine.arguments):
if isinstance(arg, OutputArgument):
raise CodeGenError("Julia: invalid argument of type %s" %
str(type(arg)))
if isinstance(arg, (InputArgument, InOutArgument)):
args.append("%s" % self._get_symbol(arg.name))
args = ", ".join(args)
code_list.append("%s(%s)\n" % (routine.name, args))
code_list = [ "".join(code_list) ]
return code_list
def _declare_arguments(self, routine):
return []
def _declare_globals(self, routine):
return []
def _declare_locals(self, routine):
return []
def _get_routine_ending(self, routine):
outs = []
for result in routine.results:
if isinstance(result, Result):
# Note: name not result_var; want `y` not `y[i]` for Indexed
s = self._get_symbol(result.name)
else:
raise CodeGenError("unexpected object in Routine results")
outs.append(s)
return ["return " + ", ".join(outs) + "\nend\n"]
def _call_printer(self, routine):
declarations = []
code_lines = []
for i, result in enumerate(routine.results):
if isinstance(result, Result):
assign_to = result.result_var
else:
raise CodeGenError("unexpected object in Routine results")
constants, not_supported, jl_expr = self._printer_method_with_settings(
'doprint', dict(human=False), result.expr, assign_to=assign_to)
for obj, v in sorted(constants, key=str):
declarations.append(
"%s = %s\n" % (obj, v))
for obj in sorted(not_supported, key=str):
if isinstance(obj, Function):
name = obj.func
else:
name = obj
declarations.append(
"# unsupported: %s\n" % (name))
code_lines.append("%s\n" % (jl_expr))
return declarations + code_lines
def _indent_code(self, codelines):
# Note that indenting seems to happen twice, first
# statement-by-statement by JuliaPrinter then again here.
p = JuliaCodePrinter({'human': False})
return p.indent_code(codelines)
def dump_jl(self, routines, f, prefix, header=True, empty=True):
self.dump_code(routines, f, prefix, header, empty)
dump_jl.extension = code_extension # type: ignore
dump_jl.__doc__ = CodeGen.dump_code.__doc__
# This list of dump functions is used by CodeGen.write to know which dump
# functions it has to call.
dump_fns = [dump_jl]
class OctaveCodeGen(CodeGen):
"""Generator for Octave code.
The .write() method inherited from CodeGen will output a code file
<prefix>.m.
Octave .m files usually contain one function. That function name should
match the filename (``prefix``). If you pass multiple ``name_expr`` pairs,
the latter ones are presumed to be private functions accessed by the
primary function.
You should only pass inputs to ``argument_sequence``: outputs are ordered
according to their order in ``name_expr``.
"""
code_extension = "m"
def __init__(self, project='project', printer=None):
super(OctaveCodeGen, self).__init__(project)
self.printer = printer or OctaveCodePrinter()
def routine(self, name, expr, argument_sequence, global_vars):
"""Specialized Routine creation for Octave."""
# FIXME: this is probably general enough for other high-level
# languages, perhaps its the C/Fortran one that is specialized!
if is_sequence(expr) and not isinstance(expr, (MatrixBase, MatrixExpr)):
if not expr:
raise ValueError("No expression given")
expressions = Tuple(*expr)
else:
expressions = Tuple(expr)
# local variables
local_vars = {i.label for i in expressions.atoms(Idx)}
# global variables
global_vars = set() if global_vars is None else set(global_vars)
# symbols that should be arguments
old_symbols = expressions.free_symbols - local_vars - global_vars
symbols = set([])
for s in old_symbols:
if isinstance(s, Idx):
symbols.update(s.args[1].free_symbols)
elif not isinstance(s, Indexed):
symbols.add(s)
# Octave supports multiple return values
return_vals = []
for (i, expr) in enumerate(expressions):
if isinstance(expr, Equality):
out_arg = expr.lhs
expr = expr.rhs
symbol = out_arg
if isinstance(out_arg, Indexed):
symbol = out_arg.base.label
if not isinstance(out_arg, (Indexed, Symbol, MatrixSymbol)):
raise CodeGenError("Only Indexed, Symbol, or MatrixSymbol "
"can define output arguments.")
return_vals.append(Result(expr, name=symbol, result_var=out_arg))
if not expr.has(symbol):
# this is a pure output: remove from the symbols list, so
# it doesn't become an input.
symbols.remove(symbol)
else:
# we have no name for this output
return_vals.append(Result(expr, name='out%d' % (i+1)))
# setup input argument list
arg_list = []
array_symbols = {}
for array in expressions.atoms(Indexed):
array_symbols[array.base.label] = array
for array in expressions.atoms(MatrixSymbol):
array_symbols[array] = array
for symbol in sorted(symbols, key=str):
arg_list.append(InputArgument(symbol))
if argument_sequence is not None:
# if the user has supplied IndexedBase instances, we'll accept that
new_sequence = []
for arg in argument_sequence:
if isinstance(arg, IndexedBase):
new_sequence.append(arg.label)
else:
new_sequence.append(arg)
argument_sequence = new_sequence
missing = [x for x in arg_list if x.name not in argument_sequence]
if missing:
msg = "Argument list didn't specify: {0} "
msg = msg.format(", ".join([str(m.name) for m in missing]))
raise CodeGenArgumentListError(msg, missing)
# create redundant arguments to produce the requested sequence
name_arg_dict = {x.name: x for x in arg_list}
new_args = []
for symbol in argument_sequence:
try:
new_args.append(name_arg_dict[symbol])
except KeyError:
new_args.append(InputArgument(symbol))
arg_list = new_args
return Routine(name, arg_list, return_vals, local_vars, global_vars)
def _get_header(self):
"""Writes a common header for the generated files."""
code_lines = []
tmp = header_comment % {"version": sympy_version,
"project": self.project}
for line in tmp.splitlines():
if line == '':
code_lines.append("%\n")
else:
code_lines.append("%% %s\n" % line)
return code_lines
def _preprocessor_statements(self, prefix):
return []
def _get_routine_opening(self, routine):
"""Returns the opening statements of the routine."""
code_list = []
code_list.append("function ")
# Outputs
outs = []
for i, result in enumerate(routine.results):
if isinstance(result, Result):
# Note: name not result_var; want `y` not `y(i)` for Indexed
s = self._get_symbol(result.name)
else:
raise CodeGenError("unexpected object in Routine results")
outs.append(s)
if len(outs) > 1:
code_list.append("[" + (", ".join(outs)) + "]")
else:
code_list.append("".join(outs))
code_list.append(" = ")
# Inputs
args = []
for i, arg in enumerate(routine.arguments):
if isinstance(arg, (OutputArgument, InOutArgument)):
raise CodeGenError("Octave: invalid argument of type %s" %
str(type(arg)))
if isinstance(arg, InputArgument):
args.append("%s" % self._get_symbol(arg.name))
args = ", ".join(args)
code_list.append("%s(%s)\n" % (routine.name, args))
code_list = [ "".join(code_list) ]
return code_list
def _declare_arguments(self, routine):
return []
def _declare_globals(self, routine):
if not routine.global_vars:
return []
s = " ".join(sorted([self._get_symbol(g) for g in routine.global_vars]))
return ["global " + s + "\n"]
def _declare_locals(self, routine):
return []
def _get_routine_ending(self, routine):
return ["end\n"]
def _call_printer(self, routine):
declarations = []
code_lines = []
for i, result in enumerate(routine.results):
if isinstance(result, Result):
assign_to = result.result_var
else:
raise CodeGenError("unexpected object in Routine results")
constants, not_supported, oct_expr = self._printer_method_with_settings(
'doprint', dict(human=False), result.expr, assign_to=assign_to)
for obj, v in sorted(constants, key=str):
declarations.append(
" %s = %s; %% constant\n" % (obj, v))
for obj in sorted(not_supported, key=str):
if isinstance(obj, Function):
name = obj.func
else:
name = obj
declarations.append(
" %% unsupported: %s\n" % (name))
code_lines.append("%s\n" % (oct_expr))
return declarations + code_lines
def _indent_code(self, codelines):
return self._printer_method_with_settings(
'indent_code', dict(human=False), codelines)
def dump_m(self, routines, f, prefix, header=True, empty=True, inline=True):
# Note used to call self.dump_code() but we need more control for header
code_lines = self._preprocessor_statements(prefix)
for i, routine in enumerate(routines):
if i > 0:
if empty:
code_lines.append("\n")
code_lines.extend(self._get_routine_opening(routine))
if i == 0:
if routine.name != prefix:
raise ValueError('Octave function name should match prefix')
if header:
code_lines.append("%" + prefix.upper() +
" Autogenerated by sympy\n")
code_lines.append(''.join(self._get_header()))
code_lines.extend(self._declare_arguments(routine))
code_lines.extend(self._declare_globals(routine))
code_lines.extend(self._declare_locals(routine))
if empty:
code_lines.append("\n")
code_lines.extend(self._call_printer(routine))
if empty:
code_lines.append("\n")
code_lines.extend(self._get_routine_ending(routine))
code_lines = self._indent_code(''.join(code_lines))
if code_lines:
f.write(code_lines)
dump_m.extension = code_extension # type: ignore
dump_m.__doc__ = CodeGen.dump_code.__doc__
# This list of dump functions is used by CodeGen.write to know which dump
# functions it has to call.
dump_fns = [dump_m]
class RustCodeGen(CodeGen):
"""Generator for Rust code.
The .write() method inherited from CodeGen will output a code file
<prefix>.rs
"""
code_extension = "rs"
def __init__(self, project="project", printer=None):
super(RustCodeGen, self).__init__(project=project)
self.printer = printer or RustCodePrinter()
def routine(self, name, expr, argument_sequence, global_vars):
"""Specialized Routine creation for Rust."""
if is_sequence(expr) and not isinstance(expr, (MatrixBase, MatrixExpr)):
if not expr:
raise ValueError("No expression given")
expressions = Tuple(*expr)
else:
expressions = Tuple(expr)
# local variables
local_vars = set([i.label for i in expressions.atoms(Idx)])
# global variables
global_vars = set() if global_vars is None else set(global_vars)
# symbols that should be arguments
symbols = expressions.free_symbols - local_vars - global_vars - expressions.atoms(Indexed)
# Rust supports multiple return values
return_vals = []
output_args = []
for (i, expr) in enumerate(expressions):
if isinstance(expr, Equality):
out_arg = expr.lhs
expr = expr.rhs
symbol = out_arg
if isinstance(out_arg, Indexed):
dims = tuple([ (S.One, dim) for dim in out_arg.shape])
symbol = out_arg.base.label
output_args.append(InOutArgument(symbol, out_arg, expr, dimensions=dims))
if not isinstance(out_arg, (Indexed, Symbol, MatrixSymbol)):
raise CodeGenError("Only Indexed, Symbol, or MatrixSymbol "
"can define output arguments.")
return_vals.append(Result(expr, name=symbol, result_var=out_arg))
if not expr.has(symbol):
# this is a pure output: remove from the symbols list, so
# it doesn't become an input.
symbols.remove(symbol)
else:
# we have no name for this output
return_vals.append(Result(expr, name='out%d' % (i+1)))
# setup input argument list
output_args.sort(key=lambda x: str(x.name))
arg_list = list(output_args)
array_symbols = {}
for array in expressions.atoms(Indexed):
array_symbols[array.base.label] = array
for array in expressions.atoms(MatrixSymbol):
array_symbols[array] = array
for symbol in sorted(symbols, key=str):
arg_list.append(InputArgument(symbol))
if argument_sequence is not None:
# if the user has supplied IndexedBase instances, we'll accept that
new_sequence = []
for arg in argument_sequence:
if isinstance(arg, IndexedBase):
new_sequence.append(arg.label)
else:
new_sequence.append(arg)
argument_sequence = new_sequence
missing = [x for x in arg_list if x.name not in argument_sequence]
if missing:
msg = "Argument list didn't specify: {0} "
msg = msg.format(", ".join([str(m.name) for m in missing]))
raise CodeGenArgumentListError(msg, missing)
# create redundant arguments to produce the requested sequence
name_arg_dict = {x.name: x for x in arg_list}
new_args = []
for symbol in argument_sequence:
try:
new_args.append(name_arg_dict[symbol])
except KeyError:
new_args.append(InputArgument(symbol))
arg_list = new_args
return Routine(name, arg_list, return_vals, local_vars, global_vars)
def _get_header(self):
"""Writes a common header for the generated files."""
code_lines = []
code_lines.append("/*\n")
tmp = header_comment % {"version": sympy_version,
"project": self.project}
for line in tmp.splitlines():
code_lines.append((" *%s" % line.center(76)).rstrip() + "\n")
code_lines.append(" */\n")
return code_lines
def get_prototype(self, routine):
"""Returns a string for the function prototype of the routine.
If the routine has multiple result objects, an CodeGenError is
raised.
See: https://en.wikipedia.org/wiki/Function_prototype
"""
results = [i.get_datatype('Rust') for i in routine.results]
if len(results) == 1:
rstype = " -> " + results[0]
elif len(routine.results) > 1:
rstype = " -> (" + ", ".join(results) + ")"
else:
rstype = ""
type_args = []
for arg in routine.arguments:
name = self.printer.doprint(arg.name)
if arg.dimensions or isinstance(arg, ResultBase):
type_args.append(("*%s" % name, arg.get_datatype('Rust')))
else:
type_args.append((name, arg.get_datatype('Rust')))
arguments = ", ".join([ "%s: %s" % t for t in type_args])
return "fn %s(%s)%s" % (routine.name, arguments, rstype)
def _preprocessor_statements(self, prefix):
code_lines = []
# code_lines.append("use std::f64::consts::*;\n")
return code_lines
def _get_routine_opening(self, routine):
prototype = self.get_prototype(routine)
return ["%s {\n" % prototype]
def _declare_arguments(self, routine):
# arguments are declared in prototype
return []
def _declare_globals(self, routine):
# global variables are not explicitly declared within C functions
return []
def _declare_locals(self, routine):
# loop variables are declared in loop statement
return []
def _call_printer(self, routine):
code_lines = []
declarations = []
returns = []
# Compose a list of symbols to be dereferenced in the function
# body. These are the arguments that were passed by a reference
# pointer, excluding arrays.
dereference = []
for arg in routine.arguments:
if isinstance(arg, ResultBase) and not arg.dimensions:
dereference.append(arg.name)
for i, result in enumerate(routine.results):
if isinstance(result, Result):
assign_to = result.result_var
returns.append(str(result.result_var))
else:
raise CodeGenError("unexpected object in Routine results")
constants, not_supported, rs_expr = self._printer_method_with_settings(
'doprint', dict(human=False), result.expr, assign_to=assign_to)
for name, value in sorted(constants, key=str):
declarations.append("const %s: f64 = %s;\n" % (name, value))
for obj in sorted(not_supported, key=str):
if isinstance(obj, Function):
name = obj.func
else:
name = obj
declarations.append("// unsupported: %s\n" % (name))
code_lines.append("let %s\n" % rs_expr);
if len(returns) > 1:
returns = ['(' + ', '.join(returns) + ')']
returns.append('\n')
return declarations + code_lines + returns
def _get_routine_ending(self, routine):
return ["}\n"]
def dump_rs(self, routines, f, prefix, header=True, empty=True):
self.dump_code(routines, f, prefix, header, empty)
dump_rs.extension = code_extension # type: ignore
dump_rs.__doc__ = CodeGen.dump_code.__doc__
# This list of dump functions is used by CodeGen.write to know which dump
# functions it has to call.
dump_fns = [dump_rs]
def get_code_generator(language, project=None, standard=None, printer = None):
if language == 'C':
if standard is None:
pass
elif standard.lower() == 'c89':
language = 'C89'
elif standard.lower() == 'c99':
language = 'C99'
CodeGenClass = {"C": CCodeGen, "C89": C89CodeGen, "C99": C99CodeGen,
"F95": FCodeGen, "JULIA": JuliaCodeGen,
"OCTAVE": OctaveCodeGen,
"RUST": RustCodeGen}.get(language.upper())
if CodeGenClass is None:
raise ValueError("Language '%s' is not supported." % language)
return CodeGenClass(project, printer)
#
# Friendly functions
#
def codegen(name_expr, language=None, prefix=None, project="project",
to_files=False, header=True, empty=True, argument_sequence=None,
global_vars=None, standard=None, code_gen=None, printer = None):
"""Generate source code for expressions in a given language.
Parameters
==========
name_expr : tuple, or list of tuples
A single (name, expression) tuple or a list of (name, expression)
tuples. Each tuple corresponds to a routine. If the expression is
an equality (an instance of class Equality) the left hand side is
considered an output argument. If expression is an iterable, then
the routine will have multiple outputs.
language : string,
A string that indicates the source code language. This is case
insensitive. Currently, 'C', 'F95' and 'Octave' are supported.
'Octave' generates code compatible with both Octave and Matlab.
prefix : string, optional
A prefix for the names of the files that contain the source code.
Language-dependent suffixes will be appended. If omitted, the name
of the first name_expr tuple is used.
project : string, optional
A project name, used for making unique preprocessor instructions.
[default: "project"]
to_files : bool, optional
When True, the code will be written to one or more files with the
given prefix, otherwise strings with the names and contents of
these files are returned. [default: False]
header : bool, optional
When True, a header is written on top of each source file.
[default: True]
empty : bool, optional
When True, empty lines are used to structure the code.
[default: True]
argument_sequence : iterable, optional
Sequence of arguments for the routine in a preferred order. A
CodeGenError is raised if required arguments are missing.
Redundant arguments are used without warning. If omitted,
arguments will be ordered alphabetically, but with all input
arguments first, and then output or in-out arguments.
global_vars : iterable, optional
Sequence of global variables used by the routine. Variables
listed here will not show up as function arguments.
standard : string
code_gen : CodeGen instance
An instance of a CodeGen subclass. Overrides ``language``.
Examples
========
>>> from sympy.utilities.codegen import codegen
>>> from sympy.abc import x, y, z
>>> [(c_name, c_code), (h_name, c_header)] = codegen(
... ("f", x+y*z), "C89", "test", header=False, empty=False)
>>> print(c_name)
test.c
>>> print(c_code)
#include "test.h"
#include <math.h>
double f(double x, double y, double z) {
double f_result;
f_result = x + y*z;
return f_result;
}
<BLANKLINE>
>>> print(h_name)
test.h
>>> print(c_header)
#ifndef PROJECT__TEST__H
#define PROJECT__TEST__H
double f(double x, double y, double z);
#endif
<BLANKLINE>
Another example using Equality objects to give named outputs. Here the
filename (prefix) is taken from the first (name, expr) pair.
>>> from sympy.abc import f, g
>>> from sympy import Eq
>>> [(c_name, c_code), (h_name, c_header)] = codegen(
... [("myfcn", x + y), ("fcn2", [Eq(f, 2*x), Eq(g, y)])],
... "C99", header=False, empty=False)
>>> print(c_name)
myfcn.c
>>> print(c_code)
#include "myfcn.h"
#include <math.h>
double myfcn(double x, double y) {
double myfcn_result;
myfcn_result = x + y;
return myfcn_result;
}
void fcn2(double x, double y, double *f, double *g) {
(*f) = 2*x;
(*g) = y;
}
<BLANKLINE>
If the generated function(s) will be part of a larger project where various
global variables have been defined, the 'global_vars' option can be used
to remove the specified variables from the function signature
>>> from sympy.utilities.codegen import codegen
>>> from sympy.abc import x, y, z
>>> [(f_name, f_code), header] = codegen(
... ("f", x+y*z), "F95", header=False, empty=False,
... argument_sequence=(x, y), global_vars=(z,))
>>> print(f_code)
REAL*8 function f(x, y)
implicit none
REAL*8, intent(in) :: x
REAL*8, intent(in) :: y
f = x + y*z
end function
<BLANKLINE>
"""
# Initialize the code generator.
if language is None:
if code_gen is None:
raise ValueError("Need either language or code_gen")
else:
if code_gen is not None:
raise ValueError("You cannot specify both language and code_gen.")
code_gen = get_code_generator(language, project, standard, printer)
if isinstance(name_expr[0], str):
# single tuple is given, turn it into a singleton list with a tuple.
name_expr = [name_expr]
if prefix is None:
prefix = name_expr[0][0]
# Construct Routines appropriate for this code_gen from (name, expr) pairs.
routines = []
for name, expr in name_expr:
routines.append(code_gen.routine(name, expr, argument_sequence,
global_vars))
# Write the code.
return code_gen.write(routines, prefix, to_files, header, empty)
def make_routine(name, expr, argument_sequence=None,
global_vars=None, language="F95"):
"""A factory that makes an appropriate Routine from an expression.
Parameters
==========
name : string
The name of this routine in the generated code.
expr : expression or list/tuple of expressions
A SymPy expression that the Routine instance will represent. If
given a list or tuple of expressions, the routine will be
considered to have multiple return values and/or output arguments.
argument_sequence : list or tuple, optional
List arguments for the routine in a preferred order. If omitted,
the results are language dependent, for example, alphabetical order
or in the same order as the given expressions.
global_vars : iterable, optional
Sequence of global variables used by the routine. Variables
listed here will not show up as function arguments.
language : string, optional
Specify a target language. The Routine itself should be
language-agnostic but the precise way one is created, error
checking, etc depend on the language. [default: "F95"].
A decision about whether to use output arguments or return values is made
depending on both the language and the particular mathematical expressions.
For an expression of type Equality, the left hand side is typically made
into an OutputArgument (or perhaps an InOutArgument if appropriate).
Otherwise, typically, the calculated expression is made a return values of
the routine.
Examples
========
>>> from sympy.utilities.codegen import make_routine
>>> from sympy.abc import x, y, f, g
>>> from sympy import Eq
>>> r = make_routine('test', [Eq(f, 2*x), Eq(g, x + y)])
>>> [arg.result_var for arg in r.results]
[]
>>> [arg.name for arg in r.arguments]
[x, y, f, g]
>>> [arg.name for arg in r.result_variables]
[f, g]
>>> r.local_vars
set()
Another more complicated example with a mixture of specified and
automatically-assigned names. Also has Matrix output.
>>> from sympy import Matrix
>>> r = make_routine('fcn', [x*y, Eq(f, 1), Eq(g, x + g), Matrix([[x, 2]])])
>>> [arg.result_var for arg in r.results] # doctest: +SKIP
[result_5397460570204848505]
>>> [arg.expr for arg in r.results]
[x*y]
>>> [arg.name for arg in r.arguments] # doctest: +SKIP
[x, y, f, g, out_8598435338387848786]
We can examine the various arguments more closely:
>>> from sympy.utilities.codegen import (InputArgument, OutputArgument,
... InOutArgument)
>>> [a.name for a in r.arguments if isinstance(a, InputArgument)]
[x, y]
>>> [a.name for a in r.arguments if isinstance(a, OutputArgument)] # doctest: +SKIP
[f, out_8598435338387848786]
>>> [a.expr for a in r.arguments if isinstance(a, OutputArgument)]
[1, Matrix([[x, 2]])]
>>> [a.name for a in r.arguments if isinstance(a, InOutArgument)]
[g]
>>> [a.expr for a in r.arguments if isinstance(a, InOutArgument)]
[g + x]
"""
# initialize a new code generator
code_gen = get_code_generator(language)
return code_gen.routine(name, expr, argument_sequence, global_vars)
|
c326be65d46b6e48dd900546151ec402100e911d77008a11c01a7ae9a4663144 | """Module for compiling codegen output, and wrap the binary for use in
python.
.. note:: To use the autowrap module it must first be imported
>>> from sympy.utilities.autowrap import autowrap
This module provides a common interface for different external backends, such
as f2py, fwrap, Cython, SWIG(?) etc. (Currently only f2py and Cython are
implemented) The goal is to provide access to compiled binaries of acceptable
performance with a one-button user interface, i.e.
>>> from sympy.abc import x,y
>>> expr = ((x - y)**(25)).expand()
>>> binary_callable = autowrap(expr)
>>> binary_callable(1, 2)
-1.0
The callable returned from autowrap() is a binary python function, not a
SymPy object. If it is desired to use the compiled function in symbolic
expressions, it is better to use binary_function() which returns a SymPy
Function object. The binary callable is attached as the _imp_ attribute and
invoked when a numerical evaluation is requested with evalf(), or with
lambdify().
>>> from sympy.utilities.autowrap import binary_function
>>> f = binary_function('f', expr)
>>> 2*f(x, y) + y
y + 2*f(x, y)
>>> (2*f(x, y) + y).evalf(2, subs={x: 1, y:2})
0.e-110
The idea is that a SymPy user will primarily be interested in working with
mathematical expressions, and should not have to learn details about wrapping
tools in order to evaluate expressions numerically, even if they are
computationally expensive.
When is this useful?
1) For computations on large arrays, Python iterations may be too slow,
and depending on the mathematical expression, it may be difficult to
exploit the advanced index operations provided by NumPy.
2) For *really* long expressions that will be called repeatedly, the
compiled binary should be significantly faster than SymPy's .evalf()
3) If you are generating code with the codegen utility in order to use
it in another project, the automatic python wrappers let you test the
binaries immediately from within SymPy.
4) To create customized ufuncs for use with numpy arrays.
See *ufuncify*.
When is this module NOT the best approach?
1) If you are really concerned about speed or memory optimizations,
you will probably get better results by working directly with the
wrapper tools and the low level code. However, the files generated
by this utility may provide a useful starting point and reference
code. Temporary files will be left intact if you supply the keyword
tempdir="path/to/files/".
2) If the array computation can be handled easily by numpy, and you
don't need the binaries for another project.
"""
from __future__ import print_function, division
import sys
import os
import shutil
import tempfile
from subprocess import STDOUT, CalledProcessError, check_output
from string import Template
from warnings import warn
from sympy.core.cache import cacheit
from sympy.core.compatibility import iterable
from sympy.core.function import Lambda
from sympy.core.relational import Eq
from sympy.core.symbol import Dummy, Symbol
from sympy.tensor.indexed import Idx, IndexedBase
from sympy.utilities.codegen import (make_routine, get_code_generator,
OutputArgument, InOutArgument,
InputArgument, CodeGenArgumentListError,
Result, ResultBase, C99CodeGen)
from sympy.utilities.lambdify import implemented_function
from sympy.utilities.decorator import doctest_depends_on
_doctest_depends_on = {'exe': ('f2py', 'gfortran', 'gcc'),
'modules': ('numpy',)}
class CodeWrapError(Exception):
pass
class CodeWrapper(object):
"""Base Class for code wrappers"""
_filename = "wrapped_code"
_module_basename = "wrapper_module"
_module_counter = 0
@property
def filename(self):
return "%s_%s" % (self._filename, CodeWrapper._module_counter)
@property
def module_name(self):
return "%s_%s" % (self._module_basename, CodeWrapper._module_counter)
def __init__(self, generator, filepath=None, flags=[], verbose=False):
"""
generator -- the code generator to use
"""
self.generator = generator
self.filepath = filepath
self.flags = flags
self.quiet = not verbose
@property
def include_header(self):
return bool(self.filepath)
@property
def include_empty(self):
return bool(self.filepath)
def _generate_code(self, main_routine, routines):
routines.append(main_routine)
self.generator.write(
routines, self.filename, True, self.include_header,
self.include_empty)
def wrap_code(self, routine, helpers=None):
helpers = helpers or []
if self.filepath:
workdir = os.path.abspath(self.filepath)
else:
workdir = tempfile.mkdtemp("_sympy_compile")
if not os.access(workdir, os.F_OK):
os.mkdir(workdir)
oldwork = os.getcwd()
os.chdir(workdir)
try:
sys.path.append(workdir)
self._generate_code(routine, helpers)
self._prepare_files(routine)
self._process_files(routine)
mod = __import__(self.module_name)
finally:
sys.path.remove(workdir)
CodeWrapper._module_counter += 1
os.chdir(oldwork)
if not self.filepath:
try:
shutil.rmtree(workdir)
except OSError:
# Could be some issues on Windows
pass
return self._get_wrapped_function(mod, routine.name)
def _process_files(self, routine):
command = self.command
command.extend(self.flags)
try:
retoutput = check_output(command, stderr=STDOUT)
except CalledProcessError as e:
raise CodeWrapError(
"Error while executing command: %s. Command output is:\n%s" % (
" ".join(command), e.output.decode('utf-8')))
if not self.quiet:
print(retoutput)
class DummyWrapper(CodeWrapper):
"""Class used for testing independent of backends """
template = """# dummy module for testing of SymPy
def %(name)s():
return "%(expr)s"
%(name)s.args = "%(args)s"
%(name)s.returns = "%(retvals)s"
"""
def _prepare_files(self, routine):
return
def _generate_code(self, routine, helpers):
with open('%s.py' % self.module_name, 'w') as f:
printed = ", ".join(
[str(res.expr) for res in routine.result_variables])
# convert OutputArguments to return value like f2py
args = filter(lambda x: not isinstance(
x, OutputArgument), routine.arguments)
retvals = []
for val in routine.result_variables:
if isinstance(val, Result):
retvals.append('nameless')
else:
retvals.append(val.result_var)
print(DummyWrapper.template % {
'name': routine.name,
'expr': printed,
'args': ", ".join([str(a.name) for a in args]),
'retvals': ", ".join([str(val) for val in retvals])
}, end="", file=f)
def _process_files(self, routine):
return
@classmethod
def _get_wrapped_function(cls, mod, name):
return getattr(mod, name)
class CythonCodeWrapper(CodeWrapper):
"""Wrapper that uses Cython"""
setup_template = """\
try:
from setuptools import setup
from setuptools import Extension
except ImportError:
from distutils.core import setup
from distutils.extension import Extension
from Cython.Build import cythonize
cy_opts = {cythonize_options}
{np_import}
ext_mods = [Extension(
{ext_args},
include_dirs={include_dirs},
library_dirs={library_dirs},
libraries={libraries},
extra_compile_args={extra_compile_args},
extra_link_args={extra_link_args}
)]
setup(ext_modules=cythonize(ext_mods, **cy_opts))
"""
pyx_imports = (
"import numpy as np\n"
"cimport numpy as np\n\n")
pyx_header = (
"cdef extern from '{header_file}.h':\n"
" {prototype}\n\n")
pyx_func = (
"def {name}_c({arg_string}):\n"
"\n"
"{declarations}"
"{body}")
std_compile_flag = '-std=c99'
def __init__(self, *args, **kwargs):
"""Instantiates a Cython code wrapper.
The following optional parameters get passed to ``distutils.Extension``
for building the Python extension module. Read its documentation to
learn more.
Parameters
==========
include_dirs : [list of strings]
A list of directories to search for C/C++ header files (in Unix
form for portability).
library_dirs : [list of strings]
A list of directories to search for C/C++ libraries at link time.
libraries : [list of strings]
A list of library names (not filenames or paths) to link against.
extra_compile_args : [list of strings]
Any extra platform- and compiler-specific information to use when
compiling the source files in 'sources'. For platforms and
compilers where "command line" makes sense, this is typically a
list of command-line arguments, but for other platforms it could be
anything. Note that the attribute ``std_compile_flag`` will be
appended to this list.
extra_link_args : [list of strings]
Any extra platform- and compiler-specific information to use when
linking object files together to create the extension (or to create
a new static Python interpreter). Similar interpretation as for
'extra_compile_args'.
cythonize_options : [dictionary]
Keyword arguments passed on to cythonize.
"""
self._include_dirs = kwargs.pop('include_dirs', [])
self._library_dirs = kwargs.pop('library_dirs', [])
self._libraries = kwargs.pop('libraries', [])
self._extra_compile_args = kwargs.pop('extra_compile_args', [])
self._extra_compile_args.append(self.std_compile_flag)
self._extra_link_args = kwargs.pop('extra_link_args', [])
self._cythonize_options = kwargs.pop('cythonize_options', {})
self._need_numpy = False
super(CythonCodeWrapper, self).__init__(*args, **kwargs)
@property
def command(self):
command = [sys.executable, "setup.py", "build_ext", "--inplace"]
return command
def _prepare_files(self, routine, build_dir=os.curdir):
# NOTE : build_dir is used for testing purposes.
pyxfilename = self.module_name + '.pyx'
codefilename = "%s.%s" % (self.filename, self.generator.code_extension)
# pyx
with open(os.path.join(build_dir, pyxfilename), 'w') as f:
self.dump_pyx([routine], f, self.filename)
# setup.py
ext_args = [repr(self.module_name), repr([pyxfilename, codefilename])]
if self._need_numpy:
np_import = 'import numpy as np\n'
self._include_dirs.append('np.get_include()')
else:
np_import = ''
with open(os.path.join(build_dir, 'setup.py'), 'w') as f:
includes = str(self._include_dirs).replace("'np.get_include()'",
'np.get_include()')
f.write(self.setup_template.format(
ext_args=", ".join(ext_args),
np_import=np_import,
include_dirs=includes,
library_dirs=self._library_dirs,
libraries=self._libraries,
extra_compile_args=self._extra_compile_args,
extra_link_args=self._extra_link_args,
cythonize_options=self._cythonize_options
))
@classmethod
def _get_wrapped_function(cls, mod, name):
return getattr(mod, name + '_c')
def dump_pyx(self, routines, f, prefix):
"""Write a Cython file with python wrappers
This file contains all the definitions of the routines in c code and
refers to the header file.
Arguments
---------
routines
List of Routine instances
f
File-like object to write the file to
prefix
The filename prefix, used to refer to the proper header file.
Only the basename of the prefix is used.
"""
headers = []
functions = []
for routine in routines:
prototype = self.generator.get_prototype(routine)
# C Function Header Import
headers.append(self.pyx_header.format(header_file=prefix,
prototype=prototype))
# Partition the C function arguments into categories
py_rets, py_args, py_loc, py_inf = self._partition_args(routine.arguments)
# Function prototype
name = routine.name
arg_string = ", ".join(self._prototype_arg(arg) for arg in py_args)
# Local Declarations
local_decs = []
for arg, val in py_inf.items():
proto = self._prototype_arg(arg)
mat, ind = [self._string_var(v) for v in val]
local_decs.append(" cdef {0} = {1}.shape[{2}]".format(proto, mat, ind))
local_decs.extend([" cdef {0}".format(self._declare_arg(a)) for a in py_loc])
declarations = "\n".join(local_decs)
if declarations:
declarations = declarations + "\n"
# Function Body
args_c = ", ".join([self._call_arg(a) for a in routine.arguments])
rets = ", ".join([self._string_var(r.name) for r in py_rets])
if routine.results:
body = ' return %s(%s)' % (routine.name, args_c)
if rets:
body = body + ', ' + rets
else:
body = ' %s(%s)\n' % (routine.name, args_c)
body = body + ' return ' + rets
functions.append(self.pyx_func.format(name=name, arg_string=arg_string,
declarations=declarations, body=body))
# Write text to file
if self._need_numpy:
# Only import numpy if required
f.write(self.pyx_imports)
f.write('\n'.join(headers))
f.write('\n'.join(functions))
def _partition_args(self, args):
"""Group function arguments into categories."""
py_args = []
py_returns = []
py_locals = []
py_inferred = {}
for arg in args:
if isinstance(arg, OutputArgument):
py_returns.append(arg)
py_locals.append(arg)
elif isinstance(arg, InOutArgument):
py_returns.append(arg)
py_args.append(arg)
else:
py_args.append(arg)
# Find arguments that are array dimensions. These can be inferred
# locally in the Cython code.
if isinstance(arg, (InputArgument, InOutArgument)) and arg.dimensions:
dims = [d[1] + 1 for d in arg.dimensions]
sym_dims = [(i, d) for (i, d) in enumerate(dims) if
isinstance(d, Symbol)]
for (i, d) in sym_dims:
py_inferred[d] = (arg.name, i)
for arg in args:
if arg.name in py_inferred:
py_inferred[arg] = py_inferred.pop(arg.name)
# Filter inferred arguments from py_args
py_args = [a for a in py_args if a not in py_inferred]
return py_returns, py_args, py_locals, py_inferred
def _prototype_arg(self, arg):
mat_dec = "np.ndarray[{mtype}, ndim={ndim}] {name}"
np_types = {'double': 'np.double_t',
'int': 'np.int_t'}
t = arg.get_datatype('c')
if arg.dimensions:
self._need_numpy = True
ndim = len(arg.dimensions)
mtype = np_types[t]
return mat_dec.format(mtype=mtype, ndim=ndim, name=self._string_var(arg.name))
else:
return "%s %s" % (t, self._string_var(arg.name))
def _declare_arg(self, arg):
proto = self._prototype_arg(arg)
if arg.dimensions:
shape = '(' + ','.join(self._string_var(i[1] + 1) for i in arg.dimensions) + ')'
return proto + " = np.empty({shape})".format(shape=shape)
else:
return proto + " = 0"
def _call_arg(self, arg):
if arg.dimensions:
t = arg.get_datatype('c')
return "<{0}*> {1}.data".format(t, self._string_var(arg.name))
elif isinstance(arg, ResultBase):
return "&{0}".format(self._string_var(arg.name))
else:
return self._string_var(arg.name)
def _string_var(self, var):
printer = self.generator.printer.doprint
return printer(var)
class F2PyCodeWrapper(CodeWrapper):
"""Wrapper that uses f2py"""
def __init__(self, *args, **kwargs):
ext_keys = ['include_dirs', 'library_dirs', 'libraries',
'extra_compile_args', 'extra_link_args']
msg = ('The compilation option kwarg {} is not supported with the f2py '
'backend.')
for k in ext_keys:
if k in kwargs.keys():
warn(msg.format(k))
kwargs.pop(k, None)
super(F2PyCodeWrapper, self).__init__(*args, **kwargs)
@property
def command(self):
filename = self.filename + '.' + self.generator.code_extension
args = ['-c', '-m', self.module_name, filename]
command = [sys.executable, "-c", "import numpy.f2py as f2py2e;f2py2e.main()"]+args
return command
def _prepare_files(self, routine):
pass
@classmethod
def _get_wrapped_function(cls, mod, name):
return getattr(mod, name)
# Here we define a lookup of backends -> tuples of languages. For now, each
# tuple is of length 1, but if a backend supports more than one language,
# the most preferable language is listed first.
_lang_lookup = {'CYTHON': ('C99', 'C89', 'C'),
'F2PY': ('F95',),
'NUMPY': ('C99', 'C89', 'C'),
'DUMMY': ('F95',)} # Dummy here just for testing
def _infer_language(backend):
"""For a given backend, return the top choice of language"""
langs = _lang_lookup.get(backend.upper(), False)
if not langs:
raise ValueError("Unrecognized backend: " + backend)
return langs[0]
def _validate_backend_language(backend, language):
"""Throws error if backend and language are incompatible"""
langs = _lang_lookup.get(backend.upper(), False)
if not langs:
raise ValueError("Unrecognized backend: " + backend)
if language.upper() not in langs:
raise ValueError(("Backend {0} and language {1} are "
"incompatible").format(backend, language))
@cacheit
@doctest_depends_on(exe=('f2py', 'gfortran'), modules=('numpy',))
def autowrap(expr, language=None, backend='f2py', tempdir=None, args=None,
flags=None, verbose=False, helpers=None, code_gen=None, **kwargs):
"""Generates python callable binaries based on the math expression.
Parameters
==========
expr
The SymPy expression that should be wrapped as a binary routine.
language : string, optional
If supplied, (options: 'C' or 'F95'), specifies the language of the
generated code. If ``None`` [default], the language is inferred based
upon the specified backend.
backend : string, optional
Backend used to wrap the generated code. Either 'f2py' [default],
or 'cython'.
tempdir : string, optional
Path to directory for temporary files. If this argument is supplied,
the generated code and the wrapper input files are left intact in the
specified path.
args : iterable, optional
An ordered iterable of symbols. Specifies the argument sequence for the
function.
flags : iterable, optional
Additional option flags that will be passed to the backend.
verbose : bool, optional
If True, autowrap will not mute the command line backends. This can be
helpful for debugging.
helpers : 3-tuple or iterable of 3-tuples, optional
Used to define auxiliary expressions needed for the main expr. If the
main expression needs to call a specialized function it should be
passed in via ``helpers``. Autowrap will then make sure that the
compiled main expression can link to the helper routine. Items should
be 3-tuples with (<function_name>, <sympy_expression>,
<argument_tuple>). It is mandatory to supply an argument sequence to
helper routines.
code_gen : CodeGen instance
An instance of a CodeGen subclass. Overrides ``language``.
include_dirs : [string]
A list of directories to search for C/C++ header files (in Unix form
for portability).
library_dirs : [string]
A list of directories to search for C/C++ libraries at link time.
libraries : [string]
A list of library names (not filenames or paths) to link against.
extra_compile_args : [string]
Any extra platform- and compiler-specific information to use when
compiling the source files in 'sources'. For platforms and compilers
where "command line" makes sense, this is typically a list of
command-line arguments, but for other platforms it could be anything.
extra_link_args : [string]
Any extra platform- and compiler-specific information to use when
linking object files together to create the extension (or to create a
new static Python interpreter). Similar interpretation as for
'extra_compile_args'.
Examples
========
>>> from sympy.abc import x, y, z
>>> from sympy.utilities.autowrap import autowrap
>>> expr = ((x - y + z)**(13)).expand()
>>> binary_func = autowrap(expr)
>>> binary_func(1, 4, 2)
-1.0
"""
if language:
if not isinstance(language, type):
_validate_backend_language(backend, language)
else:
language = _infer_language(backend)
# two cases 1) helpers is an iterable of 3-tuples and 2) helpers is a
# 3-tuple
if iterable(helpers) and len(helpers) != 0 and iterable(helpers[0]):
helpers = helpers if helpers else ()
else:
helpers = [helpers] if helpers else ()
args = list(args) if iterable(args, exclude=set) else args
if code_gen is None:
code_gen = get_code_generator(language, "autowrap")
CodeWrapperClass = {
'F2PY': F2PyCodeWrapper,
'CYTHON': CythonCodeWrapper,
'DUMMY': DummyWrapper
}[backend.upper()]
code_wrapper = CodeWrapperClass(code_gen, tempdir, flags if flags else (),
verbose, **kwargs)
helps = []
for name_h, expr_h, args_h in helpers:
helps.append(code_gen.routine(name_h, expr_h, args_h))
for name_h, expr_h, args_h in helpers:
if expr.has(expr_h):
name_h = binary_function(name_h, expr_h, backend='dummy')
expr = expr.subs(expr_h, name_h(*args_h))
try:
routine = code_gen.routine('autofunc', expr, args)
except CodeGenArgumentListError as e:
# if all missing arguments are for pure output, we simply attach them
# at the end and try again, because the wrappers will silently convert
# them to return values anyway.
new_args = []
for missing in e.missing_args:
if not isinstance(missing, OutputArgument):
raise
new_args.append(missing.name)
routine = code_gen.routine('autofunc', expr, args + new_args)
return code_wrapper.wrap_code(routine, helpers=helps)
@doctest_depends_on(exe=('f2py', 'gfortran'), modules=('numpy',))
def binary_function(symfunc, expr, **kwargs):
"""Returns a sympy function with expr as binary implementation
This is a convenience function that automates the steps needed to
autowrap the SymPy expression and attaching it to a Function object
with implemented_function().
Parameters
==========
symfunc : sympy Function
The function to bind the callable to.
expr : sympy Expression
The expression used to generate the function.
kwargs : dict
Any kwargs accepted by autowrap.
Examples
========
>>> from sympy.abc import x, y
>>> from sympy.utilities.autowrap import binary_function
>>> expr = ((x - y)**(25)).expand()
>>> f = binary_function('f', expr)
>>> type(f)
<class 'sympy.core.function.UndefinedFunction'>
>>> 2*f(x, y)
2*f(x, y)
>>> f(x, y).evalf(2, subs={x: 1, y: 2})
-1.0
"""
binary = autowrap(expr, **kwargs)
return implemented_function(symfunc, binary)
#################################################################
# UFUNCIFY #
#################################################################
_ufunc_top = Template("""\
#include "Python.h"
#include "math.h"
#include "numpy/ndarraytypes.h"
#include "numpy/ufuncobject.h"
#include "numpy/halffloat.h"
#include ${include_file}
static PyMethodDef ${module}Methods[] = {
{NULL, NULL, 0, NULL}
};""")
_ufunc_outcalls = Template("*((double *)out${outnum}) = ${funcname}(${call_args});")
_ufunc_body = Template("""\
static void ${funcname}_ufunc(char **args, npy_intp *dimensions, npy_intp* steps, void* data)
{
npy_intp i;
npy_intp n = dimensions[0];
${declare_args}
${declare_steps}
for (i = 0; i < n; i++) {
${outcalls}
${step_increments}
}
}
PyUFuncGenericFunction ${funcname}_funcs[1] = {&${funcname}_ufunc};
static char ${funcname}_types[${n_types}] = ${types}
static void *${funcname}_data[1] = {NULL};""")
_ufunc_bottom = Template("""\
#if PY_VERSION_HEX >= 0x03000000
static struct PyModuleDef moduledef = {
PyModuleDef_HEAD_INIT,
"${module}",
NULL,
-1,
${module}Methods,
NULL,
NULL,
NULL,
NULL
};
PyMODINIT_FUNC PyInit_${module}(void)
{
PyObject *m, *d;
${function_creation}
m = PyModule_Create(&moduledef);
if (!m) {
return NULL;
}
import_array();
import_umath();
d = PyModule_GetDict(m);
${ufunc_init}
return m;
}
#else
PyMODINIT_FUNC init${module}(void)
{
PyObject *m, *d;
${function_creation}
m = Py_InitModule("${module}", ${module}Methods);
if (m == NULL) {
return;
}
import_array();
import_umath();
d = PyModule_GetDict(m);
${ufunc_init}
}
#endif\
""")
_ufunc_init_form = Template("""\
ufunc${ind} = PyUFunc_FromFuncAndData(${funcname}_funcs, ${funcname}_data, ${funcname}_types, 1, ${n_in}, ${n_out},
PyUFunc_None, "${module}", ${docstring}, 0);
PyDict_SetItemString(d, "${funcname}", ufunc${ind});
Py_DECREF(ufunc${ind});""")
_ufunc_setup = Template("""\
def configuration(parent_package='', top_path=None):
import numpy
from numpy.distutils.misc_util import Configuration
config = Configuration('',
parent_package,
top_path)
config.add_extension('${module}', sources=['${module}.c', '${filename}.c'])
return config
if __name__ == "__main__":
from numpy.distutils.core import setup
setup(configuration=configuration)""")
class UfuncifyCodeWrapper(CodeWrapper):
"""Wrapper for Ufuncify"""
def __init__(self, *args, **kwargs):
ext_keys = ['include_dirs', 'library_dirs', 'libraries',
'extra_compile_args', 'extra_link_args']
msg = ('The compilation option kwarg {} is not supported with the numpy'
' backend.')
for k in ext_keys:
if k in kwargs.keys():
warn(msg.format(k))
kwargs.pop(k, None)
super(UfuncifyCodeWrapper, self).__init__(*args, **kwargs)
@property
def command(self):
command = [sys.executable, "setup.py", "build_ext", "--inplace"]
return command
def wrap_code(self, routines, helpers=None):
# This routine overrides CodeWrapper because we can't assume funcname == routines[0].name
# Therefore we have to break the CodeWrapper private API.
# There isn't an obvious way to extend multi-expr support to
# the other autowrap backends, so we limit this change to ufuncify.
helpers = helpers if helpers is not None else []
# We just need a consistent name
funcname = 'wrapped_' + str(id(routines) + id(helpers))
workdir = self.filepath or tempfile.mkdtemp("_sympy_compile")
if not os.access(workdir, os.F_OK):
os.mkdir(workdir)
oldwork = os.getcwd()
os.chdir(workdir)
try:
sys.path.append(workdir)
self._generate_code(routines, helpers)
self._prepare_files(routines, funcname)
self._process_files(routines)
mod = __import__(self.module_name)
finally:
sys.path.remove(workdir)
CodeWrapper._module_counter += 1
os.chdir(oldwork)
if not self.filepath:
try:
shutil.rmtree(workdir)
except OSError:
# Could be some issues on Windows
pass
return self._get_wrapped_function(mod, funcname)
def _generate_code(self, main_routines, helper_routines):
all_routines = main_routines + helper_routines
self.generator.write(
all_routines, self.filename, True, self.include_header,
self.include_empty)
def _prepare_files(self, routines, funcname):
# C
codefilename = self.module_name + '.c'
with open(codefilename, 'w') as f:
self.dump_c(routines, f, self.filename, funcname=funcname)
# setup.py
with open('setup.py', 'w') as f:
self.dump_setup(f)
@classmethod
def _get_wrapped_function(cls, mod, name):
return getattr(mod, name)
def dump_setup(self, f):
setup = _ufunc_setup.substitute(module=self.module_name,
filename=self.filename)
f.write(setup)
def dump_c(self, routines, f, prefix, funcname=None):
"""Write a C file with python wrappers
This file contains all the definitions of the routines in c code.
Arguments
---------
routines
List of Routine instances
f
File-like object to write the file to
prefix
The filename prefix, used to name the imported module.
funcname
Name of the main function to be returned.
"""
if funcname is None:
if len(routines) == 1:
funcname = routines[0].name
else:
msg = 'funcname must be specified for multiple output routines'
raise ValueError(msg)
functions = []
function_creation = []
ufunc_init = []
module = self.module_name
include_file = "\"{0}.h\"".format(prefix)
top = _ufunc_top.substitute(include_file=include_file, module=module)
name = funcname
# Partition the C function arguments into categories
# Here we assume all routines accept the same arguments
r_index = 0
py_in, _ = self._partition_args(routines[0].arguments)
n_in = len(py_in)
n_out = len(routines)
# Declare Args
form = "char *{0}{1} = args[{2}];"
arg_decs = [form.format('in', i, i) for i in range(n_in)]
arg_decs.extend([form.format('out', i, i+n_in) for i in range(n_out)])
declare_args = '\n '.join(arg_decs)
# Declare Steps
form = "npy_intp {0}{1}_step = steps[{2}];"
step_decs = [form.format('in', i, i) for i in range(n_in)]
step_decs.extend([form.format('out', i, i+n_in) for i in range(n_out)])
declare_steps = '\n '.join(step_decs)
# Call Args
form = "*(double *)in{0}"
call_args = ', '.join([form.format(a) for a in range(n_in)])
# Step Increments
form = "{0}{1} += {0}{1}_step;"
step_incs = [form.format('in', i) for i in range(n_in)]
step_incs.extend([form.format('out', i, i) for i in range(n_out)])
step_increments = '\n '.join(step_incs)
# Types
n_types = n_in + n_out
types = "{" + ', '.join(["NPY_DOUBLE"]*n_types) + "};"
# Docstring
docstring = '"Created in SymPy with Ufuncify"'
# Function Creation
function_creation.append("PyObject *ufunc{0};".format(r_index))
# Ufunc initialization
init_form = _ufunc_init_form.substitute(module=module,
funcname=name,
docstring=docstring,
n_in=n_in, n_out=n_out,
ind=r_index)
ufunc_init.append(init_form)
outcalls = [_ufunc_outcalls.substitute(
outnum=i, call_args=call_args, funcname=routines[i].name) for i in
range(n_out)]
body = _ufunc_body.substitute(module=module, funcname=name,
declare_args=declare_args,
declare_steps=declare_steps,
call_args=call_args,
step_increments=step_increments,
n_types=n_types, types=types,
outcalls='\n '.join(outcalls))
functions.append(body)
body = '\n\n'.join(functions)
ufunc_init = '\n '.join(ufunc_init)
function_creation = '\n '.join(function_creation)
bottom = _ufunc_bottom.substitute(module=module,
ufunc_init=ufunc_init,
function_creation=function_creation)
text = [top, body, bottom]
f.write('\n\n'.join(text))
def _partition_args(self, args):
"""Group function arguments into categories."""
py_in = []
py_out = []
for arg in args:
if isinstance(arg, OutputArgument):
py_out.append(arg)
elif isinstance(arg, InOutArgument):
raise ValueError("Ufuncify doesn't support InOutArguments")
else:
py_in.append(arg)
return py_in, py_out
@cacheit
@doctest_depends_on(exe=('f2py', 'gfortran', 'gcc'), modules=('numpy',))
def ufuncify(args, expr, language=None, backend='numpy', tempdir=None,
flags=None, verbose=False, helpers=None, **kwargs):
"""Generates a binary function that supports broadcasting on numpy arrays.
Parameters
==========
args : iterable
Either a Symbol or an iterable of symbols. Specifies the argument
sequence for the function.
expr
A SymPy expression that defines the element wise operation.
language : string, optional
If supplied, (options: 'C' or 'F95'), specifies the language of the
generated code. If ``None`` [default], the language is inferred based
upon the specified backend.
backend : string, optional
Backend used to wrap the generated code. Either 'numpy' [default],
'cython', or 'f2py'.
tempdir : string, optional
Path to directory for temporary files. If this argument is supplied,
the generated code and the wrapper input files are left intact in
the specified path.
flags : iterable, optional
Additional option flags that will be passed to the backend.
verbose : bool, optional
If True, autowrap will not mute the command line backends. This can
be helpful for debugging.
helpers : iterable, optional
Used to define auxiliary expressions needed for the main expr. If
the main expression needs to call a specialized function it should
be put in the ``helpers`` iterable. Autowrap will then make sure
that the compiled main expression can link to the helper routine.
Items should be tuples with (<funtion_name>, <sympy_expression>,
<arguments>). It is mandatory to supply an argument sequence to
helper routines.
kwargs : dict
These kwargs will be passed to autowrap if the `f2py` or `cython`
backend is used and ignored if the `numpy` backend is used.
Notes
=====
The default backend ('numpy') will create actual instances of
``numpy.ufunc``. These support ndimensional broadcasting, and implicit type
conversion. Use of the other backends will result in a "ufunc-like"
function, which requires equal length 1-dimensional arrays for all
arguments, and will not perform any type conversions.
References
==========
.. [1] http://docs.scipy.org/doc/numpy/reference/ufuncs.html
Examples
========
>>> from sympy.utilities.autowrap import ufuncify
>>> from sympy.abc import x, y
>>> import numpy as np
>>> f = ufuncify((x, y), y + x**2)
>>> type(f)
<class 'numpy.ufunc'>
>>> f([1, 2, 3], 2)
array([ 3., 6., 11.])
>>> f(np.arange(5), 3)
array([ 3., 4., 7., 12., 19.])
For the 'f2py' and 'cython' backends, inputs are required to be equal length
1-dimensional arrays. The 'f2py' backend will perform type conversion, but
the Cython backend will error if the inputs are not of the expected type.
>>> f_fortran = ufuncify((x, y), y + x**2, backend='f2py')
>>> f_fortran(1, 2)
array([ 3.])
>>> f_fortran(np.array([1, 2, 3]), np.array([1.0, 2.0, 3.0]))
array([ 2., 6., 12.])
>>> f_cython = ufuncify((x, y), y + x**2, backend='Cython')
>>> f_cython(1, 2) # doctest: +ELLIPSIS
Traceback (most recent call last):
...
TypeError: Argument '_x' has incorrect type (expected numpy.ndarray, got int)
>>> f_cython(np.array([1.0]), np.array([2.0]))
array([ 3.])
"""
if isinstance(args, Symbol):
args = (args,)
else:
args = tuple(args)
if language:
_validate_backend_language(backend, language)
else:
language = _infer_language(backend)
helpers = helpers if helpers else ()
flags = flags if flags else ()
if backend.upper() == 'NUMPY':
# maxargs is set by numpy compile-time constant NPY_MAXARGS
# If a future version of numpy modifies or removes this restriction
# this variable should be changed or removed
maxargs = 32
helps = []
for name, expr, args in helpers:
helps.append(make_routine(name, expr, args))
code_wrapper = UfuncifyCodeWrapper(C99CodeGen("ufuncify"), tempdir,
flags, verbose)
if not isinstance(expr, (list, tuple)):
expr = [expr]
if len(expr) == 0:
raise ValueError('Expression iterable has zero length')
if len(expr) + len(args) > maxargs:
msg = ('Cannot create ufunc with more than {0} total arguments: '
'got {1} in, {2} out')
raise ValueError(msg.format(maxargs, len(args), len(expr)))
routines = [make_routine('autofunc{}'.format(idx), exprx, args) for
idx, exprx in enumerate(expr)]
return code_wrapper.wrap_code(routines, helpers=helps)
else:
# Dummies are used for all added expressions to prevent name clashes
# within the original expression.
y = IndexedBase(Dummy('y'))
m = Dummy('m', integer=True)
i = Idx(Dummy('i', integer=True), m)
f_dummy = Dummy('f')
f = implemented_function('%s_%d' % (f_dummy.name, f_dummy.dummy_index), Lambda(args, expr))
# For each of the args create an indexed version.
indexed_args = [IndexedBase(Dummy(str(a))) for a in args]
# Order the arguments (out, args, dim)
args = [y] + indexed_args + [m]
args_with_indices = [a[i] for a in indexed_args]
return autowrap(Eq(y[i], f(*args_with_indices)), language, backend,
tempdir, args, flags, verbose, helpers, **kwargs)
|
fb15f4f83edce415447af7f5a60d05e197b257062357973a95c3608d60dde6ae | from sympy.utilities.exceptions import SymPyDeprecationWarning
SymPyDeprecationWarning(
feature="Import sympy.utilities.pytest",
useinstead="Import from sympy.testing.pytest",
issue=18095,
deprecated_since_version="1.6").warn()
from sympy.testing.pytest import * # noqa:F401
|
fb1465b889b5838c328b71bb95d41acde0a61722819efec8e3aea4c3ba7e3ee2 | """This module contains some general purpose utilities that are used across
SymPy.
"""
from .iterables import (flatten, group, take, subsets,
variations, numbered_symbols, cartes, capture, dict_merge,
postorder_traversal, interactive_traversal,
prefixes, postfixes, sift, topological_sort, unflatten,
has_dups, has_variety, reshape, default_sort_key, ordered,
rotations)
from .misc import filldedent
from .lambdify import lambdify
from .source import source
from .decorator import threaded, xthreaded, public, memoize_property
from .timeutils import timed
__all__ = [
'flatten', 'group', 'take', 'subsets', 'variations', 'numbered_symbols',
'cartes', 'capture', 'dict_merge', 'postorder_traversal',
'interactive_traversal', 'prefixes', 'postfixes', 'sift',
'topological_sort', 'unflatten', 'has_dups', 'has_variety', 'reshape',
'default_sort_key', 'ordered', 'rotations',
'filldedent',
'lambdify',
'source',
'threaded', 'xthreaded', 'public', 'memoize_property',
'timed',
]
|
1ef5e7b24791a51e4f08490401aaab8cbb1ffc17e92a105a2c5f40faada458b3 | """
This module provides convenient functions to transform sympy expressions to
lambda functions which can be used to calculate numerical values very fast.
"""
from __future__ import print_function, division
from typing import Any, Dict
import inspect
import keyword
import textwrap
import linecache
from sympy.core.compatibility import (exec_, is_sequence, iterable,
NotIterable, builtins)
from sympy.utilities.misc import filldedent
from sympy.utilities.decorator import doctest_depends_on
__doctest_requires__ = {('lambdify',): ['numpy', 'tensorflow']}
# Default namespaces, letting us define translations that can't be defined
# by simple variable maps, like I => 1j
MATH_DEFAULT = {} # type: Dict[str, Any]
MPMATH_DEFAULT = {} # type: Dict[str, Any]
NUMPY_DEFAULT = {"I": 1j} # type: Dict[str, Any]
SCIPY_DEFAULT = {"I": 1j} # type: Dict[str, Any]
TENSORFLOW_DEFAULT = {} # type: Dict[str, Any]
SYMPY_DEFAULT = {} # type: Dict[str, Any]
NUMEXPR_DEFAULT = {} # type: Dict[str, Any]
# These are the namespaces the lambda functions will use.
# These are separate from the names above because they are modified
# throughout this file, whereas the defaults should remain unmodified.
MATH = MATH_DEFAULT.copy()
MPMATH = MPMATH_DEFAULT.copy()
NUMPY = NUMPY_DEFAULT.copy()
SCIPY = SCIPY_DEFAULT.copy()
TENSORFLOW = TENSORFLOW_DEFAULT.copy()
SYMPY = SYMPY_DEFAULT.copy()
NUMEXPR = NUMEXPR_DEFAULT.copy()
# Mappings between sympy and other modules function names.
MATH_TRANSLATIONS = {
"ceiling": "ceil",
"E": "e",
"ln": "log",
}
# NOTE: This dictionary is reused in Function._eval_evalf to allow subclasses
# of Function to automatically evalf.
MPMATH_TRANSLATIONS = {
"Abs": "fabs",
"elliptic_k": "ellipk",
"elliptic_f": "ellipf",
"elliptic_e": "ellipe",
"elliptic_pi": "ellippi",
"ceiling": "ceil",
"chebyshevt": "chebyt",
"chebyshevu": "chebyu",
"E": "e",
"I": "j",
"ln": "log",
#"lowergamma":"lower_gamma",
"oo": "inf",
#"uppergamma":"upper_gamma",
"LambertW": "lambertw",
"MutableDenseMatrix": "matrix",
"ImmutableDenseMatrix": "matrix",
"conjugate": "conj",
"dirichlet_eta": "altzeta",
"Ei": "ei",
"Shi": "shi",
"Chi": "chi",
"Si": "si",
"Ci": "ci",
"RisingFactorial": "rf",
"FallingFactorial": "ff",
}
NUMPY_TRANSLATIONS = {} # type: Dict[str, str]
SCIPY_TRANSLATIONS = {} # type: Dict[str, str]
TENSORFLOW_TRANSLATIONS = {} # type: Dict[str, str]
NUMEXPR_TRANSLATIONS = {} # type: Dict[str, str]
# Available modules:
MODULES = {
"math": (MATH, MATH_DEFAULT, MATH_TRANSLATIONS, ("from math import *",)),
"mpmath": (MPMATH, MPMATH_DEFAULT, MPMATH_TRANSLATIONS, ("from mpmath import *",)),
"numpy": (NUMPY, NUMPY_DEFAULT, NUMPY_TRANSLATIONS, ("import numpy; from numpy import *; from numpy.linalg import *",)),
"scipy": (SCIPY, SCIPY_DEFAULT, SCIPY_TRANSLATIONS, ("import numpy; import scipy; from scipy import *; from scipy.special import *",)),
"tensorflow": (TENSORFLOW, TENSORFLOW_DEFAULT, TENSORFLOW_TRANSLATIONS, ("import tensorflow",)),
"sympy": (SYMPY, SYMPY_DEFAULT, {}, (
"from sympy.functions import *",
"from sympy.matrices import *",
"from sympy import Integral, pi, oo, nan, zoo, E, I",)),
"numexpr" : (NUMEXPR, NUMEXPR_DEFAULT, NUMEXPR_TRANSLATIONS,
("import_module('numexpr')", )),
}
def _import(module, reload=False):
"""
Creates a global translation dictionary for module.
The argument module has to be one of the following strings: "math",
"mpmath", "numpy", "sympy", "tensorflow".
These dictionaries map names of python functions to their equivalent in
other modules.
"""
# Required despite static analysis claiming it is not used
from sympy.external import import_module # noqa:F401
try:
namespace, namespace_default, translations, import_commands = MODULES[
module]
except KeyError:
raise NameError(
"'%s' module can't be used for lambdification" % module)
# Clear namespace or exit
if namespace != namespace_default:
# The namespace was already generated, don't do it again if not forced.
if reload:
namespace.clear()
namespace.update(namespace_default)
else:
return
for import_command in import_commands:
if import_command.startswith('import_module'):
module = eval(import_command)
if module is not None:
namespace.update(module.__dict__)
continue
else:
try:
exec_(import_command, {}, namespace)
continue
except ImportError:
pass
raise ImportError(
"can't import '%s' with '%s' command" % (module, import_command))
# Add translated names to namespace
for sympyname, translation in translations.items():
namespace[sympyname] = namespace[translation]
# For computing the modulus of a sympy expression we use the builtin abs
# function, instead of the previously used fabs function for all
# translation modules. This is because the fabs function in the math
# module does not accept complex valued arguments. (see issue 9474). The
# only exception, where we don't use the builtin abs function is the
# mpmath translation module, because mpmath.fabs returns mpf objects in
# contrast to abs().
if 'Abs' not in namespace:
namespace['Abs'] = abs
# Used for dynamically generated filenames that are inserted into the
# linecache.
_lambdify_generated_counter = 1
@doctest_depends_on(modules=('numpy', 'tensorflow', ), python_version=(3,))
def lambdify(args, expr, modules=None, printer=None, use_imps=True,
dummify=False):
"""Convert a SymPy expression into a function that allows for fast
numeric evaluation.
.. warning::
This function uses ``exec``, and thus shouldn't be used on
unsanitized input.
Explanation
===========
For example, to convert the SymPy expression ``sin(x) + cos(x)`` to an
equivalent NumPy function that numerically evaluates it:
>>> from sympy import sin, cos, symbols, lambdify
>>> import numpy as np
>>> x = symbols('x')
>>> expr = sin(x) + cos(x)
>>> expr
sin(x) + cos(x)
>>> f = lambdify(x, expr, 'numpy')
>>> a = np.array([1, 2])
>>> f(a)
[1.38177329 0.49315059]
The primary purpose of this function is to provide a bridge from SymPy
expressions to numerical libraries such as NumPy, SciPy, NumExpr, mpmath,
and tensorflow. In general, SymPy functions do not work with objects from
other libraries, such as NumPy arrays, and functions from numeric
libraries like NumPy or mpmath do not work on SymPy expressions.
``lambdify`` bridges the two by converting a SymPy expression to an
equivalent numeric function.
The basic workflow with ``lambdify`` is to first create a SymPy expression
representing whatever mathematical function you wish to evaluate. This
should be done using only SymPy functions and expressions. Then, use
``lambdify`` to convert this to an equivalent function for numerical
evaluation. For instance, above we created ``expr`` using the SymPy symbol
``x`` and SymPy functions ``sin`` and ``cos``, then converted it to an
equivalent NumPy function ``f``, and called it on a NumPy array ``a``.
Parameters
==========
args : List[Symbol]
A variable or a list of variables whose nesting represents the
nesting of the arguments that will be passed to the function.
Variables can be symbols, undefined functions, or matrix symbols.
>>> from sympy import Eq
>>> from sympy.abc import x, y, z
The list of variables should match the structure of how the
arguments will be passed to the function. Simply enclose the
parameters as they will be passed in a list.
To call a function like ``f(x)`` then ``[x]``
should be the first argument to ``lambdify``; for this
case a single ``x`` can also be used:
>>> f = lambdify(x, x + 1)
>>> f(1)
2
>>> f = lambdify([x], x + 1)
>>> f(1)
2
To call a function like ``f(x, y)`` then ``[x, y]`` will
be the first argument of the ``lambdify``:
>>> f = lambdify([x, y], x + y)
>>> f(1, 1)
2
To call a function with a single 3-element tuple like
``f((x, y, z))`` then ``[(x, y, z)]`` will be the first
argument of the ``lambdify``:
>>> f = lambdify([(x, y, z)], Eq(z**2, x**2 + y**2))
>>> f((3, 4, 5))
True
If two args will be passed and the first is a scalar but
the second is a tuple with two arguments then the items
in the list should match that structure:
>>> f = lambdify([x, (y, z)], x + y + z)
>>> f(1, (2, 3))
6
expr : Expr
An expression, list of expressions, or matrix to be evaluated.
Lists may be nested.
If the expression is a list, the output will also be a list.
>>> f = lambdify(x, [x, [x + 1, x + 2]])
>>> f(1)
[1, [2, 3]]
If it is a matrix, an array will be returned (for the NumPy module).
>>> from sympy import Matrix
>>> f = lambdify(x, Matrix([x, x + 1]))
>>> f(1)
[[1]
[2]]
Note that the argument order here (variables then expression) is used
to emulate the Python ``lambda`` keyword. ``lambdify(x, expr)`` works
(roughly) like ``lambda x: expr``
(see :ref:`lambdify-how-it-works` below).
modules : str, optional
Specifies the numeric library to use.
If not specified, *modules* defaults to:
- ``["scipy", "numpy"]`` if SciPy is installed
- ``["numpy"]`` if only NumPy is installed
- ``["math", "mpmath", "sympy"]`` if neither is installed.
That is, SymPy functions are replaced as far as possible by
either ``scipy`` or ``numpy`` functions if available, and Python's
standard library ``math``, or ``mpmath`` functions otherwise.
*modules* can be one of the following types:
- The strings ``"math"``, ``"mpmath"``, ``"numpy"``, ``"numexpr"``,
``"scipy"``, ``"sympy"``, or ``"tensorflow"``. This uses the
corresponding printer and namespace mapping for that module.
- A module (e.g., ``math``). This uses the global namespace of the
module. If the module is one of the above known modules, it will
also use the corresponding printer and namespace mapping
(i.e., ``modules=numpy`` is equivalent to ``modules="numpy"``).
- A dictionary that maps names of SymPy functions to arbitrary
functions
(e.g., ``{'sin': custom_sin}``).
- A list that contains a mix of the arguments above, with higher
priority given to entries appearing first
(e.g., to use the NumPy module but override the ``sin`` function
with a custom version, you can use
``[{'sin': custom_sin}, 'numpy']``).
dummify : bool, optional
Whether or not the variables in the provided expression that are not
valid Python identifiers are substituted with dummy symbols.
This allows for undefined functions like ``Function('f')(t)`` to be
supplied as arguments. By default, the variables are only dummified
if they are not valid Python identifiers.
Set ``dummify=True`` to replace all arguments with dummy symbols
(if ``args`` is not a string) - for example, to ensure that the
arguments do not redefine any built-in names.
Examples
========
>>> from sympy.utilities.lambdify import implemented_function
>>> from sympy import sqrt, sin, Matrix
>>> from sympy import Function
>>> from sympy.abc import w, x, y, z
>>> f = lambdify(x, x**2)
>>> f(2)
4
>>> f = lambdify((x, y, z), [z, y, x])
>>> f(1,2,3)
[3, 2, 1]
>>> f = lambdify(x, sqrt(x))
>>> f(4)
2.0
>>> f = lambdify((x, y), sin(x*y)**2)
>>> f(0, 5)
0.0
>>> row = lambdify((x, y), Matrix((x, x + y)).T, modules='sympy')
>>> row(1, 2)
Matrix([[1, 3]])
``lambdify`` can be used to translate SymPy expressions into mpmath
functions. This may be preferable to using ``evalf`` (which uses mpmath on
the backend) in some cases.
>>> import mpmath
>>> f = lambdify(x, sin(x), 'mpmath')
>>> f(1)
0.8414709848078965
Tuple arguments are handled and the lambdified function should
be called with the same type of arguments as were used to create
the function:
>>> f = lambdify((x, (y, z)), x + y)
>>> f(1, (2, 4))
3
The ``flatten`` function can be used to always work with flattened
arguments:
>>> from sympy.utilities.iterables import flatten
>>> args = w, (x, (y, z))
>>> vals = 1, (2, (3, 4))
>>> f = lambdify(flatten(args), w + x + y + z)
>>> f(*flatten(vals))
10
Functions present in ``expr`` can also carry their own numerical
implementations, in a callable attached to the ``_imp_`` attribute. This
can be used with undefined functions using the ``implemented_function``
factory:
>>> f = implemented_function(Function('f'), lambda x: x+1)
>>> func = lambdify(x, f(x))
>>> func(4)
5
``lambdify`` always prefers ``_imp_`` implementations to implementations
in other namespaces, unless the ``use_imps`` input parameter is False.
Usage with Tensorflow:
>>> import tensorflow as tf
>>> from sympy import Max, sin, lambdify
>>> from sympy.abc import x
>>> f = Max(x, sin(x))
>>> func = lambdify(x, f, 'tensorflow')
After tensorflow v2, eager execution is enabled by default.
If you want to get the compatible result across tensorflow v1 and v2
as same as this tutorial, run this line.
>>> tf.compat.v1.enable_eager_execution()
If you have eager execution enabled, you can get the result out
immediately as you can use numpy.
If you pass tensorflow objects, you may get an ``EagerTensor``
object instead of value.
>>> result = func(tf.constant(1.0))
>>> print(result)
tf.Tensor(1.0, shape=(), dtype=float32)
>>> print(result.__class__)
<class 'tensorflow.python.framework.ops.EagerTensor'>
You can use ``.numpy()`` to get the numpy value of the tensor.
>>> result.numpy()
1.0
>>> var = tf.Variable(2.0)
>>> result = func(var) # also works for tf.Variable and tf.Placeholder
>>> result.numpy()
2.0
And it works with any shape array.
>>> tensor = tf.constant([[1.0, 2.0], [3.0, 4.0]])
>>> result = func(tensor)
>>> result.numpy()
[[1. 2.]
[3. 4.]]
Notes
=====
- For functions involving large array calculations, numexpr can provide a
significant speedup over numpy. Please note that the available functions
for numexpr are more limited than numpy but can be expanded with
``implemented_function`` and user defined subclasses of Function. If
specified, numexpr may be the only option in modules. The official list
of numexpr functions can be found at:
https://numexpr.readthedocs.io/en/latest/user_guide.html#supported-functions
- In previous versions of SymPy, ``lambdify`` replaced ``Matrix`` with
``numpy.matrix`` by default. As of SymPy 1.0 ``numpy.array`` is the
default. To get the old default behavior you must pass in
``[{'ImmutableDenseMatrix': numpy.matrix}, 'numpy']`` to the
``modules`` kwarg.
>>> from sympy import lambdify, Matrix
>>> from sympy.abc import x, y
>>> import numpy
>>> array2mat = [{'ImmutableDenseMatrix': numpy.matrix}, 'numpy']
>>> f = lambdify((x, y), Matrix([x, y]), modules=array2mat)
>>> f(1, 2)
[[1]
[2]]
- In the above examples, the generated functions can accept scalar
values or numpy arrays as arguments. However, in some cases
the generated function relies on the input being a numpy array:
>>> from sympy import Piecewise
>>> from sympy.testing.pytest import ignore_warnings
>>> f = lambdify(x, Piecewise((x, x <= 1), (1/x, x > 1)), "numpy")
>>> with ignore_warnings(RuntimeWarning):
... f(numpy.array([-1, 0, 1, 2]))
[-1. 0. 1. 0.5]
>>> f(0)
Traceback (most recent call last):
...
ZeroDivisionError: division by zero
In such cases, the input should be wrapped in a numpy array:
>>> with ignore_warnings(RuntimeWarning):
... float(f(numpy.array([0])))
0.0
Or if numpy functionality is not required another module can be used:
>>> f = lambdify(x, Piecewise((x, x <= 1), (1/x, x > 1)), "math")
>>> f(0)
0
.. _lambdify-how-it-works:
How it works
============
When using this function, it helps a great deal to have an idea of what it
is doing. At its core, lambdify is nothing more than a namespace
translation, on top of a special printer that makes some corner cases work
properly.
To understand lambdify, first we must properly understand how Python
namespaces work. Say we had two files. One called ``sin_cos_sympy.py``,
with
.. code:: python
# sin_cos_sympy.py
from sympy import sin, cos
def sin_cos(x):
return sin(x) + cos(x)
and one called ``sin_cos_numpy.py`` with
.. code:: python
# sin_cos_numpy.py
from numpy import sin, cos
def sin_cos(x):
return sin(x) + cos(x)
The two files define an identical function ``sin_cos``. However, in the
first file, ``sin`` and ``cos`` are defined as the SymPy ``sin`` and
``cos``. In the second, they are defined as the NumPy versions.
If we were to import the first file and use the ``sin_cos`` function, we
would get something like
>>> from sin_cos_sympy import sin_cos # doctest: +SKIP
>>> sin_cos(1) # doctest: +SKIP
cos(1) + sin(1)
On the other hand, if we imported ``sin_cos`` from the second file, we
would get
>>> from sin_cos_numpy import sin_cos # doctest: +SKIP
>>> sin_cos(1) # doctest: +SKIP
1.38177329068
In the first case we got a symbolic output, because it used the symbolic
``sin`` and ``cos`` functions from SymPy. In the second, we got a numeric
result, because ``sin_cos`` used the numeric ``sin`` and ``cos`` functions
from NumPy. But notice that the versions of ``sin`` and ``cos`` that were
used was not inherent to the ``sin_cos`` function definition. Both
``sin_cos`` definitions are exactly the same. Rather, it was based on the
names defined at the module where the ``sin_cos`` function was defined.
The key point here is that when function in Python references a name that
is not defined in the function, that name is looked up in the "global"
namespace of the module where that function is defined.
Now, in Python, we can emulate this behavior without actually writing a
file to disk using the ``exec`` function. ``exec`` takes a string
containing a block of Python code, and a dictionary that should contain
the global variables of the module. It then executes the code "in" that
dictionary, as if it were the module globals. The following is equivalent
to the ``sin_cos`` defined in ``sin_cos_sympy.py``:
>>> import sympy
>>> module_dictionary = {'sin': sympy.sin, 'cos': sympy.cos}
>>> exec('''
... def sin_cos(x):
... return sin(x) + cos(x)
... ''', module_dictionary)
>>> sin_cos = module_dictionary['sin_cos']
>>> sin_cos(1)
cos(1) + sin(1)
and similarly with ``sin_cos_numpy``:
>>> import numpy
>>> module_dictionary = {'sin': numpy.sin, 'cos': numpy.cos}
>>> exec('''
... def sin_cos(x):
... return sin(x) + cos(x)
... ''', module_dictionary)
>>> sin_cos = module_dictionary['sin_cos']
>>> sin_cos(1)
1.38177329068
So now we can get an idea of how ``lambdify`` works. The name "lambdify"
comes from the fact that we can think of something like ``lambdify(x,
sin(x) + cos(x), 'numpy')`` as ``lambda x: sin(x) + cos(x)``, where
``sin`` and ``cos`` come from the ``numpy`` namespace. This is also why
the symbols argument is first in ``lambdify``, as opposed to most SymPy
functions where it comes after the expression: to better mimic the
``lambda`` keyword.
``lambdify`` takes the input expression (like ``sin(x) + cos(x)``) and
1. Converts it to a string
2. Creates a module globals dictionary based on the modules that are
passed in (by default, it uses the NumPy module)
3. Creates the string ``"def func({vars}): return {expr}"``, where ``{vars}`` is the
list of variables separated by commas, and ``{expr}`` is the string
created in step 1., then ``exec``s that string with the module globals
namespace and returns ``func``.
In fact, functions returned by ``lambdify`` support inspection. So you can
see exactly how they are defined by using ``inspect.getsource``, or ``??`` if you
are using IPython or the Jupyter notebook.
>>> f = lambdify(x, sin(x) + cos(x))
>>> import inspect
>>> print(inspect.getsource(f))
def _lambdifygenerated(x):
return (sin(x) + cos(x))
This shows us the source code of the function, but not the namespace it
was defined in. We can inspect that by looking at the ``__globals__``
attribute of ``f``:
>>> f.__globals__['sin']
<ufunc 'sin'>
>>> f.__globals__['cos']
<ufunc 'cos'>
>>> f.__globals__['sin'] is numpy.sin
True
This shows us that ``sin`` and ``cos`` in the namespace of ``f`` will be
``numpy.sin`` and ``numpy.cos``.
Note that there are some convenience layers in each of these steps, but at
the core, this is how ``lambdify`` works. Step 1 is done using the
``LambdaPrinter`` printers defined in the printing module (see
:mod:`sympy.printing.lambdarepr`). This allows different SymPy expressions
to define how they should be converted to a string for different modules.
You can change which printer ``lambdify`` uses by passing a custom printer
in to the ``printer`` argument.
Step 2 is augmented by certain translations. There are default
translations for each module, but you can provide your own by passing a
list to the ``modules`` argument. For instance,
>>> def mysin(x):
... print('taking the sin of', x)
... return numpy.sin(x)
...
>>> f = lambdify(x, sin(x), [{'sin': mysin}, 'numpy'])
>>> f(1)
taking the sin of 1
0.8414709848078965
The globals dictionary is generated from the list by merging the
dictionary ``{'sin': mysin}`` and the module dictionary for NumPy. The
merging is done so that earlier items take precedence, which is why
``mysin`` is used above instead of ``numpy.sin``.
If you want to modify the way ``lambdify`` works for a given function, it
is usually easiest to do so by modifying the globals dictionary as such.
In more complicated cases, it may be necessary to create and pass in a
custom printer.
Finally, step 3 is augmented with certain convenience operations, such as
the addition of a docstring.
Understanding how ``lambdify`` works can make it easier to avoid certain
gotchas when using it. For instance, a common mistake is to create a
lambdified function for one module (say, NumPy), and pass it objects from
another (say, a SymPy expression).
For instance, say we create
>>> from sympy.abc import x
>>> f = lambdify(x, x + 1, 'numpy')
Now if we pass in a NumPy array, we get that array plus 1
>>> import numpy
>>> a = numpy.array([1, 2])
>>> f(a)
[2 3]
But what happens if you make the mistake of passing in a SymPy expression
instead of a NumPy array:
>>> f(x + 1)
x + 2
This worked, but it was only by accident. Now take a different lambdified
function:
>>> from sympy import sin
>>> g = lambdify(x, x + sin(x), 'numpy')
This works as expected on NumPy arrays:
>>> g(a)
[1.84147098 2.90929743]
But if we try to pass in a SymPy expression, it fails
>>> try:
... g(x + 1)
... # NumPy release after 1.17 raises TypeError instead of
... # AttributeError
... except (AttributeError, TypeError):
... raise AttributeError() # doctest: +IGNORE_EXCEPTION_DETAIL
Traceback (most recent call last):
...
AttributeError:
Now, let's look at what happened. The reason this fails is that ``g``
calls ``numpy.sin`` on the input expression, and ``numpy.sin`` does not
know how to operate on a SymPy object. **As a general rule, NumPy
functions do not know how to operate on SymPy expressions, and SymPy
functions do not know how to operate on NumPy arrays. This is why lambdify
exists: to provide a bridge between SymPy and NumPy.**
However, why is it that ``f`` did work? That's because ``f`` doesn't call
any functions, it only adds 1. So the resulting function that is created,
``def _lambdifygenerated(x): return x + 1`` does not depend on the globals
namespace it is defined in. Thus it works, but only by accident. A future
version of ``lambdify`` may remove this behavior.
Be aware that certain implementation details described here may change in
future versions of SymPy. The API of passing in custom modules and
printers will not change, but the details of how a lambda function is
created may change. However, the basic idea will remain the same, and
understanding it will be helpful to understanding the behavior of
lambdify.
**In general: you should create lambdified functions for one module (say,
NumPy), and only pass it input types that are compatible with that module
(say, NumPy arrays).** Remember that by default, if the ``module``
argument is not provided, ``lambdify`` creates functions using the NumPy
and SciPy namespaces.
"""
from sympy.core.symbol import Symbol
# If the user hasn't specified any modules, use what is available.
if modules is None:
try:
_import("scipy")
except ImportError:
try:
_import("numpy")
except ImportError:
# Use either numpy (if available) or python.math where possible.
# XXX: This leads to different behaviour on different systems and
# might be the reason for irreproducible errors.
modules = ["math", "mpmath", "sympy"]
else:
modules = ["numpy"]
else:
modules = ["numpy", "scipy"]
# Get the needed namespaces.
namespaces = []
# First find any function implementations
if use_imps:
namespaces.append(_imp_namespace(expr))
# Check for dict before iterating
if isinstance(modules, (dict, str)) or not hasattr(modules, '__iter__'):
namespaces.append(modules)
else:
# consistency check
if _module_present('numexpr', modules) and len(modules) > 1:
raise TypeError("numexpr must be the only item in 'modules'")
namespaces += list(modules)
# fill namespace with first having highest priority
namespace = {}
for m in namespaces[::-1]:
buf = _get_namespace(m)
namespace.update(buf)
if hasattr(expr, "atoms"):
#Try if you can extract symbols from the expression.
#Move on if expr.atoms in not implemented.
syms = expr.atoms(Symbol)
for term in syms:
namespace.update({str(term): term})
if printer is None:
if _module_present('mpmath', namespaces):
from sympy.printing.pycode import MpmathPrinter as Printer
elif _module_present('scipy', namespaces):
from sympy.printing.pycode import SciPyPrinter as Printer
elif _module_present('numpy', namespaces):
from sympy.printing.pycode import NumPyPrinter as Printer
elif _module_present('numexpr', namespaces):
from sympy.printing.lambdarepr import NumExprPrinter as Printer
elif _module_present('tensorflow', namespaces):
from sympy.printing.tensorflow import TensorflowPrinter as Printer
elif _module_present('sympy', namespaces):
from sympy.printing.pycode import SymPyPrinter as Printer
else:
from sympy.printing.pycode import PythonCodePrinter as Printer
user_functions = {}
for m in namespaces[::-1]:
if isinstance(m, dict):
for k in m:
user_functions[k] = k
printer = Printer({'fully_qualified_modules': False, 'inline': True,
'allow_unknown_functions': True,
'user_functions': user_functions})
# Get the names of the args, for creating a docstring
if not iterable(args):
args = (args,)
names = []
# Grab the callers frame, for getting the names by inspection (if needed)
callers_local_vars = inspect.currentframe().f_back.f_locals.items()
for n, var in enumerate(args):
if hasattr(var, 'name'):
names.append(var.name)
else:
# It's an iterable. Try to get name by inspection of calling frame.
name_list = [var_name for var_name, var_val in callers_local_vars
if var_val is var]
if len(name_list) == 1:
names.append(name_list[0])
else:
# Cannot infer name with certainty. arg_# will have to do.
names.append('arg_' + str(n))
# Create the function definition code and execute it
funcname = '_lambdifygenerated'
if _module_present('tensorflow', namespaces):
funcprinter = _TensorflowEvaluatorPrinter(printer, dummify)
else:
funcprinter = _EvaluatorPrinter(printer, dummify)
funcstr = funcprinter.doprint(funcname, args, expr)
# Collect the module imports from the code printers.
imp_mod_lines = []
for mod, keys in (getattr(printer, 'module_imports', None) or {}).items():
for k in keys:
if k not in namespace:
ln = "from %s import %s" % (mod, k)
try:
exec_(ln, {}, namespace)
except ImportError:
# Tensorflow 2.0 has issues with importing a specific
# function from its submodule.
# https://github.com/tensorflow/tensorflow/issues/33022
ln = "%s = %s.%s" % (k, mod, k)
exec_(ln, {}, namespace)
imp_mod_lines.append(ln)
# Provide lambda expression with builtins, and compatible implementation of range
namespace.update({'builtins':builtins, 'range':range})
funclocals = {}
global _lambdify_generated_counter
filename = '<lambdifygenerated-%s>' % _lambdify_generated_counter
_lambdify_generated_counter += 1
c = compile(funcstr, filename, 'exec')
exec_(c, namespace, funclocals)
# mtime has to be None or else linecache.checkcache will remove it
linecache.cache[filename] = (len(funcstr), None, funcstr.splitlines(True), filename)
func = funclocals[funcname]
# Apply the docstring
sig = "func({0})".format(", ".join(str(i) for i in names))
sig = textwrap.fill(sig, subsequent_indent=' '*8)
expr_str = str(expr)
if len(expr_str) > 78:
expr_str = textwrap.wrap(expr_str, 75)[0] + '...'
func.__doc__ = (
"Created with lambdify. Signature:\n\n"
"{sig}\n\n"
"Expression:\n\n"
"{expr}\n\n"
"Source code:\n\n"
"{src}\n\n"
"Imported modules:\n\n"
"{imp_mods}"
).format(sig=sig, expr=expr_str, src=funcstr, imp_mods='\n'.join(imp_mod_lines))
return func
def _module_present(modname, modlist):
if modname in modlist:
return True
for m in modlist:
if hasattr(m, '__name__') and m.__name__ == modname:
return True
return False
def _get_namespace(m):
"""
This is used by _lambdify to parse its arguments.
"""
if isinstance(m, str):
_import(m)
return MODULES[m][0]
elif isinstance(m, dict):
return m
elif hasattr(m, "__dict__"):
return m.__dict__
else:
raise TypeError("Argument must be either a string, dict or module but it is: %s" % m)
def lambdastr(args, expr, printer=None, dummify=None):
"""
Returns a string that can be evaluated to a lambda function.
Examples
========
>>> from sympy.abc import x, y, z
>>> from sympy.utilities.lambdify import lambdastr
>>> lambdastr(x, x**2)
'lambda x: (x**2)'
>>> lambdastr((x,y,z), [z,y,x])
'lambda x,y,z: ([z, y, x])'
Although tuples may not appear as arguments to lambda in Python 3,
lambdastr will create a lambda function that will unpack the original
arguments so that nested arguments can be handled:
>>> lambdastr((x, (y, z)), x + y)
'lambda _0,_1: (lambda x,y,z: (x + y))(_0,_1[0],_1[1])'
"""
# Transforming everything to strings.
from sympy.matrices import DeferredVector
from sympy import Dummy, sympify, Symbol, Function, flatten, Derivative, Basic
if printer is not None:
if inspect.isfunction(printer):
lambdarepr = printer
else:
if inspect.isclass(printer):
lambdarepr = lambda expr: printer().doprint(expr)
else:
lambdarepr = lambda expr: printer.doprint(expr)
else:
#XXX: This has to be done here because of circular imports
from sympy.printing.lambdarepr import lambdarepr
def sub_args(args, dummies_dict):
if isinstance(args, str):
return args
elif isinstance(args, DeferredVector):
return str(args)
elif iterable(args):
dummies = flatten([sub_args(a, dummies_dict) for a in args])
return ",".join(str(a) for a in dummies)
else:
# replace these with Dummy symbols
if isinstance(args, (Function, Symbol, Derivative)):
dummies = Dummy()
dummies_dict.update({args : dummies})
return str(dummies)
else:
return str(args)
def sub_expr(expr, dummies_dict):
expr = sympify(expr)
# dict/tuple are sympified to Basic
if isinstance(expr, Basic):
expr = expr.xreplace(dummies_dict)
# list is not sympified to Basic
elif isinstance(expr, list):
expr = [sub_expr(a, dummies_dict) for a in expr]
return expr
# Transform args
def isiter(l):
return iterable(l, exclude=(str, DeferredVector, NotIterable))
def flat_indexes(iterable):
n = 0
for el in iterable:
if isiter(el):
for ndeep in flat_indexes(el):
yield (n,) + ndeep
else:
yield (n,)
n += 1
if dummify is None:
dummify = any(isinstance(a, Basic) and
a.atoms(Function, Derivative) for a in (
args if isiter(args) else [args]))
if isiter(args) and any(isiter(i) for i in args):
dum_args = [str(Dummy(str(i))) for i in range(len(args))]
indexed_args = ','.join([
dum_args[ind[0]] + ''.join(["[%s]" % k for k in ind[1:]])
for ind in flat_indexes(args)])
lstr = lambdastr(flatten(args), expr, printer=printer, dummify=dummify)
return 'lambda %s: (%s)(%s)' % (','.join(dum_args), lstr, indexed_args)
dummies_dict = {}
if dummify:
args = sub_args(args, dummies_dict)
else:
if isinstance(args, str):
pass
elif iterable(args, exclude=DeferredVector):
args = ",".join(str(a) for a in args)
# Transform expr
if dummify:
if isinstance(expr, str):
pass
else:
expr = sub_expr(expr, dummies_dict)
expr = lambdarepr(expr)
return "lambda %s: (%s)" % (args, expr)
class _EvaluatorPrinter(object):
def __init__(self, printer=None, dummify=False):
self._dummify = dummify
#XXX: This has to be done here because of circular imports
from sympy.printing.lambdarepr import LambdaPrinter
if printer is None:
printer = LambdaPrinter()
if inspect.isfunction(printer):
self._exprrepr = printer
else:
if inspect.isclass(printer):
printer = printer()
self._exprrepr = printer.doprint
#if hasattr(printer, '_print_Symbol'):
# symbolrepr = printer._print_Symbol
#if hasattr(printer, '_print_Dummy'):
# dummyrepr = printer._print_Dummy
# Used to print the generated function arguments in a standard way
self._argrepr = LambdaPrinter().doprint
def doprint(self, funcname, args, expr):
"""Returns the function definition code as a string."""
from sympy import Dummy
funcbody = []
if not iterable(args):
args = [args]
argstrs, expr = self._preprocess(args, expr)
# Generate argument unpacking and final argument list
funcargs = []
unpackings = []
for argstr in argstrs:
if iterable(argstr):
funcargs.append(self._argrepr(Dummy()))
unpackings.extend(self._print_unpacking(argstr, funcargs[-1]))
else:
funcargs.append(argstr)
funcsig = 'def {}({}):'.format(funcname, ', '.join(funcargs))
# Wrap input arguments before unpacking
funcbody.extend(self._print_funcargwrapping(funcargs))
funcbody.extend(unpackings)
funcbody.append('return ({})'.format(self._exprrepr(expr)))
funclines = [funcsig]
funclines.extend(' ' + line for line in funcbody)
return '\n'.join(funclines) + '\n'
@classmethod
def _is_safe_ident(cls, ident):
return isinstance(ident, str) and ident.isidentifier() \
and not keyword.iskeyword(ident)
def _preprocess(self, args, expr):
"""Preprocess args, expr to replace arguments that do not map
to valid Python identifiers.
Returns string form of args, and updated expr.
"""
from sympy import Dummy, Function, flatten, Derivative, ordered, Basic
from sympy.matrices import DeferredVector
from sympy.core.symbol import _uniquely_named_symbol
from sympy.core.expr import Expr
# Args of type Dummy can cause name collisions with args
# of type Symbol. Force dummify of everything in this
# situation.
dummify = self._dummify or any(
isinstance(arg, Dummy) for arg in flatten(args))
argstrs = [None]*len(args)
for arg, i in reversed(list(ordered(zip(args, range(len(args)))))):
if iterable(arg):
s, expr = self._preprocess(arg, expr)
elif isinstance(arg, DeferredVector):
s = str(arg)
elif isinstance(arg, Basic) and arg.is_symbol:
s = self._argrepr(arg)
if dummify or not self._is_safe_ident(s):
dummy = Dummy()
if isinstance(expr, Expr):
dummy = _uniquely_named_symbol(dummy.name, expr)
s = self._argrepr(dummy)
expr = self._subexpr(expr, {arg: dummy})
elif dummify or isinstance(arg, (Function, Derivative)):
dummy = Dummy()
s = self._argrepr(dummy)
expr = self._subexpr(expr, {arg: dummy})
else:
s = str(arg)
argstrs[i] = s
return argstrs, expr
def _subexpr(self, expr, dummies_dict):
from sympy.matrices import DeferredVector
from sympy import sympify
expr = sympify(expr)
xreplace = getattr(expr, 'xreplace', None)
if xreplace is not None:
expr = xreplace(dummies_dict)
else:
if isinstance(expr, DeferredVector):
pass
elif isinstance(expr, dict):
k = [self._subexpr(sympify(a), dummies_dict) for a in expr.keys()]
v = [self._subexpr(sympify(a), dummies_dict) for a in expr.values()]
expr = dict(zip(k, v))
elif isinstance(expr, tuple):
expr = tuple(self._subexpr(sympify(a), dummies_dict) for a in expr)
elif isinstance(expr, list):
expr = [self._subexpr(sympify(a), dummies_dict) for a in expr]
return expr
def _print_funcargwrapping(self, args):
"""Generate argument wrapping code.
args is the argument list of the generated function (strings).
Return value is a list of lines of code that will be inserted at
the beginning of the function definition.
"""
return []
def _print_unpacking(self, unpackto, arg):
"""Generate argument unpacking code.
arg is the function argument to be unpacked (a string), and
unpackto is a list or nested lists of the variable names (strings) to
unpack to.
"""
def unpack_lhs(lvalues):
return '[{}]'.format(', '.join(
unpack_lhs(val) if iterable(val) else val for val in lvalues))
return ['{} = {}'.format(unpack_lhs(unpackto), arg)]
class _TensorflowEvaluatorPrinter(_EvaluatorPrinter):
def _print_unpacking(self, lvalues, rvalue):
"""Generate argument unpacking code.
This method is used when the input value is not interable,
but can be indexed (see issue #14655).
"""
from sympy import flatten
def flat_indexes(elems):
n = 0
for el in elems:
if iterable(el):
for ndeep in flat_indexes(el):
yield (n,) + ndeep
else:
yield (n,)
n += 1
indexed = ', '.join('{}[{}]'.format(rvalue, ']['.join(map(str, ind)))
for ind in flat_indexes(lvalues))
return ['[{}] = [{}]'.format(', '.join(flatten(lvalues)), indexed)]
def _imp_namespace(expr, namespace=None):
""" Return namespace dict with function implementations
We need to search for functions in anything that can be thrown at
us - that is - anything that could be passed as ``expr``. Examples
include sympy expressions, as well as tuples, lists and dicts that may
contain sympy expressions.
Parameters
----------
expr : object
Something passed to lambdify, that will generate valid code from
``str(expr)``.
namespace : None or mapping
Namespace to fill. None results in new empty dict
Returns
-------
namespace : dict
dict with keys of implemented function names within ``expr`` and
corresponding values being the numerical implementation of
function
Examples
========
>>> from sympy.abc import x
>>> from sympy.utilities.lambdify import implemented_function, _imp_namespace
>>> from sympy import Function
>>> f = implemented_function(Function('f'), lambda x: x+1)
>>> g = implemented_function(Function('g'), lambda x: x*10)
>>> namespace = _imp_namespace(f(g(x)))
>>> sorted(namespace.keys())
['f', 'g']
"""
# Delayed import to avoid circular imports
from sympy.core.function import FunctionClass
if namespace is None:
namespace = {}
# tuples, lists, dicts are valid expressions
if is_sequence(expr):
for arg in expr:
_imp_namespace(arg, namespace)
return namespace
elif isinstance(expr, dict):
for key, val in expr.items():
# functions can be in dictionary keys
_imp_namespace(key, namespace)
_imp_namespace(val, namespace)
return namespace
# sympy expressions may be Functions themselves
func = getattr(expr, 'func', None)
if isinstance(func, FunctionClass):
imp = getattr(func, '_imp_', None)
if imp is not None:
name = expr.func.__name__
if name in namespace and namespace[name] != imp:
raise ValueError('We found more than one '
'implementation with name '
'"%s"' % name)
namespace[name] = imp
# and / or they may take Functions as arguments
if hasattr(expr, 'args'):
for arg in expr.args:
_imp_namespace(arg, namespace)
return namespace
def implemented_function(symfunc, implementation):
""" Add numerical ``implementation`` to function ``symfunc``.
``symfunc`` can be an ``UndefinedFunction`` instance, or a name string.
In the latter case we create an ``UndefinedFunction`` instance with that
name.
Be aware that this is a quick workaround, not a general method to create
special symbolic functions. If you want to create a symbolic function to be
used by all the machinery of SymPy you should subclass the ``Function``
class.
Parameters
----------
symfunc : ``str`` or ``UndefinedFunction`` instance
If ``str``, then create new ``UndefinedFunction`` with this as
name. If ``symfunc`` is an Undefined function, create a new function
with the same name and the implemented function attached.
implementation : callable
numerical implementation to be called by ``evalf()`` or ``lambdify``
Returns
-------
afunc : sympy.FunctionClass instance
function with attached implementation
Examples
========
>>> from sympy.abc import x
>>> from sympy.utilities.lambdify import lambdify, implemented_function
>>> from sympy import Function
>>> f = implemented_function('f', lambda x: x+1)
>>> lam_f = lambdify(x, f(x))
>>> lam_f(4)
5
"""
# Delayed import to avoid circular imports
from sympy.core.function import UndefinedFunction
# if name, create function to hold implementation
kwargs = {}
if isinstance(symfunc, UndefinedFunction):
kwargs = symfunc._kwargs
symfunc = symfunc.__name__
if isinstance(symfunc, str):
# Keyword arguments to UndefinedFunction are added as attributes to
# the created class.
symfunc = UndefinedFunction(
symfunc, _imp_=staticmethod(implementation), **kwargs)
elif not isinstance(symfunc, UndefinedFunction):
raise ValueError(filldedent('''
symfunc should be either a string or
an UndefinedFunction instance.'''))
return symfunc
|
46b4fe71a5ef000ed5c8e24ddd0cc14a09fa266f30cedcde0fdfcde266067737 | from sympy.utilities.exceptions import SymPyDeprecationWarning
SymPyDeprecationWarning(
feature="Import sympy.utilities.benchmarking",
useinstead="Import from sympy.testing.benchmarking",
issue=18095,
deprecated_since_version="1.6").warn()
from sympy.testing.benchmarking import * # noqa:F401
|
2dcb4d75b920af0333aef3e4e06d16729801283856d581f90e0d7999f27f4062 | from __future__ import print_function, division
"""
Algorithms and classes to support enumerative combinatorics.
Currently just multiset partitions, but more could be added.
Terminology (following Knuth, algorithm 7.1.2.5M TAOCP)
*multiset* aaabbcccc has a *partition* aaabc | bccc
The submultisets, aaabc and bccc of the partition are called
*parts*, or sometimes *vectors*. (Knuth notes that multiset
partitions can be thought of as partitions of vectors of integers,
where the ith element of the vector gives the multiplicity of
element i.)
The values a, b and c are *components* of the multiset. These
correspond to elements of a set, but in a multiset can be present
with a multiplicity greater than 1.
The algorithm deserves some explanation.
Think of the part aaabc from the multiset above. If we impose an
ordering on the components of the multiset, we can represent a part
with a vector, in which the value of the first element of the vector
corresponds to the multiplicity of the first component in that
part. Thus, aaabc can be represented by the vector [3, 1, 1]. We
can also define an ordering on parts, based on the lexicographic
ordering of the vector (leftmost vector element, i.e., the element
with the smallest component number, is the most significant), so
that [3, 1, 1] > [3, 1, 0] and [3, 1, 1] > [2, 1, 4]. The ordering
on parts can be extended to an ordering on partitions: First, sort
the parts in each partition, left-to-right in decreasing order. Then
partition A is greater than partition B if A's leftmost/greatest
part is greater than B's leftmost part. If the leftmost parts are
equal, compare the second parts, and so on.
In this ordering, the greatest partition of a given multiset has only
one part. The least partition is the one in which the components
are spread out, one per part.
The enumeration algorithms in this file yield the partitions of the
argument multiset in decreasing order. The main data structure is a
stack of parts, corresponding to the current partition. An
important invariant is that the parts on the stack are themselves in
decreasing order. This data structure is decremented to find the
next smaller partition. Most often, decrementing the partition will
only involve adjustments to the smallest parts at the top of the
stack, much as adjacent integers *usually* differ only in their last
few digits.
Knuth's algorithm uses two main operations on parts:
Decrement - change the part so that it is smaller in the
(vector) lexicographic order, but reduced by the smallest amount possible.
For example, if the multiset has vector [5,
3, 1], and the bottom/greatest part is [4, 2, 1], this part would
decrement to [4, 2, 0], while [4, 0, 0] would decrement to [3, 3,
1]. A singleton part is never decremented -- [1, 0, 0] is not
decremented to [0, 3, 1]. Instead, the decrement operator needs
to fail for this case. In Knuth's pseudocode, the decrement
operator is step m5.
Spread unallocated multiplicity - Once a part has been decremented,
it cannot be the rightmost part in the partition. There is some
multiplicity that has not been allocated, and new parts must be
created above it in the stack to use up this multiplicity. To
maintain the invariant that the parts on the stack are in
decreasing order, these new parts must be less than or equal to
the decremented part.
For example, if the multiset is [5, 3, 1], and its most
significant part has just been decremented to [5, 3, 0], the
spread operation will add a new part so that the stack becomes
[[5, 3, 0], [0, 0, 1]]. If the most significant part (for the
same multiset) has been decremented to [2, 0, 0] the stack becomes
[[2, 0, 0], [2, 0, 0], [1, 3, 1]]. In the pseudocode, the spread
operation for one part is step m2. The complete spread operation
is a loop of steps m2 and m3.
In order to facilitate the spread operation, Knuth stores, for each
component of each part, not just the multiplicity of that component
in the part, but also the total multiplicity available for this
component in this part or any lesser part above it on the stack.
One added twist is that Knuth does not represent the part vectors as
arrays. Instead, he uses a sparse representation, in which a
component of a part is represented as a component number (c), plus
the multiplicity of the component in that part (v) as well as the
total multiplicity available for that component (u). This saves
time that would be spent skipping over zeros.
"""
class PartComponent(object):
"""Internal class used in support of the multiset partitions
enumerators and the associated visitor functions.
Represents one component of one part of the current partition.
A stack of these, plus an auxiliary frame array, f, represents a
partition of the multiset.
Knuth's pseudocode makes c, u, and v separate arrays.
"""
__slots__ = ('c', 'u', 'v')
def __init__(self):
self.c = 0 # Component number
self.u = 0 # The as yet unpartitioned amount in component c
# *before* it is allocated by this triple
self.v = 0 # Amount of c component in the current part
# (v<=u). An invariant of the representation is
# that the next higher triple for this component
# (if there is one) will have a value of u-v in
# its u attribute.
def __repr__(self):
"for debug/algorithm animation purposes"
return 'c:%d u:%d v:%d' % (self.c, self.u, self.v)
def __eq__(self, other):
"""Define value oriented equality, which is useful for testers"""
return (isinstance(other, self.__class__) and
self.c == other.c and
self.u == other.u and
self.v == other.v)
def __ne__(self, other):
"""Defined for consistency with __eq__"""
return not self == other
# This function tries to be a faithful implementation of algorithm
# 7.1.2.5M in Volume 4A, Combinatoral Algorithms, Part 1, of The Art
# of Computer Programming, by Donald Knuth. This includes using
# (mostly) the same variable names, etc. This makes for rather
# low-level Python.
# Changes from Knuth's pseudocode include
# - use PartComponent struct/object instead of 3 arrays
# - make the function a generator
# - map (with some difficulty) the GOTOs to Python control structures.
# - Knuth uses 1-based numbering for components, this code is 0-based
# - renamed variable l to lpart.
# - flag variable x takes on values True/False instead of 1/0
#
def multiset_partitions_taocp(multiplicities):
"""Enumerates partitions of a multiset.
Parameters
==========
multiplicities
list of integer multiplicities of the components of the multiset.
Yields
======
state
Internal data structure which encodes a particular partition.
This output is then usually processed by a visitor function
which combines the information from this data structure with
the components themselves to produce an actual partition.
Unless they wish to create their own visitor function, users will
have little need to look inside this data structure. But, for
reference, it is a 3-element list with components:
f
is a frame array, which is used to divide pstack into parts.
lpart
points to the base of the topmost part.
pstack
is an array of PartComponent objects.
The ``state`` output offers a peek into the internal data
structures of the enumeration function. The client should
treat this as read-only; any modification of the data
structure will cause unpredictable (and almost certainly
incorrect) results. Also, the components of ``state`` are
modified in place at each iteration. Hence, the visitor must
be called at each loop iteration. Accumulating the ``state``
instances and processing them later will not work.
Examples
========
>>> from sympy.utilities.enumerative import list_visitor
>>> from sympy.utilities.enumerative import multiset_partitions_taocp
>>> # variables components and multiplicities represent the multiset 'abb'
>>> components = 'ab'
>>> multiplicities = [1, 2]
>>> states = multiset_partitions_taocp(multiplicities)
>>> list(list_visitor(state, components) for state in states)
[[['a', 'b', 'b']],
[['a', 'b'], ['b']],
[['a'], ['b', 'b']],
[['a'], ['b'], ['b']]]
See Also
========
sympy.utilities.iterables.multiset_partitions: Takes a multiset
as input and directly yields multiset partitions. It
dispatches to a number of functions, including this one, for
implementation. Most users will find it more convenient to
use than multiset_partitions_taocp.
"""
# Important variables.
# m is the number of components, i.e., number of distinct elements
m = len(multiplicities)
# n is the cardinality, total number of elements whether or not distinct
n = sum(multiplicities)
# The main data structure, f segments pstack into parts. See
# list_visitor() for example code indicating how this internal
# state corresponds to a partition.
# Note: allocation of space for stack is conservative. Knuth's
# exercise 7.2.1.5.68 gives some indication of how to tighten this
# bound, but this is not implemented.
pstack = [PartComponent() for i in range(n * m + 1)]
f = [0] * (n + 1)
# Step M1 in Knuth (Initialize)
# Initial state - entire multiset in one part.
for j in range(m):
ps = pstack[j]
ps.c = j
ps.u = multiplicities[j]
ps.v = multiplicities[j]
# Other variables
f[0] = 0
a = 0
lpart = 0
f[1] = m
b = m # in general, current stack frame is from a to b - 1
while True:
while True:
# Step M2 (Subtract v from u)
j = a
k = b
x = False
while j < b:
pstack[k].u = pstack[j].u - pstack[j].v
if pstack[k].u == 0:
x = True
elif not x:
pstack[k].c = pstack[j].c
pstack[k].v = min(pstack[j].v, pstack[k].u)
x = pstack[k].u < pstack[j].v
k = k + 1
else: # x is True
pstack[k].c = pstack[j].c
pstack[k].v = pstack[k].u
k = k + 1
j = j + 1
# Note: x is True iff v has changed
# Step M3 (Push if nonzero.)
if k > b:
a = b
b = k
lpart = lpart + 1
f[lpart + 1] = b
# Return to M2
else:
break # Continue to M4
# M4 Visit a partition
state = [f, lpart, pstack]
yield state
# M5 (Decrease v)
while True:
j = b-1
while (pstack[j].v == 0):
j = j - 1
if j == a and pstack[j].v == 1:
# M6 (Backtrack)
if lpart == 0:
return
lpart = lpart - 1
b = a
a = f[lpart]
# Return to M5
else:
pstack[j].v = pstack[j].v - 1
for k in range(j + 1, b):
pstack[k].v = pstack[k].u
break # GOTO M2
# --------------- Visitor functions for multiset partitions ---------------
# A visitor takes the partition state generated by
# multiset_partitions_taocp or other enumerator, and produces useful
# output (such as the actual partition).
def factoring_visitor(state, primes):
"""Use with multiset_partitions_taocp to enumerate the ways a
number can be expressed as a product of factors. For this usage,
the exponents of the prime factors of a number are arguments to
the partition enumerator, while the corresponding prime factors
are input here.
Examples
========
To enumerate the factorings of a number we can think of the elements of the
partition as being the prime factors and the multiplicities as being their
exponents.
>>> from sympy.utilities.enumerative import factoring_visitor
>>> from sympy.utilities.enumerative import multiset_partitions_taocp
>>> from sympy import factorint
>>> primes, multiplicities = zip(*factorint(24).items())
>>> primes
(2, 3)
>>> multiplicities
(3, 1)
>>> states = multiset_partitions_taocp(multiplicities)
>>> list(factoring_visitor(state, primes) for state in states)
[[24], [8, 3], [12, 2], [4, 6], [4, 2, 3], [6, 2, 2], [2, 2, 2, 3]]
"""
f, lpart, pstack = state
factoring = []
for i in range(lpart + 1):
factor = 1
for ps in pstack[f[i]: f[i + 1]]:
if ps.v > 0:
factor *= primes[ps.c] ** ps.v
factoring.append(factor)
return factoring
def list_visitor(state, components):
"""Return a list of lists to represent the partition.
Examples
========
>>> from sympy.utilities.enumerative import list_visitor
>>> from sympy.utilities.enumerative import multiset_partitions_taocp
>>> states = multiset_partitions_taocp([1, 2, 1])
>>> s = next(states)
>>> list_visitor(s, 'abc') # for multiset 'a b b c'
[['a', 'b', 'b', 'c']]
>>> s = next(states)
>>> list_visitor(s, [1, 2, 3]) # for multiset '1 2 2 3
[[1, 2, 2], [3]]
"""
f, lpart, pstack = state
partition = []
for i in range(lpart+1):
part = []
for ps in pstack[f[i]:f[i+1]]:
if ps.v > 0:
part.extend([components[ps.c]] * ps.v)
partition.append(part)
return partition
class MultisetPartitionTraverser():
"""
Has methods to ``enumerate`` and ``count`` the partitions of a multiset.
This implements a refactored and extended version of Knuth's algorithm
7.1.2.5M [AOCP]_."
The enumeration methods of this class are generators and return
data structures which can be interpreted by the same visitor
functions used for the output of ``multiset_partitions_taocp``.
Examples
========
>>> from sympy.utilities.enumerative import MultisetPartitionTraverser
>>> m = MultisetPartitionTraverser()
>>> m.count_partitions([4,4,4,2])
127750
>>> m.count_partitions([3,3,3])
686
See Also
========
multiset_partitions_taocp
sympy.utilities.iterables.multiset_partitions
References
==========
.. [AOCP] Algorithm 7.1.2.5M in Volume 4A, Combinatoral Algorithms,
Part 1, of The Art of Computer Programming, by Donald Knuth.
.. [Factorisatio] On a Problem of Oppenheim concerning
"Factorisatio Numerorum" E. R. Canfield, Paul Erdos, Carl
Pomerance, JOURNAL OF NUMBER THEORY, Vol. 17, No. 1. August
1983. See section 7 for a description of an algorithm
similar to Knuth's.
.. [Yorgey] Generating Multiset Partitions, Brent Yorgey, The
Monad.Reader, Issue 8, September 2007.
"""
def __init__(self):
self.debug = False
# TRACING variables. These are useful for gathering
# statistics on the algorithm itself, but have no particular
# benefit to a user of the code.
self.k1 = 0
self.k2 = 0
self.p1 = 0
def db_trace(self, msg):
"""Useful for understanding/debugging the algorithms. Not
generally activated in end-user code."""
if self.debug:
# XXX: animation_visitor is undefined... Clearly this does not
# work and was not tested. Previous code in comments below.
raise RuntimeError
#letters = 'abcdefghijklmnopqrstuvwxyz'
#state = [self.f, self.lpart, self.pstack]
#print("DBG:", msg,
# ["".join(part) for part in list_visitor(state, letters)],
# animation_visitor(state))
#
# Helper methods for enumeration
#
def _initialize_enumeration(self, multiplicities):
"""Allocates and initializes the partition stack.
This is called from the enumeration/counting routines, so
there is no need to call it separately."""
num_components = len(multiplicities)
# cardinality is the total number of elements, whether or not distinct
cardinality = sum(multiplicities)
# pstack is the partition stack, which is segmented by
# f into parts.
self.pstack = [PartComponent() for i in
range(num_components * cardinality + 1)]
self.f = [0] * (cardinality + 1)
# Initial state - entire multiset in one part.
for j in range(num_components):
ps = self.pstack[j]
ps.c = j
ps.u = multiplicities[j]
ps.v = multiplicities[j]
self.f[0] = 0
self.f[1] = num_components
self.lpart = 0
# The decrement_part() method corresponds to step M5 in Knuth's
# algorithm. This is the base version for enum_all(). Modified
# versions of this method are needed if we want to restrict
# sizes of the partitions produced.
def decrement_part(self, part):
"""Decrements part (a subrange of pstack), if possible, returning
True iff the part was successfully decremented.
If you think of the v values in the part as a multi-digit
integer (least significant digit on the right) this is
basically decrementing that integer, but with the extra
constraint that the leftmost digit cannot be decremented to 0.
Parameters
==========
part
The part, represented as a list of PartComponent objects,
which is to be decremented.
"""
plen = len(part)
for j in range(plen - 1, -1, -1):
if j == 0 and part[j].v > 1 or j > 0 and part[j].v > 0:
# found val to decrement
part[j].v -= 1
# Reset trailing parts back to maximum
for k in range(j + 1, plen):
part[k].v = part[k].u
return True
return False
# Version to allow number of parts to be bounded from above.
# Corresponds to (a modified) step M5.
def decrement_part_small(self, part, ub):
"""Decrements part (a subrange of pstack), if possible, returning
True iff the part was successfully decremented.
Parameters
==========
part
part to be decremented (topmost part on the stack)
ub
the maximum number of parts allowed in a partition
returned by the calling traversal.
Notes
=====
The goal of this modification of the ordinary decrement method
is to fail (meaning that the subtree rooted at this part is to
be skipped) when it can be proved that this part can only have
child partitions which are larger than allowed by ``ub``. If a
decision is made to fail, it must be accurate, otherwise the
enumeration will miss some partitions. But, it is OK not to
capture all the possible failures -- if a part is passed that
shouldn't be, the resulting too-large partitions are filtered
by the enumeration one level up. However, as is usual in
constrained enumerations, failing early is advantageous.
The tests used by this method catch the most common cases,
although this implementation is by no means the last word on
this problem. The tests include:
1) ``lpart`` must be less than ``ub`` by at least 2. This is because
once a part has been decremented, the partition
will gain at least one child in the spread step.
2) If the leading component of the part is about to be
decremented, check for how many parts will be added in
order to use up the unallocated multiplicity in that
leading component, and fail if this number is greater than
allowed by ``ub``. (See code for the exact expression.) This
test is given in the answer to Knuth's problem 7.2.1.5.69.
3) If there is *exactly* enough room to expand the leading
component by the above test, check the next component (if
it exists) once decrementing has finished. If this has
``v == 0``, this next component will push the expansion over the
limit by 1, so fail.
"""
if self.lpart >= ub - 1:
self.p1 += 1 # increment to keep track of usefulness of tests
return False
plen = len(part)
for j in range(plen - 1, -1, -1):
# Knuth's mod, (answer to problem 7.2.1.5.69)
if j == 0 and (part[0].v - 1)*(ub - self.lpart) < part[0].u:
self.k1 += 1
return False
if j == 0 and part[j].v > 1 or j > 0 and part[j].v > 0:
# found val to decrement
part[j].v -= 1
# Reset trailing parts back to maximum
for k in range(j + 1, plen):
part[k].v = part[k].u
# Have now decremented part, but are we doomed to
# failure when it is expanded? Check one oddball case
# that turns out to be surprisingly common - exactly
# enough room to expand the leading component, but no
# room for the second component, which has v=0.
if (plen > 1 and part[1].v == 0 and
(part[0].u - part[0].v) ==
((ub - self.lpart - 1) * part[0].v)):
self.k2 += 1
self.db_trace("Decrement fails test 3")
return False
return True
return False
def decrement_part_large(self, part, amt, lb):
"""Decrements part, while respecting size constraint.
A part can have no children which are of sufficient size (as
indicated by ``lb``) unless that part has sufficient
unallocated multiplicity. When enforcing the size constraint,
this method will decrement the part (if necessary) by an
amount needed to ensure sufficient unallocated multiplicity.
Returns True iff the part was successfully decremented.
Parameters
==========
part
part to be decremented (topmost part on the stack)
amt
Can only take values 0 or 1. A value of 1 means that the
part must be decremented, and then the size constraint is
enforced. A value of 0 means just to enforce the ``lb``
size constraint.
lb
The partitions produced by the calling enumeration must
have more parts than this value.
"""
if amt == 1:
# In this case we always need to increment, *before*
# enforcing the "sufficient unallocated multiplicity"
# constraint. Easiest for this is just to call the
# regular decrement method.
if not self.decrement_part(part):
return False
# Next, perform any needed additional decrementing to respect
# "sufficient unallocated multiplicity" (or fail if this is
# not possible).
min_unalloc = lb - self.lpart
if min_unalloc <= 0:
return True
total_mult = sum(pc.u for pc in part)
total_alloc = sum(pc.v for pc in part)
if total_mult <= min_unalloc:
return False
deficit = min_unalloc - (total_mult - total_alloc)
if deficit <= 0:
return True
for i in range(len(part) - 1, -1, -1):
if i == 0:
if part[0].v > deficit:
part[0].v -= deficit
return True
else:
return False # This shouldn't happen, due to above check
else:
if part[i].v >= deficit:
part[i].v -= deficit
return True
else:
deficit -= part[i].v
part[i].v = 0
def decrement_part_range(self, part, lb, ub):
"""Decrements part (a subrange of pstack), if possible, returning
True iff the part was successfully decremented.
Parameters
==========
part
part to be decremented (topmost part on the stack)
ub
the maximum number of parts allowed in a partition
returned by the calling traversal.
lb
The partitions produced by the calling enumeration must
have more parts than this value.
Notes
=====
Combines the constraints of _small and _large decrement
methods. If returns success, part has been decremented at
least once, but perhaps by quite a bit more if needed to meet
the lb constraint.
"""
# Constraint in the range case is just enforcing both the
# constraints from _small and _large cases. Note the 0 as the
# second argument to the _large call -- this is the signal to
# decrement only as needed to for constraint enforcement. The
# short circuiting and left-to-right order of the 'and'
# operator is important for this to work correctly.
return self.decrement_part_small(part, ub) and \
self.decrement_part_large(part, 0, lb)
def spread_part_multiplicity(self):
"""Returns True if a new part has been created, and
adjusts pstack, f and lpart as needed.
Notes
=====
Spreads unallocated multiplicity from the current top part
into a new part created above the current on the stack. This
new part is constrained to be less than or equal to the old in
terms of the part ordering.
This call does nothing (and returns False) if the current top
part has no unallocated multiplicity.
"""
j = self.f[self.lpart] # base of current top part
k = self.f[self.lpart + 1] # ub of current; potential base of next
base = k # save for later comparison
changed = False # Set to true when the new part (so far) is
# strictly less than (as opposed to less than
# or equal) to the old.
for j in range(self.f[self.lpart], self.f[self.lpart + 1]):
self.pstack[k].u = self.pstack[j].u - self.pstack[j].v
if self.pstack[k].u == 0:
changed = True
else:
self.pstack[k].c = self.pstack[j].c
if changed: # Put all available multiplicity in this part
self.pstack[k].v = self.pstack[k].u
else: # Still maintaining ordering constraint
if self.pstack[k].u < self.pstack[j].v:
self.pstack[k].v = self.pstack[k].u
changed = True
else:
self.pstack[k].v = self.pstack[j].v
k = k + 1
if k > base:
# Adjust for the new part on stack
self.lpart = self.lpart + 1
self.f[self.lpart + 1] = k
return True
return False
def top_part(self):
"""Return current top part on the stack, as a slice of pstack.
"""
return self.pstack[self.f[self.lpart]:self.f[self.lpart + 1]]
# Same interface and functionality as multiset_partitions_taocp(),
# but some might find this refactored version easier to follow.
def enum_all(self, multiplicities):
"""Enumerate the partitions of a multiset.
Examples
========
>>> from sympy.utilities.enumerative import list_visitor
>>> from sympy.utilities.enumerative import MultisetPartitionTraverser
>>> m = MultisetPartitionTraverser()
>>> states = m.enum_all([2,2])
>>> list(list_visitor(state, 'ab') for state in states)
[[['a', 'a', 'b', 'b']],
[['a', 'a', 'b'], ['b']],
[['a', 'a'], ['b', 'b']],
[['a', 'a'], ['b'], ['b']],
[['a', 'b', 'b'], ['a']],
[['a', 'b'], ['a', 'b']],
[['a', 'b'], ['a'], ['b']],
[['a'], ['a'], ['b', 'b']],
[['a'], ['a'], ['b'], ['b']]]
See Also
========
multiset_partitions_taocp():
which provides the same result as this method, but is
about twice as fast. Hence, enum_all is primarily useful
for testing. Also see the function for a discussion of
states and visitors.
"""
self._initialize_enumeration(multiplicities)
while True:
while self.spread_part_multiplicity():
pass
# M4 Visit a partition
state = [self.f, self.lpart, self.pstack]
yield state
# M5 (Decrease v)
while not self.decrement_part(self.top_part()):
# M6 (Backtrack)
if self.lpart == 0:
return
self.lpart -= 1
def enum_small(self, multiplicities, ub):
"""Enumerate multiset partitions with no more than ``ub`` parts.
Equivalent to enum_range(multiplicities, 0, ub)
Parameters
==========
multiplicities
list of multiplicities of the components of the multiset.
ub
Maximum number of parts
Examples
========
>>> from sympy.utilities.enumerative import list_visitor
>>> from sympy.utilities.enumerative import MultisetPartitionTraverser
>>> m = MultisetPartitionTraverser()
>>> states = m.enum_small([2,2], 2)
>>> list(list_visitor(state, 'ab') for state in states)
[[['a', 'a', 'b', 'b']],
[['a', 'a', 'b'], ['b']],
[['a', 'a'], ['b', 'b']],
[['a', 'b', 'b'], ['a']],
[['a', 'b'], ['a', 'b']]]
The implementation is based, in part, on the answer given to
exercise 69, in Knuth [AOCP]_.
See Also
========
enum_all, enum_large, enum_range
"""
# Keep track of iterations which do not yield a partition.
# Clearly, we would like to keep this number small.
self.discarded = 0
if ub <= 0:
return
self._initialize_enumeration(multiplicities)
while True:
good_partition = True
while self.spread_part_multiplicity():
self.db_trace("spread 1")
if self.lpart >= ub:
self.discarded += 1
good_partition = False
self.db_trace(" Discarding")
self.lpart = ub - 2
break
# M4 Visit a partition
if good_partition:
state = [self.f, self.lpart, self.pstack]
yield state
# M5 (Decrease v)
while not self.decrement_part_small(self.top_part(), ub):
self.db_trace("Failed decrement, going to backtrack")
# M6 (Backtrack)
if self.lpart == 0:
return
self.lpart -= 1
self.db_trace("Backtracked to")
self.db_trace("decrement ok, about to expand")
def enum_large(self, multiplicities, lb):
"""Enumerate the partitions of a multiset with lb < num(parts)
Equivalent to enum_range(multiplicities, lb, sum(multiplicities))
Parameters
==========
multiplicities
list of multiplicities of the components of the multiset.
lb
Number of parts in the partition must be greater than
this lower bound.
Examples
========
>>> from sympy.utilities.enumerative import list_visitor
>>> from sympy.utilities.enumerative import MultisetPartitionTraverser
>>> m = MultisetPartitionTraverser()
>>> states = m.enum_large([2,2], 2)
>>> list(list_visitor(state, 'ab') for state in states)
[[['a', 'a'], ['b'], ['b']],
[['a', 'b'], ['a'], ['b']],
[['a'], ['a'], ['b', 'b']],
[['a'], ['a'], ['b'], ['b']]]
See Also
========
enum_all, enum_small, enum_range
"""
self.discarded = 0
if lb >= sum(multiplicities):
return
self._initialize_enumeration(multiplicities)
self.decrement_part_large(self.top_part(), 0, lb)
while True:
good_partition = True
while self.spread_part_multiplicity():
if not self.decrement_part_large(self.top_part(), 0, lb):
# Failure here should be rare/impossible
self.discarded += 1
good_partition = False
break
# M4 Visit a partition
if good_partition:
state = [self.f, self.lpart, self.pstack]
yield state
# M5 (Decrease v)
while not self.decrement_part_large(self.top_part(), 1, lb):
# M6 (Backtrack)
if self.lpart == 0:
return
self.lpart -= 1
def enum_range(self, multiplicities, lb, ub):
"""Enumerate the partitions of a multiset with
``lb < num(parts) <= ub``.
In particular, if partitions with exactly ``k`` parts are
desired, call with ``(multiplicities, k - 1, k)``. This
method generalizes enum_all, enum_small, and enum_large.
Examples
========
>>> from sympy.utilities.enumerative import list_visitor
>>> from sympy.utilities.enumerative import MultisetPartitionTraverser
>>> m = MultisetPartitionTraverser()
>>> states = m.enum_range([2,2], 1, 2)
>>> list(list_visitor(state, 'ab') for state in states)
[[['a', 'a', 'b'], ['b']],
[['a', 'a'], ['b', 'b']],
[['a', 'b', 'b'], ['a']],
[['a', 'b'], ['a', 'b']]]
"""
# combine the constraints of the _large and _small
# enumerations.
self.discarded = 0
if ub <= 0 or lb >= sum(multiplicities):
return
self._initialize_enumeration(multiplicities)
self.decrement_part_large(self.top_part(), 0, lb)
while True:
good_partition = True
while self.spread_part_multiplicity():
self.db_trace("spread 1")
if not self.decrement_part_large(self.top_part(), 0, lb):
# Failure here - possible in range case?
self.db_trace(" Discarding (large cons)")
self.discarded += 1
good_partition = False
break
elif self.lpart >= ub:
self.discarded += 1
good_partition = False
self.db_trace(" Discarding small cons")
self.lpart = ub - 2
break
# M4 Visit a partition
if good_partition:
state = [self.f, self.lpart, self.pstack]
yield state
# M5 (Decrease v)
while not self.decrement_part_range(self.top_part(), lb, ub):
self.db_trace("Failed decrement, going to backtrack")
# M6 (Backtrack)
if self.lpart == 0:
return
self.lpart -= 1
self.db_trace("Backtracked to")
self.db_trace("decrement ok, about to expand")
def count_partitions_slow(self, multiplicities):
"""Returns the number of partitions of a multiset whose elements
have the multiplicities given in ``multiplicities``.
Primarily for comparison purposes. It follows the same path as
enumerate, and counts, rather than generates, the partitions.
See Also
========
count_partitions
Has the same calling interface, but is much faster.
"""
# number of partitions so far in the enumeration
self.pcount = 0
self._initialize_enumeration(multiplicities)
while True:
while self.spread_part_multiplicity():
pass
# M4 Visit (count) a partition
self.pcount += 1
# M5 (Decrease v)
while not self.decrement_part(self.top_part()):
# M6 (Backtrack)
if self.lpart == 0:
return self.pcount
self.lpart -= 1
def count_partitions(self, multiplicities):
"""Returns the number of partitions of a multiset whose components
have the multiplicities given in ``multiplicities``.
For larger counts, this method is much faster than calling one
of the enumerators and counting the result. Uses dynamic
programming to cut down on the number of nodes actually
explored. The dictionary used in order to accelerate the
counting process is stored in the ``MultisetPartitionTraverser``
object and persists across calls. If the user does not
expect to call ``count_partitions`` for any additional
multisets, the object should be cleared to save memory. On
the other hand, the cache built up from one count run can
significantly speed up subsequent calls to ``count_partitions``,
so it may be advantageous not to clear the object.
Examples
========
>>> from sympy.utilities.enumerative import MultisetPartitionTraverser
>>> m = MultisetPartitionTraverser()
>>> m.count_partitions([9,8,2])
288716
>>> m.count_partitions([2,2])
9
>>> del m
Notes
=====
If one looks at the workings of Knuth's algorithm M [AOCP]_, it
can be viewed as a traversal of a binary tree of parts. A
part has (up to) two children, the left child resulting from
the spread operation, and the right child from the decrement
operation. The ordinary enumeration of multiset partitions is
an in-order traversal of this tree, and with the partitions
corresponding to paths from the root to the leaves. The
mapping from paths to partitions is a little complicated,
since the partition would contain only those parts which are
leaves or the parents of a spread link, not those which are
parents of a decrement link.
For counting purposes, it is sufficient to count leaves, and
this can be done with a recursive in-order traversal. The
number of leaves of a subtree rooted at a particular part is a
function only of that part itself, so memoizing has the
potential to speed up the counting dramatically.
This method follows a computational approach which is similar
to the hypothetical memoized recursive function, but with two
differences:
1) This method is iterative, borrowing its structure from the
other enumerations and maintaining an explicit stack of
parts which are in the process of being counted. (There
may be multisets which can be counted reasonably quickly by
this implementation, but which would overflow the default
Python recursion limit with a recursive implementation.)
2) Instead of using the part data structure directly, a more
compact key is constructed. This saves space, but more
importantly coalesces some parts which would remain
separate with physical keys.
Unlike the enumeration functions, there is currently no _range
version of count_partitions. If someone wants to stretch
their brain, it should be possible to construct one by
memoizing with a histogram of counts rather than a single
count, and combining the histograms.
"""
# number of partitions so far in the enumeration
self.pcount = 0
# dp_stack is list of lists of (part_key, start_count) pairs
self.dp_stack = []
# dp_map is map part_key-> count, where count represents the
# number of multiset which are descendants of a part with this
# key, **or any of its decrements**
# Thus, when we find a part in the map, we add its count
# value to the running total, cut off the enumeration, and
# backtrack
if not hasattr(self, 'dp_map'):
self.dp_map = {}
self._initialize_enumeration(multiplicities)
pkey = part_key(self.top_part())
self.dp_stack.append([(pkey, 0), ])
while True:
while self.spread_part_multiplicity():
pkey = part_key(self.top_part())
if pkey in self.dp_map:
# Already have a cached value for the count of the
# subtree rooted at this part. Add it to the
# running counter, and break out of the spread
# loop. The -1 below is to compensate for the
# leaf that this code path would otherwise find,
# and which gets incremented for below.
self.pcount += (self.dp_map[pkey] - 1)
self.lpart -= 1
break
else:
self.dp_stack.append([(pkey, self.pcount), ])
# M4 count a leaf partition
self.pcount += 1
# M5 (Decrease v)
while not self.decrement_part(self.top_part()):
# M6 (Backtrack)
for key, oldcount in self.dp_stack.pop():
self.dp_map[key] = self.pcount - oldcount
if self.lpart == 0:
return self.pcount
self.lpart -= 1
# At this point have successfully decremented the part on
# the stack and it does not appear in the cache. It needs
# to be added to the list at the top of dp_stack
pkey = part_key(self.top_part())
self.dp_stack[-1].append((pkey, self.pcount),)
def part_key(part):
"""Helper for MultisetPartitionTraverser.count_partitions that
creates a key for ``part``, that only includes information which can
affect the count for that part. (Any irrelevant information just
reduces the effectiveness of dynamic programming.)
Notes
=====
This member function is a candidate for future exploration. There
are likely symmetries that can be exploited to coalesce some
``part_key`` values, and thereby save space and improve
performance.
"""
# The component number is irrelevant for counting partitions, so
# leave it out of the memo key.
rval = []
for ps in part:
rval.append(ps.u)
rval.append(ps.v)
return tuple(rval)
|
6a7f7203716ff22b6ffd7da359b52156928d1e2468ada5c744aa2e873f51f4de | """Useful utility decorators. """
from __future__ import print_function, division
import sys
import types
import inspect
from sympy.core.decorators import wraps
from sympy.core.compatibility import get_function_globals, get_function_name, iterable
from sympy.testing.runtests import DependencyError, SymPyDocTests, PyTestReporter
def threaded_factory(func, use_add):
"""A factory for ``threaded`` decorators. """
from sympy.core import sympify
from sympy.matrices import MatrixBase
@wraps(func)
def threaded_func(expr, *args, **kwargs):
if isinstance(expr, MatrixBase):
return expr.applyfunc(lambda f: func(f, *args, **kwargs))
elif iterable(expr):
try:
return expr.__class__([func(f, *args, **kwargs) for f in expr])
except TypeError:
return expr
else:
expr = sympify(expr)
if use_add and expr.is_Add:
return expr.__class__(*[ func(f, *args, **kwargs) for f in expr.args ])
elif expr.is_Relational:
return expr.__class__(func(expr.lhs, *args, **kwargs),
func(expr.rhs, *args, **kwargs))
else:
return func(expr, *args, **kwargs)
return threaded_func
def threaded(func):
"""Apply ``func`` to sub--elements of an object, including :class:`~.Add`.
This decorator is intended to make it uniformly possible to apply a
function to all elements of composite objects, e.g. matrices, lists, tuples
and other iterable containers, or just expressions.
This version of :func:`threaded` decorator allows threading over
elements of :class:`~.Add` class. If this behavior is not desirable
use :func:`xthreaded` decorator.
Functions using this decorator must have the following signature::
@threaded
def function(expr, *args, **kwargs):
"""
return threaded_factory(func, True)
def xthreaded(func):
"""Apply ``func`` to sub--elements of an object, excluding :class:`~.Add`.
This decorator is intended to make it uniformly possible to apply a
function to all elements of composite objects, e.g. matrices, lists, tuples
and other iterable containers, or just expressions.
This version of :func:`threaded` decorator disallows threading over
elements of :class:`~.Add` class. If this behavior is not desirable
use :func:`threaded` decorator.
Functions using this decorator must have the following signature::
@xthreaded
def function(expr, *args, **kwargs):
"""
return threaded_factory(func, False)
def conserve_mpmath_dps(func):
"""After the function finishes, resets the value of mpmath.mp.dps to
the value it had before the function was run."""
import functools
import mpmath
def func_wrapper(*args, **kwargs):
dps = mpmath.mp.dps
try:
return func(*args, **kwargs)
finally:
mpmath.mp.dps = dps
func_wrapper = functools.update_wrapper(func_wrapper, func)
return func_wrapper
class no_attrs_in_subclass(object):
"""Don't 'inherit' certain attributes from a base class
>>> from sympy.utilities.decorator import no_attrs_in_subclass
>>> class A(object):
... x = 'test'
>>> A.x = no_attrs_in_subclass(A, A.x)
>>> class B(A):
... pass
>>> hasattr(A, 'x')
True
>>> hasattr(B, 'x')
False
"""
def __init__(self, cls, f):
self.cls = cls
self.f = f
def __get__(self, instance, owner=None):
if owner == self.cls:
if hasattr(self.f, '__get__'):
return self.f.__get__(instance, owner)
return self.f
raise AttributeError
def doctest_depends_on(exe=None, modules=None, disable_viewers=None, python_version=None):
"""
Adds metadata about the dependencies which need to be met for doctesting
the docstrings of the decorated objects.
exe should be a list of executables
modules should be a list of modules
disable_viewers should be a list of viewers for preview() to disable
python_version should be the minimum Python version required, as a tuple
(like (3, 0))
"""
dependencies = {}
if exe is not None:
dependencies['executables'] = exe
if modules is not None:
dependencies['modules'] = modules
if disable_viewers is not None:
dependencies['disable_viewers'] = disable_viewers
if python_version is not None:
dependencies['python_version'] = python_version
def skiptests():
r = PyTestReporter()
t = SymPyDocTests(r, None)
try:
t._check_dependencies(**dependencies)
except DependencyError:
return True # Skip doctests
else:
return False # Run doctests
def depends_on_deco(fn):
fn._doctest_depends_on = dependencies
fn.__doctest_skip__ = skiptests
if inspect.isclass(fn):
fn._doctest_depdends_on = no_attrs_in_subclass(
fn, fn._doctest_depends_on)
fn.__doctest_skip__ = no_attrs_in_subclass(
fn, fn.__doctest_skip__)
return fn
return depends_on_deco
def public(obj):
"""
Append ``obj``'s name to global ``__all__`` variable (call site).
By using this decorator on functions or classes you achieve the same goal
as by filling ``__all__`` variables manually, you just don't have to repeat
yourself (object's name). You also know if object is public at definition
site, not at some random location (where ``__all__`` was set).
Note that in multiple decorator setup (in almost all cases) ``@public``
decorator must be applied before any other decorators, because it relies
on the pointer to object's global namespace. If you apply other decorators
first, ``@public`` may end up modifying the wrong namespace.
Examples
========
>>> from sympy.utilities.decorator import public
>>> __all__
Traceback (most recent call last):
...
NameError: name '__all__' is not defined
>>> @public
... def some_function():
... pass
>>> __all__
['some_function']
"""
if isinstance(obj, types.FunctionType):
ns = get_function_globals(obj)
name = get_function_name(obj)
elif isinstance(obj, (type(type), type)):
ns = sys.modules[obj.__module__].__dict__
name = obj.__name__
else:
raise TypeError("expected a function or a class, got %s" % obj)
if "__all__" not in ns:
ns["__all__"] = [name]
else:
ns["__all__"].append(name)
return obj
def memoize_property(propfunc):
"""Property decorator that caches the value of potentially expensive
`propfunc` after the first evaluation. The cached value is stored in
the corresponding property name with an attached underscore."""
attrname = '_' + propfunc.__name__
sentinel = object()
@wraps(propfunc)
def accessor(self):
val = getattr(self, attrname, sentinel)
if val is sentinel:
val = propfunc(self)
setattr(self, attrname, val)
return val
return property(accessor)
|
a23654a4fbccfbc64729a4f9e5b06c57f1c3201b06b05e1c5fa7cd9e7e188014 | from sympy.utilities.exceptions import SymPyDeprecationWarning
SymPyDeprecationWarning(
feature="Import sympy.utilities.quality_unicode",
useinstead="Import from sympy.testing.quality_unicode",
issue=18095,
deprecated_since_version="1.6").warn()
from sympy.testing.quality_unicode import * # noqa:F401
|
1fd1c1a4dea6603879cdcf7ea0855ed6d15a83150c296a60db2b6598172aa683 | from sympy.external import import_module
from sympy.functions import (log, sin, cos, tan, cot, csc, sec, erf, gamma, uppergamma)
from sympy.functions.elementary.hyperbolic import acosh, asinh, atanh, acoth, acsch, asech, cosh, sinh, tanh, coth, sech, csch
from sympy.functions.elementary.trigonometric import atan, acsc, asin, acot, acos, asec
from sympy.functions.special.error_functions import fresnelc, fresnels, erfc, erfi, Ei
from sympy import (Basic, Mul, Add, Pow, Integral, exp)
matchpy = import_module("matchpy")
if matchpy:
from matchpy import Operation, CommutativeOperation, AssociativeOperation, OneIdentityOperation
from matchpy.expressions.functions import op_iter, create_operation_expression, op_len
Operation.register(Integral)
Operation.register(Pow)
OneIdentityOperation.register(Pow)
Operation.register(Add)
OneIdentityOperation.register(Add)
CommutativeOperation.register(Add)
AssociativeOperation.register(Add)
Operation.register(Mul)
OneIdentityOperation.register(Mul)
CommutativeOperation.register(Mul)
AssociativeOperation.register(Mul)
Operation.register(exp)
Operation.register(log)
Operation.register(gamma)
Operation.register(uppergamma)
Operation.register(fresnels)
Operation.register(fresnelc)
Operation.register(erf)
Operation.register(Ei)
Operation.register(erfc)
Operation.register(erfi)
Operation.register(sin)
Operation.register(cos)
Operation.register(tan)
Operation.register(cot)
Operation.register(csc)
Operation.register(sec)
Operation.register(sinh)
Operation.register(cosh)
Operation.register(tanh)
Operation.register(coth)
Operation.register(csch)
Operation.register(sech)
Operation.register(asin)
Operation.register(acos)
Operation.register(atan)
Operation.register(acot)
Operation.register(acsc)
Operation.register(asec)
Operation.register(asinh)
Operation.register(acosh)
Operation.register(atanh)
Operation.register(acoth)
Operation.register(acsch)
Operation.register(asech)
@op_iter.register(Integral) # type: ignore
def _(operation):
return iter((operation._args[0],) + operation._args[1])
@op_iter.register(Basic) # type: ignore
def _(operation):
return iter(operation._args)
@op_len.register(Integral) # type: ignore
def _(operation):
return 1 + len(operation._args[1])
@op_len.register(Basic) # type: ignore
def _(operation):
return len(operation._args)
@create_operation_expression.register(Basic)
def sympy_op_factory(old_operation, new_operands, variable_name=True):
return type(old_operation)(*new_operands)
|
09495fc42c38c6f6cacf5d859a31a13a03a0887d258b096be0a2f1ca8ef03445 | from __future__ import print_function, division
from sympy.core.decorators import wraps
def recurrence_memo(initial):
"""
Memo decorator for sequences defined by recurrence
See usage examples e.g. in the specfun/combinatorial module
"""
cache = initial
def decorator(f):
@wraps(f)
def g(n):
L = len(cache)
if n <= L - 1:
return cache[n]
for i in range(L, n + 1):
cache.append(f(i, cache))
return cache[-1]
return g
return decorator
def assoc_recurrence_memo(base_seq):
"""
Memo decorator for associated sequences defined by recurrence starting from base
base_seq(n) -- callable to get base sequence elements
XXX works only for Pn0 = base_seq(0) cases
XXX works only for m <= n cases
"""
cache = []
def decorator(f):
@wraps(f)
def g(n, m):
L = len(cache)
if n < L:
return cache[n][m]
for i in range(L, n + 1):
# get base sequence
F_i0 = base_seq(i)
F_i_cache = [F_i0]
cache.append(F_i_cache)
# XXX only works for m <= n cases
# generate assoc sequence
for j in range(1, i + 1):
F_ij = f(i, j, cache)
F_i_cache.append(F_ij)
return cache[n][m]
return g
return decorator
|
3b924e2b385a27ee7fbbf480558c52af7a3e314372cd257ac2597a6a2ea88e2b | """Simple tools for timing functions' execution, when IPython is not available. """
from __future__ import print_function, division
import timeit
import math
_scales = [1e0, 1e3, 1e6, 1e9]
_units = [u's', u'ms', u'\N{GREEK SMALL LETTER MU}s', u'ns']
def timed(func, setup="pass", limit=None):
"""Adaptively measure execution time of a function. """
timer = timeit.Timer(func, setup=setup)
repeat, number = 3, 1
for i in range(1, 10):
if timer.timeit(number) >= 0.2:
break
elif limit is not None and number >= limit:
break
else:
number *= 10
time = min(timer.repeat(repeat, number)) / number
if time > 0.0:
order = min(-int(math.floor(math.log10(time)) // 3), 3)
else:
order = 3
return (number, time, time*_scales[order], _units[order])
# Code for doing inline timings of recursive algorithms.
def __do_timings():
import os
res = os.getenv('SYMPY_TIMINGS', '')
res = [x.strip() for x in res.split(',')]
return set(res)
_do_timings = __do_timings()
_timestack = None
def _print_timestack(stack, level=1):
print('-'*level, '%.2f %s%s' % (stack[2], stack[0], stack[3]))
for s in stack[1]:
_print_timestack(s, level + 1)
def timethis(name):
def decorator(func):
global _do_timings
if not name in _do_timings:
return func
def wrapper(*args, **kwargs):
from time import time
global _timestack
oldtimestack = _timestack
_timestack = [func.func_name, [], 0, args]
t1 = time()
r = func(*args, **kwargs)
t2 = time()
_timestack[2] = t2 - t1
if oldtimestack is not None:
oldtimestack[1].append(_timestack)
_timestack = oldtimestack
else:
_print_timestack(_timestack)
_timestack = None
return r
return wrapper
return decorator
|
e2c554f3e56b9b009fd38f10e45614b846d2a756fdf90020ddf39ad9cf6d6ae3 | from __future__ import print_function, division
from collections import defaultdict, OrderedDict
from itertools import (
combinations, combinations_with_replacement, permutations,
product, product as cartes
)
import random
from operator import gt
from sympy.core import Basic
# this is the logical location of these functions
from sympy.core.compatibility import (
as_int, default_sort_key, is_sequence, iterable, ordered
)
from sympy.utilities.enumerative import (
multiset_partitions_taocp, list_visitor, MultisetPartitionTraverser)
def flatten(iterable, levels=None, cls=None):
"""
Recursively denest iterable containers.
>>> from sympy.utilities.iterables import flatten
>>> flatten([1, 2, 3])
[1, 2, 3]
>>> flatten([1, 2, [3]])
[1, 2, 3]
>>> flatten([1, [2, 3], [4, 5]])
[1, 2, 3, 4, 5]
>>> flatten([1.0, 2, (1, None)])
[1.0, 2, 1, None]
If you want to denest only a specified number of levels of
nested containers, then set ``levels`` flag to the desired
number of levels::
>>> ls = [[(-2, -1), (1, 2)], [(0, 0)]]
>>> flatten(ls, levels=1)
[(-2, -1), (1, 2), (0, 0)]
If cls argument is specified, it will only flatten instances of that
class, for example:
>>> from sympy.core import Basic
>>> class MyOp(Basic):
... pass
...
>>> flatten([MyOp(1, MyOp(2, 3))], cls=MyOp)
[1, 2, 3]
adapted from https://kogs-www.informatik.uni-hamburg.de/~meine/python_tricks
"""
from sympy.tensor.array import NDimArray
if levels is not None:
if not levels:
return iterable
elif levels > 0:
levels -= 1
else:
raise ValueError(
"expected non-negative number of levels, got %s" % levels)
if cls is None:
reducible = lambda x: is_sequence(x, set)
else:
reducible = lambda x: isinstance(x, cls)
result = []
for el in iterable:
if reducible(el):
if hasattr(el, 'args') and not isinstance(el, NDimArray):
el = el.args
result.extend(flatten(el, levels=levels, cls=cls))
else:
result.append(el)
return result
def unflatten(iter, n=2):
"""Group ``iter`` into tuples of length ``n``. Raise an error if
the length of ``iter`` is not a multiple of ``n``.
"""
if n < 1 or len(iter) % n:
raise ValueError('iter length is not a multiple of %i' % n)
return list(zip(*(iter[i::n] for i in range(n))))
def reshape(seq, how):
"""Reshape the sequence according to the template in ``how``.
Examples
========
>>> from sympy.utilities import reshape
>>> seq = list(range(1, 9))
>>> reshape(seq, [4]) # lists of 4
[[1, 2, 3, 4], [5, 6, 7, 8]]
>>> reshape(seq, (4,)) # tuples of 4
[(1, 2, 3, 4), (5, 6, 7, 8)]
>>> reshape(seq, (2, 2)) # tuples of 4
[(1, 2, 3, 4), (5, 6, 7, 8)]
>>> reshape(seq, (2, [2])) # (i, i, [i, i])
[(1, 2, [3, 4]), (5, 6, [7, 8])]
>>> reshape(seq, ((2,), [2])) # etc....
[((1, 2), [3, 4]), ((5, 6), [7, 8])]
>>> reshape(seq, (1, [2], 1))
[(1, [2, 3], 4), (5, [6, 7], 8)]
>>> reshape(tuple(seq), ([[1], 1, (2,)],))
(([[1], 2, (3, 4)],), ([[5], 6, (7, 8)],))
>>> reshape(tuple(seq), ([1], 1, (2,)))
(([1], 2, (3, 4)), ([5], 6, (7, 8)))
>>> reshape(list(range(12)), [2, [3], {2}, (1, (3,), 1)])
[[0, 1, [2, 3, 4], {5, 6}, (7, (8, 9, 10), 11)]]
"""
m = sum(flatten(how))
n, rem = divmod(len(seq), m)
if m < 0 or rem:
raise ValueError('template must sum to positive number '
'that divides the length of the sequence')
i = 0
container = type(how)
rv = [None]*n
for k in range(len(rv)):
rv[k] = []
for hi in how:
if type(hi) is int:
rv[k].extend(seq[i: i + hi])
i += hi
else:
n = sum(flatten(hi))
hi_type = type(hi)
rv[k].append(hi_type(reshape(seq[i: i + n], hi)[0]))
i += n
rv[k] = container(rv[k])
return type(seq)(rv)
def group(seq, multiple=True):
"""
Splits a sequence into a list of lists of equal, adjacent elements.
Examples
========
>>> from sympy.utilities.iterables import group
>>> group([1, 1, 1, 2, 2, 3])
[[1, 1, 1], [2, 2], [3]]
>>> group([1, 1, 1, 2, 2, 3], multiple=False)
[(1, 3), (2, 2), (3, 1)]
>>> group([1, 1, 3, 2, 2, 1], multiple=False)
[(1, 2), (3, 1), (2, 2), (1, 1)]
See Also
========
multiset
"""
if not seq:
return []
current, groups = [seq[0]], []
for elem in seq[1:]:
if elem == current[-1]:
current.append(elem)
else:
groups.append(current)
current = [elem]
groups.append(current)
if multiple:
return groups
for i, current in enumerate(groups):
groups[i] = (current[0], len(current))
return groups
def _iproduct2(iterable1, iterable2):
'''Cartesian product of two possibly infinite iterables'''
it1 = iter(iterable1)
it2 = iter(iterable2)
elems1 = []
elems2 = []
sentinel = object()
def append(it, elems):
e = next(it, sentinel)
if e is not sentinel:
elems.append(e)
n = 0
append(it1, elems1)
append(it2, elems2)
while n <= len(elems1) + len(elems2):
for m in range(n-len(elems1)+1, len(elems2)):
yield (elems1[n-m], elems2[m])
n += 1
append(it1, elems1)
append(it2, elems2)
def iproduct(*iterables):
'''
Cartesian product of iterables.
Generator of the cartesian product of iterables. This is analogous to
itertools.product except that it works with infinite iterables and will
yield any item from the infinite product eventually.
Examples
========
>>> from sympy.utilities.iterables import iproduct
>>> sorted(iproduct([1,2], [3,4]))
[(1, 3), (1, 4), (2, 3), (2, 4)]
With an infinite iterator:
>>> from sympy import S
>>> (3,) in iproduct(S.Integers)
True
>>> (3, 4) in iproduct(S.Integers, S.Integers)
True
.. seealso::
`itertools.product <https://docs.python.org/3/library/itertools.html#itertools.product>`_
'''
if len(iterables) == 0:
yield ()
return
elif len(iterables) == 1:
for e in iterables[0]:
yield (e,)
elif len(iterables) == 2:
for e12 in _iproduct2(*iterables):
yield e12
else:
first, others = iterables[0], iterables[1:]
for ef, eo in _iproduct2(first, iproduct(*others)):
yield (ef,) + eo
def multiset(seq):
"""Return the hashable sequence in multiset form with values being the
multiplicity of the item in the sequence.
Examples
========
>>> from sympy.utilities.iterables import multiset
>>> multiset('mississippi')
{'i': 4, 'm': 1, 'p': 2, 's': 4}
See Also
========
group
"""
rv = defaultdict(int)
for s in seq:
rv[s] += 1
return dict(rv)
def postorder_traversal(node, keys=None):
"""
Do a postorder traversal of a tree.
This generator recursively yields nodes that it has visited in a postorder
fashion. That is, it descends through the tree depth-first to yield all of
a node's children's postorder traversal before yielding the node itself.
Parameters
==========
node : sympy expression
The expression to traverse.
keys : (default None) sort key(s)
The key(s) used to sort args of Basic objects. When None, args of Basic
objects are processed in arbitrary order. If key is defined, it will
be passed along to ordered() as the only key(s) to use to sort the
arguments; if ``key`` is simply True then the default keys of
``ordered`` will be used (node count and default_sort_key).
Yields
======
subtree : sympy expression
All of the subtrees in the tree.
Examples
========
>>> from sympy.utilities.iterables import postorder_traversal
>>> from sympy.abc import w, x, y, z
The nodes are returned in the order that they are encountered unless key
is given; simply passing key=True will guarantee that the traversal is
unique.
>>> list(postorder_traversal(w + (x + y)*z)) # doctest: +SKIP
[z, y, x, x + y, z*(x + y), w, w + z*(x + y)]
>>> list(postorder_traversal(w + (x + y)*z, keys=True))
[w, z, x, y, x + y, z*(x + y), w + z*(x + y)]
"""
if isinstance(node, Basic):
args = node.args
if keys:
if keys != True:
args = ordered(args, keys, default=False)
else:
args = ordered(args)
for arg in args:
for subtree in postorder_traversal(arg, keys):
yield subtree
elif iterable(node):
for item in node:
for subtree in postorder_traversal(item, keys):
yield subtree
yield node
def interactive_traversal(expr):
"""Traverse a tree asking a user which branch to choose. """
from sympy.printing import pprint
RED, BRED = '\033[0;31m', '\033[1;31m'
GREEN, BGREEN = '\033[0;32m', '\033[1;32m'
YELLOW, BYELLOW = '\033[0;33m', '\033[1;33m' # noqa
BLUE, BBLUE = '\033[0;34m', '\033[1;34m' # noqa
MAGENTA, BMAGENTA = '\033[0;35m', '\033[1;35m'# noqa
CYAN, BCYAN = '\033[0;36m', '\033[1;36m' # noqa
END = '\033[0m'
def cprint(*args):
print("".join(map(str, args)) + END)
def _interactive_traversal(expr, stage):
if stage > 0:
print()
cprint("Current expression (stage ", BYELLOW, stage, END, "):")
print(BCYAN)
pprint(expr)
print(END)
if isinstance(expr, Basic):
if expr.is_Add:
args = expr.as_ordered_terms()
elif expr.is_Mul:
args = expr.as_ordered_factors()
else:
args = expr.args
elif hasattr(expr, "__iter__"):
args = list(expr)
else:
return expr
n_args = len(args)
if not n_args:
return expr
for i, arg in enumerate(args):
cprint(GREEN, "[", BGREEN, i, GREEN, "] ", BLUE, type(arg), END)
pprint(arg)
print
if n_args == 1:
choices = '0'
else:
choices = '0-%d' % (n_args - 1)
try:
choice = input("Your choice [%s,f,l,r,d,?]: " % choices)
except EOFError:
result = expr
print()
else:
if choice == '?':
cprint(RED, "%s - select subexpression with the given index" %
choices)
cprint(RED, "f - select the first subexpression")
cprint(RED, "l - select the last subexpression")
cprint(RED, "r - select a random subexpression")
cprint(RED, "d - done\n")
result = _interactive_traversal(expr, stage)
elif choice in ['d', '']:
result = expr
elif choice == 'f':
result = _interactive_traversal(args[0], stage + 1)
elif choice == 'l':
result = _interactive_traversal(args[-1], stage + 1)
elif choice == 'r':
result = _interactive_traversal(random.choice(args), stage + 1)
else:
try:
choice = int(choice)
except ValueError:
cprint(BRED,
"Choice must be a number in %s range\n" % choices)
result = _interactive_traversal(expr, stage)
else:
if choice < 0 or choice >= n_args:
cprint(BRED, "Choice must be in %s range\n" % choices)
result = _interactive_traversal(expr, stage)
else:
result = _interactive_traversal(args[choice], stage + 1)
return result
return _interactive_traversal(expr, 0)
def ibin(n, bits=0, str=False):
"""Return a list of length ``bits`` corresponding to the binary value
of ``n`` with small bits to the right (last). If bits is omitted, the
length will be the number required to represent ``n``. If the bits are
desired in reversed order, use the ``[::-1]`` slice of the returned list.
If a sequence of all bits-length lists starting from ``[0, 0,..., 0]``
through ``[1, 1, ..., 1]`` are desired, pass a non-integer for bits, e.g.
``'all'``.
If the bit *string* is desired pass ``str=True``.
Examples
========
>>> from sympy.utilities.iterables import ibin
>>> ibin(2)
[1, 0]
>>> ibin(2, 4)
[0, 0, 1, 0]
>>> ibin(2, 4)[::-1]
[0, 1, 0, 0]
If all lists corresponding to 0 to 2**n - 1, pass a non-integer
for bits:
>>> bits = 2
>>> for i in ibin(2, 'all'):
... print(i)
(0, 0)
(0, 1)
(1, 0)
(1, 1)
If a bit string is desired of a given length, use str=True:
>>> n = 123
>>> bits = 10
>>> ibin(n, bits, str=True)
'0001111011'
>>> ibin(n, bits, str=True)[::-1] # small bits left
'1101111000'
>>> list(ibin(3, 'all', str=True))
['000', '001', '010', '011', '100', '101', '110', '111']
"""
if not str:
try:
bits = as_int(bits)
return [1 if i == "1" else 0 for i in bin(n)[2:].rjust(bits, "0")]
except ValueError:
return variations(list(range(2)), n, repetition=True)
else:
try:
bits = as_int(bits)
return bin(n)[2:].rjust(bits, "0")
except ValueError:
return (bin(i)[2:].rjust(n, "0") for i in range(2**n))
def variations(seq, n, repetition=False):
r"""Returns a generator of the n-sized variations of ``seq`` (size N).
``repetition`` controls whether items in ``seq`` can appear more than once;
Examples
========
``variations(seq, n)`` will return `\frac{N!}{(N - n)!}` permutations without
repetition of ``seq``'s elements:
>>> from sympy.utilities.iterables import variations
>>> list(variations([1, 2], 2))
[(1, 2), (2, 1)]
``variations(seq, n, True)`` will return the `N^n` permutations obtained
by allowing repetition of elements:
>>> list(variations([1, 2], 2, repetition=True))
[(1, 1), (1, 2), (2, 1), (2, 2)]
If you ask for more items than are in the set you get the empty set unless
you allow repetitions:
>>> list(variations([0, 1], 3, repetition=False))
[]
>>> list(variations([0, 1], 3, repetition=True))[:4]
[(0, 0, 0), (0, 0, 1), (0, 1, 0), (0, 1, 1)]
.. seealso::
`itertools.permutations <https://docs.python.org/3/library/itertools.html#itertools.permutations>`_,
`itertools.product <https://docs.python.org/3/library/itertools.html#itertools.product>`_
"""
if not repetition:
seq = tuple(seq)
if len(seq) < n:
return
for i in permutations(seq, n):
yield i
else:
if n == 0:
yield ()
else:
for i in product(seq, repeat=n):
yield i
def subsets(seq, k=None, repetition=False):
r"""Generates all `k`-subsets (combinations) from an `n`-element set, ``seq``.
A `k`-subset of an `n`-element set is any subset of length exactly `k`. The
number of `k`-subsets of an `n`-element set is given by ``binomial(n, k)``,
whereas there are `2^n` subsets all together. If `k` is ``None`` then all
`2^n` subsets will be returned from shortest to longest.
Examples
========
>>> from sympy.utilities.iterables import subsets
``subsets(seq, k)`` will return the `\frac{n!}{k!(n - k)!}` `k`-subsets (combinations)
without repetition, i.e. once an item has been removed, it can no
longer be "taken":
>>> list(subsets([1, 2], 2))
[(1, 2)]
>>> list(subsets([1, 2]))
[(), (1,), (2,), (1, 2)]
>>> list(subsets([1, 2, 3], 2))
[(1, 2), (1, 3), (2, 3)]
``subsets(seq, k, repetition=True)`` will return the `\frac{(n - 1 + k)!}{k!(n - 1)!}`
combinations *with* repetition:
>>> list(subsets([1, 2], 2, repetition=True))
[(1, 1), (1, 2), (2, 2)]
If you ask for more items than are in the set you get the empty set unless
you allow repetitions:
>>> list(subsets([0, 1], 3, repetition=False))
[]
>>> list(subsets([0, 1], 3, repetition=True))
[(0, 0, 0), (0, 0, 1), (0, 1, 1), (1, 1, 1)]
"""
if k is None:
for k in range(len(seq) + 1):
for i in subsets(seq, k, repetition):
yield i
else:
if not repetition:
for i in combinations(seq, k):
yield i
else:
for i in combinations_with_replacement(seq, k):
yield i
def filter_symbols(iterator, exclude):
"""
Only yield elements from `iterator` that do not occur in `exclude`.
Parameters
==========
iterator : iterable
iterator to take elements from
exclude : iterable
elements to exclude
Returns
=======
iterator : iterator
filtered iterator
"""
exclude = set(exclude)
for s in iterator:
if s not in exclude:
yield s
def numbered_symbols(prefix='x', cls=None, start=0, exclude=[], *args, **assumptions):
"""
Generate an infinite stream of Symbols consisting of a prefix and
increasing subscripts provided that they do not occur in ``exclude``.
Parameters
==========
prefix : str, optional
The prefix to use. By default, this function will generate symbols of
the form "x0", "x1", etc.
cls : class, optional
The class to use. By default, it uses ``Symbol``, but you can also use ``Wild`` or ``Dummy``.
start : int, optional
The start number. By default, it is 0.
Returns
=======
sym : Symbol
The subscripted symbols.
"""
exclude = set(exclude or [])
if cls is None:
# We can't just make the default cls=Symbol because it isn't
# imported yet.
from sympy import Symbol
cls = Symbol
while True:
name = '%s%s' % (prefix, start)
s = cls(name, *args, **assumptions)
if s not in exclude:
yield s
start += 1
def capture(func):
"""Return the printed output of func().
``func`` should be a function without arguments that produces output with
print statements.
>>> from sympy.utilities.iterables import capture
>>> from sympy import pprint
>>> from sympy.abc import x
>>> def foo():
... print('hello world!')
...
>>> 'hello' in capture(foo) # foo, not foo()
True
>>> capture(lambda: pprint(2/x))
'2\\n-\\nx\\n'
"""
from sympy.core.compatibility import StringIO
import sys
stdout = sys.stdout
sys.stdout = file = StringIO()
try:
func()
finally:
sys.stdout = stdout
return file.getvalue()
def sift(seq, keyfunc, binary=False):
"""
Sift the sequence, ``seq`` according to ``keyfunc``.
Returns
=======
When ``binary`` is ``False`` (default), the output is a dictionary
where elements of ``seq`` are stored in a list keyed to the value
of keyfunc for that element. If ``binary`` is True then a tuple
with lists ``T`` and ``F`` are returned where ``T`` is a list
containing elements of seq for which ``keyfunc`` was ``True`` and
``F`` containing those elements for which ``keyfunc`` was ``False``;
a ValueError is raised if the ``keyfunc`` is not binary.
Examples
========
>>> from sympy.utilities import sift
>>> from sympy.abc import x, y
>>> from sympy import sqrt, exp, pi, Tuple
>>> sift(range(5), lambda x: x % 2)
{0: [0, 2, 4], 1: [1, 3]}
sift() returns a defaultdict() object, so any key that has no matches will
give [].
>>> sift([x], lambda x: x.is_commutative)
{True: [x]}
>>> _[False]
[]
Sometimes you will not know how many keys you will get:
>>> sift([sqrt(x), exp(x), (y**x)**2],
... lambda x: x.as_base_exp()[0])
{E: [exp(x)], x: [sqrt(x)], y: [y**(2*x)]}
Sometimes you expect the results to be binary; the
results can be unpacked by setting ``binary`` to True:
>>> sift(range(4), lambda x: x % 2, binary=True)
([1, 3], [0, 2])
>>> sift(Tuple(1, pi), lambda x: x.is_rational, binary=True)
([1], [pi])
A ValueError is raised if the predicate was not actually binary
(which is a good test for the logic where sifting is used and
binary results were expected):
>>> unknown = exp(1) - pi # the rationality of this is unknown
>>> args = Tuple(1, pi, unknown)
>>> sift(args, lambda x: x.is_rational, binary=True)
Traceback (most recent call last):
...
ValueError: keyfunc gave non-binary output
The non-binary sifting shows that there were 3 keys generated:
>>> set(sift(args, lambda x: x.is_rational).keys())
{None, False, True}
If you need to sort the sifted items it might be better to use
``ordered`` which can economically apply multiple sort keys
to a sequence while sorting.
See Also
========
ordered
"""
if not binary:
m = defaultdict(list)
for i in seq:
m[keyfunc(i)].append(i)
return m
sift = F, T = [], []
for i in seq:
try:
sift[keyfunc(i)].append(i)
except (IndexError, TypeError):
raise ValueError('keyfunc gave non-binary output')
return T, F
def take(iter, n):
"""Return ``n`` items from ``iter`` iterator. """
return [ value for _, value in zip(range(n), iter) ]
def dict_merge(*dicts):
"""Merge dictionaries into a single dictionary. """
merged = {}
for dict in dicts:
merged.update(dict)
return merged
def common_prefix(*seqs):
"""Return the subsequence that is a common start of sequences in ``seqs``.
>>> from sympy.utilities.iterables import common_prefix
>>> common_prefix(list(range(3)))
[0, 1, 2]
>>> common_prefix(list(range(3)), list(range(4)))
[0, 1, 2]
>>> common_prefix([1, 2, 3], [1, 2, 5])
[1, 2]
>>> common_prefix([1, 2, 3], [1, 3, 5])
[1]
"""
if any(not s for s in seqs):
return []
elif len(seqs) == 1:
return seqs[0]
i = 0
for i in range(min(len(s) for s in seqs)):
if not all(seqs[j][i] == seqs[0][i] for j in range(len(seqs))):
break
else:
i += 1
return seqs[0][:i]
def common_suffix(*seqs):
"""Return the subsequence that is a common ending of sequences in ``seqs``.
>>> from sympy.utilities.iterables import common_suffix
>>> common_suffix(list(range(3)))
[0, 1, 2]
>>> common_suffix(list(range(3)), list(range(4)))
[]
>>> common_suffix([1, 2, 3], [9, 2, 3])
[2, 3]
>>> common_suffix([1, 2, 3], [9, 7, 3])
[3]
"""
if any(not s for s in seqs):
return []
elif len(seqs) == 1:
return seqs[0]
i = 0
for i in range(-1, -min(len(s) for s in seqs) - 1, -1):
if not all(seqs[j][i] == seqs[0][i] for j in range(len(seqs))):
break
else:
i -= 1
if i == -1:
return []
else:
return seqs[0][i + 1:]
def prefixes(seq):
"""
Generate all prefixes of a sequence.
Examples
========
>>> from sympy.utilities.iterables import prefixes
>>> list(prefixes([1,2,3,4]))
[[1], [1, 2], [1, 2, 3], [1, 2, 3, 4]]
"""
n = len(seq)
for i in range(n):
yield seq[:i + 1]
def postfixes(seq):
"""
Generate all postfixes of a sequence.
Examples
========
>>> from sympy.utilities.iterables import postfixes
>>> list(postfixes([1,2,3,4]))
[[4], [3, 4], [2, 3, 4], [1, 2, 3, 4]]
"""
n = len(seq)
for i in range(n):
yield seq[n - i - 1:]
def topological_sort(graph, key=None):
r"""
Topological sort of graph's vertices.
Parameters
==========
graph : tuple[list, list[tuple[T, T]]
A tuple consisting of a list of vertices and a list of edges of
a graph to be sorted topologically.
key : callable[T] (optional)
Ordering key for vertices on the same level. By default the natural
(e.g. lexicographic) ordering is used (in this case the base type
must implement ordering relations).
Examples
========
Consider a graph::
+---+ +---+ +---+
| 7 |\ | 5 | | 3 |
+---+ \ +---+ +---+
| _\___/ ____ _/ |
| / \___/ \ / |
V V V V |
+----+ +---+ |
| 11 | | 8 | |
+----+ +---+ |
| | \____ ___/ _ |
| \ \ / / \ |
V \ V V / V V
+---+ \ +---+ | +----+
| 2 | | | 9 | | | 10 |
+---+ | +---+ | +----+
\________/
where vertices are integers. This graph can be encoded using
elementary Python's data structures as follows::
>>> V = [2, 3, 5, 7, 8, 9, 10, 11]
>>> E = [(7, 11), (7, 8), (5, 11), (3, 8), (3, 10),
... (11, 2), (11, 9), (11, 10), (8, 9)]
To compute a topological sort for graph ``(V, E)`` issue::
>>> from sympy.utilities.iterables import topological_sort
>>> topological_sort((V, E))
[3, 5, 7, 8, 11, 2, 9, 10]
If specific tie breaking approach is needed, use ``key`` parameter::
>>> topological_sort((V, E), key=lambda v: -v)
[7, 5, 11, 3, 10, 8, 9, 2]
Only acyclic graphs can be sorted. If the input graph has a cycle,
then ``ValueError`` will be raised::
>>> topological_sort((V, E + [(10, 7)]))
Traceback (most recent call last):
...
ValueError: cycle detected
References
==========
.. [1] https://en.wikipedia.org/wiki/Topological_sorting
"""
V, E = graph
L = []
S = set(V)
E = list(E)
for v, u in E:
S.discard(u)
if key is None:
key = lambda value: value
S = sorted(S, key=key, reverse=True)
while S:
node = S.pop()
L.append(node)
for u, v in list(E):
if u == node:
E.remove((u, v))
for _u, _v in E:
if v == _v:
break
else:
kv = key(v)
for i, s in enumerate(S):
ks = key(s)
if kv > ks:
S.insert(i, v)
break
else:
S.append(v)
if E:
raise ValueError("cycle detected")
else:
return L
def strongly_connected_components(G):
r"""
Strongly connected components of a directed graph in reverse topological
order.
Parameters
==========
graph : tuple[list, list[tuple[T, T]]
A tuple consisting of a list of vertices and a list of edges of
a graph whose strongly connected components are to be found.
Examples
========
Consider a directed graph (in dot notation)::
digraph {
A -> B
A -> C
B -> C
C -> B
B -> D
}
where vertices are the letters A, B, C and D. This graph can be encoded
using Python's elementary data structures as follows::
>>> V = ['A', 'B', 'C', 'D']
>>> E = [('A', 'B'), ('A', 'C'), ('B', 'C'), ('C', 'B'), ('B', 'D')]
The strongly connected components of this graph can be computed as
>>> from sympy.utilities.iterables import strongly_connected_components
>>> strongly_connected_components((V, E))
[['D'], ['B', 'C'], ['A']]
This also gives the components in reverse topological order.
Since the subgraph containing B and C has a cycle they must be together in
a strongly connected component. A and D are connected to the rest of the
graph but not in a cyclic manner so they appear as their own strongly
connected components.
Notes
=====
The vertices of the graph must be hashable for the data structures used.
If the vertices are unhashable replace them with integer indices.
This function uses Tarjan's algorithm to compute the strongly connected
components in `O(|V|+|E|)` (linear) time.
References
==========
.. [1] https://en.wikipedia.org/wiki/Strongly_connected_component
.. [2] https://en.wikipedia.org/wiki/Tarjan%27s_strongly_connected_components_algorithm
See Also
========
sympy.utilities.iterables.connected_components()
"""
# Map from a vertex to its neighbours
V, E = G
Gmap = {vi: [] for vi in V}
for v1, v2 in E:
Gmap[v1].append(v2)
# Non-recursive Tarjan's algorithm:
lowlink = {}
indices = {}
stack = OrderedDict()
callstack = []
components = []
nomore = object()
def start(v):
index = len(stack)
indices[v] = lowlink[v] = index
stack[v] = None
callstack.append((v, iter(Gmap[v])))
def finish(v1):
# Finished a component?
if lowlink[v1] == indices[v1]:
component = [stack.popitem()[0]]
while component[-1] is not v1:
component.append(stack.popitem()[0])
components.append(component[::-1])
v2, _ = callstack.pop()
if callstack:
v1, _ = callstack[-1]
lowlink[v1] = min(lowlink[v1], lowlink[v2])
for v in V:
if v in indices:
continue
start(v)
while callstack:
v1, it1 = callstack[-1]
v2 = next(it1, nomore)
# Finished children of v1?
if v2 is nomore:
finish(v1)
# Recurse on v2
elif v2 not in indices:
start(v2)
elif v2 in stack:
lowlink[v1] = min(lowlink[v1], indices[v2])
# Reverse topological sort order:
return components
def connected_components(G):
r"""
Connected components of an undirected graph or weakly connected components
of a directed graph.
Parameters
==========
graph : tuple[list, list[tuple[T, T]]
A tuple consisting of a list of vertices and a list of edges of
a graph whose connected components are to be found.
Examples
========
Given an undirected graph::
graph {
A -- B
C -- D
}
We can find the connected components using this function if we include
each edge in both directions::
>>> from sympy.utilities.iterables import connected_components
>>> V = ['A', 'B', 'C', 'D']
>>> E = [('A', 'B'), ('B', 'A'), ('C', 'D'), ('D', 'C')]
>>> connected_components((V, E))
[['A', 'B'], ['C', 'D']]
The weakly connected components of a directed graph can found the same
way.
Notes
=====
The vertices of the graph must be hashable for the data structures used.
If the vertices are unhashable replace them with integer indices.
This function uses Tarjan's algorithm to compute the connected components
in `O(|V|+|E|)` (linear) time.
References
==========
.. [1] https://en.wikipedia.org/wiki/Connected_component_(graph_theory)
.. [2] https://en.wikipedia.org/wiki/Tarjan%27s_strongly_connected_components_algorithm
See Also
========
sympy.utilities.iterables.strongly_connected_components()
"""
# Duplicate edges both ways so that the graph is effectively undirected
# and return the strongly connected components:
V, E = G
E_undirected = []
for v1, v2 in E:
E_undirected.extend([(v1, v2), (v2, v1)])
return strongly_connected_components((V, E_undirected))
def rotate_left(x, y):
"""
Left rotates a list x by the number of steps specified
in y.
Examples
========
>>> from sympy.utilities.iterables import rotate_left
>>> a = [0, 1, 2]
>>> rotate_left(a, 1)
[1, 2, 0]
"""
if len(x) == 0:
return []
y = y % len(x)
return x[y:] + x[:y]
def rotate_right(x, y):
"""
Right rotates a list x by the number of steps specified
in y.
Examples
========
>>> from sympy.utilities.iterables import rotate_right
>>> a = [0, 1, 2]
>>> rotate_right(a, 1)
[2, 0, 1]
"""
if len(x) == 0:
return []
y = len(x) - y % len(x)
return x[y:] + x[:y]
def least_rotation(x):
'''
Returns the number of steps of left rotation required to
obtain lexicographically minimal string/list/tuple, etc.
Examples
========
>>> from sympy.utilities.iterables import least_rotation, rotate_left
>>> a = [3, 1, 5, 1, 2]
>>> least_rotation(a)
3
>>> rotate_left(a, _)
[1, 2, 3, 1, 5]
References
==========
.. [1] https://en.wikipedia.org/wiki/Lexicographically_minimal_string_rotation
'''
S = x + x # Concatenate string to it self to avoid modular arithmetic
f = [-1] * len(S) # Failure function
k = 0 # Least rotation of string found so far
for j in range(1,len(S)):
sj = S[j]
i = f[j-k-1]
while i != -1 and sj != S[k+i+1]:
if sj < S[k+i+1]:
k = j-i-1
i = f[i]
if sj != S[k+i+1]:
if sj < S[k]:
k = j
f[j-k] = -1
else:
f[j-k] = i+1
return k
def multiset_combinations(m, n, g=None):
"""
Return the unique combinations of size ``n`` from multiset ``m``.
Examples
========
>>> from sympy.utilities.iterables import multiset_combinations
>>> from itertools import combinations
>>> [''.join(i) for i in multiset_combinations('baby', 3)]
['abb', 'aby', 'bby']
>>> def count(f, s): return len(list(f(s, 3)))
The number of combinations depends on the number of letters; the
number of unique combinations depends on how the letters are
repeated.
>>> s1 = 'abracadabra'
>>> s2 = 'banana tree'
>>> count(combinations, s1), count(multiset_combinations, s1)
(165, 23)
>>> count(combinations, s2), count(multiset_combinations, s2)
(165, 54)
"""
if g is None:
if type(m) is dict:
if n > sum(m.values()):
return
g = [[k, m[k]] for k in ordered(m)]
else:
m = list(m)
if n > len(m):
return
try:
m = multiset(m)
g = [(k, m[k]) for k in ordered(m)]
except TypeError:
m = list(ordered(m))
g = [list(i) for i in group(m, multiple=False)]
del m
if sum(v for k, v in g) < n or not n:
yield []
else:
for i, (k, v) in enumerate(g):
if v >= n:
yield [k]*n
v = n - 1
for v in range(min(n, v), 0, -1):
for j in multiset_combinations(None, n - v, g[i + 1:]):
rv = [k]*v + j
if len(rv) == n:
yield rv
def multiset_permutations(m, size=None, g=None):
"""
Return the unique permutations of multiset ``m``.
Examples
========
>>> from sympy.utilities.iterables import multiset_permutations
>>> from sympy import factorial
>>> [''.join(i) for i in multiset_permutations('aab')]
['aab', 'aba', 'baa']
>>> factorial(len('banana'))
720
>>> len(list(multiset_permutations('banana')))
60
"""
if g is None:
if type(m) is dict:
g = [[k, m[k]] for k in ordered(m)]
else:
m = list(ordered(m))
g = [list(i) for i in group(m, multiple=False)]
del m
do = [gi for gi in g if gi[1] > 0]
SUM = sum([gi[1] for gi in do])
if not do or size is not None and (size > SUM or size < 1):
if size < 1:
yield []
return
elif size == 1:
for k, v in do:
yield [k]
elif len(do) == 1:
k, v = do[0]
v = v if size is None else (size if size <= v else 0)
yield [k for i in range(v)]
elif all(v == 1 for k, v in do):
for p in permutations([k for k, v in do], size):
yield list(p)
else:
size = size if size is not None else SUM
for i, (k, v) in enumerate(do):
do[i][1] -= 1
for j in multiset_permutations(None, size - 1, do):
if j:
yield [k] + j
do[i][1] += 1
def _partition(seq, vector, m=None):
"""
Return the partition of seq as specified by the partition vector.
Examples
========
>>> from sympy.utilities.iterables import _partition
>>> _partition('abcde', [1, 0, 1, 2, 0])
[['b', 'e'], ['a', 'c'], ['d']]
Specifying the number of bins in the partition is optional:
>>> _partition('abcde', [1, 0, 1, 2, 0], 3)
[['b', 'e'], ['a', 'c'], ['d']]
The output of _set_partitions can be passed as follows:
>>> output = (3, [1, 0, 1, 2, 0])
>>> _partition('abcde', *output)
[['b', 'e'], ['a', 'c'], ['d']]
See Also
========
combinatorics.partitions.Partition.from_rgs()
"""
if m is None:
m = max(vector) + 1
elif type(vector) is int: # entered as m, vector
vector, m = m, vector
p = [[] for i in range(m)]
for i, v in enumerate(vector):
p[v].append(seq[i])
return p
def _set_partitions(n):
"""Cycle through all partions of n elements, yielding the
current number of partitions, ``m``, and a mutable list, ``q``
such that element[i] is in part q[i] of the partition.
NOTE: ``q`` is modified in place and generally should not be changed
between function calls.
Examples
========
>>> from sympy.utilities.iterables import _set_partitions, _partition
>>> for m, q in _set_partitions(3):
... print('%s %s %s' % (m, q, _partition('abc', q, m)))
1 [0, 0, 0] [['a', 'b', 'c']]
2 [0, 0, 1] [['a', 'b'], ['c']]
2 [0, 1, 0] [['a', 'c'], ['b']]
2 [0, 1, 1] [['a'], ['b', 'c']]
3 [0, 1, 2] [['a'], ['b'], ['c']]
Notes
=====
This algorithm is similar to, and solves the same problem as,
Algorithm 7.2.1.5H, from volume 4A of Knuth's The Art of Computer
Programming. Knuth uses the term "restricted growth string" where
this code refers to a "partition vector". In each case, the meaning is
the same: the value in the ith element of the vector specifies to
which part the ith set element is to be assigned.
At the lowest level, this code implements an n-digit big-endian
counter (stored in the array q) which is incremented (with carries) to
get the next partition in the sequence. A special twist is that a
digit is constrained to be at most one greater than the maximum of all
the digits to the left of it. The array p maintains this maximum, so
that the code can efficiently decide when a digit can be incremented
in place or whether it needs to be reset to 0 and trigger a carry to
the next digit. The enumeration starts with all the digits 0 (which
corresponds to all the set elements being assigned to the same 0th
part), and ends with 0123...n, which corresponds to each set element
being assigned to a different, singleton, part.
This routine was rewritten to use 0-based lists while trying to
preserve the beauty and efficiency of the original algorithm.
References
==========
.. [1] Nijenhuis, Albert and Wilf, Herbert. (1978) Combinatorial Algorithms,
2nd Ed, p 91, algorithm "nexequ". Available online from
https://www.math.upenn.edu/~wilf/website/CombAlgDownld.html (viewed
November 17, 2012).
"""
p = [0]*n
q = [0]*n
nc = 1
yield nc, q
while nc != n:
m = n
while 1:
m -= 1
i = q[m]
if p[i] != 1:
break
q[m] = 0
i += 1
q[m] = i
m += 1
nc += m - n
p[0] += n - m
if i == nc:
p[nc] = 0
nc += 1
p[i - 1] -= 1
p[i] += 1
yield nc, q
def multiset_partitions(multiset, m=None):
"""
Return unique partitions of the given multiset (in list form).
If ``m`` is None, all multisets will be returned, otherwise only
partitions with ``m`` parts will be returned.
If ``multiset`` is an integer, a range [0, 1, ..., multiset - 1]
will be supplied.
Examples
========
>>> from sympy.utilities.iterables import multiset_partitions
>>> list(multiset_partitions([1, 2, 3, 4], 2))
[[[1, 2, 3], [4]], [[1, 2, 4], [3]], [[1, 2], [3, 4]],
[[1, 3, 4], [2]], [[1, 3], [2, 4]], [[1, 4], [2, 3]],
[[1], [2, 3, 4]]]
>>> list(multiset_partitions([1, 2, 3, 4], 1))
[[[1, 2, 3, 4]]]
Only unique partitions are returned and these will be returned in a
canonical order regardless of the order of the input:
>>> a = [1, 2, 2, 1]
>>> ans = list(multiset_partitions(a, 2))
>>> a.sort()
>>> list(multiset_partitions(a, 2)) == ans
True
>>> a = range(3, 1, -1)
>>> (list(multiset_partitions(a)) ==
... list(multiset_partitions(sorted(a))))
True
If m is omitted then all partitions will be returned:
>>> list(multiset_partitions([1, 1, 2]))
[[[1, 1, 2]], [[1, 1], [2]], [[1, 2], [1]], [[1], [1], [2]]]
>>> list(multiset_partitions([1]*3))
[[[1, 1, 1]], [[1], [1, 1]], [[1], [1], [1]]]
Counting
========
The number of partitions of a set is given by the bell number:
>>> from sympy import bell
>>> len(list(multiset_partitions(5))) == bell(5) == 52
True
The number of partitions of length k from a set of size n is given by the
Stirling Number of the 2nd kind:
>>> from sympy.functions.combinatorial.numbers import stirling
>>> stirling(5, 2) == len(list(multiset_partitions(5, 2))) == 15
True
These comments on counting apply to *sets*, not multisets.
Notes
=====
When all the elements are the same in the multiset, the order
of the returned partitions is determined by the ``partitions``
routine. If one is counting partitions then it is better to use
the ``nT`` function.
See Also
========
partitions
sympy.combinatorics.partitions.Partition
sympy.combinatorics.partitions.IntegerPartition
sympy.functions.combinatorial.numbers.nT
"""
# This function looks at the supplied input and dispatches to
# several special-case routines as they apply.
if type(multiset) is int:
n = multiset
if m and m > n:
return
multiset = list(range(n))
if m == 1:
yield [multiset[:]]
return
# If m is not None, it can sometimes be faster to use
# MultisetPartitionTraverser.enum_range() even for inputs
# which are sets. Since the _set_partitions code is quite
# fast, this is only advantageous when the overall set
# partitions outnumber those with the desired number of parts
# by a large factor. (At least 60.) Such a switch is not
# currently implemented.
for nc, q in _set_partitions(n):
if m is None or nc == m:
rv = [[] for i in range(nc)]
for i in range(n):
rv[q[i]].append(multiset[i])
yield rv
return
if len(multiset) == 1 and isinstance(multiset, str):
multiset = [multiset]
if not has_variety(multiset):
# Only one component, repeated n times. The resulting
# partitions correspond to partitions of integer n.
n = len(multiset)
if m and m > n:
return
if m == 1:
yield [multiset[:]]
return
x = multiset[:1]
for size, p in partitions(n, m, size=True):
if m is None or size == m:
rv = []
for k in sorted(p):
rv.extend([x*k]*p[k])
yield rv
else:
multiset = list(ordered(multiset))
n = len(multiset)
if m and m > n:
return
if m == 1:
yield [multiset[:]]
return
# Split the information of the multiset into two lists -
# one of the elements themselves, and one (of the same length)
# giving the number of repeats for the corresponding element.
elements, multiplicities = zip(*group(multiset, False))
if len(elements) < len(multiset):
# General case - multiset with more than one distinct element
# and at least one element repeated more than once.
if m:
mpt = MultisetPartitionTraverser()
for state in mpt.enum_range(multiplicities, m-1, m):
yield list_visitor(state, elements)
else:
for state in multiset_partitions_taocp(multiplicities):
yield list_visitor(state, elements)
else:
# Set partitions case - no repeated elements. Pretty much
# same as int argument case above, with same possible, but
# currently unimplemented optimization for some cases when
# m is not None
for nc, q in _set_partitions(n):
if m is None or nc == m:
rv = [[] for i in range(nc)]
for i in range(n):
rv[q[i]].append(i)
yield [[multiset[j] for j in i] for i in rv]
def partitions(n, m=None, k=None, size=False):
"""Generate all partitions of positive integer, n.
Parameters
==========
m : integer (default gives partitions of all sizes)
limits number of parts in partition (mnemonic: m, maximum parts)
k : integer (default gives partitions number from 1 through n)
limits the numbers that are kept in the partition (mnemonic: k, keys)
size : bool (default False, only partition is returned)
when ``True`` then (M, P) is returned where M is the sum of the
multiplicities and P is the generated partition.
Each partition is represented as a dictionary, mapping an integer
to the number of copies of that integer in the partition. For example,
the first partition of 4 returned is {4: 1}, "4: one of them".
Examples
========
>>> from sympy.utilities.iterables import partitions
The numbers appearing in the partition (the key of the returned dict)
are limited with k:
>>> for p in partitions(6, k=2): # doctest: +SKIP
... print(p)
{2: 3}
{1: 2, 2: 2}
{1: 4, 2: 1}
{1: 6}
The maximum number of parts in the partition (the sum of the values in
the returned dict) are limited with m (default value, None, gives
partitions from 1 through n):
>>> for p in partitions(6, m=2): # doctest: +SKIP
... print(p)
...
{6: 1}
{1: 1, 5: 1}
{2: 1, 4: 1}
{3: 2}
Note that the _same_ dictionary object is returned each time.
This is for speed: generating each partition goes quickly,
taking constant time, independent of n.
>>> [p for p in partitions(6, k=2)]
[{1: 6}, {1: 6}, {1: 6}, {1: 6}]
If you want to build a list of the returned dictionaries then
make a copy of them:
>>> [p.copy() for p in partitions(6, k=2)] # doctest: +SKIP
[{2: 3}, {1: 2, 2: 2}, {1: 4, 2: 1}, {1: 6}]
>>> [(M, p.copy()) for M, p in partitions(6, k=2, size=True)] # doctest: +SKIP
[(3, {2: 3}), (4, {1: 2, 2: 2}), (5, {1: 4, 2: 1}), (6, {1: 6})]
References
==========
.. [1] modified from Tim Peter's version to allow for k and m values:
http://code.activestate.com/recipes/218332-generator-for-integer-partitions/
See Also
========
sympy.combinatorics.partitions.Partition
sympy.combinatorics.partitions.IntegerPartition
"""
if (n <= 0 or
m is not None and m < 1 or
k is not None and k < 1 or
m and k and m*k < n):
# the empty set is the only way to handle these inputs
# and returning {} to represent it is consistent with
# the counting convention, e.g. nT(0) == 1.
if size:
yield 0, {}
else:
yield {}
return
if m is None:
m = n
else:
m = min(m, n)
if n == 0:
if size:
yield 1, {0: 1}
else:
yield {0: 1}
return
k = min(k or n, n)
n, m, k = as_int(n), as_int(m), as_int(k)
q, r = divmod(n, k)
ms = {k: q}
keys = [k] # ms.keys(), from largest to smallest
if r:
ms[r] = 1
keys.append(r)
room = m - q - bool(r)
if size:
yield sum(ms.values()), ms
else:
yield ms
while keys != [1]:
# Reuse any 1's.
if keys[-1] == 1:
del keys[-1]
reuse = ms.pop(1)
room += reuse
else:
reuse = 0
while 1:
# Let i be the smallest key larger than 1. Reuse one
# instance of i.
i = keys[-1]
newcount = ms[i] = ms[i] - 1
reuse += i
if newcount == 0:
del keys[-1], ms[i]
room += 1
# Break the remainder into pieces of size i-1.
i -= 1
q, r = divmod(reuse, i)
need = q + bool(r)
if need > room:
if not keys:
return
continue
ms[i] = q
keys.append(i)
if r:
ms[r] = 1
keys.append(r)
break
room -= need
if size:
yield sum(ms.values()), ms
else:
yield ms
def ordered_partitions(n, m=None, sort=True):
"""Generates ordered partitions of integer ``n``.
Parameters
==========
m : integer (default None)
The default value gives partitions of all sizes else only
those with size m. In addition, if ``m`` is not None then
partitions are generated *in place* (see examples).
sort : bool (default True)
Controls whether partitions are
returned in sorted order when ``m`` is not None; when False,
the partitions are returned as fast as possible with elements
sorted, but when m|n the partitions will not be in
ascending lexicographical order.
Examples
========
>>> from sympy.utilities.iterables import ordered_partitions
All partitions of 5 in ascending lexicographical:
>>> for p in ordered_partitions(5):
... print(p)
[1, 1, 1, 1, 1]
[1, 1, 1, 2]
[1, 1, 3]
[1, 2, 2]
[1, 4]
[2, 3]
[5]
Only partitions of 5 with two parts:
>>> for p in ordered_partitions(5, 2):
... print(p)
[1, 4]
[2, 3]
When ``m`` is given, a given list objects will be used more than
once for speed reasons so you will not see the correct partitions
unless you make a copy of each as it is generated:
>>> [p for p in ordered_partitions(7, 3)]
[[1, 1, 1], [1, 1, 1], [1, 1, 1], [2, 2, 2]]
>>> [list(p) for p in ordered_partitions(7, 3)]
[[1, 1, 5], [1, 2, 4], [1, 3, 3], [2, 2, 3]]
When ``n`` is a multiple of ``m``, the elements are still sorted
but the partitions themselves will be *unordered* if sort is False;
the default is to return them in ascending lexicographical order.
>>> for p in ordered_partitions(6, 2):
... print(p)
[1, 5]
[2, 4]
[3, 3]
But if speed is more important than ordering, sort can be set to
False:
>>> for p in ordered_partitions(6, 2, sort=False):
... print(p)
[1, 5]
[3, 3]
[2, 4]
References
==========
.. [1] Generating Integer Partitions, [online],
Available: https://jeromekelleher.net/generating-integer-partitions.html
.. [2] Jerome Kelleher and Barry O'Sullivan, "Generating All
Partitions: A Comparison Of Two Encodings", [online],
Available: https://arxiv.org/pdf/0909.2331v2.pdf
"""
if n < 1 or m is not None and m < 1:
# the empty set is the only way to handle these inputs
# and returning {} to represent it is consistent with
# the counting convention, e.g. nT(0) == 1.
yield []
return
if m is None:
# The list `a`'s leading elements contain the partition in which
# y is the biggest element and x is either the same as y or the
# 2nd largest element; v and w are adjacent element indices
# to which x and y are being assigned, respectively.
a = [1]*n
y = -1
v = n
while v > 0:
v -= 1
x = a[v] + 1
while y >= 2 * x:
a[v] = x
y -= x
v += 1
w = v + 1
while x <= y:
a[v] = x
a[w] = y
yield a[:w + 1]
x += 1
y -= 1
a[v] = x + y
y = a[v] - 1
yield a[:w]
elif m == 1:
yield [n]
elif n == m:
yield [1]*n
else:
# recursively generate partitions of size m
for b in range(1, n//m + 1):
a = [b]*m
x = n - b*m
if not x:
if sort:
yield a
elif not sort and x <= m:
for ax in ordered_partitions(x, sort=False):
mi = len(ax)
a[-mi:] = [i + b for i in ax]
yield a
a[-mi:] = [b]*mi
else:
for mi in range(1, m):
for ax in ordered_partitions(x, mi, sort=True):
a[-mi:] = [i + b for i in ax]
yield a
a[-mi:] = [b]*mi
def binary_partitions(n):
"""
Generates the binary partition of n.
A binary partition consists only of numbers that are
powers of two. Each step reduces a `2^{k+1}` to `2^k` and
`2^k`. Thus 16 is converted to 8 and 8.
Examples
========
>>> from sympy.utilities.iterables import binary_partitions
>>> for i in binary_partitions(5):
... print(i)
...
[4, 1]
[2, 2, 1]
[2, 1, 1, 1]
[1, 1, 1, 1, 1]
References
==========
.. [1] TAOCP 4, section 7.2.1.5, problem 64
"""
from math import ceil, log
pow = int(2**(ceil(log(n, 2))))
sum = 0
partition = []
while pow:
if sum + pow <= n:
partition.append(pow)
sum += pow
pow >>= 1
last_num = len(partition) - 1 - (n & 1)
while last_num >= 0:
yield partition
if partition[last_num] == 2:
partition[last_num] = 1
partition.append(1)
last_num -= 1
continue
partition.append(1)
partition[last_num] >>= 1
x = partition[last_num + 1] = partition[last_num]
last_num += 1
while x > 1:
if x <= len(partition) - last_num - 1:
del partition[-x + 1:]
last_num += 1
partition[last_num] = x
else:
x >>= 1
yield [1]*n
def has_dups(seq):
"""Return True if there are any duplicate elements in ``seq``.
Examples
========
>>> from sympy.utilities.iterables import has_dups
>>> from sympy import Dict, Set
>>> has_dups((1, 2, 1))
True
>>> has_dups(range(3))
False
>>> all(has_dups(c) is False for c in (set(), Set(), dict(), Dict()))
True
"""
from sympy.core.containers import Dict
from sympy.sets.sets import Set
if isinstance(seq, (dict, set, Dict, Set)):
return False
uniq = set()
return any(True for s in seq if s in uniq or uniq.add(s))
def has_variety(seq):
"""Return True if there are any different elements in ``seq``.
Examples
========
>>> from sympy.utilities.iterables import has_variety
>>> has_variety((1, 2, 1))
True
>>> has_variety((1, 1, 1))
False
"""
for i, s in enumerate(seq):
if i == 0:
sentinel = s
else:
if s != sentinel:
return True
return False
def uniq(seq, result=None):
"""
Yield unique elements from ``seq`` as an iterator. The second
parameter ``result`` is used internally; it is not necessary to pass
anything for this.
Examples
========
>>> from sympy.utilities.iterables import uniq
>>> dat = [1, 4, 1, 5, 4, 2, 1, 2]
>>> type(uniq(dat)) in (list, tuple)
False
>>> list(uniq(dat))
[1, 4, 5, 2]
>>> list(uniq(x for x in dat))
[1, 4, 5, 2]
>>> list(uniq([[1], [2, 1], [1]]))
[[1], [2, 1]]
"""
try:
seen = set()
result = result or []
for i, s in enumerate(seq):
if not (s in seen or seen.add(s)):
yield s
except TypeError:
if s not in result:
yield s
result.append(s)
if hasattr(seq, '__getitem__'):
for s in uniq(seq[i + 1:], result):
yield s
else:
for s in uniq(seq, result):
yield s
def generate_bell(n):
"""Return permutations of [0, 1, ..., n - 1] such that each permutation
differs from the last by the exchange of a single pair of neighbors.
The ``n!`` permutations are returned as an iterator. In order to obtain
the next permutation from a random starting permutation, use the
``next_trotterjohnson`` method of the Permutation class (which generates
the same sequence in a different manner).
Examples
========
>>> from itertools import permutations
>>> from sympy.utilities.iterables import generate_bell
>>> from sympy import zeros, Matrix
This is the sort of permutation used in the ringing of physical bells,
and does not produce permutations in lexicographical order. Rather, the
permutations differ from each other by exactly one inversion, and the
position at which the swapping occurs varies periodically in a simple
fashion. Consider the first few permutations of 4 elements generated
by ``permutations`` and ``generate_bell``:
>>> list(permutations(range(4)))[:5]
[(0, 1, 2, 3), (0, 1, 3, 2), (0, 2, 1, 3), (0, 2, 3, 1), (0, 3, 1, 2)]
>>> list(generate_bell(4))[:5]
[(0, 1, 2, 3), (0, 1, 3, 2), (0, 3, 1, 2), (3, 0, 1, 2), (3, 0, 2, 1)]
Notice how the 2nd and 3rd lexicographical permutations have 3 elements
out of place whereas each "bell" permutation always has only two
elements out of place relative to the previous permutation (and so the
signature (+/-1) of a permutation is opposite of the signature of the
previous permutation).
How the position of inversion varies across the elements can be seen
by tracing out where the largest number appears in the permutations:
>>> m = zeros(4, 24)
>>> for i, p in enumerate(generate_bell(4)):
... m[:, i] = Matrix([j - 3 for j in list(p)]) # make largest zero
>>> m.print_nonzero('X')
[XXX XXXXXX XXXXXX XXX]
[XX XX XXXX XX XXXX XX XX]
[X XXXX XX XXXX XX XXXX X]
[ XXXXXX XXXXXX XXXXXX ]
See Also
========
sympy.combinatorics.permutations.Permutation.next_trotterjohnson
References
==========
.. [1] https://en.wikipedia.org/wiki/Method_ringing
.. [2] https://stackoverflow.com/questions/4856615/recursive-permutation/4857018
.. [3] http://programminggeeks.com/bell-algorithm-for-permutation/
.. [4] https://en.wikipedia.org/wiki/Steinhaus%E2%80%93Johnson%E2%80%93Trotter_algorithm
.. [5] Generating involutions, derangements, and relatives by ECO
Vincent Vajnovszki, DMTCS vol 1 issue 12, 2010
"""
n = as_int(n)
if n < 1:
raise ValueError('n must be a positive integer')
if n == 1:
yield (0,)
elif n == 2:
yield (0, 1)
yield (1, 0)
elif n == 3:
for li in [(0, 1, 2), (0, 2, 1), (2, 0, 1), (2, 1, 0), (1, 2, 0), (1, 0, 2)]:
yield li
else:
m = n - 1
op = [0] + [-1]*m
l = list(range(n))
while True:
yield tuple(l)
# find biggest element with op
big = None, -1 # idx, value
for i in range(n):
if op[i] and l[i] > big[1]:
big = i, l[i]
i, _ = big
if i is None:
break # there are no ops left
# swap it with neighbor in the indicated direction
j = i + op[i]
l[i], l[j] = l[j], l[i]
op[i], op[j] = op[j], op[i]
# if it landed at the end or if the neighbor in the same
# direction is bigger then turn off op
if j == 0 or j == m or l[j + op[j]] > l[j]:
op[j] = 0
# any element bigger to the left gets +1 op
for i in range(j):
if l[i] > l[j]:
op[i] = 1
# any element bigger to the right gets -1 op
for i in range(j + 1, n):
if l[i] > l[j]:
op[i] = -1
def generate_involutions(n):
"""
Generates involutions.
An involution is a permutation that when multiplied
by itself equals the identity permutation. In this
implementation the involutions are generated using
Fixed Points.
Alternatively, an involution can be considered as
a permutation that does not contain any cycles with
a length that is greater than two.
Examples
========
>>> from sympy.utilities.iterables import generate_involutions
>>> list(generate_involutions(3))
[(0, 1, 2), (0, 2, 1), (1, 0, 2), (2, 1, 0)]
>>> len(list(generate_involutions(4)))
10
References
==========
.. [1] http://mathworld.wolfram.com/PermutationInvolution.html
"""
idx = list(range(n))
for p in permutations(idx):
for i in idx:
if p[p[i]] != i:
break
else:
yield p
def generate_derangements(perm):
"""
Routine to generate unique derangements.
TODO: This will be rewritten to use the
ECO operator approach once the permutations
branch is in master.
Examples
========
>>> from sympy.utilities.iterables import generate_derangements
>>> list(generate_derangements([0, 1, 2]))
[[1, 2, 0], [2, 0, 1]]
>>> list(generate_derangements([0, 1, 2, 3]))
[[1, 0, 3, 2], [1, 2, 3, 0], [1, 3, 0, 2], [2, 0, 3, 1], \
[2, 3, 0, 1], [2, 3, 1, 0], [3, 0, 1, 2], [3, 2, 0, 1], \
[3, 2, 1, 0]]
>>> list(generate_derangements([0, 1, 1]))
[]
See Also
========
sympy.functions.combinatorial.factorials.subfactorial
"""
p = multiset_permutations(perm)
indices = range(len(perm))
p0 = next(p)
for pi in p:
if all(pi[i] != p0[i] for i in indices):
yield pi
def necklaces(n, k, free=False):
"""
A routine to generate necklaces that may (free=True) or may not
(free=False) be turned over to be viewed. The "necklaces" returned
are comprised of ``n`` integers (beads) with ``k`` different
values (colors). Only unique necklaces are returned.
Examples
========
>>> from sympy.utilities.iterables import necklaces, bracelets
>>> def show(s, i):
... return ''.join(s[j] for j in i)
The "unrestricted necklace" is sometimes also referred to as a
"bracelet" (an object that can be turned over, a sequence that can
be reversed) and the term "necklace" is used to imply a sequence
that cannot be reversed. So ACB == ABC for a bracelet (rotate and
reverse) while the two are different for a necklace since rotation
alone cannot make the two sequences the same.
(mnemonic: Bracelets can be viewed Backwards, but Not Necklaces.)
>>> B = [show('ABC', i) for i in bracelets(3, 3)]
>>> N = [show('ABC', i) for i in necklaces(3, 3)]
>>> set(N) - set(B)
{'ACB'}
>>> list(necklaces(4, 2))
[(0, 0, 0, 0), (0, 0, 0, 1), (0, 0, 1, 1),
(0, 1, 0, 1), (0, 1, 1, 1), (1, 1, 1, 1)]
>>> [show('.o', i) for i in bracelets(4, 2)]
['....', '...o', '..oo', '.o.o', '.ooo', 'oooo']
References
==========
.. [1] http://mathworld.wolfram.com/Necklace.html
"""
return uniq(minlex(i, directed=not free) for i in
variations(list(range(k)), n, repetition=True))
def bracelets(n, k):
"""Wrapper to necklaces to return a free (unrestricted) necklace."""
return necklaces(n, k, free=True)
def generate_oriented_forest(n):
"""
This algorithm generates oriented forests.
An oriented graph is a directed graph having no symmetric pair of directed
edges. A forest is an acyclic graph, i.e., it has no cycles. A forest can
also be described as a disjoint union of trees, which are graphs in which
any two vertices are connected by exactly one simple path.
Examples
========
>>> from sympy.utilities.iterables import generate_oriented_forest
>>> list(generate_oriented_forest(4))
[[0, 1, 2, 3], [0, 1, 2, 2], [0, 1, 2, 1], [0, 1, 2, 0], \
[0, 1, 1, 1], [0, 1, 1, 0], [0, 1, 0, 1], [0, 1, 0, 0], [0, 0, 0, 0]]
References
==========
.. [1] T. Beyer and S.M. Hedetniemi: constant time generation of
rooted trees, SIAM J. Computing Vol. 9, No. 4, November 1980
.. [2] https://stackoverflow.com/questions/1633833/oriented-forest-taocp-algorithm-in-python
"""
P = list(range(-1, n))
while True:
yield P[1:]
if P[n] > 0:
P[n] = P[P[n]]
else:
for p in range(n - 1, 0, -1):
if P[p] != 0:
target = P[p] - 1
for q in range(p - 1, 0, -1):
if P[q] == target:
break
offset = p - q
for i in range(p, n + 1):
P[i] = P[i - offset]
break
else:
break
def minlex(seq, directed=True, is_set=False, small=None):
"""
Return a tuple where the smallest element appears first; if
``directed`` is True (default) then the order is preserved, otherwise
the sequence will be reversed if that gives a smaller ordering.
If every element appears only once then is_set can be set to True
for more efficient processing.
If the smallest element is known at the time of calling, it can be
passed and the calculation of the smallest element will be omitted.
Examples
========
>>> from sympy.combinatorics.polyhedron import minlex
>>> minlex((1, 2, 0))
(0, 1, 2)
>>> minlex((1, 0, 2))
(0, 2, 1)
>>> minlex((1, 0, 2), directed=False)
(0, 1, 2)
>>> minlex('11010011000', directed=True)
'00011010011'
>>> minlex('11010011000', directed=False)
'00011001011'
"""
is_str = isinstance(seq, str)
seq = list(seq)
if small is None:
small = min(seq, key=default_sort_key)
if is_set:
i = seq.index(small)
if not directed:
n = len(seq)
p = (i + 1) % n
m = (i - 1) % n
if default_sort_key(seq[p]) > default_sort_key(seq[m]):
seq = list(reversed(seq))
i = n - i - 1
if i:
seq = rotate_left(seq, i)
best = seq
else:
count = seq.count(small)
if count == 1 and directed:
best = rotate_left(seq, seq.index(small))
else:
# if not directed, and not a set, we can't just
# pass this off to minlex with is_set True since
# peeking at the neighbor may not be sufficient to
# make the decision so we continue...
best = seq
for i in range(count):
seq = rotate_left(seq, seq.index(small, count != 1))
if seq < best:
best = seq
# it's cheaper to rotate now rather than search
# again for these in reversed order so we test
# the reverse now
if not directed:
seq = rotate_left(seq, 1)
seq = list(reversed(seq))
if seq < best:
best = seq
seq = list(reversed(seq))
seq = rotate_right(seq, 1)
# common return
if is_str:
return ''.join(best)
return tuple(best)
def runs(seq, op=gt):
"""Group the sequence into lists in which successive elements
all compare the same with the comparison operator, ``op``:
op(seq[i + 1], seq[i]) is True from all elements in a run.
Examples
========
>>> from sympy.utilities.iterables import runs
>>> from operator import ge
>>> runs([0, 1, 2, 2, 1, 4, 3, 2, 2])
[[0, 1, 2], [2], [1, 4], [3], [2], [2]]
>>> runs([0, 1, 2, 2, 1, 4, 3, 2, 2], op=ge)
[[0, 1, 2, 2], [1, 4], [3], [2, 2]]
"""
cycles = []
seq = iter(seq)
try:
run = [next(seq)]
except StopIteration:
return []
while True:
try:
ei = next(seq)
except StopIteration:
break
if op(ei, run[-1]):
run.append(ei)
continue
else:
cycles.append(run)
run = [ei]
if run:
cycles.append(run)
return cycles
def kbins(l, k, ordered=None):
"""
Return sequence ``l`` partitioned into ``k`` bins.
Examples
========
>>> from sympy.utilities.iterables import kbins
The default is to give the items in the same order, but grouped
into k partitions without any reordering:
>>> from __future__ import print_function
>>> for p in kbins(list(range(5)), 2):
... print(p)
...
[[0], [1, 2, 3, 4]]
[[0, 1], [2, 3, 4]]
[[0, 1, 2], [3, 4]]
[[0, 1, 2, 3], [4]]
The ``ordered`` flag is either None (to give the simple partition
of the elements) or is a 2 digit integer indicating whether the order of
the bins and the order of the items in the bins matters. Given::
A = [[0], [1, 2]]
B = [[1, 2], [0]]
C = [[2, 1], [0]]
D = [[0], [2, 1]]
the following values for ``ordered`` have the shown meanings::
00 means A == B == C == D
01 means A == B
10 means A == D
11 means A == A
>>> for ordered in [None, 0, 1, 10, 11]:
... print('ordered = %s' % ordered)
... for p in kbins(list(range(3)), 2, ordered=ordered):
... print(' %s' % p)
...
ordered = None
[[0], [1, 2]]
[[0, 1], [2]]
ordered = 0
[[0, 1], [2]]
[[0, 2], [1]]
[[0], [1, 2]]
ordered = 1
[[0], [1, 2]]
[[0], [2, 1]]
[[1], [0, 2]]
[[1], [2, 0]]
[[2], [0, 1]]
[[2], [1, 0]]
ordered = 10
[[0, 1], [2]]
[[2], [0, 1]]
[[0, 2], [1]]
[[1], [0, 2]]
[[0], [1, 2]]
[[1, 2], [0]]
ordered = 11
[[0], [1, 2]]
[[0, 1], [2]]
[[0], [2, 1]]
[[0, 2], [1]]
[[1], [0, 2]]
[[1, 0], [2]]
[[1], [2, 0]]
[[1, 2], [0]]
[[2], [0, 1]]
[[2, 0], [1]]
[[2], [1, 0]]
[[2, 1], [0]]
See Also
========
partitions, multiset_partitions
"""
def partition(lista, bins):
# EnricoGiampieri's partition generator from
# https://stackoverflow.com/questions/13131491/
# partition-n-items-into-k-bins-in-python-lazily
if len(lista) == 1 or bins == 1:
yield [lista]
elif len(lista) > 1 and bins > 1:
for i in range(1, len(lista)):
for part in partition(lista[i:], bins - 1):
if len([lista[:i]] + part) == bins:
yield [lista[:i]] + part
if ordered is None:
for p in partition(l, k):
yield p
elif ordered == 11:
for pl in multiset_permutations(l):
pl = list(pl)
for p in partition(pl, k):
yield p
elif ordered == 00:
for p in multiset_partitions(l, k):
yield p
elif ordered == 10:
for p in multiset_partitions(l, k):
for perm in permutations(p):
yield list(perm)
elif ordered == 1:
for kgot, p in partitions(len(l), k, size=True):
if kgot != k:
continue
for li in multiset_permutations(l):
rv = []
i = j = 0
li = list(li)
for size, multiplicity in sorted(p.items()):
for m in range(multiplicity):
j = i + size
rv.append(li[i: j])
i = j
yield rv
else:
raise ValueError(
'ordered must be one of 00, 01, 10 or 11, not %s' % ordered)
def permute_signs(t):
"""Return iterator in which the signs of non-zero elements
of t are permuted.
Examples
========
>>> from sympy.utilities.iterables import permute_signs
>>> list(permute_signs((0, 1, 2)))
[(0, 1, 2), (0, -1, 2), (0, 1, -2), (0, -1, -2)]
"""
for signs in cartes(*[(1, -1)]*(len(t) - t.count(0))):
signs = list(signs)
yield type(t)([i*signs.pop() if i else i for i in t])
def signed_permutations(t):
"""Return iterator in which the signs of non-zero elements
of t and the order of the elements are permuted.
Examples
========
>>> from sympy.utilities.iterables import signed_permutations
>>> list(signed_permutations((0, 1, 2)))
[(0, 1, 2), (0, -1, 2), (0, 1, -2), (0, -1, -2), (0, 2, 1),
(0, -2, 1), (0, 2, -1), (0, -2, -1), (1, 0, 2), (-1, 0, 2),
(1, 0, -2), (-1, 0, -2), (1, 2, 0), (-1, 2, 0), (1, -2, 0),
(-1, -2, 0), (2, 0, 1), (-2, 0, 1), (2, 0, -1), (-2, 0, -1),
(2, 1, 0), (-2, 1, 0), (2, -1, 0), (-2, -1, 0)]
"""
return (type(t)(i) for j in permutations(t)
for i in permute_signs(j))
def rotations(s, dir=1):
"""Return a generator giving the items in s as list where
each subsequent list has the items rotated to the left (default)
or right (dir=-1) relative to the previous list.
Examples
========
>>> from sympy.utilities.iterables import rotations
>>> list(rotations([1,2,3]))
[[1, 2, 3], [2, 3, 1], [3, 1, 2]]
>>> list(rotations([1,2,3], -1))
[[1, 2, 3], [3, 1, 2], [2, 3, 1]]
"""
seq = list(s)
for i in range(len(seq)):
yield seq
seq = rotate_left(seq, dir)
def roundrobin(*iterables):
"""roundrobin recipe taken from itertools documentation:
https://docs.python.org/2/library/itertools.html#recipes
roundrobin('ABC', 'D', 'EF') --> A D E B F C
Recipe credited to George Sakkis
"""
import itertools
nexts = itertools.cycle(iter(it).__next__ for it in iterables)
pending = len(iterables)
while pending:
try:
for next in nexts:
yield next()
except StopIteration:
pending -= 1
nexts = itertools.cycle(itertools.islice(nexts, pending))
|
e22c8599bd2d8c3451d044930327aeec9da780861225f23926cb1c14070bfc27 | from sympy.utilities.exceptions import SymPyDeprecationWarning
SymPyDeprecationWarning(
feature="Import sympy.utilities.runtests",
useinstead="Import from sympy.testing.runtests",
issue=18095,
deprecated_since_version="1.6").warn()
from sympy.testing.runtests import * # noqa:F401
|
763d756fb358b6950ae7761b663a8d6fade55531456caa61c4b8acb4b09a4c7a | from sympy.utilities.exceptions import SymPyDeprecationWarning
SymPyDeprecationWarning(
feature="Import sympy.utilities.randtest",
useinstead="Import from sympy.testing.randtest",
issue=18095,
deprecated_since_version="1.6").warn()
from sympy.testing.randtest import * # noqa:F401
|
6b934fe8861b1aa292556ee5430463f2eeb39ea8a4217fb56ed053bf33029763 | """Miscellaneous stuff that doesn't really fit anywhere else."""
from __future__ import print_function, division
from typing import List
import sys
import os
import re as _re
import struct
from textwrap import fill, dedent
from sympy.core.compatibility import get_function_name, as_int
class Undecidable(ValueError):
# an error to be raised when a decision cannot be made definitively
# where a definitive answer is needed
pass
def filldedent(s, w=70):
"""
Strips leading and trailing empty lines from a copy of `s`, then dedents,
fills and returns it.
Empty line stripping serves to deal with docstrings like this one that
start with a newline after the initial triple quote, inserting an empty
line at the beginning of the string.
See Also
========
strlines, rawlines
"""
return '\n' + fill(dedent(str(s)).strip('\n'), width=w)
def strlines(s, c=64, short=False):
"""Return a cut-and-pastable string that, when printed, is
equivalent to the input. The lines will be surrounded by
parentheses and no line will be longer than c (default 64)
characters. If the line contains newlines characters, the
`rawlines` result will be returned. If ``short`` is True
(default is False) then if there is one line it will be
returned without bounding parentheses.
Examples
========
>>> from sympy.utilities.misc import strlines
>>> q = 'this is a long string that should be broken into shorter lines'
>>> print(strlines(q, 40))
(
'this is a long string that should be b'
'roken into shorter lines'
)
>>> q == (
... 'this is a long string that should be b'
... 'roken into shorter lines'
... )
True
See Also
========
filldedent, rawlines
"""
if type(s) is not str:
raise ValueError('expecting string input')
if '\n' in s:
return rawlines(s)
q = '"' if repr(s).startswith('"') else "'"
q = (q,)*2
if '\\' in s: # use r-string
m = '(\nr%s%%s%s\n)' % q
j = '%s\nr%s' % q
c -= 3
else:
m = '(\n%s%%s%s\n)' % q
j = '%s\n%s' % q
c -= 2
out = []
while s:
out.append(s[:c])
s=s[c:]
if short and len(out) == 1:
return (m % out[0]).splitlines()[1] # strip bounding (\n...\n)
return m % j.join(out)
def rawlines(s):
"""Return a cut-and-pastable string that, when printed, is equivalent
to the input. Use this when there is more than one line in the
string. The string returned is formatted so it can be indented
nicely within tests; in some cases it is wrapped in the dedent
function which has to be imported from textwrap.
Examples
========
Note: because there are characters in the examples below that need
to be escaped because they are themselves within a triple quoted
docstring, expressions below look more complicated than they would
be if they were printed in an interpreter window.
>>> from sympy.utilities.misc import rawlines
>>> from sympy import TableForm
>>> s = str(TableForm([[1, 10]], headings=(None, ['a', 'bee'])))
>>> print(rawlines(s))
(
'a bee\\n'
'-----\\n'
'1 10 '
)
>>> print(rawlines('''this
... that'''))
dedent('''\\
this
that''')
>>> print(rawlines('''this
... that
... '''))
dedent('''\\
this
that
''')
>>> s = \"\"\"this
... is a triple '''
... \"\"\"
>>> print(rawlines(s))
dedent(\"\"\"\\
this
is a triple '''
\"\"\")
>>> print(rawlines('''this
... that
... '''))
(
'this\\n'
'that\\n'
' '
)
See Also
========
filldedent, strlines
"""
lines = s.split('\n')
if len(lines) == 1:
return repr(lines[0])
triple = ["'''" in s, '"""' in s]
if any(li.endswith(' ') for li in lines) or '\\' in s or all(triple):
rv = []
# add on the newlines
trailing = s.endswith('\n')
last = len(lines) - 1
for i, li in enumerate(lines):
if i != last or trailing:
rv.append(repr(li + '\n'))
else:
rv.append(repr(li))
return '(\n %s\n)' % '\n '.join(rv)
else:
rv = '\n '.join(lines)
if triple[0]:
return 'dedent("""\\\n %s""")' % rv
else:
return "dedent('''\\\n %s''')" % rv
ARCH = str(struct.calcsize('P') * 8) + "-bit"
# XXX: PyPy doesn't support hash randomization
HASH_RANDOMIZATION = getattr(sys.flags, 'hash_randomization', False)
_debug_tmp = [] # type: List[str]
_debug_iter = 0
def debug_decorator(func):
"""If SYMPY_DEBUG is True, it will print a nice execution tree with
arguments and results of all decorated functions, else do nothing.
"""
from sympy import SYMPY_DEBUG
if not SYMPY_DEBUG:
return func
def maketree(f, *args, **kw):
global _debug_tmp
global _debug_iter
oldtmp = _debug_tmp
_debug_tmp = []
_debug_iter += 1
def tree(subtrees):
def indent(s, type=1):
x = s.split("\n")
r = "+-%s\n" % x[0]
for a in x[1:]:
if a == "":
continue
if type == 1:
r += "| %s\n" % a
else:
r += " %s\n" % a
return r
if len(subtrees) == 0:
return ""
f = []
for a in subtrees[:-1]:
f.append(indent(a))
f.append(indent(subtrees[-1], 2))
return ''.join(f)
# If there is a bug and the algorithm enters an infinite loop, enable the
# following lines. It will print the names and parameters of all major functions
# that are called, *before* they are called
#from sympy.core.compatibility import reduce
#print("%s%s %s%s" % (_debug_iter, reduce(lambda x, y: x + y, \
# map(lambda x: '-', range(1, 2 + _debug_iter))), get_function_name(f), args))
r = f(*args, **kw)
_debug_iter -= 1
s = "%s%s = %s\n" % (get_function_name(f), args, r)
if _debug_tmp != []:
s += tree(_debug_tmp)
_debug_tmp = oldtmp
_debug_tmp.append(s)
if _debug_iter == 0:
print((_debug_tmp[0]))
_debug_tmp = []
return r
def decorated(*args, **kwargs):
return maketree(func, *args, **kwargs)
return decorated
def debug(*args):
"""
Print ``*args`` if SYMPY_DEBUG is True, else do nothing.
"""
from sympy import SYMPY_DEBUG
if SYMPY_DEBUG:
print(*args, file=sys.stderr)
def find_executable(executable, path=None):
"""Try to find 'executable' in the directories listed in 'path' (a
string listing directories separated by 'os.pathsep'; defaults to
os.environ['PATH']). Returns the complete filename or None if not
found
"""
if path is None:
path = os.environ['PATH']
paths = path.split(os.pathsep)
extlist = ['']
if os.name == 'os2':
(base, ext) = os.path.splitext(executable)
# executable files on OS/2 can have an arbitrary extension, but
# .exe is automatically appended if no dot is present in the name
if not ext:
executable = executable + ".exe"
elif sys.platform == 'win32':
pathext = os.environ['PATHEXT'].lower().split(os.pathsep)
(base, ext) = os.path.splitext(executable)
if ext.lower() not in pathext:
extlist = pathext
for ext in extlist:
execname = executable + ext
if os.path.isfile(execname):
return execname
else:
for p in paths:
f = os.path.join(p, execname)
if os.path.isfile(f):
return f
return None
def func_name(x, short=False):
"""Return function name of `x` (if defined) else the `type(x)`.
If short is True and there is a shorter alias for the result,
return the alias.
Examples
========
>>> from sympy.utilities.misc import func_name
>>> from sympy import Matrix
>>> from sympy.abc import x
>>> func_name(Matrix.eye(3))
'MutableDenseMatrix'
>>> func_name(x < 1)
'StrictLessThan'
>>> func_name(x < 1, short=True)
'Lt'
See Also
========
sympy.core.compatibility get_function_name
"""
alias = {
'GreaterThan': 'Ge',
'StrictGreaterThan': 'Gt',
'LessThan': 'Le',
'StrictLessThan': 'Lt',
'Equality': 'Eq',
'Unequality': 'Ne',
}
typ = type(x)
if str(typ).startswith("<type '"):
typ = str(typ).split("'")[1].split("'")[0]
elif str(typ).startswith("<class '"):
typ = str(typ).split("'")[1].split("'")[0]
rv = getattr(getattr(x, 'func', x), '__name__', typ)
if '.' in rv:
rv = rv.split('.')[-1]
if short:
rv = alias.get(rv, rv)
return rv
def _replace(reps):
"""Return a function that can make the replacements, given in
``reps``, on a string. The replacements should be given as mapping.
Examples
========
>>> from sympy.utilities.misc import _replace
>>> f = _replace(dict(foo='bar', d='t'))
>>> f('food')
'bart'
>>> f = _replace({})
>>> f('food')
'food'
"""
if not reps:
return lambda x: x
D = lambda match: reps[match.group(0)]
pattern = _re.compile("|".join(
[_re.escape(k) for k, v in reps.items()]), _re.M)
return lambda string: pattern.sub(D, string)
def replace(string, *reps):
"""Return ``string`` with all keys in ``reps`` replaced with
their corresponding values, longer strings first, irrespective
of the order they are given. ``reps`` may be passed as tuples
or a single mapping.
Examples
========
>>> from sympy.utilities.misc import replace
>>> replace('foo', {'oo': 'ar', 'f': 'b'})
'bar'
>>> replace("spamham sha", ("spam", "eggs"), ("sha","md5"))
'eggsham md5'
There is no guarantee that a unique answer will be
obtained if keys in a mapping overlap (i.e. are the same
length and have some identical sequence at the
beginning/end):
>>> reps = [
... ('ab', 'x'),
... ('bc', 'y')]
>>> replace('abc', *reps) in ('xc', 'ay')
True
References
==========
.. [1] https://stackoverflow.com/questions/6116978/python-replace-multiple-strings
"""
if len(reps) == 1:
kv = reps[0]
if type(kv) is dict:
reps = kv
else:
return string.replace(*kv)
else:
reps = dict(reps)
return _replace(reps)(string)
def translate(s, a, b=None, c=None):
"""Return ``s`` where characters have been replaced or deleted.
SYNTAX
======
translate(s, None, deletechars):
all characters in ``deletechars`` are deleted
translate(s, map [,deletechars]):
all characters in ``deletechars`` (if provided) are deleted
then the replacements defined by map are made; if the keys
of map are strings then the longer ones are handled first.
Multicharacter deletions should have a value of ''.
translate(s, oldchars, newchars, deletechars)
all characters in ``deletechars`` are deleted
then each character in ``oldchars`` is replaced with the
corresponding character in ``newchars``
Examples
========
>>> from sympy.utilities.misc import translate
>>> abc = 'abc'
>>> translate(abc, None, 'a')
'bc'
>>> translate(abc, {'a': 'x'}, 'c')
'xb'
>>> translate(abc, {'abc': 'x', 'a': 'y'})
'x'
>>> translate('abcd', 'ac', 'AC', 'd')
'AbC'
There is no guarantee that a unique answer will be
obtained if keys in a mapping overlap are the same
length and have some identical sequences at the
beginning/end:
>>> translate(abc, {'ab': 'x', 'bc': 'y'}) in ('xc', 'ay')
True
"""
mr = {}
if a is None:
if c is not None:
raise ValueError('c should be None when a=None is passed, instead got %s' % c)
if b is None:
return s
c = b
a = b = ''
else:
if type(a) is dict:
short = {}
for k in list(a.keys()):
if len(k) == 1 and len(a[k]) == 1:
short[k] = a.pop(k)
mr = a
c = b
if short:
a, b = [''.join(i) for i in list(zip(*short.items()))]
else:
a = b = ''
elif len(a) != len(b):
raise ValueError('oldchars and newchars have different lengths')
if c:
val = str.maketrans('', '', c)
s = s.translate(val)
s = replace(s, mr)
n = str.maketrans(a, b)
return s.translate(n)
def ordinal(num):
"""Return ordinal number string of num, e.g. 1 becomes 1st.
"""
# modified from https://codereview.stackexchange.com/questions/41298/producing-ordinal-numbers
n = as_int(num)
k = abs(n) % 100
if 11 <= k <= 13:
suffix = 'th'
elif k % 10 == 1:
suffix = 'st'
elif k % 10 == 2:
suffix = 'nd'
elif k % 10 == 3:
suffix = 'rd'
else:
suffix = 'th'
return str(n) + suffix
|
323f2ccdb619e01139f87309ae6d68cb6ecfb8d91c6cd3cec9524a9220cfd574 | from sympy.utilities.exceptions import SymPyDeprecationWarning
SymPyDeprecationWarning(
feature="Import sympy.utilities.tmpfiles",
useinstead="Import from sympy.testing.tmpfiles",
issue=18095,
deprecated_since_version="1.6").warn()
from sympy.testing.tmpfiles import * # noqa:F401
|
f048ca70772221d54ec1ed5c5c6e8f41b3da7502bac16a39031823ce205c21d7 | """
C++ code printer
"""
from __future__ import (absolute_import, division, print_function)
from itertools import chain
from sympy.codegen.ast import Type, none
from .ccode import C89CodePrinter, C99CodePrinter
# from http://en.cppreference.com/w/cpp/keyword
reserved = {
'C++98': [
'and', 'and_eq', 'asm', 'auto', 'bitand', 'bitor', 'bool', 'break',
'case', 'catch,', 'char', 'class', 'compl', 'const', 'const_cast',
'continue', 'default', 'delete', 'do', 'double', 'dynamic_cast',
'else', 'enum', 'explicit', 'export', 'extern', 'false', 'float',
'for', 'friend', 'goto', 'if', 'inline', 'int', 'long', 'mutable',
'namespace', 'new', 'not', 'not_eq', 'operator', 'or', 'or_eq',
'private', 'protected', 'public', 'register', 'reinterpret_cast',
'return', 'short', 'signed', 'sizeof', 'static', 'static_cast',
'struct', 'switch', 'template', 'this', 'throw', 'true', 'try',
'typedef', 'typeid', 'typename', 'union', 'unsigned', 'using',
'virtual', 'void', 'volatile', 'wchar_t', 'while', 'xor', 'xor_eq'
]
}
reserved['C++11'] = reserved['C++98'][:] + [
'alignas', 'alignof', 'char16_t', 'char32_t', 'constexpr', 'decltype',
'noexcept', 'nullptr', 'static_assert', 'thread_local'
]
reserved['C++17'] = reserved['C++11'][:]
reserved['C++17'].remove('register')
# TM TS: atomic_cancel, atomic_commit, atomic_noexcept, synchronized
# concepts TS: concept, requires
# module TS: import, module
_math_functions = {
'C++98': {
'Mod': 'fmod',
'ceiling': 'ceil',
},
'C++11': {
'gamma': 'tgamma',
},
'C++17': {
'beta': 'beta',
'Ei': 'expint',
'zeta': 'riemann_zeta',
}
}
# from http://en.cppreference.com/w/cpp/header/cmath
for k in ('Abs', 'exp', 'log', 'log10', 'sqrt', 'sin', 'cos', 'tan', # 'Pow'
'asin', 'acos', 'atan', 'atan2', 'sinh', 'cosh', 'tanh', 'floor'):
_math_functions['C++98'][k] = k.lower()
for k in ('asinh', 'acosh', 'atanh', 'erf', 'erfc'):
_math_functions['C++11'][k] = k.lower()
def _attach_print_method(cls, sympy_name, func_name):
meth_name = '_print_%s' % sympy_name
if hasattr(cls, meth_name):
raise ValueError("Edit method (or subclass) instead of overwriting.")
def _print_method(self, expr):
return '{0}{1}({2})'.format(self._ns, func_name, ', '.join(map(self._print, expr.args)))
_print_method.__doc__ = "Prints code for %s" % k
setattr(cls, meth_name, _print_method)
def _attach_print_methods(cls, cont):
for sympy_name, cxx_name in cont[cls.standard].items():
_attach_print_method(cls, sympy_name, cxx_name)
class _CXXCodePrinterBase(object):
printmethod = "_cxxcode"
language = 'C++'
_ns = 'std::' # namespace
def __init__(self, settings=None):
super(_CXXCodePrinterBase, self).__init__(settings or {})
def _print_Max(self, expr):
from sympy import Max
if len(expr.args) == 1:
return self._print(expr.args[0])
return "%smax(%s, %s)" % (self._ns, expr.args[0], self._print(Max(*expr.args[1:])))
def _print_Min(self, expr):
from sympy import Min
if len(expr.args) == 1:
return self._print(expr.args[0])
return "%smin(%s, %s)" % (self._ns, expr.args[0], self._print(Min(*expr.args[1:])))
def _print_using(self, expr):
if expr.alias == none:
return 'using %s' % expr.type
else:
raise ValueError("C++98 does not support type aliases")
class CXX98CodePrinter(_CXXCodePrinterBase, C89CodePrinter):
standard = 'C++98'
reserved_words = set(reserved['C++98'])
# _attach_print_methods(CXX98CodePrinter, _math_functions)
class CXX11CodePrinter(_CXXCodePrinterBase, C99CodePrinter):
standard = 'C++11'
reserved_words = set(reserved['C++11'])
type_mappings = dict(chain(
CXX98CodePrinter.type_mappings.items(),
{
Type('int8'): ('int8_t', {'cstdint'}),
Type('int16'): ('int16_t', {'cstdint'}),
Type('int32'): ('int32_t', {'cstdint'}),
Type('int64'): ('int64_t', {'cstdint'}),
Type('uint8'): ('uint8_t', {'cstdint'}),
Type('uint16'): ('uint16_t', {'cstdint'}),
Type('uint32'): ('uint32_t', {'cstdint'}),
Type('uint64'): ('uint64_t', {'cstdint'}),
Type('complex64'): ('std::complex<float>', {'complex'}),
Type('complex128'): ('std::complex<double>', {'complex'}),
Type('bool'): ('bool', None),
}.items()
))
def _print_using(self, expr):
if expr.alias == none:
return super(CXX11CodePrinter, self)._print_using(expr)
else:
return 'using %(alias)s = %(type)s' % expr.kwargs(apply=self._print)
# _attach_print_methods(CXX11CodePrinter, _math_functions)
class CXX17CodePrinter(_CXXCodePrinterBase, C99CodePrinter):
standard = 'C++17'
reserved_words = set(reserved['C++17'])
_kf = dict(C99CodePrinter._kf, **_math_functions['C++17'])
def _print_beta(self, expr):
return self._print_math_func(expr)
def _print_Ei(self, expr):
return self._print_math_func(expr)
def _print_zeta(self, expr):
return self._print_math_func(expr)
# _attach_print_methods(CXX17CodePrinter, _math_functions)
cxx_code_printers = {
'c++98': CXX98CodePrinter,
'c++11': CXX11CodePrinter,
'c++17': CXX17CodePrinter
}
def cxxcode(expr, assign_to=None, standard='c++11', **settings):
""" C++ equivalent of :func:`~.ccode`. """
return cxx_code_printers[standard.lower()](settings).doprint(expr, assign_to)
|
144b27a1bc114ed3e358276462da1bd295a7620f86e8a4d7221eee52df88f48e | """
Python code printers
This module contains python code printers for plain python as well as NumPy & SciPy enabled code.
"""
from collections import defaultdict
from itertools import chain
from sympy.core import S
from .precedence import precedence
from .codeprinter import CodePrinter
_kw_py2and3 = {
'and', 'as', 'assert', 'break', 'class', 'continue', 'def', 'del', 'elif',
'else', 'except', 'finally', 'for', 'from', 'global', 'if', 'import', 'in',
'is', 'lambda', 'not', 'or', 'pass', 'raise', 'return', 'try', 'while',
'with', 'yield', 'None' # 'None' is actually not in Python 2's keyword.kwlist
}
_kw_only_py2 = {'exec', 'print'}
_kw_only_py3 = {'False', 'nonlocal', 'True'}
_known_functions = {
'Abs': 'abs',
}
_known_functions_math = {
'acos': 'acos',
'acosh': 'acosh',
'asin': 'asin',
'asinh': 'asinh',
'atan': 'atan',
'atan2': 'atan2',
'atanh': 'atanh',
'ceiling': 'ceil',
'cos': 'cos',
'cosh': 'cosh',
'erf': 'erf',
'erfc': 'erfc',
'exp': 'exp',
'expm1': 'expm1',
'factorial': 'factorial',
'floor': 'floor',
'gamma': 'gamma',
'hypot': 'hypot',
'loggamma': 'lgamma',
'log': 'log',
'ln': 'log',
'log10': 'log10',
'log1p': 'log1p',
'log2': 'log2',
'sin': 'sin',
'sinh': 'sinh',
'Sqrt': 'sqrt',
'tan': 'tan',
'tanh': 'tanh'
} # Not used from ``math``: [copysign isclose isfinite isinf isnan ldexp frexp pow modf
# radians trunc fmod fsum gcd degrees fabs]
_known_constants_math = {
'Exp1': 'e',
'Pi': 'pi',
'E': 'e'
# Only in python >= 3.5:
# 'Infinity': 'inf',
# 'NaN': 'nan'
}
def _print_known_func(self, expr):
known = self.known_functions[expr.__class__.__name__]
return '{name}({args})'.format(name=self._module_format(known),
args=', '.join(map(lambda arg: self._print(arg), expr.args)))
def _print_known_const(self, expr):
known = self.known_constants[expr.__class__.__name__]
return self._module_format(known)
class AbstractPythonCodePrinter(CodePrinter):
printmethod = "_pythoncode"
language = "Python"
reserved_words = _kw_py2and3.union(_kw_only_py3)
modules = None # initialized to a set in __init__
tab = ' '
_kf = dict(chain(
_known_functions.items(),
[(k, 'math.' + v) for k, v in _known_functions_math.items()]
))
_kc = {k: 'math.'+v for k, v in _known_constants_math.items()}
_operators = {'and': 'and', 'or': 'or', 'not': 'not'}
_default_settings = dict(
CodePrinter._default_settings,
user_functions={},
precision=17,
inline=True,
fully_qualified_modules=True,
contract=False,
standard='python3',
)
def __init__(self, settings=None):
super(AbstractPythonCodePrinter, self).__init__(settings)
# XXX Remove after dropping python 2 support.
# Python standard handler
std = self._settings['standard']
if std is None:
import sys
std = 'python{}'.format(sys.version_info.major)
if std not in ('python2', 'python3'):
raise ValueError('Unrecognized python standard : {}'.format(std))
self.standard = std
self.module_imports = defaultdict(set)
# Known functions and constants handler
self.known_functions = dict(self._kf, **(settings or {}).get(
'user_functions', {}))
self.known_constants = dict(self._kc, **(settings or {}).get(
'user_constants', {}))
def _declare_number_const(self, name, value):
return "%s = %s" % (name, value)
def _module_format(self, fqn, register=True):
parts = fqn.split('.')
if register and len(parts) > 1:
self.module_imports['.'.join(parts[:-1])].add(parts[-1])
if self._settings['fully_qualified_modules']:
return fqn
else:
return fqn.split('(')[0].split('[')[0].split('.')[-1]
def _format_code(self, lines):
return lines
def _get_statement(self, codestring):
return "{}".format(codestring)
def _get_comment(self, text):
return " # {0}".format(text)
def _expand_fold_binary_op(self, op, args):
"""
This method expands a fold on binary operations.
``functools.reduce`` is an example of a folded operation.
For example, the expression
`A + B + C + D`
is folded into
`((A + B) + C) + D`
"""
if len(args) == 1:
return self._print(args[0])
else:
return "%s(%s, %s)" % (
self._module_format(op),
self._expand_fold_binary_op(op, args[:-1]),
self._print(args[-1]),
)
def _expand_reduce_binary_op(self, op, args):
"""
This method expands a reductin on binary operations.
Notice: this is NOT the same as ``functools.reduce``.
For example, the expression
`A + B + C + D`
is reduced into:
`(A + B) + (C + D)`
"""
if len(args) == 1:
return self._print(args[0])
else:
N = len(args)
Nhalf = N // 2
return "%s(%s, %s)" % (
self._module_format(op),
self._expand_reduce_binary_op(args[:Nhalf]),
self._expand_reduce_binary_op(args[Nhalf:]),
)
def _get_einsum_string(self, subranks, contraction_indices):
letters = self._get_letter_generator_for_einsum()
contraction_string = ""
counter = 0
d = {j: min(i) for i in contraction_indices for j in i}
indices = []
for rank_arg in subranks:
lindices = []
for i in range(rank_arg):
if counter in d:
lindices.append(d[counter])
else:
lindices.append(counter)
counter += 1
indices.append(lindices)
mapping = {}
letters_free = []
letters_dum = []
for i in indices:
for j in i:
if j not in mapping:
l = next(letters)
mapping[j] = l
else:
l = mapping[j]
contraction_string += l
if j in d:
if l not in letters_dum:
letters_dum.append(l)
else:
letters_free.append(l)
contraction_string += ","
contraction_string = contraction_string[:-1]
return contraction_string, letters_free, letters_dum
def _print_NaN(self, expr):
return "float('nan')"
def _print_Infinity(self, expr):
return "float('inf')"
def _print_NegativeInfinity(self, expr):
return "float('-inf')"
def _print_ComplexInfinity(self, expr):
return self._print_NaN(expr)
def _print_Mod(self, expr):
PREC = precedence(expr)
return ('{0} % {1}'.format(*map(lambda x: self.parenthesize(x, PREC), expr.args)))
def _print_Piecewise(self, expr):
result = []
i = 0
for arg in expr.args:
e = arg.expr
c = arg.cond
if i == 0:
result.append('(')
result.append('(')
result.append(self._print(e))
result.append(')')
result.append(' if ')
result.append(self._print(c))
result.append(' else ')
i += 1
result = result[:-1]
if result[-1] == 'True':
result = result[:-2]
result.append(')')
else:
result.append(' else None)')
return ''.join(result)
def _print_Relational(self, expr):
"Relational printer for Equality and Unequality"
op = {
'==' :'equal',
'!=' :'not_equal',
'<' :'less',
'<=' :'less_equal',
'>' :'greater',
'>=' :'greater_equal',
}
if expr.rel_op in op:
lhs = self._print(expr.lhs)
rhs = self._print(expr.rhs)
return '({lhs} {op} {rhs})'.format(op=expr.rel_op, lhs=lhs, rhs=rhs)
return super(AbstractPythonCodePrinter, self)._print_Relational(expr)
def _print_ITE(self, expr):
from sympy.functions.elementary.piecewise import Piecewise
return self._print(expr.rewrite(Piecewise))
def _print_Sum(self, expr):
loops = (
'for {i} in range({a}, {b}+1)'.format(
i=self._print(i),
a=self._print(a),
b=self._print(b))
for i, a, b in expr.limits)
return '(builtins.sum({function} {loops}))'.format(
function=self._print(expr.function),
loops=' '.join(loops))
def _print_ImaginaryUnit(self, expr):
return '1j'
def _print_KroneckerDelta(self, expr):
a, b = expr.args
return '(1 if {a} == {b} else 0)'.format(
a = self._print(a),
b = self._print(b)
)
def _print_MatrixBase(self, expr):
name = expr.__class__.__name__
func = self.known_functions.get(name, name)
return "%s(%s)" % (func, self._print(expr.tolist()))
_print_SparseMatrix = \
_print_MutableSparseMatrix = \
_print_ImmutableSparseMatrix = \
_print_Matrix = \
_print_DenseMatrix = \
_print_MutableDenseMatrix = \
_print_ImmutableMatrix = \
_print_ImmutableDenseMatrix = \
lambda self, expr: self._print_MatrixBase(expr)
def _indent_codestring(self, codestring):
return '\n'.join([self.tab + line for line in codestring.split('\n')])
def _print_FunctionDefinition(self, fd):
body = '\n'.join(map(lambda arg: self._print(arg), fd.body))
return "def {name}({parameters}):\n{body}".format(
name=self._print(fd.name),
parameters=', '.join([self._print(var.symbol) for var in fd.parameters]),
body=self._indent_codestring(body)
)
def _print_While(self, whl):
body = '\n'.join(map(lambda arg: self._print(arg), whl.body))
return "while {cond}:\n{body}".format(
cond=self._print(whl.condition),
body=self._indent_codestring(body)
)
def _print_Declaration(self, decl):
return '%s = %s' % (
self._print(decl.variable.symbol),
self._print(decl.variable.value)
)
def _print_Return(self, ret):
arg, = ret.args
return 'return %s' % self._print(arg)
def _print_Print(self, prnt):
print_args = ', '.join(map(lambda arg: self._print(arg), prnt.print_args))
if prnt.format_string != None: # Must be '!= None', cannot be 'is not None'
print_args = '{0} % ({1})'.format(
self._print(prnt.format_string), print_args)
if prnt.file != None: # Must be '!= None', cannot be 'is not None'
print_args += ', file=%s' % self._print(prnt.file)
# XXX Remove after dropping python 2 support.
if self.standard == 'python2':
return 'print %s' % print_args
return 'print(%s)' % print_args
def _print_Stream(self, strm):
if str(strm.name) == 'stdout':
return self._module_format('sys.stdout')
elif str(strm.name) == 'stderr':
return self._module_format('sys.stderr')
else:
return self._print(strm.name)
def _print_NoneToken(self, arg):
return 'None'
class PythonCodePrinter(AbstractPythonCodePrinter):
def _print_sign(self, e):
return '(0.0 if {e} == 0 else {f}(1, {e}))'.format(
f=self._module_format('math.copysign'), e=self._print(e.args[0]))
def _print_Not(self, expr):
PREC = precedence(expr)
return self._operators['not'] + self.parenthesize(expr.args[0], PREC)
def _print_Indexed(self, expr):
base = expr.args[0]
index = expr.args[1:]
return "{}[{}]".format(str(base), ", ".join([self._print(ind) for ind in index]))
def _hprint_Pow(self, expr, rational=False, sqrt='math.sqrt'):
"""Printing helper function for ``Pow``
Notes
=====
This only preprocesses the ``sqrt`` as math formatter
Examples
========
>>> from sympy.functions import sqrt
>>> from sympy.printing.pycode import PythonCodePrinter
>>> from sympy.abc import x
Python code printer automatically looks up ``math.sqrt``.
>>> printer = PythonCodePrinter({'standard':'python3'})
>>> printer._hprint_Pow(sqrt(x), rational=True)
'x**(1/2)'
>>> printer._hprint_Pow(sqrt(x), rational=False)
'math.sqrt(x)'
>>> printer._hprint_Pow(1/sqrt(x), rational=True)
'x**(-1/2)'
>>> printer._hprint_Pow(1/sqrt(x), rational=False)
'1/math.sqrt(x)'
Using sqrt from numpy or mpmath
>>> printer._hprint_Pow(sqrt(x), sqrt='numpy.sqrt')
'numpy.sqrt(x)'
>>> printer._hprint_Pow(sqrt(x), sqrt='mpmath.sqrt')
'mpmath.sqrt(x)'
See Also
========
sympy.printing.str.StrPrinter._print_Pow
"""
PREC = precedence(expr)
if expr.exp == S.Half and not rational:
func = self._module_format(sqrt)
arg = self._print(expr.base)
return '{func}({arg})'.format(func=func, arg=arg)
if expr.is_commutative:
if -expr.exp is S.Half and not rational:
func = self._module_format(sqrt)
num = self._print(S.One)
arg = self._print(expr.base)
return "{num}/{func}({arg})".format(
num=num, func=func, arg=arg)
base_str = self.parenthesize(expr.base, PREC, strict=False)
exp_str = self.parenthesize(expr.exp, PREC, strict=False)
return "{}**{}".format(base_str, exp_str)
def _print_Pow(self, expr, rational=False):
return self._hprint_Pow(expr, rational=rational)
def _print_Rational(self, expr):
# XXX Remove after dropping python 2 support.
if self.standard == 'python2':
return '{}./{}.'.format(expr.p, expr.q)
return '{}/{}'.format(expr.p, expr.q)
def _print_Half(self, expr):
return self._print_Rational(expr)
_print_lowergamma = CodePrinter._print_not_supported
_print_uppergamma = CodePrinter._print_not_supported
_print_fresnelc = CodePrinter._print_not_supported
_print_fresnels = CodePrinter._print_not_supported
for k in PythonCodePrinter._kf:
setattr(PythonCodePrinter, '_print_%s' % k, _print_known_func)
for k in _known_constants_math:
setattr(PythonCodePrinter, '_print_%s' % k, _print_known_const)
def pycode(expr, **settings):
""" Converts an expr to a string of Python code
Parameters
==========
expr : Expr
A SymPy expression.
fully_qualified_modules : bool
Whether or not to write out full module names of functions
(``math.sin`` vs. ``sin``). default: ``True``.
standard : str or None, optional
If 'python2', Python 2 sematics will be used.
If 'python3', Python 3 sematics will be used.
If None, the standard will be automatically detected.
Default is 'python3'. And this parameter may be removed in the
future.
Examples
========
>>> from sympy import tan, Symbol
>>> from sympy.printing.pycode import pycode
>>> pycode(tan(Symbol('x')) + 1)
'math.tan(x) + 1'
"""
return PythonCodePrinter(settings).doprint(expr)
_not_in_mpmath = 'log1p log2'.split()
_in_mpmath = [(k, v) for k, v in _known_functions_math.items() if k not in _not_in_mpmath]
_known_functions_mpmath = dict(_in_mpmath, **{
'beta': 'beta',
'fresnelc': 'fresnelc',
'fresnels': 'fresnels',
'sign': 'sign',
})
_known_constants_mpmath = {
'Exp1': 'e',
'Pi': 'pi',
'GoldenRatio': 'phi',
'EulerGamma': 'euler',
'Catalan': 'catalan',
'NaN': 'nan',
'Infinity': 'inf',
'NegativeInfinity': 'ninf'
}
class MpmathPrinter(PythonCodePrinter):
"""
Lambda printer for mpmath which maintains precision for floats
"""
printmethod = "_mpmathcode"
language = "Python with mpmath"
_kf = dict(chain(
_known_functions.items(),
[(k, 'mpmath.' + v) for k, v in _known_functions_mpmath.items()]
))
_kc = {k: 'mpmath.'+v for k, v in _known_constants_mpmath.items()}
def _print_Float(self, e):
# XXX: This does not handle setting mpmath.mp.dps. It is assumed that
# the caller of the lambdified function will have set it to sufficient
# precision to match the Floats in the expression.
# Remove 'mpz' if gmpy is installed.
args = str(tuple(map(int, e._mpf_)))
return '{func}({args})'.format(func=self._module_format('mpmath.mpf'), args=args)
def _print_Rational(self, e):
return "{func}({p})/{func}({q})".format(
func=self._module_format('mpmath.mpf'),
q=self._print(e.q),
p=self._print(e.p)
)
def _print_Half(self, e):
return self._print_Rational(e)
def _print_uppergamma(self, e):
return "{0}({1}, {2}, {3})".format(
self._module_format('mpmath.gammainc'),
self._print(e.args[0]),
self._print(e.args[1]),
self._module_format('mpmath.inf'))
def _print_lowergamma(self, e):
return "{0}({1}, 0, {2})".format(
self._module_format('mpmath.gammainc'),
self._print(e.args[0]),
self._print(e.args[1]))
def _print_log2(self, e):
return '{0}({1})/{0}(2)'.format(
self._module_format('mpmath.log'), self._print(e.args[0]))
def _print_log1p(self, e):
return '{0}({1}+1)'.format(
self._module_format('mpmath.log'), self._print(e.args[0]))
def _print_Pow(self, expr, rational=False):
return self._hprint_Pow(expr, rational=rational, sqrt='mpmath.sqrt')
for k in MpmathPrinter._kf:
setattr(MpmathPrinter, '_print_%s' % k, _print_known_func)
for k in _known_constants_mpmath:
setattr(MpmathPrinter, '_print_%s' % k, _print_known_const)
_not_in_numpy = 'erf erfc factorial gamma loggamma'.split()
_in_numpy = [(k, v) for k, v in _known_functions_math.items() if k not in _not_in_numpy]
_known_functions_numpy = dict(_in_numpy, **{
'acos': 'arccos',
'acosh': 'arccosh',
'asin': 'arcsin',
'asinh': 'arcsinh',
'atan': 'arctan',
'atan2': 'arctan2',
'atanh': 'arctanh',
'exp2': 'exp2',
'sign': 'sign',
})
_known_constants_numpy = {
'Exp1': 'e',
'Pi': 'pi',
'EulerGamma': 'euler_gamma',
'NaN': 'nan',
'Infinity': 'PINF',
'NegativeInfinity': 'NINF'
}
class NumPyPrinter(PythonCodePrinter):
"""
Numpy printer which handles vectorized piecewise functions,
logical operators, etc.
"""
printmethod = "_numpycode"
language = "Python with NumPy"
_kf = dict(chain(
PythonCodePrinter._kf.items(),
[(k, 'numpy.' + v) for k, v in _known_functions_numpy.items()]
))
_kc = {k: 'numpy.'+v for k, v in _known_constants_numpy.items()}
def _print_seq(self, seq):
"General sequence printer: converts to tuple"
# Print tuples here instead of lists because numba supports
# tuples in nopython mode.
delimiter=', '
return '({},)'.format(delimiter.join(self._print(item) for item in seq))
def _print_MatMul(self, expr):
"Matrix multiplication printer"
if expr.as_coeff_matrices()[0] is not S.One:
expr_list = expr.as_coeff_matrices()[1]+[(expr.as_coeff_matrices()[0])]
return '({0})'.format(').dot('.join(self._print(i) for i in expr_list))
return '({0})'.format(').dot('.join(self._print(i) for i in expr.args))
def _print_MatPow(self, expr):
"Matrix power printer"
return '{0}({1}, {2})'.format(self._module_format('numpy.linalg.matrix_power'),
self._print(expr.args[0]), self._print(expr.args[1]))
def _print_Inverse(self, expr):
"Matrix inverse printer"
return '{0}({1})'.format(self._module_format('numpy.linalg.inv'),
self._print(expr.args[0]))
def _print_DotProduct(self, expr):
# DotProduct allows any shape order, but numpy.dot does matrix
# multiplication, so we have to make sure it gets 1 x n by n x 1.
arg1, arg2 = expr.args
if arg1.shape[0] != 1:
arg1 = arg1.T
if arg2.shape[1] != 1:
arg2 = arg2.T
return "%s(%s, %s)" % (self._module_format('numpy.dot'),
self._print(arg1),
self._print(arg2))
def _print_MatrixSolve(self, expr):
return "%s(%s, %s)" % (self._module_format('numpy.linalg.solve'),
self._print(expr.matrix),
self._print(expr.vector))
def _print_ZeroMatrix(self, expr):
return '{}({})'.format(self._module_format('numpy.zeros'),
self._print(expr.shape))
def _print_OneMatrix(self, expr):
return '{}({})'.format(self._module_format('numpy.ones'),
self._print(expr.shape))
def _print_FunctionMatrix(self, expr):
from sympy.core.function import Lambda
from sympy.abc import i, j
lamda = expr.lamda
if not isinstance(lamda, Lambda):
lamda = Lambda((i, j), lamda(i, j))
return '{}(lambda {}: {}, {})'.format(self._module_format('numpy.fromfunction'),
', '.join(self._print(arg) for arg in lamda.args[0]),
self._print(lamda.args[1]), self._print(expr.shape))
def _print_HadamardProduct(self, expr):
func = self._module_format('numpy.multiply')
return ''.join('{}({}, '.format(func, self._print(arg)) \
for arg in expr.args[:-1]) + "{}{}".format(self._print(expr.args[-1]),
')' * (len(expr.args) - 1))
def _print_KroneckerProduct(self, expr):
func = self._module_format('numpy.kron')
return ''.join('{}({}, '.format(func, self._print(arg)) \
for arg in expr.args[:-1]) + "{}{}".format(self._print(expr.args[-1]),
')' * (len(expr.args) - 1))
def _print_Adjoint(self, expr):
return '{}({}({}))'.format(
self._module_format('numpy.conjugate'),
self._module_format('numpy.transpose'),
self._print(expr.args[0]))
def _print_DiagonalOf(self, expr):
vect = '{}({})'.format(
self._module_format('numpy.diag'),
self._print(expr.arg))
return '{}({}, (-1, 1))'.format(
self._module_format('numpy.reshape'), vect)
def _print_DiagMatrix(self, expr):
return '{}({})'.format(self._module_format('numpy.diagflat'),
self._print(expr.args[0]))
def _print_DiagonalMatrix(self, expr):
return '{}({}, {}({}, {}))'.format(self._module_format('numpy.multiply'),
self._print(expr.arg), self._module_format('numpy.eye'),
self._print(expr.shape[0]), self._print(expr.shape[1]))
def _print_Piecewise(self, expr):
"Piecewise function printer"
exprs = '[{0}]'.format(','.join(self._print(arg.expr) for arg in expr.args))
conds = '[{0}]'.format(','.join(self._print(arg.cond) for arg in expr.args))
# If [default_value, True] is a (expr, cond) sequence in a Piecewise object
# it will behave the same as passing the 'default' kwarg to select()
# *as long as* it is the last element in expr.args.
# If this is not the case, it may be triggered prematurely.
return '{0}({1}, {2}, default={3})'.format(
self._module_format('numpy.select'), conds, exprs,
self._print(S.NaN))
def _print_Relational(self, expr):
"Relational printer for Equality and Unequality"
op = {
'==' :'equal',
'!=' :'not_equal',
'<' :'less',
'<=' :'less_equal',
'>' :'greater',
'>=' :'greater_equal',
}
if expr.rel_op in op:
lhs = self._print(expr.lhs)
rhs = self._print(expr.rhs)
return '{op}({lhs}, {rhs})'.format(op=self._module_format('numpy.'+op[expr.rel_op]),
lhs=lhs, rhs=rhs)
return super(NumPyPrinter, self)._print_Relational(expr)
def _print_And(self, expr):
"Logical And printer"
# We have to override LambdaPrinter because it uses Python 'and' keyword.
# If LambdaPrinter didn't define it, we could use StrPrinter's
# version of the function and add 'logical_and' to NUMPY_TRANSLATIONS.
return '{0}.reduce(({1}))'.format(self._module_format('numpy.logical_and'), ','.join(self._print(i) for i in expr.args))
def _print_Or(self, expr):
"Logical Or printer"
# We have to override LambdaPrinter because it uses Python 'or' keyword.
# If LambdaPrinter didn't define it, we could use StrPrinter's
# version of the function and add 'logical_or' to NUMPY_TRANSLATIONS.
return '{0}.reduce(({1}))'.format(self._module_format('numpy.logical_or'), ','.join(self._print(i) for i in expr.args))
def _print_Not(self, expr):
"Logical Not printer"
# We have to override LambdaPrinter because it uses Python 'not' keyword.
# If LambdaPrinter didn't define it, we would still have to define our
# own because StrPrinter doesn't define it.
return '{0}({1})'.format(self._module_format('numpy.logical_not'), ','.join(self._print(i) for i in expr.args))
def _print_Pow(self, expr, rational=False):
# XXX Workaround for negative integer power error
if expr.exp.is_integer and expr.exp.is_negative:
expr = expr.base ** expr.exp.evalf()
return self._hprint_Pow(expr, rational=rational, sqrt='numpy.sqrt')
def _print_Min(self, expr):
return '{0}(({1}))'.format(self._module_format('numpy.amin'), ','.join(self._print(i) for i in expr.args))
def _print_Max(self, expr):
return '{0}(({1}))'.format(self._module_format('numpy.amax'), ','.join(self._print(i) for i in expr.args))
def _print_arg(self, expr):
return "%s(%s)" % (self._module_format('numpy.angle'), self._print(expr.args[0]))
def _print_im(self, expr):
return "%s(%s)" % (self._module_format('numpy.imag'), self._print(expr.args[0]))
def _print_Mod(self, expr):
return "%s(%s)" % (self._module_format('numpy.mod'), ', '.join(
map(lambda arg: self._print(arg), expr.args)))
def _print_re(self, expr):
return "%s(%s)" % (self._module_format('numpy.real'), self._print(expr.args[0]))
def _print_sinc(self, expr):
return "%s(%s)" % (self._module_format('numpy.sinc'), self._print(expr.args[0]/S.Pi))
def _print_MatrixBase(self, expr):
func = self.known_functions.get(expr.__class__.__name__, None)
if func is None:
func = self._module_format('numpy.array')
return "%s(%s)" % (func, self._print(expr.tolist()))
def _print_Identity(self, expr):
shape = expr.shape
if all([dim.is_Integer for dim in shape]):
return "%s(%s)" % (self._module_format('numpy.eye'), self._print(expr.shape[0]))
else:
raise NotImplementedError("Symbolic matrix dimensions are not yet supported for identity matrices")
def _print_BlockMatrix(self, expr):
return '{0}({1})'.format(self._module_format('numpy.block'),
self._print(expr.args[0].tolist()))
def _print_CodegenArrayTensorProduct(self, expr):
array_list = [j for i, arg in enumerate(expr.args) for j in
(self._print(arg), "[%i, %i]" % (2*i, 2*i+1))]
return "%s(%s)" % (self._module_format('numpy.einsum'), ", ".join(array_list))
def _print_CodegenArrayContraction(self, expr):
from sympy.codegen.array_utils import CodegenArrayTensorProduct
base = expr.expr
contraction_indices = expr.contraction_indices
if not contraction_indices:
return self._print(base)
if isinstance(base, CodegenArrayTensorProduct):
counter = 0
d = {j: min(i) for i in contraction_indices for j in i}
indices = []
for rank_arg in base.subranks:
lindices = []
for i in range(rank_arg):
if counter in d:
lindices.append(d[counter])
else:
lindices.append(counter)
counter += 1
indices.append(lindices)
elems = ["%s, %s" % (self._print(arg), ind) for arg, ind in zip(base.args, indices)]
return "%s(%s)" % (
self._module_format('numpy.einsum'),
", ".join(elems)
)
raise NotImplementedError()
def _print_CodegenArrayDiagonal(self, expr):
diagonal_indices = list(expr.diagonal_indices)
if len(diagonal_indices) > 1:
# TODO: this should be handled in sympy.codegen.array_utils,
# possibly by creating the possibility of unfolding the
# CodegenArrayDiagonal object into nested ones. Same reasoning for
# the array contraction.
raise NotImplementedError
if len(diagonal_indices[0]) != 2:
raise NotImplementedError
return "%s(%s, 0, axis1=%s, axis2=%s)" % (
self._module_format("numpy.diagonal"),
self._print(expr.expr),
diagonal_indices[0][0],
diagonal_indices[0][1],
)
def _print_CodegenArrayPermuteDims(self, expr):
return "%s(%s, %s)" % (
self._module_format("numpy.transpose"),
self._print(expr.expr),
self._print(expr.permutation.array_form),
)
def _print_CodegenArrayElementwiseAdd(self, expr):
return self._expand_fold_binary_op('numpy.add', expr.args)
_print_lowergamma = CodePrinter._print_not_supported
_print_uppergamma = CodePrinter._print_not_supported
_print_fresnelc = CodePrinter._print_not_supported
_print_fresnels = CodePrinter._print_not_supported
for k in NumPyPrinter._kf:
setattr(NumPyPrinter, '_print_%s' % k, _print_known_func)
for k in NumPyPrinter._kc:
setattr(NumPyPrinter, '_print_%s' % k, _print_known_const)
_known_functions_scipy_special = {
'erf': 'erf',
'erfc': 'erfc',
'besselj': 'jv',
'bessely': 'yv',
'besseli': 'iv',
'besselk': 'kv',
'factorial': 'factorial',
'gamma': 'gamma',
'loggamma': 'gammaln',
'digamma': 'psi',
'RisingFactorial': 'poch',
'jacobi': 'eval_jacobi',
'gegenbauer': 'eval_gegenbauer',
'chebyshevt': 'eval_chebyt',
'chebyshevu': 'eval_chebyu',
'legendre': 'eval_legendre',
'hermite': 'eval_hermite',
'laguerre': 'eval_laguerre',
'assoc_laguerre': 'eval_genlaguerre',
'beta': 'beta',
'LambertW' : 'lambertw',
}
_known_constants_scipy_constants = {
'GoldenRatio': 'golden_ratio',
'Pi': 'pi',
}
class SciPyPrinter(NumPyPrinter):
language = "Python with SciPy"
_kf = dict(chain(
NumPyPrinter._kf.items(),
[(k, 'scipy.special.' + v) for k, v in _known_functions_scipy_special.items()]
))
_kc =dict(chain(
NumPyPrinter._kc.items(),
[(k, 'scipy.constants.' + v) for k, v in _known_constants_scipy_constants.items()]
))
def _print_SparseMatrix(self, expr):
i, j, data = [], [], []
for (r, c), v in expr._smat.items():
i.append(r)
j.append(c)
data.append(v)
return "{name}({data}, ({i}, {j}), shape={shape})".format(
name=self._module_format('scipy.sparse.coo_matrix'),
data=data, i=i, j=j, shape=expr.shape
)
_print_ImmutableSparseMatrix = _print_SparseMatrix
# SciPy's lpmv has a different order of arguments from assoc_legendre
def _print_assoc_legendre(self, expr):
return "{0}({2}, {1}, {3})".format(
self._module_format('scipy.special.lpmv'),
self._print(expr.args[0]),
self._print(expr.args[1]),
self._print(expr.args[2]))
def _print_lowergamma(self, expr):
return "{0}({2})*{1}({2}, {3})".format(
self._module_format('scipy.special.gamma'),
self._module_format('scipy.special.gammainc'),
self._print(expr.args[0]),
self._print(expr.args[1]))
def _print_uppergamma(self, expr):
return "{0}({2})*{1}({2}, {3})".format(
self._module_format('scipy.special.gamma'),
self._module_format('scipy.special.gammaincc'),
self._print(expr.args[0]),
self._print(expr.args[1]))
def _print_fresnels(self, expr):
return "{0}({1})[0]".format(
self._module_format("scipy.special.fresnel"),
self._print(expr.args[0]))
def _print_fresnelc(self, expr):
return "{0}({1})[1]".format(
self._module_format("scipy.special.fresnel"),
self._print(expr.args[0]))
for k in SciPyPrinter._kf:
setattr(SciPyPrinter, '_print_%s' % k, _print_known_func)
for k in SciPyPrinter._kc:
setattr(SciPyPrinter, '_print_%s' % k, _print_known_const)
class SymPyPrinter(PythonCodePrinter):
language = "Python with SymPy"
_kf = {k: 'sympy.' + v for k, v in chain(
_known_functions.items(),
_known_functions_math.items()
)}
def _print_Function(self, expr):
mod = expr.func.__module__ or ''
return '%s(%s)' % (self._module_format(mod + ('.' if mod else '') + expr.func.__name__),
', '.join(map(lambda arg: self._print(arg), expr.args)))
def _print_Pow(self, expr, rational=False):
return self._hprint_Pow(expr, rational=rational, sqrt='sympy.sqrt')
|
b7a2322739e388d7358d39781ac8420408167a3dfea4980e35c01966e6c72a24 | """
A Printer for generating readable representation of most sympy classes.
"""
from __future__ import print_function, division
from typing import Any, Dict
from sympy.core import S, Rational, Pow, Basic, Mul
from sympy.core.mul import _keep_coeff
from .printer import Printer
from sympy.printing.precedence import precedence, PRECEDENCE
from mpmath.libmp import prec_to_dps, to_str as mlib_to_str
from sympy.utilities import default_sort_key
class StrPrinter(Printer):
printmethod = "_sympystr"
_default_settings = {
"order": None,
"full_prec": "auto",
"sympy_integers": False,
"abbrev": False,
"perm_cyclic": True,
"min": None,
"max": None,
} # type: Dict[str, Any]
_relationals = dict() # type: Dict[str, str]
def parenthesize(self, item, level, strict=False):
if (precedence(item) < level) or ((not strict) and precedence(item) <= level):
return "(%s)" % self._print(item)
else:
return self._print(item)
def stringify(self, args, sep, level=0):
return sep.join([self.parenthesize(item, level) for item in args])
def emptyPrinter(self, expr):
if isinstance(expr, str):
return expr
elif isinstance(expr, Basic):
return repr(expr)
else:
return str(expr)
def _print_Add(self, expr, order=None):
if self.order == 'none':
terms = list(expr.args)
else:
terms = self._as_ordered_terms(expr, order=order)
PREC = precedence(expr)
l = []
for term in terms:
t = self._print(term)
if t.startswith('-'):
sign = "-"
t = t[1:]
else:
sign = "+"
if precedence(term) < PREC:
l.extend([sign, "(%s)" % t])
else:
l.extend([sign, t])
sign = l.pop(0)
if sign == '+':
sign = ""
return sign + ' '.join(l)
def _print_BooleanTrue(self, expr):
return "True"
def _print_BooleanFalse(self, expr):
return "False"
def _print_Not(self, expr):
return '~%s' %(self.parenthesize(expr.args[0],PRECEDENCE["Not"]))
def _print_And(self, expr):
return self.stringify(expr.args, " & ", PRECEDENCE["BitwiseAnd"])
def _print_Or(self, expr):
return self.stringify(expr.args, " | ", PRECEDENCE["BitwiseOr"])
def _print_Xor(self, expr):
return self.stringify(expr.args, " ^ ", PRECEDENCE["BitwiseXor"])
def _print_AppliedPredicate(self, expr):
return '%s(%s)' % (self._print(expr.func), self._print(expr.arg))
def _print_Basic(self, expr):
l = [self._print(o) for o in expr.args]
return expr.__class__.__name__ + "(%s)" % ", ".join(l)
def _print_BlockMatrix(self, B):
if B.blocks.shape == (1, 1):
self._print(B.blocks[0, 0])
return self._print(B.blocks)
def _print_Catalan(self, expr):
return 'Catalan'
def _print_ComplexInfinity(self, expr):
return 'zoo'
def _print_ConditionSet(self, s):
args = tuple([self._print(i) for i in (s.sym, s.condition)])
if s.base_set is S.UniversalSet:
return 'ConditionSet(%s, %s)' % args
args += (self._print(s.base_set),)
return 'ConditionSet(%s, %s, %s)' % args
def _print_Derivative(self, expr):
dexpr = expr.expr
dvars = [i[0] if i[1] == 1 else i for i in expr.variable_count]
return 'Derivative(%s)' % ", ".join(map(lambda arg: self._print(arg), [dexpr] + dvars))
def _print_dict(self, d):
keys = sorted(d.keys(), key=default_sort_key)
items = []
for key in keys:
item = "%s: %s" % (self._print(key), self._print(d[key]))
items.append(item)
return "{%s}" % ", ".join(items)
def _print_Dict(self, expr):
return self._print_dict(expr)
def _print_RandomDomain(self, d):
if hasattr(d, 'as_boolean'):
return 'Domain: ' + self._print(d.as_boolean())
elif hasattr(d, 'set'):
return ('Domain: ' + self._print(d.symbols) + ' in ' +
self._print(d.set))
else:
return 'Domain on ' + self._print(d.symbols)
def _print_Dummy(self, expr):
return '_' + expr.name
def _print_EulerGamma(self, expr):
return 'EulerGamma'
def _print_Exp1(self, expr):
return 'E'
def _print_ExprCondPair(self, expr):
return '(%s, %s)' % (self._print(expr.expr), self._print(expr.cond))
def _print_Function(self, expr):
return expr.func.__name__ + "(%s)" % self.stringify(expr.args, ", ")
def _print_GoldenRatio(self, expr):
return 'GoldenRatio'
def _print_TribonacciConstant(self, expr):
return 'TribonacciConstant'
def _print_ImaginaryUnit(self, expr):
return 'I'
def _print_Infinity(self, expr):
return 'oo'
def _print_Integral(self, expr):
def _xab_tostr(xab):
if len(xab) == 1:
return self._print(xab[0])
else:
return self._print((xab[0],) + tuple(xab[1:]))
L = ', '.join([_xab_tostr(l) for l in expr.limits])
return 'Integral(%s, %s)' % (self._print(expr.function), L)
def _print_Interval(self, i):
fin = 'Interval{m}({a}, {b})'
a, b, l, r = i.args
if a.is_infinite and b.is_infinite:
m = ''
elif a.is_infinite and not r:
m = ''
elif b.is_infinite and not l:
m = ''
elif not l and not r:
m = ''
elif l and r:
m = '.open'
elif l:
m = '.Lopen'
else:
m = '.Ropen'
return fin.format(**{'a': a, 'b': b, 'm': m})
def _print_AccumulationBounds(self, i):
return "AccumBounds(%s, %s)" % (self._print(i.min),
self._print(i.max))
def _print_Inverse(self, I):
return "%s**(-1)" % self.parenthesize(I.arg, PRECEDENCE["Pow"])
def _print_Lambda(self, obj):
expr = obj.expr
sig = obj.signature
if len(sig) == 1 and sig[0].is_symbol:
sig = sig[0]
return "Lambda(%s, %s)" % (self._print(sig), self._print(expr))
def _print_LatticeOp(self, expr):
args = sorted(expr.args, key=default_sort_key)
return expr.func.__name__ + "(%s)" % ", ".join(self._print(arg) for arg in args)
def _print_Limit(self, expr):
e, z, z0, dir = expr.args
if str(dir) == "+":
return "Limit(%s, %s, %s)" % tuple(map(self._print, (e, z, z0)))
else:
return "Limit(%s, %s, %s, dir='%s')" % tuple(map(self._print,
(e, z, z0, dir)))
def _print_list(self, expr):
return "[%s]" % self.stringify(expr, ", ")
def _print_MatrixBase(self, expr):
return expr._format_str(self)
def _print_MutableSparseMatrix(self, expr):
return self._print_MatrixBase(expr)
def _print_SparseMatrix(self, expr):
from sympy.matrices import Matrix
return self._print(Matrix(expr))
def _print_ImmutableSparseMatrix(self, expr):
return self._print_MatrixBase(expr)
def _print_Matrix(self, expr):
return self._print_MatrixBase(expr)
def _print_DenseMatrix(self, expr):
return self._print_MatrixBase(expr)
def _print_MutableDenseMatrix(self, expr):
return self._print_MatrixBase(expr)
def _print_ImmutableMatrix(self, expr):
return self._print_MatrixBase(expr)
def _print_ImmutableDenseMatrix(self, expr):
return self._print_MatrixBase(expr)
def _print_MatrixElement(self, expr):
return self.parenthesize(expr.parent, PRECEDENCE["Atom"], strict=True) \
+ '[%s, %s]' % (self._print(expr.i), self._print(expr.j))
def _print_MatrixSlice(self, expr):
def strslice(x):
x = list(x)
if x[2] == 1:
del x[2]
if x[1] == x[0] + 1:
del x[1]
if x[0] == 0:
x[0] = ''
return ':'.join(map(lambda arg: self._print(arg), x))
return (self._print(expr.parent) + '[' +
strslice(expr.rowslice) + ', ' +
strslice(expr.colslice) + ']')
def _print_DeferredVector(self, expr):
return expr.name
def _print_Mul(self, expr):
prec = precedence(expr)
c, e = expr.as_coeff_Mul()
if c < 0:
expr = _keep_coeff(-c, e)
sign = "-"
else:
sign = ""
a = [] # items in the numerator
b = [] # items that are in the denominator (if any)
pow_paren = [] # Will collect all pow with more than one base element and exp = -1
if self.order not in ('old', 'none'):
args = expr.as_ordered_factors()
else:
# use make_args in case expr was something like -x -> x
args = Mul.make_args(expr)
# Gather args for numerator/denominator
for item in args:
if item.is_commutative and item.is_Pow and item.exp.is_Rational and item.exp.is_negative:
if item.exp != -1:
b.append(Pow(item.base, -item.exp, evaluate=False))
else:
if len(item.args[0].args) != 1 and isinstance(item.base, Mul): # To avoid situations like #14160
pow_paren.append(item)
b.append(Pow(item.base, -item.exp))
elif item.is_Rational and item is not S.Infinity:
if item.p != 1:
a.append(Rational(item.p))
if item.q != 1:
b.append(Rational(item.q))
else:
a.append(item)
a = a or [S.One]
a_str = [self.parenthesize(x, prec, strict=False) for x in a]
b_str = [self.parenthesize(x, prec, strict=False) for x in b]
# To parenthesize Pow with exp = -1 and having more than one Symbol
for item in pow_paren:
if item.base in b:
b_str[b.index(item.base)] = "(%s)" % b_str[b.index(item.base)]
if not b:
return sign + '*'.join(a_str)
elif len(b) == 1:
return sign + '*'.join(a_str) + "/" + b_str[0]
else:
return sign + '*'.join(a_str) + "/(%s)" % '*'.join(b_str)
def _print_MatMul(self, expr):
c, m = expr.as_coeff_mmul()
if c.is_number and c < 0:
expr = _keep_coeff(-c, m)
sign = "-"
else:
sign = ""
return sign + '*'.join(
[self.parenthesize(arg, precedence(expr)) for arg in expr.args]
)
def _print_ElementwiseApplyFunction(self, expr):
return "{0}.({1})".format(
expr.function,
self._print(expr.expr),
)
def _print_NaN(self, expr):
return 'nan'
def _print_NegativeInfinity(self, expr):
return '-oo'
def _print_Order(self, expr):
if not expr.variables or all(p is S.Zero for p in expr.point):
if len(expr.variables) <= 1:
return 'O(%s)' % self._print(expr.expr)
else:
return 'O(%s)' % self.stringify((expr.expr,) + expr.variables, ', ', 0)
else:
return 'O(%s)' % self.stringify(expr.args, ', ', 0)
def _print_Ordinal(self, expr):
return expr.__str__()
def _print_Cycle(self, expr):
return expr.__str__()
def _print_Permutation(self, expr):
from sympy.combinatorics.permutations import Permutation, Cycle
from sympy.utilities.exceptions import SymPyDeprecationWarning
perm_cyclic = Permutation.print_cyclic
if perm_cyclic is not None:
SymPyDeprecationWarning(
feature="Permutation.print_cyclic = {}".format(perm_cyclic),
useinstead="init_printing(perm_cyclic={})"
.format(perm_cyclic),
issue=15201,
deprecated_since_version="1.6").warn()
else:
perm_cyclic = self._settings.get("perm_cyclic", True)
if perm_cyclic:
if not expr.size:
return '()'
# before taking Cycle notation, see if the last element is
# a singleton and move it to the head of the string
s = Cycle(expr)(expr.size - 1).__repr__()[len('Cycle'):]
last = s.rfind('(')
if not last == 0 and ',' not in s[last:]:
s = s[last:] + s[:last]
s = s.replace(',', '')
return s
else:
s = expr.support()
if not s:
if expr.size < 5:
return 'Permutation(%s)' % self._print(expr.array_form)
return 'Permutation([], size=%s)' % self._print(expr.size)
trim = self._print(expr.array_form[:s[-1] + 1]) + ', size=%s' % self._print(expr.size)
use = full = self._print(expr.array_form)
if len(trim) < len(full):
use = trim
return 'Permutation(%s)' % use
def _print_Subs(self, obj):
expr, old, new = obj.args
if len(obj.point) == 1:
old = old[0]
new = new[0]
return "Subs(%s, %s, %s)" % (
self._print(expr), self._print(old), self._print(new))
def _print_TensorIndex(self, expr):
return expr._print()
def _print_TensorHead(self, expr):
return expr._print()
def _print_Tensor(self, expr):
return expr._print()
def _print_TensMul(self, expr):
# prints expressions like "A(a)", "3*A(a)", "(1+x)*A(a)"
sign, args = expr._get_args_for_traditional_printer()
return sign + "*".join(
[self.parenthesize(arg, precedence(expr)) for arg in args]
)
def _print_TensAdd(self, expr):
return expr._print()
def _print_PermutationGroup(self, expr):
p = [' %s' % self._print(a) for a in expr.args]
return 'PermutationGroup([\n%s])' % ',\n'.join(p)
def _print_Pi(self, expr):
return 'pi'
def _print_PolyRing(self, ring):
return "Polynomial ring in %s over %s with %s order" % \
(", ".join(map(lambda rs: self._print(rs), ring.symbols)),
self._print(ring.domain), self._print(ring.order))
def _print_FracField(self, field):
return "Rational function field in %s over %s with %s order" % \
(", ".join(map(lambda fs: self._print(fs), field.symbols)),
self._print(field.domain), self._print(field.order))
def _print_FreeGroupElement(self, elm):
return elm.__str__()
def _print_PolyElement(self, poly):
return poly.str(self, PRECEDENCE, "%s**%s", "*")
def _print_FracElement(self, frac):
if frac.denom == 1:
return self._print(frac.numer)
else:
numer = self.parenthesize(frac.numer, PRECEDENCE["Mul"], strict=True)
denom = self.parenthesize(frac.denom, PRECEDENCE["Atom"], strict=True)
return numer + "/" + denom
def _print_Poly(self, expr):
ATOM_PREC = PRECEDENCE["Atom"] - 1
terms, gens = [], [ self.parenthesize(s, ATOM_PREC) for s in expr.gens ]
for monom, coeff in expr.terms():
s_monom = []
for i, exp in enumerate(monom):
if exp > 0:
if exp == 1:
s_monom.append(gens[i])
else:
s_monom.append(gens[i] + "**%d" % exp)
s_monom = "*".join(s_monom)
if coeff.is_Add:
if s_monom:
s_coeff = "(" + self._print(coeff) + ")"
else:
s_coeff = self._print(coeff)
else:
if s_monom:
if coeff is S.One:
terms.extend(['+', s_monom])
continue
if coeff is S.NegativeOne:
terms.extend(['-', s_monom])
continue
s_coeff = self._print(coeff)
if not s_monom:
s_term = s_coeff
else:
s_term = s_coeff + "*" + s_monom
if s_term.startswith('-'):
terms.extend(['-', s_term[1:]])
else:
terms.extend(['+', s_term])
if terms[0] in ['-', '+']:
modifier = terms.pop(0)
if modifier == '-':
terms[0] = '-' + terms[0]
format = expr.__class__.__name__ + "(%s, %s"
from sympy.polys.polyerrors import PolynomialError
try:
format += ", modulus=%s" % expr.get_modulus()
except PolynomialError:
format += ", domain='%s'" % expr.get_domain()
format += ")"
for index, item in enumerate(gens):
if len(item) > 2 and (item[:1] == "(" and item[len(item) - 1:] == ")"):
gens[index] = item[1:len(item) - 1]
return format % (' '.join(terms), ', '.join(gens))
def _print_UniversalSet(self, p):
return 'UniversalSet'
def _print_AlgebraicNumber(self, expr):
if expr.is_aliased:
return self._print(expr.as_poly().as_expr())
else:
return self._print(expr.as_expr())
def _print_Pow(self, expr, rational=False):
"""Printing helper function for ``Pow``
Parameters
==========
rational : bool, optional
If ``True``, it will not attempt printing ``sqrt(x)`` or
``x**S.Half`` as ``sqrt``, and will use ``x**(1/2)``
instead.
See examples for additional details
Examples
========
>>> from sympy.functions import sqrt
>>> from sympy.printing.str import StrPrinter
>>> from sympy.abc import x
How ``rational`` keyword works with ``sqrt``:
>>> printer = StrPrinter()
>>> printer._print_Pow(sqrt(x), rational=True)
'x**(1/2)'
>>> printer._print_Pow(sqrt(x), rational=False)
'sqrt(x)'
>>> printer._print_Pow(1/sqrt(x), rational=True)
'x**(-1/2)'
>>> printer._print_Pow(1/sqrt(x), rational=False)
'1/sqrt(x)'
Notes
=====
``sqrt(x)`` is canonicalized as ``Pow(x, S.Half)`` in SymPy,
so there is no need of defining a separate printer for ``sqrt``.
Instead, it should be handled here as well.
"""
PREC = precedence(expr)
if expr.exp is S.Half and not rational:
return "sqrt(%s)" % self._print(expr.base)
if expr.is_commutative:
if -expr.exp is S.Half and not rational:
# Note: Don't test "expr.exp == -S.Half" here, because that will
# match -0.5, which we don't want.
return "%s/sqrt(%s)" % tuple(map(lambda arg: self._print(arg), (S.One, expr.base)))
if expr.exp is -S.One:
# Similarly to the S.Half case, don't test with "==" here.
return '%s/%s' % (self._print(S.One),
self.parenthesize(expr.base, PREC, strict=False))
e = self.parenthesize(expr.exp, PREC, strict=False)
if self.printmethod == '_sympyrepr' and expr.exp.is_Rational and expr.exp.q != 1:
# the parenthesized exp should be '(Rational(a, b))' so strip parens,
# but just check to be sure.
if e.startswith('(Rational'):
return '%s**%s' % (self.parenthesize(expr.base, PREC, strict=False), e[1:-1])
return '%s**%s' % (self.parenthesize(expr.base, PREC, strict=False), e)
def _print_UnevaluatedExpr(self, expr):
return self._print(expr.args[0])
def _print_MatPow(self, expr):
PREC = precedence(expr)
return '%s**%s' % (self.parenthesize(expr.base, PREC, strict=False),
self.parenthesize(expr.exp, PREC, strict=False))
def _print_ImmutableDenseNDimArray(self, expr):
return str(expr)
def _print_ImmutableSparseNDimArray(self, expr):
return str(expr)
def _print_Integer(self, expr):
if self._settings.get("sympy_integers", False):
return "S(%s)" % (expr)
return str(expr.p)
def _print_Integers(self, expr):
return 'Integers'
def _print_Naturals(self, expr):
return 'Naturals'
def _print_Naturals0(self, expr):
return 'Naturals0'
def _print_Rationals(self, expr):
return 'Rationals'
def _print_Reals(self, expr):
return 'Reals'
def _print_Complexes(self, expr):
return 'Complexes'
def _print_EmptySet(self, expr):
return 'EmptySet'
def _print_EmptySequence(self, expr):
return 'EmptySequence'
def _print_int(self, expr):
return str(expr)
def _print_mpz(self, expr):
return str(expr)
def _print_Rational(self, expr):
if expr.q == 1:
return str(expr.p)
else:
if self._settings.get("sympy_integers", False):
return "S(%s)/%s" % (expr.p, expr.q)
return "%s/%s" % (expr.p, expr.q)
def _print_PythonRational(self, expr):
if expr.q == 1:
return str(expr.p)
else:
return "%d/%d" % (expr.p, expr.q)
def _print_Fraction(self, expr):
if expr.denominator == 1:
return str(expr.numerator)
else:
return "%s/%s" % (expr.numerator, expr.denominator)
def _print_mpq(self, expr):
if expr.denominator == 1:
return str(expr.numerator)
else:
return "%s/%s" % (expr.numerator, expr.denominator)
def _print_Float(self, expr):
prec = expr._prec
if prec < 5:
dps = 0
else:
dps = prec_to_dps(expr._prec)
if self._settings["full_prec"] is True:
strip = False
elif self._settings["full_prec"] is False:
strip = True
elif self._settings["full_prec"] == "auto":
strip = self._print_level > 1
low = self._settings["min"] if "min" in self._settings else None
high = self._settings["max"] if "max" in self._settings else None
rv = mlib_to_str(expr._mpf_, dps, strip_zeros=strip, min_fixed=low, max_fixed=high)
if rv.startswith('-.0'):
rv = '-0.' + rv[3:]
elif rv.startswith('.0'):
rv = '0.' + rv[2:]
if rv.startswith('+'):
# e.g., +inf -> inf
rv = rv[1:]
return rv
def _print_Relational(self, expr):
charmap = {
"==": "Eq",
"!=": "Ne",
":=": "Assignment",
'+=': "AddAugmentedAssignment",
"-=": "SubAugmentedAssignment",
"*=": "MulAugmentedAssignment",
"/=": "DivAugmentedAssignment",
"%=": "ModAugmentedAssignment",
}
if expr.rel_op in charmap:
return '%s(%s, %s)' % (charmap[expr.rel_op], self._print(expr.lhs),
self._print(expr.rhs))
return '%s %s %s' % (self.parenthesize(expr.lhs, precedence(expr)),
self._relationals.get(expr.rel_op) or expr.rel_op,
self.parenthesize(expr.rhs, precedence(expr)))
def _print_ComplexRootOf(self, expr):
return "CRootOf(%s, %d)" % (self._print_Add(expr.expr, order='lex'),
expr.index)
def _print_RootSum(self, expr):
args = [self._print_Add(expr.expr, order='lex')]
if expr.fun is not S.IdentityFunction:
args.append(self._print(expr.fun))
return "RootSum(%s)" % ", ".join(args)
def _print_GroebnerBasis(self, basis):
cls = basis.__class__.__name__
exprs = [self._print_Add(arg, order=basis.order) for arg in basis.exprs]
exprs = "[%s]" % ", ".join(exprs)
gens = [ self._print(gen) for gen in basis.gens ]
domain = "domain='%s'" % self._print(basis.domain)
order = "order='%s'" % self._print(basis.order)
args = [exprs] + gens + [domain, order]
return "%s(%s)" % (cls, ", ".join(args))
def _print_set(self, s):
items = sorted(s, key=default_sort_key)
args = ', '.join(self._print(item) for item in items)
if not args:
return "set()"
return '{%s}' % args
def _print_frozenset(self, s):
if not s:
return "frozenset()"
return "frozenset(%s)" % self._print_set(s)
def _print_Sum(self, expr):
def _xab_tostr(xab):
if len(xab) == 1:
return self._print(xab[0])
else:
return self._print((xab[0],) + tuple(xab[1:]))
L = ', '.join([_xab_tostr(l) for l in expr.limits])
return 'Sum(%s, %s)' % (self._print(expr.function), L)
def _print_Symbol(self, expr):
return expr.name
_print_MatrixSymbol = _print_Symbol
_print_RandomSymbol = _print_Symbol
def _print_Identity(self, expr):
return "I"
def _print_ZeroMatrix(self, expr):
return "0"
def _print_OneMatrix(self, expr):
return "1"
def _print_Predicate(self, expr):
return "Q.%s" % expr.name
def _print_str(self, expr):
return str(expr)
def _print_tuple(self, expr):
if len(expr) == 1:
return "(%s,)" % self._print(expr[0])
else:
return "(%s)" % self.stringify(expr, ", ")
def _print_Tuple(self, expr):
return self._print_tuple(expr)
def _print_Transpose(self, T):
return "%s.T" % self.parenthesize(T.arg, PRECEDENCE["Pow"])
def _print_Uniform(self, expr):
return "Uniform(%s, %s)" % (self._print(expr.a), self._print(expr.b))
def _print_Quantity(self, expr):
if self._settings.get("abbrev", False):
return "%s" % expr.abbrev
return "%s" % expr.name
def _print_Quaternion(self, expr):
s = [self.parenthesize(i, PRECEDENCE["Mul"], strict=True) for i in expr.args]
a = [s[0]] + [i+"*"+j for i, j in zip(s[1:], "ijk")]
return " + ".join(a)
def _print_Dimension(self, expr):
return str(expr)
def _print_Wild(self, expr):
return expr.name + '_'
def _print_WildFunction(self, expr):
return expr.name + '_'
def _print_Zero(self, expr):
if self._settings.get("sympy_integers", False):
return "S(0)"
return "0"
def _print_DMP(self, p):
from sympy.core.sympify import SympifyError
try:
if p.ring is not None:
# TODO incorporate order
return self._print(p.ring.to_sympy(p))
except SympifyError:
pass
cls = p.__class__.__name__
rep = self._print(p.rep)
dom = self._print(p.dom)
ring = self._print(p.ring)
return "%s(%s, %s, %s)" % (cls, rep, dom, ring)
def _print_DMF(self, expr):
return self._print_DMP(expr)
def _print_Object(self, obj):
return 'Object("%s")' % obj.name
def _print_IdentityMorphism(self, morphism):
return 'IdentityMorphism(%s)' % morphism.domain
def _print_NamedMorphism(self, morphism):
return 'NamedMorphism(%s, %s, "%s")' % \
(morphism.domain, morphism.codomain, morphism.name)
def _print_Category(self, category):
return 'Category("%s")' % category.name
def _print_BaseScalarField(self, field):
return field._coord_sys._names[field._index]
def _print_BaseVectorField(self, field):
return 'e_%s' % field._coord_sys._names[field._index]
def _print_Differential(self, diff):
field = diff._form_field
if hasattr(field, '_coord_sys'):
return 'd%s' % field._coord_sys._names[field._index]
else:
return 'd(%s)' % self._print(field)
def _print_Tr(self, expr):
#TODO : Handle indices
return "%s(%s)" % ("Tr", self._print(expr.args[0]))
def sstr(expr, **settings):
"""Returns the expression as a string.
For large expressions where speed is a concern, use the setting
order='none'. If abbrev=True setting is used then units are printed in
abbreviated form.
Examples
========
>>> from sympy import symbols, Eq, sstr
>>> a, b = symbols('a b')
>>> sstr(Eq(a + b, 0))
'Eq(a + b, 0)'
"""
p = StrPrinter(settings)
s = p.doprint(expr)
return s
class StrReprPrinter(StrPrinter):
"""(internal) -- see sstrrepr"""
def _print_str(self, s):
return repr(s)
def sstrrepr(expr, **settings):
"""return expr in mixed str/repr form
i.e. strings are returned in repr form with quotes, and everything else
is returned in str form.
This function could be useful for hooking into sys.displayhook
"""
p = StrReprPrinter(settings)
s = p.doprint(expr)
return s
|
fcb5161d83867701b434b9fd0dd4aa0159664b1cbe1e1230f66a13a3951b658a | """Printing subsystem"""
from .pretty import pager_print, pretty, pretty_print, pprint, pprint_use_unicode, pprint_try_use_unicode
from .latex import latex, print_latex, multiline_latex
from .mathml import mathml, print_mathml
from .python import python, print_python
from .pycode import pycode
from .ccode import ccode, print_ccode
from .glsl import glsl_code, print_glsl
from .cxxcode import cxxcode
from .fcode import fcode, print_fcode
from .rcode import rcode, print_rcode
from .jscode import jscode, print_jscode
from .julia import julia_code
from .mathematica import mathematica_code
from .octave import octave_code
from .rust import rust_code
from .gtk import print_gtk
from .preview import preview
from .repr import srepr
from .tree import print_tree
from .str import StrPrinter, sstr, sstrrepr
from .tableform import TableForm
from .dot import dotprint
from .maple import maple_code, print_maple_code
__all__ = [
# sympy.printing.pretty
'pager_print', 'pretty', 'pretty_print', 'pprint', 'pprint_use_unicode',
'pprint_try_use_unicode',
# sympy.printing.latex
'latex', 'print_latex', 'multiline_latex',
# sympy.printing.mathml
'mathml', 'print_mathml',
# sympy.printing.python
'python', 'print_python',
# sympy.printing.pycode
'pycode',
# sympy.printing.ccode
'ccode', 'print_ccode',
# sympy.printing.glsl
'glsl_code', 'print_glsl',
# sympy.printing.cxxcode
'cxxcode',
# sympy.printing.fcode
'fcode', 'print_fcode',
# sympy.printing.rcode
'rcode', 'print_rcode',
# sympy.printing.jscode
'jscode', 'print_jscode',
# sympy.printing.julia
'julia_code',
# sympy.printing.mathematica
'mathematica_code',
# sympy.printing.octave
'octave_code',
# sympy.printing.rust
'rust_code',
# sympy.printing.gtk
'print_gtk',
# sympy.printing.preview
'preview',
# sympy.printing.repr
'srepr',
# sympy.printing.tree
'print_tree',
# sympy.printing.str
'StrPrinter', 'sstr', 'sstrrepr',
# sympy.printing.tableform
'TableForm',
# sympy.printing.dot
'dotprint',
# sympy.printing.maple
'maple_code', 'print_maple_code',
]
|
b44269d1ce1ffbb74b0c8f886a8dd0e2e7247947c8b53de7b2c3cab76f852ef1 | """
Rust code printer
The `RustCodePrinter` converts SymPy expressions into Rust expressions.
A complete code generator, which uses `rust_code` extensively, can be found
in `sympy.utilities.codegen`. The `codegen` module can be used to generate
complete source code files.
"""
# Possible Improvement
#
# * make sure we follow Rust Style Guidelines_
# * make use of pattern matching
# * better support for reference
# * generate generic code and use trait to make sure they have specific methods
# * use crates_ to get more math support
# - num_
# + BigInt_, BigUint_
# + Complex_
# + Rational64_, Rational32_, BigRational_
#
# .. _crates: https://crates.io/
# .. _Guidelines: https://github.com/rust-lang/rust/tree/master/src/doc/style
# .. _num: http://rust-num.github.io/num/num/
# .. _BigInt: http://rust-num.github.io/num/num/bigint/struct.BigInt.html
# .. _BigUint: http://rust-num.github.io/num/num/bigint/struct.BigUint.html
# .. _Complex: http://rust-num.github.io/num/num/complex/struct.Complex.html
# .. _Rational32: http://rust-num.github.io/num/num/rational/type.Rational32.html
# .. _Rational64: http://rust-num.github.io/num/num/rational/type.Rational64.html
# .. _BigRational: http://rust-num.github.io/num/num/rational/type.BigRational.html
from __future__ import print_function, division
from typing import Any, Dict
from sympy.core import S, Rational, Float, Lambda
from sympy.printing.codeprinter import CodePrinter
# Rust's methods for integer and float can be found at here :
#
# * `Rust - Primitive Type f64 <https://doc.rust-lang.org/std/primitive.f64.html>`_
# * `Rust - Primitive Type i64 <https://doc.rust-lang.org/std/primitive.i64.html>`_
#
# Function Style :
#
# 1. args[0].func(args[1:]), method with arguments
# 2. args[0].func(), method without arguments
# 3. args[1].func(), method without arguments (e.g. (e, x) => x.exp())
# 4. func(args), function with arguments
# dictionary mapping sympy function to (argument_conditions, Rust_function).
# Used in RustCodePrinter._print_Function(self)
# f64 method in Rust
known_functions = {
# "": "is_nan",
# "": "is_infinite",
# "": "is_finite",
# "": "is_normal",
# "": "classify",
"floor": "floor",
"ceiling": "ceil",
# "": "round",
# "": "trunc",
# "": "fract",
"Abs": "abs",
"sign": "signum",
# "": "is_sign_positive",
# "": "is_sign_negative",
# "": "mul_add",
"Pow": [(lambda base, exp: exp == -S.One, "recip", 2), # 1.0/x
(lambda base, exp: exp == S.Half, "sqrt", 2), # x ** 0.5
(lambda base, exp: exp == -S.Half, "sqrt().recip", 2), # 1/(x ** 0.5)
(lambda base, exp: exp == Rational(1, 3), "cbrt", 2), # x ** (1/3)
(lambda base, exp: base == S.One*2, "exp2", 3), # 2 ** x
(lambda base, exp: exp.is_integer, "powi", 1), # x ** y, for i32
(lambda base, exp: not exp.is_integer, "powf", 1)], # x ** y, for f64
"exp": [(lambda exp: True, "exp", 2)], # e ** x
"log": "ln",
# "": "log", # number.log(base)
# "": "log2",
# "": "log10",
# "": "to_degrees",
# "": "to_radians",
"Max": "max",
"Min": "min",
# "": "hypot", # (x**2 + y**2) ** 0.5
"sin": "sin",
"cos": "cos",
"tan": "tan",
"asin": "asin",
"acos": "acos",
"atan": "atan",
"atan2": "atan2",
# "": "sin_cos",
# "": "exp_m1", # e ** x - 1
# "": "ln_1p", # ln(1 + x)
"sinh": "sinh",
"cosh": "cosh",
"tanh": "tanh",
"asinh": "asinh",
"acosh": "acosh",
"atanh": "atanh",
}
# i64 method in Rust
# known_functions_i64 = {
# "": "min_value",
# "": "max_value",
# "": "from_str_radix",
# "": "count_ones",
# "": "count_zeros",
# "": "leading_zeros",
# "": "trainling_zeros",
# "": "rotate_left",
# "": "rotate_right",
# "": "swap_bytes",
# "": "from_be",
# "": "from_le",
# "": "to_be", # to big endian
# "": "to_le", # to little endian
# "": "checked_add",
# "": "checked_sub",
# "": "checked_mul",
# "": "checked_div",
# "": "checked_rem",
# "": "checked_neg",
# "": "checked_shl",
# "": "checked_shr",
# "": "checked_abs",
# "": "saturating_add",
# "": "saturating_sub",
# "": "saturating_mul",
# "": "wrapping_add",
# "": "wrapping_sub",
# "": "wrapping_mul",
# "": "wrapping_div",
# "": "wrapping_rem",
# "": "wrapping_neg",
# "": "wrapping_shl",
# "": "wrapping_shr",
# "": "wrapping_abs",
# "": "overflowing_add",
# "": "overflowing_sub",
# "": "overflowing_mul",
# "": "overflowing_div",
# "": "overflowing_rem",
# "": "overflowing_neg",
# "": "overflowing_shl",
# "": "overflowing_shr",
# "": "overflowing_abs",
# "Pow": "pow",
# "Abs": "abs",
# "sign": "signum",
# "": "is_positive",
# "": "is_negnative",
# }
# These are the core reserved words in the Rust language. Taken from:
# http://doc.rust-lang.org/grammar.html#keywords
reserved_words = ['abstract',
'alignof',
'as',
'become',
'box',
'break',
'const',
'continue',
'crate',
'do',
'else',
'enum',
'extern',
'false',
'final',
'fn',
'for',
'if',
'impl',
'in',
'let',
'loop',
'macro',
'match',
'mod',
'move',
'mut',
'offsetof',
'override',
'priv',
'proc',
'pub',
'pure',
'ref',
'return',
'Self',
'self',
'sizeof',
'static',
'struct',
'super',
'trait',
'true',
'type',
'typeof',
'unsafe',
'unsized',
'use',
'virtual',
'where',
'while',
'yield']
class RustCodePrinter(CodePrinter):
"""A printer to convert python expressions to strings of Rust code"""
printmethod = "_rust_code"
language = "Rust"
_default_settings = {
'order': None,
'full_prec': 'auto',
'precision': 17,
'user_functions': {},
'human': True,
'contract': True,
'dereference': set(),
'error_on_reserved': False,
'reserved_word_suffix': '_',
'inline': False,
} # type: Dict[str, Any]
def __init__(self, settings={}):
CodePrinter.__init__(self, settings)
self.known_functions = dict(known_functions)
userfuncs = settings.get('user_functions', {})
self.known_functions.update(userfuncs)
self._dereference = set(settings.get('dereference', []))
self.reserved_words = set(reserved_words)
def _rate_index_position(self, p):
return p*5
def _get_statement(self, codestring):
return "%s;" % codestring
def _get_comment(self, text):
return "// %s" % text
def _declare_number_const(self, name, value):
return "const %s: f64 = %s;" % (name, value)
def _format_code(self, lines):
return self.indent_code(lines)
def _traverse_matrix_indices(self, mat):
rows, cols = mat.shape
return ((i, j) for i in range(rows) for j in range(cols))
def _get_loop_opening_ending(self, indices):
open_lines = []
close_lines = []
loopstart = "for %(var)s in %(start)s..%(end)s {"
for i in indices:
# Rust arrays start at 0 and end at dimension-1
open_lines.append(loopstart % {
'var': self._print(i),
'start': self._print(i.lower),
'end': self._print(i.upper + 1)})
close_lines.append("}")
return open_lines, close_lines
def _print_caller_var(self, expr):
if len(expr.args) > 1:
# for something like `sin(x + y + z)`,
# make sure we can get '(x + y + z).sin()'
# instead of 'x + y + z.sin()'
return '(' + self._print(expr) + ')'
elif expr.is_number:
return self._print(expr, _type=True)
else:
return self._print(expr)
def _print_Function(self, expr):
"""
basic function for printing `Function`
Function Style :
1. args[0].func(args[1:]), method with arguments
2. args[0].func(), method without arguments
3. args[1].func(), method without arguments (e.g. (e, x) => x.exp())
4. func(args), function with arguments
"""
if expr.func.__name__ in self.known_functions:
cond_func = self.known_functions[expr.func.__name__]
func = None
style = 1
if isinstance(cond_func, str):
func = cond_func
else:
for cond, func, style in cond_func:
if cond(*expr.args):
break
if func is not None:
if style == 1:
ret = "%(var)s.%(method)s(%(args)s)" % {
'var': self._print_caller_var(expr.args[0]),
'method': func,
'args': self.stringify(expr.args[1:], ", ") if len(expr.args) > 1 else ''
}
elif style == 2:
ret = "%(var)s.%(method)s()" % {
'var': self._print_caller_var(expr.args[0]),
'method': func,
}
elif style == 3:
ret = "%(var)s.%(method)s()" % {
'var': self._print_caller_var(expr.args[1]),
'method': func,
}
else:
ret = "%(func)s(%(args)s)" % {
'func': func,
'args': self.stringify(expr.args, ", "),
}
return ret
elif hasattr(expr, '_imp_') and isinstance(expr._imp_, Lambda):
# inlined function
return self._print(expr._imp_(*expr.args))
else:
return self._print_not_supported(expr)
def _print_Pow(self, expr):
if expr.base.is_integer and not expr.exp.is_integer:
expr = type(expr)(Float(expr.base), expr.exp)
return self._print(expr)
return self._print_Function(expr)
def _print_Float(self, expr, _type=False):
ret = super(RustCodePrinter, self)._print_Float(expr)
if _type:
return ret + '_f64'
else:
return ret
def _print_Integer(self, expr, _type=False):
ret = super(RustCodePrinter, self)._print_Integer(expr)
if _type:
return ret + '_i32'
else:
return ret
def _print_Rational(self, expr):
p, q = int(expr.p), int(expr.q)
return '%d_f64/%d.0' % (p, q)
def _print_Relational(self, expr):
lhs_code = self._print(expr.lhs)
rhs_code = self._print(expr.rhs)
op = expr.rel_op
return "{0} {1} {2}".format(lhs_code, op, rhs_code)
def _print_Indexed(self, expr):
# calculate index for 1d array
dims = expr.shape
elem = S.Zero
offset = S.One
for i in reversed(range(expr.rank)):
elem += expr.indices[i]*offset
offset *= dims[i]
return "%s[%s]" % (self._print(expr.base.label), self._print(elem))
def _print_Idx(self, expr):
return expr.label.name
def _print_Dummy(self, expr):
return expr.name
def _print_Exp1(self, expr, _type=False):
return "E"
def _print_Pi(self, expr, _type=False):
return 'PI'
def _print_Infinity(self, expr, _type=False):
return 'INFINITY'
def _print_NegativeInfinity(self, expr, _type=False):
return 'NEG_INFINITY'
def _print_BooleanTrue(self, expr, _type=False):
return "true"
def _print_BooleanFalse(self, expr, _type=False):
return "false"
def _print_bool(self, expr, _type=False):
return str(expr).lower()
def _print_NaN(self, expr, _type=False):
return "NAN"
def _print_Piecewise(self, expr):
if expr.args[-1].cond != True:
# We need the last conditional to be a True, otherwise the resulting
# function may not return a result.
raise ValueError("All Piecewise expressions must contain an "
"(expr, True) statement to be used as a default "
"condition. Without one, the generated "
"expression may not evaluate to anything under "
"some condition.")
lines = []
for i, (e, c) in enumerate(expr.args):
if i == 0:
lines.append("if (%s) {" % self._print(c))
elif i == len(expr.args) - 1 and c == True:
lines[-1] += " else {"
else:
lines[-1] += " else if (%s) {" % self._print(c)
code0 = self._print(e)
lines.append(code0)
lines.append("}")
if self._settings['inline']:
return " ".join(lines)
else:
return "\n".join(lines)
def _print_ITE(self, expr):
from sympy.functions import Piecewise
_piecewise = Piecewise((expr.args[1], expr.args[0]), (expr.args[2], True))
return self._print(_piecewise)
def _print_MatrixBase(self, A):
if A.cols == 1:
return "[%s]" % ", ".join(self._print(a) for a in A)
else:
raise ValueError("Full Matrix Support in Rust need Crates (https://crates.io/keywords/matrix).")
def _print_MatrixElement(self, expr):
return "%s[%s]" % (expr.parent,
expr.j + expr.i*expr.parent.shape[1])
# FIXME: Str/CodePrinter could define each of these to call the _print
# method from higher up the class hierarchy (see _print_NumberSymbol).
# Then subclasses like us would not need to repeat all this.
_print_Matrix = _print_MatrixBase
_print_DenseMatrix = _print_MatrixBase
_print_MutableDenseMatrix = _print_MatrixBase
_print_ImmutableMatrix = _print_MatrixBase
_print_ImmutableDenseMatrix = _print_MatrixBase
def _print_Symbol(self, expr):
name = super(RustCodePrinter, self)._print_Symbol(expr)
if expr in self._dereference:
return '(*%s)' % name
else:
return name
def _print_Assignment(self, expr):
from sympy.tensor.indexed import IndexedBase
lhs = expr.lhs
rhs = expr.rhs
if self._settings["contract"] and (lhs.has(IndexedBase) or
rhs.has(IndexedBase)):
# Here we check if there is looping to be done, and if so
# print the required loops.
return self._doprint_loops(rhs, lhs)
else:
lhs_code = self._print(lhs)
rhs_code = self._print(rhs)
return self._get_statement("%s = %s" % (lhs_code, rhs_code))
def indent_code(self, code):
"""Accepts a string of code or a list of code lines"""
if isinstance(code, str):
code_lines = self.indent_code(code.splitlines(True))
return ''.join(code_lines)
tab = " "
inc_token = ('{', '(', '{\n', '(\n')
dec_token = ('}', ')')
code = [ line.lstrip(' \t') for line in code ]
increase = [ int(any(map(line.endswith, inc_token))) for line in code ]
decrease = [ int(any(map(line.startswith, dec_token)))
for line in code ]
pretty = []
level = 0
for n, line in enumerate(code):
if line == '' or line == '\n':
pretty.append(line)
continue
level -= decrease[n]
pretty.append("%s%s" % (tab*level, line))
level += increase[n]
return pretty
def rust_code(expr, assign_to=None, **settings):
"""Converts an expr to a string of Rust code
Parameters
==========
expr : Expr
A sympy expression to be converted.
assign_to : optional
When given, the argument is used as the name of the variable to which
the expression is assigned. Can be a string, ``Symbol``,
``MatrixSymbol``, or ``Indexed`` type. This is helpful in case of
line-wrapping, or for expressions that generate multi-line statements.
precision : integer, optional
The precision for numbers such as pi [default=15].
user_functions : dict, optional
A dictionary where the keys are string representations of either
``FunctionClass`` or ``UndefinedFunction`` instances and the values
are their desired C string representations. Alternatively, the
dictionary value can be a list of tuples i.e. [(argument_test,
cfunction_string)]. See below for examples.
dereference : iterable, optional
An iterable of symbols that should be dereferenced in the printed code
expression. These would be values passed by address to the function.
For example, if ``dereference=[a]``, the resulting code would print
``(*a)`` instead of ``a``.
human : bool, optional
If True, the result is a single string that may contain some constant
declarations for the number symbols. If False, the same information is
returned in a tuple of (symbols_to_declare, not_supported_functions,
code_text). [default=True].
contract: bool, optional
If True, ``Indexed`` instances are assumed to obey tensor contraction
rules and the corresponding nested loops over indices are generated.
Setting contract=False will not generate loops, instead the user is
responsible to provide values for the indices in the code.
[default=True].
Examples
========
>>> from sympy import rust_code, symbols, Rational, sin, ceiling, Abs, Function
>>> x, tau = symbols("x, tau")
>>> rust_code((2*tau)**Rational(7, 2))
'8*1.4142135623731*tau.powf(7_f64/2.0)'
>>> rust_code(sin(x), assign_to="s")
's = x.sin();'
Simple custom printing can be defined for certain types by passing a
dictionary of {"type" : "function"} to the ``user_functions`` kwarg.
Alternatively, the dictionary value can be a list of tuples i.e.
[(argument_test, cfunction_string)].
>>> custom_functions = {
... "ceiling": "CEIL",
... "Abs": [(lambda x: not x.is_integer, "fabs", 4),
... (lambda x: x.is_integer, "ABS", 4)],
... "func": "f"
... }
>>> func = Function('func')
>>> rust_code(func(Abs(x) + ceiling(x)), user_functions=custom_functions)
'(fabs(x) + x.CEIL()).f()'
``Piecewise`` expressions are converted into conditionals. If an
``assign_to`` variable is provided an if statement is created, otherwise
the ternary operator is used. Note that if the ``Piecewise`` lacks a
default term, represented by ``(expr, True)`` then an error will be thrown.
This is to prevent generating an expression that may not evaluate to
anything.
>>> from sympy import Piecewise
>>> expr = Piecewise((x + 1, x > 0), (x, True))
>>> print(rust_code(expr, tau))
tau = if (x > 0) {
x + 1
} else {
x
};
Support for loops is provided through ``Indexed`` types. With
``contract=True`` these expressions will be turned into loops, whereas
``contract=False`` will just print the assignment expression that should be
looped over:
>>> from sympy import Eq, IndexedBase, Idx
>>> len_y = 5
>>> y = IndexedBase('y', shape=(len_y,))
>>> t = IndexedBase('t', shape=(len_y,))
>>> Dy = IndexedBase('Dy', shape=(len_y-1,))
>>> i = Idx('i', len_y-1)
>>> e=Eq(Dy[i], (y[i+1]-y[i])/(t[i+1]-t[i]))
>>> rust_code(e.rhs, assign_to=e.lhs, contract=False)
'Dy[i] = (y[i + 1] - y[i])/(t[i + 1] - t[i]);'
Matrices are also supported, but a ``MatrixSymbol`` of the same dimensions
must be provided to ``assign_to``. Note that any expression that can be
generated normally can also exist inside a Matrix:
>>> from sympy import Matrix, MatrixSymbol
>>> mat = Matrix([x**2, Piecewise((x + 1, x > 0), (x, True)), sin(x)])
>>> A = MatrixSymbol('A', 3, 1)
>>> print(rust_code(mat, A))
A = [x.powi(2), if (x > 0) {
x + 1
} else {
x
}, x.sin()];
"""
return RustCodePrinter(settings).doprint(expr, assign_to)
def print_rust_code(expr, **settings):
"""Prints Rust representation of the given expression."""
print(rust_code(expr, **settings))
|
f1875be64580b3aff74b27236a3244ac44b5d9496511c74e22563af4b6fbac0b | """
A Printer which converts an expression into its LaTeX equivalent.
"""
from __future__ import print_function, division
from typing import Any, Dict
import itertools
from sympy.core import S, Add, Symbol, Mod
from sympy.core.alphabets import greeks
from sympy.core.containers import Tuple
from sympy.core.function import _coeff_isneg, AppliedUndef, Derivative
from sympy.core.operations import AssocOp
from sympy.core.sympify import SympifyError
from sympy.logic.boolalg import true
# sympy.printing imports
from sympy.printing.precedence import precedence_traditional
from sympy.printing.printer import Printer
from sympy.printing.conventions import split_super_sub, requires_partial
from sympy.printing.precedence import precedence, PRECEDENCE
import mpmath.libmp as mlib
from mpmath.libmp import prec_to_dps
from sympy.core.compatibility import default_sort_key
from sympy.utilities.iterables import has_variety
import re
# Hand-picked functions which can be used directly in both LaTeX and MathJax
# Complete list at
# https://docs.mathjax.org/en/latest/tex.html#supported-latex-commands
# This variable only contains those functions which sympy uses.
accepted_latex_functions = ['arcsin', 'arccos', 'arctan', 'sin', 'cos', 'tan',
'sinh', 'cosh', 'tanh', 'sqrt', 'ln', 'log', 'sec',
'csc', 'cot', 'coth', 're', 'im', 'frac', 'root',
'arg',
]
tex_greek_dictionary = {
'Alpha': 'A',
'Beta': 'B',
'Gamma': r'\Gamma',
'Delta': r'\Delta',
'Epsilon': 'E',
'Zeta': 'Z',
'Eta': 'H',
'Theta': r'\Theta',
'Iota': 'I',
'Kappa': 'K',
'Lambda': r'\Lambda',
'Mu': 'M',
'Nu': 'N',
'Xi': r'\Xi',
'omicron': 'o',
'Omicron': 'O',
'Pi': r'\Pi',
'Rho': 'P',
'Sigma': r'\Sigma',
'Tau': 'T',
'Upsilon': r'\Upsilon',
'Phi': r'\Phi',
'Chi': 'X',
'Psi': r'\Psi',
'Omega': r'\Omega',
'lamda': r'\lambda',
'Lamda': r'\Lambda',
'khi': r'\chi',
'Khi': r'X',
'varepsilon': r'\varepsilon',
'varkappa': r'\varkappa',
'varphi': r'\varphi',
'varpi': r'\varpi',
'varrho': r'\varrho',
'varsigma': r'\varsigma',
'vartheta': r'\vartheta',
}
other_symbols = set(['aleph', 'beth', 'daleth', 'gimel', 'ell', 'eth', 'hbar',
'hslash', 'mho', 'wp', ])
# Variable name modifiers
modifier_dict = {
# Accents
'mathring': lambda s: r'\mathring{'+s+r'}',
'ddddot': lambda s: r'\ddddot{'+s+r'}',
'dddot': lambda s: r'\dddot{'+s+r'}',
'ddot': lambda s: r'\ddot{'+s+r'}',
'dot': lambda s: r'\dot{'+s+r'}',
'check': lambda s: r'\check{'+s+r'}',
'breve': lambda s: r'\breve{'+s+r'}',
'acute': lambda s: r'\acute{'+s+r'}',
'grave': lambda s: r'\grave{'+s+r'}',
'tilde': lambda s: r'\tilde{'+s+r'}',
'hat': lambda s: r'\hat{'+s+r'}',
'bar': lambda s: r'\bar{'+s+r'}',
'vec': lambda s: r'\vec{'+s+r'}',
'prime': lambda s: "{"+s+"}'",
'prm': lambda s: "{"+s+"}'",
# Faces
'bold': lambda s: r'\boldsymbol{'+s+r'}',
'bm': lambda s: r'\boldsymbol{'+s+r'}',
'cal': lambda s: r'\mathcal{'+s+r'}',
'scr': lambda s: r'\mathscr{'+s+r'}',
'frak': lambda s: r'\mathfrak{'+s+r'}',
# Brackets
'norm': lambda s: r'\left\|{'+s+r'}\right\|',
'avg': lambda s: r'\left\langle{'+s+r'}\right\rangle',
'abs': lambda s: r'\left|{'+s+r'}\right|',
'mag': lambda s: r'\left|{'+s+r'}\right|',
}
greek_letters_set = frozenset(greeks)
_between_two_numbers_p = (
re.compile(r'[0-9][} ]*$'), # search
re.compile(r'[{ ]*[-+0-9]'), # match
)
class LatexPrinter(Printer):
printmethod = "_latex"
_default_settings = {
"full_prec": False,
"fold_frac_powers": False,
"fold_func_brackets": False,
"fold_short_frac": None,
"inv_trig_style": "abbreviated",
"itex": False,
"ln_notation": False,
"long_frac_ratio": None,
"mat_delim": "[",
"mat_str": None,
"mode": "plain",
"mul_symbol": None,
"order": None,
"symbol_names": {},
"root_notation": True,
"mat_symbol_style": "plain",
"imaginary_unit": "i",
"gothic_re_im": False,
"decimal_separator": "period",
"perm_cyclic": True,
"min": None,
"max": None,
} # type: Dict[str, Any]
def __init__(self, settings=None):
Printer.__init__(self, settings)
if 'mode' in self._settings:
valid_modes = ['inline', 'plain', 'equation',
'equation*']
if self._settings['mode'] not in valid_modes:
raise ValueError("'mode' must be one of 'inline', 'plain', "
"'equation' or 'equation*'")
if self._settings['fold_short_frac'] is None and \
self._settings['mode'] == 'inline':
self._settings['fold_short_frac'] = True
mul_symbol_table = {
None: r" ",
"ldot": r" \,.\, ",
"dot": r" \cdot ",
"times": r" \times "
}
try:
self._settings['mul_symbol_latex'] = \
mul_symbol_table[self._settings['mul_symbol']]
except KeyError:
self._settings['mul_symbol_latex'] = \
self._settings['mul_symbol']
try:
self._settings['mul_symbol_latex_numbers'] = \
mul_symbol_table[self._settings['mul_symbol'] or 'dot']
except KeyError:
if (self._settings['mul_symbol'].strip() in
['', ' ', '\\', '\\,', '\\:', '\\;', '\\quad']):
self._settings['mul_symbol_latex_numbers'] = \
mul_symbol_table['dot']
else:
self._settings['mul_symbol_latex_numbers'] = \
self._settings['mul_symbol']
self._delim_dict = {'(': ')', '[': ']'}
imaginary_unit_table = {
None: r"i",
"i": r"i",
"ri": r"\mathrm{i}",
"ti": r"\text{i}",
"j": r"j",
"rj": r"\mathrm{j}",
"tj": r"\text{j}",
}
try:
self._settings['imaginary_unit_latex'] = \
imaginary_unit_table[self._settings['imaginary_unit']]
except KeyError:
self._settings['imaginary_unit_latex'] = \
self._settings['imaginary_unit']
def parenthesize(self, item, level, strict=False):
prec_val = precedence_traditional(item)
if (prec_val < level) or ((not strict) and prec_val <= level):
return r"\left({}\right)".format(self._print(item))
else:
return self._print(item)
def parenthesize_super(self, s):
""" Parenthesize s if there is a superscript in s"""
if "^" in s:
return r"\left({}\right)".format(s)
return s
def embed_super(self, s):
""" Embed s in {} if there is a superscript in s"""
if "^" in s:
return "{{{}}}".format(s)
return s
def doprint(self, expr):
tex = Printer.doprint(self, expr)
if self._settings['mode'] == 'plain':
return tex
elif self._settings['mode'] == 'inline':
return r"$%s$" % tex
elif self._settings['itex']:
return r"$$%s$$" % tex
else:
env_str = self._settings['mode']
return r"\begin{%s}%s\end{%s}" % (env_str, tex, env_str)
def _needs_brackets(self, expr):
"""
Returns True if the expression needs to be wrapped in brackets when
printed, False otherwise. For example: a + b => True; a => False;
10 => False; -10 => True.
"""
return not ((expr.is_Integer and expr.is_nonnegative)
or (expr.is_Atom and (expr is not S.NegativeOne
and expr.is_Rational is False)))
def _needs_function_brackets(self, expr):
"""
Returns True if the expression needs to be wrapped in brackets when
passed as an argument to a function, False otherwise. This is a more
liberal version of _needs_brackets, in that many expressions which need
to be wrapped in brackets when added/subtracted/raised to a power do
not need them when passed to a function. Such an example is a*b.
"""
if not self._needs_brackets(expr):
return False
else:
# Muls of the form a*b*c... can be folded
if expr.is_Mul and not self._mul_is_clean(expr):
return True
# Pows which don't need brackets can be folded
elif expr.is_Pow and not self._pow_is_clean(expr):
return True
# Add and Function always need brackets
elif expr.is_Add or expr.is_Function:
return True
else:
return False
def _needs_mul_brackets(self, expr, first=False, last=False):
"""
Returns True if the expression needs to be wrapped in brackets when
printed as part of a Mul, False otherwise. This is True for Add,
but also for some container objects that would not need brackets
when appearing last in a Mul, e.g. an Integral. ``last=True``
specifies that this expr is the last to appear in a Mul.
``first=True`` specifies that this expr is the first to appear in
a Mul.
"""
from sympy import Integral, Product, Sum
if expr.is_Mul:
if not first and _coeff_isneg(expr):
return True
elif precedence_traditional(expr) < PRECEDENCE["Mul"]:
return True
elif expr.is_Relational:
return True
if expr.is_Piecewise:
return True
if any([expr.has(x) for x in (Mod,)]):
return True
if (not last and
any([expr.has(x) for x in (Integral, Product, Sum)])):
return True
return False
def _needs_add_brackets(self, expr):
"""
Returns True if the expression needs to be wrapped in brackets when
printed as part of an Add, False otherwise. This is False for most
things.
"""
if expr.is_Relational:
return True
if any([expr.has(x) for x in (Mod,)]):
return True
if expr.is_Add:
return True
return False
def _mul_is_clean(self, expr):
for arg in expr.args:
if arg.is_Function:
return False
return True
def _pow_is_clean(self, expr):
return not self._needs_brackets(expr.base)
def _do_exponent(self, expr, exp):
if exp is not None:
return r"\left(%s\right)^{%s}" % (expr, exp)
else:
return expr
def _print_Basic(self, expr):
ls = [self._print(o) for o in expr.args]
return self._deal_with_super_sub(expr.__class__.__name__) + \
r"\left(%s\right)" % ", ".join(ls)
def _print_bool(self, e):
return r"\text{%s}" % e
_print_BooleanTrue = _print_bool
_print_BooleanFalse = _print_bool
def _print_NoneType(self, e):
return r"\text{%s}" % e
def _print_Add(self, expr, order=None):
if self.order == 'none':
terms = list(expr.args)
else:
terms = self._as_ordered_terms(expr, order=order)
tex = ""
for i, term in enumerate(terms):
if i == 0:
pass
elif _coeff_isneg(term):
tex += " - "
term = -term
else:
tex += " + "
term_tex = self._print(term)
if self._needs_add_brackets(term):
term_tex = r"\left(%s\right)" % term_tex
tex += term_tex
return tex
def _print_Cycle(self, expr):
from sympy.combinatorics.permutations import Permutation
if expr.size == 0:
return r"\left( \right)"
expr = Permutation(expr)
expr_perm = expr.cyclic_form
siz = expr.size
if expr.array_form[-1] == siz - 1:
expr_perm = expr_perm + [[siz - 1]]
term_tex = ''
for i in expr_perm:
term_tex += str(i).replace(',', r"\;")
term_tex = term_tex.replace('[', r"\left( ")
term_tex = term_tex.replace(']', r"\right)")
return term_tex
def _print_Permutation(self, expr):
from sympy.combinatorics.permutations import Permutation
from sympy.utilities.exceptions import SymPyDeprecationWarning
perm_cyclic = Permutation.print_cyclic
if perm_cyclic is not None:
SymPyDeprecationWarning(
feature="Permutation.print_cyclic = {}".format(perm_cyclic),
useinstead="init_printing(perm_cyclic={})"
.format(perm_cyclic),
issue=15201,
deprecated_since_version="1.6").warn()
else:
perm_cyclic = self._settings.get("perm_cyclic", True)
if perm_cyclic:
return self._print_Cycle(expr)
if expr.size == 0:
return r"\left( \right)"
lower = [self._print(arg) for arg in expr.array_form]
upper = [self._print(arg) for arg in range(len(lower))]
row1 = " & ".join(upper)
row2 = " & ".join(lower)
mat = r" \\ ".join((row1, row2))
return r"\begin{pmatrix} %s \end{pmatrix}" % mat
def _print_AppliedPermutation(self, expr):
perm, var = expr.args
return r"\sigma_{%s}(%s)" % (self._print(perm), self._print(var))
def _print_Float(self, expr):
# Based off of that in StrPrinter
dps = prec_to_dps(expr._prec)
strip = False if self._settings['full_prec'] else True
low = self._settings["min"] if "min" in self._settings else None
high = self._settings["max"] if "max" in self._settings else None
str_real = mlib.to_str(expr._mpf_, dps, strip_zeros=strip, min_fixed=low, max_fixed=high)
# Must always have a mul symbol (as 2.5 10^{20} just looks odd)
# thus we use the number separator
separator = self._settings['mul_symbol_latex_numbers']
if 'e' in str_real:
(mant, exp) = str_real.split('e')
if exp[0] == '+':
exp = exp[1:]
if self._settings['decimal_separator'] == 'comma':
mant = mant.replace('.','{,}')
return r"%s%s10^{%s}" % (mant, separator, exp)
elif str_real == "+inf":
return r"\infty"
elif str_real == "-inf":
return r"- \infty"
else:
if self._settings['decimal_separator'] == 'comma':
str_real = str_real.replace('.','{,}')
return str_real
def _print_Cross(self, expr):
vec1 = expr._expr1
vec2 = expr._expr2
return r"%s \times %s" % (self.parenthesize(vec1, PRECEDENCE['Mul']),
self.parenthesize(vec2, PRECEDENCE['Mul']))
def _print_Curl(self, expr):
vec = expr._expr
return r"\nabla\times %s" % self.parenthesize(vec, PRECEDENCE['Mul'])
def _print_Divergence(self, expr):
vec = expr._expr
return r"\nabla\cdot %s" % self.parenthesize(vec, PRECEDENCE['Mul'])
def _print_Dot(self, expr):
vec1 = expr._expr1
vec2 = expr._expr2
return r"%s \cdot %s" % (self.parenthesize(vec1, PRECEDENCE['Mul']),
self.parenthesize(vec2, PRECEDENCE['Mul']))
def _print_Gradient(self, expr):
func = expr._expr
return r"\nabla %s" % self.parenthesize(func, PRECEDENCE['Mul'])
def _print_Laplacian(self, expr):
func = expr._expr
return r"\triangle %s" % self.parenthesize(func, PRECEDENCE['Mul'])
def _print_Mul(self, expr):
from sympy.core.power import Pow
from sympy.physics.units import Quantity
include_parens = False
if _coeff_isneg(expr):
expr = -expr
tex = "- "
if expr.is_Add:
tex += "("
include_parens = True
else:
tex = ""
from sympy.simplify import fraction
numer, denom = fraction(expr, exact=True)
separator = self._settings['mul_symbol_latex']
numbersep = self._settings['mul_symbol_latex_numbers']
def convert(expr):
if not expr.is_Mul:
return str(self._print(expr))
else:
_tex = last_term_tex = ""
if self.order not in ('old', 'none'):
args = expr.as_ordered_factors()
else:
args = list(expr.args)
# If quantities are present append them at the back
args = sorted(args, key=lambda x: isinstance(x, Quantity) or
(isinstance(x, Pow) and
isinstance(x.base, Quantity)))
for i, term in enumerate(args):
term_tex = self._print(term)
if self._needs_mul_brackets(term, first=(i == 0),
last=(i == len(args) - 1)):
term_tex = r"\left(%s\right)" % term_tex
if _between_two_numbers_p[0].search(last_term_tex) and \
_between_two_numbers_p[1].match(term_tex):
# between two numbers
_tex += numbersep
elif _tex:
_tex += separator
_tex += term_tex
last_term_tex = term_tex
return _tex
if denom is S.One and Pow(1, -1, evaluate=False) not in expr.args:
# use the original expression here, since fraction() may have
# altered it when producing numer and denom
tex += convert(expr)
else:
snumer = convert(numer)
sdenom = convert(denom)
ldenom = len(sdenom.split())
ratio = self._settings['long_frac_ratio']
if self._settings['fold_short_frac'] and ldenom <= 2 and \
"^" not in sdenom:
# handle short fractions
if self._needs_mul_brackets(numer, last=False):
tex += r"\left(%s\right) / %s" % (snumer, sdenom)
else:
tex += r"%s / %s" % (snumer, sdenom)
elif ratio is not None and \
len(snumer.split()) > ratio*ldenom:
# handle long fractions
if self._needs_mul_brackets(numer, last=True):
tex += r"\frac{1}{%s}%s\left(%s\right)" \
% (sdenom, separator, snumer)
elif numer.is_Mul:
# split a long numerator
a = S.One
b = S.One
for x in numer.args:
if self._needs_mul_brackets(x, last=False) or \
len(convert(a*x).split()) > ratio*ldenom or \
(b.is_commutative is x.is_commutative is False):
b *= x
else:
a *= x
if self._needs_mul_brackets(b, last=True):
tex += r"\frac{%s}{%s}%s\left(%s\right)" \
% (convert(a), sdenom, separator, convert(b))
else:
tex += r"\frac{%s}{%s}%s%s" \
% (convert(a), sdenom, separator, convert(b))
else:
tex += r"\frac{1}{%s}%s%s" % (sdenom, separator, snumer)
else:
tex += r"\frac{%s}{%s}" % (snumer, sdenom)
if include_parens:
tex += ")"
return tex
def _print_Pow(self, expr):
# Treat x**Rational(1,n) as special case
if expr.exp.is_Rational and abs(expr.exp.p) == 1 and expr.exp.q != 1 \
and self._settings['root_notation']:
base = self._print(expr.base)
expq = expr.exp.q
if expq == 2:
tex = r"\sqrt{%s}" % base
elif self._settings['itex']:
tex = r"\root{%d}{%s}" % (expq, base)
else:
tex = r"\sqrt[%d]{%s}" % (expq, base)
if expr.exp.is_negative:
return r"\frac{1}{%s}" % tex
else:
return tex
elif self._settings['fold_frac_powers'] \
and expr.exp.is_Rational \
and expr.exp.q != 1:
base = self.parenthesize(expr.base, PRECEDENCE['Pow'])
p, q = expr.exp.p, expr.exp.q
# issue #12886: add parentheses for superscripts raised to powers
if '^' in base and expr.base.is_Symbol:
base = r"\left(%s\right)" % base
if expr.base.is_Function:
return self._print(expr.base, exp="%s/%s" % (p, q))
return r"%s^{%s/%s}" % (base, p, q)
elif expr.exp.is_Rational and expr.exp.is_negative and \
expr.base.is_commutative:
# special case for 1^(-x), issue 9216
if expr.base == 1:
return r"%s^{%s}" % (expr.base, expr.exp)
# things like 1/x
return self._print_Mul(expr)
else:
if expr.base.is_Function:
return self._print(expr.base, exp=self._print(expr.exp))
else:
tex = r"%s^{%s}"
return self._helper_print_standard_power(expr, tex)
def _helper_print_standard_power(self, expr, template):
exp = self._print(expr.exp)
# issue #12886: add parentheses around superscripts raised
# to powers
base = self.parenthesize(expr.base, PRECEDENCE['Pow'])
if '^' in base and expr.base.is_Symbol:
base = r"\left(%s\right)" % base
elif (isinstance(expr.base, Derivative)
and base.startswith(r'\left(')
and re.match(r'\\left\(\\d?d?dot', base)
and base.endswith(r'\right)')):
# don't use parentheses around dotted derivative
base = base[6: -7] # remove outermost added parens
return template % (base, exp)
def _print_UnevaluatedExpr(self, expr):
return self._print(expr.args[0])
def _print_Sum(self, expr):
if len(expr.limits) == 1:
tex = r"\sum_{%s=%s}^{%s} " % \
tuple([self._print(i) for i in expr.limits[0]])
else:
def _format_ineq(l):
return r"%s \leq %s \leq %s" % \
tuple([self._print(s) for s in (l[1], l[0], l[2])])
tex = r"\sum_{\substack{%s}} " % \
str.join('\\\\', [_format_ineq(l) for l in expr.limits])
if isinstance(expr.function, Add):
tex += r"\left(%s\right)" % self._print(expr.function)
else:
tex += self._print(expr.function)
return tex
def _print_Product(self, expr):
if len(expr.limits) == 1:
tex = r"\prod_{%s=%s}^{%s} " % \
tuple([self._print(i) for i in expr.limits[0]])
else:
def _format_ineq(l):
return r"%s \leq %s \leq %s" % \
tuple([self._print(s) for s in (l[1], l[0], l[2])])
tex = r"\prod_{\substack{%s}} " % \
str.join('\\\\', [_format_ineq(l) for l in expr.limits])
if isinstance(expr.function, Add):
tex += r"\left(%s\right)" % self._print(expr.function)
else:
tex += self._print(expr.function)
return tex
def _print_BasisDependent(self, expr):
from sympy.vector import Vector
o1 = []
if expr == expr.zero:
return expr.zero._latex_form
if isinstance(expr, Vector):
items = expr.separate().items()
else:
items = [(0, expr)]
for system, vect in items:
inneritems = list(vect.components.items())
inneritems.sort(key=lambda x: x[0].__str__())
for k, v in inneritems:
if v == 1:
o1.append(' + ' + k._latex_form)
elif v == -1:
o1.append(' - ' + k._latex_form)
else:
arg_str = '(' + LatexPrinter().doprint(v) + ')'
o1.append(' + ' + arg_str + k._latex_form)
outstr = (''.join(o1))
if outstr[1] != '-':
outstr = outstr[3:]
else:
outstr = outstr[1:]
return outstr
def _print_Indexed(self, expr):
tex_base = self._print(expr.base)
tex = '{'+tex_base+'}'+'_{%s}' % ','.join(
map(self._print, expr.indices))
return tex
def _print_IndexedBase(self, expr):
return self._print(expr.label)
def _print_Derivative(self, expr):
if requires_partial(expr.expr):
diff_symbol = r'\partial'
else:
diff_symbol = r'd'
tex = ""
dim = 0
for x, num in reversed(expr.variable_count):
dim += num
if num == 1:
tex += r"%s %s" % (diff_symbol, self._print(x))
else:
tex += r"%s %s^{%s}" % (diff_symbol,
self.parenthesize_super(self._print(x)),
self._print(num))
if dim == 1:
tex = r"\frac{%s}{%s}" % (diff_symbol, tex)
else:
tex = r"\frac{%s^{%s}}{%s}" % (diff_symbol, self._print(dim), tex)
return r"%s %s" % (tex, self.parenthesize(expr.expr,
PRECEDENCE["Mul"],
strict=True))
def _print_Subs(self, subs):
expr, old, new = subs.args
latex_expr = self._print(expr)
latex_old = (self._print(e) for e in old)
latex_new = (self._print(e) for e in new)
latex_subs = r'\\ '.join(
e[0] + '=' + e[1] for e in zip(latex_old, latex_new))
return r'\left. %s \right|_{\substack{ %s }}' % (latex_expr,
latex_subs)
def _print_Integral(self, expr):
tex, symbols = "", []
# Only up to \iiiint exists
if len(expr.limits) <= 4 and all(len(lim) == 1 for lim in expr.limits):
# Use len(expr.limits)-1 so that syntax highlighters don't think
# \" is an escaped quote
tex = r"\i" + "i"*(len(expr.limits) - 1) + "nt"
symbols = [r"\, d%s" % self._print(symbol[0])
for symbol in expr.limits]
else:
for lim in reversed(expr.limits):
symbol = lim[0]
tex += r"\int"
if len(lim) > 1:
if self._settings['mode'] != 'inline' \
and not self._settings['itex']:
tex += r"\limits"
if len(lim) == 3:
tex += "_{%s}^{%s}" % (self._print(lim[1]),
self._print(lim[2]))
if len(lim) == 2:
tex += "^{%s}" % (self._print(lim[1]))
symbols.insert(0, r"\, d%s" % self._print(symbol))
return r"%s %s%s" % (tex, self.parenthesize(expr.function,
PRECEDENCE["Mul"],
strict=True),
"".join(symbols))
def _print_Limit(self, expr):
e, z, z0, dir = expr.args
tex = r"\lim_{%s \to " % self._print(z)
if str(dir) == '+-' or z0 in (S.Infinity, S.NegativeInfinity):
tex += r"%s}" % self._print(z0)
else:
tex += r"%s^%s}" % (self._print(z0), self._print(dir))
if isinstance(e, AssocOp):
return r"%s\left(%s\right)" % (tex, self._print(e))
else:
return r"%s %s" % (tex, self._print(e))
def _hprint_Function(self, func):
r'''
Logic to decide how to render a function to latex
- if it is a recognized latex name, use the appropriate latex command
- if it is a single letter, just use that letter
- if it is a longer name, then put \operatorname{} around it and be
mindful of undercores in the name
'''
func = self._deal_with_super_sub(func)
if func in accepted_latex_functions:
name = r"\%s" % func
elif len(func) == 1 or func.startswith('\\'):
name = func
else:
name = r"\operatorname{%s}" % func
return name
def _print_Function(self, expr, exp=None):
r'''
Render functions to LaTeX, handling functions that LaTeX knows about
e.g., sin, cos, ... by using the proper LaTeX command (\sin, \cos, ...).
For single-letter function names, render them as regular LaTeX math
symbols. For multi-letter function names that LaTeX does not know
about, (e.g., Li, sech) use \operatorname{} so that the function name
is rendered in Roman font and LaTeX handles spacing properly.
expr is the expression involving the function
exp is an exponent
'''
func = expr.func.__name__
if hasattr(self, '_print_' + func) and \
not isinstance(expr, AppliedUndef):
return getattr(self, '_print_' + func)(expr, exp)
else:
args = [str(self._print(arg)) for arg in expr.args]
# How inverse trig functions should be displayed, formats are:
# abbreviated: asin, full: arcsin, power: sin^-1
inv_trig_style = self._settings['inv_trig_style']
# If we are dealing with a power-style inverse trig function
inv_trig_power_case = False
# If it is applicable to fold the argument brackets
can_fold_brackets = self._settings['fold_func_brackets'] and \
len(args) == 1 and \
not self._needs_function_brackets(expr.args[0])
inv_trig_table = ["asin", "acos", "atan", "acsc", "asec", "acot"]
# If the function is an inverse trig function, handle the style
if func in inv_trig_table:
if inv_trig_style == "abbreviated":
pass
elif inv_trig_style == "full":
func = "arc" + func[1:]
elif inv_trig_style == "power":
func = func[1:]
inv_trig_power_case = True
# Can never fold brackets if we're raised to a power
if exp is not None:
can_fold_brackets = False
if inv_trig_power_case:
if func in accepted_latex_functions:
name = r"\%s^{-1}" % func
else:
name = r"\operatorname{%s}^{-1}" % func
elif exp is not None:
name = r'%s^{%s}' % (self._hprint_Function(func), exp)
else:
name = self._hprint_Function(func)
if can_fold_brackets:
if func in accepted_latex_functions:
# Wrap argument safely to avoid parse-time conflicts
# with the function name itself
name += r" {%s}"
else:
name += r"%s"
else:
name += r"{\left(%s \right)}"
if inv_trig_power_case and exp is not None:
name += r"^{%s}" % exp
return name % ",".join(args)
def _print_UndefinedFunction(self, expr):
return self._hprint_Function(str(expr))
def _print_ElementwiseApplyFunction(self, expr):
return r"{%s}_{\circ}\left({%s}\right)" % (
self._print(expr.function),
self._print(expr.expr),
)
@property
def _special_function_classes(self):
from sympy.functions.special.tensor_functions import KroneckerDelta
from sympy.functions.special.gamma_functions import gamma, lowergamma
from sympy.functions.special.beta_functions import beta
from sympy.functions.special.delta_functions import DiracDelta
from sympy.functions.special.error_functions import Chi
return {KroneckerDelta: r'\delta',
gamma: r'\Gamma',
lowergamma: r'\gamma',
beta: r'\operatorname{B}',
DiracDelta: r'\delta',
Chi: r'\operatorname{Chi}'}
def _print_FunctionClass(self, expr):
for cls in self._special_function_classes:
if issubclass(expr, cls) and expr.__name__ == cls.__name__:
return self._special_function_classes[cls]
return self._hprint_Function(str(expr))
def _print_Lambda(self, expr):
symbols, expr = expr.args
if len(symbols) == 1:
symbols = self._print(symbols[0])
else:
symbols = self._print(tuple(symbols))
tex = r"\left( %s \mapsto %s \right)" % (symbols, self._print(expr))
return tex
def _hprint_variadic_function(self, expr, exp=None):
args = sorted(expr.args, key=default_sort_key)
texargs = [r"%s" % self._print(symbol) for symbol in args]
tex = r"\%s\left(%s\right)" % (self._print((str(expr.func)).lower()),
", ".join(texargs))
if exp is not None:
return r"%s^{%s}" % (tex, exp)
else:
return tex
_print_Min = _print_Max = _hprint_variadic_function
def _print_floor(self, expr, exp=None):
tex = r"\left\lfloor{%s}\right\rfloor" % self._print(expr.args[0])
if exp is not None:
return r"%s^{%s}" % (tex, exp)
else:
return tex
def _print_ceiling(self, expr, exp=None):
tex = r"\left\lceil{%s}\right\rceil" % self._print(expr.args[0])
if exp is not None:
return r"%s^{%s}" % (tex, exp)
else:
return tex
def _print_log(self, expr, exp=None):
if not self._settings["ln_notation"]:
tex = r"\log{\left(%s \right)}" % self._print(expr.args[0])
else:
tex = r"\ln{\left(%s \right)}" % self._print(expr.args[0])
if exp is not None:
return r"%s^{%s}" % (tex, exp)
else:
return tex
def _print_Abs(self, expr, exp=None):
tex = r"\left|{%s}\right|" % self._print(expr.args[0])
if exp is not None:
return r"%s^{%s}" % (tex, exp)
else:
return tex
_print_Determinant = _print_Abs
def _print_re(self, expr, exp=None):
if self._settings['gothic_re_im']:
tex = r"\Re{%s}" % self.parenthesize(expr.args[0], PRECEDENCE['Atom'])
else:
tex = r"\operatorname{{re}}{{{}}}".format(self.parenthesize(expr.args[0], PRECEDENCE['Atom']))
return self._do_exponent(tex, exp)
def _print_im(self, expr, exp=None):
if self._settings['gothic_re_im']:
tex = r"\Im{%s}" % self.parenthesize(expr.args[0], PRECEDENCE['Atom'])
else:
tex = r"\operatorname{{im}}{{{}}}".format(self.parenthesize(expr.args[0], PRECEDENCE['Atom']))
return self._do_exponent(tex, exp)
def _print_Not(self, e):
from sympy import Equivalent, Implies
if isinstance(e.args[0], Equivalent):
return self._print_Equivalent(e.args[0], r"\not\Leftrightarrow")
if isinstance(e.args[0], Implies):
return self._print_Implies(e.args[0], r"\not\Rightarrow")
if (e.args[0].is_Boolean):
return r"\neg \left(%s\right)" % self._print(e.args[0])
else:
return r"\neg %s" % self._print(e.args[0])
def _print_LogOp(self, args, char):
arg = args[0]
if arg.is_Boolean and not arg.is_Not:
tex = r"\left(%s\right)" % self._print(arg)
else:
tex = r"%s" % self._print(arg)
for arg in args[1:]:
if arg.is_Boolean and not arg.is_Not:
tex += r" %s \left(%s\right)" % (char, self._print(arg))
else:
tex += r" %s %s" % (char, self._print(arg))
return tex
def _print_And(self, e):
args = sorted(e.args, key=default_sort_key)
return self._print_LogOp(args, r"\wedge")
def _print_Or(self, e):
args = sorted(e.args, key=default_sort_key)
return self._print_LogOp(args, r"\vee")
def _print_Xor(self, e):
args = sorted(e.args, key=default_sort_key)
return self._print_LogOp(args, r"\veebar")
def _print_Implies(self, e, altchar=None):
return self._print_LogOp(e.args, altchar or r"\Rightarrow")
def _print_Equivalent(self, e, altchar=None):
args = sorted(e.args, key=default_sort_key)
return self._print_LogOp(args, altchar or r"\Leftrightarrow")
def _print_conjugate(self, expr, exp=None):
tex = r"\overline{%s}" % self._print(expr.args[0])
if exp is not None:
return r"%s^{%s}" % (tex, exp)
else:
return tex
def _print_polar_lift(self, expr, exp=None):
func = r"\operatorname{polar\_lift}"
arg = r"{\left(%s \right)}" % self._print(expr.args[0])
if exp is not None:
return r"%s^{%s}%s" % (func, exp, arg)
else:
return r"%s%s" % (func, arg)
def _print_ExpBase(self, expr, exp=None):
# TODO should exp_polar be printed differently?
# what about exp_polar(0), exp_polar(1)?
tex = r"e^{%s}" % self._print(expr.args[0])
return self._do_exponent(tex, exp)
def _print_elliptic_k(self, expr, exp=None):
tex = r"\left(%s\right)" % self._print(expr.args[0])
if exp is not None:
return r"K^{%s}%s" % (exp, tex)
else:
return r"K%s" % tex
def _print_elliptic_f(self, expr, exp=None):
tex = r"\left(%s\middle| %s\right)" % \
(self._print(expr.args[0]), self._print(expr.args[1]))
if exp is not None:
return r"F^{%s}%s" % (exp, tex)
else:
return r"F%s" % tex
def _print_elliptic_e(self, expr, exp=None):
if len(expr.args) == 2:
tex = r"\left(%s\middle| %s\right)" % \
(self._print(expr.args[0]), self._print(expr.args[1]))
else:
tex = r"\left(%s\right)" % self._print(expr.args[0])
if exp is not None:
return r"E^{%s}%s" % (exp, tex)
else:
return r"E%s" % tex
def _print_elliptic_pi(self, expr, exp=None):
if len(expr.args) == 3:
tex = r"\left(%s; %s\middle| %s\right)" % \
(self._print(expr.args[0]), self._print(expr.args[1]),
self._print(expr.args[2]))
else:
tex = r"\left(%s\middle| %s\right)" % \
(self._print(expr.args[0]), self._print(expr.args[1]))
if exp is not None:
return r"\Pi^{%s}%s" % (exp, tex)
else:
return r"\Pi%s" % tex
def _print_beta(self, expr, exp=None):
tex = r"\left(%s, %s\right)" % (self._print(expr.args[0]),
self._print(expr.args[1]))
if exp is not None:
return r"\operatorname{B}^{%s}%s" % (exp, tex)
else:
return r"\operatorname{B}%s" % tex
def _print_uppergamma(self, expr, exp=None):
tex = r"\left(%s, %s\right)" % (self._print(expr.args[0]),
self._print(expr.args[1]))
if exp is not None:
return r"\Gamma^{%s}%s" % (exp, tex)
else:
return r"\Gamma%s" % tex
def _print_lowergamma(self, expr, exp=None):
tex = r"\left(%s, %s\right)" % (self._print(expr.args[0]),
self._print(expr.args[1]))
if exp is not None:
return r"\gamma^{%s}%s" % (exp, tex)
else:
return r"\gamma%s" % tex
def _hprint_one_arg_func(self, expr, exp=None):
tex = r"\left(%s\right)" % self._print(expr.args[0])
if exp is not None:
return r"%s^{%s}%s" % (self._print(expr.func), exp, tex)
else:
return r"%s%s" % (self._print(expr.func), tex)
_print_gamma = _hprint_one_arg_func
def _print_Chi(self, expr, exp=None):
tex = r"\left(%s\right)" % self._print(expr.args[0])
if exp is not None:
return r"\operatorname{Chi}^{%s}%s" % (exp, tex)
else:
return r"\operatorname{Chi}%s" % tex
def _print_expint(self, expr, exp=None):
tex = r"\left(%s\right)" % self._print(expr.args[1])
nu = self._print(expr.args[0])
if exp is not None:
return r"\operatorname{E}_{%s}^{%s}%s" % (nu, exp, tex)
else:
return r"\operatorname{E}_{%s}%s" % (nu, tex)
def _print_fresnels(self, expr, exp=None):
tex = r"\left(%s\right)" % self._print(expr.args[0])
if exp is not None:
return r"S^{%s}%s" % (exp, tex)
else:
return r"S%s" % tex
def _print_fresnelc(self, expr, exp=None):
tex = r"\left(%s\right)" % self._print(expr.args[0])
if exp is not None:
return r"C^{%s}%s" % (exp, tex)
else:
return r"C%s" % tex
def _print_subfactorial(self, expr, exp=None):
tex = r"!%s" % self.parenthesize(expr.args[0], PRECEDENCE["Func"])
if exp is not None:
return r"\left(%s\right)^{%s}" % (tex, exp)
else:
return tex
def _print_factorial(self, expr, exp=None):
tex = r"%s!" % self.parenthesize(expr.args[0], PRECEDENCE["Func"])
if exp is not None:
return r"%s^{%s}" % (tex, exp)
else:
return tex
def _print_factorial2(self, expr, exp=None):
tex = r"%s!!" % self.parenthesize(expr.args[0], PRECEDENCE["Func"])
if exp is not None:
return r"%s^{%s}" % (tex, exp)
else:
return tex
def _print_binomial(self, expr, exp=None):
tex = r"{\binom{%s}{%s}}" % (self._print(expr.args[0]),
self._print(expr.args[1]))
if exp is not None:
return r"%s^{%s}" % (tex, exp)
else:
return tex
def _print_RisingFactorial(self, expr, exp=None):
n, k = expr.args
base = r"%s" % self.parenthesize(n, PRECEDENCE['Func'])
tex = r"{%s}^{\left(%s\right)}" % (base, self._print(k))
return self._do_exponent(tex, exp)
def _print_FallingFactorial(self, expr, exp=None):
n, k = expr.args
sub = r"%s" % self.parenthesize(k, PRECEDENCE['Func'])
tex = r"{\left(%s\right)}_{%s}" % (self._print(n), sub)
return self._do_exponent(tex, exp)
def _hprint_BesselBase(self, expr, exp, sym):
tex = r"%s" % (sym)
need_exp = False
if exp is not None:
if tex.find('^') == -1:
tex = r"%s^{%s}" % (tex, self._print(exp))
else:
need_exp = True
tex = r"%s_{%s}\left(%s\right)" % (tex, self._print(expr.order),
self._print(expr.argument))
if need_exp:
tex = self._do_exponent(tex, exp)
return tex
def _hprint_vec(self, vec):
if not vec:
return ""
s = ""
for i in vec[:-1]:
s += "%s, " % self._print(i)
s += self._print(vec[-1])
return s
def _print_besselj(self, expr, exp=None):
return self._hprint_BesselBase(expr, exp, 'J')
def _print_besseli(self, expr, exp=None):
return self._hprint_BesselBase(expr, exp, 'I')
def _print_besselk(self, expr, exp=None):
return self._hprint_BesselBase(expr, exp, 'K')
def _print_bessely(self, expr, exp=None):
return self._hprint_BesselBase(expr, exp, 'Y')
def _print_yn(self, expr, exp=None):
return self._hprint_BesselBase(expr, exp, 'y')
def _print_jn(self, expr, exp=None):
return self._hprint_BesselBase(expr, exp, 'j')
def _print_hankel1(self, expr, exp=None):
return self._hprint_BesselBase(expr, exp, 'H^{(1)}')
def _print_hankel2(self, expr, exp=None):
return self._hprint_BesselBase(expr, exp, 'H^{(2)}')
def _print_hn1(self, expr, exp=None):
return self._hprint_BesselBase(expr, exp, 'h^{(1)}')
def _print_hn2(self, expr, exp=None):
return self._hprint_BesselBase(expr, exp, 'h^{(2)}')
def _hprint_airy(self, expr, exp=None, notation=""):
tex = r"\left(%s\right)" % self._print(expr.args[0])
if exp is not None:
return r"%s^{%s}%s" % (notation, exp, tex)
else:
return r"%s%s" % (notation, tex)
def _hprint_airy_prime(self, expr, exp=None, notation=""):
tex = r"\left(%s\right)" % self._print(expr.args[0])
if exp is not None:
return r"{%s^\prime}^{%s}%s" % (notation, exp, tex)
else:
return r"%s^\prime%s" % (notation, tex)
def _print_airyai(self, expr, exp=None):
return self._hprint_airy(expr, exp, 'Ai')
def _print_airybi(self, expr, exp=None):
return self._hprint_airy(expr, exp, 'Bi')
def _print_airyaiprime(self, expr, exp=None):
return self._hprint_airy_prime(expr, exp, 'Ai')
def _print_airybiprime(self, expr, exp=None):
return self._hprint_airy_prime(expr, exp, 'Bi')
def _print_hyper(self, expr, exp=None):
tex = r"{{}_{%s}F_{%s}\left(\begin{matrix} %s \\ %s \end{matrix}" \
r"\middle| {%s} \right)}" % \
(self._print(len(expr.ap)), self._print(len(expr.bq)),
self._hprint_vec(expr.ap), self._hprint_vec(expr.bq),
self._print(expr.argument))
if exp is not None:
tex = r"{%s}^{%s}" % (tex, self._print(exp))
return tex
def _print_meijerg(self, expr, exp=None):
tex = r"{G_{%s, %s}^{%s, %s}\left(\begin{matrix} %s & %s \\" \
r"%s & %s \end{matrix} \middle| {%s} \right)}" % \
(self._print(len(expr.ap)), self._print(len(expr.bq)),
self._print(len(expr.bm)), self._print(len(expr.an)),
self._hprint_vec(expr.an), self._hprint_vec(expr.aother),
self._hprint_vec(expr.bm), self._hprint_vec(expr.bother),
self._print(expr.argument))
if exp is not None:
tex = r"{%s}^{%s}" % (tex, self._print(exp))
return tex
def _print_dirichlet_eta(self, expr, exp=None):
tex = r"\left(%s\right)" % self._print(expr.args[0])
if exp is not None:
return r"\eta^{%s}%s" % (self._print(exp), tex)
return r"\eta%s" % tex
def _print_zeta(self, expr, exp=None):
if len(expr.args) == 2:
tex = r"\left(%s, %s\right)" % tuple(map(self._print, expr.args))
else:
tex = r"\left(%s\right)" % self._print(expr.args[0])
if exp is not None:
return r"\zeta^{%s}%s" % (self._print(exp), tex)
return r"\zeta%s" % tex
def _print_stieltjes(self, expr, exp=None):
if len(expr.args) == 2:
tex = r"_{%s}\left(%s\right)" % tuple(map(self._print, expr.args))
else:
tex = r"_{%s}" % self._print(expr.args[0])
if exp is not None:
return r"\gamma%s^{%s}" % (tex, self._print(exp))
return r"\gamma%s" % tex
def _print_lerchphi(self, expr, exp=None):
tex = r"\left(%s, %s, %s\right)" % tuple(map(self._print, expr.args))
if exp is None:
return r"\Phi%s" % tex
return r"\Phi^{%s}%s" % (self._print(exp), tex)
def _print_polylog(self, expr, exp=None):
s, z = map(self._print, expr.args)
tex = r"\left(%s\right)" % z
if exp is None:
return r"\operatorname{Li}_{%s}%s" % (s, tex)
return r"\operatorname{Li}_{%s}^{%s}%s" % (s, self._print(exp), tex)
def _print_jacobi(self, expr, exp=None):
n, a, b, x = map(self._print, expr.args)
tex = r"P_{%s}^{\left(%s,%s\right)}\left(%s\right)" % (n, a, b, x)
if exp is not None:
tex = r"\left(" + tex + r"\right)^{%s}" % (self._print(exp))
return tex
def _print_gegenbauer(self, expr, exp=None):
n, a, x = map(self._print, expr.args)
tex = r"C_{%s}^{\left(%s\right)}\left(%s\right)" % (n, a, x)
if exp is not None:
tex = r"\left(" + tex + r"\right)^{%s}" % (self._print(exp))
return tex
def _print_chebyshevt(self, expr, exp=None):
n, x = map(self._print, expr.args)
tex = r"T_{%s}\left(%s\right)" % (n, x)
if exp is not None:
tex = r"\left(" + tex + r"\right)^{%s}" % (self._print(exp))
return tex
def _print_chebyshevu(self, expr, exp=None):
n, x = map(self._print, expr.args)
tex = r"U_{%s}\left(%s\right)" % (n, x)
if exp is not None:
tex = r"\left(" + tex + r"\right)^{%s}" % (self._print(exp))
return tex
def _print_legendre(self, expr, exp=None):
n, x = map(self._print, expr.args)
tex = r"P_{%s}\left(%s\right)" % (n, x)
if exp is not None:
tex = r"\left(" + tex + r"\right)^{%s}" % (self._print(exp))
return tex
def _print_assoc_legendre(self, expr, exp=None):
n, a, x = map(self._print, expr.args)
tex = r"P_{%s}^{\left(%s\right)}\left(%s\right)" % (n, a, x)
if exp is not None:
tex = r"\left(" + tex + r"\right)^{%s}" % (self._print(exp))
return tex
def _print_hermite(self, expr, exp=None):
n, x = map(self._print, expr.args)
tex = r"H_{%s}\left(%s\right)" % (n, x)
if exp is not None:
tex = r"\left(" + tex + r"\right)^{%s}" % (self._print(exp))
return tex
def _print_laguerre(self, expr, exp=None):
n, x = map(self._print, expr.args)
tex = r"L_{%s}\left(%s\right)" % (n, x)
if exp is not None:
tex = r"\left(" + tex + r"\right)^{%s}" % (self._print(exp))
return tex
def _print_assoc_laguerre(self, expr, exp=None):
n, a, x = map(self._print, expr.args)
tex = r"L_{%s}^{\left(%s\right)}\left(%s\right)" % (n, a, x)
if exp is not None:
tex = r"\left(" + tex + r"\right)^{%s}" % (self._print(exp))
return tex
def _print_Ynm(self, expr, exp=None):
n, m, theta, phi = map(self._print, expr.args)
tex = r"Y_{%s}^{%s}\left(%s,%s\right)" % (n, m, theta, phi)
if exp is not None:
tex = r"\left(" + tex + r"\right)^{%s}" % (self._print(exp))
return tex
def _print_Znm(self, expr, exp=None):
n, m, theta, phi = map(self._print, expr.args)
tex = r"Z_{%s}^{%s}\left(%s,%s\right)" % (n, m, theta, phi)
if exp is not None:
tex = r"\left(" + tex + r"\right)^{%s}" % (self._print(exp))
return tex
def __print_mathieu_functions(self, character, args, prime=False, exp=None):
a, q, z = map(self._print, args)
sup = r"^{\prime}" if prime else ""
exp = "" if not exp else "^{%s}" % self._print(exp)
return r"%s%s\left(%s, %s, %s\right)%s" % (character, sup, a, q, z, exp)
def _print_mathieuc(self, expr, exp=None):
return self.__print_mathieu_functions("C", expr.args, exp=exp)
def _print_mathieus(self, expr, exp=None):
return self.__print_mathieu_functions("S", expr.args, exp=exp)
def _print_mathieucprime(self, expr, exp=None):
return self.__print_mathieu_functions("C", expr.args, prime=True, exp=exp)
def _print_mathieusprime(self, expr, exp=None):
return self.__print_mathieu_functions("S", expr.args, prime=True, exp=exp)
def _print_Rational(self, expr):
if expr.q != 1:
sign = ""
p = expr.p
if expr.p < 0:
sign = "- "
p = -p
if self._settings['fold_short_frac']:
return r"%s%d / %d" % (sign, p, expr.q)
return r"%s\frac{%d}{%d}" % (sign, p, expr.q)
else:
return self._print(expr.p)
def _print_Order(self, expr):
s = self._print(expr.expr)
if expr.point and any(p != S.Zero for p in expr.point) or \
len(expr.variables) > 1:
s += '; '
if len(expr.variables) > 1:
s += self._print(expr.variables)
elif expr.variables:
s += self._print(expr.variables[0])
s += r'\rightarrow '
if len(expr.point) > 1:
s += self._print(expr.point)
else:
s += self._print(expr.point[0])
return r"O\left(%s\right)" % s
def _print_Symbol(self, expr, style='plain'):
if expr in self._settings['symbol_names']:
return self._settings['symbol_names'][expr]
result = self._deal_with_super_sub(expr.name) if \
'\\' not in expr.name else expr.name
if style == 'bold':
result = r"\mathbf{{{}}}".format(result)
return result
_print_RandomSymbol = _print_Symbol
def _deal_with_super_sub(self, string):
if '{' in string:
return string
name, supers, subs = split_super_sub(string)
name = translate(name)
supers = [translate(sup) for sup in supers]
subs = [translate(sub) for sub in subs]
# glue all items together:
if supers:
name += "^{%s}" % " ".join(supers)
if subs:
name += "_{%s}" % " ".join(subs)
return name
def _print_Relational(self, expr):
if self._settings['itex']:
gt = r"\gt"
lt = r"\lt"
else:
gt = ">"
lt = "<"
charmap = {
"==": "=",
">": gt,
"<": lt,
">=": r"\geq",
"<=": r"\leq",
"!=": r"\neq",
}
return "%s %s %s" % (self._print(expr.lhs),
charmap[expr.rel_op], self._print(expr.rhs))
def _print_Piecewise(self, expr):
ecpairs = [r"%s & \text{for}\: %s" % (self._print(e), self._print(c))
for e, c in expr.args[:-1]]
if expr.args[-1].cond == true:
ecpairs.append(r"%s & \text{otherwise}" %
self._print(expr.args[-1].expr))
else:
ecpairs.append(r"%s & \text{for}\: %s" %
(self._print(expr.args[-1].expr),
self._print(expr.args[-1].cond)))
tex = r"\begin{cases} %s \end{cases}"
return tex % r" \\".join(ecpairs)
def _print_MatrixBase(self, expr):
lines = []
for line in range(expr.rows): # horrible, should be 'rows'
lines.append(" & ".join([self._print(i) for i in expr[line, :]]))
mat_str = self._settings['mat_str']
if mat_str is None:
if self._settings['mode'] == 'inline':
mat_str = 'smallmatrix'
else:
if (expr.cols <= 10) is True:
mat_str = 'matrix'
else:
mat_str = 'array'
out_str = r'\begin{%MATSTR%}%s\end{%MATSTR%}'
out_str = out_str.replace('%MATSTR%', mat_str)
if mat_str == 'array':
out_str = out_str.replace('%s', '{' + 'c'*expr.cols + '}%s')
if self._settings['mat_delim']:
left_delim = self._settings['mat_delim']
right_delim = self._delim_dict[left_delim]
out_str = r'\left' + left_delim + out_str + \
r'\right' + right_delim
return out_str % r"\\".join(lines)
_print_ImmutableMatrix = _print_ImmutableDenseMatrix \
= _print_Matrix \
= _print_MatrixBase
def _print_MatrixElement(self, expr):
return self.parenthesize(expr.parent, PRECEDENCE["Atom"], strict=True)\
+ '_{%s, %s}' % (self._print(expr.i), self._print(expr.j))
def _print_MatrixSlice(self, expr):
def latexslice(x):
x = list(x)
if x[2] == 1:
del x[2]
if x[1] == x[0] + 1:
del x[1]
if x[0] == 0:
x[0] = ''
return ':'.join(map(self._print, x))
return (self._print(expr.parent) + r'\left[' +
latexslice(expr.rowslice) + ', ' +
latexslice(expr.colslice) + r'\right]')
def _print_BlockMatrix(self, expr):
return self._print(expr.blocks)
def _print_Transpose(self, expr):
mat = expr.arg
from sympy.matrices import MatrixSymbol
if not isinstance(mat, MatrixSymbol):
return r"\left(%s\right)^{T}" % self._print(mat)
else:
return "%s^{T}" % self.parenthesize(mat, precedence_traditional(expr), True)
def _print_Trace(self, expr):
mat = expr.arg
return r"\operatorname{tr}\left(%s \right)" % self._print(mat)
def _print_Adjoint(self, expr):
mat = expr.arg
from sympy.matrices import MatrixSymbol
if not isinstance(mat, MatrixSymbol):
return r"\left(%s\right)^{\dagger}" % self._print(mat)
else:
return r"%s^{\dagger}" % self._print(mat)
def _print_MatMul(self, expr):
from sympy import MatMul, Mul
parens = lambda x: self.parenthesize(x, precedence_traditional(expr),
False)
args = expr.args
if isinstance(args[0], Mul):
args = args[0].as_ordered_factors() + list(args[1:])
else:
args = list(args)
if isinstance(expr, MatMul) and _coeff_isneg(expr):
if args[0] == -1:
args = args[1:]
else:
args[0] = -args[0]
return '- ' + ' '.join(map(parens, args))
else:
return ' '.join(map(parens, args))
def _print_Mod(self, expr, exp=None):
if exp is not None:
return r'\left(%s\bmod{%s}\right)^{%s}' % \
(self.parenthesize(expr.args[0], PRECEDENCE['Mul'],
strict=True), self._print(expr.args[1]),
self._print(exp))
return r'%s\bmod{%s}' % (self.parenthesize(expr.args[0],
PRECEDENCE['Mul'], strict=True),
self._print(expr.args[1]))
def _print_HadamardProduct(self, expr):
args = expr.args
prec = PRECEDENCE['Pow']
parens = self.parenthesize
return r' \circ '.join(
map(lambda arg: parens(arg, prec, strict=True), args))
def _print_HadamardPower(self, expr):
if precedence_traditional(expr.exp) < PRECEDENCE["Mul"]:
template = r"%s^{\circ \left({%s}\right)}"
else:
template = r"%s^{\circ {%s}}"
return self._helper_print_standard_power(expr, template)
def _print_KroneckerProduct(self, expr):
args = expr.args
prec = PRECEDENCE['Pow']
parens = self.parenthesize
return r' \otimes '.join(
map(lambda arg: parens(arg, prec, strict=True), args))
def _print_MatPow(self, expr):
base, exp = expr.base, expr.exp
from sympy.matrices import MatrixSymbol
if not isinstance(base, MatrixSymbol):
return "\\left(%s\\right)^{%s}" % (self._print(base),
self._print(exp))
else:
return "%s^{%s}" % (self._print(base), self._print(exp))
def _print_MatrixSymbol(self, expr):
return self._print_Symbol(expr, style=self._settings[
'mat_symbol_style'])
def _print_ZeroMatrix(self, Z):
return r"\mathbb{0}" if self._settings[
'mat_symbol_style'] == 'plain' else r"\mathbf{0}"
def _print_OneMatrix(self, O):
return r"\mathbb{1}" if self._settings[
'mat_symbol_style'] == 'plain' else r"\mathbf{1}"
def _print_Identity(self, I):
return r"\mathbb{I}" if self._settings[
'mat_symbol_style'] == 'plain' else r"\mathbf{I}"
def _print_PermutationMatrix(self, P):
perm_str = self._print(P.args[0])
return "P_{%s}" % perm_str
def _print_NDimArray(self, expr):
if expr.rank() == 0:
return self._print(expr[()])
mat_str = self._settings['mat_str']
if mat_str is None:
if self._settings['mode'] == 'inline':
mat_str = 'smallmatrix'
else:
if (expr.rank() == 0) or (expr.shape[-1] <= 10):
mat_str = 'matrix'
else:
mat_str = 'array'
block_str = r'\begin{%MATSTR%}%s\end{%MATSTR%}'
block_str = block_str.replace('%MATSTR%', mat_str)
if self._settings['mat_delim']:
left_delim = self._settings['mat_delim']
right_delim = self._delim_dict[left_delim]
block_str = r'\left' + left_delim + block_str + \
r'\right' + right_delim
if expr.rank() == 0:
return block_str % ""
level_str = [[]] + [[] for i in range(expr.rank())]
shape_ranges = [list(range(i)) for i in expr.shape]
for outer_i in itertools.product(*shape_ranges):
level_str[-1].append(self._print(expr[outer_i]))
even = True
for back_outer_i in range(expr.rank()-1, -1, -1):
if len(level_str[back_outer_i+1]) < expr.shape[back_outer_i]:
break
if even:
level_str[back_outer_i].append(
r" & ".join(level_str[back_outer_i+1]))
else:
level_str[back_outer_i].append(
block_str % (r"\\".join(level_str[back_outer_i+1])))
if len(level_str[back_outer_i+1]) == 1:
level_str[back_outer_i][-1] = r"\left[" + \
level_str[back_outer_i][-1] + r"\right]"
even = not even
level_str[back_outer_i+1] = []
out_str = level_str[0][0]
if expr.rank() % 2 == 1:
out_str = block_str % out_str
return out_str
_print_ImmutableDenseNDimArray = _print_NDimArray
_print_ImmutableSparseNDimArray = _print_NDimArray
_print_MutableDenseNDimArray = _print_NDimArray
_print_MutableSparseNDimArray = _print_NDimArray
def _printer_tensor_indices(self, name, indices, index_map={}):
out_str = self._print(name)
last_valence = None
prev_map = None
for index in indices:
new_valence = index.is_up
if ((index in index_map) or prev_map) and \
last_valence == new_valence:
out_str += ","
if last_valence != new_valence:
if last_valence is not None:
out_str += "}"
if index.is_up:
out_str += "{}^{"
else:
out_str += "{}_{"
out_str += self._print(index.args[0])
if index in index_map:
out_str += "="
out_str += self._print(index_map[index])
prev_map = True
else:
prev_map = False
last_valence = new_valence
if last_valence is not None:
out_str += "}"
return out_str
def _print_Tensor(self, expr):
name = expr.args[0].args[0]
indices = expr.get_indices()
return self._printer_tensor_indices(name, indices)
def _print_TensorElement(self, expr):
name = expr.expr.args[0].args[0]
indices = expr.expr.get_indices()
index_map = expr.index_map
return self._printer_tensor_indices(name, indices, index_map)
def _print_TensMul(self, expr):
# prints expressions like "A(a)", "3*A(a)", "(1+x)*A(a)"
sign, args = expr._get_args_for_traditional_printer()
return sign + "".join(
[self.parenthesize(arg, precedence(expr)) for arg in args]
)
def _print_TensAdd(self, expr):
a = []
args = expr.args
for x in args:
a.append(self.parenthesize(x, precedence(expr)))
a.sort()
s = ' + '.join(a)
s = s.replace('+ -', '- ')
return s
def _print_TensorIndex(self, expr):
return "{}%s{%s}" % (
"^" if expr.is_up else "_",
self._print(expr.args[0])
)
def _print_PartialDerivative(self, expr):
if len(expr.variables) == 1:
return r"\frac{\partial}{\partial {%s}}{%s}" % (
self._print(expr.variables[0]),
self.parenthesize(expr.expr, PRECEDENCE["Mul"], False)
)
else:
return r"\frac{\partial^{%s}}{%s}{%s}" % (
len(expr.variables),
" ".join([r"\partial {%s}" % self._print(i) for i in expr.variables]),
self.parenthesize(expr.expr, PRECEDENCE["Mul"], False)
)
def _print_UniversalSet(self, expr):
return r"\mathbb{U}"
def _print_frac(self, expr, exp=None):
if exp is None:
return r"\operatorname{frac}{\left(%s\right)}" % self._print(expr.args[0])
else:
return r"\operatorname{frac}{\left(%s\right)}^{%s}" % (
self._print(expr.args[0]), self._print(exp))
def _print_tuple(self, expr):
if self._settings['decimal_separator'] =='comma':
return r"\left( %s\right)" % \
r"; \ ".join([self._print(i) for i in expr])
elif self._settings['decimal_separator'] =='period':
return r"\left( %s\right)" % \
r", \ ".join([self._print(i) for i in expr])
else:
raise ValueError('Unknown Decimal Separator')
def _print_TensorProduct(self, expr):
elements = [self._print(a) for a in expr.args]
return r' \otimes '.join(elements)
def _print_WedgeProduct(self, expr):
elements = [self._print(a) for a in expr.args]
return r' \wedge '.join(elements)
def _print_Tuple(self, expr):
return self._print_tuple(expr)
def _print_list(self, expr):
if self._settings['decimal_separator'] == 'comma':
return r"\left[ %s\right]" % \
r"; \ ".join([self._print(i) for i in expr])
elif self._settings['decimal_separator'] == 'period':
return r"\left[ %s\right]" % \
r", \ ".join([self._print(i) for i in expr])
else:
raise ValueError('Unknown Decimal Separator')
def _print_dict(self, d):
keys = sorted(d.keys(), key=default_sort_key)
items = []
for key in keys:
val = d[key]
items.append("%s : %s" % (self._print(key), self._print(val)))
return r"\left\{ %s\right\}" % r", \ ".join(items)
def _print_Dict(self, expr):
return self._print_dict(expr)
def _print_DiracDelta(self, expr, exp=None):
if len(expr.args) == 1 or expr.args[1] == 0:
tex = r"\delta\left(%s\right)" % self._print(expr.args[0])
else:
tex = r"\delta^{\left( %s \right)}\left( %s \right)" % (
self._print(expr.args[1]), self._print(expr.args[0]))
if exp:
tex = r"\left(%s\right)^{%s}" % (tex, exp)
return tex
def _print_SingularityFunction(self, expr):
shift = self._print(expr.args[0] - expr.args[1])
power = self._print(expr.args[2])
tex = r"{\left\langle %s \right\rangle}^{%s}" % (shift, power)
return tex
def _print_Heaviside(self, expr, exp=None):
tex = r"\theta\left(%s\right)" % self._print(expr.args[0])
if exp:
tex = r"\left(%s\right)^{%s}" % (tex, exp)
return tex
def _print_KroneckerDelta(self, expr, exp=None):
i = self._print(expr.args[0])
j = self._print(expr.args[1])
if expr.args[0].is_Atom and expr.args[1].is_Atom:
tex = r'\delta_{%s %s}' % (i, j)
else:
tex = r'\delta_{%s, %s}' % (i, j)
if exp is not None:
tex = r'\left(%s\right)^{%s}' % (tex, exp)
return tex
def _print_LeviCivita(self, expr, exp=None):
indices = map(self._print, expr.args)
if all(x.is_Atom for x in expr.args):
tex = r'\varepsilon_{%s}' % " ".join(indices)
else:
tex = r'\varepsilon_{%s}' % ", ".join(indices)
if exp:
tex = r'\left(%s\right)^{%s}' % (tex, exp)
return tex
def _print_RandomDomain(self, d):
if hasattr(d, 'as_boolean'):
return '\\text{Domain: }' + self._print(d.as_boolean())
elif hasattr(d, 'set'):
return ('\\text{Domain: }' + self._print(d.symbols) + '\\text{ in }' +
self._print(d.set))
elif hasattr(d, 'symbols'):
return '\\text{Domain on }' + self._print(d.symbols)
else:
return self._print(None)
def _print_FiniteSet(self, s):
items = sorted(s.args, key=default_sort_key)
return self._print_set(items)
def _print_set(self, s):
items = sorted(s, key=default_sort_key)
if self._settings['decimal_separator'] == 'comma':
items = "; ".join(map(self._print, items))
elif self._settings['decimal_separator'] == 'period':
items = ", ".join(map(self._print, items))
else:
raise ValueError('Unknown Decimal Separator')
return r"\left\{%s\right\}" % items
_print_frozenset = _print_set
def _print_Range(self, s):
dots = r'\ldots'
if s.has(Symbol):
return self._print_Basic(s)
if s.start.is_infinite and s.stop.is_infinite:
if s.step.is_positive:
printset = dots, -1, 0, 1, dots
else:
printset = dots, 1, 0, -1, dots
elif s.start.is_infinite:
printset = dots, s[-1] - s.step, s[-1]
elif s.stop.is_infinite:
it = iter(s)
printset = next(it), next(it), dots
elif len(s) > 4:
it = iter(s)
printset = next(it), next(it), dots, s[-1]
else:
printset = tuple(s)
return (r"\left\{" +
r", ".join(self._print(el) for el in printset) +
r"\right\}")
def __print_number_polynomial(self, expr, letter, exp=None):
if len(expr.args) == 2:
if exp is not None:
return r"%s_{%s}^{%s}\left(%s\right)" % (letter,
self._print(expr.args[0]), self._print(exp),
self._print(expr.args[1]))
return r"%s_{%s}\left(%s\right)" % (letter,
self._print(expr.args[0]), self._print(expr.args[1]))
tex = r"%s_{%s}" % (letter, self._print(expr.args[0]))
if exp is not None:
tex = r"%s^{%s}" % (tex, self._print(exp))
return tex
def _print_bernoulli(self, expr, exp=None):
return self.__print_number_polynomial(expr, "B", exp)
def _print_bell(self, expr, exp=None):
if len(expr.args) == 3:
tex1 = r"B_{%s, %s}" % (self._print(expr.args[0]),
self._print(expr.args[1]))
tex2 = r"\left(%s\right)" % r", ".join(self._print(el) for
el in expr.args[2])
if exp is not None:
tex = r"%s^{%s}%s" % (tex1, self._print(exp), tex2)
else:
tex = tex1 + tex2
return tex
return self.__print_number_polynomial(expr, "B", exp)
def _print_fibonacci(self, expr, exp=None):
return self.__print_number_polynomial(expr, "F", exp)
def _print_lucas(self, expr, exp=None):
tex = r"L_{%s}" % self._print(expr.args[0])
if exp is not None:
tex = r"%s^{%s}" % (tex, self._print(exp))
return tex
def _print_tribonacci(self, expr, exp=None):
return self.__print_number_polynomial(expr, "T", exp)
def _print_SeqFormula(self, s):
if len(s.start.free_symbols) > 0 or len(s.stop.free_symbols) > 0:
return r"\left\{%s\right\}_{%s=%s}^{%s}" % (
self._print(s.formula),
self._print(s.variables[0]),
self._print(s.start),
self._print(s.stop)
)
if s.start is S.NegativeInfinity:
stop = s.stop
printset = (r'\ldots', s.coeff(stop - 3), s.coeff(stop - 2),
s.coeff(stop - 1), s.coeff(stop))
elif s.stop is S.Infinity or s.length > 4:
printset = s[:4]
printset.append(r'\ldots')
else:
printset = tuple(s)
return (r"\left[" +
r", ".join(self._print(el) for el in printset) +
r"\right]")
_print_SeqPer = _print_SeqFormula
_print_SeqAdd = _print_SeqFormula
_print_SeqMul = _print_SeqFormula
def _print_Interval(self, i):
if i.start == i.end:
return r"\left\{%s\right\}" % self._print(i.start)
else:
if i.left_open:
left = '('
else:
left = '['
if i.right_open:
right = ')'
else:
right = ']'
return r"\left%s%s, %s\right%s" % \
(left, self._print(i.start), self._print(i.end), right)
def _print_AccumulationBounds(self, i):
return r"\left\langle %s, %s\right\rangle" % \
(self._print(i.min), self._print(i.max))
def _print_Union(self, u):
prec = precedence_traditional(u)
args_str = [self.parenthesize(i, prec) for i in u.args]
return r" \cup ".join(args_str)
def _print_Complement(self, u):
prec = precedence_traditional(u)
args_str = [self.parenthesize(i, prec) for i in u.args]
return r" \setminus ".join(args_str)
def _print_Intersection(self, u):
prec = precedence_traditional(u)
args_str = [self.parenthesize(i, prec) for i in u.args]
return r" \cap ".join(args_str)
def _print_SymmetricDifference(self, u):
prec = precedence_traditional(u)
args_str = [self.parenthesize(i, prec) for i in u.args]
return r" \triangle ".join(args_str)
def _print_ProductSet(self, p):
prec = precedence_traditional(p)
if len(p.sets) >= 1 and not has_variety(p.sets):
return self.parenthesize(p.sets[0], prec) + "^{%d}" % len(p.sets)
return r" \times ".join(
self.parenthesize(set, prec) for set in p.sets)
def _print_EmptySet(self, e):
return r"\emptyset"
def _print_Naturals(self, n):
return r"\mathbb{N}"
def _print_Naturals0(self, n):
return r"\mathbb{N}_0"
def _print_Integers(self, i):
return r"\mathbb{Z}"
def _print_Rationals(self, i):
return r"\mathbb{Q}"
def _print_Reals(self, i):
return r"\mathbb{R}"
def _print_Complexes(self, i):
return r"\mathbb{C}"
def _print_ImageSet(self, s):
expr = s.lamda.expr
sig = s.lamda.signature
xys = ((self._print(x), self._print(y)) for x, y in zip(sig, s.base_sets))
xinys = r" , ".join(r"%s \in %s" % xy for xy in xys)
return r"\left\{%s\; |\; %s\right\}" % (self._print(expr), xinys)
def _print_ConditionSet(self, s):
vars_print = ', '.join([self._print(var) for var in Tuple(s.sym)])
if s.base_set is S.UniversalSet:
return r"\left\{%s \mid %s \right\}" % \
(vars_print, self._print(s.condition))
return r"\left\{%s \mid %s \in %s \wedge %s \right\}" % (
vars_print,
vars_print,
self._print(s.base_set),
self._print(s.condition))
def _print_ComplexRegion(self, s):
vars_print = ', '.join([self._print(var) for var in s.variables])
return r"\left\{%s\; |\; %s \in %s \right\}" % (
self._print(s.expr),
vars_print,
self._print(s.sets))
def _print_Contains(self, e):
return r"%s \in %s" % tuple(self._print(a) for a in e.args)
def _print_FourierSeries(self, s):
return self._print_Add(s.truncate()) + self._print(r' + \ldots')
def _print_FormalPowerSeries(self, s):
return self._print_Add(s.infinite)
def _print_FiniteField(self, expr):
return r"\mathbb{F}_{%s}" % expr.mod
def _print_IntegerRing(self, expr):
return r"\mathbb{Z}"
def _print_RationalField(self, expr):
return r"\mathbb{Q}"
def _print_RealField(self, expr):
return r"\mathbb{R}"
def _print_ComplexField(self, expr):
return r"\mathbb{C}"
def _print_PolynomialRing(self, expr):
domain = self._print(expr.domain)
symbols = ", ".join(map(self._print, expr.symbols))
return r"%s\left[%s\right]" % (domain, symbols)
def _print_FractionField(self, expr):
domain = self._print(expr.domain)
symbols = ", ".join(map(self._print, expr.symbols))
return r"%s\left(%s\right)" % (domain, symbols)
def _print_PolynomialRingBase(self, expr):
domain = self._print(expr.domain)
symbols = ", ".join(map(self._print, expr.symbols))
inv = ""
if not expr.is_Poly:
inv = r"S_<^{-1}"
return r"%s%s\left[%s\right]" % (inv, domain, symbols)
def _print_Poly(self, poly):
cls = poly.__class__.__name__
terms = []
for monom, coeff in poly.terms():
s_monom = ''
for i, exp in enumerate(monom):
if exp > 0:
if exp == 1:
s_monom += self._print(poly.gens[i])
else:
s_monom += self._print(pow(poly.gens[i], exp))
if coeff.is_Add:
if s_monom:
s_coeff = r"\left(%s\right)" % self._print(coeff)
else:
s_coeff = self._print(coeff)
else:
if s_monom:
if coeff is S.One:
terms.extend(['+', s_monom])
continue
if coeff is S.NegativeOne:
terms.extend(['-', s_monom])
continue
s_coeff = self._print(coeff)
if not s_monom:
s_term = s_coeff
else:
s_term = s_coeff + " " + s_monom
if s_term.startswith('-'):
terms.extend(['-', s_term[1:]])
else:
terms.extend(['+', s_term])
if terms[0] in ['-', '+']:
modifier = terms.pop(0)
if modifier == '-':
terms[0] = '-' + terms[0]
expr = ' '.join(terms)
gens = list(map(self._print, poly.gens))
domain = "domain=%s" % self._print(poly.get_domain())
args = ", ".join([expr] + gens + [domain])
if cls in accepted_latex_functions:
tex = r"\%s {\left(%s \right)}" % (cls, args)
else:
tex = r"\operatorname{%s}{\left( %s \right)}" % (cls, args)
return tex
def _print_ComplexRootOf(self, root):
cls = root.__class__.__name__
if cls == "ComplexRootOf":
cls = "CRootOf"
expr = self._print(root.expr)
index = root.index
if cls in accepted_latex_functions:
return r"\%s {\left(%s, %d\right)}" % (cls, expr, index)
else:
return r"\operatorname{%s} {\left(%s, %d\right)}" % (cls, expr,
index)
def _print_RootSum(self, expr):
cls = expr.__class__.__name__
args = [self._print(expr.expr)]
if expr.fun is not S.IdentityFunction:
args.append(self._print(expr.fun))
if cls in accepted_latex_functions:
return r"\%s {\left(%s\right)}" % (cls, ", ".join(args))
else:
return r"\operatorname{%s} {\left(%s\right)}" % (cls,
", ".join(args))
def _print_PolyElement(self, poly):
mul_symbol = self._settings['mul_symbol_latex']
return poly.str(self, PRECEDENCE, "{%s}^{%d}", mul_symbol)
def _print_FracElement(self, frac):
if frac.denom == 1:
return self._print(frac.numer)
else:
numer = self._print(frac.numer)
denom = self._print(frac.denom)
return r"\frac{%s}{%s}" % (numer, denom)
def _print_euler(self, expr, exp=None):
m, x = (expr.args[0], None) if len(expr.args) == 1 else expr.args
tex = r"E_{%s}" % self._print(m)
if exp is not None:
tex = r"%s^{%s}" % (tex, self._print(exp))
if x is not None:
tex = r"%s\left(%s\right)" % (tex, self._print(x))
return tex
def _print_catalan(self, expr, exp=None):
tex = r"C_{%s}" % self._print(expr.args[0])
if exp is not None:
tex = r"%s^{%s}" % (tex, self._print(exp))
return tex
def _print_UnifiedTransform(self, expr, s, inverse=False):
return r"\mathcal{{{}}}{}_{{{}}}\left[{}\right]\left({}\right)".format(s, '^{-1}' if inverse else '', self._print(expr.args[1]), self._print(expr.args[0]), self._print(expr.args[2]))
def _print_MellinTransform(self, expr):
return self._print_UnifiedTransform(expr, 'M')
def _print_InverseMellinTransform(self, expr):
return self._print_UnifiedTransform(expr, 'M', True)
def _print_LaplaceTransform(self, expr):
return self._print_UnifiedTransform(expr, 'L')
def _print_InverseLaplaceTransform(self, expr):
return self._print_UnifiedTransform(expr, 'L', True)
def _print_FourierTransform(self, expr):
return self._print_UnifiedTransform(expr, 'F')
def _print_InverseFourierTransform(self, expr):
return self._print_UnifiedTransform(expr, 'F', True)
def _print_SineTransform(self, expr):
return self._print_UnifiedTransform(expr, 'SIN')
def _print_InverseSineTransform(self, expr):
return self._print_UnifiedTransform(expr, 'SIN', True)
def _print_CosineTransform(self, expr):
return self._print_UnifiedTransform(expr, 'COS')
def _print_InverseCosineTransform(self, expr):
return self._print_UnifiedTransform(expr, 'COS', True)
def _print_DMP(self, p):
try:
if p.ring is not None:
# TODO incorporate order
return self._print(p.ring.to_sympy(p))
except SympifyError:
pass
return self._print(repr(p))
def _print_DMF(self, p):
return self._print_DMP(p)
def _print_Object(self, object):
return self._print(Symbol(object.name))
def _print_LambertW(self, expr):
if len(expr.args) == 1:
return r"W\left(%s\right)" % self._print(expr.args[0])
return r"W_{%s}\left(%s\right)" % \
(self._print(expr.args[1]), self._print(expr.args[0]))
def _print_Morphism(self, morphism):
domain = self._print(morphism.domain)
codomain = self._print(morphism.codomain)
return "%s\\rightarrow %s" % (domain, codomain)
def _print_NamedMorphism(self, morphism):
pretty_name = self._print(Symbol(morphism.name))
pretty_morphism = self._print_Morphism(morphism)
return "%s:%s" % (pretty_name, pretty_morphism)
def _print_IdentityMorphism(self, morphism):
from sympy.categories import NamedMorphism
return self._print_NamedMorphism(NamedMorphism(
morphism.domain, morphism.codomain, "id"))
def _print_CompositeMorphism(self, morphism):
# All components of the morphism have names and it is thus
# possible to build the name of the composite.
component_names_list = [self._print(Symbol(component.name)) for
component in morphism.components]
component_names_list.reverse()
component_names = "\\circ ".join(component_names_list) + ":"
pretty_morphism = self._print_Morphism(morphism)
return component_names + pretty_morphism
def _print_Category(self, morphism):
return r"\mathbf{{{}}}".format(self._print(Symbol(morphism.name)))
def _print_Diagram(self, diagram):
if not diagram.premises:
# This is an empty diagram.
return self._print(S.EmptySet)
latex_result = self._print(diagram.premises)
if diagram.conclusions:
latex_result += "\\Longrightarrow %s" % \
self._print(diagram.conclusions)
return latex_result
def _print_DiagramGrid(self, grid):
latex_result = "\\begin{array}{%s}\n" % ("c" * grid.width)
for i in range(grid.height):
for j in range(grid.width):
if grid[i, j]:
latex_result += latex(grid[i, j])
latex_result += " "
if j != grid.width - 1:
latex_result += "& "
if i != grid.height - 1:
latex_result += "\\\\"
latex_result += "\n"
latex_result += "\\end{array}\n"
return latex_result
def _print_FreeModule(self, M):
return '{{{}}}^{{{}}}'.format(self._print(M.ring), self._print(M.rank))
def _print_FreeModuleElement(self, m):
# Print as row vector for convenience, for now.
return r"\left[ {} \right]".format(",".join(
'{' + self._print(x) + '}' for x in m))
def _print_SubModule(self, m):
return r"\left\langle {} \right\rangle".format(",".join(
'{' + self._print(x) + '}' for x in m.gens))
def _print_ModuleImplementedIdeal(self, m):
return r"\left\langle {} \right\rangle".format(",".join(
'{' + self._print(x) + '}' for [x] in m._module.gens))
def _print_Quaternion(self, expr):
# TODO: This expression is potentially confusing,
# shall we print it as `Quaternion( ... )`?
s = [self.parenthesize(i, PRECEDENCE["Mul"], strict=True)
for i in expr.args]
a = [s[0]] + [i+" "+j for i, j in zip(s[1:], "ijk")]
return " + ".join(a)
def _print_QuotientRing(self, R):
# TODO nicer fractions for few generators...
return r"\frac{{{}}}{{{}}}".format(self._print(R.ring),
self._print(R.base_ideal))
def _print_QuotientRingElement(self, x):
return r"{{{}}} + {{{}}}".format(self._print(x.data),
self._print(x.ring.base_ideal))
def _print_QuotientModuleElement(self, m):
return r"{{{}}} + {{{}}}".format(self._print(m.data),
self._print(m.module.killed_module))
def _print_QuotientModule(self, M):
# TODO nicer fractions for few generators...
return r"\frac{{{}}}{{{}}}".format(self._print(M.base),
self._print(M.killed_module))
def _print_MatrixHomomorphism(self, h):
return r"{{{}}} : {{{}}} \to {{{}}}".format(self._print(h._sympy_matrix()),
self._print(h.domain), self._print(h.codomain))
def _print_BaseScalarField(self, field):
string = field._coord_sys._names[field._index]
return r'\mathbf{{{}}}'.format(self._print(Symbol(string)))
def _print_BaseVectorField(self, field):
string = field._coord_sys._names[field._index]
return r'\partial_{{{}}}'.format(self._print(Symbol(string)))
def _print_Differential(self, diff):
field = diff._form_field
if hasattr(field, '_coord_sys'):
string = field._coord_sys._names[field._index]
return r'\operatorname{{d}}{}'.format(self._print(Symbol(string)))
else:
string = self._print(field)
return r'\operatorname{{d}}\left({}\right)'.format(string)
def _print_Tr(self, p):
# TODO: Handle indices
contents = self._print(p.args[0])
return r'\operatorname{{tr}}\left({}\right)'.format(contents)
def _print_totient(self, expr, exp=None):
if exp is not None:
return r'\left(\phi\left(%s\right)\right)^{%s}' % \
(self._print(expr.args[0]), self._print(exp))
return r'\phi\left(%s\right)' % self._print(expr.args[0])
def _print_reduced_totient(self, expr, exp=None):
if exp is not None:
return r'\left(\lambda\left(%s\right)\right)^{%s}' % \
(self._print(expr.args[0]), self._print(exp))
return r'\lambda\left(%s\right)' % self._print(expr.args[0])
def _print_divisor_sigma(self, expr, exp=None):
if len(expr.args) == 2:
tex = r"_%s\left(%s\right)" % tuple(map(self._print,
(expr.args[1], expr.args[0])))
else:
tex = r"\left(%s\right)" % self._print(expr.args[0])
if exp is not None:
return r"\sigma^{%s}%s" % (self._print(exp), tex)
return r"\sigma%s" % tex
def _print_udivisor_sigma(self, expr, exp=None):
if len(expr.args) == 2:
tex = r"_%s\left(%s\right)" % tuple(map(self._print,
(expr.args[1], expr.args[0])))
else:
tex = r"\left(%s\right)" % self._print(expr.args[0])
if exp is not None:
return r"\sigma^*^{%s}%s" % (self._print(exp), tex)
return r"\sigma^*%s" % tex
def _print_primenu(self, expr, exp=None):
if exp is not None:
return r'\left(\nu\left(%s\right)\right)^{%s}' % \
(self._print(expr.args[0]), self._print(exp))
return r'\nu\left(%s\right)' % self._print(expr.args[0])
def _print_primeomega(self, expr, exp=None):
if exp is not None:
return r'\left(\Omega\left(%s\right)\right)^{%s}' % \
(self._print(expr.args[0]), self._print(exp))
return r'\Omega\left(%s\right)' % self._print(expr.args[0])
def translate(s):
r'''
Check for a modifier ending the string. If present, convert the
modifier to latex and translate the rest recursively.
Given a description of a Greek letter or other special character,
return the appropriate latex.
Let everything else pass as given.
>>> from sympy.printing.latex import translate
>>> translate('alphahatdotprime')
"{\\dot{\\hat{\\alpha}}}'"
'''
# Process the rest
tex = tex_greek_dictionary.get(s)
if tex:
return tex
elif s.lower() in greek_letters_set:
return "\\" + s.lower()
elif s in other_symbols:
return "\\" + s
else:
# Process modifiers, if any, and recurse
for key in sorted(modifier_dict.keys(), key=lambda k:len(k), reverse=True):
if s.lower().endswith(key) and len(s) > len(key):
return modifier_dict[key](translate(s[:-len(key)]))
return s
def latex(expr, full_prec=False, min=None, max=None, fold_frac_powers=False,
fold_func_brackets=False, fold_short_frac=None, inv_trig_style="abbreviated",
itex=False, ln_notation=False, long_frac_ratio=None,
mat_delim="[", mat_str=None, mode="plain", mul_symbol=None,
order=None, symbol_names=None, root_notation=True,
mat_symbol_style="plain", imaginary_unit="i", gothic_re_im=False,
decimal_separator="period", perm_cyclic=True):
r"""Convert the given expression to LaTeX string representation.
Parameters
==========
full_prec: boolean, optional
If set to True, a floating point number is printed with full precision.
fold_frac_powers : boolean, optional
Emit ``^{p/q}`` instead of ``^{\frac{p}{q}}`` for fractional powers.
fold_func_brackets : boolean, optional
Fold function brackets where applicable.
fold_short_frac : boolean, optional
Emit ``p / q`` instead of ``\frac{p}{q}`` when the denominator is
simple enough (at most two terms and no powers). The default value is
``True`` for inline mode, ``False`` otherwise.
inv_trig_style : string, optional
How inverse trig functions should be displayed. Can be one of
``abbreviated``, ``full``, or ``power``. Defaults to ``abbreviated``.
itex : boolean, optional
Specifies if itex-specific syntax is used, including emitting
``$$...$$``.
ln_notation : boolean, optional
If set to ``True``, ``\ln`` is used instead of default ``\log``.
long_frac_ratio : float or None, optional
The allowed ratio of the width of the numerator to the width of the
denominator before the printer breaks off long fractions. If ``None``
(the default value), long fractions are not broken up.
mat_delim : string, optional
The delimiter to wrap around matrices. Can be one of ``[``, ``(``, or
the empty string. Defaults to ``[``.
mat_str : string, optional
Which matrix environment string to emit. ``smallmatrix``, ``matrix``,
``array``, etc. Defaults to ``smallmatrix`` for inline mode, ``matrix``
for matrices of no more than 10 columns, and ``array`` otherwise.
mode: string, optional
Specifies how the generated code will be delimited. ``mode`` can be one
of ``plain``, ``inline``, ``equation`` or ``equation*``. If ``mode``
is set to ``plain``, then the resulting code will not be delimited at
all (this is the default). If ``mode`` is set to ``inline`` then inline
LaTeX ``$...$`` will be used. If ``mode`` is set to ``equation`` or
``equation*``, the resulting code will be enclosed in the ``equation``
or ``equation*`` environment (remember to import ``amsmath`` for
``equation*``), unless the ``itex`` option is set. In the latter case,
the ``$$...$$`` syntax is used.
mul_symbol : string or None, optional
The symbol to use for multiplication. Can be one of ``None``, ``ldot``,
``dot``, or ``times``.
order: string, optional
Any of the supported monomial orderings (currently ``lex``, ``grlex``,
or ``grevlex``), ``old``, and ``none``. This parameter does nothing for
Mul objects. Setting order to ``old`` uses the compatibility ordering
for Add defined in Printer. For very large expressions, set the
``order`` keyword to ``none`` if speed is a concern.
symbol_names : dictionary of strings mapped to symbols, optional
Dictionary of symbols and the custom strings they should be emitted as.
root_notation : boolean, optional
If set to ``False``, exponents of the form 1/n are printed in fractonal
form. Default is ``True``, to print exponent in root form.
mat_symbol_style : string, optional
Can be either ``plain`` (default) or ``bold``. If set to ``bold``,
a MatrixSymbol A will be printed as ``\mathbf{A}``, otherwise as ``A``.
imaginary_unit : string, optional
String to use for the imaginary unit. Defined options are "i" (default)
and "j". Adding "r" or "t" in front gives ``\mathrm`` or ``\text``, so
"ri" leads to ``\mathrm{i}`` which gives `\mathrm{i}`.
gothic_re_im : boolean, optional
If set to ``True``, `\Re` and `\Im` is used for ``re`` and ``im``, respectively.
The default is ``False`` leading to `\operatorname{re}` and `\operatorname{im}`.
decimal_separator : string, optional
Specifies what separator to use to separate the whole and fractional parts of a
floating point number as in `2.5` for the default, ``period`` or `2{,}5`
when ``comma`` is specified. Lists, sets, and tuple are printed with semicolon
separating the elements when ``comma`` is chosen. For example, [1; 2; 3] when
``comma`` is chosen and [1,2,3] for when ``period`` is chosen.
min: Integer or None, optional
Sets the lower bound for the exponent to print floating point numbers in
fixed-point format.
max: Integer or None, optional
Sets the upper bound for the exponent to print floating point numbers in
fixed-point format.
Notes
=====
Not using a print statement for printing, results in double backslashes for
latex commands since that's the way Python escapes backslashes in strings.
>>> from sympy import latex, Rational
>>> from sympy.abc import tau
>>> latex((2*tau)**Rational(7,2))
'8 \\sqrt{2} \\tau^{\\frac{7}{2}}'
>>> print(latex((2*tau)**Rational(7,2)))
8 \sqrt{2} \tau^{\frac{7}{2}}
Examples
========
>>> from sympy import latex, pi, sin, asin, Integral, Matrix, Rational, log
>>> from sympy.abc import x, y, mu, r, tau
Basic usage:
>>> print(latex((2*tau)**Rational(7,2)))
8 \sqrt{2} \tau^{\frac{7}{2}}
``mode`` and ``itex`` options:
>>> print(latex((2*mu)**Rational(7,2), mode='plain'))
8 \sqrt{2} \mu^{\frac{7}{2}}
>>> print(latex((2*tau)**Rational(7,2), mode='inline'))
$8 \sqrt{2} \tau^{7 / 2}$
>>> print(latex((2*mu)**Rational(7,2), mode='equation*'))
\begin{equation*}8 \sqrt{2} \mu^{\frac{7}{2}}\end{equation*}
>>> print(latex((2*mu)**Rational(7,2), mode='equation'))
\begin{equation}8 \sqrt{2} \mu^{\frac{7}{2}}\end{equation}
>>> print(latex((2*mu)**Rational(7,2), mode='equation', itex=True))
$$8 \sqrt{2} \mu^{\frac{7}{2}}$$
>>> print(latex((2*mu)**Rational(7,2), mode='plain'))
8 \sqrt{2} \mu^{\frac{7}{2}}
>>> print(latex((2*tau)**Rational(7,2), mode='inline'))
$8 \sqrt{2} \tau^{7 / 2}$
>>> print(latex((2*mu)**Rational(7,2), mode='equation*'))
\begin{equation*}8 \sqrt{2} \mu^{\frac{7}{2}}\end{equation*}
>>> print(latex((2*mu)**Rational(7,2), mode='equation'))
\begin{equation}8 \sqrt{2} \mu^{\frac{7}{2}}\end{equation}
>>> print(latex((2*mu)**Rational(7,2), mode='equation', itex=True))
$$8 \sqrt{2} \mu^{\frac{7}{2}}$$
Fraction options:
>>> print(latex((2*tau)**Rational(7,2), fold_frac_powers=True))
8 \sqrt{2} \tau^{7/2}
>>> print(latex((2*tau)**sin(Rational(7,2))))
\left(2 \tau\right)^{\sin{\left(\frac{7}{2} \right)}}
>>> print(latex((2*tau)**sin(Rational(7,2)), fold_func_brackets=True))
\left(2 \tau\right)^{\sin {\frac{7}{2}}}
>>> print(latex(3*x**2/y))
\frac{3 x^{2}}{y}
>>> print(latex(3*x**2/y, fold_short_frac=True))
3 x^{2} / y
>>> print(latex(Integral(r, r)/2/pi, long_frac_ratio=2))
\frac{\int r\, dr}{2 \pi}
>>> print(latex(Integral(r, r)/2/pi, long_frac_ratio=0))
\frac{1}{2 \pi} \int r\, dr
Multiplication options:
>>> print(latex((2*tau)**sin(Rational(7,2)), mul_symbol="times"))
\left(2 \times \tau\right)^{\sin{\left(\frac{7}{2} \right)}}
Trig options:
>>> print(latex(asin(Rational(7,2))))
\operatorname{asin}{\left(\frac{7}{2} \right)}
>>> print(latex(asin(Rational(7,2)), inv_trig_style="full"))
\arcsin{\left(\frac{7}{2} \right)}
>>> print(latex(asin(Rational(7,2)), inv_trig_style="power"))
\sin^{-1}{\left(\frac{7}{2} \right)}
Matrix options:
>>> print(latex(Matrix(2, 1, [x, y])))
\left[\begin{matrix}x\\y\end{matrix}\right]
>>> print(latex(Matrix(2, 1, [x, y]), mat_str = "array"))
\left[\begin{array}{c}x\\y\end{array}\right]
>>> print(latex(Matrix(2, 1, [x, y]), mat_delim="("))
\left(\begin{matrix}x\\y\end{matrix}\right)
Custom printing of symbols:
>>> print(latex(x**2, symbol_names={x: 'x_i'}))
x_i^{2}
Logarithms:
>>> print(latex(log(10)))
\log{\left(10 \right)}
>>> print(latex(log(10), ln_notation=True))
\ln{\left(10 \right)}
``latex()`` also supports the builtin container types list, tuple, and
dictionary.
>>> print(latex([2/x, y], mode='inline'))
$\left[ 2 / x, \ y\right]$
"""
if symbol_names is None:
symbol_names = {}
settings = {
'full_prec': full_prec,
'fold_frac_powers': fold_frac_powers,
'fold_func_brackets': fold_func_brackets,
'fold_short_frac': fold_short_frac,
'inv_trig_style': inv_trig_style,
'itex': itex,
'ln_notation': ln_notation,
'long_frac_ratio': long_frac_ratio,
'mat_delim': mat_delim,
'mat_str': mat_str,
'mode': mode,
'mul_symbol': mul_symbol,
'order': order,
'symbol_names': symbol_names,
'root_notation': root_notation,
'mat_symbol_style': mat_symbol_style,
'imaginary_unit': imaginary_unit,
'gothic_re_im': gothic_re_im,
'decimal_separator': decimal_separator,
'perm_cyclic' : perm_cyclic,
'min': min,
'max': max,
}
return LatexPrinter(settings).doprint(expr)
def print_latex(expr, **settings):
"""Prints LaTeX representation of the given expression. Takes the same
settings as ``latex()``."""
print(latex(expr, **settings))
def multiline_latex(lhs, rhs, terms_per_line=1, environment="align*", use_dots=False, **settings):
r"""
This function generates a LaTeX equation with a multiline right-hand side
in an ``align*``, ``eqnarray`` or ``IEEEeqnarray`` environment.
Parameters
==========
lhs : Expr
Left-hand side of equation
rhs : Expr
Right-hand side of equation
terms_per_line : integer, optional
Number of terms per line to print. Default is 1.
environment : "string", optional
Which LaTeX wnvironment to use for the output. Options are "align*"
(default), "eqnarray", and "IEEEeqnarray".
use_dots : boolean, optional
If ``True``, ``\\dots`` is added to the end of each line. Default is ``False``.
Examples
========
>>> from sympy import multiline_latex, symbols, sin, cos, exp, log, I
>>> x, y, alpha = symbols('x y alpha')
>>> expr = sin(alpha*y) + exp(I*alpha) - cos(log(y))
>>> print(multiline_latex(x, expr))
\begin{align*}
x = & e^{i \alpha} \\
& + \sin{\left(\alpha y \right)} \\
& - \cos{\left(\log{\left(y \right)} \right)}
\end{align*}
Using at most two terms per line:
>>> print(multiline_latex(x, expr, 2))
\begin{align*}
x = & e^{i \alpha} + \sin{\left(\alpha y \right)} \\
& - \cos{\left(\log{\left(y \right)} \right)}
\end{align*}
Using ``eqnarray`` and dots:
>>> print(multiline_latex(x, expr, terms_per_line=2, environment="eqnarray", use_dots=True))
\begin{eqnarray}
x & = & e^{i \alpha} + \sin{\left(\alpha y \right)} \dots\nonumber\\
& & - \cos{\left(\log{\left(y \right)} \right)}
\end{eqnarray}
Using ``IEEEeqnarray``:
>>> print(multiline_latex(x, expr, environment="IEEEeqnarray"))
\begin{IEEEeqnarray}{rCl}
x & = & e^{i \alpha} \nonumber\\
& & + \sin{\left(\alpha y \right)} \nonumber\\
& & - \cos{\left(\log{\left(y \right)} \right)}
\end{IEEEeqnarray}
Notes
=====
All optional parameters from ``latex`` can also be used.
"""
# Based on code from https://github.com/sympy/sympy/issues/3001
l = LatexPrinter(**settings)
if environment == "eqnarray":
result = r'\begin{eqnarray}' + '\n'
first_term = '& = &'
nonumber = r'\nonumber'
end_term = '\n\\end{eqnarray}'
doubleet = True
elif environment == "IEEEeqnarray":
result = r'\begin{IEEEeqnarray}{rCl}' + '\n'
first_term = '& = &'
nonumber = r'\nonumber'
end_term = '\n\\end{IEEEeqnarray}'
doubleet = True
elif environment == "align*":
result = r'\begin{align*}' + '\n'
first_term = '= &'
nonumber = ''
end_term = '\n\\end{align*}'
doubleet = False
else:
raise ValueError("Unknown environment: {}".format(environment))
dots = ''
if use_dots:
dots=r'\dots'
terms = rhs.as_ordered_terms()
n_terms = len(terms)
term_count = 1
for i in range(n_terms):
term = terms[i]
term_start = ''
term_end = ''
sign = '+'
if term_count > terms_per_line:
if doubleet:
term_start = '& & '
else:
term_start = '& '
term_count = 1
if term_count == terms_per_line:
# End of line
if i < n_terms-1:
# There are terms remaining
term_end = dots + nonumber + r'\\' + '\n'
else:
term_end = ''
if term.as_ordered_factors()[0] == -1:
term = -1*term
sign = r'-'
if i == 0: # beginning
if sign == '+':
sign = ''
result += r'{:s} {:s}{:s} {:s} {:s}'.format(l.doprint(lhs),
first_term, sign, l.doprint(term), term_end)
else:
result += r'{:s}{:s} {:s} {:s}'.format(term_start, sign,
l.doprint(term), term_end)
term_count += 1
result += end_term
return result
|
1326c81e458d78dc91cbee9b9f10ceaf224d46ee319c619759fcb51cd784b2a3 | """Printing subsystem driver
SymPy's printing system works the following way: Any expression can be
passed to a designated Printer who then is responsible to return an
adequate representation of that expression.
**The basic concept is the following:**
1. Let the object print itself if it knows how.
2. Take the best fitting method defined in the printer.
3. As fall-back use the emptyPrinter method for the printer.
Which Method is Responsible for Printing?
^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^
The whole printing process is started by calling ``.doprint(expr)`` on the printer
which you want to use. This method looks for an appropriate method which can
print the given expression in the given style that the printer defines.
While looking for the method, it follows these steps:
1. **Let the object print itself if it knows how.**
The printer looks for a specific method in every object. The name of that method
depends on the specific printer and is defined under ``Printer.printmethod``.
For example, StrPrinter calls ``_sympystr`` and LatexPrinter calls ``_latex``.
Look at the documentation of the printer that you want to use.
The name of the method is specified there.
This was the original way of doing printing in sympy. Every class had
its own latex, mathml, str and repr methods, but it turned out that it
is hard to produce a high quality printer, if all the methods are spread
out that far. Therefore all printing code was combined into the different
printers, which works great for built-in sympy objects, but not that
good for user defined classes where it is inconvenient to patch the
printers.
2. **Take the best fitting method defined in the printer.**
The printer loops through expr classes (class + its bases), and tries
to dispatch the work to ``_print_<EXPR_CLASS>``
e.g., suppose we have the following class hierarchy::
Basic
|
Atom
|
Number
|
Rational
then, for ``expr=Rational(...)``, the Printer will try
to call printer methods in the order as shown in the figure below::
p._print(expr)
|
|-- p._print_Rational(expr)
|
|-- p._print_Number(expr)
|
|-- p._print_Atom(expr)
|
`-- p._print_Basic(expr)
if ``._print_Rational`` method exists in the printer, then it is called,
and the result is returned back. Otherwise, the printer tries to call
``._print_Number`` and so on.
3. **As a fall-back use the emptyPrinter method for the printer.**
As fall-back ``self.emptyPrinter`` will be called with the expression. If
not defined in the Printer subclass this will be the same as ``str(expr)``.
Example of Custom Printer
^^^^^^^^^^^^^^^^^^^^^^^^^
.. _printer_example:
In the example below, we have a printer which prints the derivative of a function
in a shorter form.
.. code-block:: python
from sympy import Symbol
from sympy.printing.latex import LatexPrinter, print_latex
from sympy.core.function import UndefinedFunction, Function
class MyLatexPrinter(LatexPrinter):
\"\"\"Print derivative of a function of symbols in a shorter form.
\"\"\"
def _print_Derivative(self, expr):
function, *vars = expr.args
if not isinstance(type(function), UndefinedFunction) or \\
not all(isinstance(i, Symbol) for i in vars):
return super()._print_Derivative(expr)
# If you want the printer to work correctly for nested
# expressions then use self._print() instead of str() or latex().
# See the example of nested modulo below in the custom printing
# method section.
return "{}_{{{}}}".format(
self._print(Symbol(function.func.__name__)),
''.join(self._print(i) for i in vars))
def print_my_latex(expr):
\"\"\" Most of the printers define their own wrappers for print().
These wrappers usually take printer settings. Our printer does not have
any settings.
\"\"\"
print(MyLatexPrinter().doprint(expr))
y = Symbol("y")
x = Symbol("x")
f = Function("f")
expr = f(x, y).diff(x, y)
# Print the expression using the normal latex printer and our custom
# printer.
print_latex(expr)
print_my_latex(expr)
The output of the code above is::
\\frac{\\partial^{2}}{\\partial x\\partial y} f{\\left(x,y \\right)}
f_{xy}
Example of Custom Printing Method
^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^
In the example below, the latex printing of the modulo operator is modified.
This is done by overriding the method ``_latex`` of ``Mod``.
.. code-block:: python
from sympy import Symbol, Mod, Integer
from sympy.printing.latex import print_latex
class ModOp(Mod):
def _latex(self, printer=None):
# Always use printer.doprint() otherwise nested expressions won't
# work. See the example of ModOpWrong.
a, b = [printer.doprint(i) for i in self.args]
return r"\\operatorname{Mod}{\\left( %s,%s \\right)}" % (a,b)
class ModOpWrong(Mod):
def _latex(self, printer=None):
a, b = [str(i) for i in self.args]
return r"\\operatorname{Mod}{\\left( %s,%s \\right)}" % (a,b)
x = Symbol('x')
m = Symbol('m')
print_latex(ModOp(x, m))
print_latex(Mod(x, m))
# Nested modulo.
print_latex(ModOp(ModOp(x, m), Integer(7)))
print_latex(ModOpWrong(ModOpWrong(x, m), Integer(7)))
The output of the code above is::
\\operatorname{Mod}{\\left( x,m \\right)}
x\\bmod{m}
\\operatorname{Mod}{\\left( \\operatorname{Mod}{\\left( x,m \\right)},7 \\right)}
\\operatorname{Mod}{\\left( ModOpWrong(x, m),7 \\right)}
"""
from __future__ import print_function, division
from typing import Any, Dict
from contextlib import contextmanager
from sympy import Basic, Add
from sympy.core.core import BasicMeta
from sympy.core.function import AppliedUndef, UndefinedFunction, Function
from functools import cmp_to_key
@contextmanager
def printer_context(printer, **kwargs):
original = printer._context.copy()
try:
printer._context.update(kwargs)
yield
finally:
printer._context = original
class Printer(object):
""" Generic printer
Its job is to provide infrastructure for implementing new printers easily.
If you want to define your custom Printer or your custom printing method
for your custom class then see the example above: printer_example_ .
"""
_global_settings = {} # type: Dict[str, Any]
_default_settings = {} # type: Dict[str, Any]
emptyPrinter = str
printmethod = None # type: str
def __init__(self, settings=None):
self._str = str
self._settings = self._default_settings.copy()
self._context = dict() # mutable during printing
for key, val in self._global_settings.items():
if key in self._default_settings:
self._settings[key] = val
if settings is not None:
self._settings.update(settings)
if len(self._settings) > len(self._default_settings):
for key in self._settings:
if key not in self._default_settings:
raise TypeError("Unknown setting '%s'." % key)
# _print_level is the number of times self._print() was recursively
# called. See StrPrinter._print_Float() for an example of usage
self._print_level = 0
@classmethod
def set_global_settings(cls, **settings):
"""Set system-wide printing settings. """
for key, val in settings.items():
if val is not None:
cls._global_settings[key] = val
@property
def order(self):
if 'order' in self._settings:
return self._settings['order']
else:
raise AttributeError("No order defined.")
def doprint(self, expr):
"""Returns printer's representation for expr (as a string)"""
return self._str(self._print(expr))
def _print(self, expr, **kwargs):
"""Internal dispatcher
Tries the following concepts to print an expression:
1. Let the object print itself if it knows how.
2. Take the best fitting method defined in the printer.
3. As fall-back use the emptyPrinter method for the printer.
"""
self._print_level += 1
try:
# If the printer defines a name for a printing method
# (Printer.printmethod) and the object knows for itself how it
# should be printed, use that method.
if (self.printmethod and hasattr(expr, self.printmethod)
and not isinstance(expr, BasicMeta)):
return getattr(expr, self.printmethod)(self, **kwargs)
# See if the class of expr is known, or if one of its super
# classes is known, and use that print function
# Exception: ignore the subclasses of Undefined, so that, e.g.,
# Function('gamma') does not get dispatched to _print_gamma
classes = type(expr).__mro__
if AppliedUndef in classes:
classes = classes[classes.index(AppliedUndef):]
if UndefinedFunction in classes:
classes = classes[classes.index(UndefinedFunction):]
# Another exception: if someone subclasses a known function, e.g.,
# gamma, and changes the name, then ignore _print_gamma
if Function in classes:
i = classes.index(Function)
classes = tuple(c for c in classes[:i] if \
c.__name__ == classes[0].__name__ or \
c.__name__.endswith("Base")) + classes[i:]
for cls in classes:
printmethod = '_print_' + cls.__name__
if hasattr(self, printmethod):
return getattr(self, printmethod)(expr, **kwargs)
# Unknown object, fall back to the emptyPrinter. Checks what type of
# decimal separator to print.
if (self.emptyPrinter == str) & \
(self._settings.get('decimal_separator', None) == 'comma'):
expr = str(expr).replace('.', '{,}')
return self.emptyPrinter(expr)
finally:
self._print_level -= 1
def _as_ordered_terms(self, expr, order=None):
"""A compatibility function for ordering terms in Add. """
order = order or self.order
if order == 'old':
return sorted(Add.make_args(expr), key=cmp_to_key(Basic._compare_pretty))
else:
return expr.as_ordered_terms(order=order)
|
660013683eeacce375c273d3351c66bfc3fc0cd15ac8c759d227692029252175 | from __future__ import print_function, division
from sympy.core.containers import Tuple
from types import FunctionType
class TableForm(object):
r"""
Create a nice table representation of data.
Examples
========
>>> from sympy import TableForm
>>> t = TableForm([[5, 7], [4, 2], [10, 3]])
>>> print(t)
5 7
4 2
10 3
You can use the SymPy's printing system to produce tables in any
format (ascii, latex, html, ...).
>>> print(t.as_latex())
\begin{tabular}{l l}
$5$ & $7$ \\
$4$ & $2$ \\
$10$ & $3$ \\
\end{tabular}
"""
def __init__(self, data, **kwarg):
"""
Creates a TableForm.
Parameters:
data ...
2D data to be put into the table; data can be
given as a Matrix
headings ...
gives the labels for rows and columns:
Can be a single argument that applies to both
dimensions:
- None ... no labels
- "automatic" ... labels are 1, 2, 3, ...
Can be a list of labels for rows and columns:
The labels for each dimension can be given
as None, "automatic", or [l1, l2, ...] e.g.
["automatic", None] will number the rows
[default: None]
alignments ...
alignment of the columns with:
- "left" or "<"
- "center" or "^"
- "right" or ">"
When given as a single value, the value is used for
all columns. The row headings (if given) will be
right justified unless an explicit alignment is
given for it and all other columns.
[default: "left"]
formats ...
a list of format strings or functions that accept
3 arguments (entry, row number, col number) and
return a string for the table entry. (If a function
returns None then the _print method will be used.)
wipe_zeros ...
Don't show zeros in the table.
[default: True]
pad ...
the string to use to indicate a missing value (e.g.
elements that are None or those that are missing
from the end of a row (i.e. any row that is shorter
than the rest is assumed to have missing values).
When None, nothing will be shown for values that
are missing from the end of a row; values that are
None, however, will be shown.
[default: None]
Examples
========
>>> from sympy import TableForm, Matrix
>>> TableForm([[5, 7], [4, 2], [10, 3]])
5 7
4 2
10 3
>>> TableForm([list('.'*i) for i in range(1, 4)], headings='automatic')
| 1 2 3
---------
1 | .
2 | . .
3 | . . .
>>> TableForm([['.'*(j if not i%2 else 1) for i in range(3)]
... for j in range(4)], alignments='rcl')
.
. . .
.. . ..
... . ...
"""
from sympy import Symbol, S, Matrix
from sympy.core.sympify import SympifyError
# We only support 2D data. Check the consistency:
if isinstance(data, Matrix):
data = data.tolist()
_h = len(data)
# fill out any short lines
pad = kwarg.get('pad', None)
ok_None = False
if pad is None:
pad = " "
ok_None = True
pad = Symbol(pad)
_w = max(len(line) for line in data)
for i, line in enumerate(data):
if len(line) != _w:
line.extend([pad]*(_w - len(line)))
for j, lj in enumerate(line):
if lj is None:
if not ok_None:
lj = pad
else:
try:
lj = S(lj)
except SympifyError:
lj = Symbol(str(lj))
line[j] = lj
data[i] = line
_lines = Tuple(*data)
headings = kwarg.get("headings", [None, None])
if headings == "automatic":
_headings = [range(1, _h + 1), range(1, _w + 1)]
else:
h1, h2 = headings
if h1 == "automatic":
h1 = range(1, _h + 1)
if h2 == "automatic":
h2 = range(1, _w + 1)
_headings = [h1, h2]
allow = ('l', 'r', 'c')
alignments = kwarg.get("alignments", "l")
def _std_align(a):
a = a.strip().lower()
if len(a) > 1:
return {'left': 'l', 'right': 'r', 'center': 'c'}.get(a, a)
else:
return {'<': 'l', '>': 'r', '^': 'c'}.get(a, a)
std_align = _std_align(alignments)
if std_align in allow:
_alignments = [std_align]*_w
else:
_alignments = []
for a in alignments:
std_align = _std_align(a)
_alignments.append(std_align)
if std_align not in ('l', 'r', 'c'):
raise ValueError('alignment "%s" unrecognized' %
alignments)
if _headings[0] and len(_alignments) == _w + 1:
_head_align = _alignments[0]
_alignments = _alignments[1:]
else:
_head_align = 'r'
if len(_alignments) != _w:
raise ValueError(
'wrong number of alignments: expected %s but got %s' %
(_w, len(_alignments)))
_column_formats = kwarg.get("formats", [None]*_w)
_wipe_zeros = kwarg.get("wipe_zeros", True)
self._w = _w
self._h = _h
self._lines = _lines
self._headings = _headings
self._head_align = _head_align
self._alignments = _alignments
self._column_formats = _column_formats
self._wipe_zeros = _wipe_zeros
def __repr__(self):
from .str import sstr
return sstr(self, order=None)
def __str__(self):
from .str import sstr
return sstr(self, order=None)
def as_matrix(self):
"""Returns the data of the table in Matrix form.
Examples
========
>>> from sympy import TableForm
>>> t = TableForm([[5, 7], [4, 2], [10, 3]], headings='automatic')
>>> t
| 1 2
--------
1 | 5 7
2 | 4 2
3 | 10 3
>>> t.as_matrix()
Matrix([
[ 5, 7],
[ 4, 2],
[10, 3]])
"""
from sympy import Matrix
return Matrix(self._lines)
def as_str(self):
# XXX obsolete ?
return str(self)
def as_latex(self):
from .latex import latex
return latex(self)
def _sympystr(self, p):
"""
Returns the string representation of 'self'.
Examples
========
>>> from sympy import TableForm
>>> t = TableForm([[5, 7], [4, 2], [10, 3]])
>>> s = t.as_str()
"""
column_widths = [0] * self._w
lines = []
for line in self._lines:
new_line = []
for i in range(self._w):
# Format the item somehow if needed:
s = str(line[i])
if self._wipe_zeros and (s == "0"):
s = " "
w = len(s)
if w > column_widths[i]:
column_widths[i] = w
new_line.append(s)
lines.append(new_line)
# Check heading:
if self._headings[0]:
self._headings[0] = [str(x) for x in self._headings[0]]
_head_width = max([len(x) for x in self._headings[0]])
if self._headings[1]:
new_line = []
for i in range(self._w):
# Format the item somehow if needed:
s = str(self._headings[1][i])
w = len(s)
if w > column_widths[i]:
column_widths[i] = w
new_line.append(s)
self._headings[1] = new_line
format_str = []
def _align(align, w):
return '%%%s%ss' % (
("-" if align == "l" else ""),
str(w))
format_str = [_align(align, w) for align, w in
zip(self._alignments, column_widths)]
if self._headings[0]:
format_str.insert(0, _align(self._head_align, _head_width))
format_str.insert(1, '|')
format_str = ' '.join(format_str) + '\n'
s = []
if self._headings[1]:
d = self._headings[1]
if self._headings[0]:
d = [""] + d
first_line = format_str % tuple(d)
s.append(first_line)
s.append("-" * (len(first_line) - 1) + "\n")
for i, line in enumerate(lines):
d = [l if self._alignments[j] != 'c' else
l.center(column_widths[j]) for j, l in enumerate(line)]
if self._headings[0]:
l = self._headings[0][i]
l = (l if self._head_align != 'c' else
l.center(_head_width))
d = [l] + d
s.append(format_str % tuple(d))
return ''.join(s)[:-1] # don't include trailing newline
def _latex(self, printer):
"""
Returns the string representation of 'self'.
"""
# Check heading:
if self._headings[1]:
new_line = []
for i in range(self._w):
# Format the item somehow if needed:
new_line.append(str(self._headings[1][i]))
self._headings[1] = new_line
alignments = []
if self._headings[0]:
self._headings[0] = [str(x) for x in self._headings[0]]
alignments = [self._head_align]
alignments.extend(self._alignments)
s = r"\begin{tabular}{" + " ".join(alignments) + "}\n"
if self._headings[1]:
d = self._headings[1]
if self._headings[0]:
d = [""] + d
first_line = " & ".join(d) + r" \\" + "\n"
s += first_line
s += r"\hline" + "\n"
for i, line in enumerate(self._lines):
d = []
for j, x in enumerate(line):
if self._wipe_zeros and (x in (0, "0")):
d.append(" ")
continue
f = self._column_formats[j]
if f:
if isinstance(f, FunctionType):
v = f(x, i, j)
if v is None:
v = printer._print(x)
else:
v = f % x
d.append(v)
else:
v = printer._print(x)
d.append("$%s$" % v)
if self._headings[0]:
d = [self._headings[0][i]] + d
s += " & ".join(d) + r" \\" + "\n"
s += r"\end{tabular}"
return s
|
59599b2bb81e168efd333c7becd9021199ba0e9bdcc2fe27806f145452f9c504 | """
Mathematica code printer
"""
from __future__ import print_function, division
from typing import Any, Dict, Set, Tuple
from sympy.core import Basic, Expr, Float
from sympy.printing.codeprinter import CodePrinter
from sympy.printing.precedence import precedence
# Used in MCodePrinter._print_Function(self)
known_functions = {
"exp": [(lambda x: True, "Exp")],
"log": [(lambda x: True, "Log")],
"sin": [(lambda x: True, "Sin")],
"cos": [(lambda x: True, "Cos")],
"tan": [(lambda x: True, "Tan")],
"cot": [(lambda x: True, "Cot")],
"sec": [(lambda x: True, "Sec")],
"csc": [(lambda x: True, "Csc")],
"asin": [(lambda x: True, "ArcSin")],
"acos": [(lambda x: True, "ArcCos")],
"atan": [(lambda x: True, "ArcTan")],
"acot": [(lambda x: True, "ArcCot")],
"asec": [(lambda x: True, "ArcSec")],
"acsc": [(lambda x: True, "ArcCsc")],
"atan2": [(lambda *x: True, "ArcTan")],
"sinh": [(lambda x: True, "Sinh")],
"cosh": [(lambda x: True, "Cosh")],
"tanh": [(lambda x: True, "Tanh")],
"coth": [(lambda x: True, "Coth")],
"sech": [(lambda x: True, "Sech")],
"csch": [(lambda x: True, "Csch")],
"asinh": [(lambda x: True, "ArcSinh")],
"acosh": [(lambda x: True, "ArcCosh")],
"atanh": [(lambda x: True, "ArcTanh")],
"acoth": [(lambda x: True, "ArcCoth")],
"asech": [(lambda x: True, "ArcSech")],
"acsch": [(lambda x: True, "ArcCsch")],
"conjugate": [(lambda x: True, "Conjugate")],
"Max": [(lambda *x: True, "Max")],
"Min": [(lambda *x: True, "Min")],
"erf": [(lambda x: True, "Erf")],
"erf2": [(lambda *x: True, "Erf")],
"erfc": [(lambda x: True, "Erfc")],
"erfi": [(lambda x: True, "Erfi")],
"erfinv": [(lambda x: True, "InverseErf")],
"erfcinv": [(lambda x: True, "InverseErfc")],
"erf2inv": [(lambda *x: True, "InverseErf")],
"expint": [(lambda *x: True, "ExpIntegralE")],
"Ei": [(lambda x: True, "ExpIntegralEi")],
"fresnelc": [(lambda x: True, "FresnelC")],
"fresnels": [(lambda x: True, "FresnelS")],
"gamma": [(lambda x: True, "Gamma")],
"uppergamma": [(lambda *x: True, "Gamma")],
"polygamma": [(lambda *x: True, "PolyGamma")],
"loggamma": [(lambda x: True, "LogGamma")],
"beta": [(lambda *x: True, "Beta")],
"Ci": [(lambda x: True, "CosIntegral")],
"Si": [(lambda x: True, "SinIntegral")],
"Chi": [(lambda x: True, "CoshIntegral")],
"Shi": [(lambda x: True, "SinhIntegral")],
"li": [(lambda x: True, "LogIntegral")],
"factorial": [(lambda x: True, "Factorial")],
"factorial2": [(lambda x: True, "Factorial2")],
"subfactorial": [(lambda x: True, "Subfactorial")],
"catalan": [(lambda x: True, "CatalanNumber")],
"harmonic": [(lambda *x: True, "HarmonicNumber")],
"RisingFactorial": [(lambda *x: True, "Pochhammer")],
"FallingFactorial": [(lambda *x: True, "FactorialPower")],
"laguerre": [(lambda *x: True, "LaguerreL")],
"assoc_laguerre": [(lambda *x: True, "LaguerreL")],
"hermite": [(lambda *x: True, "HermiteH")],
"jacobi": [(lambda *x: True, "JacobiP")],
"gegenbauer": [(lambda *x: True, "GegenbauerC")],
"chebyshevt": [(lambda *x: True, "ChebyshevT")],
"chebyshevu": [(lambda *x: True, "ChebyshevU")],
"legendre": [(lambda *x: True, "LegendreP")],
"assoc_legendre": [(lambda *x: True, "LegendreP")],
"mathieuc": [(lambda *x: True, "MathieuC")],
"mathieus": [(lambda *x: True, "MathieuS")],
"mathieucprime": [(lambda *x: True, "MathieuCPrime")],
"mathieusprime": [(lambda *x: True, "MathieuSPrime")],
"stieltjes": [(lambda x: True, "StieltjesGamma")],
"elliptic_e": [(lambda *x: True, "EllipticE")],
"elliptic_f": [(lambda *x: True, "EllipticE")],
"elliptic_k": [(lambda x: True, "EllipticK")],
"elliptic_pi": [(lambda *x: True, "EllipticPi")],
"zeta": [(lambda *x: True, "Zeta")],
"besseli": [(lambda *x: True, "BesselI")],
"besselj": [(lambda *x: True, "BesselJ")],
"besselk": [(lambda *x: True, "BesselK")],
"bessely": [(lambda *x: True, "BesselY")],
"hankel1": [(lambda *x: True, "HankelH1")],
"hankel2": [(lambda *x: True, "HankelH2")],
"airyai": [(lambda x: True, "AiryAi")],
"airybi": [(lambda x: True, "AiryBi")],
"airyaiprime": [(lambda x: True, "AiryAiPrime")],
"airybiprime": [(lambda x: True, "AiryBiPrime")],
"polylog": [(lambda *x: True, "PolyLog")],
"lerchphi": [(lambda *x: True, "LerchPhi")],
"gcd": [(lambda *x: True, "GCD")],
"lcm": [(lambda *x: True, "LCM")],
"jn": [(lambda *x: True, "SphericalBesselJ")],
"yn": [(lambda *x: True, "SphericalBesselY")],
"hyper": [(lambda *x: True, "HypergeometricPFQ")],
"meijerg": [(lambda *x: True, "MeijerG")],
"appellf1": [(lambda *x: True, "AppellF1")],
"DiracDelta": [(lambda x: True, "DiracDelta")],
"Heaviside": [(lambda x: True, "HeavisideTheta")],
"KroneckerDelta": [(lambda *x: True, "KroneckerDelta")],
}
class MCodePrinter(CodePrinter):
"""A printer to convert python expressions to
strings of the Wolfram's Mathematica code
"""
printmethod = "_mcode"
language = "Wolfram Language"
_default_settings = {
'order': None,
'full_prec': 'auto',
'precision': 15,
'user_functions': {},
'human': True,
'allow_unknown_functions': False,
} # type: Dict[str, Any]
_number_symbols = set() # type: Set[Tuple[Expr, Float]]
_not_supported = set() # type: Set[Basic]
def __init__(self, settings={}):
"""Register function mappings supplied by user"""
CodePrinter.__init__(self, settings)
self.known_functions = dict(known_functions)
userfuncs = settings.get('user_functions', {}).copy()
for k, v in userfuncs.items():
if not isinstance(v, list):
userfuncs[k] = [(lambda *x: True, v)]
self.known_functions.update(userfuncs)
def _format_code(self, lines):
return lines
def _print_Pow(self, expr):
PREC = precedence(expr)
return '%s^%s' % (self.parenthesize(expr.base, PREC),
self.parenthesize(expr.exp, PREC))
def _print_Mul(self, expr):
PREC = precedence(expr)
c, nc = expr.args_cnc()
res = super(MCodePrinter, self)._print_Mul(expr.func(*c))
if nc:
res += '*'
res += '**'.join(self.parenthesize(a, PREC) for a in nc)
return res
def _print_Relational(self, expr):
lhs_code = self._print(expr.lhs)
rhs_code = self._print(expr.rhs)
op = expr.rel_op
return "{0} {1} {2}".format(lhs_code, op, rhs_code)
# Primitive numbers
def _print_Zero(self, expr):
return '0'
def _print_One(self, expr):
return '1'
def _print_NegativeOne(self, expr):
return '-1'
def _print_Half(self, expr):
return '1/2'
def _print_ImaginaryUnit(self, expr):
return 'I'
# Infinity and invalid numbers
def _print_Infinity(self, expr):
return 'Infinity'
def _print_NegativeInfinity(self, expr):
return '-Infinity'
def _print_ComplexInfinity(self, expr):
return 'ComplexInfinity'
def _print_NaN(self, expr):
return 'Indeterminate'
# Mathematical constants
def _print_Exp1(self, expr):
return 'E'
def _print_Pi(self, expr):
return 'Pi'
def _print_GoldenRatio(self, expr):
return 'GoldenRatio'
def _print_TribonacciConstant(self, expr):
expanded = expr.expand(func=True)
PREC = precedence(expr)
return self.parenthesize(expanded, PREC)
def _print_EulerGamma(self, expr):
return 'EulerGamma'
def _print_Catalan(self, expr):
return 'Catalan'
def _print_list(self, expr):
return '{' + ', '.join(self.doprint(a) for a in expr) + '}'
_print_tuple = _print_list
_print_Tuple = _print_list
def _print_ImmutableDenseMatrix(self, expr):
return self.doprint(expr.tolist())
def _print_ImmutableSparseMatrix(self, expr):
from sympy.core.compatibility import default_sort_key
def print_rule(pos, val):
return '{} -> {}'.format(
self.doprint((pos[0]+1, pos[1]+1)), self.doprint(val))
def print_data():
items = sorted(expr._smat.items(), key=default_sort_key)
return '{' + \
', '.join(print_rule(k, v) for k, v in items) + \
'}'
def print_dims():
return self.doprint(expr.shape)
return 'SparseArray[{}, {}]'.format(print_data(), print_dims())
def _print_ImmutableDenseNDimArray(self, expr):
return self.doprint(expr.tolist())
def _print_ImmutableSparseNDimArray(self, expr):
def print_string_list(string_list):
return '{' + ', '.join(a for a in string_list) + '}'
def to_mathematica_index(*args):
"""Helper function to change Python style indexing to
Pathematica indexing.
Python indexing (0, 1 ... n-1)
-> Mathematica indexing (1, 2 ... n)
"""
return tuple(i + 1 for i in args)
def print_rule(pos, val):
"""Helper function to print a rule of Mathematica"""
return '{} -> {}'.format(self.doprint(pos), self.doprint(val))
def print_data():
"""Helper function to print data part of Mathematica
sparse array.
It uses the fourth notation ``SparseArray[data,{d1,d2,...}]``
from
https://reference.wolfram.com/language/ref/SparseArray.html
``data`` must be formatted with rule.
"""
return print_string_list(
[print_rule(
to_mathematica_index(*(expr._get_tuple_index(key))),
value)
for key, value in sorted(expr._sparse_array.items())]
)
def print_dims():
"""Helper function to print dimensions part of Mathematica
sparse array.
It uses the fourth notation ``SparseArray[data,{d1,d2,...}]``
from
https://reference.wolfram.com/language/ref/SparseArray.html
"""
return self.doprint(expr.shape)
return 'SparseArray[{}, {}]'.format(print_data(), print_dims())
def _print_Function(self, expr):
if expr.func.__name__ in self.known_functions:
cond_mfunc = self.known_functions[expr.func.__name__]
for cond, mfunc in cond_mfunc:
if cond(*expr.args):
return "%s[%s]" % (mfunc, self.stringify(expr.args, ", "))
elif (expr.func.__name__ in self._rewriteable_functions and
self._rewriteable_functions[expr.func.__name__] in self.known_functions):
# Simple rewrite to supported function possible
return self._print(expr.rewrite(self._rewriteable_functions[expr.func.__name__]))
return expr.func.__name__ + "[%s]" % self.stringify(expr.args, ", ")
_print_MinMaxBase = _print_Function
def _print_LambertW(self, expr):
if len(expr.args) == 1:
return "ProductLog[{}]".format(self._print(expr.args[0]))
return "ProductLog[{}, {}]".format(
self._print(expr.args[1]), self._print(expr.args[0]))
def _print_Integral(self, expr):
if len(expr.variables) == 1 and not expr.limits[0][1:]:
args = [expr.args[0], expr.variables[0]]
else:
args = expr.args
return "Hold[Integrate[" + ', '.join(self.doprint(a) for a in args) + "]]"
def _print_Sum(self, expr):
return "Hold[Sum[" + ', '.join(self.doprint(a) for a in expr.args) + "]]"
def _print_Derivative(self, expr):
dexpr = expr.expr
dvars = [i[0] if i[1] == 1 else i for i in expr.variable_count]
return "Hold[D[" + ', '.join(self.doprint(a) for a in [dexpr] + dvars) + "]]"
def _get_comment(self, text):
return "(* {} *)".format(text)
def mathematica_code(expr, **settings):
r"""Converts an expr to a string of the Wolfram Mathematica code
Examples
========
>>> from sympy import mathematica_code as mcode, symbols, sin
>>> x = symbols('x')
>>> mcode(sin(x).series(x).removeO())
'(1/120)*x^5 - 1/6*x^3 + x'
"""
return MCodePrinter(settings).doprint(expr)
|
d361131d08636005f4c1d6ecf8a766bbdc9c0681a7f912e45c9a93bcb5025ccf | """
C code printer
The C89CodePrinter & C99CodePrinter converts single sympy expressions into
single C expressions, using the functions defined in math.h where possible.
A complete code generator, which uses ccode extensively, can be found in
sympy.utilities.codegen. The codegen module can be used to generate complete
source code files that are compilable without further modifications.
"""
from __future__ import print_function, division
from typing import Any, Dict, Tuple
from functools import wraps
from itertools import chain
from sympy.core import S
from sympy.codegen.ast import (
Assignment, Pointer, Variable, Declaration, Type,
real, complex_, integer, bool_, float32, float64, float80,
complex64, complex128, intc, value_const, pointer_const,
int8, int16, int32, int64, uint8, uint16, uint32, uint64, untyped
)
from sympy.printing.codeprinter import CodePrinter, requires
from sympy.printing.precedence import precedence, PRECEDENCE
from sympy.sets.fancysets import Range
# dictionary mapping sympy function to (argument_conditions, C_function).
# Used in C89CodePrinter._print_Function(self)
known_functions_C89 = {
"Abs": [(lambda x: not x.is_integer, "fabs"), (lambda x: x.is_integer, "abs")],
"sin": "sin",
"cos": "cos",
"tan": "tan",
"asin": "asin",
"acos": "acos",
"atan": "atan",
"atan2": "atan2",
"exp": "exp",
"log": "log",
"sinh": "sinh",
"cosh": "cosh",
"tanh": "tanh",
"floor": "floor",
"ceiling": "ceil",
}
known_functions_C99 = dict(known_functions_C89, **{
'exp2': 'exp2',
'expm1': 'expm1',
'log10': 'log10',
'log2': 'log2',
'log1p': 'log1p',
'Cbrt': 'cbrt',
'hypot': 'hypot',
'fma': 'fma',
'loggamma': 'lgamma',
'erfc': 'erfc',
'Max': 'fmax',
'Min': 'fmin',
"asinh": "asinh",
"acosh": "acosh",
"atanh": "atanh",
"erf": "erf",
"gamma": "tgamma",
})
# These are the core reserved words in the C language. Taken from:
# http://en.cppreference.com/w/c/keyword
reserved_words = [
'auto', 'break', 'case', 'char', 'const', 'continue', 'default', 'do',
'double', 'else', 'enum', 'extern', 'float', 'for', 'goto', 'if', 'int',
'long', 'register', 'return', 'short', 'signed', 'sizeof', 'static',
'struct', 'entry', # never standardized, we'll leave it here anyway
'switch', 'typedef', 'union', 'unsigned', 'void', 'volatile', 'while'
]
reserved_words_c99 = ['inline', 'restrict']
def get_math_macros():
""" Returns a dictionary with math-related macros from math.h/cmath
Note that these macros are not strictly required by the C/C++-standard.
For MSVC they are enabled by defining "_USE_MATH_DEFINES" (preferably
via a compilation flag).
Returns
=======
Dictionary mapping sympy expressions to strings (macro names)
"""
from sympy.codegen.cfunctions import log2, Sqrt
from sympy.functions.elementary.exponential import log
from sympy.functions.elementary.miscellaneous import sqrt
return {
S.Exp1: 'M_E',
log2(S.Exp1): 'M_LOG2E',
1/log(2): 'M_LOG2E',
log(2): 'M_LN2',
log(10): 'M_LN10',
S.Pi: 'M_PI',
S.Pi/2: 'M_PI_2',
S.Pi/4: 'M_PI_4',
1/S.Pi: 'M_1_PI',
2/S.Pi: 'M_2_PI',
2/sqrt(S.Pi): 'M_2_SQRTPI',
2/Sqrt(S.Pi): 'M_2_SQRTPI',
sqrt(2): 'M_SQRT2',
Sqrt(2): 'M_SQRT2',
1/sqrt(2): 'M_SQRT1_2',
1/Sqrt(2): 'M_SQRT1_2'
}
def _as_macro_if_defined(meth):
""" Decorator for printer methods
When a Printer's method is decorated using this decorator the expressions printed
will first be looked for in the attribute ``math_macros``, and if present it will
print the macro name in ``math_macros`` followed by a type suffix for the type
``real``. e.g. printing ``sympy.pi`` would print ``M_PIl`` if real is mapped to float80.
"""
@wraps(meth)
def _meth_wrapper(self, expr, **kwargs):
if expr in self.math_macros:
return '%s%s' % (self.math_macros[expr], self._get_math_macro_suffix(real))
else:
return meth(self, expr, **kwargs)
return _meth_wrapper
class C89CodePrinter(CodePrinter):
"""A printer to convert python expressions to strings of c code"""
printmethod = "_ccode"
language = "C"
standard = "C89"
reserved_words = set(reserved_words)
_default_settings = {
'order': None,
'full_prec': 'auto',
'precision': 17,
'user_functions': {},
'human': True,
'allow_unknown_functions': False,
'contract': True,
'dereference': set(),
'error_on_reserved': False,
'reserved_word_suffix': '_',
} # type: Dict[str, Any]
type_aliases = {
real: float64,
complex_: complex128,
integer: intc
}
type_mappings = {
real: 'double',
intc: 'int',
float32: 'float',
float64: 'double',
integer: 'int',
bool_: 'bool',
int8: 'int8_t',
int16: 'int16_t',
int32: 'int32_t',
int64: 'int64_t',
uint8: 'int8_t',
uint16: 'int16_t',
uint32: 'int32_t',
uint64: 'int64_t',
} # type: Dict[Type, Any]
type_headers = {
bool_: {'stdbool.h'},
int8: {'stdint.h'},
int16: {'stdint.h'},
int32: {'stdint.h'},
int64: {'stdint.h'},
uint8: {'stdint.h'},
uint16: {'stdint.h'},
uint32: {'stdint.h'},
uint64: {'stdint.h'},
}
# Macros needed to be defined when using a Type
type_macros = {} # type: Dict[Type, Tuple[str, ...]]
type_func_suffixes = {
float32: 'f',
float64: '',
float80: 'l'
}
type_literal_suffixes = {
float32: 'F',
float64: '',
float80: 'L'
}
type_math_macro_suffixes = {
float80: 'l'
}
math_macros = None
_ns = '' # namespace, C++ uses 'std::'
# known_functions-dict to copy
_kf = known_functions_C89 # type: Dict[str, Any]
def __init__(self, settings=None):
settings = settings or {}
if self.math_macros is None:
self.math_macros = settings.pop('math_macros', get_math_macros())
self.type_aliases = dict(chain(self.type_aliases.items(),
settings.pop('type_aliases', {}).items()))
self.type_mappings = dict(chain(self.type_mappings.items(),
settings.pop('type_mappings', {}).items()))
self.type_headers = dict(chain(self.type_headers.items(),
settings.pop('type_headers', {}).items()))
self.type_macros = dict(chain(self.type_macros.items(),
settings.pop('type_macros', {}).items()))
self.type_func_suffixes = dict(chain(self.type_func_suffixes.items(),
settings.pop('type_func_suffixes', {}).items()))
self.type_literal_suffixes = dict(chain(self.type_literal_suffixes.items(),
settings.pop('type_literal_suffixes', {}).items()))
self.type_math_macro_suffixes = dict(chain(self.type_math_macro_suffixes.items(),
settings.pop('type_math_macro_suffixes', {}).items()))
super(C89CodePrinter, self).__init__(settings)
self.known_functions = dict(self._kf, **settings.get('user_functions', {}))
self._dereference = set(settings.get('dereference', []))
self.headers = set()
self.libraries = set()
self.macros = set()
def _rate_index_position(self, p):
return p*5
def _get_statement(self, codestring):
""" Get code string as a statement - i.e. ending with a semicolon. """
return codestring if codestring.endswith(';') else codestring + ';'
def _get_comment(self, text):
return "// {0}".format(text)
def _declare_number_const(self, name, value):
type_ = self.type_aliases[real]
var = Variable(name, type=type_, value=value.evalf(type_.decimal_dig), attrs={value_const})
decl = Declaration(var)
return self._get_statement(self._print(decl))
def _format_code(self, lines):
return self.indent_code(lines)
def _traverse_matrix_indices(self, mat):
rows, cols = mat.shape
return ((i, j) for i in range(rows) for j in range(cols))
@_as_macro_if_defined
def _print_Mul(self, expr, **kwargs):
return super(C89CodePrinter, self)._print_Mul(expr, **kwargs)
@_as_macro_if_defined
def _print_Pow(self, expr):
if "Pow" in self.known_functions:
return self._print_Function(expr)
PREC = precedence(expr)
suffix = self._get_func_suffix(real)
if expr.exp == -1:
return '1.0%s/%s' % (suffix.upper(), self.parenthesize(expr.base, PREC))
elif expr.exp == 0.5:
return '%ssqrt%s(%s)' % (self._ns, suffix, self._print(expr.base))
elif expr.exp == S.One/3 and self.standard != 'C89':
return '%scbrt%s(%s)' % (self._ns, suffix, self._print(expr.base))
else:
return '%spow%s(%s, %s)' % (self._ns, suffix, self._print(expr.base),
self._print(expr.exp))
def _print_Mod(self, expr):
num, den = expr.args
if num.is_integer and den.is_integer:
return "(({}) % ({}))".format(self._print(num), self._print(den))
else:
return self._print_math_func(expr, known='fmod')
def _print_Rational(self, expr):
p, q = int(expr.p), int(expr.q)
suffix = self._get_literal_suffix(real)
return '%d.0%s/%d.0%s' % (p, suffix, q, suffix)
def _print_Indexed(self, expr):
# calculate index for 1d array
offset = getattr(expr.base, 'offset', S.Zero)
strides = getattr(expr.base, 'strides', None)
indices = expr.indices
if strides is None or isinstance(strides, str):
dims = expr.shape
shift = S.One
temp = tuple()
if strides == 'C' or strides is None:
traversal = reversed(range(expr.rank))
indices = indices[::-1]
elif strides == 'F':
traversal = range(expr.rank)
for i in traversal:
temp += (shift,)
shift *= dims[i]
strides = temp
flat_index = sum([x[0]*x[1] for x in zip(indices, strides)]) + offset
return "%s[%s]" % (self._print(expr.base.label),
self._print(flat_index))
def _print_Idx(self, expr):
return self._print(expr.label)
@_as_macro_if_defined
def _print_NumberSymbol(self, expr):
return super(C89CodePrinter, self)._print_NumberSymbol(expr)
def _print_Infinity(self, expr):
return 'HUGE_VAL'
def _print_NegativeInfinity(self, expr):
return '-HUGE_VAL'
def _print_Piecewise(self, expr):
if expr.args[-1].cond != True:
# We need the last conditional to be a True, otherwise the resulting
# function may not return a result.
raise ValueError("All Piecewise expressions must contain an "
"(expr, True) statement to be used as a default "
"condition. Without one, the generated "
"expression may not evaluate to anything under "
"some condition.")
lines = []
if expr.has(Assignment):
for i, (e, c) in enumerate(expr.args):
if i == 0:
lines.append("if (%s) {" % self._print(c))
elif i == len(expr.args) - 1 and c == True:
lines.append("else {")
else:
lines.append("else if (%s) {" % self._print(c))
code0 = self._print(e)
lines.append(code0)
lines.append("}")
return "\n".join(lines)
else:
# The piecewise was used in an expression, need to do inline
# operators. This has the downside that inline operators will
# not work for statements that span multiple lines (Matrix or
# Indexed expressions).
ecpairs = ["((%s) ? (\n%s\n)\n" % (self._print(c),
self._print(e))
for e, c in expr.args[:-1]]
last_line = ": (\n%s\n)" % self._print(expr.args[-1].expr)
return ": ".join(ecpairs) + last_line + " ".join([")"*len(ecpairs)])
def _print_ITE(self, expr):
from sympy.functions import Piecewise
_piecewise = Piecewise((expr.args[1], expr.args[0]), (expr.args[2], True))
return self._print(_piecewise)
def _print_MatrixElement(self, expr):
return "{0}[{1}]".format(self.parenthesize(expr.parent, PRECEDENCE["Atom"],
strict=True), expr.j + expr.i*expr.parent.shape[1])
def _print_Symbol(self, expr):
name = super(C89CodePrinter, self)._print_Symbol(expr)
if expr in self._settings['dereference']:
return '(*{0})'.format(name)
else:
return name
def _print_Relational(self, expr):
lhs_code = self._print(expr.lhs)
rhs_code = self._print(expr.rhs)
op = expr.rel_op
return "{0} {1} {2}".format(lhs_code, op, rhs_code)
def _print_sinc(self, expr):
from sympy.functions.elementary.trigonometric import sin
from sympy.core.relational import Ne
from sympy.functions import Piecewise
_piecewise = Piecewise(
(sin(expr.args[0]) / expr.args[0], Ne(expr.args[0], 0)), (1, True))
return self._print(_piecewise)
def _print_For(self, expr):
target = self._print(expr.target)
if isinstance(expr.iterable, Range):
start, stop, step = expr.iterable.args
else:
raise NotImplementedError("Only iterable currently supported is Range")
body = self._print(expr.body)
return ('for ({target} = {start}; {target} < {stop}; {target} += '
'{step}) {{\n{body}\n}}').format(target=target, start=start,
stop=stop, step=step, body=body)
def _print_sign(self, func):
return '((({0}) > 0) - (({0}) < 0))'.format(self._print(func.args[0]))
def _print_Max(self, expr):
if "Max" in self.known_functions:
return self._print_Function(expr)
def inner_print_max(args): # The more natural abstraction of creating
if len(args) == 1: # and printing smaller Max objects is slow
return self._print(args[0]) # when there are many arguments.
half = len(args) // 2
return "((%(a)s > %(b)s) ? %(a)s : %(b)s)" % {
'a': inner_print_max(args[:half]),
'b': inner_print_max(args[half:])
}
return inner_print_max(expr.args)
def _print_Min(self, expr):
if "Min" in self.known_functions:
return self._print_Function(expr)
def inner_print_min(args): # The more natural abstraction of creating
if len(args) == 1: # and printing smaller Min objects is slow
return self._print(args[0]) # when there are many arguments.
half = len(args) // 2
return "((%(a)s < %(b)s) ? %(a)s : %(b)s)" % {
'a': inner_print_min(args[:half]),
'b': inner_print_min(args[half:])
}
return inner_print_min(expr.args)
def indent_code(self, code):
"""Accepts a string of code or a list of code lines"""
if isinstance(code, str):
code_lines = self.indent_code(code.splitlines(True))
return ''.join(code_lines)
tab = " "
inc_token = ('{', '(', '{\n', '(\n')
dec_token = ('}', ')')
code = [line.lstrip(' \t') for line in code]
increase = [int(any(map(line.endswith, inc_token))) for line in code]
decrease = [int(any(map(line.startswith, dec_token))) for line in code]
pretty = []
level = 0
for n, line in enumerate(code):
if line == '' or line == '\n':
pretty.append(line)
continue
level -= decrease[n]
pretty.append("%s%s" % (tab*level, line))
level += increase[n]
return pretty
def _get_func_suffix(self, type_):
return self.type_func_suffixes[self.type_aliases.get(type_, type_)]
def _get_literal_suffix(self, type_):
return self.type_literal_suffixes[self.type_aliases.get(type_, type_)]
def _get_math_macro_suffix(self, type_):
alias = self.type_aliases.get(type_, type_)
dflt = self.type_math_macro_suffixes.get(alias, '')
return self.type_math_macro_suffixes.get(type_, dflt)
def _print_Type(self, type_):
self.headers.update(self.type_headers.get(type_, set()))
self.macros.update(self.type_macros.get(type_, set()))
return self._print(self.type_mappings.get(type_, type_.name))
def _print_Declaration(self, decl):
from sympy.codegen.cnodes import restrict
var = decl.variable
val = var.value
if var.type == untyped:
raise ValueError("C does not support untyped variables")
if isinstance(var, Pointer):
result = '{vc}{t} *{pc} {r}{s}'.format(
vc='const ' if value_const in var.attrs else '',
t=self._print(var.type),
pc=' const' if pointer_const in var.attrs else '',
r='restrict ' if restrict in var.attrs else '',
s=self._print(var.symbol)
)
elif isinstance(var, Variable):
result = '{vc}{t} {s}'.format(
vc='const ' if value_const in var.attrs else '',
t=self._print(var.type),
s=self._print(var.symbol)
)
else:
raise NotImplementedError("Unknown type of var: %s" % type(var))
if val != None: # Must be "!= None", cannot be "is not None"
result += ' = %s' % self._print(val)
return result
def _print_Float(self, flt):
type_ = self.type_aliases.get(real, real)
self.macros.update(self.type_macros.get(type_, set()))
suffix = self._get_literal_suffix(type_)
num = str(flt.evalf(type_.decimal_dig))
if 'e' not in num and '.' not in num:
num += '.0'
num_parts = num.split('e')
num_parts[0] = num_parts[0].rstrip('0')
if num_parts[0].endswith('.'):
num_parts[0] += '0'
return 'e'.join(num_parts) + suffix
@requires(headers={'stdbool.h'})
def _print_BooleanTrue(self, expr):
return 'true'
@requires(headers={'stdbool.h'})
def _print_BooleanFalse(self, expr):
return 'false'
def _print_Element(self, elem):
if elem.strides == None: # Must be "== None", cannot be "is None"
if elem.offset != None: # Must be "!= None", cannot be "is not None"
raise ValueError("Expected strides when offset is given")
idxs = ']['.join(map(lambda arg: self._print(arg),
elem.indices))
else:
global_idx = sum([i*s for i, s in zip(elem.indices, elem.strides)])
if elem.offset != None: # Must be "!= None", cannot be "is not None"
global_idx += elem.offset
idxs = self._print(global_idx)
return "{symb}[{idxs}]".format(
symb=self._print(elem.symbol),
idxs=idxs
)
def _print_CodeBlock(self, expr):
""" Elements of code blocks printed as statements. """
return '\n'.join([self._get_statement(self._print(i)) for i in expr.args])
def _print_While(self, expr):
return 'while ({condition}) {{\n{body}\n}}'.format(**expr.kwargs(
apply=lambda arg: self._print(arg)))
def _print_Scope(self, expr):
return '{\n%s\n}' % self._print_CodeBlock(expr.body)
@requires(headers={'stdio.h'})
def _print_Print(self, expr):
return 'printf({fmt}, {pargs})'.format(
fmt=self._print(expr.format_string),
pargs=', '.join(map(lambda arg: self._print(arg), expr.print_args))
)
def _print_FunctionPrototype(self, expr):
pars = ', '.join(map(lambda arg: self._print(Declaration(arg)),
expr.parameters))
return "%s %s(%s)" % (
tuple(map(lambda arg: self._print(arg),
(expr.return_type, expr.name))) + (pars,)
)
def _print_FunctionDefinition(self, expr):
return "%s%s" % (self._print_FunctionPrototype(expr),
self._print_Scope(expr))
def _print_Return(self, expr):
arg, = expr.args
return 'return %s' % self._print(arg)
def _print_CommaOperator(self, expr):
return '(%s)' % ', '.join(map(lambda arg: self._print(arg), expr.args))
def _print_Label(self, expr):
return '%s:' % str(expr)
def _print_goto(self, expr):
return 'goto %s' % expr.label
def _print_PreIncrement(self, expr):
arg, = expr.args
return '++(%s)' % self._print(arg)
def _print_PostIncrement(self, expr):
arg, = expr.args
return '(%s)++' % self._print(arg)
def _print_PreDecrement(self, expr):
arg, = expr.args
return '--(%s)' % self._print(arg)
def _print_PostDecrement(self, expr):
arg, = expr.args
return '(%s)--' % self._print(arg)
def _print_struct(self, expr):
return "%(keyword)s %(name)s {\n%(lines)s}" % dict(
keyword=expr.__class__.__name__, name=expr.name, lines=';\n'.join(
[self._print(decl) for decl in expr.declarations] + [''])
)
def _print_BreakToken(self, _):
return 'break'
def _print_ContinueToken(self, _):
return 'continue'
_print_union = _print_struct
class C99CodePrinter(C89CodePrinter):
standard = 'C99'
reserved_words = set(reserved_words + reserved_words_c99)
type_mappings=dict(chain(C89CodePrinter.type_mappings.items(), {
complex64: 'float complex',
complex128: 'double complex',
}.items()))
type_headers = dict(chain(C89CodePrinter.type_headers.items(), {
complex64: {'complex.h'},
complex128: {'complex.h'}
}.items()))
# known_functions-dict to copy
_kf = known_functions_C99 # type: Dict[str, Any]
# functions with versions with 'f' and 'l' suffixes:
_prec_funcs = ('fabs fmod remainder remquo fma fmax fmin fdim nan exp exp2'
' expm1 log log10 log2 log1p pow sqrt cbrt hypot sin cos tan'
' asin acos atan atan2 sinh cosh tanh asinh acosh atanh erf'
' erfc tgamma lgamma ceil floor trunc round nearbyint rint'
' frexp ldexp modf scalbn ilogb logb nextafter copysign').split()
def _print_Infinity(self, expr):
return 'INFINITY'
def _print_NegativeInfinity(self, expr):
return '-INFINITY'
def _print_NaN(self, expr):
return 'NAN'
# tgamma was already covered by 'known_functions' dict
@requires(headers={'math.h'}, libraries={'m'})
@_as_macro_if_defined
def _print_math_func(self, expr, nest=False, known=None):
if known is None:
known = self.known_functions[expr.__class__.__name__]
if not isinstance(known, str):
for cb, name in known:
if cb(*expr.args):
known = name
break
else:
raise ValueError("No matching printer")
try:
return known(self, *expr.args)
except TypeError:
suffix = self._get_func_suffix(real) if self._ns + known in self._prec_funcs else ''
if nest:
args = self._print(expr.args[0])
if len(expr.args) > 1:
paren_pile = ''
for curr_arg in expr.args[1:-1]:
paren_pile += ')'
args += ', {ns}{name}{suffix}({next}'.format(
ns=self._ns,
name=known,
suffix=suffix,
next = self._print(curr_arg)
)
args += ', %s%s' % (
self._print(expr.func(expr.args[-1])),
paren_pile
)
else:
args = ', '.join(map(lambda arg: self._print(arg), expr.args))
return '{ns}{name}{suffix}({args})'.format(
ns=self._ns,
name=known,
suffix=suffix,
args=args
)
def _print_Max(self, expr):
return self._print_math_func(expr, nest=True)
def _print_Min(self, expr):
return self._print_math_func(expr, nest=True)
def _get_loop_opening_ending(self, indices):
open_lines = []
close_lines = []
loopstart = "for (int %(var)s=%(start)s; %(var)s<%(end)s; %(var)s++){" # C99
for i in indices:
# C arrays start at 0 and end at dimension-1
open_lines.append(loopstart % {
'var': self._print(i.label),
'start': self._print(i.lower),
'end': self._print(i.upper + 1)})
close_lines.append("}")
return open_lines, close_lines
for k in ('Abs Sqrt exp exp2 expm1 log log10 log2 log1p Cbrt hypot fma'
' loggamma sin cos tan asin acos atan atan2 sinh cosh tanh asinh acosh '
'atanh erf erfc loggamma gamma ceiling floor').split():
setattr(C99CodePrinter, '_print_%s' % k, C99CodePrinter._print_math_func)
class C11CodePrinter(C99CodePrinter):
@requires(headers={'stdalign.h'})
def _print_alignof(self, expr):
arg, = expr.args
return 'alignof(%s)' % self._print(arg)
c_code_printers = {
'c89': C89CodePrinter,
'c99': C99CodePrinter,
'c11': C11CodePrinter
}
def ccode(expr, assign_to=None, standard='c99', **settings):
"""Converts an expr to a string of c code
Parameters
==========
expr : Expr
A sympy expression to be converted.
assign_to : optional
When given, the argument is used as the name of the variable to which
the expression is assigned. Can be a string, ``Symbol``,
``MatrixSymbol``, or ``Indexed`` type. This is helpful in case of
line-wrapping, or for expressions that generate multi-line statements.
standard : str, optional
String specifying the standard. If your compiler supports a more modern
standard you may set this to 'c99' to allow the printer to use more math
functions. [default='c89'].
precision : integer, optional
The precision for numbers such as pi [default=17].
user_functions : dict, optional
A dictionary where the keys are string representations of either
``FunctionClass`` or ``UndefinedFunction`` instances and the values
are their desired C string representations. Alternatively, the
dictionary value can be a list of tuples i.e. [(argument_test,
cfunction_string)] or [(argument_test, cfunction_formater)]. See below
for examples.
dereference : iterable, optional
An iterable of symbols that should be dereferenced in the printed code
expression. These would be values passed by address to the function.
For example, if ``dereference=[a]``, the resulting code would print
``(*a)`` instead of ``a``.
human : bool, optional
If True, the result is a single string that may contain some constant
declarations for the number symbols. If False, the same information is
returned in a tuple of (symbols_to_declare, not_supported_functions,
code_text). [default=True].
contract: bool, optional
If True, ``Indexed`` instances are assumed to obey tensor contraction
rules and the corresponding nested loops over indices are generated.
Setting contract=False will not generate loops, instead the user is
responsible to provide values for the indices in the code.
[default=True].
Examples
========
>>> from sympy import ccode, symbols, Rational, sin, ceiling, Abs, Function
>>> x, tau = symbols("x, tau")
>>> expr = (2*tau)**Rational(7, 2)
>>> ccode(expr)
'8*M_SQRT2*pow(tau, 7.0/2.0)'
>>> ccode(expr, math_macros={})
'8*sqrt(2)*pow(tau, 7.0/2.0)'
>>> ccode(sin(x), assign_to="s")
's = sin(x);'
>>> from sympy.codegen.ast import real, float80
>>> ccode(expr, type_aliases={real: float80})
'8*M_SQRT2l*powl(tau, 7.0L/2.0L)'
Simple custom printing can be defined for certain types by passing a
dictionary of {"type" : "function"} to the ``user_functions`` kwarg.
Alternatively, the dictionary value can be a list of tuples i.e.
[(argument_test, cfunction_string)].
>>> custom_functions = {
... "ceiling": "CEIL",
... "Abs": [(lambda x: not x.is_integer, "fabs"),
... (lambda x: x.is_integer, "ABS")],
... "func": "f"
... }
>>> func = Function('func')
>>> ccode(func(Abs(x) + ceiling(x)), standard='C89', user_functions=custom_functions)
'f(fabs(x) + CEIL(x))'
or if the C-function takes a subset of the original arguments:
>>> ccode(2**x + 3**x, standard='C99', user_functions={'Pow': [
... (lambda b, e: b == 2, lambda b, e: 'exp2(%s)' % e),
... (lambda b, e: b != 2, 'pow')]})
'exp2(x) + pow(3, x)'
``Piecewise`` expressions are converted into conditionals. If an
``assign_to`` variable is provided an if statement is created, otherwise
the ternary operator is used. Note that if the ``Piecewise`` lacks a
default term, represented by ``(expr, True)`` then an error will be thrown.
This is to prevent generating an expression that may not evaluate to
anything.
>>> from sympy import Piecewise
>>> expr = Piecewise((x + 1, x > 0), (x, True))
>>> print(ccode(expr, tau, standard='C89'))
if (x > 0) {
tau = x + 1;
}
else {
tau = x;
}
Support for loops is provided through ``Indexed`` types. With
``contract=True`` these expressions will be turned into loops, whereas
``contract=False`` will just print the assignment expression that should be
looped over:
>>> from sympy import Eq, IndexedBase, Idx
>>> len_y = 5
>>> y = IndexedBase('y', shape=(len_y,))
>>> t = IndexedBase('t', shape=(len_y,))
>>> Dy = IndexedBase('Dy', shape=(len_y-1,))
>>> i = Idx('i', len_y-1)
>>> e=Eq(Dy[i], (y[i+1]-y[i])/(t[i+1]-t[i]))
>>> ccode(e.rhs, assign_to=e.lhs, contract=False, standard='C89')
'Dy[i] = (y[i + 1] - y[i])/(t[i + 1] - t[i]);'
Matrices are also supported, but a ``MatrixSymbol`` of the same dimensions
must be provided to ``assign_to``. Note that any expression that can be
generated normally can also exist inside a Matrix:
>>> from sympy import Matrix, MatrixSymbol
>>> mat = Matrix([x**2, Piecewise((x + 1, x > 0), (x, True)), sin(x)])
>>> A = MatrixSymbol('A', 3, 1)
>>> print(ccode(mat, A, standard='C89'))
A[0] = pow(x, 2);
if (x > 0) {
A[1] = x + 1;
}
else {
A[1] = x;
}
A[2] = sin(x);
"""
return c_code_printers[standard.lower()](settings).doprint(expr, assign_to)
def print_ccode(expr, **settings):
"""Prints C representation of the given expression."""
print(ccode(expr, **settings))
|
8f33b692aa6d69358d146e134f28bc0d8451126959fe830cd3a940605027f917 | """
A MathML printer.
"""
from __future__ import print_function, division
from typing import Any, Dict
from sympy import sympify, S, Mul
from sympy.core.compatibility import default_sort_key
from sympy.core.function import _coeff_isneg
from sympy.printing.conventions import split_super_sub, requires_partial
from sympy.printing.precedence import \
precedence_traditional, PRECEDENCE, PRECEDENCE_TRADITIONAL
from sympy.printing.pretty.pretty_symbology import greek_unicode
from sympy.printing.printer import Printer
import mpmath.libmp as mlib
from mpmath.libmp import prec_to_dps
class MathMLPrinterBase(Printer):
"""Contains common code required for MathMLContentPrinter and
MathMLPresentationPrinter.
"""
_default_settings = {
"order": None,
"encoding": "utf-8",
"fold_frac_powers": False,
"fold_func_brackets": False,
"fold_short_frac": None,
"inv_trig_style": "abbreviated",
"ln_notation": False,
"long_frac_ratio": None,
"mat_delim": "[",
"mat_symbol_style": "plain",
"mul_symbol": None,
"root_notation": True,
"symbol_names": {},
"mul_symbol_mathml_numbers": '·',
} # type: Dict[str, Any]
def __init__(self, settings=None):
Printer.__init__(self, settings)
from xml.dom.minidom import Document, Text
self.dom = Document()
# Workaround to allow strings to remain unescaped
# Based on
# https://stackoverflow.com/questions/38015864/python-xml-dom-minidom-\
# please-dont-escape-my-strings/38041194
class RawText(Text):
def writexml(self, writer, indent='', addindent='', newl=''):
if self.data:
writer.write(u'{}{}{}'.format(indent, self.data, newl))
def createRawTextNode(data):
r = RawText()
r.data = data
r.ownerDocument = self.dom
return r
self.dom.createTextNode = createRawTextNode
def doprint(self, expr):
"""
Prints the expression as MathML.
"""
mathML = Printer._print(self, expr)
unistr = mathML.toxml()
xmlbstr = unistr.encode('ascii', 'xmlcharrefreplace')
res = xmlbstr.decode()
return res
def apply_patch(self):
# Applying the patch of xml.dom.minidom bug
# Date: 2011-11-18
# Description: http://ronrothman.com/public/leftbraned/xml-dom-minidom\
# -toprettyxml-and-silly-whitespace/#best-solution
# Issue: http://bugs.python.org/issue4147
# Patch: http://hg.python.org/cpython/rev/7262f8f276ff/
from xml.dom.minidom import Element, Text, Node, _write_data
def writexml(self, writer, indent="", addindent="", newl=""):
# indent = current indentation
# addindent = indentation to add to higher levels
# newl = newline string
writer.write(indent + "<" + self.tagName)
attrs = self._get_attributes()
a_names = list(attrs.keys())
a_names.sort()
for a_name in a_names:
writer.write(" %s=\"" % a_name)
_write_data(writer, attrs[a_name].value)
writer.write("\"")
if self.childNodes:
writer.write(">")
if (len(self.childNodes) == 1 and
self.childNodes[0].nodeType == Node.TEXT_NODE):
self.childNodes[0].writexml(writer, '', '', '')
else:
writer.write(newl)
for node in self.childNodes:
node.writexml(
writer, indent + addindent, addindent, newl)
writer.write(indent)
writer.write("</%s>%s" % (self.tagName, newl))
else:
writer.write("/>%s" % (newl))
self._Element_writexml_old = Element.writexml
Element.writexml = writexml
def writexml(self, writer, indent="", addindent="", newl=""):
_write_data(writer, "%s%s%s" % (indent, self.data, newl))
self._Text_writexml_old = Text.writexml
Text.writexml = writexml
def restore_patch(self):
from xml.dom.minidom import Element, Text
Element.writexml = self._Element_writexml_old
Text.writexml = self._Text_writexml_old
class MathMLContentPrinter(MathMLPrinterBase):
"""Prints an expression to the Content MathML markup language.
References: https://www.w3.org/TR/MathML2/chapter4.html
"""
printmethod = "_mathml_content"
def mathml_tag(self, e):
"""Returns the MathML tag for an expression."""
translate = {
'Add': 'plus',
'Mul': 'times',
'Derivative': 'diff',
'Number': 'cn',
'int': 'cn',
'Pow': 'power',
'Max': 'max',
'Min': 'min',
'Abs': 'abs',
'And': 'and',
'Or': 'or',
'Xor': 'xor',
'Not': 'not',
'Implies': 'implies',
'Symbol': 'ci',
'MatrixSymbol': 'ci',
'RandomSymbol': 'ci',
'Integral': 'int',
'Sum': 'sum',
'sin': 'sin',
'cos': 'cos',
'tan': 'tan',
'cot': 'cot',
'csc': 'csc',
'sec': 'sec',
'sinh': 'sinh',
'cosh': 'cosh',
'tanh': 'tanh',
'coth': 'coth',
'csch': 'csch',
'sech': 'sech',
'asin': 'arcsin',
'asinh': 'arcsinh',
'acos': 'arccos',
'acosh': 'arccosh',
'atan': 'arctan',
'atanh': 'arctanh',
'atan2': 'arctan',
'acot': 'arccot',
'acoth': 'arccoth',
'asec': 'arcsec',
'asech': 'arcsech',
'acsc': 'arccsc',
'acsch': 'arccsch',
'log': 'ln',
'Equality': 'eq',
'Unequality': 'neq',
'GreaterThan': 'geq',
'LessThan': 'leq',
'StrictGreaterThan': 'gt',
'StrictLessThan': 'lt',
'Union': 'union',
'Intersection': 'intersect',
}
for cls in e.__class__.__mro__:
n = cls.__name__
if n in translate:
return translate[n]
# Not found in the MRO set
n = e.__class__.__name__
return n.lower()
def _print_Mul(self, expr):
if _coeff_isneg(expr):
x = self.dom.createElement('apply')
x.appendChild(self.dom.createElement('minus'))
x.appendChild(self._print_Mul(-expr))
return x
from sympy.simplify import fraction
numer, denom = fraction(expr)
if denom is not S.One:
x = self.dom.createElement('apply')
x.appendChild(self.dom.createElement('divide'))
x.appendChild(self._print(numer))
x.appendChild(self._print(denom))
return x
coeff, terms = expr.as_coeff_mul()
if coeff is S.One and len(terms) == 1:
# XXX since the negative coefficient has been handled, I don't
# think a coeff of 1 can remain
return self._print(terms[0])
if self.order != 'old':
terms = Mul._from_args(terms).as_ordered_factors()
x = self.dom.createElement('apply')
x.appendChild(self.dom.createElement('times'))
if coeff != 1:
x.appendChild(self._print(coeff))
for term in terms:
x.appendChild(self._print(term))
return x
def _print_Add(self, expr, order=None):
args = self._as_ordered_terms(expr, order=order)
lastProcessed = self._print(args[0])
plusNodes = []
for arg in args[1:]:
if _coeff_isneg(arg):
# use minus
x = self.dom.createElement('apply')
x.appendChild(self.dom.createElement('minus'))
x.appendChild(lastProcessed)
x.appendChild(self._print(-arg))
# invert expression since this is now minused
lastProcessed = x
if arg == args[-1]:
plusNodes.append(lastProcessed)
else:
plusNodes.append(lastProcessed)
lastProcessed = self._print(arg)
if arg == args[-1]:
plusNodes.append(self._print(arg))
if len(plusNodes) == 1:
return lastProcessed
x = self.dom.createElement('apply')
x.appendChild(self.dom.createElement('plus'))
while plusNodes:
x.appendChild(plusNodes.pop(0))
return x
def _print_Piecewise(self, expr):
if expr.args[-1].cond != True:
# We need the last conditional to be a True, otherwise the resulting
# function may not return a result.
raise ValueError("All Piecewise expressions must contain an "
"(expr, True) statement to be used as a default "
"condition. Without one, the generated "
"expression may not evaluate to anything under "
"some condition.")
root = self.dom.createElement('piecewise')
for i, (e, c) in enumerate(expr.args):
if i == len(expr.args) - 1 and c == True:
piece = self.dom.createElement('otherwise')
piece.appendChild(self._print(e))
else:
piece = self.dom.createElement('piece')
piece.appendChild(self._print(e))
piece.appendChild(self._print(c))
root.appendChild(piece)
return root
def _print_MatrixBase(self, m):
x = self.dom.createElement('matrix')
for i in range(m.rows):
x_r = self.dom.createElement('matrixrow')
for j in range(m.cols):
x_r.appendChild(self._print(m[i, j]))
x.appendChild(x_r)
return x
def _print_Rational(self, e):
if e.q == 1:
# don't divide
x = self.dom.createElement('cn')
x.appendChild(self.dom.createTextNode(str(e.p)))
return x
x = self.dom.createElement('apply')
x.appendChild(self.dom.createElement('divide'))
# numerator
xnum = self.dom.createElement('cn')
xnum.appendChild(self.dom.createTextNode(str(e.p)))
# denominator
xdenom = self.dom.createElement('cn')
xdenom.appendChild(self.dom.createTextNode(str(e.q)))
x.appendChild(xnum)
x.appendChild(xdenom)
return x
def _print_Limit(self, e):
x = self.dom.createElement('apply')
x.appendChild(self.dom.createElement(self.mathml_tag(e)))
x_1 = self.dom.createElement('bvar')
x_2 = self.dom.createElement('lowlimit')
x_1.appendChild(self._print(e.args[1]))
x_2.appendChild(self._print(e.args[2]))
x.appendChild(x_1)
x.appendChild(x_2)
x.appendChild(self._print(e.args[0]))
return x
def _print_ImaginaryUnit(self, e):
return self.dom.createElement('imaginaryi')
def _print_EulerGamma(self, e):
return self.dom.createElement('eulergamma')
def _print_GoldenRatio(self, e):
"""We use unicode #x3c6 for Greek letter phi as defined here
http://www.w3.org/2003/entities/2007doc/isogrk1.html"""
x = self.dom.createElement('cn')
x.appendChild(self.dom.createTextNode(u"\N{GREEK SMALL LETTER PHI}"))
return x
def _print_Exp1(self, e):
return self.dom.createElement('exponentiale')
def _print_Pi(self, e):
return self.dom.createElement('pi')
def _print_Infinity(self, e):
return self.dom.createElement('infinity')
def _print_NaN(self, e):
return self.dom.createElement('notanumber')
def _print_EmptySet(self, e):
return self.dom.createElement('emptyset')
def _print_BooleanTrue(self, e):
return self.dom.createElement('true')
def _print_BooleanFalse(self, e):
return self.dom.createElement('false')
def _print_NegativeInfinity(self, e):
x = self.dom.createElement('apply')
x.appendChild(self.dom.createElement('minus'))
x.appendChild(self.dom.createElement('infinity'))
return x
def _print_Integral(self, e):
def lime_recur(limits):
x = self.dom.createElement('apply')
x.appendChild(self.dom.createElement(self.mathml_tag(e)))
bvar_elem = self.dom.createElement('bvar')
bvar_elem.appendChild(self._print(limits[0][0]))
x.appendChild(bvar_elem)
if len(limits[0]) == 3:
low_elem = self.dom.createElement('lowlimit')
low_elem.appendChild(self._print(limits[0][1]))
x.appendChild(low_elem)
up_elem = self.dom.createElement('uplimit')
up_elem.appendChild(self._print(limits[0][2]))
x.appendChild(up_elem)
if len(limits[0]) == 2:
up_elem = self.dom.createElement('uplimit')
up_elem.appendChild(self._print(limits[0][1]))
x.appendChild(up_elem)
if len(limits) == 1:
x.appendChild(self._print(e.function))
else:
x.appendChild(lime_recur(limits[1:]))
return x
limits = list(e.limits)
limits.reverse()
return lime_recur(limits)
def _print_Sum(self, e):
# Printer can be shared because Sum and Integral have the
# same internal representation.
return self._print_Integral(e)
def _print_Symbol(self, sym):
ci = self.dom.createElement(self.mathml_tag(sym))
def join(items):
if len(items) > 1:
mrow = self.dom.createElement('mml:mrow')
for i, item in enumerate(items):
if i > 0:
mo = self.dom.createElement('mml:mo')
mo.appendChild(self.dom.createTextNode(" "))
mrow.appendChild(mo)
mi = self.dom.createElement('mml:mi')
mi.appendChild(self.dom.createTextNode(item))
mrow.appendChild(mi)
return mrow
else:
mi = self.dom.createElement('mml:mi')
mi.appendChild(self.dom.createTextNode(items[0]))
return mi
# translate name, supers and subs to unicode characters
def translate(s):
if s in greek_unicode:
return greek_unicode.get(s)
else:
return s
name, supers, subs = split_super_sub(sym.name)
name = translate(name)
supers = [translate(sup) for sup in supers]
subs = [translate(sub) for sub in subs]
mname = self.dom.createElement('mml:mi')
mname.appendChild(self.dom.createTextNode(name))
if not supers:
if not subs:
ci.appendChild(self.dom.createTextNode(name))
else:
msub = self.dom.createElement('mml:msub')
msub.appendChild(mname)
msub.appendChild(join(subs))
ci.appendChild(msub)
else:
if not subs:
msup = self.dom.createElement('mml:msup')
msup.appendChild(mname)
msup.appendChild(join(supers))
ci.appendChild(msup)
else:
msubsup = self.dom.createElement('mml:msubsup')
msubsup.appendChild(mname)
msubsup.appendChild(join(subs))
msubsup.appendChild(join(supers))
ci.appendChild(msubsup)
return ci
_print_MatrixSymbol = _print_Symbol
_print_RandomSymbol = _print_Symbol
def _print_Pow(self, e):
# Here we use root instead of power if the exponent is the reciprocal
# of an integer
if (self._settings['root_notation'] and e.exp.is_Rational
and e.exp.p == 1):
x = self.dom.createElement('apply')
x.appendChild(self.dom.createElement('root'))
if e.exp.q != 2:
xmldeg = self.dom.createElement('degree')
xmlci = self.dom.createElement('ci')
xmlci.appendChild(self.dom.createTextNode(str(e.exp.q)))
xmldeg.appendChild(xmlci)
x.appendChild(xmldeg)
x.appendChild(self._print(e.base))
return x
x = self.dom.createElement('apply')
x_1 = self.dom.createElement(self.mathml_tag(e))
x.appendChild(x_1)
x.appendChild(self._print(e.base))
x.appendChild(self._print(e.exp))
return x
def _print_Number(self, e):
x = self.dom.createElement(self.mathml_tag(e))
x.appendChild(self.dom.createTextNode(str(e)))
return x
def _print_Derivative(self, e):
x = self.dom.createElement('apply')
diff_symbol = self.mathml_tag(e)
if requires_partial(e.expr):
diff_symbol = 'partialdiff'
x.appendChild(self.dom.createElement(diff_symbol))
x_1 = self.dom.createElement('bvar')
for sym, times in reversed(e.variable_count):
x_1.appendChild(self._print(sym))
if times > 1:
degree = self.dom.createElement('degree')
degree.appendChild(self._print(sympify(times)))
x_1.appendChild(degree)
x.appendChild(x_1)
x.appendChild(self._print(e.expr))
return x
def _print_Function(self, e):
x = self.dom.createElement("apply")
x.appendChild(self.dom.createElement(self.mathml_tag(e)))
for arg in e.args:
x.appendChild(self._print(arg))
return x
def _print_Basic(self, e):
x = self.dom.createElement(self.mathml_tag(e))
for arg in e.args:
x.appendChild(self._print(arg))
return x
def _print_AssocOp(self, e):
x = self.dom.createElement('apply')
x_1 = self.dom.createElement(self.mathml_tag(e))
x.appendChild(x_1)
for arg in e.args:
x.appendChild(self._print(arg))
return x
def _print_Relational(self, e):
x = self.dom.createElement('apply')
x.appendChild(self.dom.createElement(self.mathml_tag(e)))
x.appendChild(self._print(e.lhs))
x.appendChild(self._print(e.rhs))
return x
def _print_list(self, seq):
"""MathML reference for the <list> element:
http://www.w3.org/TR/MathML2/chapter4.html#contm.list"""
dom_element = self.dom.createElement('list')
for item in seq:
dom_element.appendChild(self._print(item))
return dom_element
def _print_int(self, p):
dom_element = self.dom.createElement(self.mathml_tag(p))
dom_element.appendChild(self.dom.createTextNode(str(p)))
return dom_element
_print_Implies = _print_AssocOp
_print_Not = _print_AssocOp
_print_Xor = _print_AssocOp
def _print_FiniteSet(self, e):
x = self.dom.createElement('set')
for arg in e.args:
x.appendChild(self._print(arg))
return x
def _print_Complement(self, e):
x = self.dom.createElement('apply')
x.appendChild(self.dom.createElement('setdiff'))
for arg in e.args:
x.appendChild(self._print(arg))
return x
def _print_ProductSet(self, e):
x = self.dom.createElement('apply')
x.appendChild(self.dom.createElement('cartesianproduct'))
for arg in e.args:
x.appendChild(self._print(arg))
return x
# XXX Symmetric difference is not supported for MathML content printers.
class MathMLPresentationPrinter(MathMLPrinterBase):
"""Prints an expression to the Presentation MathML markup language.
References: https://www.w3.org/TR/MathML2/chapter3.html
"""
printmethod = "_mathml_presentation"
def mathml_tag(self, e):
"""Returns the MathML tag for an expression."""
translate = {
'Number': 'mn',
'Limit': '→',
'Derivative': 'ⅆ',
'int': 'mn',
'Symbol': 'mi',
'Integral': '∫',
'Sum': '∑',
'sin': 'sin',
'cos': 'cos',
'tan': 'tan',
'cot': 'cot',
'asin': 'arcsin',
'asinh': 'arcsinh',
'acos': 'arccos',
'acosh': 'arccosh',
'atan': 'arctan',
'atanh': 'arctanh',
'acot': 'arccot',
'atan2': 'arctan',
'Equality': '=',
'Unequality': '≠',
'GreaterThan': '≥',
'LessThan': '≤',
'StrictGreaterThan': '>',
'StrictLessThan': '<',
'lerchphi': 'Φ',
'zeta': 'ζ',
'dirichlet_eta': 'η',
'elliptic_k': 'Κ',
'lowergamma': 'γ',
'uppergamma': 'Γ',
'gamma': 'Γ',
'totient': 'ϕ',
'reduced_totient': 'λ',
'primenu': 'ν',
'primeomega': 'Ω',
'fresnels': 'S',
'fresnelc': 'C',
'LambertW': 'W',
'Heaviside': 'Θ',
'BooleanTrue': 'True',
'BooleanFalse': 'False',
'NoneType': 'None',
'mathieus': 'S',
'mathieuc': 'C',
'mathieusprime': 'S′',
'mathieucprime': 'C′',
}
def mul_symbol_selection():
if (self._settings["mul_symbol"] is None or
self._settings["mul_symbol"] == 'None'):
return '⁢'
elif self._settings["mul_symbol"] == 'times':
return '×'
elif self._settings["mul_symbol"] == 'dot':
return '·'
elif self._settings["mul_symbol"] == 'ldot':
return '․'
elif not isinstance(self._settings["mul_symbol"], str):
raise TypeError
else:
return self._settings["mul_symbol"]
for cls in e.__class__.__mro__:
n = cls.__name__
if n in translate:
return translate[n]
# Not found in the MRO set
if e.__class__.__name__ == "Mul":
return mul_symbol_selection()
n = e.__class__.__name__
return n.lower()
def parenthesize(self, item, level, strict=False):
prec_val = precedence_traditional(item)
if (prec_val < level) or ((not strict) and prec_val <= level):
brac = self.dom.createElement('mfenced')
brac.appendChild(self._print(item))
return brac
else:
return self._print(item)
def _print_Mul(self, expr):
def multiply(expr, mrow):
from sympy.simplify import fraction
numer, denom = fraction(expr)
if denom is not S.One:
frac = self.dom.createElement('mfrac')
if self._settings["fold_short_frac"] and len(str(expr)) < 7:
frac.setAttribute('bevelled', 'true')
xnum = self._print(numer)
xden = self._print(denom)
frac.appendChild(xnum)
frac.appendChild(xden)
mrow.appendChild(frac)
return mrow
coeff, terms = expr.as_coeff_mul()
if coeff is S.One and len(terms) == 1:
mrow.appendChild(self._print(terms[0]))
return mrow
if self.order != 'old':
terms = Mul._from_args(terms).as_ordered_factors()
if coeff != 1:
x = self._print(coeff)
y = self.dom.createElement('mo')
y.appendChild(self.dom.createTextNode(self.mathml_tag(expr)))
mrow.appendChild(x)
mrow.appendChild(y)
for term in terms:
mrow.appendChild(self.parenthesize(term, PRECEDENCE['Mul']))
if not term == terms[-1]:
y = self.dom.createElement('mo')
y.appendChild(self.dom.createTextNode(self.mathml_tag(expr)))
mrow.appendChild(y)
return mrow
mrow = self.dom.createElement('mrow')
if _coeff_isneg(expr):
x = self.dom.createElement('mo')
x.appendChild(self.dom.createTextNode('-'))
mrow.appendChild(x)
mrow = multiply(-expr, mrow)
else:
mrow = multiply(expr, mrow)
return mrow
def _print_Add(self, expr, order=None):
mrow = self.dom.createElement('mrow')
args = self._as_ordered_terms(expr, order=order)
mrow.appendChild(self._print(args[0]))
for arg in args[1:]:
if _coeff_isneg(arg):
# use minus
x = self.dom.createElement('mo')
x.appendChild(self.dom.createTextNode('-'))
y = self._print(-arg)
# invert expression since this is now minused
else:
x = self.dom.createElement('mo')
x.appendChild(self.dom.createTextNode('+'))
y = self._print(arg)
mrow.appendChild(x)
mrow.appendChild(y)
return mrow
def _print_MatrixBase(self, m):
table = self.dom.createElement('mtable')
for i in range(m.rows):
x = self.dom.createElement('mtr')
for j in range(m.cols):
y = self.dom.createElement('mtd')
y.appendChild(self._print(m[i, j]))
x.appendChild(y)
table.appendChild(x)
if self._settings["mat_delim"] == '':
return table
brac = self.dom.createElement('mfenced')
if self._settings["mat_delim"] == "[":
brac.setAttribute('close', ']')
brac.setAttribute('open', '[')
brac.appendChild(table)
return brac
def _get_printed_Rational(self, e, folded=None):
if e.p < 0:
p = -e.p
else:
p = e.p
x = self.dom.createElement('mfrac')
if folded or self._settings["fold_short_frac"]:
x.setAttribute('bevelled', 'true')
x.appendChild(self._print(p))
x.appendChild(self._print(e.q))
if e.p < 0:
mrow = self.dom.createElement('mrow')
mo = self.dom.createElement('mo')
mo.appendChild(self.dom.createTextNode('-'))
mrow.appendChild(mo)
mrow.appendChild(x)
return mrow
else:
return x
def _print_Rational(self, e):
if e.q == 1:
# don't divide
return self._print(e.p)
return self._get_printed_Rational(e, self._settings["fold_short_frac"])
def _print_Limit(self, e):
mrow = self.dom.createElement('mrow')
munder = self.dom.createElement('munder')
mi = self.dom.createElement('mi')
mi.appendChild(self.dom.createTextNode('lim'))
x = self.dom.createElement('mrow')
x_1 = self._print(e.args[1])
arrow = self.dom.createElement('mo')
arrow.appendChild(self.dom.createTextNode(self.mathml_tag(e)))
x_2 = self._print(e.args[2])
x.appendChild(x_1)
x.appendChild(arrow)
x.appendChild(x_2)
munder.appendChild(mi)
munder.appendChild(x)
mrow.appendChild(munder)
mrow.appendChild(self._print(e.args[0]))
return mrow
def _print_ImaginaryUnit(self, e):
x = self.dom.createElement('mi')
x.appendChild(self.dom.createTextNode('ⅈ'))
return x
def _print_GoldenRatio(self, e):
x = self.dom.createElement('mi')
x.appendChild(self.dom.createTextNode('Φ'))
return x
def _print_Exp1(self, e):
x = self.dom.createElement('mi')
x.appendChild(self.dom.createTextNode('ⅇ'))
return x
def _print_Pi(self, e):
x = self.dom.createElement('mi')
x.appendChild(self.dom.createTextNode('π'))
return x
def _print_Infinity(self, e):
x = self.dom.createElement('mi')
x.appendChild(self.dom.createTextNode('∞'))
return x
def _print_NegativeInfinity(self, e):
mrow = self.dom.createElement('mrow')
y = self.dom.createElement('mo')
y.appendChild(self.dom.createTextNode('-'))
x = self._print_Infinity(e)
mrow.appendChild(y)
mrow.appendChild(x)
return mrow
def _print_HBar(self, e):
x = self.dom.createElement('mi')
x.appendChild(self.dom.createTextNode('ℏ'))
return x
def _print_EulerGamma(self, e):
x = self.dom.createElement('mi')
x.appendChild(self.dom.createTextNode('γ'))
return x
def _print_TribonacciConstant(self, e):
x = self.dom.createElement('mi')
x.appendChild(self.dom.createTextNode('TribonacciConstant'))
return x
def _print_Dagger(self, e):
msup = self.dom.createElement('msup')
msup.appendChild(self._print(e.args[0]))
msup.appendChild(self.dom.createTextNode('†'))
return msup
def _print_Contains(self, e):
mrow = self.dom.createElement('mrow')
mrow.appendChild(self._print(e.args[0]))
mo = self.dom.createElement('mo')
mo.appendChild(self.dom.createTextNode('∈'))
mrow.appendChild(mo)
mrow.appendChild(self._print(e.args[1]))
return mrow
def _print_HilbertSpace(self, e):
x = self.dom.createElement('mi')
x.appendChild(self.dom.createTextNode('ℋ'))
return x
def _print_ComplexSpace(self, e):
msup = self.dom.createElement('msup')
msup.appendChild(self.dom.createTextNode('𝒞'))
msup.appendChild(self._print(e.args[0]))
return msup
def _print_FockSpace(self, e):
x = self.dom.createElement('mi')
x.appendChild(self.dom.createTextNode('ℱ'))
return x
def _print_Integral(self, expr):
intsymbols = {1: "∫", 2: "∬", 3: "∭"}
mrow = self.dom.createElement('mrow')
if len(expr.limits) <= 3 and all(len(lim) == 1 for lim in expr.limits):
# Only up to three-integral signs exists
mo = self.dom.createElement('mo')
mo.appendChild(self.dom.createTextNode(intsymbols[len(expr.limits)]))
mrow.appendChild(mo)
else:
# Either more than three or limits provided
for lim in reversed(expr.limits):
mo = self.dom.createElement('mo')
mo.appendChild(self.dom.createTextNode(intsymbols[1]))
if len(lim) == 1:
mrow.appendChild(mo)
if len(lim) == 2:
msup = self.dom.createElement('msup')
msup.appendChild(mo)
msup.appendChild(self._print(lim[1]))
mrow.appendChild(msup)
if len(lim) == 3:
msubsup = self.dom.createElement('msubsup')
msubsup.appendChild(mo)
msubsup.appendChild(self._print(lim[1]))
msubsup.appendChild(self._print(lim[2]))
mrow.appendChild(msubsup)
# print function
mrow.appendChild(self.parenthesize(expr.function, PRECEDENCE["Mul"],
strict=True))
# print integration variables
for lim in reversed(expr.limits):
d = self.dom.createElement('mo')
d.appendChild(self.dom.createTextNode('ⅆ'))
mrow.appendChild(d)
mrow.appendChild(self._print(lim[0]))
return mrow
def _print_Sum(self, e):
limits = list(e.limits)
subsup = self.dom.createElement('munderover')
low_elem = self._print(limits[0][1])
up_elem = self._print(limits[0][2])
summand = self.dom.createElement('mo')
summand.appendChild(self.dom.createTextNode(self.mathml_tag(e)))
low = self.dom.createElement('mrow')
var = self._print(limits[0][0])
equal = self.dom.createElement('mo')
equal.appendChild(self.dom.createTextNode('='))
low.appendChild(var)
low.appendChild(equal)
low.appendChild(low_elem)
subsup.appendChild(summand)
subsup.appendChild(low)
subsup.appendChild(up_elem)
mrow = self.dom.createElement('mrow')
mrow.appendChild(subsup)
if len(str(e.function)) == 1:
mrow.appendChild(self._print(e.function))
else:
fence = self.dom.createElement('mfenced')
fence.appendChild(self._print(e.function))
mrow.appendChild(fence)
return mrow
def _print_Symbol(self, sym, style='plain'):
def join(items):
if len(items) > 1:
mrow = self.dom.createElement('mrow')
for i, item in enumerate(items):
if i > 0:
mo = self.dom.createElement('mo')
mo.appendChild(self.dom.createTextNode(" "))
mrow.appendChild(mo)
mi = self.dom.createElement('mi')
mi.appendChild(self.dom.createTextNode(item))
mrow.appendChild(mi)
return mrow
else:
mi = self.dom.createElement('mi')
mi.appendChild(self.dom.createTextNode(items[0]))
return mi
# translate name, supers and subs to unicode characters
def translate(s):
if s in greek_unicode:
return greek_unicode.get(s)
else:
return s
name, supers, subs = split_super_sub(sym.name)
name = translate(name)
supers = [translate(sup) for sup in supers]
subs = [translate(sub) for sub in subs]
mname = self.dom.createElement('mi')
mname.appendChild(self.dom.createTextNode(name))
if len(supers) == 0:
if len(subs) == 0:
x = mname
else:
x = self.dom.createElement('msub')
x.appendChild(mname)
x.appendChild(join(subs))
else:
if len(subs) == 0:
x = self.dom.createElement('msup')
x.appendChild(mname)
x.appendChild(join(supers))
else:
x = self.dom.createElement('msubsup')
x.appendChild(mname)
x.appendChild(join(subs))
x.appendChild(join(supers))
# Set bold font?
if style == 'bold':
x.setAttribute('mathvariant', 'bold')
return x
def _print_MatrixSymbol(self, sym):
return self._print_Symbol(sym,
style=self._settings['mat_symbol_style'])
_print_RandomSymbol = _print_Symbol
def _print_conjugate(self, expr):
enc = self.dom.createElement('menclose')
enc.setAttribute('notation', 'top')
enc.appendChild(self._print(expr.args[0]))
return enc
def _print_operator_after(self, op, expr):
row = self.dom.createElement('mrow')
row.appendChild(self.parenthesize(expr, PRECEDENCE["Func"]))
mo = self.dom.createElement('mo')
mo.appendChild(self.dom.createTextNode(op))
row.appendChild(mo)
return row
def _print_factorial(self, expr):
return self._print_operator_after('!', expr.args[0])
def _print_factorial2(self, expr):
return self._print_operator_after('!!', expr.args[0])
def _print_binomial(self, expr):
brac = self.dom.createElement('mfenced')
frac = self.dom.createElement('mfrac')
frac.setAttribute('linethickness', '0')
frac.appendChild(self._print(expr.args[0]))
frac.appendChild(self._print(expr.args[1]))
brac.appendChild(frac)
return brac
def _print_Pow(self, e):
# Here we use root instead of power if the exponent is the
# reciprocal of an integer
if (e.exp.is_Rational and abs(e.exp.p) == 1 and e.exp.q != 1 and
self._settings['root_notation']):
if e.exp.q == 2:
x = self.dom.createElement('msqrt')
x.appendChild(self._print(e.base))
if e.exp.q != 2:
x = self.dom.createElement('mroot')
x.appendChild(self._print(e.base))
x.appendChild(self._print(e.exp.q))
if e.exp.p == -1:
frac = self.dom.createElement('mfrac')
frac.appendChild(self._print(1))
frac.appendChild(x)
return frac
else:
return x
if e.exp.is_Rational and e.exp.q != 1:
if e.exp.is_negative:
top = self.dom.createElement('mfrac')
top.appendChild(self._print(1))
x = self.dom.createElement('msup')
x.appendChild(self.parenthesize(e.base, PRECEDENCE['Pow']))
x.appendChild(self._get_printed_Rational(-e.exp,
self._settings['fold_frac_powers']))
top.appendChild(x)
return top
else:
x = self.dom.createElement('msup')
x.appendChild(self.parenthesize(e.base, PRECEDENCE['Pow']))
x.appendChild(self._get_printed_Rational(e.exp,
self._settings['fold_frac_powers']))
return x
if e.exp.is_negative:
top = self.dom.createElement('mfrac')
top.appendChild(self._print(1))
if e.exp == -1:
top.appendChild(self._print(e.base))
else:
x = self.dom.createElement('msup')
x.appendChild(self.parenthesize(e.base, PRECEDENCE['Pow']))
x.appendChild(self._print(-e.exp))
top.appendChild(x)
return top
x = self.dom.createElement('msup')
x.appendChild(self.parenthesize(e.base, PRECEDENCE['Pow']))
x.appendChild(self._print(e.exp))
return x
def _print_Number(self, e):
x = self.dom.createElement(self.mathml_tag(e))
x.appendChild(self.dom.createTextNode(str(e)))
return x
def _print_AccumulationBounds(self, i):
brac = self.dom.createElement('mfenced')
brac.setAttribute('close', u'\u27e9')
brac.setAttribute('open', u'\u27e8')
brac.appendChild(self._print(i.min))
brac.appendChild(self._print(i.max))
return brac
def _print_Derivative(self, e):
if requires_partial(e.expr):
d = '∂'
else:
d = self.mathml_tag(e)
# Determine denominator
m = self.dom.createElement('mrow')
dim = 0 # Total diff dimension, for numerator
for sym, num in reversed(e.variable_count):
dim += num
if num >= 2:
x = self.dom.createElement('msup')
xx = self.dom.createElement('mo')
xx.appendChild(self.dom.createTextNode(d))
x.appendChild(xx)
x.appendChild(self._print(num))
else:
x = self.dom.createElement('mo')
x.appendChild(self.dom.createTextNode(d))
m.appendChild(x)
y = self._print(sym)
m.appendChild(y)
mnum = self.dom.createElement('mrow')
if dim >= 2:
x = self.dom.createElement('msup')
xx = self.dom.createElement('mo')
xx.appendChild(self.dom.createTextNode(d))
x.appendChild(xx)
x.appendChild(self._print(dim))
else:
x = self.dom.createElement('mo')
x.appendChild(self.dom.createTextNode(d))
mnum.appendChild(x)
mrow = self.dom.createElement('mrow')
frac = self.dom.createElement('mfrac')
frac.appendChild(mnum)
frac.appendChild(m)
mrow.appendChild(frac)
# Print function
mrow.appendChild(self._print(e.expr))
return mrow
def _print_Function(self, e):
mrow = self.dom.createElement('mrow')
x = self.dom.createElement('mi')
if self.mathml_tag(e) == 'log' and self._settings["ln_notation"]:
x.appendChild(self.dom.createTextNode('ln'))
else:
x.appendChild(self.dom.createTextNode(self.mathml_tag(e)))
y = self.dom.createElement('mfenced')
for arg in e.args:
y.appendChild(self._print(arg))
mrow.appendChild(x)
mrow.appendChild(y)
return mrow
def _print_Float(self, expr):
# Based off of that in StrPrinter
dps = prec_to_dps(expr._prec)
str_real = mlib.to_str(expr._mpf_, dps, strip_zeros=True)
# Must always have a mul symbol (as 2.5 10^{20} just looks odd)
# thus we use the number separator
separator = self._settings['mul_symbol_mathml_numbers']
mrow = self.dom.createElement('mrow')
if 'e' in str_real:
(mant, exp) = str_real.split('e')
if exp[0] == '+':
exp = exp[1:]
mn = self.dom.createElement('mn')
mn.appendChild(self.dom.createTextNode(mant))
mrow.appendChild(mn)
mo = self.dom.createElement('mo')
mo.appendChild(self.dom.createTextNode(separator))
mrow.appendChild(mo)
msup = self.dom.createElement('msup')
mn = self.dom.createElement('mn')
mn.appendChild(self.dom.createTextNode("10"))
msup.appendChild(mn)
mn = self.dom.createElement('mn')
mn.appendChild(self.dom.createTextNode(exp))
msup.appendChild(mn)
mrow.appendChild(msup)
return mrow
elif str_real == "+inf":
return self._print_Infinity(None)
elif str_real == "-inf":
return self._print_NegativeInfinity(None)
else:
mn = self.dom.createElement('mn')
mn.appendChild(self.dom.createTextNode(str_real))
return mn
def _print_polylog(self, expr):
mrow = self.dom.createElement('mrow')
m = self.dom.createElement('msub')
mi = self.dom.createElement('mi')
mi.appendChild(self.dom.createTextNode('Li'))
m.appendChild(mi)
m.appendChild(self._print(expr.args[0]))
mrow.appendChild(m)
brac = self.dom.createElement('mfenced')
brac.appendChild(self._print(expr.args[1]))
mrow.appendChild(brac)
return mrow
def _print_Basic(self, e):
mrow = self.dom.createElement('mrow')
mi = self.dom.createElement('mi')
mi.appendChild(self.dom.createTextNode(self.mathml_tag(e)))
mrow.appendChild(mi)
brac = self.dom.createElement('mfenced')
for arg in e.args:
brac.appendChild(self._print(arg))
mrow.appendChild(brac)
return mrow
def _print_Tuple(self, e):
mrow = self.dom.createElement('mrow')
x = self.dom.createElement('mfenced')
for arg in e.args:
x.appendChild(self._print(arg))
mrow.appendChild(x)
return mrow
def _print_Interval(self, i):
mrow = self.dom.createElement('mrow')
brac = self.dom.createElement('mfenced')
if i.start == i.end:
# Most often, this type of Interval is converted to a FiniteSet
brac.setAttribute('close', '}')
brac.setAttribute('open', '{')
brac.appendChild(self._print(i.start))
else:
if i.right_open:
brac.setAttribute('close', ')')
else:
brac.setAttribute('close', ']')
if i.left_open:
brac.setAttribute('open', '(')
else:
brac.setAttribute('open', '[')
brac.appendChild(self._print(i.start))
brac.appendChild(self._print(i.end))
mrow.appendChild(brac)
return mrow
def _print_Abs(self, expr, exp=None):
mrow = self.dom.createElement('mrow')
x = self.dom.createElement('mfenced')
x.setAttribute('close', '|')
x.setAttribute('open', '|')
x.appendChild(self._print(expr.args[0]))
mrow.appendChild(x)
return mrow
_print_Determinant = _print_Abs
def _print_re_im(self, c, expr):
mrow = self.dom.createElement('mrow')
mi = self.dom.createElement('mi')
mi.setAttribute('mathvariant', 'fraktur')
mi.appendChild(self.dom.createTextNode(c))
mrow.appendChild(mi)
brac = self.dom.createElement('mfenced')
brac.appendChild(self._print(expr))
mrow.appendChild(brac)
return mrow
def _print_re(self, expr, exp=None):
return self._print_re_im('R', expr.args[0])
def _print_im(self, expr, exp=None):
return self._print_re_im('I', expr.args[0])
def _print_AssocOp(self, e):
mrow = self.dom.createElement('mrow')
mi = self.dom.createElement('mi')
mi.appendChild(self.dom.createTextNode(self.mathml_tag(e)))
mrow.appendChild(mi)
for arg in e.args:
mrow.appendChild(self._print(arg))
return mrow
def _print_SetOp(self, expr, symbol, prec):
mrow = self.dom.createElement('mrow')
mrow.appendChild(self.parenthesize(expr.args[0], prec))
for arg in expr.args[1:]:
x = self.dom.createElement('mo')
x.appendChild(self.dom.createTextNode(symbol))
y = self.parenthesize(arg, prec)
mrow.appendChild(x)
mrow.appendChild(y)
return mrow
def _print_Union(self, expr):
prec = PRECEDENCE_TRADITIONAL['Union']
return self._print_SetOp(expr, '∪', prec)
def _print_Intersection(self, expr):
prec = PRECEDENCE_TRADITIONAL['Intersection']
return self._print_SetOp(expr, '∩', prec)
def _print_Complement(self, expr):
prec = PRECEDENCE_TRADITIONAL['Complement']
return self._print_SetOp(expr, '∖', prec)
def _print_SymmetricDifference(self, expr):
prec = PRECEDENCE_TRADITIONAL['SymmetricDifference']
return self._print_SetOp(expr, '∆', prec)
def _print_ProductSet(self, expr):
prec = PRECEDENCE_TRADITIONAL['ProductSet']
return self._print_SetOp(expr, '×', prec)
def _print_FiniteSet(self, s):
return self._print_set(s.args)
def _print_set(self, s):
items = sorted(s, key=default_sort_key)
brac = self.dom.createElement('mfenced')
brac.setAttribute('close', '}')
brac.setAttribute('open', '{')
for item in items:
brac.appendChild(self._print(item))
return brac
_print_frozenset = _print_set
def _print_LogOp(self, args, symbol):
mrow = self.dom.createElement('mrow')
if args[0].is_Boolean and not args[0].is_Not:
brac = self.dom.createElement('mfenced')
brac.appendChild(self._print(args[0]))
mrow.appendChild(brac)
else:
mrow.appendChild(self._print(args[0]))
for arg in args[1:]:
x = self.dom.createElement('mo')
x.appendChild(self.dom.createTextNode(symbol))
if arg.is_Boolean and not arg.is_Not:
y = self.dom.createElement('mfenced')
y.appendChild(self._print(arg))
else:
y = self._print(arg)
mrow.appendChild(x)
mrow.appendChild(y)
return mrow
def _print_BasisDependent(self, expr):
from sympy.vector import Vector
if expr == expr.zero:
# Not clear if this is ever called
return self._print(expr.zero)
if isinstance(expr, Vector):
items = expr.separate().items()
else:
items = [(0, expr)]
mrow = self.dom.createElement('mrow')
for system, vect in items:
inneritems = list(vect.components.items())
inneritems.sort(key = lambda x:x[0].__str__())
for i, (k, v) in enumerate(inneritems):
if v == 1:
if i: # No + for first item
mo = self.dom.createElement('mo')
mo.appendChild(self.dom.createTextNode('+'))
mrow.appendChild(mo)
mrow.appendChild(self._print(k))
elif v == -1:
mo = self.dom.createElement('mo')
mo.appendChild(self.dom.createTextNode('-'))
mrow.appendChild(mo)
mrow.appendChild(self._print(k))
else:
if i: # No + for first item
mo = self.dom.createElement('mo')
mo.appendChild(self.dom.createTextNode('+'))
mrow.appendChild(mo)
mbrac = self.dom.createElement('mfenced')
mbrac.appendChild(self._print(v))
mrow.appendChild(mbrac)
mo = self.dom.createElement('mo')
mo.appendChild(self.dom.createTextNode('⁢'))
mrow.appendChild(mo)
mrow.appendChild(self._print(k))
return mrow
def _print_And(self, expr):
args = sorted(expr.args, key=default_sort_key)
return self._print_LogOp(args, '∧')
def _print_Or(self, expr):
args = sorted(expr.args, key=default_sort_key)
return self._print_LogOp(args, '∨')
def _print_Xor(self, expr):
args = sorted(expr.args, key=default_sort_key)
return self._print_LogOp(args, '⊻')
def _print_Implies(self, expr):
return self._print_LogOp(expr.args, '⇒')
def _print_Equivalent(self, expr):
args = sorted(expr.args, key=default_sort_key)
return self._print_LogOp(args, '⇔')
def _print_Not(self, e):
mrow = self.dom.createElement('mrow')
mo = self.dom.createElement('mo')
mo.appendChild(self.dom.createTextNode('¬'))
mrow.appendChild(mo)
if (e.args[0].is_Boolean):
x = self.dom.createElement('mfenced')
x.appendChild(self._print(e.args[0]))
else:
x = self._print(e.args[0])
mrow.appendChild(x)
return mrow
def _print_bool(self, e):
mi = self.dom.createElement('mi')
mi.appendChild(self.dom.createTextNode(self.mathml_tag(e)))
return mi
_print_BooleanTrue = _print_bool
_print_BooleanFalse = _print_bool
def _print_NoneType(self, e):
mi = self.dom.createElement('mi')
mi.appendChild(self.dom.createTextNode(self.mathml_tag(e)))
return mi
def _print_Range(self, s):
dots = u"\u2026"
brac = self.dom.createElement('mfenced')
brac.setAttribute('close', '}')
brac.setAttribute('open', '{')
if s.start.is_infinite and s.stop.is_infinite:
if s.step.is_positive:
printset = dots, -1, 0, 1, dots
else:
printset = dots, 1, 0, -1, dots
elif s.start.is_infinite:
printset = dots, s[-1] - s.step, s[-1]
elif s.stop.is_infinite:
it = iter(s)
printset = next(it), next(it), dots
elif len(s) > 4:
it = iter(s)
printset = next(it), next(it), dots, s[-1]
else:
printset = tuple(s)
for el in printset:
if el == dots:
mi = self.dom.createElement('mi')
mi.appendChild(self.dom.createTextNode(dots))
brac.appendChild(mi)
else:
brac.appendChild(self._print(el))
return brac
def _hprint_variadic_function(self, expr):
args = sorted(expr.args, key=default_sort_key)
mrow = self.dom.createElement('mrow')
mo = self.dom.createElement('mo')
mo.appendChild(self.dom.createTextNode((str(expr.func)).lower()))
mrow.appendChild(mo)
brac = self.dom.createElement('mfenced')
for symbol in args:
brac.appendChild(self._print(symbol))
mrow.appendChild(brac)
return mrow
_print_Min = _print_Max = _hprint_variadic_function
def _print_exp(self, expr):
msup = self.dom.createElement('msup')
msup.appendChild(self._print_Exp1(None))
msup.appendChild(self._print(expr.args[0]))
return msup
def _print_Relational(self, e):
mrow = self.dom.createElement('mrow')
mrow.appendChild(self._print(e.lhs))
x = self.dom.createElement('mo')
x.appendChild(self.dom.createTextNode(self.mathml_tag(e)))
mrow.appendChild(x)
mrow.appendChild(self._print(e.rhs))
return mrow
def _print_int(self, p):
dom_element = self.dom.createElement(self.mathml_tag(p))
dom_element.appendChild(self.dom.createTextNode(str(p)))
return dom_element
def _print_BaseScalar(self, e):
msub = self.dom.createElement('msub')
index, system = e._id
mi = self.dom.createElement('mi')
mi.setAttribute('mathvariant', 'bold')
mi.appendChild(self.dom.createTextNode(system._variable_names[index]))
msub.appendChild(mi)
mi = self.dom.createElement('mi')
mi.setAttribute('mathvariant', 'bold')
mi.appendChild(self.dom.createTextNode(system._name))
msub.appendChild(mi)
return msub
def _print_BaseVector(self, e):
msub = self.dom.createElement('msub')
index, system = e._id
mover = self.dom.createElement('mover')
mi = self.dom.createElement('mi')
mi.setAttribute('mathvariant', 'bold')
mi.appendChild(self.dom.createTextNode(system._vector_names[index]))
mover.appendChild(mi)
mo = self.dom.createElement('mo')
mo.appendChild(self.dom.createTextNode('^'))
mover.appendChild(mo)
msub.appendChild(mover)
mi = self.dom.createElement('mi')
mi.setAttribute('mathvariant', 'bold')
mi.appendChild(self.dom.createTextNode(system._name))
msub.appendChild(mi)
return msub
def _print_VectorZero(self, e):
mover = self.dom.createElement('mover')
mi = self.dom.createElement('mi')
mi.setAttribute('mathvariant', 'bold')
mi.appendChild(self.dom.createTextNode("0"))
mover.appendChild(mi)
mo = self.dom.createElement('mo')
mo.appendChild(self.dom.createTextNode('^'))
mover.appendChild(mo)
return mover
def _print_Cross(self, expr):
mrow = self.dom.createElement('mrow')
vec1 = expr._expr1
vec2 = expr._expr2
mrow.appendChild(self.parenthesize(vec1, PRECEDENCE['Mul']))
mo = self.dom.createElement('mo')
mo.appendChild(self.dom.createTextNode('×'))
mrow.appendChild(mo)
mrow.appendChild(self.parenthesize(vec2, PRECEDENCE['Mul']))
return mrow
def _print_Curl(self, expr):
mrow = self.dom.createElement('mrow')
mo = self.dom.createElement('mo')
mo.appendChild(self.dom.createTextNode('∇'))
mrow.appendChild(mo)
mo = self.dom.createElement('mo')
mo.appendChild(self.dom.createTextNode('×'))
mrow.appendChild(mo)
mrow.appendChild(self.parenthesize(expr._expr, PRECEDENCE['Mul']))
return mrow
def _print_Divergence(self, expr):
mrow = self.dom.createElement('mrow')
mo = self.dom.createElement('mo')
mo.appendChild(self.dom.createTextNode('∇'))
mrow.appendChild(mo)
mo = self.dom.createElement('mo')
mo.appendChild(self.dom.createTextNode('·'))
mrow.appendChild(mo)
mrow.appendChild(self.parenthesize(expr._expr, PRECEDENCE['Mul']))
return mrow
def _print_Dot(self, expr):
mrow = self.dom.createElement('mrow')
vec1 = expr._expr1
vec2 = expr._expr2
mrow.appendChild(self.parenthesize(vec1, PRECEDENCE['Mul']))
mo = self.dom.createElement('mo')
mo.appendChild(self.dom.createTextNode('·'))
mrow.appendChild(mo)
mrow.appendChild(self.parenthesize(vec2, PRECEDENCE['Mul']))
return mrow
def _print_Gradient(self, expr):
mrow = self.dom.createElement('mrow')
mo = self.dom.createElement('mo')
mo.appendChild(self.dom.createTextNode('∇'))
mrow.appendChild(mo)
mrow.appendChild(self.parenthesize(expr._expr, PRECEDENCE['Mul']))
return mrow
def _print_Laplacian(self, expr):
mrow = self.dom.createElement('mrow')
mo = self.dom.createElement('mo')
mo.appendChild(self.dom.createTextNode('∆'))
mrow.appendChild(mo)
mrow.appendChild(self.parenthesize(expr._expr, PRECEDENCE['Mul']))
return mrow
def _print_Integers(self, e):
x = self.dom.createElement('mi')
x.setAttribute('mathvariant', 'normal')
x.appendChild(self.dom.createTextNode('ℤ'))
return x
def _print_Complexes(self, e):
x = self.dom.createElement('mi')
x.setAttribute('mathvariant', 'normal')
x.appendChild(self.dom.createTextNode('ℂ'))
return x
def _print_Reals(self, e):
x = self.dom.createElement('mi')
x.setAttribute('mathvariant', 'normal')
x.appendChild(self.dom.createTextNode('ℝ'))
return x
def _print_Naturals(self, e):
x = self.dom.createElement('mi')
x.setAttribute('mathvariant', 'normal')
x.appendChild(self.dom.createTextNode('ℕ'))
return x
def _print_Naturals0(self, e):
sub = self.dom.createElement('msub')
x = self.dom.createElement('mi')
x.setAttribute('mathvariant', 'normal')
x.appendChild(self.dom.createTextNode('ℕ'))
sub.appendChild(x)
sub.appendChild(self._print(S.Zero))
return sub
def _print_SingularityFunction(self, expr):
shift = expr.args[0] - expr.args[1]
power = expr.args[2]
sup = self.dom.createElement('msup')
brac = self.dom.createElement('mfenced')
brac.setAttribute('close', u'\u27e9')
brac.setAttribute('open', u'\u27e8')
brac.appendChild(self._print(shift))
sup.appendChild(brac)
sup.appendChild(self._print(power))
return sup
def _print_NaN(self, e):
x = self.dom.createElement('mi')
x.appendChild(self.dom.createTextNode('NaN'))
return x
def _print_number_function(self, e, name):
# Print name_arg[0] for one argument or name_arg[0](arg[1])
# for more than one argument
sub = self.dom.createElement('msub')
mi = self.dom.createElement('mi')
mi.appendChild(self.dom.createTextNode(name))
sub.appendChild(mi)
sub.appendChild(self._print(e.args[0]))
if len(e.args) == 1:
return sub
# TODO: copy-pasted from _print_Function: can we do better?
mrow = self.dom.createElement('mrow')
y = self.dom.createElement('mfenced')
for arg in e.args[1:]:
y.appendChild(self._print(arg))
mrow.appendChild(sub)
mrow.appendChild(y)
return mrow
def _print_bernoulli(self, e):
return self._print_number_function(e, 'B')
_print_bell = _print_bernoulli
def _print_catalan(self, e):
return self._print_number_function(e, 'C')
def _print_euler(self, e):
return self._print_number_function(e, 'E')
def _print_fibonacci(self, e):
return self._print_number_function(e, 'F')
def _print_lucas(self, e):
return self._print_number_function(e, 'L')
def _print_stieltjes(self, e):
return self._print_number_function(e, 'γ')
def _print_tribonacci(self, e):
return self._print_number_function(e, 'T')
def _print_ComplexInfinity(self, e):
x = self.dom.createElement('mover')
mo = self.dom.createElement('mo')
mo.appendChild(self.dom.createTextNode('∞'))
x.appendChild(mo)
mo = self.dom.createElement('mo')
mo.appendChild(self.dom.createTextNode('~'))
x.appendChild(mo)
return x
def _print_EmptySet(self, e):
x = self.dom.createElement('mo')
x.appendChild(self.dom.createTextNode('∅'))
return x
def _print_UniversalSet(self, e):
x = self.dom.createElement('mo')
x.appendChild(self.dom.createTextNode('𝕌'))
return x
def _print_Adjoint(self, expr):
from sympy.matrices import MatrixSymbol
mat = expr.arg
sup = self.dom.createElement('msup')
if not isinstance(mat, MatrixSymbol):
brac = self.dom.createElement('mfenced')
brac.appendChild(self._print(mat))
sup.appendChild(brac)
else:
sup.appendChild(self._print(mat))
mo = self.dom.createElement('mo')
mo.appendChild(self.dom.createTextNode('†'))
sup.appendChild(mo)
return sup
def _print_Transpose(self, expr):
from sympy.matrices import MatrixSymbol
mat = expr.arg
sup = self.dom.createElement('msup')
if not isinstance(mat, MatrixSymbol):
brac = self.dom.createElement('mfenced')
brac.appendChild(self._print(mat))
sup.appendChild(brac)
else:
sup.appendChild(self._print(mat))
mo = self.dom.createElement('mo')
mo.appendChild(self.dom.createTextNode('T'))
sup.appendChild(mo)
return sup
def _print_Inverse(self, expr):
from sympy.matrices import MatrixSymbol
mat = expr.arg
sup = self.dom.createElement('msup')
if not isinstance(mat, MatrixSymbol):
brac = self.dom.createElement('mfenced')
brac.appendChild(self._print(mat))
sup.appendChild(brac)
else:
sup.appendChild(self._print(mat))
sup.appendChild(self._print(-1))
return sup
def _print_MatMul(self, expr):
from sympy import MatMul
x = self.dom.createElement('mrow')
args = expr.args
if isinstance(args[0], Mul):
args = args[0].as_ordered_factors() + list(args[1:])
else:
args = list(args)
if isinstance(expr, MatMul) and _coeff_isneg(expr):
if args[0] == -1:
args = args[1:]
else:
args[0] = -args[0]
mo = self.dom.createElement('mo')
mo.appendChild(self.dom.createTextNode('-'))
x.appendChild(mo)
for arg in args[:-1]:
x.appendChild(self.parenthesize(arg, precedence_traditional(expr),
False))
mo = self.dom.createElement('mo')
mo.appendChild(self.dom.createTextNode('⁢'))
x.appendChild(mo)
x.appendChild(self.parenthesize(args[-1], precedence_traditional(expr),
False))
return x
def _print_MatPow(self, expr):
from sympy.matrices import MatrixSymbol
base, exp = expr.base, expr.exp
sup = self.dom.createElement('msup')
if not isinstance(base, MatrixSymbol):
brac = self.dom.createElement('mfenced')
brac.appendChild(self._print(base))
sup.appendChild(brac)
else:
sup.appendChild(self._print(base))
sup.appendChild(self._print(exp))
return sup
def _print_HadamardProduct(self, expr):
x = self.dom.createElement('mrow')
args = expr.args
for arg in args[:-1]:
x.appendChild(
self.parenthesize(arg, precedence_traditional(expr), False))
mo = self.dom.createElement('mo')
mo.appendChild(self.dom.createTextNode('∘'))
x.appendChild(mo)
x.appendChild(
self.parenthesize(args[-1], precedence_traditional(expr), False))
return x
def _print_ZeroMatrix(self, Z):
x = self.dom.createElement('mn')
x.appendChild(self.dom.createTextNode('𝟘'))
return x
def _print_OneMatrix(self, Z):
x = self.dom.createElement('mn')
x.appendChild(self.dom.createTextNode('𝟙'))
return x
def _print_Identity(self, I):
x = self.dom.createElement('mi')
x.appendChild(self.dom.createTextNode('𝕀'))
return x
def _print_floor(self, e):
mrow = self.dom.createElement('mrow')
x = self.dom.createElement('mfenced')
x.setAttribute('close', u'\u230B')
x.setAttribute('open', u'\u230A')
x.appendChild(self._print(e.args[0]))
mrow.appendChild(x)
return mrow
def _print_ceiling(self, e):
mrow = self.dom.createElement('mrow')
x = self.dom.createElement('mfenced')
x.setAttribute('close', u'\u2309')
x.setAttribute('open', u'\u2308')
x.appendChild(self._print(e.args[0]))
mrow.appendChild(x)
return mrow
def _print_Lambda(self, e):
x = self.dom.createElement('mfenced')
mrow = self.dom.createElement('mrow')
symbols = e.args[0]
if len(symbols) == 1:
symbols = self._print(symbols[0])
else:
symbols = self._print(symbols)
mrow.appendChild(symbols)
mo = self.dom.createElement('mo')
mo.appendChild(self.dom.createTextNode('↦'))
mrow.appendChild(mo)
mrow.appendChild(self._print(e.args[1]))
x.appendChild(mrow)
return x
def _print_tuple(self, e):
x = self.dom.createElement('mfenced')
for i in e:
x.appendChild(self._print(i))
return x
def _print_IndexedBase(self, e):
return self._print(e.label)
def _print_Indexed(self, e):
x = self.dom.createElement('msub')
x.appendChild(self._print(e.base))
if len(e.indices) == 1:
x.appendChild(self._print(e.indices[0]))
return x
x.appendChild(self._print(e.indices))
return x
def _print_MatrixElement(self, e):
x = self.dom.createElement('msub')
x.appendChild(self.parenthesize(e.parent, PRECEDENCE["Atom"], strict = True))
brac = self.dom.createElement('mfenced')
brac.setAttribute("close", "")
brac.setAttribute("open", "")
for i in e.indices:
brac.appendChild(self._print(i))
x.appendChild(brac)
return x
def _print_elliptic_f(self, e):
x = self.dom.createElement('mrow')
mi = self.dom.createElement('mi')
mi.appendChild(self.dom.createTextNode('𝖥'))
x.appendChild(mi)
y = self.dom.createElement('mfenced')
y.setAttribute("separators", "|")
for i in e.args:
y.appendChild(self._print(i))
x.appendChild(y)
return x
def _print_elliptic_e(self, e):
x = self.dom.createElement('mrow')
mi = self.dom.createElement('mi')
mi.appendChild(self.dom.createTextNode('𝖤'))
x.appendChild(mi)
y = self.dom.createElement('mfenced')
y.setAttribute("separators", "|")
for i in e.args:
y.appendChild(self._print(i))
x.appendChild(y)
return x
def _print_elliptic_pi(self, e):
x = self.dom.createElement('mrow')
mi = self.dom.createElement('mi')
mi.appendChild(self.dom.createTextNode('𝛱'))
x.appendChild(mi)
y = self.dom.createElement('mfenced')
if len(e.args) == 2:
y.setAttribute("separators", "|")
else:
y.setAttribute("separators", ";|")
for i in e.args:
y.appendChild(self._print(i))
x.appendChild(y)
return x
def _print_Ei(self, e):
x = self.dom.createElement('mrow')
mi = self.dom.createElement('mi')
mi.appendChild(self.dom.createTextNode('Ei'))
x.appendChild(mi)
x.appendChild(self._print(e.args))
return x
def _print_expint(self, e):
x = self.dom.createElement('mrow')
y = self.dom.createElement('msub')
mo = self.dom.createElement('mo')
mo.appendChild(self.dom.createTextNode('E'))
y.appendChild(mo)
y.appendChild(self._print(e.args[0]))
x.appendChild(y)
x.appendChild(self._print(e.args[1:]))
return x
def _print_jacobi(self, e):
x = self.dom.createElement('mrow')
y = self.dom.createElement('msubsup')
mo = self.dom.createElement('mo')
mo.appendChild(self.dom.createTextNode('P'))
y.appendChild(mo)
y.appendChild(self._print(e.args[0]))
y.appendChild(self._print(e.args[1:3]))
x.appendChild(y)
x.appendChild(self._print(e.args[3:]))
return x
def _print_gegenbauer(self, e):
x = self.dom.createElement('mrow')
y = self.dom.createElement('msubsup')
mo = self.dom.createElement('mo')
mo.appendChild(self.dom.createTextNode('C'))
y.appendChild(mo)
y.appendChild(self._print(e.args[0]))
y.appendChild(self._print(e.args[1:2]))
x.appendChild(y)
x.appendChild(self._print(e.args[2:]))
return x
def _print_chebyshevt(self, e):
x = self.dom.createElement('mrow')
y = self.dom.createElement('msub')
mo = self.dom.createElement('mo')
mo.appendChild(self.dom.createTextNode('T'))
y.appendChild(mo)
y.appendChild(self._print(e.args[0]))
x.appendChild(y)
x.appendChild(self._print(e.args[1:]))
return x
def _print_chebyshevu(self, e):
x = self.dom.createElement('mrow')
y = self.dom.createElement('msub')
mo = self.dom.createElement('mo')
mo.appendChild(self.dom.createTextNode('U'))
y.appendChild(mo)
y.appendChild(self._print(e.args[0]))
x.appendChild(y)
x.appendChild(self._print(e.args[1:]))
return x
def _print_legendre(self, e):
x = self.dom.createElement('mrow')
y = self.dom.createElement('msub')
mo = self.dom.createElement('mo')
mo.appendChild(self.dom.createTextNode('P'))
y.appendChild(mo)
y.appendChild(self._print(e.args[0]))
x.appendChild(y)
x.appendChild(self._print(e.args[1:]))
return x
def _print_assoc_legendre(self, e):
x = self.dom.createElement('mrow')
y = self.dom.createElement('msubsup')
mo = self.dom.createElement('mo')
mo.appendChild(self.dom.createTextNode('P'))
y.appendChild(mo)
y.appendChild(self._print(e.args[0]))
y.appendChild(self._print(e.args[1:2]))
x.appendChild(y)
x.appendChild(self._print(e.args[2:]))
return x
def _print_laguerre(self, e):
x = self.dom.createElement('mrow')
y = self.dom.createElement('msub')
mo = self.dom.createElement('mo')
mo.appendChild(self.dom.createTextNode('L'))
y.appendChild(mo)
y.appendChild(self._print(e.args[0]))
x.appendChild(y)
x.appendChild(self._print(e.args[1:]))
return x
def _print_assoc_laguerre(self, e):
x = self.dom.createElement('mrow')
y = self.dom.createElement('msubsup')
mo = self.dom.createElement('mo')
mo.appendChild(self.dom.createTextNode('L'))
y.appendChild(mo)
y.appendChild(self._print(e.args[0]))
y.appendChild(self._print(e.args[1:2]))
x.appendChild(y)
x.appendChild(self._print(e.args[2:]))
return x
def _print_hermite(self, e):
x = self.dom.createElement('mrow')
y = self.dom.createElement('msub')
mo = self.dom.createElement('mo')
mo.appendChild(self.dom.createTextNode('H'))
y.appendChild(mo)
y.appendChild(self._print(e.args[0]))
x.appendChild(y)
x.appendChild(self._print(e.args[1:]))
return x
def mathml(expr, printer='content', **settings):
"""Returns the MathML representation of expr. If printer is presentation
then prints Presentation MathML else prints content MathML.
"""
if printer == 'presentation':
return MathMLPresentationPrinter(settings).doprint(expr)
else:
return MathMLContentPrinter(settings).doprint(expr)
def print_mathml(expr, printer='content', **settings):
"""
Prints a pretty representation of the MathML code for expr. If printer is
presentation then prints Presentation MathML else prints content MathML.
Examples
========
>>> ##
>>> from sympy.printing.mathml import print_mathml
>>> from sympy.abc import x
>>> print_mathml(x+1) #doctest: +NORMALIZE_WHITESPACE
<apply>
<plus/>
<ci>x</ci>
<cn>1</cn>
</apply>
>>> print_mathml(x+1, printer='presentation')
<mrow>
<mi>x</mi>
<mo>+</mo>
<mn>1</mn>
</mrow>
"""
if printer == 'presentation':
s = MathMLPresentationPrinter(settings)
else:
s = MathMLContentPrinter(settings)
xml = s._print(sympify(expr))
s.apply_patch()
pretty_xml = xml.toprettyxml()
s.restore_patch()
print(pretty_xml)
# For backward compatibility
MathMLPrinter = MathMLContentPrinter
|
448d7fe5a998b18e603721bfa074329e14481d86d417039755d1e01e046d8f99 | """
R code printer
The RCodePrinter converts single sympy expressions into single R expressions,
using the functions defined in math.h where possible.
"""
from __future__ import print_function, division
from typing import Any, Dict
from sympy.codegen.ast import Assignment
from sympy.printing.codeprinter import CodePrinter
from sympy.printing.precedence import precedence, PRECEDENCE
from sympy.sets.fancysets import Range
# dictionary mapping sympy function to (argument_conditions, C_function).
# Used in RCodePrinter._print_Function(self)
known_functions = {
#"Abs": [(lambda x: not x.is_integer, "fabs")],
"Abs": "abs",
"sin": "sin",
"cos": "cos",
"tan": "tan",
"asin": "asin",
"acos": "acos",
"atan": "atan",
"atan2": "atan2",
"exp": "exp",
"log": "log",
"erf": "erf",
"sinh": "sinh",
"cosh": "cosh",
"tanh": "tanh",
"asinh": "asinh",
"acosh": "acosh",
"atanh": "atanh",
"floor": "floor",
"ceiling": "ceiling",
"sign": "sign",
"Max": "max",
"Min": "min",
"factorial": "factorial",
"gamma": "gamma",
"digamma": "digamma",
"trigamma": "trigamma",
"beta": "beta",
}
# These are the core reserved words in the R language. Taken from:
# https://cran.r-project.org/doc/manuals/r-release/R-lang.html#Reserved-words
reserved_words = ['if',
'else',
'repeat',
'while',
'function',
'for',
'in',
'next',
'break',
'TRUE',
'FALSE',
'NULL',
'Inf',
'NaN',
'NA',
'NA_integer_',
'NA_real_',
'NA_complex_',
'NA_character_',
'volatile']
class RCodePrinter(CodePrinter):
"""A printer to convert python expressions to strings of R code"""
printmethod = "_rcode"
language = "R"
_default_settings = {
'order': None,
'full_prec': 'auto',
'precision': 15,
'user_functions': {},
'human': True,
'contract': True,
'dereference': set(),
'error_on_reserved': False,
'reserved_word_suffix': '_',
} # type: Dict[str, Any]
_operators = {
'and': '&',
'or': '|',
'not': '!',
}
_relationals = {
} # type: Dict[str, str]
def __init__(self, settings={}):
CodePrinter.__init__(self, settings)
self.known_functions = dict(known_functions)
userfuncs = settings.get('user_functions', {})
self.known_functions.update(userfuncs)
self._dereference = set(settings.get('dereference', []))
self.reserved_words = set(reserved_words)
def _rate_index_position(self, p):
return p*5
def _get_statement(self, codestring):
return "%s;" % codestring
def _get_comment(self, text):
return "// {0}".format(text)
def _declare_number_const(self, name, value):
return "{0} = {1};".format(name, value)
def _format_code(self, lines):
return self.indent_code(lines)
def _traverse_matrix_indices(self, mat):
rows, cols = mat.shape
return ((i, j) for i in range(rows) for j in range(cols))
def _get_loop_opening_ending(self, indices):
"""Returns a tuple (open_lines, close_lines) containing lists of codelines
"""
open_lines = []
close_lines = []
loopstart = "for (%(var)s in %(start)s:%(end)s){"
for i in indices:
# R arrays start at 1 and end at dimension
open_lines.append(loopstart % {
'var': self._print(i.label),
'start': self._print(i.lower+1),
'end': self._print(i.upper + 1)})
close_lines.append("}")
return open_lines, close_lines
def _print_Pow(self, expr):
if "Pow" in self.known_functions:
return self._print_Function(expr)
PREC = precedence(expr)
if expr.exp == -1:
return '1.0/%s' % (self.parenthesize(expr.base, PREC))
elif expr.exp == 0.5:
return 'sqrt(%s)' % self._print(expr.base)
else:
return '%s^%s' % (self.parenthesize(expr.base, PREC),
self.parenthesize(expr.exp, PREC))
def _print_Rational(self, expr):
p, q = int(expr.p), int(expr.q)
return '%d.0/%d.0' % (p, q)
def _print_Indexed(self, expr):
inds = [ self._print(i) for i in expr.indices ]
return "%s[%s]" % (self._print(expr.base.label), ", ".join(inds))
def _print_Idx(self, expr):
return self._print(expr.label)
def _print_Exp1(self, expr):
return "exp(1)"
def _print_Pi(self, expr):
return 'pi'
def _print_Infinity(self, expr):
return 'Inf'
def _print_NegativeInfinity(self, expr):
return '-Inf'
def _print_Assignment(self, expr):
from sympy.matrices.expressions.matexpr import MatrixSymbol
from sympy.tensor.indexed import IndexedBase
lhs = expr.lhs
rhs = expr.rhs
# We special case assignments that take multiple lines
#if isinstance(expr.rhs, Piecewise):
# from sympy.functions.elementary.piecewise import Piecewise
# # Here we modify Piecewise so each expression is now
# # an Assignment, and then continue on the print.
# expressions = []
# conditions = []
# for (e, c) in rhs.args:
# expressions.append(Assignment(lhs, e))
# conditions.append(c)
# temp = Piecewise(*zip(expressions, conditions))
# return self._print(temp)
#elif isinstance(lhs, MatrixSymbol):
if isinstance(lhs, MatrixSymbol):
# Here we form an Assignment for each element in the array,
# printing each one.
lines = []
for (i, j) in self._traverse_matrix_indices(lhs):
temp = Assignment(lhs[i, j], rhs[i, j])
code0 = self._print(temp)
lines.append(code0)
return "\n".join(lines)
elif self._settings["contract"] and (lhs.has(IndexedBase) or
rhs.has(IndexedBase)):
# Here we check if there is looping to be done, and if so
# print the required loops.
return self._doprint_loops(rhs, lhs)
else:
lhs_code = self._print(lhs)
rhs_code = self._print(rhs)
return self._get_statement("%s = %s" % (lhs_code, rhs_code))
def _print_Piecewise(self, expr):
# This method is called only for inline if constructs
# Top level piecewise is handled in doprint()
if expr.args[-1].cond == True:
last_line = "%s" % self._print(expr.args[-1].expr)
else:
last_line = "ifelse(%s,%s,NA)" % (self._print(expr.args[-1].cond), self._print(expr.args[-1].expr))
code=last_line
for e, c in reversed(expr.args[:-1]):
code= "ifelse(%s,%s," % (self._print(c), self._print(e))+code+")"
return(code)
def _print_ITE(self, expr):
from sympy.functions import Piecewise
_piecewise = Piecewise((expr.args[1], expr.args[0]), (expr.args[2], True))
return self._print(_piecewise)
def _print_MatrixElement(self, expr):
return "{0}[{1}]".format(self.parenthesize(expr.parent, PRECEDENCE["Atom"],
strict=True), expr.j + expr.i*expr.parent.shape[1])
def _print_Symbol(self, expr):
name = super(RCodePrinter, self)._print_Symbol(expr)
if expr in self._dereference:
return '(*{0})'.format(name)
else:
return name
def _print_Relational(self, expr):
lhs_code = self._print(expr.lhs)
rhs_code = self._print(expr.rhs)
op = expr.rel_op
return "{0} {1} {2}".format(lhs_code, op, rhs_code)
def _print_sinc(self, expr):
from sympy.functions.elementary.trigonometric import sin
from sympy.core.relational import Ne
from sympy.functions import Piecewise
_piecewise = Piecewise(
(sin(expr.args[0]) / expr.args[0], Ne(expr.args[0], 0)), (1, True))
return self._print(_piecewise)
def _print_AugmentedAssignment(self, expr):
lhs_code = self._print(expr.lhs)
op = expr.op
rhs_code = self._print(expr.rhs)
return "{0} {1} {2};".format(lhs_code, op, rhs_code)
def _print_For(self, expr):
target = self._print(expr.target)
if isinstance(expr.iterable, Range):
start, stop, step = expr.iterable.args
else:
raise NotImplementedError("Only iterable currently supported is Range")
body = self._print(expr.body)
return ('for ({target} = {start}; {target} < {stop}; {target} += '
'{step}) {{\n{body}\n}}').format(target=target, start=start,
stop=stop, step=step, body=body)
def indent_code(self, code):
"""Accepts a string of code or a list of code lines"""
if isinstance(code, str):
code_lines = self.indent_code(code.splitlines(True))
return ''.join(code_lines)
tab = " "
inc_token = ('{', '(', '{\n', '(\n')
dec_token = ('}', ')')
code = [ line.lstrip(' \t') for line in code ]
increase = [ int(any(map(line.endswith, inc_token))) for line in code ]
decrease = [ int(any(map(line.startswith, dec_token)))
for line in code ]
pretty = []
level = 0
for n, line in enumerate(code):
if line == '' or line == '\n':
pretty.append(line)
continue
level -= decrease[n]
pretty.append("%s%s" % (tab*level, line))
level += increase[n]
return pretty
def rcode(expr, assign_to=None, **settings):
"""Converts an expr to a string of r code
Parameters
==========
expr : Expr
A sympy expression to be converted.
assign_to : optional
When given, the argument is used as the name of the variable to which
the expression is assigned. Can be a string, ``Symbol``,
``MatrixSymbol``, or ``Indexed`` type. This is helpful in case of
line-wrapping, or for expressions that generate multi-line statements.
precision : integer, optional
The precision for numbers such as pi [default=15].
user_functions : dict, optional
A dictionary where the keys are string representations of either
``FunctionClass`` or ``UndefinedFunction`` instances and the values
are their desired R string representations. Alternatively, the
dictionary value can be a list of tuples i.e. [(argument_test,
rfunction_string)] or [(argument_test, rfunction_formater)]. See below
for examples.
human : bool, optional
If True, the result is a single string that may contain some constant
declarations for the number symbols. If False, the same information is
returned in a tuple of (symbols_to_declare, not_supported_functions,
code_text). [default=True].
contract: bool, optional
If True, ``Indexed`` instances are assumed to obey tensor contraction
rules and the corresponding nested loops over indices are generated.
Setting contract=False will not generate loops, instead the user is
responsible to provide values for the indices in the code.
[default=True].
Examples
========
>>> from sympy import rcode, symbols, Rational, sin, ceiling, Abs, Function
>>> x, tau = symbols("x, tau")
>>> rcode((2*tau)**Rational(7, 2))
'8*sqrt(2)*tau^(7.0/2.0)'
>>> rcode(sin(x), assign_to="s")
's = sin(x);'
Simple custom printing can be defined for certain types by passing a
dictionary of {"type" : "function"} to the ``user_functions`` kwarg.
Alternatively, the dictionary value can be a list of tuples i.e.
[(argument_test, cfunction_string)].
>>> custom_functions = {
... "ceiling": "CEIL",
... "Abs": [(lambda x: not x.is_integer, "fabs"),
... (lambda x: x.is_integer, "ABS")],
... "func": "f"
... }
>>> func = Function('func')
>>> rcode(func(Abs(x) + ceiling(x)), user_functions=custom_functions)
'f(fabs(x) + CEIL(x))'
or if the R-function takes a subset of the original arguments:
>>> rcode(2**x + 3**x, user_functions={'Pow': [
... (lambda b, e: b == 2, lambda b, e: 'exp2(%s)' % e),
... (lambda b, e: b != 2, 'pow')]})
'exp2(x) + pow(3, x)'
``Piecewise`` expressions are converted into conditionals. If an
``assign_to`` variable is provided an if statement is created, otherwise
the ternary operator is used. Note that if the ``Piecewise`` lacks a
default term, represented by ``(expr, True)`` then an error will be thrown.
This is to prevent generating an expression that may not evaluate to
anything.
>>> from sympy import Piecewise
>>> expr = Piecewise((x + 1, x > 0), (x, True))
>>> print(rcode(expr, assign_to=tau))
tau = ifelse(x > 0,x + 1,x);
Support for loops is provided through ``Indexed`` types. With
``contract=True`` these expressions will be turned into loops, whereas
``contract=False`` will just print the assignment expression that should be
looped over:
>>> from sympy import Eq, IndexedBase, Idx
>>> len_y = 5
>>> y = IndexedBase('y', shape=(len_y,))
>>> t = IndexedBase('t', shape=(len_y,))
>>> Dy = IndexedBase('Dy', shape=(len_y-1,))
>>> i = Idx('i', len_y-1)
>>> e=Eq(Dy[i], (y[i+1]-y[i])/(t[i+1]-t[i]))
>>> rcode(e.rhs, assign_to=e.lhs, contract=False)
'Dy[i] = (y[i + 1] - y[i])/(t[i + 1] - t[i]);'
Matrices are also supported, but a ``MatrixSymbol`` of the same dimensions
must be provided to ``assign_to``. Note that any expression that can be
generated normally can also exist inside a Matrix:
>>> from sympy import Matrix, MatrixSymbol
>>> mat = Matrix([x**2, Piecewise((x + 1, x > 0), (x, True)), sin(x)])
>>> A = MatrixSymbol('A', 3, 1)
>>> print(rcode(mat, A))
A[0] = x^2;
A[1] = ifelse(x > 0,x + 1,x);
A[2] = sin(x);
"""
return RCodePrinter(settings).doprint(expr, assign_to)
def print_rcode(expr, **settings):
"""Prints R representation of the given expression."""
print(rcode(expr, **settings))
|
cb8322e28e61e9f5088882669c7898c49d2593f2928d72aef25b634e76e30533 | """
Octave (and Matlab) code printer
The `OctaveCodePrinter` converts SymPy expressions into Octave expressions.
It uses a subset of the Octave language for Matlab compatibility.
A complete code generator, which uses `octave_code` extensively, can be found
in `sympy.utilities.codegen`. The `codegen` module can be used to generate
complete source code files.
"""
from __future__ import print_function, division
from typing import Any, Dict
from sympy.codegen.ast import Assignment
from sympy.core import Mul, Pow, S, Rational
from sympy.core.mul import _keep_coeff
from sympy.printing.codeprinter import CodePrinter
from sympy.printing.precedence import precedence, PRECEDENCE
from re import search
# List of known functions. First, those that have the same name in
# SymPy and Octave. This is almost certainly incomplete!
known_fcns_src1 = ["sin", "cos", "tan", "cot", "sec", "csc",
"asin", "acos", "acot", "atan", "atan2", "asec", "acsc",
"sinh", "cosh", "tanh", "coth", "csch", "sech",
"asinh", "acosh", "atanh", "acoth", "asech", "acsch",
"erfc", "erfi", "erf", "erfinv", "erfcinv",
"besseli", "besselj", "besselk", "bessely",
"bernoulli", "beta", "euler", "exp", "factorial", "floor",
"fresnelc", "fresnels", "gamma", "harmonic", "log",
"polylog", "sign", "zeta", "legendre"]
# These functions have different names ("Sympy": "Octave"), more
# generally a mapping to (argument_conditions, octave_function).
known_fcns_src2 = {
"Abs": "abs",
"arg": "angle", # arg/angle ok in Octave but only angle in Matlab
"binomial": "bincoeff",
"ceiling": "ceil",
"chebyshevu": "chebyshevU",
"chebyshevt": "chebyshevT",
"Chi": "coshint",
"Ci": "cosint",
"conjugate": "conj",
"DiracDelta": "dirac",
"Heaviside": "heaviside",
"im": "imag",
"laguerre": "laguerreL",
"LambertW": "lambertw",
"li": "logint",
"loggamma": "gammaln",
"Max": "max",
"Min": "min",
"Mod": "mod",
"polygamma": "psi",
"re": "real",
"RisingFactorial": "pochhammer",
"Shi": "sinhint",
"Si": "sinint",
}
class OctaveCodePrinter(CodePrinter):
"""
A printer to convert expressions to strings of Octave/Matlab code.
"""
printmethod = "_octave"
language = "Octave"
_operators = {
'and': '&',
'or': '|',
'not': '~',
}
_default_settings = {
'order': None,
'full_prec': 'auto',
'precision': 17,
'user_functions': {},
'human': True,
'allow_unknown_functions': False,
'contract': True,
'inline': True,
} # type: Dict[str, Any]
# Note: contract is for expressing tensors as loops (if True), or just
# assignment (if False). FIXME: this should be looked a more carefully
# for Octave.
def __init__(self, settings={}):
super(OctaveCodePrinter, self).__init__(settings)
self.known_functions = dict(zip(known_fcns_src1, known_fcns_src1))
self.known_functions.update(dict(known_fcns_src2))
userfuncs = settings.get('user_functions', {})
self.known_functions.update(userfuncs)
def _rate_index_position(self, p):
return p*5
def _get_statement(self, codestring):
return "%s;" % codestring
def _get_comment(self, text):
return "% {0}".format(text)
def _declare_number_const(self, name, value):
return "{0} = {1};".format(name, value)
def _format_code(self, lines):
return self.indent_code(lines)
def _traverse_matrix_indices(self, mat):
# Octave uses Fortran order (column-major)
rows, cols = mat.shape
return ((i, j) for j in range(cols) for i in range(rows))
def _get_loop_opening_ending(self, indices):
open_lines = []
close_lines = []
for i in indices:
# Octave arrays start at 1 and end at dimension
var, start, stop = map(self._print,
[i.label, i.lower + 1, i.upper + 1])
open_lines.append("for %s = %s:%s" % (var, start, stop))
close_lines.append("end")
return open_lines, close_lines
def _print_Mul(self, expr):
# print complex numbers nicely in Octave
if (expr.is_number and expr.is_imaginary and
(S.ImaginaryUnit*expr).is_Integer):
return "%si" % self._print(-S.ImaginaryUnit*expr)
# cribbed from str.py
prec = precedence(expr)
c, e = expr.as_coeff_Mul()
if c < 0:
expr = _keep_coeff(-c, e)
sign = "-"
else:
sign = ""
a = [] # items in the numerator
b = [] # items that are in the denominator (if any)
pow_paren = [] # Will collect all pow with more than one base element and exp = -1
if self.order not in ('old', 'none'):
args = expr.as_ordered_factors()
else:
# use make_args in case expr was something like -x -> x
args = Mul.make_args(expr)
# Gather args for numerator/denominator
for item in args:
if (item.is_commutative and item.is_Pow and item.exp.is_Rational
and item.exp.is_negative):
if item.exp != -1:
b.append(Pow(item.base, -item.exp, evaluate=False))
else:
if len(item.args[0].args) != 1 and isinstance(item.base, Mul): # To avoid situations like #14160
pow_paren.append(item)
b.append(Pow(item.base, -item.exp))
elif item.is_Rational and item is not S.Infinity:
if item.p != 1:
a.append(Rational(item.p))
if item.q != 1:
b.append(Rational(item.q))
else:
a.append(item)
a = a or [S.One]
a_str = [self.parenthesize(x, prec) for x in a]
b_str = [self.parenthesize(x, prec) for x in b]
# To parenthesize Pow with exp = -1 and having more than one Symbol
for item in pow_paren:
if item.base in b:
b_str[b.index(item.base)] = "(%s)" % b_str[b.index(item.base)]
# from here it differs from str.py to deal with "*" and ".*"
def multjoin(a, a_str):
# here we probably are assuming the constants will come first
r = a_str[0]
for i in range(1, len(a)):
mulsym = '*' if a[i-1].is_number else '.*'
r = r + mulsym + a_str[i]
return r
if not b:
return sign + multjoin(a, a_str)
elif len(b) == 1:
divsym = '/' if b[0].is_number else './'
return sign + multjoin(a, a_str) + divsym + b_str[0]
else:
divsym = '/' if all([bi.is_number for bi in b]) else './'
return (sign + multjoin(a, a_str) +
divsym + "(%s)" % multjoin(b, b_str))
def _print_Relational(self, expr):
lhs_code = self._print(expr.lhs)
rhs_code = self._print(expr.rhs)
op = expr.rel_op
return "{0} {1} {2}".format(lhs_code, op, rhs_code)
def _print_Pow(self, expr):
powsymbol = '^' if all([x.is_number for x in expr.args]) else '.^'
PREC = precedence(expr)
if expr.exp == S.Half:
return "sqrt(%s)" % self._print(expr.base)
if expr.is_commutative:
if expr.exp == -S.Half:
sym = '/' if expr.base.is_number else './'
return "1" + sym + "sqrt(%s)" % self._print(expr.base)
if expr.exp == -S.One:
sym = '/' if expr.base.is_number else './'
return "1" + sym + "%s" % self.parenthesize(expr.base, PREC)
return '%s%s%s' % (self.parenthesize(expr.base, PREC), powsymbol,
self.parenthesize(expr.exp, PREC))
def _print_MatPow(self, expr):
PREC = precedence(expr)
return '%s^%s' % (self.parenthesize(expr.base, PREC),
self.parenthesize(expr.exp, PREC))
def _print_MatrixSolve(self, expr):
PREC = precedence(expr)
return "%s \\ %s" % (self.parenthesize(expr.matrix, PREC),
self.parenthesize(expr.vector, PREC))
def _print_Pi(self, expr):
return 'pi'
def _print_ImaginaryUnit(self, expr):
return "1i"
def _print_Exp1(self, expr):
return "exp(1)"
def _print_GoldenRatio(self, expr):
# FIXME: how to do better, e.g., for octave_code(2*GoldenRatio)?
#return self._print((1+sqrt(S(5)))/2)
return "(1+sqrt(5))/2"
def _print_Assignment(self, expr):
from sympy.functions.elementary.piecewise import Piecewise
from sympy.tensor.indexed import IndexedBase
# Copied from codeprinter, but remove special MatrixSymbol treatment
lhs = expr.lhs
rhs = expr.rhs
# We special case assignments that take multiple lines
if not self._settings["inline"] and isinstance(expr.rhs, Piecewise):
# Here we modify Piecewise so each expression is now
# an Assignment, and then continue on the print.
expressions = []
conditions = []
for (e, c) in rhs.args:
expressions.append(Assignment(lhs, e))
conditions.append(c)
temp = Piecewise(*zip(expressions, conditions))
return self._print(temp)
if self._settings["contract"] and (lhs.has(IndexedBase) or
rhs.has(IndexedBase)):
# Here we check if there is looping to be done, and if so
# print the required loops.
return self._doprint_loops(rhs, lhs)
else:
lhs_code = self._print(lhs)
rhs_code = self._print(rhs)
return self._get_statement("%s = %s" % (lhs_code, rhs_code))
def _print_Infinity(self, expr):
return 'inf'
def _print_NegativeInfinity(self, expr):
return '-inf'
def _print_NaN(self, expr):
return 'NaN'
def _print_list(self, expr):
return '{' + ', '.join(self._print(a) for a in expr) + '}'
_print_tuple = _print_list
_print_Tuple = _print_list
def _print_BooleanTrue(self, expr):
return "true"
def _print_BooleanFalse(self, expr):
return "false"
def _print_bool(self, expr):
return str(expr).lower()
# Could generate quadrature code for definite Integrals?
#_print_Integral = _print_not_supported
def _print_MatrixBase(self, A):
# Handle zero dimensions:
if (A.rows, A.cols) == (0, 0):
return '[]'
elif A.rows == 0 or A.cols == 0:
return 'zeros(%s, %s)' % (A.rows, A.cols)
elif (A.rows, A.cols) == (1, 1):
# Octave does not distinguish between scalars and 1x1 matrices
return self._print(A[0, 0])
return "[%s]" % "; ".join(" ".join([self._print(a) for a in A[r, :]])
for r in range(A.rows))
def _print_SparseMatrix(self, A):
from sympy.matrices import Matrix
L = A.col_list();
# make row vectors of the indices and entries
I = Matrix([[k[0] + 1 for k in L]])
J = Matrix([[k[1] + 1 for k in L]])
AIJ = Matrix([[k[2] for k in L]])
return "sparse(%s, %s, %s, %s, %s)" % (self._print(I), self._print(J),
self._print(AIJ), A.rows, A.cols)
# FIXME: Str/CodePrinter could define each of these to call the _print
# method from higher up the class hierarchy (see _print_NumberSymbol).
# Then subclasses like us would not need to repeat all this.
_print_Matrix = \
_print_DenseMatrix = \
_print_MutableDenseMatrix = \
_print_ImmutableMatrix = \
_print_ImmutableDenseMatrix = \
_print_MatrixBase
_print_MutableSparseMatrix = \
_print_ImmutableSparseMatrix = \
_print_SparseMatrix
def _print_MatrixElement(self, expr):
return self.parenthesize(expr.parent, PRECEDENCE["Atom"], strict=True) \
+ '(%s, %s)' % (expr.i + 1, expr.j + 1)
def _print_MatrixSlice(self, expr):
def strslice(x, lim):
l = x[0] + 1
h = x[1]
step = x[2]
lstr = self._print(l)
hstr = 'end' if h == lim else self._print(h)
if step == 1:
if l == 1 and h == lim:
return ':'
if l == h:
return lstr
else:
return lstr + ':' + hstr
else:
return ':'.join((lstr, self._print(step), hstr))
return (self._print(expr.parent) + '(' +
strslice(expr.rowslice, expr.parent.shape[0]) + ', ' +
strslice(expr.colslice, expr.parent.shape[1]) + ')')
def _print_Indexed(self, expr):
inds = [ self._print(i) for i in expr.indices ]
return "%s(%s)" % (self._print(expr.base.label), ", ".join(inds))
def _print_Idx(self, expr):
return self._print(expr.label)
def _print_KroneckerDelta(self, expr):
prec = PRECEDENCE["Pow"]
return "double(%s == %s)" % tuple(self.parenthesize(x, prec)
for x in expr.args)
def _print_HadamardProduct(self, expr):
return '.*'.join([self.parenthesize(arg, precedence(expr))
for arg in expr.args])
def _print_HadamardPower(self, expr):
PREC = precedence(expr)
return '.**'.join([
self.parenthesize(expr.base, PREC),
self.parenthesize(expr.exp, PREC)
])
def _print_Identity(self, expr):
shape = expr.shape
if len(shape) == 2 and shape[0] == shape[1]:
shape = [shape[0]]
s = ", ".join(self._print(n) for n in shape)
return "eye(" + s + ")"
def _print_lowergamma(self, expr):
# Octave implements regularized incomplete gamma function
return "(gammainc({1}, {0}).*gamma({0}))".format(
self._print(expr.args[0]), self._print(expr.args[1]))
def _print_uppergamma(self, expr):
return "(gammainc({1}, {0}, 'upper').*gamma({0}))".format(
self._print(expr.args[0]), self._print(expr.args[1]))
def _print_sinc(self, expr):
#Note: Divide by pi because Octave implements normalized sinc function.
return "sinc(%s)" % self._print(expr.args[0]/S.Pi)
def _print_hankel1(self, expr):
return "besselh(%s, 1, %s)" % (self._print(expr.order),
self._print(expr.argument))
def _print_hankel2(self, expr):
return "besselh(%s, 2, %s)" % (self._print(expr.order),
self._print(expr.argument))
# Note: as of 2015, Octave doesn't have spherical Bessel functions
def _print_jn(self, expr):
from sympy.functions import sqrt, besselj
x = expr.argument
expr2 = sqrt(S.Pi/(2*x))*besselj(expr.order + S.Half, x)
return self._print(expr2)
def _print_yn(self, expr):
from sympy.functions import sqrt, bessely
x = expr.argument
expr2 = sqrt(S.Pi/(2*x))*bessely(expr.order + S.Half, x)
return self._print(expr2)
def _print_airyai(self, expr):
return "airy(0, %s)" % self._print(expr.args[0])
def _print_airyaiprime(self, expr):
return "airy(1, %s)" % self._print(expr.args[0])
def _print_airybi(self, expr):
return "airy(2, %s)" % self._print(expr.args[0])
def _print_airybiprime(self, expr):
return "airy(3, %s)" % self._print(expr.args[0])
def _print_expint(self, expr):
mu, x = expr.args
if mu != 1:
return self._print_not_supported(expr)
return "expint(%s)" % self._print(x)
def _one_or_two_reversed_args(self, expr):
assert len(expr.args) <= 2
return '{name}({args})'.format(
name=self.known_functions[expr.__class__.__name__],
args=", ".join([self._print(x) for x in reversed(expr.args)])
)
_print_DiracDelta = _print_LambertW = _one_or_two_reversed_args
def _nested_binary_math_func(self, expr):
return '{name}({arg1}, {arg2})'.format(
name=self.known_functions[expr.__class__.__name__],
arg1=self._print(expr.args[0]),
arg2=self._print(expr.func(*expr.args[1:]))
)
_print_Max = _print_Min = _nested_binary_math_func
def _print_Piecewise(self, expr):
if expr.args[-1].cond != True:
# We need the last conditional to be a True, otherwise the resulting
# function may not return a result.
raise ValueError("All Piecewise expressions must contain an "
"(expr, True) statement to be used as a default "
"condition. Without one, the generated "
"expression may not evaluate to anything under "
"some condition.")
lines = []
if self._settings["inline"]:
# Express each (cond, expr) pair in a nested Horner form:
# (condition) .* (expr) + (not cond) .* (<others>)
# Expressions that result in multiple statements won't work here.
ecpairs = ["({0}).*({1}) + (~({0})).*(".format
(self._print(c), self._print(e))
for e, c in expr.args[:-1]]
elast = "%s" % self._print(expr.args[-1].expr)
pw = " ...\n".join(ecpairs) + elast + ")"*len(ecpairs)
# Note: current need these outer brackets for 2*pw. Would be
# nicer to teach parenthesize() to do this for us when needed!
return "(" + pw + ")"
else:
for i, (e, c) in enumerate(expr.args):
if i == 0:
lines.append("if (%s)" % self._print(c))
elif i == len(expr.args) - 1 and c == True:
lines.append("else")
else:
lines.append("elseif (%s)" % self._print(c))
code0 = self._print(e)
lines.append(code0)
if i == len(expr.args) - 1:
lines.append("end")
return "\n".join(lines)
def _print_zeta(self, expr):
if len(expr.args) == 1:
return "zeta(%s)" % self._print(expr.args[0])
else:
# Matlab two argument zeta is not equivalent to SymPy's
return self._print_not_supported(expr)
def indent_code(self, code):
"""Accepts a string of code or a list of code lines"""
# code mostly copied from ccode
if isinstance(code, str):
code_lines = self.indent_code(code.splitlines(True))
return ''.join(code_lines)
tab = " "
inc_regex = ('^function ', '^if ', '^elseif ', '^else$', '^for ')
dec_regex = ('^end$', '^elseif ', '^else$')
# pre-strip left-space from the code
code = [ line.lstrip(' \t') for line in code ]
increase = [ int(any([search(re, line) for re in inc_regex]))
for line in code ]
decrease = [ int(any([search(re, line) for re in dec_regex]))
for line in code ]
pretty = []
level = 0
for n, line in enumerate(code):
if line == '' or line == '\n':
pretty.append(line)
continue
level -= decrease[n]
pretty.append("%s%s" % (tab*level, line))
level += increase[n]
return pretty
def octave_code(expr, assign_to=None, **settings):
r"""Converts `expr` to a string of Octave (or Matlab) code.
The string uses a subset of the Octave language for Matlab compatibility.
Parameters
==========
expr : Expr
A sympy expression to be converted.
assign_to : optional
When given, the argument is used as the name of the variable to which
the expression is assigned. Can be a string, ``Symbol``,
``MatrixSymbol``, or ``Indexed`` type. This can be helpful for
expressions that generate multi-line statements.
precision : integer, optional
The precision for numbers such as pi [default=16].
user_functions : dict, optional
A dictionary where keys are ``FunctionClass`` instances and values are
their string representations. Alternatively, the dictionary value can
be a list of tuples i.e. [(argument_test, cfunction_string)]. See
below for examples.
human : bool, optional
If True, the result is a single string that may contain some constant
declarations for the number symbols. If False, the same information is
returned in a tuple of (symbols_to_declare, not_supported_functions,
code_text). [default=True].
contract: bool, optional
If True, ``Indexed`` instances are assumed to obey tensor contraction
rules and the corresponding nested loops over indices are generated.
Setting contract=False will not generate loops, instead the user is
responsible to provide values for the indices in the code.
[default=True].
inline: bool, optional
If True, we try to create single-statement code instead of multiple
statements. [default=True].
Examples
========
>>> from sympy import octave_code, symbols, sin, pi
>>> x = symbols('x')
>>> octave_code(sin(x).series(x).removeO())
'x.^5/120 - x.^3/6 + x'
>>> from sympy import Rational, ceiling, Abs
>>> x, y, tau = symbols("x, y, tau")
>>> octave_code((2*tau)**Rational(7, 2))
'8*sqrt(2)*tau.^(7/2)'
Note that element-wise (Hadamard) operations are used by default between
symbols. This is because its very common in Octave to write "vectorized"
code. It is harmless if the values are scalars.
>>> octave_code(sin(pi*x*y), assign_to="s")
's = sin(pi*x.*y);'
If you need a matrix product "*" or matrix power "^", you can specify the
symbol as a ``MatrixSymbol``.
>>> from sympy import Symbol, MatrixSymbol
>>> n = Symbol('n', integer=True, positive=True)
>>> A = MatrixSymbol('A', n, n)
>>> octave_code(3*pi*A**3)
'(3*pi)*A^3'
This class uses several rules to decide which symbol to use a product.
Pure numbers use "*", Symbols use ".*" and MatrixSymbols use "*".
A HadamardProduct can be used to specify componentwise multiplication ".*"
of two MatrixSymbols. There is currently there is no easy way to specify
scalar symbols, so sometimes the code might have some minor cosmetic
issues. For example, suppose x and y are scalars and A is a Matrix, then
while a human programmer might write "(x^2*y)*A^3", we generate:
>>> octave_code(x**2*y*A**3)
'(x.^2.*y)*A^3'
Matrices are supported using Octave inline notation. When using
``assign_to`` with matrices, the name can be specified either as a string
or as a ``MatrixSymbol``. The dimensions must align in the latter case.
>>> from sympy import Matrix, MatrixSymbol
>>> mat = Matrix([[x**2, sin(x), ceiling(x)]])
>>> octave_code(mat, assign_to='A')
'A = [x.^2 sin(x) ceil(x)];'
``Piecewise`` expressions are implemented with logical masking by default.
Alternatively, you can pass "inline=False" to use if-else conditionals.
Note that if the ``Piecewise`` lacks a default term, represented by
``(expr, True)`` then an error will be thrown. This is to prevent
generating an expression that may not evaluate to anything.
>>> from sympy import Piecewise
>>> pw = Piecewise((x + 1, x > 0), (x, True))
>>> octave_code(pw, assign_to=tau)
'tau = ((x > 0).*(x + 1) + (~(x > 0)).*(x));'
Note that any expression that can be generated normally can also exist
inside a Matrix:
>>> mat = Matrix([[x**2, pw, sin(x)]])
>>> octave_code(mat, assign_to='A')
'A = [x.^2 ((x > 0).*(x + 1) + (~(x > 0)).*(x)) sin(x)];'
Custom printing can be defined for certain types by passing a dictionary of
"type" : "function" to the ``user_functions`` kwarg. Alternatively, the
dictionary value can be a list of tuples i.e., [(argument_test,
cfunction_string)]. This can be used to call a custom Octave function.
>>> from sympy import Function
>>> f = Function('f')
>>> g = Function('g')
>>> custom_functions = {
... "f": "existing_octave_fcn",
... "g": [(lambda x: x.is_Matrix, "my_mat_fcn"),
... (lambda x: not x.is_Matrix, "my_fcn")]
... }
>>> mat = Matrix([[1, x]])
>>> octave_code(f(x) + g(x) + g(mat), user_functions=custom_functions)
'existing_octave_fcn(x) + my_fcn(x) + my_mat_fcn([1 x])'
Support for loops is provided through ``Indexed`` types. With
``contract=True`` these expressions will be turned into loops, whereas
``contract=False`` will just print the assignment expression that should be
looped over:
>>> from sympy import Eq, IndexedBase, Idx, ccode
>>> len_y = 5
>>> y = IndexedBase('y', shape=(len_y,))
>>> t = IndexedBase('t', shape=(len_y,))
>>> Dy = IndexedBase('Dy', shape=(len_y-1,))
>>> i = Idx('i', len_y-1)
>>> e = Eq(Dy[i], (y[i+1]-y[i])/(t[i+1]-t[i]))
>>> octave_code(e.rhs, assign_to=e.lhs, contract=False)
'Dy(i) = (y(i + 1) - y(i))./(t(i + 1) - t(i));'
"""
return OctaveCodePrinter(settings).doprint(expr, assign_to)
def print_octave_code(expr, **settings):
"""Prints the Octave (or Matlab) representation of the given expression.
See `octave_code` for the meaning of the optional arguments.
"""
print(octave_code(expr, **settings))
|
be7f2a4655482d3d46b7cc701416f7da375781181f79f69836ff7082dec8c445 | """
Fortran code printer
The FCodePrinter converts single sympy expressions into single Fortran
expressions, using the functions defined in the Fortran 77 standard where
possible. Some useful pointers to Fortran can be found on wikipedia:
https://en.wikipedia.org/wiki/Fortran
Most of the code below is based on the "Professional Programmer\'s Guide to
Fortran77" by Clive G. Page:
http://www.star.le.ac.uk/~cgp/prof77.html
Fortran is a case-insensitive language. This might cause trouble because
SymPy is case sensitive. So, fcode adds underscores to variable names when
it is necessary to make them different for Fortran.
"""
from __future__ import print_function, division
from typing import Dict, Any
from collections import defaultdict
from itertools import chain
import string
from sympy.codegen.ast import (
Assignment, Declaration, Pointer, value_const,
float32, float64, float80, complex64, complex128, int8, int16, int32,
int64, intc, real, integer, bool_, complex_
)
from sympy.codegen.fnodes import (
allocatable, isign, dsign, cmplx, merge, literal_dp, elemental, pure,
intent_in, intent_out, intent_inout
)
from sympy.core import S, Add, N, Float, Symbol
from sympy.core.function import Function
from sympy.core.relational import Eq
from sympy.sets import Range
from sympy.printing.codeprinter import CodePrinter
from sympy.printing.precedence import precedence, PRECEDENCE
from sympy.printing.printer import printer_context
known_functions = {
"sin": "sin",
"cos": "cos",
"tan": "tan",
"asin": "asin",
"acos": "acos",
"atan": "atan",
"atan2": "atan2",
"sinh": "sinh",
"cosh": "cosh",
"tanh": "tanh",
"log": "log",
"exp": "exp",
"erf": "erf",
"Abs": "abs",
"conjugate": "conjg",
"Max": "max",
"Min": "min",
}
class FCodePrinter(CodePrinter):
"""A printer to convert sympy expressions to strings of Fortran code"""
printmethod = "_fcode"
language = "Fortran"
type_aliases = {
integer: int32,
real: float64,
complex_: complex128,
}
type_mappings = {
intc: 'integer(c_int)',
float32: 'real*4', # real(kind(0.e0))
float64: 'real*8', # real(kind(0.d0))
float80: 'real*10', # real(kind(????))
complex64: 'complex*8',
complex128: 'complex*16',
int8: 'integer*1',
int16: 'integer*2',
int32: 'integer*4',
int64: 'integer*8',
bool_: 'logical'
}
type_modules = {
intc: {'iso_c_binding': 'c_int'}
}
_default_settings = {
'order': None,
'full_prec': 'auto',
'precision': 17,
'user_functions': {},
'human': True,
'allow_unknown_functions': False,
'source_format': 'fixed',
'contract': True,
'standard': 77,
'name_mangling' : True,
} # type: Dict[str, Any]
_operators = {
'and': '.and.',
'or': '.or.',
'xor': '.neqv.',
'equivalent': '.eqv.',
'not': '.not. ',
}
_relationals = {
'!=': '/=',
}
def __init__(self, settings=None):
if not settings:
settings = {}
self.mangled_symbols = {} # Dict showing mapping of all words
self.used_name = []
self.type_aliases = dict(chain(self.type_aliases.items(),
settings.pop('type_aliases', {}).items()))
self.type_mappings = dict(chain(self.type_mappings.items(),
settings.pop('type_mappings', {}).items()))
super(FCodePrinter, self).__init__(settings)
self.known_functions = dict(known_functions)
userfuncs = settings.get('user_functions', {})
self.known_functions.update(userfuncs)
# leading columns depend on fixed or free format
standards = {66, 77, 90, 95, 2003, 2008}
if self._settings['standard'] not in standards:
raise ValueError("Unknown Fortran standard: %s" % self._settings[
'standard'])
self.module_uses = defaultdict(set) # e.g.: use iso_c_binding, only: c_int
@property
def _lead(self):
if self._settings['source_format'] == 'fixed':
return {'code': " ", 'cont': " @ ", 'comment': "C "}
elif self._settings['source_format'] == 'free':
return {'code': "", 'cont': " ", 'comment': "! "}
else:
raise ValueError("Unknown source format: %s" % self._settings['source_format'])
def _print_Symbol(self, expr):
if self._settings['name_mangling'] == True:
if expr not in self.mangled_symbols:
name = expr.name
while name.lower() in self.used_name:
name += '_'
self.used_name.append(name.lower())
if name == expr.name:
self.mangled_symbols[expr] = expr
else:
self.mangled_symbols[expr] = Symbol(name)
expr = expr.xreplace(self.mangled_symbols)
name = super(FCodePrinter, self)._print_Symbol(expr)
return name
def _rate_index_position(self, p):
return -p*5
def _get_statement(self, codestring):
return codestring
def _get_comment(self, text):
return "! {0}".format(text)
def _declare_number_const(self, name, value):
return "parameter ({0} = {1})".format(name, self._print(value))
def _print_NumberSymbol(self, expr):
# A Number symbol that is not implemented here or with _printmethod
# is registered and evaluated
self._number_symbols.add((expr, Float(expr.evalf(self._settings['precision']))))
return str(expr)
def _format_code(self, lines):
return self._wrap_fortran(self.indent_code(lines))
def _traverse_matrix_indices(self, mat):
rows, cols = mat.shape
return ((i, j) for j in range(cols) for i in range(rows))
def _get_loop_opening_ending(self, indices):
open_lines = []
close_lines = []
for i in indices:
# fortran arrays start at 1 and end at dimension
var, start, stop = map(self._print,
[i.label, i.lower + 1, i.upper + 1])
open_lines.append("do %s = %s, %s" % (var, start, stop))
close_lines.append("end do")
return open_lines, close_lines
def _print_sign(self, expr):
from sympy import Abs
arg, = expr.args
if arg.is_integer:
new_expr = merge(0, isign(1, arg), Eq(arg, 0))
elif (arg.is_complex or arg.is_infinite):
new_expr = merge(cmplx(literal_dp(0), literal_dp(0)), arg/Abs(arg), Eq(Abs(arg), literal_dp(0)))
else:
new_expr = merge(literal_dp(0), dsign(literal_dp(1), arg), Eq(arg, literal_dp(0)))
return self._print(new_expr)
def _print_Piecewise(self, expr):
if expr.args[-1].cond != True:
# We need the last conditional to be a True, otherwise the resulting
# function may not return a result.
raise ValueError("All Piecewise expressions must contain an "
"(expr, True) statement to be used as a default "
"condition. Without one, the generated "
"expression may not evaluate to anything under "
"some condition.")
lines = []
if expr.has(Assignment):
for i, (e, c) in enumerate(expr.args):
if i == 0:
lines.append("if (%s) then" % self._print(c))
elif i == len(expr.args) - 1 and c == True:
lines.append("else")
else:
lines.append("else if (%s) then" % self._print(c))
lines.append(self._print(e))
lines.append("end if")
return "\n".join(lines)
elif self._settings["standard"] >= 95:
# Only supported in F95 and newer:
# The piecewise was used in an expression, need to do inline
# operators. This has the downside that inline operators will
# not work for statements that span multiple lines (Matrix or
# Indexed expressions).
pattern = "merge({T}, {F}, {COND})"
code = self._print(expr.args[-1].expr)
terms = list(expr.args[:-1])
while terms:
e, c = terms.pop()
expr = self._print(e)
cond = self._print(c)
code = pattern.format(T=expr, F=code, COND=cond)
return code
else:
# `merge` is not supported prior to F95
raise NotImplementedError("Using Piecewise as an expression using "
"inline operators is not supported in "
"standards earlier than Fortran95.")
def _print_MatrixElement(self, expr):
return "{0}({1}, {2})".format(self.parenthesize(expr.parent,
PRECEDENCE["Atom"], strict=True), expr.i + 1, expr.j + 1)
def _print_Add(self, expr):
# purpose: print complex numbers nicely in Fortran.
# collect the purely real and purely imaginary parts:
pure_real = []
pure_imaginary = []
mixed = []
for arg in expr.args:
if arg.is_number and arg.is_real:
pure_real.append(arg)
elif arg.is_number and arg.is_imaginary:
pure_imaginary.append(arg)
else:
mixed.append(arg)
if pure_imaginary:
if mixed:
PREC = precedence(expr)
term = Add(*mixed)
t = self._print(term)
if t.startswith('-'):
sign = "-"
t = t[1:]
else:
sign = "+"
if precedence(term) < PREC:
t = "(%s)" % t
return "cmplx(%s,%s) %s %s" % (
self._print(Add(*pure_real)),
self._print(-S.ImaginaryUnit*Add(*pure_imaginary)),
sign, t,
)
else:
return "cmplx(%s,%s)" % (
self._print(Add(*pure_real)),
self._print(-S.ImaginaryUnit*Add(*pure_imaginary)),
)
else:
return CodePrinter._print_Add(self, expr)
def _print_Function(self, expr):
# All constant function args are evaluated as floats
prec = self._settings['precision']
args = [N(a, prec) for a in expr.args]
eval_expr = expr.func(*args)
if not isinstance(eval_expr, Function):
return self._print(eval_expr)
else:
return CodePrinter._print_Function(self, expr.func(*args))
def _print_Mod(self, expr):
# NOTE : Fortran has the functions mod() and modulo(). modulo() behaves
# the same wrt to the sign of the arguments as Python and SymPy's
# modulus computations (% and Mod()) but is not available in Fortran 66
# or Fortran 77, thus we raise an error.
if self._settings['standard'] in [66, 77]:
msg = ("Python % operator and SymPy's Mod() function are not "
"supported by Fortran 66 or 77 standards.")
raise NotImplementedError(msg)
else:
x, y = expr.args
return " modulo({}, {})".format(self._print(x), self._print(y))
def _print_ImaginaryUnit(self, expr):
# purpose: print complex numbers nicely in Fortran.
return "cmplx(0,1)"
def _print_int(self, expr):
return str(expr)
def _print_Mul(self, expr):
# purpose: print complex numbers nicely in Fortran.
if expr.is_number and expr.is_imaginary:
return "cmplx(0,%s)" % (
self._print(-S.ImaginaryUnit*expr)
)
else:
return CodePrinter._print_Mul(self, expr)
def _print_Pow(self, expr):
PREC = precedence(expr)
if expr.exp == -1:
return '%s/%s' % (
self._print(literal_dp(1)),
self.parenthesize(expr.base, PREC)
)
elif expr.exp == 0.5:
if expr.base.is_integer:
# Fortran intrinsic sqrt() does not accept integer argument
if expr.base.is_Number:
return 'sqrt(%s.0d0)' % self._print(expr.base)
else:
return 'sqrt(dble(%s))' % self._print(expr.base)
else:
return 'sqrt(%s)' % self._print(expr.base)
else:
return CodePrinter._print_Pow(self, expr)
def _print_Rational(self, expr):
p, q = int(expr.p), int(expr.q)
return "%d.0d0/%d.0d0" % (p, q)
def _print_Float(self, expr):
printed = CodePrinter._print_Float(self, expr)
e = printed.find('e')
if e > -1:
return "%sd%s" % (printed[:e], printed[e + 1:])
return "%sd0" % printed
def _print_Relational(self, expr):
lhs_code = self._print(expr.lhs)
rhs_code = self._print(expr.rhs)
op = expr.rel_op
op = op if op not in self._relationals else self._relationals[op]
return "{0} {1} {2}".format(lhs_code, op, rhs_code)
def _print_Indexed(self, expr):
inds = [ self._print(i) for i in expr.indices ]
return "%s(%s)" % (self._print(expr.base.label), ", ".join(inds))
def _print_Idx(self, expr):
return self._print(expr.label)
def _print_AugmentedAssignment(self, expr):
lhs_code = self._print(expr.lhs)
rhs_code = self._print(expr.rhs)
return self._get_statement("{0} = {0} {1} {2}".format(
*map(lambda arg: self._print(arg),
[lhs_code, expr.binop, rhs_code])))
def _print_sum_(self, sm):
params = self._print(sm.array)
if sm.dim != None: # Must use '!= None', cannot use 'is not None'
params += ', ' + self._print(sm.dim)
if sm.mask != None: # Must use '!= None', cannot use 'is not None'
params += ', mask=' + self._print(sm.mask)
return '%s(%s)' % (sm.__class__.__name__.rstrip('_'), params)
def _print_product_(self, prod):
return self._print_sum_(prod)
def _print_Do(self, do):
excl = ['concurrent']
if do.step == 1:
excl.append('step')
step = ''
else:
step = ', {step}'
return (
'do {concurrent}{counter} = {first}, {last}'+step+'\n'
'{body}\n'
'end do\n'
).format(
concurrent='concurrent ' if do.concurrent else '',
**do.kwargs(apply=lambda arg: self._print(arg), exclude=excl)
)
def _print_ImpliedDoLoop(self, idl):
step = '' if idl.step == 1 else ', {step}'
return ('({expr}, {counter} = {first}, {last}'+step+')').format(
**idl.kwargs(apply=lambda arg: self._print(arg))
)
def _print_For(self, expr):
target = self._print(expr.target)
if isinstance(expr.iterable, Range):
start, stop, step = expr.iterable.args
else:
raise NotImplementedError("Only iterable currently supported is Range")
body = self._print(expr.body)
return ('do {target} = {start}, {stop}, {step}\n'
'{body}\n'
'end do').format(target=target, start=start, stop=stop,
step=step, body=body)
def _print_Type(self, type_):
type_ = self.type_aliases.get(type_, type_)
type_str = self.type_mappings.get(type_, type_.name)
module_uses = self.type_modules.get(type_)
if module_uses:
for k, v in module_uses:
self.module_uses[k].add(v)
return type_str
def _print_Element(self, elem):
return '{symbol}({idxs})'.format(
symbol=self._print(elem.symbol),
idxs=', '.join(map(lambda arg: self._print(arg), elem.indices))
)
def _print_Extent(self, ext):
return str(ext)
def _print_Declaration(self, expr):
var = expr.variable
val = var.value
dim = var.attr_params('dimension')
intents = [intent in var.attrs for intent in (intent_in, intent_out, intent_inout)]
if intents.count(True) == 0:
intent = ''
elif intents.count(True) == 1:
intent = ', intent(%s)' % ['in', 'out', 'inout'][intents.index(True)]
else:
raise ValueError("Multiple intents specified for %s" % self)
if isinstance(var, Pointer):
raise NotImplementedError("Pointers are not available by default in Fortran.")
if self._settings["standard"] >= 90:
result = '{t}{vc}{dim}{intent}{alloc} :: {s}'.format(
t=self._print(var.type),
vc=', parameter' if value_const in var.attrs else '',
dim=', dimension(%s)' % ', '.join(map(lambda arg: self._print(arg), dim)) if dim else '',
intent=intent,
alloc=', allocatable' if allocatable in var.attrs else '',
s=self._print(var.symbol)
)
if val != None: # Must be "!= None", cannot be "is not None"
result += ' = %s' % self._print(val)
else:
if value_const in var.attrs or val:
raise NotImplementedError("F77 init./parameter statem. req. multiple lines.")
result = ' '.join(map(lambda arg: self._print(arg), [var.type, var.symbol]))
return result
def _print_Infinity(self, expr):
return '(huge(%s) + 1)' % self._print(literal_dp(0))
def _print_While(self, expr):
return 'do while ({condition})\n{body}\nend do'.format(**expr.kwargs(
apply=lambda arg: self._print(arg)))
def _print_BooleanTrue(self, expr):
return '.true.'
def _print_BooleanFalse(self, expr):
return '.false.'
def _pad_leading_columns(self, lines):
result = []
for line in lines:
if line.startswith('!'):
result.append(self._lead['comment'] + line[1:].lstrip())
else:
result.append(self._lead['code'] + line)
return result
def _wrap_fortran(self, lines):
"""Wrap long Fortran lines
Argument:
lines -- a list of lines (without \\n character)
A comment line is split at white space. Code lines are split with a more
complex rule to give nice results.
"""
# routine to find split point in a code line
my_alnum = set("_+-." + string.digits + string.ascii_letters)
my_white = set(" \t()")
def split_pos_code(line, endpos):
if len(line) <= endpos:
return len(line)
pos = endpos
split = lambda pos: \
(line[pos] in my_alnum and line[pos - 1] not in my_alnum) or \
(line[pos] not in my_alnum and line[pos - 1] in my_alnum) or \
(line[pos] in my_white and line[pos - 1] not in my_white) or \
(line[pos] not in my_white and line[pos - 1] in my_white)
while not split(pos):
pos -= 1
if pos == 0:
return endpos
return pos
# split line by line and add the split lines to result
result = []
if self._settings['source_format'] == 'free':
trailing = ' &'
else:
trailing = ''
for line in lines:
if line.startswith(self._lead['comment']):
# comment line
if len(line) > 72:
pos = line.rfind(" ", 6, 72)
if pos == -1:
pos = 72
hunk = line[:pos]
line = line[pos:].lstrip()
result.append(hunk)
while line:
pos = line.rfind(" ", 0, 66)
if pos == -1 or len(line) < 66:
pos = 66
hunk = line[:pos]
line = line[pos:].lstrip()
result.append("%s%s" % (self._lead['comment'], hunk))
else:
result.append(line)
elif line.startswith(self._lead['code']):
# code line
pos = split_pos_code(line, 72)
hunk = line[:pos].rstrip()
line = line[pos:].lstrip()
if line:
hunk += trailing
result.append(hunk)
while line:
pos = split_pos_code(line, 65)
hunk = line[:pos].rstrip()
line = line[pos:].lstrip()
if line:
hunk += trailing
result.append("%s%s" % (self._lead['cont'], hunk))
else:
result.append(line)
return result
def indent_code(self, code):
"""Accepts a string of code or a list of code lines"""
if isinstance(code, str):
code_lines = self.indent_code(code.splitlines(True))
return ''.join(code_lines)
free = self._settings['source_format'] == 'free'
code = [ line.lstrip(' \t') for line in code ]
inc_keyword = ('do ', 'if(', 'if ', 'do\n', 'else', 'program', 'interface')
dec_keyword = ('end do', 'enddo', 'end if', 'endif', 'else', 'end program', 'end interface')
increase = [ int(any(map(line.startswith, inc_keyword)))
for line in code ]
decrease = [ int(any(map(line.startswith, dec_keyword)))
for line in code ]
continuation = [ int(any(map(line.endswith, ['&', '&\n'])))
for line in code ]
level = 0
cont_padding = 0
tabwidth = 3
new_code = []
for i, line in enumerate(code):
if line == '' or line == '\n':
new_code.append(line)
continue
level -= decrease[i]
if free:
padding = " "*(level*tabwidth + cont_padding)
else:
padding = " "*level*tabwidth
line = "%s%s" % (padding, line)
if not free:
line = self._pad_leading_columns([line])[0]
new_code.append(line)
if continuation[i]:
cont_padding = 2*tabwidth
else:
cont_padding = 0
level += increase[i]
if not free:
return self._wrap_fortran(new_code)
return new_code
def _print_GoTo(self, goto):
if goto.expr: # computed goto
return "go to ({labels}), {expr}".format(
labels=', '.join(map(lambda arg: self._print(arg), goto.labels)),
expr=self._print(goto.expr)
)
else:
lbl, = goto.labels
return "go to %s" % self._print(lbl)
def _print_Program(self, prog):
return (
"program {name}\n"
"{body}\n"
"end program\n"
).format(**prog.kwargs(apply=lambda arg: self._print(arg)))
def _print_Module(self, mod):
return (
"module {name}\n"
"{declarations}\n"
"\ncontains\n\n"
"{definitions}\n"
"end module\n"
).format(**mod.kwargs(apply=lambda arg: self._print(arg)))
def _print_Stream(self, strm):
if strm.name == 'stdout' and self._settings["standard"] >= 2003:
self.module_uses['iso_c_binding'].add('stdint=>input_unit')
return 'input_unit'
elif strm.name == 'stderr' and self._settings["standard"] >= 2003:
self.module_uses['iso_c_binding'].add('stdint=>error_unit')
return 'error_unit'
else:
if strm.name == 'stdout':
return '*'
else:
return strm.name
def _print_Print(self, ps):
if ps.format_string != None: # Must be '!= None', cannot be 'is not None'
fmt = self._print(ps.format_string)
else:
fmt = "*"
return "print {fmt}, {iolist}".format(fmt=fmt, iolist=', '.join(
map(lambda arg: self._print(arg), ps.print_args)))
def _print_Return(self, rs):
arg, = rs.args
return "{result_name} = {arg}".format(
result_name=self._context.get('result_name', 'sympy_result'),
arg=self._print(arg)
)
def _print_FortranReturn(self, frs):
arg, = frs.args
if arg:
return 'return %s' % self._print(arg)
else:
return 'return'
def _head(self, entity, fp, **kwargs):
bind_C_params = fp.attr_params('bind_C')
if bind_C_params is None:
bind = ''
else:
bind = ' bind(C, name="%s")' % bind_C_params[0] if bind_C_params else ' bind(C)'
result_name = self._settings.get('result_name', None)
return (
"{entity}{name}({arg_names}){result}{bind}\n"
"{arg_declarations}"
).format(
entity=entity,
name=self._print(fp.name),
arg_names=', '.join([self._print(arg.symbol) for arg in fp.parameters]),
result=(' result(%s)' % result_name) if result_name else '',
bind=bind,
arg_declarations='\n'.join(map(lambda arg: self._print(Declaration(arg)), fp.parameters))
)
def _print_FunctionPrototype(self, fp):
entity = "{0} function ".format(self._print(fp.return_type))
return (
"interface\n"
"{function_head}\n"
"end function\n"
"end interface"
).format(function_head=self._head(entity, fp))
def _print_FunctionDefinition(self, fd):
if elemental in fd.attrs:
prefix = 'elemental '
elif pure in fd.attrs:
prefix = 'pure '
else:
prefix = ''
entity = "{0} function ".format(self._print(fd.return_type))
with printer_context(self, result_name=fd.name):
return (
"{prefix}{function_head}\n"
"{body}\n"
"end function\n"
).format(
prefix=prefix,
function_head=self._head(entity, fd),
body=self._print(fd.body)
)
def _print_Subroutine(self, sub):
return (
'{subroutine_head}\n'
'{body}\n'
'end subroutine\n'
).format(
subroutine_head=self._head('subroutine ', sub),
body=self._print(sub.body)
)
def _print_SubroutineCall(self, scall):
return 'call {name}({args})'.format(
name=self._print(scall.name),
args=', '.join(map(lambda arg: self._print(arg), scall.subroutine_args))
)
def _print_use_rename(self, rnm):
return "%s => %s" % tuple(map(lambda arg: self._print(arg), rnm.args))
def _print_use(self, use):
result = 'use %s' % self._print(use.namespace)
if use.rename != None: # Must be '!= None', cannot be 'is not None'
result += ', ' + ', '.join([self._print(rnm) for rnm in use.rename])
if use.only != None: # Must be '!= None', cannot be 'is not None'
result += ', only: ' + ', '.join([self._print(nly) for nly in use.only])
return result
def _print_BreakToken(self, _):
return 'exit'
def _print_ContinueToken(self, _):
return 'cycle'
def _print_ArrayConstructor(self, ac):
fmtstr = "[%s]" if self._settings["standard"] >= 2003 else '(/%s/)'
return fmtstr % ', '.join(map(lambda arg: self._print(arg), ac.elements))
def fcode(expr, assign_to=None, **settings):
"""Converts an expr to a string of fortran code
Parameters
==========
expr : Expr
A sympy expression to be converted.
assign_to : optional
When given, the argument is used as the name of the variable to which
the expression is assigned. Can be a string, ``Symbol``,
``MatrixSymbol``, or ``Indexed`` type. This is helpful in case of
line-wrapping, or for expressions that generate multi-line statements.
precision : integer, optional
DEPRECATED. Use type_mappings instead. The precision for numbers such
as pi [default=17].
user_functions : dict, optional
A dictionary where keys are ``FunctionClass`` instances and values are
their string representations. Alternatively, the dictionary value can
be a list of tuples i.e. [(argument_test, cfunction_string)]. See below
for examples.
human : bool, optional
If True, the result is a single string that may contain some constant
declarations for the number symbols. If False, the same information is
returned in a tuple of (symbols_to_declare, not_supported_functions,
code_text). [default=True].
contract: bool, optional
If True, ``Indexed`` instances are assumed to obey tensor contraction
rules and the corresponding nested loops over indices are generated.
Setting contract=False will not generate loops, instead the user is
responsible to provide values for the indices in the code.
[default=True].
source_format : optional
The source format can be either 'fixed' or 'free'. [default='fixed']
standard : integer, optional
The Fortran standard to be followed. This is specified as an integer.
Acceptable standards are 66, 77, 90, 95, 2003, and 2008. Default is 77.
Note that currently the only distinction internally is between
standards before 95, and those 95 and after. This may change later as
more features are added.
name_mangling : bool, optional
If True, then the variables that would become identical in
case-insensitive Fortran are mangled by appending different number
of ``_`` at the end. If False, SymPy won't interfere with naming of
variables. [default=True]
Examples
========
>>> from sympy import fcode, symbols, Rational, sin, ceiling, floor
>>> x, tau = symbols("x, tau")
>>> fcode((2*tau)**Rational(7, 2))
' 8*sqrt(2.0d0)*tau**(7.0d0/2.0d0)'
>>> fcode(sin(x), assign_to="s")
' s = sin(x)'
Custom printing can be defined for certain types by passing a dictionary of
"type" : "function" to the ``user_functions`` kwarg. Alternatively, the
dictionary value can be a list of tuples i.e. [(argument_test,
cfunction_string)].
>>> custom_functions = {
... "ceiling": "CEIL",
... "floor": [(lambda x: not x.is_integer, "FLOOR1"),
... (lambda x: x.is_integer, "FLOOR2")]
... }
>>> fcode(floor(x) + ceiling(x), user_functions=custom_functions)
' CEIL(x) + FLOOR1(x)'
``Piecewise`` expressions are converted into conditionals. If an
``assign_to`` variable is provided an if statement is created, otherwise
the ternary operator is used. Note that if the ``Piecewise`` lacks a
default term, represented by ``(expr, True)`` then an error will be thrown.
This is to prevent generating an expression that may not evaluate to
anything.
>>> from sympy import Piecewise
>>> expr = Piecewise((x + 1, x > 0), (x, True))
>>> print(fcode(expr, tau))
if (x > 0) then
tau = x + 1
else
tau = x
end if
Support for loops is provided through ``Indexed`` types. With
``contract=True`` these expressions will be turned into loops, whereas
``contract=False`` will just print the assignment expression that should be
looped over:
>>> from sympy import Eq, IndexedBase, Idx
>>> len_y = 5
>>> y = IndexedBase('y', shape=(len_y,))
>>> t = IndexedBase('t', shape=(len_y,))
>>> Dy = IndexedBase('Dy', shape=(len_y-1,))
>>> i = Idx('i', len_y-1)
>>> e=Eq(Dy[i], (y[i+1]-y[i])/(t[i+1]-t[i]))
>>> fcode(e.rhs, assign_to=e.lhs, contract=False)
' Dy(i) = (y(i + 1) - y(i))/(t(i + 1) - t(i))'
Matrices are also supported, but a ``MatrixSymbol`` of the same dimensions
must be provided to ``assign_to``. Note that any expression that can be
generated normally can also exist inside a Matrix:
>>> from sympy import Matrix, MatrixSymbol
>>> mat = Matrix([x**2, Piecewise((x + 1, x > 0), (x, True)), sin(x)])
>>> A = MatrixSymbol('A', 3, 1)
>>> print(fcode(mat, A))
A(1, 1) = x**2
if (x > 0) then
A(2, 1) = x + 1
else
A(2, 1) = x
end if
A(3, 1) = sin(x)
"""
return FCodePrinter(settings).doprint(expr, assign_to)
def print_fcode(expr, **settings):
"""Prints the Fortran representation of the given expression.
See fcode for the meaning of the optional arguments.
"""
print(fcode(expr, **settings))
|
f268c75ed80dae98269b890b48b5d033e7522f833dc5a6c8937dbb8630fc9377 | from __future__ import print_function, division
from typing import Any, Dict, Set, Tuple
from functools import wraps
from sympy.core import Add, Expr, Mul, Pow, S, sympify, Float
from sympy.core.basic import Basic
from sympy.core.compatibility import default_sort_key
from sympy.core.function import Lambda
from sympy.core.mul import _keep_coeff
from sympy.core.symbol import Symbol
from sympy.printing.str import StrPrinter
from sympy.printing.precedence import precedence
# Backwards compatibility
from sympy.codegen.ast import Assignment
class requires(object):
""" Decorator for registering requirements on print methods. """
def __init__(self, **kwargs):
self._req = kwargs
def __call__(self, method):
def _method_wrapper(self_, *args, **kwargs):
for k, v in self._req.items():
getattr(self_, k).update(v)
return method(self_, *args, **kwargs)
return wraps(method)(_method_wrapper)
class AssignmentError(Exception):
"""
Raised if an assignment variable for a loop is missing.
"""
pass
class CodePrinter(StrPrinter):
"""
The base class for code-printing subclasses.
"""
_operators = {
'and': '&&',
'or': '||',
'not': '!',
}
_default_settings = {
'order': None,
'full_prec': 'auto',
'error_on_reserved': False,
'reserved_word_suffix': '_',
'human': True,
'inline': False,
'allow_unknown_functions': False,
} # type: Dict[str, Any]
# Functions which are "simple" to rewrite to other functions that
# may be supported
_rewriteable_functions = {
'erf2': 'erf',
'Li': 'li',
'beta': 'gamma'
}
def __init__(self, settings=None):
super(CodePrinter, self).__init__(settings=settings)
if not hasattr(self, 'reserved_words'):
self.reserved_words = set()
def doprint(self, expr, assign_to=None):
"""
Print the expression as code.
Parameters
----------
expr : Expression
The expression to be printed.
assign_to : Symbol, MatrixSymbol, or string (optional)
If provided, the printed code will set the expression to a
variable with name ``assign_to``.
"""
from sympy.matrices.expressions.matexpr import MatrixSymbol
if isinstance(assign_to, str):
if expr.is_Matrix:
assign_to = MatrixSymbol(assign_to, *expr.shape)
else:
assign_to = Symbol(assign_to)
elif not isinstance(assign_to, (Basic, type(None))):
raise TypeError("{0} cannot assign to object of type {1}".format(
type(self).__name__, type(assign_to)))
if assign_to:
expr = Assignment(assign_to, expr)
else:
# _sympify is not enough b/c it errors on iterables
expr = sympify(expr)
# keep a set of expressions that are not strictly translatable to Code
# and number constants that must be declared and initialized
self._not_supported = set()
self._number_symbols = set() # type: Set[Tuple[Expr, Float]]
lines = self._print(expr).splitlines()
# format the output
if self._settings["human"]:
frontlines = []
if self._not_supported:
frontlines.append(self._get_comment(
"Not supported in {0}:".format(self.language)))
for expr in sorted(self._not_supported, key=str):
frontlines.append(self._get_comment(type(expr).__name__))
for name, value in sorted(self._number_symbols, key=str):
frontlines.append(self._declare_number_const(name, value))
lines = frontlines + lines
lines = self._format_code(lines)
result = "\n".join(lines)
else:
lines = self._format_code(lines)
num_syms = set([(k, self._print(v)) for k, v in self._number_symbols])
result = (num_syms, self._not_supported, "\n".join(lines))
self._not_supported = set()
self._number_symbols = set()
return result
def _doprint_loops(self, expr, assign_to=None):
# Here we print an expression that contains Indexed objects, they
# correspond to arrays in the generated code. The low-level implementation
# involves looping over array elements and possibly storing results in temporary
# variables or accumulate it in the assign_to object.
if self._settings.get('contract', True):
from sympy.tensor import get_contraction_structure
# Setup loops over non-dummy indices -- all terms need these
indices = self._get_expression_indices(expr, assign_to)
# Setup loops over dummy indices -- each term needs separate treatment
dummies = get_contraction_structure(expr)
else:
indices = []
dummies = {None: (expr,)}
openloop, closeloop = self._get_loop_opening_ending(indices)
# terms with no summations first
if None in dummies:
text = StrPrinter.doprint(self, Add(*dummies[None]))
else:
# If all terms have summations we must initialize array to Zero
text = StrPrinter.doprint(self, 0)
# skip redundant assignments (where lhs == rhs)
lhs_printed = self._print(assign_to)
lines = []
if text != lhs_printed:
lines.extend(openloop)
if assign_to is not None:
text = self._get_statement("%s = %s" % (lhs_printed, text))
lines.append(text)
lines.extend(closeloop)
# then terms with summations
for d in dummies:
if isinstance(d, tuple):
indices = self._sort_optimized(d, expr)
openloop_d, closeloop_d = self._get_loop_opening_ending(
indices)
for term in dummies[d]:
if term in dummies and not ([list(f.keys()) for f in dummies[term]]
== [[None] for f in dummies[term]]):
# If one factor in the term has it's own internal
# contractions, those must be computed first.
# (temporary variables?)
raise NotImplementedError(
"FIXME: no support for contractions in factor yet")
else:
# We need the lhs expression as an accumulator for
# the loops, i.e
#
# for (int d=0; d < dim; d++){
# lhs[] = lhs[] + term[][d]
# } ^.................. the accumulator
#
# We check if the expression already contains the
# lhs, and raise an exception if it does, as that
# syntax is currently undefined. FIXME: What would be
# a good interpretation?
if assign_to is None:
raise AssignmentError(
"need assignment variable for loops")
if term.has(assign_to):
raise ValueError("FIXME: lhs present in rhs,\
this is undefined in CodePrinter")
lines.extend(openloop)
lines.extend(openloop_d)
text = "%s = %s" % (lhs_printed, StrPrinter.doprint(
self, assign_to + term))
lines.append(self._get_statement(text))
lines.extend(closeloop_d)
lines.extend(closeloop)
return "\n".join(lines)
def _get_expression_indices(self, expr, assign_to):
from sympy.tensor import get_indices
rinds, junk = get_indices(expr)
linds, junk = get_indices(assign_to)
# support broadcast of scalar
if linds and not rinds:
rinds = linds
if rinds != linds:
raise ValueError("lhs indices must match non-dummy"
" rhs indices in %s" % expr)
return self._sort_optimized(rinds, assign_to)
def _sort_optimized(self, indices, expr):
from sympy.tensor.indexed import Indexed
if not indices:
return []
# determine optimized loop order by giving a score to each index
# the index with the highest score are put in the innermost loop.
score_table = {}
for i in indices:
score_table[i] = 0
arrays = expr.atoms(Indexed)
for arr in arrays:
for p, ind in enumerate(arr.indices):
try:
score_table[ind] += self._rate_index_position(p)
except KeyError:
pass
return sorted(indices, key=lambda x: score_table[x])
def _rate_index_position(self, p):
"""function to calculate score based on position among indices
This method is used to sort loops in an optimized order, see
CodePrinter._sort_optimized()
"""
raise NotImplementedError("This function must be implemented by "
"subclass of CodePrinter.")
def _get_statement(self, codestring):
"""Formats a codestring with the proper line ending."""
raise NotImplementedError("This function must be implemented by "
"subclass of CodePrinter.")
def _get_comment(self, text):
"""Formats a text string as a comment."""
raise NotImplementedError("This function must be implemented by "
"subclass of CodePrinter.")
def _declare_number_const(self, name, value):
"""Declare a numeric constant at the top of a function"""
raise NotImplementedError("This function must be implemented by "
"subclass of CodePrinter.")
def _format_code(self, lines):
"""Take in a list of lines of code, and format them accordingly.
This may include indenting, wrapping long lines, etc..."""
raise NotImplementedError("This function must be implemented by "
"subclass of CodePrinter.")
def _get_loop_opening_ending(self, indices):
"""Returns a tuple (open_lines, close_lines) containing lists
of codelines"""
raise NotImplementedError("This function must be implemented by "
"subclass of CodePrinter.")
def _print_Dummy(self, expr):
if expr.name.startswith('Dummy_'):
return '_' + expr.name
else:
return '%s_%d' % (expr.name, expr.dummy_index)
def _print_CodeBlock(self, expr):
return '\n'.join([self._print(i) for i in expr.args])
def _print_String(self, string):
return str(string)
def _print_QuotedString(self, arg):
return '"%s"' % arg.text
def _print_Comment(self, string):
return self._get_comment(str(string))
def _print_Assignment(self, expr):
from sympy.functions.elementary.piecewise import Piecewise
from sympy.matrices.expressions.matexpr import MatrixSymbol
from sympy.tensor.indexed import IndexedBase
lhs = expr.lhs
rhs = expr.rhs
# We special case assignments that take multiple lines
if isinstance(expr.rhs, Piecewise):
# Here we modify Piecewise so each expression is now
# an Assignment, and then continue on the print.
expressions = []
conditions = []
for (e, c) in rhs.args:
expressions.append(Assignment(lhs, e))
conditions.append(c)
temp = Piecewise(*zip(expressions, conditions))
return self._print(temp)
elif isinstance(lhs, MatrixSymbol):
# Here we form an Assignment for each element in the array,
# printing each one.
lines = []
for (i, j) in self._traverse_matrix_indices(lhs):
temp = Assignment(lhs[i, j], rhs[i, j])
code0 = self._print(temp)
lines.append(code0)
return "\n".join(lines)
elif self._settings.get("contract", False) and (lhs.has(IndexedBase) or
rhs.has(IndexedBase)):
# Here we check if there is looping to be done, and if so
# print the required loops.
return self._doprint_loops(rhs, lhs)
else:
lhs_code = self._print(lhs)
rhs_code = self._print(rhs)
return self._get_statement("%s = %s" % (lhs_code, rhs_code))
def _print_AugmentedAssignment(self, expr):
lhs_code = self._print(expr.lhs)
rhs_code = self._print(expr.rhs)
return self._get_statement("{0} {1} {2}".format(
*map(lambda arg: self._print(arg),
[lhs_code, expr.op, rhs_code])))
def _print_FunctionCall(self, expr):
return '%s(%s)' % (
expr.name,
', '.join(map(lambda arg: self._print(arg),
expr.function_args)))
def _print_Variable(self, expr):
return self._print(expr.symbol)
def _print_Statement(self, expr):
arg, = expr.args
return self._get_statement(self._print(arg))
def _print_Symbol(self, expr):
name = super(CodePrinter, self)._print_Symbol(expr)
if name in self.reserved_words:
if self._settings['error_on_reserved']:
msg = ('This expression includes the symbol "{}" which is a '
'reserved keyword in this language.')
raise ValueError(msg.format(name))
return name + self._settings['reserved_word_suffix']
else:
return name
def _print_Function(self, expr):
if expr.func.__name__ in self.known_functions:
cond_func = self.known_functions[expr.func.__name__]
func = None
if isinstance(cond_func, str):
func = cond_func
else:
for cond, func in cond_func:
if cond(*expr.args):
break
if func is not None:
try:
return func(*[self.parenthesize(item, 0) for item in expr.args])
except TypeError:
return "%s(%s)" % (func, self.stringify(expr.args, ", "))
elif hasattr(expr, '_imp_') and isinstance(expr._imp_, Lambda):
# inlined function
return self._print(expr._imp_(*expr.args))
elif (expr.func.__name__ in self._rewriteable_functions and
self._rewriteable_functions[expr.func.__name__] in self.known_functions):
# Simple rewrite to supported function possible
return self._print(expr.rewrite(self._rewriteable_functions[expr.func.__name__]))
elif expr.is_Function and self._settings.get('allow_unknown_functions', False):
return '%s(%s)' % (self._print(expr.func), ', '.join(map(self._print, expr.args)))
else:
return self._print_not_supported(expr)
_print_Expr = _print_Function
def _print_NumberSymbol(self, expr):
if self._settings.get("inline", False):
return self._print(Float(expr.evalf(self._settings["precision"])))
else:
# A Number symbol that is not implemented here or with _printmethod
# is registered and evaluated
self._number_symbols.add((expr,
Float(expr.evalf(self._settings["precision"]))))
return str(expr)
def _print_Catalan(self, expr):
return self._print_NumberSymbol(expr)
def _print_EulerGamma(self, expr):
return self._print_NumberSymbol(expr)
def _print_GoldenRatio(self, expr):
return self._print_NumberSymbol(expr)
def _print_TribonacciConstant(self, expr):
return self._print_NumberSymbol(expr)
def _print_Exp1(self, expr):
return self._print_NumberSymbol(expr)
def _print_Pi(self, expr):
return self._print_NumberSymbol(expr)
def _print_And(self, expr):
PREC = precedence(expr)
return (" %s " % self._operators['and']).join(self.parenthesize(a, PREC)
for a in sorted(expr.args, key=default_sort_key))
def _print_Or(self, expr):
PREC = precedence(expr)
return (" %s " % self._operators['or']).join(self.parenthesize(a, PREC)
for a in sorted(expr.args, key=default_sort_key))
def _print_Xor(self, expr):
if self._operators.get('xor') is None:
return self._print_not_supported(expr)
PREC = precedence(expr)
return (" %s " % self._operators['xor']).join(self.parenthesize(a, PREC)
for a in expr.args)
def _print_Equivalent(self, expr):
if self._operators.get('equivalent') is None:
return self._print_not_supported(expr)
PREC = precedence(expr)
return (" %s " % self._operators['equivalent']).join(self.parenthesize(a, PREC)
for a in expr.args)
def _print_Not(self, expr):
PREC = precedence(expr)
return self._operators['not'] + self.parenthesize(expr.args[0], PREC)
def _print_Mul(self, expr):
prec = precedence(expr)
c, e = expr.as_coeff_Mul()
if c < 0:
expr = _keep_coeff(-c, e)
sign = "-"
else:
sign = ""
a = [] # items in the numerator
b = [] # items that are in the denominator (if any)
pow_paren = [] # Will collect all pow with more than one base element and exp = -1
if self.order not in ('old', 'none'):
args = expr.as_ordered_factors()
else:
# use make_args in case expr was something like -x -> x
args = Mul.make_args(expr)
# Gather args for numerator/denominator
for item in args:
if item.is_commutative and item.is_Pow and item.exp.is_Rational and item.exp.is_negative:
if item.exp != -1:
b.append(Pow(item.base, -item.exp, evaluate=False))
else:
if len(item.args[0].args) != 1 and isinstance(item.base, Mul): # To avoid situations like #14160
pow_paren.append(item)
b.append(Pow(item.base, -item.exp))
else:
a.append(item)
a = a or [S.One]
a_str = [self.parenthesize(x, prec) for x in a]
b_str = [self.parenthesize(x, prec) for x in b]
# To parenthesize Pow with exp = -1 and having more than one Symbol
for item in pow_paren:
if item.base in b:
b_str[b.index(item.base)] = "(%s)" % b_str[b.index(item.base)]
if not b:
return sign + '*'.join(a_str)
elif len(b) == 1:
return sign + '*'.join(a_str) + "/" + b_str[0]
else:
return sign + '*'.join(a_str) + "/(%s)" % '*'.join(b_str)
def _print_not_supported(self, expr):
self._not_supported.add(expr)
return self.emptyPrinter(expr)
# The following can not be simply translated into C or Fortran
_print_Basic = _print_not_supported
_print_ComplexInfinity = _print_not_supported
_print_Derivative = _print_not_supported
_print_ExprCondPair = _print_not_supported
_print_GeometryEntity = _print_not_supported
_print_Infinity = _print_not_supported
_print_Integral = _print_not_supported
_print_Interval = _print_not_supported
_print_AccumulationBounds = _print_not_supported
_print_Limit = _print_not_supported
_print_Matrix = _print_not_supported
_print_ImmutableMatrix = _print_not_supported
_print_ImmutableDenseMatrix = _print_not_supported
_print_MutableDenseMatrix = _print_not_supported
_print_MatrixBase = _print_not_supported
_print_DeferredVector = _print_not_supported
_print_NaN = _print_not_supported
_print_NegativeInfinity = _print_not_supported
_print_Order = _print_not_supported
_print_RootOf = _print_not_supported
_print_RootsOf = _print_not_supported
_print_RootSum = _print_not_supported
_print_SparseMatrix = _print_not_supported
_print_MutableSparseMatrix = _print_not_supported
_print_ImmutableSparseMatrix = _print_not_supported
_print_Uniform = _print_not_supported
_print_Unit = _print_not_supported
_print_Wild = _print_not_supported
_print_WildFunction = _print_not_supported
_print_Relational = _print_not_supported
|
be42ea181c6e94d61895a2c87661e3e1f312436e2b29556cea0e5571752bcae5 | from __future__ import print_function, division
import io
from io import BytesIO
import os
from os.path import join
import shutil
import tempfile
try:
from subprocess import STDOUT, CalledProcessError, check_output
except ImportError:
pass
from sympy.core.compatibility import unicode, u_decode
from sympy.utilities.decorator import doctest_depends_on
from sympy.utilities.misc import find_executable
from .latex import latex
__doctest_requires__ = {('preview',): ['pyglet']}
@doctest_depends_on(exe=('latex', 'dvipng'), modules=('pyglet',),
disable_viewers=('evince', 'gimp', 'superior-dvi-viewer'))
def preview(expr, output='png', viewer=None, euler=True, packages=(),
filename=None, outputbuffer=None, preamble=None, dvioptions=None,
outputTexFile=None, **latex_settings):
r"""
View expression or LaTeX markup in PNG, DVI, PostScript or PDF form.
If the expr argument is an expression, it will be exported to LaTeX and
then compiled using the available TeX distribution. The first argument,
'expr', may also be a LaTeX string. The function will then run the
appropriate viewer for the given output format or use the user defined
one. By default png output is generated.
By default pretty Euler fonts are used for typesetting (they were used to
typeset the well known "Concrete Mathematics" book). For that to work, you
need the 'eulervm.sty' LaTeX style (in Debian/Ubuntu, install the
texlive-fonts-extra package). If you prefer default AMS fonts or your
system lacks 'eulervm' LaTeX package then unset the 'euler' keyword
argument.
To use viewer auto-detection, lets say for 'png' output, issue
>>> from sympy import symbols, preview, Symbol
>>> x, y = symbols("x,y")
>>> preview(x + y, output='png')
This will choose 'pyglet' by default. To select a different one, do
>>> preview(x + y, output='png', viewer='gimp')
The 'png' format is considered special. For all other formats the rules
are slightly different. As an example we will take 'dvi' output format. If
you would run
>>> preview(x + y, output='dvi')
then 'view' will look for available 'dvi' viewers on your system
(predefined in the function, so it will try evince, first, then kdvi and
xdvi). If nothing is found you will need to set the viewer explicitly.
>>> preview(x + y, output='dvi', viewer='superior-dvi-viewer')
This will skip auto-detection and will run user specified
'superior-dvi-viewer'. If 'view' fails to find it on your system it will
gracefully raise an exception.
You may also enter 'file' for the viewer argument. Doing so will cause
this function to return a file object in read-only mode, if 'filename'
is unset. However, if it was set, then 'preview' writes the genereted
file to this filename instead.
There is also support for writing to a BytesIO like object, which needs
to be passed to the 'outputbuffer' argument.
>>> from io import BytesIO
>>> obj = BytesIO()
>>> preview(x + y, output='png', viewer='BytesIO',
... outputbuffer=obj)
The LaTeX preamble can be customized by setting the 'preamble' keyword
argument. This can be used, e.g., to set a different font size, use a
custom documentclass or import certain set of LaTeX packages.
>>> preamble = "\\documentclass[10pt]{article}\n" \
... "\\usepackage{amsmath,amsfonts}\\begin{document}"
>>> preview(x + y, output='png', preamble=preamble)
If the value of 'output' is different from 'dvi' then command line
options can be set ('dvioptions' argument) for the execution of the
'dvi'+output conversion tool. These options have to be in the form of a
list of strings (see subprocess.Popen).
Additional keyword args will be passed to the latex call, e.g., the
symbol_names flag.
>>> phidd = Symbol('phidd')
>>> preview(phidd, symbol_names={phidd:r'\ddot{\varphi}'})
For post-processing the generated TeX File can be written to a file by
passing the desired filename to the 'outputTexFile' keyword
argument. To write the TeX code to a file named
"sample.tex" and run the default png viewer to display the resulting
bitmap, do
>>> preview(x + y, outputTexFile="sample.tex")
"""
special = [ 'pyglet' ]
if viewer is None:
if output == "png":
viewer = "pyglet"
else:
# sorted in order from most pretty to most ugly
# very discussable, but indeed 'gv' looks awful :)
# TODO add candidates for windows to list
candidates = {
"dvi": [ "evince", "okular", "kdvi", "xdvi" ],
"ps": [ "evince", "okular", "gsview", "gv" ],
"pdf": [ "evince", "okular", "kpdf", "acroread", "xpdf", "gv" ],
}
try:
for candidate in candidates[output]:
path = find_executable(candidate)
if path is not None:
viewer = path
break
else:
raise SystemError(
"No viewers found for '%s' output format." % output)
except KeyError:
raise SystemError("Invalid output format: %s" % output)
else:
if viewer == "StringIO":
viewer = "BytesIO"
if outputbuffer is None:
raise ValueError("outputbuffer has to be a BytesIO "
"compatible object if viewer=\"StringIO\"")
elif viewer == "BytesIO":
if outputbuffer is None:
raise ValueError("outputbuffer has to be a BytesIO "
"compatible object if viewer=\"BytesIO\"")
elif viewer not in special and not find_executable(viewer):
raise SystemError("Unrecognized viewer: %s" % viewer)
if preamble is None:
actual_packages = packages + ("amsmath", "amsfonts")
if euler:
actual_packages += ("euler",)
package_includes = "\n" + "\n".join(["\\usepackage{%s}" % p
for p in actual_packages])
preamble = r"""\documentclass[varwidth,12pt]{standalone}
%s
\begin{document}
""" % (package_includes)
else:
if packages:
raise ValueError("The \"packages\" keyword must not be set if a "
"custom LaTeX preamble was specified")
latex_main = preamble + '\n%s\n\n' + r"\end{document}"
if isinstance(expr, str):
latex_string = expr
else:
latex_string = ('$\\displaystyle ' +
latex(expr, mode='plain', **latex_settings) +
'$')
try:
workdir = tempfile.mkdtemp()
with io.open(join(workdir, 'texput.tex'), 'w', encoding='utf-8') as fh:
fh.write(unicode(latex_main) % u_decode(latex_string))
if outputTexFile is not None:
shutil.copyfile(join(workdir, 'texput.tex'), outputTexFile)
if not find_executable('latex'):
raise RuntimeError("latex program is not installed")
try:
# Avoid showing a cmd.exe window when running this
# on Windows
if os.name == 'nt':
creation_flag = 0x08000000 # CREATE_NO_WINDOW
else:
creation_flag = 0 # Default value
check_output(['latex', '-halt-on-error', '-interaction=nonstopmode',
'texput.tex'],
cwd=workdir,
stderr=STDOUT,
creationflags=creation_flag)
except CalledProcessError as e:
raise RuntimeError(
"'latex' exited abnormally with the following output:\n%s" %
e.output)
if output != "dvi":
defaultoptions = {
"ps": [],
"pdf": [],
"png": ["-T", "tight", "-z", "9", "--truecolor"],
"svg": ["--no-fonts"],
}
commandend = {
"ps": ["-o", "texput.ps", "texput.dvi"],
"pdf": ["texput.dvi", "texput.pdf"],
"png": ["-o", "texput.png", "texput.dvi"],
"svg": ["-o", "texput.svg", "texput.dvi"],
}
if output == "svg":
cmd = ["dvisvgm"]
else:
cmd = ["dvi" + output]
if not find_executable(cmd[0]):
raise RuntimeError("%s is not installed" % cmd[0])
try:
if dvioptions is not None:
cmd.extend(dvioptions)
else:
cmd.extend(defaultoptions[output])
cmd.extend(commandend[output])
except KeyError:
raise SystemError("Invalid output format: %s" % output)
try:
# Avoid showing a cmd.exe window when running this
# on Windows
if os.name == 'nt':
creation_flag = 0x08000000 # CREATE_NO_WINDOW
else:
creation_flag = 0 # Default value
check_output(cmd, cwd=workdir, stderr=STDOUT,
creationflags=creation_flag)
except CalledProcessError as e:
raise RuntimeError(
"'%s' exited abnormally with the following output:\n%s" %
(' '.join(cmd), e.output))
src = "texput.%s" % (output)
if viewer == "file":
if filename is None:
buffer = BytesIO()
with open(join(workdir, src), 'rb') as fh:
buffer.write(fh.read())
return buffer
else:
shutil.move(join(workdir,src), filename)
elif viewer == "BytesIO":
with open(join(workdir, src), 'rb') as fh:
outputbuffer.write(fh.read())
elif viewer == "pyglet":
try:
from pyglet import window, image, gl
from pyglet.window import key
except ImportError:
raise ImportError("pyglet is required for preview.\n visit http://www.pyglet.org/")
if output == "png":
from pyglet.image.codecs.png import PNGImageDecoder
img = image.load(join(workdir, src), decoder=PNGImageDecoder())
else:
raise SystemError("pyglet preview works only for 'png' files.")
offset = 25
config = gl.Config(double_buffer=False)
win = window.Window(
width=img.width + 2*offset,
height=img.height + 2*offset,
caption="sympy",
resizable=False,
config=config
)
win.set_vsync(False)
try:
def on_close():
win.has_exit = True
win.on_close = on_close
def on_key_press(symbol, modifiers):
if symbol in [key.Q, key.ESCAPE]:
on_close()
win.on_key_press = on_key_press
def on_expose():
gl.glClearColor(1.0, 1.0, 1.0, 1.0)
gl.glClear(gl.GL_COLOR_BUFFER_BIT)
img.blit(
(win.width - img.width) / 2,
(win.height - img.height) / 2
)
win.on_expose = on_expose
while not win.has_exit:
win.dispatch_events()
win.flip()
except KeyboardInterrupt:
pass
win.close()
else:
try:
# Avoid showing a cmd.exe window when running this
# on Windows
if os.name == 'nt':
creation_flag = 0x08000000 # CREATE_NO_WINDOW
else:
creation_flag = 0 # Default value
check_output([viewer, src], cwd=workdir, stderr=STDOUT,
creationflags=creation_flag)
except CalledProcessError as e:
raise RuntimeError(
"'%s %s' exited abnormally with the following output:\n%s" %
(viewer, src, e.output))
finally:
try:
shutil.rmtree(workdir) # delete directory
except OSError as e:
if e.errno != 2: # code 2 - no such file or directory
raise
|
72705ded8880a43fc136418462c8a63cc4ee98daa3b9ba1679df0a435f118599 | """
Javascript code printer
The JavascriptCodePrinter converts single sympy expressions into single
Javascript expressions, using the functions defined in the Javascript
Math object where possible.
"""
from __future__ import print_function, division
from typing import Any, Dict
from sympy.codegen.ast import Assignment
from sympy.core import S
from sympy.printing.codeprinter import CodePrinter
from sympy.printing.precedence import precedence, PRECEDENCE
# dictionary mapping sympy function to (argument_conditions, Javascript_function).
# Used in JavascriptCodePrinter._print_Function(self)
known_functions = {
'Abs': 'Math.abs',
'acos': 'Math.acos',
'acosh': 'Math.acosh',
'asin': 'Math.asin',
'asinh': 'Math.asinh',
'atan': 'Math.atan',
'atan2': 'Math.atan2',
'atanh': 'Math.atanh',
'ceiling': 'Math.ceil',
'cos': 'Math.cos',
'cosh': 'Math.cosh',
'exp': 'Math.exp',
'floor': 'Math.floor',
'log': 'Math.log',
'Max': 'Math.max',
'Min': 'Math.min',
'sign': 'Math.sign',
'sin': 'Math.sin',
'sinh': 'Math.sinh',
'tan': 'Math.tan',
'tanh': 'Math.tanh',
}
class JavascriptCodePrinter(CodePrinter):
""""A Printer to convert python expressions to strings of javascript code
"""
printmethod = '_javascript'
language = 'Javascript'
_default_settings = {
'order': None,
'full_prec': 'auto',
'precision': 17,
'user_functions': {},
'human': True,
'allow_unknown_functions': False,
'contract': True,
} # type: Dict[str, Any]
def __init__(self, settings={}):
CodePrinter.__init__(self, settings)
self.known_functions = dict(known_functions)
userfuncs = settings.get('user_functions', {})
self.known_functions.update(userfuncs)
def _rate_index_position(self, p):
return p*5
def _get_statement(self, codestring):
return "%s;" % codestring
def _get_comment(self, text):
return "// {0}".format(text)
def _declare_number_const(self, name, value):
return "var {0} = {1};".format(name, value.evalf(self._settings['precision']))
def _format_code(self, lines):
return self.indent_code(lines)
def _traverse_matrix_indices(self, mat):
rows, cols = mat.shape
return ((i, j) for i in range(rows) for j in range(cols))
def _get_loop_opening_ending(self, indices):
open_lines = []
close_lines = []
loopstart = "for (var %(varble)s=%(start)s; %(varble)s<%(end)s; %(varble)s++){"
for i in indices:
# Javascript arrays start at 0 and end at dimension-1
open_lines.append(loopstart % {
'varble': self._print(i.label),
'start': self._print(i.lower),
'end': self._print(i.upper + 1)})
close_lines.append("}")
return open_lines, close_lines
def _print_Pow(self, expr):
PREC = precedence(expr)
if expr.exp == -1:
return '1/%s' % (self.parenthesize(expr.base, PREC))
elif expr.exp == 0.5:
return 'Math.sqrt(%s)' % self._print(expr.base)
elif expr.exp == S.One/3:
return 'Math.cbrt(%s)' % self._print(expr.base)
else:
return 'Math.pow(%s, %s)' % (self._print(expr.base),
self._print(expr.exp))
def _print_Rational(self, expr):
p, q = int(expr.p), int(expr.q)
return '%d/%d' % (p, q)
def _print_Relational(self, expr):
lhs_code = self._print(expr.lhs)
rhs_code = self._print(expr.rhs)
op = expr.rel_op
return "{0} {1} {2}".format(lhs_code, op, rhs_code)
def _print_Indexed(self, expr):
# calculate index for 1d array
dims = expr.shape
elem = S.Zero
offset = S.One
for i in reversed(range(expr.rank)):
elem += expr.indices[i]*offset
offset *= dims[i]
return "%s[%s]" % (self._print(expr.base.label), self._print(elem))
def _print_Idx(self, expr):
return self._print(expr.label)
def _print_Exp1(self, expr):
return "Math.E"
def _print_Pi(self, expr):
return 'Math.PI'
def _print_Infinity(self, expr):
return 'Number.POSITIVE_INFINITY'
def _print_NegativeInfinity(self, expr):
return 'Number.NEGATIVE_INFINITY'
def _print_Piecewise(self, expr):
if expr.args[-1].cond != True:
# We need the last conditional to be a True, otherwise the resulting
# function may not return a result.
raise ValueError("All Piecewise expressions must contain an "
"(expr, True) statement to be used as a default "
"condition. Without one, the generated "
"expression may not evaluate to anything under "
"some condition.")
lines = []
if expr.has(Assignment):
for i, (e, c) in enumerate(expr.args):
if i == 0:
lines.append("if (%s) {" % self._print(c))
elif i == len(expr.args) - 1 and c == True:
lines.append("else {")
else:
lines.append("else if (%s) {" % self._print(c))
code0 = self._print(e)
lines.append(code0)
lines.append("}")
return "\n".join(lines)
else:
# The piecewise was used in an expression, need to do inline
# operators. This has the downside that inline operators will
# not work for statements that span multiple lines (Matrix or
# Indexed expressions).
ecpairs = ["((%s) ? (\n%s\n)\n" % (self._print(c), self._print(e))
for e, c in expr.args[:-1]]
last_line = ": (\n%s\n)" % self._print(expr.args[-1].expr)
return ": ".join(ecpairs) + last_line + " ".join([")"*len(ecpairs)])
def _print_MatrixElement(self, expr):
return "{0}[{1}]".format(self.parenthesize(expr.parent,
PRECEDENCE["Atom"], strict=True),
expr.j + expr.i*expr.parent.shape[1])
def indent_code(self, code):
"""Accepts a string of code or a list of code lines"""
if isinstance(code, str):
code_lines = self.indent_code(code.splitlines(True))
return ''.join(code_lines)
tab = " "
inc_token = ('{', '(', '{\n', '(\n')
dec_token = ('}', ')')
code = [ line.lstrip(' \t') for line in code ]
increase = [ int(any(map(line.endswith, inc_token))) for line in code ]
decrease = [ int(any(map(line.startswith, dec_token)))
for line in code ]
pretty = []
level = 0
for n, line in enumerate(code):
if line == '' or line == '\n':
pretty.append(line)
continue
level -= decrease[n]
pretty.append("%s%s" % (tab*level, line))
level += increase[n]
return pretty
def jscode(expr, assign_to=None, **settings):
"""Converts an expr to a string of javascript code
Parameters
==========
expr : Expr
A sympy expression to be converted.
assign_to : optional
When given, the argument is used as the name of the variable to which
the expression is assigned. Can be a string, ``Symbol``,
``MatrixSymbol``, or ``Indexed`` type. This is helpful in case of
line-wrapping, or for expressions that generate multi-line statements.
precision : integer, optional
The precision for numbers such as pi [default=15].
user_functions : dict, optional
A dictionary where keys are ``FunctionClass`` instances and values are
their string representations. Alternatively, the dictionary value can
be a list of tuples i.e. [(argument_test, js_function_string)]. See
below for examples.
human : bool, optional
If True, the result is a single string that may contain some constant
declarations for the number symbols. If False, the same information is
returned in a tuple of (symbols_to_declare, not_supported_functions,
code_text). [default=True].
contract: bool, optional
If True, ``Indexed`` instances are assumed to obey tensor contraction
rules and the corresponding nested loops over indices are generated.
Setting contract=False will not generate loops, instead the user is
responsible to provide values for the indices in the code.
[default=True].
Examples
========
>>> from sympy import jscode, symbols, Rational, sin, ceiling, Abs
>>> x, tau = symbols("x, tau")
>>> jscode((2*tau)**Rational(7, 2))
'8*Math.sqrt(2)*Math.pow(tau, 7/2)'
>>> jscode(sin(x), assign_to="s")
's = Math.sin(x);'
Custom printing can be defined for certain types by passing a dictionary of
"type" : "function" to the ``user_functions`` kwarg. Alternatively, the
dictionary value can be a list of tuples i.e. [(argument_test,
js_function_string)].
>>> custom_functions = {
... "ceiling": "CEIL",
... "Abs": [(lambda x: not x.is_integer, "fabs"),
... (lambda x: x.is_integer, "ABS")]
... }
>>> jscode(Abs(x) + ceiling(x), user_functions=custom_functions)
'fabs(x) + CEIL(x)'
``Piecewise`` expressions are converted into conditionals. If an
``assign_to`` variable is provided an if statement is created, otherwise
the ternary operator is used. Note that if the ``Piecewise`` lacks a
default term, represented by ``(expr, True)`` then an error will be thrown.
This is to prevent generating an expression that may not evaluate to
anything.
>>> from sympy import Piecewise
>>> expr = Piecewise((x + 1, x > 0), (x, True))
>>> print(jscode(expr, tau))
if (x > 0) {
tau = x + 1;
}
else {
tau = x;
}
Support for loops is provided through ``Indexed`` types. With
``contract=True`` these expressions will be turned into loops, whereas
``contract=False`` will just print the assignment expression that should be
looped over:
>>> from sympy import Eq, IndexedBase, Idx
>>> len_y = 5
>>> y = IndexedBase('y', shape=(len_y,))
>>> t = IndexedBase('t', shape=(len_y,))
>>> Dy = IndexedBase('Dy', shape=(len_y-1,))
>>> i = Idx('i', len_y-1)
>>> e=Eq(Dy[i], (y[i+1]-y[i])/(t[i+1]-t[i]))
>>> jscode(e.rhs, assign_to=e.lhs, contract=False)
'Dy[i] = (y[i + 1] - y[i])/(t[i + 1] - t[i]);'
Matrices are also supported, but a ``MatrixSymbol`` of the same dimensions
must be provided to ``assign_to``. Note that any expression that can be
generated normally can also exist inside a Matrix:
>>> from sympy import Matrix, MatrixSymbol
>>> mat = Matrix([x**2, Piecewise((x + 1, x > 0), (x, True)), sin(x)])
>>> A = MatrixSymbol('A', 3, 1)
>>> print(jscode(mat, A))
A[0] = Math.pow(x, 2);
if (x > 0) {
A[1] = x + 1;
}
else {
A[1] = x;
}
A[2] = Math.sin(x);
"""
return JavascriptCodePrinter(settings).doprint(expr, assign_to)
def print_jscode(expr, **settings):
"""Prints the Javascript representation of the given expression.
See jscode for the meaning of the optional arguments.
"""
print(jscode(expr, **settings))
|
6ee69b84c54ae0218102bce147e571b075bc8dd3b47fc11ee2615e939130008c | """
A Printer for generating executable code.
The most important function here is srepr that returns a string so that the
relation eval(srepr(expr))=expr holds in an appropriate environment.
"""
from __future__ import print_function, division
from typing import Any, Dict
from sympy.core.function import AppliedUndef
from mpmath.libmp import repr_dps, to_str as mlib_to_str
from .printer import Printer
class ReprPrinter(Printer):
printmethod = "_sympyrepr"
_default_settings = {
"order": None,
"perm_cyclic" : True,
} # type: Dict[str, Any]
def reprify(self, args, sep):
"""
Prints each item in `args` and joins them with `sep`.
"""
return sep.join([self.doprint(item) for item in args])
def emptyPrinter(self, expr):
"""
The fallback printer.
"""
if isinstance(expr, str):
return expr
elif hasattr(expr, "__srepr__"):
return expr.__srepr__()
elif hasattr(expr, "args") and hasattr(expr.args, "__iter__"):
l = []
for o in expr.args:
l.append(self._print(o))
return expr.__class__.__name__ + '(%s)' % ', '.join(l)
elif hasattr(expr, "__module__") and hasattr(expr, "__name__"):
return "<'%s.%s'>" % (expr.__module__, expr.__name__)
else:
return str(expr)
def _print_Add(self, expr, order=None):
args = self._as_ordered_terms(expr, order=order)
nargs = len(args)
args = map(self._print, args)
clsname = type(expr).__name__
if nargs > 255: # Issue #10259, Python < 3.7
return clsname + "(*[%s])" % ", ".join(args)
return clsname + "(%s)" % ", ".join(args)
def _print_Cycle(self, expr):
return expr.__repr__()
def _print_Permutation(self, expr):
from sympy.combinatorics.permutations import Permutation, Cycle
from sympy.utilities.exceptions import SymPyDeprecationWarning
perm_cyclic = Permutation.print_cyclic
if perm_cyclic is not None:
SymPyDeprecationWarning(
feature="Permutation.print_cyclic = {}".format(perm_cyclic),
useinstead="init_printing(perm_cyclic={})"
.format(perm_cyclic),
issue=15201,
deprecated_since_version="1.6").warn()
else:
perm_cyclic = self._settings.get("perm_cyclic", True)
if perm_cyclic:
if not expr.size:
return 'Permutation()'
# before taking Cycle notation, see if the last element is
# a singleton and move it to the head of the string
s = Cycle(expr)(expr.size - 1).__repr__()[len('Cycle'):]
last = s.rfind('(')
if not last == 0 and ',' not in s[last:]:
s = s[last:] + s[:last]
return 'Permutation%s' %s
else:
s = expr.support()
if not s:
if expr.size < 5:
return 'Permutation(%s)' % str(expr.array_form)
return 'Permutation([], size=%s)' % expr.size
trim = str(expr.array_form[:s[-1] + 1]) + ', size=%s' % expr.size
use = full = str(expr.array_form)
if len(trim) < len(full):
use = trim
return 'Permutation(%s)' % use
def _print_Function(self, expr):
r = self._print(expr.func)
r += '(%s)' % ', '.join([self._print(a) for a in expr.args])
return r
def _print_FunctionClass(self, expr):
if issubclass(expr, AppliedUndef):
return 'Function(%r)' % (expr.__name__)
else:
return expr.__name__
def _print_Half(self, expr):
return 'Rational(1, 2)'
def _print_RationalConstant(self, expr):
return str(expr)
def _print_AtomicExpr(self, expr):
return str(expr)
def _print_NumberSymbol(self, expr):
return str(expr)
def _print_Integer(self, expr):
return 'Integer(%i)' % expr.p
def _print_Integers(self, expr):
return 'Integers'
def _print_Naturals(self, expr):
return 'Naturals'
def _print_Naturals0(self, expr):
return 'Naturals0'
def _print_Reals(self, expr):
return 'Reals'
def _print_EmptySet(self, expr):
return 'EmptySet'
def _print_EmptySequence(self, expr):
return 'EmptySequence'
def _print_list(self, expr):
return "[%s]" % self.reprify(expr, ", ")
def _print_MatrixBase(self, expr):
# special case for some empty matrices
if (expr.rows == 0) ^ (expr.cols == 0):
return '%s(%s, %s, %s)' % (expr.__class__.__name__,
self._print(expr.rows),
self._print(expr.cols),
self._print([]))
l = []
for i in range(expr.rows):
l.append([])
for j in range(expr.cols):
l[-1].append(expr[i, j])
return '%s(%s)' % (expr.__class__.__name__, self._print(l))
def _print_MutableSparseMatrix(self, expr):
return self._print_MatrixBase(expr)
def _print_SparseMatrix(self, expr):
return self._print_MatrixBase(expr)
def _print_ImmutableSparseMatrix(self, expr):
return self._print_MatrixBase(expr)
def _print_Matrix(self, expr):
return self._print_MatrixBase(expr)
def _print_DenseMatrix(self, expr):
return self._print_MatrixBase(expr)
def _print_MutableDenseMatrix(self, expr):
return self._print_MatrixBase(expr)
def _print_ImmutableMatrix(self, expr):
return self._print_MatrixBase(expr)
def _print_ImmutableDenseMatrix(self, expr):
return self._print_MatrixBase(expr)
def _print_BooleanTrue(self, expr):
return "true"
def _print_BooleanFalse(self, expr):
return "false"
def _print_NaN(self, expr):
return "nan"
def _print_Mul(self, expr, order=None):
terms = expr.args
if self.order != 'old':
args = expr._new_rawargs(*terms).as_ordered_factors()
else:
args = terms
nargs = len(args)
args = map(self._print, args)
clsname = type(expr).__name__
if nargs > 255: # Issue #10259, Python < 3.7
return clsname + "(*[%s])" % ", ".join(args)
return clsname + "(%s)" % ", ".join(args)
def _print_Rational(self, expr):
return 'Rational(%s, %s)' % (self._print(expr.p), self._print(expr.q))
def _print_PythonRational(self, expr):
return "%s(%d, %d)" % (expr.__class__.__name__, expr.p, expr.q)
def _print_Fraction(self, expr):
return 'Fraction(%s, %s)' % (self._print(expr.numerator), self._print(expr.denominator))
def _print_Float(self, expr):
r = mlib_to_str(expr._mpf_, repr_dps(expr._prec))
return "%s('%s', precision=%i)" % (expr.__class__.__name__, r, expr._prec)
def _print_Sum2(self, expr):
return "Sum2(%s, (%s, %s, %s))" % (self._print(expr.f), self._print(expr.i),
self._print(expr.a), self._print(expr.b))
def _print_Symbol(self, expr):
d = expr._assumptions.generator
# print the dummy_index like it was an assumption
if expr.is_Dummy:
d['dummy_index'] = expr.dummy_index
if d == {}:
return "%s(%s)" % (expr.__class__.__name__, self._print(expr.name))
else:
attr = ['%s=%s' % (k, v) for k, v in d.items()]
return "%s(%s, %s)" % (expr.__class__.__name__,
self._print(expr.name), ', '.join(attr))
def _print_Predicate(self, expr):
return "%s(%s)" % (expr.__class__.__name__, self._print(expr.name))
def _print_AppliedPredicate(self, expr):
return "%s(%s, %s)" % (expr.__class__.__name__, expr.func, expr.arg)
def _print_str(self, expr):
return repr(expr)
def _print_tuple(self, expr):
if len(expr) == 1:
return "(%s,)" % self._print(expr[0])
else:
return "(%s)" % self.reprify(expr, ", ")
def _print_WildFunction(self, expr):
return "%s('%s')" % (expr.__class__.__name__, expr.name)
def _print_AlgebraicNumber(self, expr):
return "%s(%s, %s)" % (expr.__class__.__name__,
self._print(expr.root), self._print(expr.coeffs()))
def _print_PolyRing(self, ring):
return "%s(%s, %s, %s)" % (ring.__class__.__name__,
self._print(ring.symbols), self._print(ring.domain), self._print(ring.order))
def _print_FracField(self, field):
return "%s(%s, %s, %s)" % (field.__class__.__name__,
self._print(field.symbols), self._print(field.domain), self._print(field.order))
def _print_PolyElement(self, poly):
terms = list(poly.terms())
terms.sort(key=poly.ring.order, reverse=True)
return "%s(%s, %s)" % (poly.__class__.__name__, self._print(poly.ring), self._print(terms))
def _print_FracElement(self, frac):
numer_terms = list(frac.numer.terms())
numer_terms.sort(key=frac.field.order, reverse=True)
denom_terms = list(frac.denom.terms())
denom_terms.sort(key=frac.field.order, reverse=True)
numer = self._print(numer_terms)
denom = self._print(denom_terms)
return "%s(%s, %s, %s)" % (frac.__class__.__name__, self._print(frac.field), numer, denom)
def _print_FractionField(self, domain):
cls = domain.__class__.__name__
field = self._print(domain.field)
return "%s(%s)" % (cls, field)
def _print_PolynomialRingBase(self, ring):
cls = ring.__class__.__name__
dom = self._print(ring.domain)
gens = ', '.join(map(self._print, ring.gens))
order = str(ring.order)
if order != ring.default_order:
orderstr = ", order=" + order
else:
orderstr = ""
return "%s(%s, %s%s)" % (cls, dom, gens, orderstr)
def _print_DMP(self, p):
cls = p.__class__.__name__
rep = self._print(p.rep)
dom = self._print(p.dom)
if p.ring is not None:
ringstr = ", ring=" + self._print(p.ring)
else:
ringstr = ""
return "%s(%s, %s%s)" % (cls, rep, dom, ringstr)
def _print_MonogenicFiniteExtension(self, ext):
# The expanded tree shown by srepr(ext.modulus)
# is not practical.
return "FiniteExtension(%s)" % str(ext.modulus)
def _print_ExtensionElement(self, f):
rep = self._print(f.rep)
ext = self._print(f.ext)
return "ExtElem(%s, %s)" % (rep, ext)
def srepr(expr, **settings):
"""return expr in repr form"""
return ReprPrinter(settings).doprint(expr)
|
ff1ce7aad9f35245fa8a9c8a0433d847d2010e99e73170646688f13d021cb44a | """
Julia code printer
The `JuliaCodePrinter` converts SymPy expressions into Julia expressions.
A complete code generator, which uses `julia_code` extensively, can be found
in `sympy.utilities.codegen`. The `codegen` module can be used to generate
complete source code files.
"""
from __future__ import print_function, division
from typing import Any, Dict
from sympy.core import Mul, Pow, S, Rational
from sympy.core.mul import _keep_coeff
from sympy.printing.codeprinter import CodePrinter, Assignment
from sympy.printing.precedence import precedence, PRECEDENCE
from re import search
# List of known functions. First, those that have the same name in
# SymPy and Julia. This is almost certainly incomplete!
known_fcns_src1 = ["sin", "cos", "tan", "cot", "sec", "csc",
"asin", "acos", "atan", "acot", "asec", "acsc",
"sinh", "cosh", "tanh", "coth", "sech", "csch",
"asinh", "acosh", "atanh", "acoth", "asech", "acsch",
"sinc", "atan2", "sign", "floor", "log", "exp",
"cbrt", "sqrt", "erf", "erfc", "erfi",
"factorial", "gamma", "digamma", "trigamma",
"polygamma", "beta",
"airyai", "airyaiprime", "airybi", "airybiprime",
"besselj", "bessely", "besseli", "besselk",
"erfinv", "erfcinv"]
# These functions have different names ("Sympy": "Julia"), more
# generally a mapping to (argument_conditions, julia_function).
known_fcns_src2 = {
"Abs": "abs",
"ceiling": "ceil",
"conjugate": "conj",
"hankel1": "hankelh1",
"hankel2": "hankelh2",
"im": "imag",
"re": "real"
}
class JuliaCodePrinter(CodePrinter):
"""
A printer to convert expressions to strings of Julia code.
"""
printmethod = "_julia"
language = "Julia"
_operators = {
'and': '&&',
'or': '||',
'not': '!',
}
_default_settings = {
'order': None,
'full_prec': 'auto',
'precision': 17,
'user_functions': {},
'human': True,
'allow_unknown_functions': False,
'contract': True,
'inline': True,
} # type: Dict[str, Any]
# Note: contract is for expressing tensors as loops (if True), or just
# assignment (if False). FIXME: this should be looked a more carefully
# for Julia.
def __init__(self, settings={}):
super(JuliaCodePrinter, self).__init__(settings)
self.known_functions = dict(zip(known_fcns_src1, known_fcns_src1))
self.known_functions.update(dict(known_fcns_src2))
userfuncs = settings.get('user_functions', {})
self.known_functions.update(userfuncs)
def _rate_index_position(self, p):
return p*5
def _get_statement(self, codestring):
return "%s" % codestring
def _get_comment(self, text):
return "# {0}".format(text)
def _declare_number_const(self, name, value):
return "const {0} = {1}".format(name, value)
def _format_code(self, lines):
return self.indent_code(lines)
def _traverse_matrix_indices(self, mat):
# Julia uses Fortran order (column-major)
rows, cols = mat.shape
return ((i, j) for j in range(cols) for i in range(rows))
def _get_loop_opening_ending(self, indices):
open_lines = []
close_lines = []
for i in indices:
# Julia arrays start at 1 and end at dimension
var, start, stop = map(self._print,
[i.label, i.lower + 1, i.upper + 1])
open_lines.append("for %s = %s:%s" % (var, start, stop))
close_lines.append("end")
return open_lines, close_lines
def _print_Mul(self, expr):
# print complex numbers nicely in Julia
if (expr.is_number and expr.is_imaginary and
expr.as_coeff_Mul()[0].is_integer):
return "%sim" % self._print(-S.ImaginaryUnit*expr)
# cribbed from str.py
prec = precedence(expr)
c, e = expr.as_coeff_Mul()
if c < 0:
expr = _keep_coeff(-c, e)
sign = "-"
else:
sign = ""
a = [] # items in the numerator
b = [] # items that are in the denominator (if any)
pow_paren = [] # Will collect all pow with more than one base element and exp = -1
if self.order not in ('old', 'none'):
args = expr.as_ordered_factors()
else:
# use make_args in case expr was something like -x -> x
args = Mul.make_args(expr)
# Gather args for numerator/denominator
for item in args:
if (item.is_commutative and item.is_Pow and item.exp.is_Rational
and item.exp.is_negative):
if item.exp != -1:
b.append(Pow(item.base, -item.exp, evaluate=False))
else:
if len(item.args[0].args) != 1 and isinstance(item.base, Mul): # To avoid situations like #14160
pow_paren.append(item)
b.append(Pow(item.base, -item.exp))
elif item.is_Rational and item is not S.Infinity:
if item.p != 1:
a.append(Rational(item.p))
if item.q != 1:
b.append(Rational(item.q))
else:
a.append(item)
a = a or [S.One]
a_str = [self.parenthesize(x, prec) for x in a]
b_str = [self.parenthesize(x, prec) for x in b]
# To parenthesize Pow with exp = -1 and having more than one Symbol
for item in pow_paren:
if item.base in b:
b_str[b.index(item.base)] = "(%s)" % b_str[b.index(item.base)]
# from here it differs from str.py to deal with "*" and ".*"
def multjoin(a, a_str):
# here we probably are assuming the constants will come first
r = a_str[0]
for i in range(1, len(a)):
mulsym = '*' if a[i-1].is_number else '.*'
r = r + mulsym + a_str[i]
return r
if not b:
return sign + multjoin(a, a_str)
elif len(b) == 1:
divsym = '/' if b[0].is_number else './'
return sign + multjoin(a, a_str) + divsym + b_str[0]
else:
divsym = '/' if all([bi.is_number for bi in b]) else './'
return (sign + multjoin(a, a_str) +
divsym + "(%s)" % multjoin(b, b_str))
def _print_Relational(self, expr):
lhs_code = self._print(expr.lhs)
rhs_code = self._print(expr.rhs)
op = expr.rel_op
return "{0} {1} {2}".format(lhs_code, op, rhs_code)
def _print_Pow(self, expr):
powsymbol = '^' if all([x.is_number for x in expr.args]) else '.^'
PREC = precedence(expr)
if expr.exp == S.Half:
return "sqrt(%s)" % self._print(expr.base)
if expr.is_commutative:
if expr.exp == -S.Half:
sym = '/' if expr.base.is_number else './'
return "1" + sym + "sqrt(%s)" % self._print(expr.base)
if expr.exp == -S.One:
sym = '/' if expr.base.is_number else './'
return "1" + sym + "%s" % self.parenthesize(expr.base, PREC)
return '%s%s%s' % (self.parenthesize(expr.base, PREC), powsymbol,
self.parenthesize(expr.exp, PREC))
def _print_MatPow(self, expr):
PREC = precedence(expr)
return '%s^%s' % (self.parenthesize(expr.base, PREC),
self.parenthesize(expr.exp, PREC))
def _print_Pi(self, expr):
if self._settings["inline"]:
return "pi"
else:
return super(JuliaCodePrinter, self)._print_NumberSymbol(expr)
def _print_ImaginaryUnit(self, expr):
return "im"
def _print_Exp1(self, expr):
if self._settings["inline"]:
return "e"
else:
return super(JuliaCodePrinter, self)._print_NumberSymbol(expr)
def _print_EulerGamma(self, expr):
if self._settings["inline"]:
return "eulergamma"
else:
return super(JuliaCodePrinter, self)._print_NumberSymbol(expr)
def _print_Catalan(self, expr):
if self._settings["inline"]:
return "catalan"
else:
return super(JuliaCodePrinter, self)._print_NumberSymbol(expr)
def _print_GoldenRatio(self, expr):
if self._settings["inline"]:
return "golden"
else:
return super(JuliaCodePrinter, self)._print_NumberSymbol(expr)
def _print_Assignment(self, expr):
from sympy.functions.elementary.piecewise import Piecewise
from sympy.tensor.indexed import IndexedBase
# Copied from codeprinter, but remove special MatrixSymbol treatment
lhs = expr.lhs
rhs = expr.rhs
# We special case assignments that take multiple lines
if not self._settings["inline"] and isinstance(expr.rhs, Piecewise):
# Here we modify Piecewise so each expression is now
# an Assignment, and then continue on the print.
expressions = []
conditions = []
for (e, c) in rhs.args:
expressions.append(Assignment(lhs, e))
conditions.append(c)
temp = Piecewise(*zip(expressions, conditions))
return self._print(temp)
if self._settings["contract"] and (lhs.has(IndexedBase) or
rhs.has(IndexedBase)):
# Here we check if there is looping to be done, and if so
# print the required loops.
return self._doprint_loops(rhs, lhs)
else:
lhs_code = self._print(lhs)
rhs_code = self._print(rhs)
return self._get_statement("%s = %s" % (lhs_code, rhs_code))
def _print_Infinity(self, expr):
return 'Inf'
def _print_NegativeInfinity(self, expr):
return '-Inf'
def _print_NaN(self, expr):
return 'NaN'
def _print_list(self, expr):
return 'Any[' + ', '.join(self._print(a) for a in expr) + ']'
def _print_tuple(self, expr):
if len(expr) == 1:
return "(%s,)" % self._print(expr[0])
else:
return "(%s)" % self.stringify(expr, ", ")
_print_Tuple = _print_tuple
def _print_BooleanTrue(self, expr):
return "true"
def _print_BooleanFalse(self, expr):
return "false"
def _print_bool(self, expr):
return str(expr).lower()
# Could generate quadrature code for definite Integrals?
#_print_Integral = _print_not_supported
def _print_MatrixBase(self, A):
# Handle zero dimensions:
if A.rows == 0 or A.cols == 0:
return 'zeros(%s, %s)' % (A.rows, A.cols)
elif (A.rows, A.cols) == (1, 1):
return "[%s]" % A[0, 0]
elif A.rows == 1:
return "[%s]" % A.table(self, rowstart='', rowend='', colsep=' ')
elif A.cols == 1:
# note .table would unnecessarily equispace the rows
return "[%s]" % ", ".join([self._print(a) for a in A])
return "[%s]" % A.table(self, rowstart='', rowend='',
rowsep=';\n', colsep=' ')
def _print_SparseMatrix(self, A):
from sympy.matrices import Matrix
L = A.col_list();
# make row vectors of the indices and entries
I = Matrix([k[0] + 1 for k in L])
J = Matrix([k[1] + 1 for k in L])
AIJ = Matrix([k[2] for k in L])
return "sparse(%s, %s, %s, %s, %s)" % (self._print(I), self._print(J),
self._print(AIJ), A.rows, A.cols)
# FIXME: Str/CodePrinter could define each of these to call the _print
# method from higher up the class hierarchy (see _print_NumberSymbol).
# Then subclasses like us would not need to repeat all this.
_print_Matrix = \
_print_DenseMatrix = \
_print_MutableDenseMatrix = \
_print_ImmutableMatrix = \
_print_ImmutableDenseMatrix = \
_print_MatrixBase
_print_MutableSparseMatrix = \
_print_ImmutableSparseMatrix = \
_print_SparseMatrix
def _print_MatrixElement(self, expr):
return self.parenthesize(expr.parent, PRECEDENCE["Atom"], strict=True) \
+ '[%s,%s]' % (expr.i + 1, expr.j + 1)
def _print_MatrixSlice(self, expr):
def strslice(x, lim):
l = x[0] + 1
h = x[1]
step = x[2]
lstr = self._print(l)
hstr = 'end' if h == lim else self._print(h)
if step == 1:
if l == 1 and h == lim:
return ':'
if l == h:
return lstr
else:
return lstr + ':' + hstr
else:
return ':'.join((lstr, self._print(step), hstr))
return (self._print(expr.parent) + '[' +
strslice(expr.rowslice, expr.parent.shape[0]) + ',' +
strslice(expr.colslice, expr.parent.shape[1]) + ']')
def _print_Indexed(self, expr):
inds = [ self._print(i) for i in expr.indices ]
return "%s[%s]" % (self._print(expr.base.label), ",".join(inds))
def _print_Idx(self, expr):
return self._print(expr.label)
def _print_Identity(self, expr):
return "eye(%s)" % self._print(expr.shape[0])
def _print_HadamardProduct(self, expr):
return '.*'.join([self.parenthesize(arg, precedence(expr))
for arg in expr.args])
def _print_HadamardPower(self, expr):
PREC = precedence(expr)
return '.**'.join([
self.parenthesize(expr.base, PREC),
self.parenthesize(expr.exp, PREC)
])
# Note: as of 2015, Julia doesn't have spherical Bessel functions
def _print_jn(self, expr):
from sympy.functions import sqrt, besselj
x = expr.argument
expr2 = sqrt(S.Pi/(2*x))*besselj(expr.order + S.Half, x)
return self._print(expr2)
def _print_yn(self, expr):
from sympy.functions import sqrt, bessely
x = expr.argument
expr2 = sqrt(S.Pi/(2*x))*bessely(expr.order + S.Half, x)
return self._print(expr2)
def _print_Piecewise(self, expr):
if expr.args[-1].cond != True:
# We need the last conditional to be a True, otherwise the resulting
# function may not return a result.
raise ValueError("All Piecewise expressions must contain an "
"(expr, True) statement to be used as a default "
"condition. Without one, the generated "
"expression may not evaluate to anything under "
"some condition.")
lines = []
if self._settings["inline"]:
# Express each (cond, expr) pair in a nested Horner form:
# (condition) .* (expr) + (not cond) .* (<others>)
# Expressions that result in multiple statements won't work here.
ecpairs = ["({0}) ? ({1}) :".format
(self._print(c), self._print(e))
for e, c in expr.args[:-1]]
elast = " (%s)" % self._print(expr.args[-1].expr)
pw = "\n".join(ecpairs) + elast
# Note: current need these outer brackets for 2*pw. Would be
# nicer to teach parenthesize() to do this for us when needed!
return "(" + pw + ")"
else:
for i, (e, c) in enumerate(expr.args):
if i == 0:
lines.append("if (%s)" % self._print(c))
elif i == len(expr.args) - 1 and c == True:
lines.append("else")
else:
lines.append("elseif (%s)" % self._print(c))
code0 = self._print(e)
lines.append(code0)
if i == len(expr.args) - 1:
lines.append("end")
return "\n".join(lines)
def indent_code(self, code):
"""Accepts a string of code or a list of code lines"""
# code mostly copied from ccode
if isinstance(code, str):
code_lines = self.indent_code(code.splitlines(True))
return ''.join(code_lines)
tab = " "
inc_regex = ('^function ', '^if ', '^elseif ', '^else$', '^for ')
dec_regex = ('^end$', '^elseif ', '^else$')
# pre-strip left-space from the code
code = [ line.lstrip(' \t') for line in code ]
increase = [ int(any([search(re, line) for re in inc_regex]))
for line in code ]
decrease = [ int(any([search(re, line) for re in dec_regex]))
for line in code ]
pretty = []
level = 0
for n, line in enumerate(code):
if line == '' or line == '\n':
pretty.append(line)
continue
level -= decrease[n]
pretty.append("%s%s" % (tab*level, line))
level += increase[n]
return pretty
def julia_code(expr, assign_to=None, **settings):
r"""Converts `expr` to a string of Julia code.
Parameters
==========
expr : Expr
A sympy expression to be converted.
assign_to : optional
When given, the argument is used as the name of the variable to which
the expression is assigned. Can be a string, ``Symbol``,
``MatrixSymbol``, or ``Indexed`` type. This can be helpful for
expressions that generate multi-line statements.
precision : integer, optional
The precision for numbers such as pi [default=16].
user_functions : dict, optional
A dictionary where keys are ``FunctionClass`` instances and values are
their string representations. Alternatively, the dictionary value can
be a list of tuples i.e. [(argument_test, cfunction_string)]. See
below for examples.
human : bool, optional
If True, the result is a single string that may contain some constant
declarations for the number symbols. If False, the same information is
returned in a tuple of (symbols_to_declare, not_supported_functions,
code_text). [default=True].
contract: bool, optional
If True, ``Indexed`` instances are assumed to obey tensor contraction
rules and the corresponding nested loops over indices are generated.
Setting contract=False will not generate loops, instead the user is
responsible to provide values for the indices in the code.
[default=True].
inline: bool, optional
If True, we try to create single-statement code instead of multiple
statements. [default=True].
Examples
========
>>> from sympy import julia_code, symbols, sin, pi
>>> x = symbols('x')
>>> julia_code(sin(x).series(x).removeO())
'x.^5/120 - x.^3/6 + x'
>>> from sympy import Rational, ceiling, Abs
>>> x, y, tau = symbols("x, y, tau")
>>> julia_code((2*tau)**Rational(7, 2))
'8*sqrt(2)*tau.^(7/2)'
Note that element-wise (Hadamard) operations are used by default between
symbols. This is because its possible in Julia to write "vectorized"
code. It is harmless if the values are scalars.
>>> julia_code(sin(pi*x*y), assign_to="s")
's = sin(pi*x.*y)'
If you need a matrix product "*" or matrix power "^", you can specify the
symbol as a ``MatrixSymbol``.
>>> from sympy import Symbol, MatrixSymbol
>>> n = Symbol('n', integer=True, positive=True)
>>> A = MatrixSymbol('A', n, n)
>>> julia_code(3*pi*A**3)
'(3*pi)*A^3'
This class uses several rules to decide which symbol to use a product.
Pure numbers use "*", Symbols use ".*" and MatrixSymbols use "*".
A HadamardProduct can be used to specify componentwise multiplication ".*"
of two MatrixSymbols. There is currently there is no easy way to specify
scalar symbols, so sometimes the code might have some minor cosmetic
issues. For example, suppose x and y are scalars and A is a Matrix, then
while a human programmer might write "(x^2*y)*A^3", we generate:
>>> julia_code(x**2*y*A**3)
'(x.^2.*y)*A^3'
Matrices are supported using Julia inline notation. When using
``assign_to`` with matrices, the name can be specified either as a string
or as a ``MatrixSymbol``. The dimensions must align in the latter case.
>>> from sympy import Matrix, MatrixSymbol
>>> mat = Matrix([[x**2, sin(x), ceiling(x)]])
>>> julia_code(mat, assign_to='A')
'A = [x.^2 sin(x) ceil(x)]'
``Piecewise`` expressions are implemented with logical masking by default.
Alternatively, you can pass "inline=False" to use if-else conditionals.
Note that if the ``Piecewise`` lacks a default term, represented by
``(expr, True)`` then an error will be thrown. This is to prevent
generating an expression that may not evaluate to anything.
>>> from sympy import Piecewise
>>> pw = Piecewise((x + 1, x > 0), (x, True))
>>> julia_code(pw, assign_to=tau)
'tau = ((x > 0) ? (x + 1) : (x))'
Note that any expression that can be generated normally can also exist
inside a Matrix:
>>> mat = Matrix([[x**2, pw, sin(x)]])
>>> julia_code(mat, assign_to='A')
'A = [x.^2 ((x > 0) ? (x + 1) : (x)) sin(x)]'
Custom printing can be defined for certain types by passing a dictionary of
"type" : "function" to the ``user_functions`` kwarg. Alternatively, the
dictionary value can be a list of tuples i.e., [(argument_test,
cfunction_string)]. This can be used to call a custom Julia function.
>>> from sympy import Function
>>> f = Function('f')
>>> g = Function('g')
>>> custom_functions = {
... "f": "existing_julia_fcn",
... "g": [(lambda x: x.is_Matrix, "my_mat_fcn"),
... (lambda x: not x.is_Matrix, "my_fcn")]
... }
>>> mat = Matrix([[1, x]])
>>> julia_code(f(x) + g(x) + g(mat), user_functions=custom_functions)
'existing_julia_fcn(x) + my_fcn(x) + my_mat_fcn([1 x])'
Support for loops is provided through ``Indexed`` types. With
``contract=True`` these expressions will be turned into loops, whereas
``contract=False`` will just print the assignment expression that should be
looped over:
>>> from sympy import Eq, IndexedBase, Idx, ccode
>>> len_y = 5
>>> y = IndexedBase('y', shape=(len_y,))
>>> t = IndexedBase('t', shape=(len_y,))
>>> Dy = IndexedBase('Dy', shape=(len_y-1,))
>>> i = Idx('i', len_y-1)
>>> e = Eq(Dy[i], (y[i+1]-y[i])/(t[i+1]-t[i]))
>>> julia_code(e.rhs, assign_to=e.lhs, contract=False)
'Dy[i] = (y[i + 1] - y[i])./(t[i + 1] - t[i])'
"""
return JuliaCodePrinter(settings).doprint(expr, assign_to)
def print_julia_code(expr, **settings):
"""Prints the Julia representation of the given expression.
See `julia_code` for the meaning of the optional arguments.
"""
print(julia_code(expr, **settings))
|
f4edb5b72f8aaca3a8c36cb013b656c5c40d8b0d27fa20f9793595fad858045d | from typing import Set
from sympy.codegen.ast import Assignment
from sympy.core import Basic, S
from sympy.core.function import _coeff_isneg, Lambda
from sympy.printing.codeprinter import CodePrinter
from sympy.printing.precedence import precedence
from functools import reduce
known_functions = {
'Abs': 'abs',
'sin': 'sin',
'cos': 'cos',
'tan': 'tan',
'acos': 'acos',
'asin': 'asin',
'atan': 'atan',
'atan2': 'atan',
'ceiling': 'ceil',
'floor': 'floor',
'sign': 'sign',
'exp': 'exp',
'log': 'log',
'add': 'add',
'sub': 'sub',
'mul': 'mul',
'pow': 'pow'
}
class GLSLPrinter(CodePrinter):
"""
Rudimentary, generic GLSL printing tools.
Additional settings:
'use_operators': Boolean (should the printer use operators for +,-,*, or functions?)
"""
_not_supported = set() # type: Set[Basic]
printmethod = "_glsl"
language = "GLSL"
_default_settings = {
'use_operators': True,
'mat_nested': False,
'mat_separator': ',\n',
'mat_transpose': False,
'glsl_types': True,
'order': None,
'full_prec': 'auto',
'precision': 9,
'user_functions': {},
'human': True,
'allow_unknown_functions': False,
'contract': True,
'error_on_reserved': False,
'reserved_word_suffix': '_',
}
def __init__(self, settings={}):
CodePrinter.__init__(self, settings)
self.known_functions = dict(known_functions)
userfuncs = settings.get('user_functions', {})
self.known_functions.update(userfuncs)
def _rate_index_position(self, p):
return p*5
def _get_statement(self, codestring):
return "%s;" % codestring
def _get_comment(self, text):
return "// {0}".format(text)
def _declare_number_const(self, name, value):
return "float {0} = {1};".format(name, value)
def _format_code(self, lines):
return self.indent_code(lines)
def indent_code(self, code):
"""Accepts a string of code or a list of code lines"""
if isinstance(code, str):
code_lines = self.indent_code(code.splitlines(True))
return ''.join(code_lines)
tab = " "
inc_token = ('{', '(', '{\n', '(\n')
dec_token = ('}', ')')
code = [line.lstrip(' \t') for line in code]
increase = [int(any(map(line.endswith, inc_token))) for line in code]
decrease = [int(any(map(line.startswith, dec_token))) for line in code]
pretty = []
level = 0
for n, line in enumerate(code):
if line == '' or line == '\n':
pretty.append(line)
continue
level -= decrease[n]
pretty.append("%s%s" % (tab*level, line))
level += increase[n]
return pretty
def _print_MatrixBase(self, mat):
mat_separator = self._settings['mat_separator']
mat_transpose = self._settings['mat_transpose']
glsl_types = self._settings['glsl_types']
column_vector = (mat.rows == 1) if mat_transpose else (mat.cols == 1)
A = mat.transpose() if mat_transpose != column_vector else mat
if A.cols == 1:
return self._print(A[0]);
if A.rows <= 4 and A.cols <= 4 and glsl_types:
if A.rows == 1:
return 'vec%s%s' % (A.cols, A.table(self,rowstart='(',rowend=')'))
elif A.rows == A.cols:
return 'mat%s(%s)' % (A.rows, A.table(self,rowsep=', ',
rowstart='',rowend=''))
else:
return 'mat%sx%s(%s)' % (A.cols, A.rows,
A.table(self,rowsep=', ',
rowstart='',rowend=''))
elif A.cols == 1 or A.rows == 1:
return 'float[%s](%s)' % (A.cols*A.rows, A.table(self,rowsep=mat_separator,rowstart='',rowend=''))
elif not self._settings['mat_nested']:
return 'float[%s](\n%s\n) /* a %sx%s matrix */' % (A.cols*A.rows,
A.table(self,rowsep=mat_separator,rowstart='',rowend=''),
A.rows,A.cols)
elif self._settings['mat_nested']:
return 'float[%s][%s](\n%s\n)' % (A.rows,A.cols,A.table(self,rowsep=mat_separator,rowstart='float[](',rowend=')'))
_print_Matrix = \
_print_DenseMatrix = \
_print_MutableDenseMatrix = \
_print_ImmutableMatrix = \
_print_ImmutableDenseMatrix = \
_print_MatrixBase
def _traverse_matrix_indices(self, mat):
mat_transpose = self._settings['mat_transpose']
if mat_transpose:
rows,cols = mat.shape
else:
cols,rows = mat.shape
return ((i, j) for i in range(cols) for j in range(rows))
def _print_MatrixElement(self, expr):
# print('begin _print_MatrixElement')
nest = self._settings['mat_nested'];
glsl_types = self._settings['glsl_types'];
mat_transpose = self._settings['mat_transpose'];
if mat_transpose:
cols,rows = expr.parent.shape
i,j = expr.j,expr.i
else:
rows,cols = expr.parent.shape
i,j = expr.i,expr.j
pnt = self._print(expr.parent)
if glsl_types and ((rows <= 4 and cols <=4) or nest):
# print('end _print_MatrixElement case A',nest,glsl_types)
return "%s[%s][%s]" % (pnt, i, j)
else:
# print('end _print_MatrixElement case B',nest,glsl_types)
return "{0}[{1}]".format(pnt, i + j*rows)
def _print_list(self, expr):
l = ', '.join(self._print(item) for item in expr)
glsl_types = self._settings['glsl_types']
if len(expr) <= 4 and glsl_types:
return 'vec%s(%s)' % (len(expr),l)
else:
return 'float[%s](%s)' % (len(expr),l)
_print_tuple = _print_list
_print_Tuple = _print_list
def _get_loop_opening_ending(self, indices):
open_lines = []
close_lines = []
loopstart = "for (int %(varble)s=%(start)s; %(varble)s<%(end)s; %(varble)s++){"
for i in indices:
# GLSL arrays start at 0 and end at dimension-1
open_lines.append(loopstart % {
'varble': self._print(i.label),
'start': self._print(i.lower),
'end': self._print(i.upper + 1)})
close_lines.append("}")
return open_lines, close_lines
def _print_Function_with_args(self, func, func_args):
if func in self.known_functions:
cond_func = self.known_functions[func]
func = None
if isinstance(cond_func, str):
func = cond_func
else:
for cond, func in cond_func:
if cond(func_args):
break
if func is not None:
try:
return func(*[self.parenthesize(item, 0) for item in func_args])
except TypeError:
return "%s(%s)" % (func, self.stringify(func_args, ", "))
elif isinstance(func, Lambda):
# inlined function
return self._print(func(*func_args))
else:
return self._print_not_supported(func)
def _print_Piecewise(self, expr):
if expr.args[-1].cond != True:
# We need the last conditional to be a True, otherwise the resulting
# function may not return a result.
raise ValueError("All Piecewise expressions must contain an "
"(expr, True) statement to be used as a default "
"condition. Without one, the generated "
"expression may not evaluate to anything under "
"some condition.")
lines = []
if expr.has(Assignment):
for i, (e, c) in enumerate(expr.args):
if i == 0:
lines.append("if (%s) {" % self._print(c))
elif i == len(expr.args) - 1 and c == True:
lines.append("else {")
else:
lines.append("else if (%s) {" % self._print(c))
code0 = self._print(e)
lines.append(code0)
lines.append("}")
return "\n".join(lines)
else:
# The piecewise was used in an expression, need to do inline
# operators. This has the downside that inline operators will
# not work for statements that span multiple lines (Matrix or
# Indexed expressions).
ecpairs = ["((%s) ? (\n%s\n)\n" % (self._print(c),
self._print(e))
for e, c in expr.args[:-1]]
last_line = ": (\n%s\n)" % self._print(expr.args[-1].expr)
return ": ".join(ecpairs) + last_line + " ".join([")"*len(ecpairs)])
def _print_Idx(self, expr):
return self._print(expr.label)
def _print_Indexed(self, expr):
# calculate index for 1d array
dims = expr.shape
elem = S.Zero
offset = S.One
for i in reversed(range(expr.rank)):
elem += expr.indices[i]*offset
offset *= dims[i]
return "%s[%s]" % (self._print(expr.base.label),
self._print(elem))
def _print_Pow(self, expr):
PREC = precedence(expr)
if expr.exp == -1:
return '1.0/%s' % (self.parenthesize(expr.base, PREC))
elif expr.exp == 0.5:
return 'sqrt(%s)' % self._print(expr.base)
else:
try:
e = self._print(float(expr.exp))
except TypeError:
e = self._print(expr.exp)
# return self.known_functions['pow']+'(%s, %s)' % (self._print(expr.base),e)
return self._print_Function_with_args('pow', (
self._print(expr.base),
e
))
def _print_int(self, expr):
return str(float(expr))
def _print_Rational(self, expr):
return "%s.0/%s.0" % (expr.p, expr.q)
def _print_Relational(self, expr):
lhs_code = self._print(expr.lhs)
rhs_code = self._print(expr.rhs)
op = expr.rel_op
return "{0} {1} {2}".format(lhs_code, op, rhs_code)
def _print_Add(self, expr, order=None):
if self._settings['use_operators']:
return CodePrinter._print_Add(self, expr, order=order)
terms = expr.as_ordered_terms()
def partition(p,l):
return reduce(lambda x, y: (x[0]+[y], x[1]) if p(y) else (x[0], x[1]+[y]), l, ([], []))
def add(a,b):
return self._print_Function_with_args('add', (a, b))
# return self.known_functions['add']+'(%s, %s)' % (a,b)
neg, pos = partition(lambda arg: _coeff_isneg(arg), terms)
s = pos = reduce(lambda a,b: add(a,b), map(lambda t: self._print(t),pos))
if neg:
# sum the absolute values of the negative terms
neg = reduce(lambda a,b: add(a,b), map(lambda n: self._print(-n),neg))
# then subtract them from the positive terms
s = self._print_Function_with_args('sub', (pos,neg))
# s = self.known_functions['sub']+'(%s, %s)' % (pos,neg)
return s
def _print_Mul(self, expr, **kwargs):
if self._settings['use_operators']:
return CodePrinter._print_Mul(self, expr, **kwargs)
terms = expr.as_ordered_factors()
def mul(a,b):
# return self.known_functions['mul']+'(%s, %s)' % (a,b)
return self._print_Function_with_args('mul', (a,b))
s = reduce(lambda a,b: mul(a,b), map(lambda t: self._print(t), terms))
return s
def glsl_code(expr,assign_to=None,**settings):
"""Converts an expr to a string of GLSL code
Parameters
==========
expr : Expr
A sympy expression to be converted.
assign_to : optional
When given, the argument is used as the name of the variable to which
the expression is assigned. Can be a string, ``Symbol``,
``MatrixSymbol``, or ``Indexed`` type. This is helpful in case of
line-wrapping, or for expressions that generate multi-line statements.
use_operators: bool, optional
If set to False, then *,/,+,- operators will be replaced with functions
mul, add, and sub, which must be implemented by the user, e.g. for
implementing non-standard rings or emulated quad/octal precision.
[default=True]
glsl_types: bool, optional
Set this argument to ``False`` in order to avoid using the ``vec`` and ``mat``
types. The printer will instead use arrays (or nested arrays).
[default=True]
mat_nested: bool, optional
GLSL version 4.3 and above support nested arrays (arrays of arrays). Set this to ``True``
to render matrices as nested arrays.
[default=False]
mat_separator: str, optional
By default, matrices are rendered with newlines using this separator,
making them easier to read, but less compact. By removing the newline
this option can be used to make them more vertically compact.
[default=',\n']
mat_transpose: bool, optional
GLSL's matrix multiplication implementation assumes column-major indexing.
By default, this printer ignores that convention. Setting this option to
``True`` transposes all matrix output.
[default=False]
precision : integer, optional
The precision for numbers such as pi [default=15].
user_functions : dict, optional
A dictionary where keys are ``FunctionClass`` instances and values are
their string representations. Alternatively, the dictionary value can
be a list of tuples i.e. [(argument_test, js_function_string)]. See
below for examples.
human : bool, optional
If True, the result is a single string that may contain some constant
declarations for the number symbols. If False, the same information is
returned in a tuple of (symbols_to_declare, not_supported_functions,
code_text). [default=True].
contract: bool, optional
If True, ``Indexed`` instances are assumed to obey tensor contraction
rules and the corresponding nested loops over indices are generated.
Setting contract=False will not generate loops, instead the user is
responsible to provide values for the indices in the code.
[default=True].
Examples
========
>>> from sympy import glsl_code, symbols, Rational, sin, ceiling, Abs
>>> x, tau = symbols("x, tau")
>>> glsl_code((2*tau)**Rational(7, 2))
'8*sqrt(2)*pow(tau, 3.5)'
>>> glsl_code(sin(x), assign_to="float y")
'float y = sin(x);'
Various GLSL types are supported:
>>> from sympy import Matrix, glsl_code
>>> glsl_code(Matrix([1,2,3]))
'vec3(1, 2, 3)'
>>> glsl_code(Matrix([[1, 2],[3, 4]]))
'mat2(1, 2, 3, 4)'
Pass ``mat_transpose = True`` to switch to column-major indexing:
>>> glsl_code(Matrix([[1, 2],[3, 4]]), mat_transpose = True)
'mat2(1, 3, 2, 4)'
By default, larger matrices get collapsed into float arrays:
>>> print(glsl_code( Matrix([[1,2,3,4,5],[6,7,8,9,10]]) ))
float[10](
1, 2, 3, 4, 5,
6, 7, 8, 9, 10
) /* a 2x5 matrix */
Passing ``mat_nested = True`` instead prints out nested float arrays, which are
supported in GLSL 4.3 and above.
>>> mat = Matrix([
... [ 0, 1, 2],
... [ 3, 4, 5],
... [ 6, 7, 8],
... [ 9, 10, 11],
... [12, 13, 14]])
>>> print(glsl_code( mat, mat_nested = True ))
float[5][3](
float[]( 0, 1, 2),
float[]( 3, 4, 5),
float[]( 6, 7, 8),
float[]( 9, 10, 11),
float[](12, 13, 14)
)
Custom printing can be defined for certain types by passing a dictionary of
"type" : "function" to the ``user_functions`` kwarg. Alternatively, the
dictionary value can be a list of tuples i.e. [(argument_test,
js_function_string)].
>>> custom_functions = {
... "ceiling": "CEIL",
... "Abs": [(lambda x: not x.is_integer, "fabs"),
... (lambda x: x.is_integer, "ABS")]
... }
>>> glsl_code(Abs(x) + ceiling(x), user_functions=custom_functions)
'fabs(x) + CEIL(x)'
If further control is needed, addition, subtraction, multiplication and
division operators can be replaced with ``add``, ``sub``, and ``mul``
functions. This is done by passing ``use_operators = False``:
>>> x,y,z = symbols('x,y,z')
>>> glsl_code(x*(y+z), use_operators = False)
'mul(x, add(y, z))'
>>> glsl_code(x*(y+z*(x-y)**z), use_operators = False)
'mul(x, add(y, mul(z, pow(sub(x, y), z))))'
``Piecewise`` expressions are converted into conditionals. If an
``assign_to`` variable is provided an if statement is created, otherwise
the ternary operator is used. Note that if the ``Piecewise`` lacks a
default term, represented by ``(expr, True)`` then an error will be thrown.
This is to prevent generating an expression that may not evaluate to
anything.
>>> from sympy import Piecewise
>>> expr = Piecewise((x + 1, x > 0), (x, True))
>>> print(glsl_code(expr, tau))
if (x > 0) {
tau = x + 1;
}
else {
tau = x;
}
Support for loops is provided through ``Indexed`` types. With
``contract=True`` these expressions will be turned into loops, whereas
``contract=False`` will just print the assignment expression that should be
looped over:
>>> from sympy import Eq, IndexedBase, Idx
>>> len_y = 5
>>> y = IndexedBase('y', shape=(len_y,))
>>> t = IndexedBase('t', shape=(len_y,))
>>> Dy = IndexedBase('Dy', shape=(len_y-1,))
>>> i = Idx('i', len_y-1)
>>> e=Eq(Dy[i], (y[i+1]-y[i])/(t[i+1]-t[i]))
>>> glsl_code(e.rhs, assign_to=e.lhs, contract=False)
'Dy[i] = (y[i + 1] - y[i])/(t[i + 1] - t[i]);'
>>> from sympy import Matrix, MatrixSymbol
>>> mat = Matrix([x**2, Piecewise((x + 1, x > 0), (x, True)), sin(x)])
>>> A = MatrixSymbol('A', 3, 1)
>>> print(glsl_code(mat, A))
A[0][0] = pow(x, 2.0);
if (x > 0) {
A[1][0] = x + 1;
}
else {
A[1][0] = x;
}
A[2][0] = sin(x);
"""
return GLSLPrinter(settings).doprint(expr,assign_to)
def print_glsl(expr, **settings):
"""Prints the GLSL representation of the given expression.
See GLSLPrinter init function for settings.
"""
print(glsl_code(expr, **settings))
|
43ef1f1a364114e90d9846089de265d947d837c06944c1c68ecc5906295a7676 | from __future__ import print_function, division
from typing import Any, Dict
from sympy.core.compatibility import is_sequence
from sympy.external import import_module
from sympy.printing.printer import Printer
import sympy
from functools import partial
theano = import_module('theano')
if theano:
ts = theano.scalar
tt = theano.tensor
from theano.sandbox import linalg as tlinalg
mapping = {
sympy.Add: tt.add,
sympy.Mul: tt.mul,
sympy.Abs: tt.abs_,
sympy.sign: tt.sgn,
sympy.ceiling: tt.ceil,
sympy.floor: tt.floor,
sympy.log: tt.log,
sympy.exp: tt.exp,
sympy.sqrt: tt.sqrt,
sympy.cos: tt.cos,
sympy.acos: tt.arccos,
sympy.sin: tt.sin,
sympy.asin: tt.arcsin,
sympy.tan: tt.tan,
sympy.atan: tt.arctan,
sympy.atan2: tt.arctan2,
sympy.cosh: tt.cosh,
sympy.acosh: tt.arccosh,
sympy.sinh: tt.sinh,
sympy.asinh: tt.arcsinh,
sympy.tanh: tt.tanh,
sympy.atanh: tt.arctanh,
sympy.re: tt.real,
sympy.im: tt.imag,
sympy.arg: tt.angle,
sympy.erf: tt.erf,
sympy.gamma: tt.gamma,
sympy.loggamma: tt.gammaln,
sympy.Pow: tt.pow,
sympy.Eq: tt.eq,
sympy.StrictGreaterThan: tt.gt,
sympy.StrictLessThan: tt.lt,
sympy.LessThan: tt.le,
sympy.GreaterThan: tt.ge,
sympy.And: tt.and_,
sympy.Or: tt.or_,
sympy.Max: tt.maximum, # Sympy accept >2 inputs, Theano only 2
sympy.Min: tt.minimum, # Sympy accept >2 inputs, Theano only 2
sympy.conjugate: tt.conj,
sympy.core.numbers.ImaginaryUnit: lambda:tt.complex(0,1),
# Matrices
sympy.MatAdd: tt.Elemwise(ts.add),
sympy.HadamardProduct: tt.Elemwise(ts.mul),
sympy.Trace: tlinalg.trace,
sympy.Determinant : tlinalg.det,
sympy.Inverse: tlinalg.matrix_inverse,
sympy.Transpose: tt.DimShuffle((False, False), [1, 0]),
}
class TheanoPrinter(Printer):
""" Code printer which creates Theano symbolic expression graphs.
Parameters
==========
cache : dict
Cache dictionary to use. If None (default) will use
the global cache. To create a printer which does not depend on or alter
global state pass an empty dictionary. Note: the dictionary is not
copied on initialization of the printer and will be updated in-place,
so using the same dict object when creating multiple printers or making
multiple calls to :func:`.theano_code` or :func:`.theano_function` means
the cache is shared between all these applications.
Attributes
==========
cache : dict
A cache of Theano variables which have been created for Sympy
symbol-like objects (e.g. :class:`sympy.core.symbol.Symbol` or
:class:`sympy.matrices.expressions.MatrixSymbol`). This is used to
ensure that all references to a given symbol in an expression (or
multiple expressions) are printed as the same Theano variable, which is
created only once. Symbols are differentiated only by name and type. The
format of the cache's contents should be considered opaque to the user.
"""
printmethod = "_theano"
def __init__(self, *args, **kwargs):
self.cache = kwargs.pop('cache', dict())
super(TheanoPrinter, self).__init__(*args, **kwargs)
def _get_key(self, s, name=None, dtype=None, broadcastable=None):
""" Get the cache key for a Sympy object.
Parameters
==========
s : sympy.core.basic.Basic
Sympy object to get key for.
name : str
Name of object, if it does not have a ``name`` attribute.
"""
if name is None:
name = s.name
return (name, type(s), s.args, dtype, broadcastable)
def _get_or_create(self, s, name=None, dtype=None, broadcastable=None):
"""
Get the Theano variable for a Sympy symbol from the cache, or create it
if it does not exist.
"""
# Defaults
if name is None:
name = s.name
if dtype is None:
dtype = 'floatX'
if broadcastable is None:
broadcastable = ()
key = self._get_key(s, name, dtype=dtype, broadcastable=broadcastable)
if key in self.cache:
return self.cache[key]
value = tt.tensor(name=name, dtype=dtype, broadcastable=broadcastable)
self.cache[key] = value
return value
def _print_Symbol(self, s, **kwargs):
dtype = kwargs.get('dtypes', {}).get(s)
bc = kwargs.get('broadcastables', {}).get(s)
return self._get_or_create(s, dtype=dtype, broadcastable=bc)
def _print_AppliedUndef(self, s, **kwargs):
name = str(type(s)) + '_' + str(s.args[0])
dtype = kwargs.get('dtypes', {}).get(s)
bc = kwargs.get('broadcastables', {}).get(s)
return self._get_or_create(s, name=name, dtype=dtype, broadcastable=bc)
def _print_Basic(self, expr, **kwargs):
op = mapping[type(expr)]
children = [self._print(arg, **kwargs) for arg in expr.args]
return op(*children)
def _print_Number(self, n, **kwargs):
# Integers already taken care of below, interpret as float
return float(n.evalf())
def _print_MatrixSymbol(self, X, **kwargs):
dtype = kwargs.get('dtypes', {}).get(X)
return self._get_or_create(X, dtype=dtype, broadcastable=(None, None))
def _print_DenseMatrix(self, X, **kwargs):
if not hasattr(tt, 'stacklists'):
raise NotImplementedError(
"Matrix translation not yet supported in this version of Theano")
return tt.stacklists([
[self._print(arg, **kwargs) for arg in L]
for L in X.tolist()
])
_print_ImmutableMatrix = _print_ImmutableDenseMatrix = _print_DenseMatrix
def _print_MatMul(self, expr, **kwargs):
children = [self._print(arg, **kwargs) for arg in expr.args]
result = children[0]
for child in children[1:]:
result = tt.dot(result, child)
return result
def _print_MatPow(self, expr, **kwargs):
children = [self._print(arg, **kwargs) for arg in expr.args]
result = 1
if isinstance(children[1], int) and children[1] > 0:
for i in range(children[1]):
result = tt.dot(result, children[0])
else:
raise NotImplementedError('''Only non-negative integer
powers of matrices can be handled by Theano at the moment''')
return result
def _print_MatrixSlice(self, expr, **kwargs):
parent = self._print(expr.parent, **kwargs)
rowslice = self._print(slice(*expr.rowslice), **kwargs)
colslice = self._print(slice(*expr.colslice), **kwargs)
return parent[rowslice, colslice]
def _print_BlockMatrix(self, expr, **kwargs):
nrows, ncols = expr.blocks.shape
blocks = [[self._print(expr.blocks[r, c], **kwargs)
for c in range(ncols)]
for r in range(nrows)]
return tt.join(0, *[tt.join(1, *row) for row in blocks])
def _print_slice(self, expr, **kwargs):
return slice(*[self._print(i, **kwargs)
if isinstance(i, sympy.Basic) else i
for i in (expr.start, expr.stop, expr.step)])
def _print_Pi(self, expr, **kwargs):
return 3.141592653589793
def _print_Piecewise(self, expr, **kwargs):
import numpy as np
e, cond = expr.args[0].args # First condition and corresponding value
# Print conditional expression and value for first condition
p_cond = self._print(cond, **kwargs)
p_e = self._print(e, **kwargs)
# One condition only
if len(expr.args) == 1:
# Return value if condition else NaN
return tt.switch(p_cond, p_e, np.nan)
# Return value_1 if condition_1 else evaluate remaining conditions
p_remaining = self._print(sympy.Piecewise(*expr.args[1:]), **kwargs)
return tt.switch(p_cond, p_e, p_remaining)
def _print_Rational(self, expr, **kwargs):
return tt.true_div(self._print(expr.p, **kwargs),
self._print(expr.q, **kwargs))
def _print_Integer(self, expr, **kwargs):
return expr.p
def _print_factorial(self, expr, **kwargs):
return self._print(sympy.gamma(expr.args[0] + 1), **kwargs)
def _print_Derivative(self, deriv, **kwargs):
rv = self._print(deriv.expr, **kwargs)
for var in deriv.variables:
var = self._print(var, **kwargs)
rv = tt.Rop(rv, var, tt.ones_like(var))
return rv
def emptyPrinter(self, expr):
return expr
def doprint(self, expr, dtypes=None, broadcastables=None):
""" Convert a Sympy expression to a Theano graph variable.
The ``dtypes`` and ``broadcastables`` arguments are used to specify the
data type, dimension, and broadcasting behavior of the Theano variables
corresponding to the free symbols in ``expr``. Each is a mapping from
Sympy symbols to the value of the corresponding argument to
``theano.tensor.Tensor``.
See the corresponding `documentation page`__ for more information on
broadcasting in Theano.
.. __: http://deeplearning.net/software/theano/tutorial/broadcasting.html
Parameters
==========
expr : sympy.core.expr.Expr
Sympy expression to print.
dtypes : dict
Mapping from Sympy symbols to Theano datatypes to use when creating
new Theano variables for those symbols. Corresponds to the ``dtype``
argument to ``theano.tensor.Tensor``. Defaults to ``'floatX'``
for symbols not included in the mapping.
broadcastables : dict
Mapping from Sympy symbols to the value of the ``broadcastable``
argument to ``theano.tensor.Tensor`` to use when creating Theano
variables for those symbols. Defaults to the empty tuple for symbols
not included in the mapping (resulting in a scalar).
Returns
=======
theano.gof.graph.Variable
A variable corresponding to the expression's value in a Theano
symbolic expression graph.
"""
if dtypes is None:
dtypes = {}
if broadcastables is None:
broadcastables = {}
return self._print(expr, dtypes=dtypes, broadcastables=broadcastables)
global_cache = {} # type: Dict[Any, Any]
def theano_code(expr, cache=None, **kwargs):
"""
Convert a Sympy expression into a Theano graph variable.
Parameters
==========
expr : sympy.core.expr.Expr
Sympy expression object to convert.
cache : dict
Cached Theano variables (see :class:`TheanoPrinter.cache
<TheanoPrinter>`). Defaults to the module-level global cache.
dtypes : dict
Passed to :meth:`.TheanoPrinter.doprint`.
broadcastables : dict
Passed to :meth:`.TheanoPrinter.doprint`.
Returns
=======
theano.gof.graph.Variable
A variable corresponding to the expression's value in a Theano symbolic
expression graph.
"""
if not theano:
raise ImportError("theano is required for theano_code")
if cache is None:
cache = global_cache
return TheanoPrinter(cache=cache, settings={}).doprint(expr, **kwargs)
def dim_handling(inputs, dim=None, dims=None, broadcastables=None):
r"""
Get value of ``broadcastables`` argument to :func:`.theano_code` from
keyword arguments to :func:`.theano_function`.
Included for backwards compatibility.
Parameters
==========
inputs
Sequence of input symbols.
dim : int
Common number of dimensions for all inputs. Overrides other arguments
if given.
dims : dict
Mapping from input symbols to number of dimensions. Overrides
``broadcastables`` argument if given.
broadcastables : dict
Explicit value of ``broadcastables`` argument to
:meth:`.TheanoPrinter.doprint`. If not None function will return this value unchanged.
Returns
=======
dict
Dictionary mapping elements of ``inputs`` to their "broadcastable"
values (tuple of ``bool``\ s).
"""
if dim is not None:
return {s: (False,) * dim for s in inputs}
if dims is not None:
maxdim = max(dims.values())
return {
s: (False,) * d + (True,) * (maxdim - d)
for s, d in dims.items()
}
if broadcastables is not None:
return broadcastables
return {}
def theano_function(inputs, outputs, scalar=False, **kwargs):
"""
Create a Theano function from SymPy expressions.
The inputs and outputs are converted to Theano variables using
:func:`.theano_code` and then passed to ``theano.function``.
Parameters
==========
inputs
Sequence of symbols which constitute the inputs of the function.
outputs
Sequence of expressions which constitute the outputs(s) of the
function. The free symbols of each expression must be a subset of
``inputs``.
scalar : bool
Convert 0-dimensional arrays in output to scalars. This will return a
Python wrapper function around the Theano function object.
cache : dict
Cached Theano variables (see :class:`TheanoPrinter.cache
<TheanoPrinter>`). Defaults to the module-level global cache.
dtypes : dict
Passed to :meth:`.TheanoPrinter.doprint`.
broadcastables : dict
Passed to :meth:`.TheanoPrinter.doprint`.
dims : dict
Alternative to ``broadcastables`` argument. Mapping from elements of
``inputs`` to integers indicating the dimension of their associated
arrays/tensors. Overrides ``broadcastables`` argument if given.
dim : int
Another alternative to the ``broadcastables`` argument. Common number of
dimensions to use for all arrays/tensors.
``theano_function([x, y], [...], dim=2)`` is equivalent to using
``broadcastables={x: (False, False), y: (False, False)}``.
Returns
=======
callable
A callable object which takes values of ``inputs`` as positional
arguments and returns an output array for each of the expressions
in ``outputs``. If ``outputs`` is a single expression the function will
return a Numpy array, if it is a list of multiple expressions the
function will return a list of arrays. See description of the ``squeeze``
argument above for the behavior when a single output is passed in a list.
The returned object will either be an instance of
``theano.compile.function_module.Function`` or a Python wrapper
function around one. In both cases, the returned value will have a
``theano_function`` attribute which points to the return value of
``theano.function``.
Examples
========
>>> from sympy.abc import x, y, z
>>> from sympy.printing.theanocode import theano_function
A simple function with one input and one output:
>>> f1 = theano_function([x], [x**2 - 1], scalar=True)
>>> f1(3)
8.0
A function with multiple inputs and one output:
>>> f2 = theano_function([x, y, z], [(x**z + y**z)**(1/z)], scalar=True)
>>> f2(3, 4, 2)
5.0
A function with multiple inputs and multiple outputs:
>>> f3 = theano_function([x, y], [x**2 + y**2, x**2 - y**2], scalar=True)
>>> f3(2, 3)
[13.0, -5.0]
See also
========
dim_handling
"""
if not theano:
raise ImportError("theano is required for theano_function")
# Pop off non-theano keyword args
cache = kwargs.pop('cache', {})
dtypes = kwargs.pop('dtypes', {})
broadcastables = dim_handling(
inputs,
dim=kwargs.pop('dim', None),
dims=kwargs.pop('dims', None),
broadcastables=kwargs.pop('broadcastables', None),
)
# Print inputs/outputs
code = partial(theano_code, cache=cache, dtypes=dtypes,
broadcastables=broadcastables)
tinputs = list(map(code, inputs))
toutputs = list(map(code, outputs))
#fix constant expressions as variables
toutputs = [output if isinstance(output, theano.Variable) else tt.as_tensor_variable(output) for output in toutputs]
if len(toutputs) == 1:
toutputs = toutputs[0]
# Compile theano func
func = theano.function(tinputs, toutputs, **kwargs)
is_0d = [len(o.variable.broadcastable) == 0 for o in func.outputs]
# No wrapper required
if not scalar or not any(is_0d):
func.theano_function = func
return func
# Create wrapper to convert 0-dimensional outputs to scalars
def wrapper(*args):
out = func(*args)
# out can be array(1.0) or [array(1.0), array(2.0)]
if is_sequence(out):
return [o[()] if is_0d[i] else o for i, o in enumerate(out)]
else:
return out[()]
wrapper.__wrapped__ = func
wrapper.__doc__ = func.__doc__
wrapper.theano_function = func
return wrapper
|
0ea986073423ce1b25bcfc246fa1a5db5b2385ce8804658960b6c8265eaabe1f | """Integration method that emulates by-hand techniques.
This module also provides functionality to get the steps used to evaluate a
particular integral, in the ``integral_steps`` function. This will return
nested namedtuples representing the integration rules used. The
``manualintegrate`` function computes the integral using those steps given
an integrand; given the steps, ``_manualintegrate`` will evaluate them.
The integrator can be extended with new heuristics and evaluation
techniques. To do so, write a function that accepts an ``IntegralInfo``
object and returns either a namedtuple representing a rule or
``None``. Then, write another function that accepts the namedtuple's fields
and returns the antiderivative, and decorate it with
``@evaluates(namedtuple_type)``. If the new technique requires a new
match, add the key and call to the antiderivative function to integral_steps.
To enable simple substitutions, add the match to find_substitutions.
"""
from __future__ import print_function, division
from typing import Dict as tDict, Optional
from collections import namedtuple, defaultdict
import sympy
from sympy.core.compatibility import reduce, Mapping, iterable
from sympy.core.containers import Dict
from sympy.core.expr import Expr
from sympy.core.logic import fuzzy_not
from sympy.functions.elementary.trigonometric import TrigonometricFunction
from sympy.functions.special.polynomials import OrthogonalPolynomial
from sympy.functions.elementary.piecewise import Piecewise
from sympy.strategies.core import switch, do_one, null_safe, condition
from sympy.core.relational import Eq, Ne
from sympy.polys.polytools import degree
from sympy.ntheory.factor_ import divisors
from sympy.utilities.misc import debug
ZERO = sympy.S.Zero
def Rule(name, props=""):
# GOTCHA: namedtuple class name not considered!
def __eq__(self, other):
return self.__class__ == other.__class__ and tuple.__eq__(self, other)
__neq__ = lambda self, other: not __eq__(self, other)
cls = namedtuple(name, props + " context symbol")
cls.__eq__ = __eq__
cls.__ne__ = __neq__
return cls
ConstantRule = Rule("ConstantRule", "constant")
ConstantTimesRule = Rule("ConstantTimesRule", "constant other substep")
PowerRule = Rule("PowerRule", "base exp")
AddRule = Rule("AddRule", "substeps")
URule = Rule("URule", "u_var u_func constant substep")
PartsRule = Rule("PartsRule", "u dv v_step second_step")
CyclicPartsRule = Rule("CyclicPartsRule", "parts_rules coefficient")
TrigRule = Rule("TrigRule", "func arg")
ExpRule = Rule("ExpRule", "base exp")
ReciprocalRule = Rule("ReciprocalRule", "func")
ArcsinRule = Rule("ArcsinRule")
InverseHyperbolicRule = Rule("InverseHyperbolicRule", "func")
AlternativeRule = Rule("AlternativeRule", "alternatives")
DontKnowRule = Rule("DontKnowRule")
DerivativeRule = Rule("DerivativeRule")
RewriteRule = Rule("RewriteRule", "rewritten substep")
PiecewiseRule = Rule("PiecewiseRule", "subfunctions")
HeavisideRule = Rule("HeavisideRule", "harg ibnd substep")
TrigSubstitutionRule = Rule("TrigSubstitutionRule",
"theta func rewritten substep restriction")
ArctanRule = Rule("ArctanRule", "a b c")
ArccothRule = Rule("ArccothRule", "a b c")
ArctanhRule = Rule("ArctanhRule", "a b c")
JacobiRule = Rule("JacobiRule", "n a b")
GegenbauerRule = Rule("GegenbauerRule", "n a")
ChebyshevTRule = Rule("ChebyshevTRule", "n")
ChebyshevURule = Rule("ChebyshevURule", "n")
LegendreRule = Rule("LegendreRule", "n")
HermiteRule = Rule("HermiteRule", "n")
LaguerreRule = Rule("LaguerreRule", "n")
AssocLaguerreRule = Rule("AssocLaguerreRule", "n a")
CiRule = Rule("CiRule", "a b")
ChiRule = Rule("ChiRule", "a b")
EiRule = Rule("EiRule", "a b")
SiRule = Rule("SiRule", "a b")
ShiRule = Rule("ShiRule", "a b")
ErfRule = Rule("ErfRule", "a b c")
FresnelCRule = Rule("FresnelCRule", "a b c")
FresnelSRule = Rule("FresnelSRule", "a b c")
LiRule = Rule("LiRule", "a b")
PolylogRule = Rule("PolylogRule", "a b")
UpperGammaRule = Rule("UpperGammaRule", "a e")
EllipticFRule = Rule("EllipticFRule", "a d")
EllipticERule = Rule("EllipticERule", "a d")
IntegralInfo = namedtuple('IntegralInfo', 'integrand symbol')
evaluators = {}
def evaluates(rule):
def _evaluates(func):
func.rule = rule
evaluators[rule] = func
return func
return _evaluates
def contains_dont_know(rule):
if isinstance(rule, DontKnowRule):
return True
else:
for val in rule:
if isinstance(val, tuple):
if contains_dont_know(val):
return True
elif isinstance(val, list):
if any(contains_dont_know(i) for i in val):
return True
return False
def manual_diff(f, symbol):
"""Derivative of f in form expected by find_substitutions
SymPy's derivatives for some trig functions (like cot) aren't in a form
that works well with finding substitutions; this replaces the
derivatives for those particular forms with something that works better.
"""
if f.args:
arg = f.args[0]
if isinstance(f, sympy.tan):
return arg.diff(symbol) * sympy.sec(arg)**2
elif isinstance(f, sympy.cot):
return -arg.diff(symbol) * sympy.csc(arg)**2
elif isinstance(f, sympy.sec):
return arg.diff(symbol) * sympy.sec(arg) * sympy.tan(arg)
elif isinstance(f, sympy.csc):
return -arg.diff(symbol) * sympy.csc(arg) * sympy.cot(arg)
elif isinstance(f, sympy.Add):
return sum([manual_diff(arg, symbol) for arg in f.args])
elif isinstance(f, sympy.Mul):
if len(f.args) == 2 and isinstance(f.args[0], sympy.Number):
return f.args[0] * manual_diff(f.args[1], symbol)
return f.diff(symbol)
def manual_subs(expr, *args):
"""
A wrapper for `expr.subs(*args)` with additional logic for substitution
of invertible functions.
"""
if len(args) == 1:
sequence = args[0]
if isinstance(sequence, (Dict, Mapping)):
sequence = sequence.items()
elif not iterable(sequence):
raise ValueError("Expected an iterable of (old, new) pairs")
elif len(args) == 2:
sequence = [args]
else:
raise ValueError("subs accepts either 1 or 2 arguments")
new_subs = []
for old, new in sequence:
if isinstance(old, sympy.log):
# If log(x) = y, then exp(a*log(x)) = exp(a*y)
# that is, x**a = exp(a*y). Replace nontrivial powers of x
# before subs turns them into `exp(y)**a`, but
# do not replace x itself yet, to avoid `log(exp(y))`.
x0 = old.args[0]
expr = expr.replace(lambda x: x.is_Pow and x.base == x0,
lambda x: sympy.exp(x.exp*new))
new_subs.append((x0, sympy.exp(new)))
return expr.subs(list(sequence) + new_subs)
# Method based on that on SIN, described in "Symbolic Integration: The
# Stormy Decade"
def find_substitutions(integrand, symbol, u_var):
results = []
def test_subterm(u, u_diff):
if u_diff == 0:
return False
substituted = integrand / u_diff
if symbol not in substituted.free_symbols:
# replaced everything already
return False
debug("substituted: {}, u: {}, u_var: {}".format(substituted, u, u_var))
substituted = manual_subs(substituted, u, u_var).cancel()
if symbol not in substituted.free_symbols:
# avoid increasing the degree of a rational function
if integrand.is_rational_function(symbol) and substituted.is_rational_function(u_var):
deg_before = max([degree(t, symbol) for t in integrand.as_numer_denom()])
deg_after = max([degree(t, u_var) for t in substituted.as_numer_denom()])
if deg_after > deg_before:
return False
return substituted.as_independent(u_var, as_Add=False)
# special treatment for substitutions u = (a*x+b)**(1/n)
if (isinstance(u, sympy.Pow) and (1/u.exp).is_Integer and
sympy.Abs(u.exp) < 1):
a = sympy.Wild('a', exclude=[symbol])
b = sympy.Wild('b', exclude=[symbol])
match = u.base.match(a*symbol + b)
if match:
a, b = [match.get(i, ZERO) for i in (a, b)]
if a != 0 and b != 0:
substituted = substituted.subs(symbol,
(u_var**(1/u.exp) - b)/a)
return substituted.as_independent(u_var, as_Add=False)
return False
def possible_subterms(term):
if isinstance(term, (TrigonometricFunction,
sympy.asin, sympy.acos, sympy.atan,
sympy.exp, sympy.log, sympy.Heaviside)):
return [term.args[0]]
elif isinstance(term, (sympy.chebyshevt, sympy.chebyshevu,
sympy.legendre, sympy.hermite, sympy.laguerre)):
return [term.args[1]]
elif isinstance(term, (sympy.gegenbauer, sympy.assoc_laguerre)):
return [term.args[2]]
elif isinstance(term, sympy.jacobi):
return [term.args[3]]
elif isinstance(term, sympy.Mul):
r = []
for u in term.args:
r.append(u)
r.extend(possible_subterms(u))
return r
elif isinstance(term, sympy.Pow):
r = []
if term.args[1].is_constant(symbol):
r.append(term.args[0])
elif term.args[0].is_constant(symbol):
r.append(term.args[1])
if term.args[1].is_Integer:
r.extend([term.args[0]**d for d in divisors(term.args[1])
if 1 < d < abs(term.args[1])])
if term.args[0].is_Add:
r.extend([t for t in possible_subterms(term.args[0])
if t.is_Pow])
return r
elif isinstance(term, sympy.Add):
r = []
for arg in term.args:
r.append(arg)
r.extend(possible_subterms(arg))
return r
return []
for u in possible_subterms(integrand):
if u == symbol:
continue
u_diff = manual_diff(u, symbol)
new_integrand = test_subterm(u, u_diff)
if new_integrand is not False:
constant, new_integrand = new_integrand
if new_integrand == integrand.subs(symbol, u_var):
continue
substitution = (u, constant, new_integrand)
if substitution not in results:
results.append(substitution)
return results
def rewriter(condition, rewrite):
"""Strategy that rewrites an integrand."""
def _rewriter(integral):
integrand, symbol = integral
debug("Integral: {} is rewritten with {} on symbol: {}".format(integrand, rewrite, symbol))
if condition(*integral):
rewritten = rewrite(*integral)
if rewritten != integrand:
substep = integral_steps(rewritten, symbol)
if not isinstance(substep, DontKnowRule) and substep:
return RewriteRule(
rewritten,
substep,
integrand, symbol)
return _rewriter
def proxy_rewriter(condition, rewrite):
"""Strategy that rewrites an integrand based on some other criteria."""
def _proxy_rewriter(criteria):
criteria, integral = criteria
integrand, symbol = integral
debug("Integral: {} is rewritten with {} on symbol: {} and criteria: {}".format(integrand, rewrite, symbol, criteria))
args = criteria + list(integral)
if condition(*args):
rewritten = rewrite(*args)
if rewritten != integrand:
return RewriteRule(
rewritten,
integral_steps(rewritten, symbol),
integrand, symbol)
return _proxy_rewriter
def multiplexer(conditions):
"""Apply the rule that matches the condition, else None"""
def multiplexer_rl(expr):
for key, rule in conditions.items():
if key(expr):
return rule(expr)
return multiplexer_rl
def alternatives(*rules):
"""Strategy that makes an AlternativeRule out of multiple possible results."""
def _alternatives(integral):
alts = []
count = 0
debug("List of Alternative Rules")
for rule in rules:
count = count + 1
debug("Rule {}: {}".format(count, rule))
result = rule(integral)
if (result and not isinstance(result, DontKnowRule) and
result != integral and result not in alts):
alts.append(result)
if len(alts) == 1:
return alts[0]
elif alts:
doable = [rule for rule in alts if not contains_dont_know(rule)]
if doable:
return AlternativeRule(doable, *integral)
else:
return AlternativeRule(alts, *integral)
return _alternatives
def constant_rule(integral):
integrand, symbol = integral
return ConstantRule(integral.integrand, *integral)
def power_rule(integral):
integrand, symbol = integral
base, exp = integrand.as_base_exp()
if symbol not in exp.free_symbols and isinstance(base, sympy.Symbol):
if sympy.simplify(exp + 1) == 0:
return ReciprocalRule(base, integrand, symbol)
return PowerRule(base, exp, integrand, symbol)
elif symbol not in base.free_symbols and isinstance(exp, sympy.Symbol):
rule = ExpRule(base, exp, integrand, symbol)
if fuzzy_not(sympy.log(base).is_zero):
return rule
elif sympy.log(base).is_zero:
return ConstantRule(1, 1, symbol)
return PiecewiseRule([
(rule, sympy.Ne(sympy.log(base), 0)),
(ConstantRule(1, 1, symbol), True)
], integrand, symbol)
def exp_rule(integral):
integrand, symbol = integral
if isinstance(integrand.args[0], sympy.Symbol):
return ExpRule(sympy.E, integrand.args[0], integrand, symbol)
def orthogonal_poly_rule(integral):
orthogonal_poly_classes = {
sympy.jacobi: JacobiRule,
sympy.gegenbauer: GegenbauerRule,
sympy.chebyshevt: ChebyshevTRule,
sympy.chebyshevu: ChebyshevURule,
sympy.legendre: LegendreRule,
sympy.hermite: HermiteRule,
sympy.laguerre: LaguerreRule,
sympy.assoc_laguerre: AssocLaguerreRule
}
orthogonal_poly_var_index = {
sympy.jacobi: 3,
sympy.gegenbauer: 2,
sympy.assoc_laguerre: 2
}
integrand, symbol = integral
for klass in orthogonal_poly_classes:
if isinstance(integrand, klass):
var_index = orthogonal_poly_var_index.get(klass, 1)
if (integrand.args[var_index] is symbol and not
any(v.has(symbol) for v in integrand.args[:var_index])):
args = integrand.args[:var_index] + (integrand, symbol)
return orthogonal_poly_classes[klass](*args)
def special_function_rule(integral):
integrand, symbol = integral
a = sympy.Wild('a', exclude=[symbol], properties=[lambda x: not x.is_zero])
b = sympy.Wild('b', exclude=[symbol])
c = sympy.Wild('c', exclude=[symbol])
d = sympy.Wild('d', exclude=[symbol], properties=[lambda x: not x.is_zero])
e = sympy.Wild('e', exclude=[symbol], properties=[
lambda x: not (x.is_nonnegative and x.is_integer)])
wilds = (a, b, c, d, e)
# patterns consist of a SymPy class, a wildcard expr, an optional
# condition coded as a lambda (when Wild properties are not enough),
# followed by an applicable rule
patterns = (
(sympy.Mul, sympy.exp(a*symbol + b)/symbol, None, EiRule),
(sympy.Mul, sympy.cos(a*symbol + b)/symbol, None, CiRule),
(sympy.Mul, sympy.cosh(a*symbol + b)/symbol, None, ChiRule),
(sympy.Mul, sympy.sin(a*symbol + b)/symbol, None, SiRule),
(sympy.Mul, sympy.sinh(a*symbol + b)/symbol, None, ShiRule),
(sympy.Pow, 1/sympy.log(a*symbol + b), None, LiRule),
(sympy.exp, sympy.exp(a*symbol**2 + b*symbol + c), None, ErfRule),
(sympy.sin, sympy.sin(a*symbol**2 + b*symbol + c), None, FresnelSRule),
(sympy.cos, sympy.cos(a*symbol**2 + b*symbol + c), None, FresnelCRule),
(sympy.Mul, symbol**e*sympy.exp(a*symbol), None, UpperGammaRule),
(sympy.Mul, sympy.polylog(b, a*symbol)/symbol, None, PolylogRule),
(sympy.Pow, 1/sympy.sqrt(a - d*sympy.sin(symbol)**2),
lambda a, d: a != d, EllipticFRule),
(sympy.Pow, sympy.sqrt(a - d*sympy.sin(symbol)**2),
lambda a, d: a != d, EllipticERule),
)
for p in patterns:
if isinstance(integrand, p[0]):
match = integrand.match(p[1])
if match:
wild_vals = tuple(match.get(w) for w in wilds
if match.get(w) is not None)
if p[2] is None or p[2](*wild_vals):
args = wild_vals + (integrand, symbol)
return p[3](*args)
def inverse_trig_rule(integral):
integrand, symbol = integral
base, exp = integrand.as_base_exp()
a = sympy.Wild('a', exclude=[symbol])
b = sympy.Wild('b', exclude=[symbol])
match = base.match(a + b*symbol**2)
if not match:
return
def negative(x):
return x.is_negative or x.could_extract_minus_sign()
def ArcsinhRule(integrand, symbol):
return InverseHyperbolicRule(sympy.asinh, integrand, symbol)
def ArccoshRule(integrand, symbol):
return InverseHyperbolicRule(sympy.acosh, integrand, symbol)
def make_inverse_trig(RuleClass, base_exp, a, sign_a, b, sign_b):
u_var = sympy.Dummy("u")
current_base = base
current_symbol = symbol
constant = u_func = u_constant = substep = None
factored = integrand
if a != 1:
constant = a**base_exp
current_base = sign_a + sign_b * (b/a) * current_symbol**2
factored = current_base ** base_exp
if (b/a) != 1:
u_func = sympy.sqrt(b/a) * symbol
u_constant = sympy.sqrt(a/b)
current_symbol = u_var
current_base = sign_a + sign_b * current_symbol**2
substep = RuleClass(current_base ** base_exp, current_symbol)
if u_func is not None:
if u_constant != 1 and substep is not None:
substep = ConstantTimesRule(
u_constant, current_base ** base_exp, substep,
u_constant * current_base ** base_exp, symbol)
substep = URule(u_var, u_func, u_constant, substep, factored, symbol)
if constant is not None and substep is not None:
substep = ConstantTimesRule(constant, factored, substep, integrand, symbol)
return substep
a, b = [match.get(i, ZERO) for i in (a, b)]
# list of (rule, base_exp, a, sign_a, b, sign_b, condition)
possibilities = []
if sympy.simplify(2*exp + 1) == 0:
possibilities.append((ArcsinRule, exp, a, 1, -b, -1, sympy.And(a > 0, b < 0)))
possibilities.append((ArcsinhRule, exp, a, 1, b, 1, sympy.And(a > 0, b > 0)))
possibilities.append((ArccoshRule, exp, -a, -1, b, 1, sympy.And(a < 0, b > 0)))
possibilities = [p for p in possibilities if p[-1] is not sympy.false]
if a.is_number and b.is_number:
possibility = [p for p in possibilities if p[-1] is sympy.true]
if len(possibility) == 1:
return make_inverse_trig(*possibility[0][:-1])
elif possibilities:
return PiecewiseRule(
[(make_inverse_trig(*p[:-1]), p[-1]) for p in possibilities],
integrand, symbol)
def add_rule(integral):
integrand, symbol = integral
results = [integral_steps(g, symbol)
for g in integrand.as_ordered_terms()]
return None if None in results else AddRule(results, integrand, symbol)
def mul_rule(integral):
integrand, symbol = integral
# Constant times function case
coeff, f = integrand.as_independent(symbol)
next_step = integral_steps(f, symbol)
if coeff != 1 and next_step is not None:
return ConstantTimesRule(
coeff, f,
next_step,
integrand, symbol)
def _parts_rule(integrand, symbol):
# LIATE rule:
# log, inverse trig, algebraic, trigonometric, exponential
def pull_out_algebraic(integrand):
integrand = integrand.cancel().together()
# iterating over Piecewise args would not work here
algebraic = ([] if isinstance(integrand, sympy.Piecewise)
else [arg for arg in integrand.args if arg.is_algebraic_expr(symbol)])
if algebraic:
u = sympy.Mul(*algebraic)
dv = (integrand / u).cancel()
return u, dv
def pull_out_u(*functions):
def pull_out_u_rl(integrand):
if any([integrand.has(f) for f in functions]):
args = [arg for arg in integrand.args
if any(isinstance(arg, cls) for cls in functions)]
if args:
u = reduce(lambda a,b: a*b, args)
dv = integrand / u
return u, dv
return pull_out_u_rl
liate_rules = [pull_out_u(sympy.log), pull_out_u(sympy.atan, sympy.asin, sympy.acos),
pull_out_algebraic, pull_out_u(sympy.sin, sympy.cos),
pull_out_u(sympy.exp)]
dummy = sympy.Dummy("temporary")
# we can integrate log(x) and atan(x) by setting dv = 1
if isinstance(integrand, (sympy.log, sympy.atan, sympy.asin, sympy.acos)):
integrand = dummy * integrand
for index, rule in enumerate(liate_rules):
result = rule(integrand)
if result:
u, dv = result
# Don't pick u to be a constant if possible
if symbol not in u.free_symbols and not u.has(dummy):
return
u = u.subs(dummy, 1)
dv = dv.subs(dummy, 1)
# Don't pick a non-polynomial algebraic to be differentiated
if rule == pull_out_algebraic and not u.is_polynomial(symbol):
return
# Don't trade one logarithm for another
if isinstance(u, sympy.log):
rec_dv = 1/dv
if (rec_dv.is_polynomial(symbol) and
degree(rec_dv, symbol) == 1):
return
# Can integrate a polynomial times OrthogonalPolynomial
if rule == pull_out_algebraic and isinstance(dv, OrthogonalPolynomial):
v_step = integral_steps(dv, symbol)
if contains_dont_know(v_step):
return
else:
du = u.diff(symbol)
v = _manualintegrate(v_step)
return u, dv, v, du, v_step
# make sure dv is amenable to integration
accept = False
if index < 2: # log and inverse trig are usually worth trying
accept = True
elif (rule == pull_out_algebraic and dv.args and
all(isinstance(a, (sympy.sin, sympy.cos, sympy.exp))
for a in dv.args)):
accept = True
else:
for rule in liate_rules[index + 1:]:
r = rule(integrand)
if r and r[0].subs(dummy, 1).equals(dv):
accept = True
break
if accept:
du = u.diff(symbol)
v_step = integral_steps(sympy.simplify(dv), symbol)
if not contains_dont_know(v_step):
v = _manualintegrate(v_step)
return u, dv, v, du, v_step
def parts_rule(integral):
integrand, symbol = integral
constant, integrand = integrand.as_coeff_Mul()
result = _parts_rule(integrand, symbol)
steps = []
if result:
u, dv, v, du, v_step = result
debug("u : {}, dv : {}, v : {}, du : {}, v_step: {}".format(u, dv, v, du, v_step))
steps.append(result)
if isinstance(v, sympy.Integral):
return
# Set a limit on the number of times u can be used
if isinstance(u, (sympy.sin, sympy.cos, sympy.exp, sympy.sinh, sympy.cosh)):
cachekey = u.xreplace({symbol: _cache_dummy})
if _parts_u_cache[cachekey] > 2:
return
_parts_u_cache[cachekey] += 1
# Try cyclic integration by parts a few times
for _ in range(4):
debug("Cyclic integration {} with v: {}, du: {}, integrand: {}".format(_, v, du, integrand))
coefficient = ((v * du) / integrand).cancel()
if coefficient == 1:
break
if symbol not in coefficient.free_symbols:
rule = CyclicPartsRule(
[PartsRule(u, dv, v_step, None, None, None)
for (u, dv, v, du, v_step) in steps],
(-1) ** len(steps) * coefficient,
integrand, symbol
)
if (constant != 1) and rule:
rule = ConstantTimesRule(constant, integrand, rule,
constant * integrand, symbol)
return rule
# _parts_rule is sensitive to constants, factor it out
next_constant, next_integrand = (v * du).as_coeff_Mul()
result = _parts_rule(next_integrand, symbol)
if result:
u, dv, v, du, v_step = result
u *= next_constant
du *= next_constant
steps.append((u, dv, v, du, v_step))
else:
break
def make_second_step(steps, integrand):
if steps:
u, dv, v, du, v_step = steps[0]
return PartsRule(u, dv, v_step,
make_second_step(steps[1:], v * du),
integrand, symbol)
else:
steps = integral_steps(integrand, symbol)
if steps:
return steps
else:
return DontKnowRule(integrand, symbol)
if steps:
u, dv, v, du, v_step = steps[0]
rule = PartsRule(u, dv, v_step,
make_second_step(steps[1:], v * du),
integrand, symbol)
if (constant != 1) and rule:
rule = ConstantTimesRule(constant, integrand, rule,
constant * integrand, symbol)
return rule
def trig_rule(integral):
integrand, symbol = integral
if isinstance(integrand, sympy.sin) or isinstance(integrand, sympy.cos):
arg = integrand.args[0]
if not isinstance(arg, sympy.Symbol):
return # perhaps a substitution can deal with it
if isinstance(integrand, sympy.sin):
func = 'sin'
else:
func = 'cos'
return TrigRule(func, arg, integrand, symbol)
if integrand == sympy.sec(symbol)**2:
return TrigRule('sec**2', symbol, integrand, symbol)
elif integrand == sympy.csc(symbol)**2:
return TrigRule('csc**2', symbol, integrand, symbol)
if isinstance(integrand, sympy.tan):
rewritten = sympy.sin(*integrand.args) / sympy.cos(*integrand.args)
elif isinstance(integrand, sympy.cot):
rewritten = sympy.cos(*integrand.args) / sympy.sin(*integrand.args)
elif isinstance(integrand, sympy.sec):
arg = integrand.args[0]
rewritten = ((sympy.sec(arg)**2 + sympy.tan(arg) * sympy.sec(arg)) /
(sympy.sec(arg) + sympy.tan(arg)))
elif isinstance(integrand, sympy.csc):
arg = integrand.args[0]
rewritten = ((sympy.csc(arg)**2 + sympy.cot(arg) * sympy.csc(arg)) /
(sympy.csc(arg) + sympy.cot(arg)))
else:
return
return RewriteRule(
rewritten,
integral_steps(rewritten, symbol),
integrand, symbol
)
def trig_product_rule(integral):
integrand, symbol = integral
sectan = sympy.sec(symbol) * sympy.tan(symbol)
q = integrand / sectan
if symbol not in q.free_symbols:
rule = TrigRule('sec*tan', symbol, sectan, symbol)
if q != 1 and rule:
rule = ConstantTimesRule(q, sectan, rule, integrand, symbol)
return rule
csccot = -sympy.csc(symbol) * sympy.cot(symbol)
q = integrand / csccot
if symbol not in q.free_symbols:
rule = TrigRule('csc*cot', symbol, csccot, symbol)
if q != 1 and rule:
rule = ConstantTimesRule(q, csccot, rule, integrand, symbol)
return rule
def quadratic_denom_rule(integral):
integrand, symbol = integral
a = sympy.Wild('a', exclude=[symbol])
b = sympy.Wild('b', exclude=[symbol])
c = sympy.Wild('c', exclude=[symbol])
match = integrand.match(a / (b * symbol ** 2 + c))
if match:
a, b, c = match[a], match[b], match[c]
if b.is_extended_real and c.is_extended_real:
return PiecewiseRule([(ArctanRule(a, b, c, integrand, symbol), sympy.Gt(c / b, 0)),
(ArccothRule(a, b, c, integrand, symbol), sympy.And(sympy.Gt(symbol ** 2, -c / b), sympy.Lt(c / b, 0))),
(ArctanhRule(a, b, c, integrand, symbol), sympy.And(sympy.Lt(symbol ** 2, -c / b), sympy.Lt(c / b, 0))),
], integrand, symbol)
else:
return ArctanRule(a, b, c, integrand, symbol)
d = sympy.Wild('d', exclude=[symbol])
match2 = integrand.match(a / (b * symbol ** 2 + c * symbol + d))
if match2:
b, c = match2[b], match2[c]
if b.is_zero:
return
u = sympy.Dummy('u')
u_func = symbol + c/(2*b)
integrand2 = integrand.subs(symbol, u - c / (2*b))
next_step = integral_steps(integrand2, u)
if next_step:
return URule(u, u_func, None, next_step, integrand2, symbol)
else:
return
e = sympy.Wild('e', exclude=[symbol])
match3 = integrand.match((a* symbol + b) / (c * symbol ** 2 + d * symbol + e))
if match3:
a, b, c, d, e = match3[a], match3[b], match3[c], match3[d], match3[e]
if c.is_zero:
return
denominator = c * symbol**2 + d * symbol + e
const = a/(2*c)
numer1 = (2*c*symbol+d)
numer2 = - const*d + b
u = sympy.Dummy('u')
step1 = URule(u,
denominator,
const,
integral_steps(u**(-1), u),
integrand,
symbol)
if const != 1:
step1 = ConstantTimesRule(const,
numer1/denominator,
step1,
const*numer1/denominator,
symbol)
if numer2.is_zero:
return step1
step2 = integral_steps(numer2/denominator, symbol)
substeps = AddRule([step1, step2], integrand, symbol)
rewriten = const*numer1/denominator+numer2/denominator
return RewriteRule(rewriten, substeps, integrand, symbol)
return
def root_mul_rule(integral):
integrand, symbol = integral
a = sympy.Wild('a', exclude=[symbol])
b = sympy.Wild('b', exclude=[symbol])
c = sympy.Wild('c')
match = integrand.match(sympy.sqrt(a * symbol + b) * c)
if not match:
return
a, b, c = match[a], match[b], match[c]
d = sympy.Wild('d', exclude=[symbol])
e = sympy.Wild('e', exclude=[symbol])
f = sympy.Wild('f')
recursion_test = c.match(sympy.sqrt(d * symbol + e) * f)
if recursion_test:
return
u = sympy.Dummy('u')
u_func = sympy.sqrt(a * symbol + b)
integrand = integrand.subs(u_func, u)
integrand = integrand.subs(symbol, (u**2 - b) / a)
integrand = integrand * 2 * u / a
next_step = integral_steps(integrand, u)
if next_step:
return URule(u, u_func, None, next_step, integrand, symbol)
@sympy.cacheit
def make_wilds(symbol):
a = sympy.Wild('a', exclude=[symbol])
b = sympy.Wild('b', exclude=[symbol])
m = sympy.Wild('m', exclude=[symbol], properties=[lambda n: isinstance(n, sympy.Integer)])
n = sympy.Wild('n', exclude=[symbol], properties=[lambda n: isinstance(n, sympy.Integer)])
return a, b, m, n
@sympy.cacheit
def sincos_pattern(symbol):
a, b, m, n = make_wilds(symbol)
pattern = sympy.sin(a*symbol)**m * sympy.cos(b*symbol)**n
return pattern, a, b, m, n
@sympy.cacheit
def tansec_pattern(symbol):
a, b, m, n = make_wilds(symbol)
pattern = sympy.tan(a*symbol)**m * sympy.sec(b*symbol)**n
return pattern, a, b, m, n
@sympy.cacheit
def cotcsc_pattern(symbol):
a, b, m, n = make_wilds(symbol)
pattern = sympy.cot(a*symbol)**m * sympy.csc(b*symbol)**n
return pattern, a, b, m, n
@sympy.cacheit
def heaviside_pattern(symbol):
m = sympy.Wild('m', exclude=[symbol])
b = sympy.Wild('b', exclude=[symbol])
g = sympy.Wild('g')
pattern = sympy.Heaviside(m*symbol + b) * g
return pattern, m, b, g
def uncurry(func):
def uncurry_rl(args):
return func(*args)
return uncurry_rl
def trig_rewriter(rewrite):
def trig_rewriter_rl(args):
a, b, m, n, integrand, symbol = args
rewritten = rewrite(a, b, m, n, integrand, symbol)
if rewritten != integrand:
return RewriteRule(
rewritten,
integral_steps(rewritten, symbol),
integrand, symbol)
return trig_rewriter_rl
sincos_botheven_condition = uncurry(
lambda a, b, m, n, i, s: m.is_even and n.is_even and
m.is_nonnegative and n.is_nonnegative)
sincos_botheven = trig_rewriter(
lambda a, b, m, n, i, symbol: ( (((1 - sympy.cos(2*a*symbol)) / 2) ** (m / 2)) *
(((1 + sympy.cos(2*b*symbol)) / 2) ** (n / 2)) ))
sincos_sinodd_condition = uncurry(lambda a, b, m, n, i, s: m.is_odd and m >= 3)
sincos_sinodd = trig_rewriter(
lambda a, b, m, n, i, symbol: ( (1 - sympy.cos(a*symbol)**2)**((m - 1) / 2) *
sympy.sin(a*symbol) *
sympy.cos(b*symbol) ** n))
sincos_cosodd_condition = uncurry(lambda a, b, m, n, i, s: n.is_odd and n >= 3)
sincos_cosodd = trig_rewriter(
lambda a, b, m, n, i, symbol: ( (1 - sympy.sin(b*symbol)**2)**((n - 1) / 2) *
sympy.cos(b*symbol) *
sympy.sin(a*symbol) ** m))
tansec_seceven_condition = uncurry(lambda a, b, m, n, i, s: n.is_even and n >= 4)
tansec_seceven = trig_rewriter(
lambda a, b, m, n, i, symbol: ( (1 + sympy.tan(b*symbol)**2) ** (n/2 - 1) *
sympy.sec(b*symbol)**2 *
sympy.tan(a*symbol) ** m ))
tansec_tanodd_condition = uncurry(lambda a, b, m, n, i, s: m.is_odd)
tansec_tanodd = trig_rewriter(
lambda a, b, m, n, i, symbol: ( (sympy.sec(a*symbol)**2 - 1) ** ((m - 1) / 2) *
sympy.tan(a*symbol) *
sympy.sec(b*symbol) ** n ))
tan_tansquared_condition = uncurry(lambda a, b, m, n, i, s: m == 2 and n == 0)
tan_tansquared = trig_rewriter(
lambda a, b, m, n, i, symbol: ( sympy.sec(a*symbol)**2 - 1))
cotcsc_csceven_condition = uncurry(lambda a, b, m, n, i, s: n.is_even and n >= 4)
cotcsc_csceven = trig_rewriter(
lambda a, b, m, n, i, symbol: ( (1 + sympy.cot(b*symbol)**2) ** (n/2 - 1) *
sympy.csc(b*symbol)**2 *
sympy.cot(a*symbol) ** m ))
cotcsc_cotodd_condition = uncurry(lambda a, b, m, n, i, s: m.is_odd)
cotcsc_cotodd = trig_rewriter(
lambda a, b, m, n, i, symbol: ( (sympy.csc(a*symbol)**2 - 1) ** ((m - 1) / 2) *
sympy.cot(a*symbol) *
sympy.csc(b*symbol) ** n ))
def trig_sincos_rule(integral):
integrand, symbol = integral
if any(integrand.has(f) for f in (sympy.sin, sympy.cos)):
pattern, a, b, m, n = sincos_pattern(symbol)
match = integrand.match(pattern)
if not match:
return
return multiplexer({
sincos_botheven_condition: sincos_botheven,
sincos_sinodd_condition: sincos_sinodd,
sincos_cosodd_condition: sincos_cosodd
})(tuple(
[match.get(i, ZERO) for i in (a, b, m, n)] +
[integrand, symbol]))
def trig_tansec_rule(integral):
integrand, symbol = integral
integrand = integrand.subs({
1 / sympy.cos(symbol): sympy.sec(symbol)
})
if any(integrand.has(f) for f in (sympy.tan, sympy.sec)):
pattern, a, b, m, n = tansec_pattern(symbol)
match = integrand.match(pattern)
if not match:
return
return multiplexer({
tansec_tanodd_condition: tansec_tanodd,
tansec_seceven_condition: tansec_seceven,
tan_tansquared_condition: tan_tansquared
})(tuple(
[match.get(i, ZERO) for i in (a, b, m, n)] +
[integrand, symbol]))
def trig_cotcsc_rule(integral):
integrand, symbol = integral
integrand = integrand.subs({
1 / sympy.sin(symbol): sympy.csc(symbol),
1 / sympy.tan(symbol): sympy.cot(symbol),
sympy.cos(symbol) / sympy.tan(symbol): sympy.cot(symbol)
})
if any(integrand.has(f) for f in (sympy.cot, sympy.csc)):
pattern, a, b, m, n = cotcsc_pattern(symbol)
match = integrand.match(pattern)
if not match:
return
return multiplexer({
cotcsc_cotodd_condition: cotcsc_cotodd,
cotcsc_csceven_condition: cotcsc_csceven
})(tuple(
[match.get(i, ZERO) for i in (a, b, m, n)] +
[integrand, symbol]))
def trig_sindouble_rule(integral):
integrand, symbol = integral
a = sympy.Wild('a', exclude=[sympy.sin(2*symbol)])
match = integrand.match(sympy.sin(2*symbol)*a)
if match:
sin_double = 2*sympy.sin(symbol)*sympy.cos(symbol)/sympy.sin(2*symbol)
return integral_steps(integrand * sin_double, symbol)
def trig_powers_products_rule(integral):
return do_one(null_safe(trig_sincos_rule),
null_safe(trig_tansec_rule),
null_safe(trig_cotcsc_rule),
null_safe(trig_sindouble_rule))(integral)
def trig_substitution_rule(integral):
integrand, symbol = integral
A = sympy.Wild('a', exclude=[0, symbol])
B = sympy.Wild('b', exclude=[0, symbol])
theta = sympy.Dummy("theta")
target_pattern = A + B*symbol**2
matches = integrand.find(target_pattern)
for expr in matches:
match = expr.match(target_pattern)
a = match.get(A, ZERO)
b = match.get(B, ZERO)
a_positive = ((a.is_number and a > 0) or a.is_positive)
b_positive = ((b.is_number and b > 0) or b.is_positive)
a_negative = ((a.is_number and a < 0) or a.is_negative)
b_negative = ((b.is_number and b < 0) or b.is_negative)
x_func = None
if a_positive and b_positive:
# a**2 + b*x**2. Assume sec(theta) > 0, -pi/2 < theta < pi/2
x_func = (sympy.sqrt(a)/sympy.sqrt(b)) * sympy.tan(theta)
# Do not restrict the domain: tan(theta) takes on any real
# value on the interval -pi/2 < theta < pi/2 so x takes on
# any value
restriction = True
elif a_positive and b_negative:
# a**2 - b*x**2. Assume cos(theta) > 0, -pi/2 < theta < pi/2
constant = sympy.sqrt(a)/sympy.sqrt(-b)
x_func = constant * sympy.sin(theta)
restriction = sympy.And(symbol > -constant, symbol < constant)
elif a_negative and b_positive:
# b*x**2 - a**2. Assume sin(theta) > 0, 0 < theta < pi
constant = sympy.sqrt(-a)/sympy.sqrt(b)
x_func = constant * sympy.sec(theta)
restriction = sympy.And(symbol > -constant, symbol < constant)
if x_func:
# Manually simplify sqrt(trig(theta)**2) to trig(theta)
# Valid due to assumed domain restriction
substitutions = {}
for f in [sympy.sin, sympy.cos, sympy.tan,
sympy.sec, sympy.csc, sympy.cot]:
substitutions[sympy.sqrt(f(theta)**2)] = f(theta)
substitutions[sympy.sqrt(f(theta)**(-2))] = 1/f(theta)
replaced = integrand.subs(symbol, x_func).trigsimp()
replaced = manual_subs(replaced, substitutions)
if not replaced.has(symbol):
replaced *= manual_diff(x_func, theta)
replaced = replaced.trigsimp()
secants = replaced.find(1/sympy.cos(theta))
if secants:
replaced = replaced.xreplace({
1/sympy.cos(theta): sympy.sec(theta)
})
substep = integral_steps(replaced, theta)
if not contains_dont_know(substep):
return TrigSubstitutionRule(
theta, x_func, replaced, substep, restriction,
integrand, symbol)
def heaviside_rule(integral):
integrand, symbol = integral
pattern, m, b, g = heaviside_pattern(symbol)
match = integrand.match(pattern)
if match and 0 != match[g]:
# f = Heaviside(m*x + b)*g
v_step = integral_steps(match[g], symbol)
result = _manualintegrate(v_step)
m, b = match[m], match[b]
return HeavisideRule(m*symbol + b, -b/m, result, integrand, symbol)
def substitution_rule(integral):
integrand, symbol = integral
u_var = sympy.Dummy("u")
substitutions = find_substitutions(integrand, symbol, u_var)
count = 0
if substitutions:
debug("List of Substitution Rules")
ways = []
for u_func, c, substituted in substitutions:
subrule = integral_steps(substituted, u_var)
count = count + 1
debug("Rule {}: {}".format(count, subrule))
if contains_dont_know(subrule):
continue
if sympy.simplify(c - 1) != 0:
_, denom = c.as_numer_denom()
if subrule:
subrule = ConstantTimesRule(c, substituted, subrule, substituted, u_var)
if denom.free_symbols:
piecewise = []
could_be_zero = []
if isinstance(denom, sympy.Mul):
could_be_zero = denom.args
else:
could_be_zero.append(denom)
for expr in could_be_zero:
if not fuzzy_not(expr.is_zero):
substep = integral_steps(manual_subs(integrand, expr, 0), symbol)
if substep:
piecewise.append((
substep,
sympy.Eq(expr, 0)
))
piecewise.append((subrule, True))
subrule = PiecewiseRule(piecewise, substituted, symbol)
ways.append(URule(u_var, u_func, c,
subrule,
integrand, symbol))
if len(ways) > 1:
return AlternativeRule(ways, integrand, symbol)
elif ways:
return ways[0]
elif integrand.has(sympy.exp):
u_func = sympy.exp(symbol)
c = 1
substituted = integrand / u_func.diff(symbol)
substituted = substituted.subs(u_func, u_var)
if symbol not in substituted.free_symbols:
return URule(u_var, u_func, c,
integral_steps(substituted, u_var),
integrand, symbol)
partial_fractions_rule = rewriter(
lambda integrand, symbol: integrand.is_rational_function(),
lambda integrand, symbol: integrand.apart(symbol))
cancel_rule = rewriter(
# lambda integrand, symbol: integrand.is_algebraic_expr(),
# lambda integrand, symbol: isinstance(integrand, sympy.Mul),
lambda integrand, symbol: True,
lambda integrand, symbol: integrand.cancel())
distribute_expand_rule = rewriter(
lambda integrand, symbol: (
all(arg.is_Pow or arg.is_polynomial(symbol) for arg in integrand.args)
or isinstance(integrand, sympy.Pow)
or isinstance(integrand, sympy.Mul)),
lambda integrand, symbol: integrand.expand())
trig_expand_rule = rewriter(
# If there are trig functions with different arguments, expand them
lambda integrand, symbol: (
len(set(a.args[0] for a in integrand.atoms(TrigonometricFunction))) > 1),
lambda integrand, symbol: integrand.expand(trig=True))
def derivative_rule(integral):
integrand = integral[0]
diff_variables = integrand.variables
undifferentiated_function = integrand.expr
integrand_variables = undifferentiated_function.free_symbols
if integral.symbol in integrand_variables:
if integral.symbol in diff_variables:
return DerivativeRule(*integral)
else:
return DontKnowRule(integrand, integral.symbol)
else:
return ConstantRule(integral.integrand, *integral)
def rewrites_rule(integral):
integrand, symbol = integral
if integrand.match(1/sympy.cos(symbol)):
rewritten = integrand.subs(1/sympy.cos(symbol), sympy.sec(symbol))
return RewriteRule(rewritten, integral_steps(rewritten, symbol), integrand, symbol)
def fallback_rule(integral):
return DontKnowRule(*integral)
# Cache is used to break cyclic integrals.
# Need to use the same dummy variable in cached expressions for them to match.
# Also record "u" of integration by parts, to avoid infinite repetition.
_integral_cache = {} # type: tDict[Expr, Optional[Expr]]
_parts_u_cache = defaultdict(int) # type: tDict[Expr, int]
_cache_dummy = sympy.Dummy("z")
def integral_steps(integrand, symbol, **options):
"""Returns the steps needed to compute an integral.
This function attempts to mirror what a student would do by hand as
closely as possible.
SymPy Gamma uses this to provide a step-by-step explanation of an
integral. The code it uses to format the results of this function can be
found at
https://github.com/sympy/sympy_gamma/blob/master/app/logic/intsteps.py.
Examples
========
>>> from sympy import exp, sin, cos
>>> from sympy.integrals.manualintegrate import integral_steps
>>> from sympy.abc import x
>>> print(repr(integral_steps(exp(x) / (1 + exp(2 * x)), x))) \
# doctest: +NORMALIZE_WHITESPACE
URule(u_var=_u, u_func=exp(x), constant=1,
substep=PiecewiseRule(subfunctions=[(ArctanRule(a=1, b=1, c=1, context=1/(_u**2 + 1), symbol=_u), True),
(ArccothRule(a=1, b=1, c=1, context=1/(_u**2 + 1), symbol=_u), False),
(ArctanhRule(a=1, b=1, c=1, context=1/(_u**2 + 1), symbol=_u), False)],
context=1/(_u**2 + 1), symbol=_u), context=exp(x)/(exp(2*x) + 1), symbol=x)
>>> print(repr(integral_steps(sin(x), x))) \
# doctest: +NORMALIZE_WHITESPACE
TrigRule(func='sin', arg=x, context=sin(x), symbol=x)
>>> print(repr(integral_steps((x**2 + 3)**2 , x))) \
# doctest: +NORMALIZE_WHITESPACE
RewriteRule(rewritten=x**4 + 6*x**2 + 9,
substep=AddRule(substeps=[PowerRule(base=x, exp=4, context=x**4, symbol=x),
ConstantTimesRule(constant=6, other=x**2,
substep=PowerRule(base=x, exp=2, context=x**2, symbol=x),
context=6*x**2, symbol=x),
ConstantRule(constant=9, context=9, symbol=x)],
context=x**4 + 6*x**2 + 9, symbol=x), context=(x**2 + 3)**2, symbol=x)
Returns
=======
rule : namedtuple
The first step; most rules have substeps that must also be
considered. These substeps can be evaluated using ``manualintegrate``
to obtain a result.
"""
cachekey = integrand.xreplace({symbol: _cache_dummy})
if cachekey in _integral_cache:
if _integral_cache[cachekey] is None:
# Stop this attempt, because it leads around in a loop
return DontKnowRule(integrand, symbol)
else:
# TODO: This is for future development, as currently
# _integral_cache gets no values other than None
return (_integral_cache[cachekey].xreplace(_cache_dummy, symbol),
symbol)
else:
_integral_cache[cachekey] = None
integral = IntegralInfo(integrand, symbol)
def key(integral):
integrand = integral.integrand
if isinstance(integrand, TrigonometricFunction):
return TrigonometricFunction
elif isinstance(integrand, sympy.Derivative):
return sympy.Derivative
elif symbol not in integrand.free_symbols:
return sympy.Number
else:
for cls in (sympy.Pow, sympy.Symbol, sympy.exp, sympy.log,
sympy.Add, sympy.Mul, sympy.atan, sympy.asin,
sympy.acos, sympy.Heaviside, OrthogonalPolynomial):
if isinstance(integrand, cls):
return cls
def integral_is_subclass(*klasses):
def _integral_is_subclass(integral):
k = key(integral)
return k and issubclass(k, klasses)
return _integral_is_subclass
result = do_one(
null_safe(special_function_rule),
null_safe(switch(key, {
sympy.Pow: do_one(null_safe(power_rule), null_safe(inverse_trig_rule), \
null_safe(quadratic_denom_rule)),
sympy.Symbol: power_rule,
sympy.exp: exp_rule,
sympy.Add: add_rule,
sympy.Mul: do_one(null_safe(mul_rule), null_safe(trig_product_rule), \
null_safe(heaviside_rule), null_safe(quadratic_denom_rule), \
null_safe(root_mul_rule)),
sympy.Derivative: derivative_rule,
TrigonometricFunction: trig_rule,
sympy.Heaviside: heaviside_rule,
OrthogonalPolynomial: orthogonal_poly_rule,
sympy.Number: constant_rule
})),
do_one(
null_safe(trig_rule),
null_safe(alternatives(
rewrites_rule,
substitution_rule,
condition(
integral_is_subclass(sympy.Mul, sympy.Pow),
partial_fractions_rule),
condition(
integral_is_subclass(sympy.Mul, sympy.Pow),
cancel_rule),
condition(
integral_is_subclass(sympy.Mul, sympy.log, sympy.atan, sympy.asin, sympy.acos),
parts_rule),
condition(
integral_is_subclass(sympy.Mul, sympy.Pow),
distribute_expand_rule),
trig_powers_products_rule,
trig_expand_rule
)),
null_safe(trig_substitution_rule)
),
fallback_rule)(integral)
del _integral_cache[cachekey]
return result
@evaluates(ConstantRule)
def eval_constant(constant, integrand, symbol):
return constant * symbol
@evaluates(ConstantTimesRule)
def eval_constanttimes(constant, other, substep, integrand, symbol):
return constant * _manualintegrate(substep)
@evaluates(PowerRule)
def eval_power(base, exp, integrand, symbol):
return sympy.Piecewise(
((base**(exp + 1))/(exp + 1), sympy.Ne(exp, -1)),
(sympy.log(base), True),
)
@evaluates(ExpRule)
def eval_exp(base, exp, integrand, symbol):
return integrand / sympy.ln(base)
@evaluates(AddRule)
def eval_add(substeps, integrand, symbol):
return sum(map(_manualintegrate, substeps))
@evaluates(URule)
def eval_u(u_var, u_func, constant, substep, integrand, symbol):
result = _manualintegrate(substep)
if u_func.is_Pow and u_func.exp == -1:
# avoid needless -log(1/x) from substitution
result = result.subs(sympy.log(u_var), -sympy.log(u_func.base))
return result.subs(u_var, u_func)
@evaluates(PartsRule)
def eval_parts(u, dv, v_step, second_step, integrand, symbol):
v = _manualintegrate(v_step)
return u * v - _manualintegrate(second_step)
@evaluates(CyclicPartsRule)
def eval_cyclicparts(parts_rules, coefficient, integrand, symbol):
coefficient = 1 - coefficient
result = []
sign = 1
for rule in parts_rules:
result.append(sign * rule.u * _manualintegrate(rule.v_step))
sign *= -1
return sympy.Add(*result) / coefficient
@evaluates(TrigRule)
def eval_trig(func, arg, integrand, symbol):
if func == 'sin':
return -sympy.cos(arg)
elif func == 'cos':
return sympy.sin(arg)
elif func == 'sec*tan':
return sympy.sec(arg)
elif func == 'csc*cot':
return sympy.csc(arg)
elif func == 'sec**2':
return sympy.tan(arg)
elif func == 'csc**2':
return -sympy.cot(arg)
@evaluates(ArctanRule)
def eval_arctan(a, b, c, integrand, symbol):
return a / b * 1 / sympy.sqrt(c / b) * sympy.atan(symbol / sympy.sqrt(c / b))
@evaluates(ArccothRule)
def eval_arccoth(a, b, c, integrand, symbol):
return - a / b * 1 / sympy.sqrt(-c / b) * sympy.acoth(symbol / sympy.sqrt(-c / b))
@evaluates(ArctanhRule)
def eval_arctanh(a, b, c, integrand, symbol):
return - a / b * 1 / sympy.sqrt(-c / b) * sympy.atanh(symbol / sympy.sqrt(-c / b))
@evaluates(ReciprocalRule)
def eval_reciprocal(func, integrand, symbol):
return sympy.ln(func)
@evaluates(ArcsinRule)
def eval_arcsin(integrand, symbol):
return sympy.asin(symbol)
@evaluates(InverseHyperbolicRule)
def eval_inversehyperbolic(func, integrand, symbol):
return func(symbol)
@evaluates(AlternativeRule)
def eval_alternative(alternatives, integrand, symbol):
return _manualintegrate(alternatives[0])
@evaluates(RewriteRule)
def eval_rewrite(rewritten, substep, integrand, symbol):
return _manualintegrate(substep)
@evaluates(PiecewiseRule)
def eval_piecewise(substeps, integrand, symbol):
return sympy.Piecewise(*[(_manualintegrate(substep), cond)
for substep, cond in substeps])
@evaluates(TrigSubstitutionRule)
def eval_trigsubstitution(theta, func, rewritten, substep, restriction, integrand, symbol):
func = func.subs(sympy.sec(theta), 1/sympy.cos(theta))
trig_function = list(func.find(TrigonometricFunction))
assert len(trig_function) == 1
trig_function = trig_function[0]
relation = sympy.solve(symbol - func, trig_function)
assert len(relation) == 1
numer, denom = sympy.fraction(relation[0])
if isinstance(trig_function, sympy.sin):
opposite = numer
hypotenuse = denom
adjacent = sympy.sqrt(denom**2 - numer**2)
inverse = sympy.asin(relation[0])
elif isinstance(trig_function, sympy.cos):
adjacent = numer
hypotenuse = denom
opposite = sympy.sqrt(denom**2 - numer**2)
inverse = sympy.acos(relation[0])
elif isinstance(trig_function, sympy.tan):
opposite = numer
adjacent = denom
hypotenuse = sympy.sqrt(denom**2 + numer**2)
inverse = sympy.atan(relation[0])
substitution = [
(sympy.sin(theta), opposite/hypotenuse),
(sympy.cos(theta), adjacent/hypotenuse),
(sympy.tan(theta), opposite/adjacent),
(theta, inverse)
]
return sympy.Piecewise(
(_manualintegrate(substep).subs(substitution).trigsimp(), restriction)
)
@evaluates(DerivativeRule)
def eval_derivativerule(integrand, symbol):
# isinstance(integrand, Derivative) should be True
variable_count = list(integrand.variable_count)
for i, (var, count) in enumerate(variable_count):
if var == symbol:
variable_count[i] = (var, count-1)
break
return sympy.Derivative(integrand.expr, *variable_count)
@evaluates(HeavisideRule)
def eval_heaviside(harg, ibnd, substep, integrand, symbol):
# If we are integrating over x and the integrand has the form
# Heaviside(m*x+b)*g(x) == Heaviside(harg)*g(symbol)
# then there needs to be continuity at -b/m == ibnd,
# so we subtract the appropriate term.
return sympy.Heaviside(harg)*(substep - substep.subs(symbol, ibnd))
@evaluates(JacobiRule)
def eval_jacobi(n, a, b, integrand, symbol):
return Piecewise(
(2*sympy.jacobi(n + 1, a - 1, b - 1, symbol)/(n + a + b), Ne(n + a + b, 0)),
(symbol, Eq(n, 0)),
((a + b + 2)*symbol**2/4 + (a - b)*symbol/2, Eq(n, 1)))
@evaluates(GegenbauerRule)
def eval_gegenbauer(n, a, integrand, symbol):
return Piecewise(
(sympy.gegenbauer(n + 1, a - 1, symbol)/(2*(a - 1)), Ne(a, 1)),
(sympy.chebyshevt(n + 1, symbol)/(n + 1), Ne(n, -1)),
(sympy.S.Zero, True))
@evaluates(ChebyshevTRule)
def eval_chebyshevt(n, integrand, symbol):
return Piecewise(((sympy.chebyshevt(n + 1, symbol)/(n + 1) -
sympy.chebyshevt(n - 1, symbol)/(n - 1))/2, Ne(sympy.Abs(n), 1)),
(symbol**2/2, True))
@evaluates(ChebyshevURule)
def eval_chebyshevu(n, integrand, symbol):
return Piecewise(
(sympy.chebyshevt(n + 1, symbol)/(n + 1), Ne(n, -1)),
(sympy.S.Zero, True))
@evaluates(LegendreRule)
def eval_legendre(n, integrand, symbol):
return (sympy.legendre(n + 1, symbol) - sympy.legendre(n - 1, symbol))/(2*n + 1)
@evaluates(HermiteRule)
def eval_hermite(n, integrand, symbol):
return sympy.hermite(n + 1, symbol)/(2*(n + 1))
@evaluates(LaguerreRule)
def eval_laguerre(n, integrand, symbol):
return sympy.laguerre(n, symbol) - sympy.laguerre(n + 1, symbol)
@evaluates(AssocLaguerreRule)
def eval_assoclaguerre(n, a, integrand, symbol):
return -sympy.assoc_laguerre(n + 1, a - 1, symbol)
@evaluates(CiRule)
def eval_ci(a, b, integrand, symbol):
return sympy.cos(b)*sympy.Ci(a*symbol) - sympy.sin(b)*sympy.Si(a*symbol)
@evaluates(ChiRule)
def eval_chi(a, b, integrand, symbol):
return sympy.cosh(b)*sympy.Chi(a*symbol) + sympy.sinh(b)*sympy.Shi(a*symbol)
@evaluates(EiRule)
def eval_ei(a, b, integrand, symbol):
return sympy.exp(b)*sympy.Ei(a*symbol)
@evaluates(SiRule)
def eval_si(a, b, integrand, symbol):
return sympy.sin(b)*sympy.Ci(a*symbol) + sympy.cos(b)*sympy.Si(a*symbol)
@evaluates(ShiRule)
def eval_shi(a, b, integrand, symbol):
return sympy.sinh(b)*sympy.Chi(a*symbol) + sympy.cosh(b)*sympy.Shi(a*symbol)
@evaluates(ErfRule)
def eval_erf(a, b, c, integrand, symbol):
if a.is_extended_real:
return Piecewise(
(sympy.sqrt(sympy.pi/(-a))/2 * sympy.exp(c - b**2/(4*a)) *
sympy.erf((-2*a*symbol - b)/(2*sympy.sqrt(-a))), a < 0),
(sympy.sqrt(sympy.pi/a)/2 * sympy.exp(c - b**2/(4*a)) *
sympy.erfi((2*a*symbol + b)/(2*sympy.sqrt(a))), True))
else:
return sympy.sqrt(sympy.pi/a)/2 * sympy.exp(c - b**2/(4*a)) * \
sympy.erfi((2*a*symbol + b)/(2*sympy.sqrt(a)))
@evaluates(FresnelCRule)
def eval_fresnelc(a, b, c, integrand, symbol):
return sympy.sqrt(sympy.pi/(2*a)) * (
sympy.cos(b**2/(4*a) - c)*sympy.fresnelc((2*a*symbol + b)/sympy.sqrt(2*a*sympy.pi)) +
sympy.sin(b**2/(4*a) - c)*sympy.fresnels((2*a*symbol + b)/sympy.sqrt(2*a*sympy.pi)))
@evaluates(FresnelSRule)
def eval_fresnels(a, b, c, integrand, symbol):
return sympy.sqrt(sympy.pi/(2*a)) * (
sympy.cos(b**2/(4*a) - c)*sympy.fresnels((2*a*symbol + b)/sympy.sqrt(2*a*sympy.pi)) -
sympy.sin(b**2/(4*a) - c)*sympy.fresnelc((2*a*symbol + b)/sympy.sqrt(2*a*sympy.pi)))
@evaluates(LiRule)
def eval_li(a, b, integrand, symbol):
return sympy.li(a*symbol + b)/a
@evaluates(PolylogRule)
def eval_polylog(a, b, integrand, symbol):
return sympy.polylog(b + 1, a*symbol)
@evaluates(UpperGammaRule)
def eval_uppergamma(a, e, integrand, symbol):
return symbol**e * (-a*symbol)**(-e) * sympy.uppergamma(e + 1, -a*symbol)/a
@evaluates(EllipticFRule)
def eval_elliptic_f(a, d, integrand, symbol):
return sympy.elliptic_f(symbol, d/a)/sympy.sqrt(a)
@evaluates(EllipticERule)
def eval_elliptic_e(a, d, integrand, symbol):
return sympy.elliptic_e(symbol, d/a)*sympy.sqrt(a)
@evaluates(DontKnowRule)
def eval_dontknowrule(integrand, symbol):
return sympy.Integral(integrand, symbol)
def _manualintegrate(rule):
evaluator = evaluators.get(rule.__class__)
if not evaluator:
raise ValueError("Cannot evaluate rule %s" % repr(rule))
return evaluator(*rule)
def manualintegrate(f, var):
"""manualintegrate(f, var)
Compute indefinite integral of a single variable using an algorithm that
resembles what a student would do by hand.
Unlike :func:`~.integrate`, var can only be a single symbol.
Examples
========
>>> from sympy import sin, cos, tan, exp, log, integrate
>>> from sympy.integrals.manualintegrate import manualintegrate
>>> from sympy.abc import x
>>> manualintegrate(1 / x, x)
log(x)
>>> integrate(1/x)
log(x)
>>> manualintegrate(log(x), x)
x*log(x) - x
>>> integrate(log(x))
x*log(x) - x
>>> manualintegrate(exp(x) / (1 + exp(2 * x)), x)
atan(exp(x))
>>> integrate(exp(x) / (1 + exp(2 * x)))
RootSum(4*_z**2 + 1, Lambda(_i, _i*log(2*_i + exp(x))))
>>> manualintegrate(cos(x)**4 * sin(x), x)
-cos(x)**5/5
>>> integrate(cos(x)**4 * sin(x), x)
-cos(x)**5/5
>>> manualintegrate(cos(x)**4 * sin(x)**3, x)
cos(x)**7/7 - cos(x)**5/5
>>> integrate(cos(x)**4 * sin(x)**3, x)
cos(x)**7/7 - cos(x)**5/5
>>> manualintegrate(tan(x), x)
-log(cos(x))
>>> integrate(tan(x), x)
-log(cos(x))
See Also
========
sympy.integrals.integrals.integrate
sympy.integrals.integrals.Integral.doit
sympy.integrals.integrals.Integral
"""
result = _manualintegrate(integral_steps(f, var))
# Clear the cache of u-parts
_parts_u_cache.clear()
# If we got Piecewise with two parts, put generic first
if isinstance(result, Piecewise) and len(result.args) == 2:
cond = result.args[0][1]
if isinstance(cond, Eq) and result.args[1][1] == True:
result = result.func(
(result.args[1][0], sympy.Ne(*cond.args)),
(result.args[0][0], True))
return result
|
fad20835344277455a5aa94139c504103d0a0493a7d22184088b59317cf4416b | """ Integral Transforms """
from __future__ import print_function, division
from sympy.core import S
from sympy.core.compatibility import reduce, iterable
from sympy.core.function import Function
from sympy.core.relational import _canonical, Ge, Gt
from sympy.core.numbers import oo
from sympy.core.symbol import Dummy
from sympy.integrals import integrate, Integral
from sympy.integrals.meijerint import _dummy
from sympy.logic.boolalg import to_cnf, conjuncts, disjuncts, Or, And
from sympy.simplify import simplify
from sympy.utilities import default_sort_key
from sympy.matrices.matrices import MatrixBase
##########################################################################
# Helpers / Utilities
##########################################################################
class IntegralTransformError(NotImplementedError):
"""
Exception raised in relation to problems computing transforms.
This class is mostly used internally; if integrals cannot be computed
objects representing unevaluated transforms are usually returned.
The hint ``needeval=True`` can be used to disable returning transform
objects, and instead raise this exception if an integral cannot be
computed.
"""
def __init__(self, transform, function, msg):
super(IntegralTransformError, self).__init__(
"%s Transform could not be computed: %s." % (transform, msg))
self.function = function
class IntegralTransform(Function):
"""
Base class for integral transforms.
This class represents unevaluated transforms.
To implement a concrete transform, derive from this class and implement
the ``_compute_transform(f, x, s, **hints)`` and ``_as_integral(f, x, s)``
functions. If the transform cannot be computed, raise :obj:`IntegralTransformError`.
Also set ``cls._name``. For instance,
>>> from sympy.integrals.transforms import LaplaceTransform
>>> LaplaceTransform._name
'Laplace'
Implement ``self._collapse_extra`` if your function returns more than just a
number and possibly a convergence condition.
"""
@property
def function(self):
""" The function to be transformed. """
return self.args[0]
@property
def function_variable(self):
""" The dependent variable of the function to be transformed. """
return self.args[1]
@property
def transform_variable(self):
""" The independent transform variable. """
return self.args[2]
@property
def free_symbols(self):
"""
This method returns the symbols that will exist when the transform
is evaluated.
"""
return self.function.free_symbols.union({self.transform_variable}) \
- {self.function_variable}
def _compute_transform(self, f, x, s, **hints):
raise NotImplementedError
def _as_integral(self, f, x, s):
raise NotImplementedError
def _collapse_extra(self, extra):
cond = And(*extra)
if cond == False:
raise IntegralTransformError(self.__class__.name, None, '')
return cond
def doit(self, **hints):
"""
Try to evaluate the transform in closed form.
This general function handles linearity, but apart from that leaves
pretty much everything to _compute_transform.
Standard hints are the following:
- ``simplify``: whether or not to simplify the result
- ``noconds``: if True, don't return convergence conditions
- ``needeval``: if True, raise IntegralTransformError instead of
returning IntegralTransform objects
The default values of these hints depend on the concrete transform,
usually the default is
``(simplify, noconds, needeval) = (True, False, False)``.
"""
from sympy import Add, expand_mul, Mul
from sympy.core.function import AppliedUndef
needeval = hints.pop('needeval', False)
try_directly = not any(func.has(self.function_variable)
for func in self.function.atoms(AppliedUndef))
if try_directly:
try:
return self._compute_transform(self.function,
self.function_variable, self.transform_variable, **hints)
except IntegralTransformError:
pass
fn = self.function
if not fn.is_Add:
fn = expand_mul(fn)
if fn.is_Add:
hints['needeval'] = needeval
res = [self.__class__(*([x] + list(self.args[1:]))).doit(**hints)
for x in fn.args]
extra = []
ress = []
for x in res:
if not isinstance(x, tuple):
x = [x]
ress.append(x[0])
if len(x) == 2:
# only a condition
extra.append(x[1])
elif len(x) > 2:
# some region parameters and a condition (Mellin, Laplace)
extra += [x[1:]]
res = Add(*ress)
if not extra:
return res
try:
extra = self._collapse_extra(extra)
if iterable(extra):
return tuple([res]) + tuple(extra)
else:
return (res, extra)
except IntegralTransformError:
pass
if needeval:
raise IntegralTransformError(
self.__class__._name, self.function, 'needeval')
# TODO handle derivatives etc
# pull out constant coefficients
coeff, rest = fn.as_coeff_mul(self.function_variable)
return coeff*self.__class__(*([Mul(*rest)] + list(self.args[1:])))
@property
def as_integral(self):
return self._as_integral(self.function, self.function_variable,
self.transform_variable)
def _eval_rewrite_as_Integral(self, *args, **kwargs):
return self.as_integral
from sympy.solvers.inequalities import _solve_inequality
def _simplify(expr, doit):
from sympy import powdenest, piecewise_fold
if doit:
return simplify(powdenest(piecewise_fold(expr), polar=True))
return expr
def _noconds_(default):
"""
This is a decorator generator for dropping convergence conditions.
Suppose you define a function ``transform(*args)`` which returns a tuple of
the form ``(result, cond1, cond2, ...)``.
Decorating it ``@_noconds_(default)`` will add a new keyword argument
``noconds`` to it. If ``noconds=True``, the return value will be altered to
be only ``result``, whereas if ``noconds=False`` the return value will not
be altered.
The default value of the ``noconds`` keyword will be ``default`` (i.e. the
argument of this function).
"""
def make_wrapper(func):
from sympy.core.decorators import wraps
@wraps(func)
def wrapper(*args, **kwargs):
noconds = kwargs.pop('noconds', default)
res = func(*args, **kwargs)
if noconds:
return res[0]
return res
return wrapper
return make_wrapper
_noconds = _noconds_(False)
##########################################################################
# Mellin Transform
##########################################################################
def _default_integrator(f, x):
return integrate(f, (x, 0, oo))
@_noconds
def _mellin_transform(f, x, s_, integrator=_default_integrator, simplify=True):
""" Backend function to compute Mellin transforms. """
from sympy import re, Max, Min, count_ops
# We use a fresh dummy, because assumptions on s might drop conditions on
# convergence of the integral.
s = _dummy('s', 'mellin-transform', f)
F = integrator(x**(s - 1) * f, x)
if not F.has(Integral):
return _simplify(F.subs(s, s_), simplify), (-oo, oo), S.true
if not F.is_Piecewise: # XXX can this work if integration gives continuous result now?
raise IntegralTransformError('Mellin', f, 'could not compute integral')
F, cond = F.args[0]
if F.has(Integral):
raise IntegralTransformError(
'Mellin', f, 'integral in unexpected form')
def process_conds(cond):
"""
Turn ``cond`` into a strip (a, b), and auxiliary conditions.
"""
a = -oo
b = oo
aux = S.true
conds = conjuncts(to_cnf(cond))
t = Dummy('t', real=True)
for c in conds:
a_ = oo
b_ = -oo
aux_ = []
for d in disjuncts(c):
d_ = d.replace(
re, lambda x: x.as_real_imag()[0]).subs(re(s), t)
if not d.is_Relational or \
d.rel_op in ('==', '!=') \
or d_.has(s) or not d_.has(t):
aux_ += [d]
continue
soln = _solve_inequality(d_, t)
if not soln.is_Relational or \
soln.rel_op in ('==', '!='):
aux_ += [d]
continue
if soln.lts == t:
b_ = Max(soln.gts, b_)
else:
a_ = Min(soln.lts, a_)
if a_ != oo and a_ != b:
a = Max(a_, a)
elif b_ != -oo and b_ != a:
b = Min(b_, b)
else:
aux = And(aux, Or(*aux_))
return a, b, aux
conds = [process_conds(c) for c in disjuncts(cond)]
conds = [x for x in conds if x[2] != False]
conds.sort(key=lambda x: (x[0] - x[1], count_ops(x[2])))
if not conds:
raise IntegralTransformError('Mellin', f, 'no convergence found')
a, b, aux = conds[0]
return _simplify(F.subs(s, s_), simplify), (a, b), aux
class MellinTransform(IntegralTransform):
"""
Class representing unevaluated Mellin transforms.
For usage of this class, see the :class:`IntegralTransform` docstring.
For how to compute Mellin transforms, see the :func:`mellin_transform`
docstring.
"""
_name = 'Mellin'
def _compute_transform(self, f, x, s, **hints):
return _mellin_transform(f, x, s, **hints)
def _as_integral(self, f, x, s):
return Integral(f*x**(s - 1), (x, 0, oo))
def _collapse_extra(self, extra):
from sympy import Max, Min
a = []
b = []
cond = []
for (sa, sb), c in extra:
a += [sa]
b += [sb]
cond += [c]
res = (Max(*a), Min(*b)), And(*cond)
if (res[0][0] >= res[0][1]) == True or res[1] == False:
raise IntegralTransformError(
'Mellin', None, 'no combined convergence.')
return res
def mellin_transform(f, x, s, **hints):
r"""
Compute the Mellin transform `F(s)` of `f(x)`,
.. math :: F(s) = \int_0^\infty x^{s-1} f(x) \mathrm{d}x.
For all "sensible" functions, this converges absolutely in a strip
`a < \operatorname{Re}(s) < b`.
The Mellin transform is related via change of variables to the Fourier
transform, and also to the (bilateral) Laplace transform.
This function returns ``(F, (a, b), cond)``
where ``F`` is the Mellin transform of ``f``, ``(a, b)`` is the fundamental strip
(as above), and ``cond`` are auxiliary convergence conditions.
If the integral cannot be computed in closed form, this function returns
an unevaluated :class:`MellinTransform` object.
For a description of possible hints, refer to the docstring of
:func:`sympy.integrals.transforms.IntegralTransform.doit`. If ``noconds=False``,
then only `F` will be returned (i.e. not ``cond``, and also not the strip
``(a, b)``).
>>> from sympy.integrals.transforms import mellin_transform
>>> from sympy import exp
>>> from sympy.abc import x, s
>>> mellin_transform(exp(-x), x, s)
(gamma(s), (0, oo), True)
See Also
========
inverse_mellin_transform, laplace_transform, fourier_transform
hankel_transform, inverse_hankel_transform
"""
return MellinTransform(f, x, s).doit(**hints)
def _rewrite_sin(m_n, s, a, b):
"""
Re-write the sine function ``sin(m*s + n)`` as gamma functions, compatible
with the strip (a, b).
Return ``(gamma1, gamma2, fac)`` so that ``f == fac/(gamma1 * gamma2)``.
>>> from sympy.integrals.transforms import _rewrite_sin
>>> from sympy import pi, S
>>> from sympy.abc import s
>>> _rewrite_sin((pi, 0), s, 0, 1)
(gamma(s), gamma(1 - s), pi)
>>> _rewrite_sin((pi, 0), s, 1, 0)
(gamma(s - 1), gamma(2 - s), -pi)
>>> _rewrite_sin((pi, 0), s, -1, 0)
(gamma(s + 1), gamma(-s), -pi)
>>> _rewrite_sin((pi, pi/2), s, S(1)/2, S(3)/2)
(gamma(s - 1/2), gamma(3/2 - s), -pi)
>>> _rewrite_sin((pi, pi), s, 0, 1)
(gamma(s), gamma(1 - s), -pi)
>>> _rewrite_sin((2*pi, 0), s, 0, S(1)/2)
(gamma(2*s), gamma(1 - 2*s), pi)
>>> _rewrite_sin((2*pi, 0), s, S(1)/2, 1)
(gamma(2*s - 1), gamma(2 - 2*s), -pi)
"""
# (This is a separate function because it is moderately complicated,
# and I want to doctest it.)
# We want to use pi/sin(pi*x) = gamma(x)*gamma(1-x).
# But there is one comlication: the gamma functions determine the
# inegration contour in the definition of the G-function. Usually
# it would not matter if this is slightly shifted, unless this way
# we create an undefined function!
# So we try to write this in such a way that the gammas are
# eminently on the right side of the strip.
from sympy import expand_mul, pi, ceiling, gamma
m, n = m_n
m = expand_mul(m/pi)
n = expand_mul(n/pi)
r = ceiling(-m*a - n.as_real_imag()[0]) # Don't use re(n), does not expand
return gamma(m*s + n + r), gamma(1 - n - r - m*s), (-1)**r*pi
class MellinTransformStripError(ValueError):
"""
Exception raised by _rewrite_gamma. Mainly for internal use.
"""
pass
def _rewrite_gamma(f, s, a, b):
"""
Try to rewrite the product f(s) as a product of gamma functions,
so that the inverse Mellin transform of f can be expressed as a meijer
G function.
Return (an, ap), (bm, bq), arg, exp, fac such that
G((an, ap), (bm, bq), arg/z**exp)*fac is the inverse Mellin transform of f(s).
Raises IntegralTransformError or MellinTransformStripError on failure.
It is asserted that f has no poles in the fundamental strip designated by
(a, b). One of a and b is allowed to be None. The fundamental strip is
important, because it determines the inversion contour.
This function can handle exponentials, linear factors, trigonometric
functions.
This is a helper function for inverse_mellin_transform that will not
attempt any transformations on f.
>>> from sympy.integrals.transforms import _rewrite_gamma
>>> from sympy.abc import s
>>> from sympy import oo
>>> _rewrite_gamma(s*(s+3)*(s-1), s, -oo, oo)
(([], [-3, 0, 1]), ([-2, 1, 2], []), 1, 1, -1)
>>> _rewrite_gamma((s-1)**2, s, -oo, oo)
(([], [1, 1]), ([2, 2], []), 1, 1, 1)
Importance of the fundamental strip:
>>> _rewrite_gamma(1/s, s, 0, oo)
(([1], []), ([], [0]), 1, 1, 1)
>>> _rewrite_gamma(1/s, s, None, oo)
(([1], []), ([], [0]), 1, 1, 1)
>>> _rewrite_gamma(1/s, s, 0, None)
(([1], []), ([], [0]), 1, 1, 1)
>>> _rewrite_gamma(1/s, s, -oo, 0)
(([], [1]), ([0], []), 1, 1, -1)
>>> _rewrite_gamma(1/s, s, None, 0)
(([], [1]), ([0], []), 1, 1, -1)
>>> _rewrite_gamma(1/s, s, -oo, None)
(([], [1]), ([0], []), 1, 1, -1)
>>> _rewrite_gamma(2**(-s+3), s, -oo, oo)
(([], []), ([], []), 1/2, 1, 8)
"""
from itertools import repeat
from sympy import (Poly, gamma, Mul, re, CRootOf, exp as exp_, expand,
roots, ilcm, pi, sin, cos, tan, cot, igcd, exp_polar)
# Our strategy will be as follows:
# 1) Guess a constant c such that the inversion integral should be
# performed wrt s'=c*s (instead of plain s). Write s for s'.
# 2) Process all factors, rewrite them independently as gamma functions in
# argument s, or exponentials of s.
# 3) Try to transform all gamma functions s.t. they have argument
# a+s or a-s.
# 4) Check that the resulting G function parameters are valid.
# 5) Combine all the exponentials.
a_, b_ = S([a, b])
def left(c, is_numer):
"""
Decide whether pole at c lies to the left of the fundamental strip.
"""
# heuristically, this is the best chance for us to solve the inequalities
c = expand(re(c))
if a_ is None and b_ is oo:
return True
if a_ is None:
return c < b_
if b_ is None:
return c <= a_
if (c >= b_) == True:
return False
if (c <= a_) == True:
return True
if is_numer:
return None
if a_.free_symbols or b_.free_symbols or c.free_symbols:
return None # XXX
#raise IntegralTransformError('Inverse Mellin', f,
# 'Could not determine position of singularity %s'
# ' relative to fundamental strip' % c)
raise MellinTransformStripError('Pole inside critical strip?')
# 1)
s_multipliers = []
for g in f.atoms(gamma):
if not g.has(s):
continue
arg = g.args[0]
if arg.is_Add:
arg = arg.as_independent(s)[1]
coeff, _ = arg.as_coeff_mul(s)
s_multipliers += [coeff]
for g in f.atoms(sin, cos, tan, cot):
if not g.has(s):
continue
arg = g.args[0]
if arg.is_Add:
arg = arg.as_independent(s)[1]
coeff, _ = arg.as_coeff_mul(s)
s_multipliers += [coeff/pi]
s_multipliers = [abs(x) if x.is_extended_real else x for x in s_multipliers]
common_coefficient = S.One
for x in s_multipliers:
if not x.is_Rational:
common_coefficient = x
break
s_multipliers = [x/common_coefficient for x in s_multipliers]
if (any(not x.is_Rational for x in s_multipliers) or
not common_coefficient.is_extended_real):
raise IntegralTransformError("Gamma", None, "Nonrational multiplier")
s_multiplier = common_coefficient/reduce(ilcm, [S(x.q)
for x in s_multipliers], S.One)
if s_multiplier == common_coefficient:
if len(s_multipliers) == 0:
s_multiplier = common_coefficient
else:
s_multiplier = common_coefficient \
*reduce(igcd, [S(x.p) for x in s_multipliers])
f = f.subs(s, s/s_multiplier)
fac = S.One/s_multiplier
exponent = S.One/s_multiplier
if a_ is not None:
a_ *= s_multiplier
if b_ is not None:
b_ *= s_multiplier
# 2)
numer, denom = f.as_numer_denom()
numer = Mul.make_args(numer)
denom = Mul.make_args(denom)
args = list(zip(numer, repeat(True))) + list(zip(denom, repeat(False)))
facs = []
dfacs = []
# *_gammas will contain pairs (a, c) representing Gamma(a*s + c)
numer_gammas = []
denom_gammas = []
# exponentials will contain bases for exponentials of s
exponentials = []
def exception(fact):
return IntegralTransformError("Inverse Mellin", f, "Unrecognised form '%s'." % fact)
while args:
fact, is_numer = args.pop()
if is_numer:
ugammas, lgammas = numer_gammas, denom_gammas
ufacs = facs
else:
ugammas, lgammas = denom_gammas, numer_gammas
ufacs = dfacs
def linear_arg(arg):
""" Test if arg is of form a*s+b, raise exception if not. """
if not arg.is_polynomial(s):
raise exception(fact)
p = Poly(arg, s)
if p.degree() != 1:
raise exception(fact)
return p.all_coeffs()
# constants
if not fact.has(s):
ufacs += [fact]
# exponentials
elif fact.is_Pow or isinstance(fact, exp_):
if fact.is_Pow:
base = fact.base
exp = fact.exp
else:
base = exp_polar(1)
exp = fact.args[0]
if exp.is_Integer:
cond = is_numer
if exp < 0:
cond = not cond
args += [(base, cond)]*abs(exp)
continue
elif not base.has(s):
a, b = linear_arg(exp)
if not is_numer:
base = 1/base
exponentials += [base**a]
facs += [base**b]
else:
raise exception(fact)
# linear factors
elif fact.is_polynomial(s):
p = Poly(fact, s)
if p.degree() != 1:
# We completely factor the poly. For this we need the roots.
# Now roots() only works in some cases (low degree), and CRootOf
# only works without parameters. So try both...
coeff = p.LT()[1]
rs = roots(p, s)
if len(rs) != p.degree():
rs = CRootOf.all_roots(p)
ufacs += [coeff]
args += [(s - c, is_numer) for c in rs]
continue
a, c = p.all_coeffs()
ufacs += [a]
c /= -a
# Now need to convert s - c
if left(c, is_numer):
ugammas += [(S.One, -c + 1)]
lgammas += [(S.One, -c)]
else:
ufacs += [-1]
ugammas += [(S.NegativeOne, c + 1)]
lgammas += [(S.NegativeOne, c)]
elif isinstance(fact, gamma):
a, b = linear_arg(fact.args[0])
if is_numer:
if (a > 0 and (left(-b/a, is_numer) == False)) or \
(a < 0 and (left(-b/a, is_numer) == True)):
raise NotImplementedError(
'Gammas partially over the strip.')
ugammas += [(a, b)]
elif isinstance(fact, sin):
# We try to re-write all trigs as gammas. This is not in
# general the best strategy, since sometimes this is impossible,
# but rewriting as exponentials would work. However trig functions
# in inverse mellin transforms usually all come from simplifying
# gamma terms, so this should work.
a = fact.args[0]
if is_numer:
# No problem with the poles.
gamma1, gamma2, fac_ = gamma(a/pi), gamma(1 - a/pi), pi
else:
gamma1, gamma2, fac_ = _rewrite_sin(linear_arg(a), s, a_, b_)
args += [(gamma1, not is_numer), (gamma2, not is_numer)]
ufacs += [fac_]
elif isinstance(fact, tan):
a = fact.args[0]
args += [(sin(a, evaluate=False), is_numer),
(sin(pi/2 - a, evaluate=False), not is_numer)]
elif isinstance(fact, cos):
a = fact.args[0]
args += [(sin(pi/2 - a, evaluate=False), is_numer)]
elif isinstance(fact, cot):
a = fact.args[0]
args += [(sin(pi/2 - a, evaluate=False), is_numer),
(sin(a, evaluate=False), not is_numer)]
else:
raise exception(fact)
fac *= Mul(*facs)/Mul(*dfacs)
# 3)
an, ap, bm, bq = [], [], [], []
for gammas, plus, minus, is_numer in [(numer_gammas, an, bm, True),
(denom_gammas, bq, ap, False)]:
while gammas:
a, c = gammas.pop()
if a != -1 and a != +1:
# We use the gamma function multiplication theorem.
p = abs(S(a))
newa = a/p
newc = c/p
if not a.is_Integer:
raise TypeError("a is not an integer")
for k in range(p):
gammas += [(newa, newc + k/p)]
if is_numer:
fac *= (2*pi)**((1 - p)/2) * p**(c - S.Half)
exponentials += [p**a]
else:
fac /= (2*pi)**((1 - p)/2) * p**(c - S.Half)
exponentials += [p**(-a)]
continue
if a == +1:
plus.append(1 - c)
else:
minus.append(c)
# 4)
# TODO
# 5)
arg = Mul(*exponentials)
# for testability, sort the arguments
an.sort(key=default_sort_key)
ap.sort(key=default_sort_key)
bm.sort(key=default_sort_key)
bq.sort(key=default_sort_key)
return (an, ap), (bm, bq), arg, exponent, fac
@_noconds_(True)
def _inverse_mellin_transform(F, s, x_, strip, as_meijerg=False):
""" A helper for the real inverse_mellin_transform function, this one here
assumes x to be real and positive. """
from sympy import (expand, expand_mul, hyperexpand, meijerg,
arg, pi, re, factor, Heaviside, gamma, Add)
x = _dummy('t', 'inverse-mellin-transform', F, positive=True)
# Actually, we won't try integration at all. Instead we use the definition
# of the Meijer G function as a fairly general inverse mellin transform.
F = F.rewrite(gamma)
for g in [factor(F), expand_mul(F), expand(F)]:
if g.is_Add:
# do all terms separately
ress = [_inverse_mellin_transform(G, s, x, strip, as_meijerg,
noconds=False)
for G in g.args]
conds = [p[1] for p in ress]
ress = [p[0] for p in ress]
res = Add(*ress)
if not as_meijerg:
res = factor(res, gens=res.atoms(Heaviside))
return res.subs(x, x_), And(*conds)
try:
a, b, C, e, fac = _rewrite_gamma(g, s, strip[0], strip[1])
except IntegralTransformError:
continue
try:
G = meijerg(a, b, C/x**e)
except ValueError:
continue
if as_meijerg:
h = G
else:
try:
h = hyperexpand(G)
except NotImplementedError:
raise IntegralTransformError(
'Inverse Mellin', F, 'Could not calculate integral')
if h.is_Piecewise and len(h.args) == 3:
# XXX we break modularity here!
h = Heaviside(x - abs(C))*h.args[0].args[0] \
+ Heaviside(abs(C) - x)*h.args[1].args[0]
# We must ensure that the integral along the line we want converges,
# and return that value.
# See [L], 5.2
cond = [abs(arg(G.argument)) < G.delta*pi]
# Note: we allow ">=" here, this corresponds to convergence if we let
# limits go to oo symmetrically. ">" corresponds to absolute convergence.
cond += [And(Or(len(G.ap) != len(G.bq), 0 >= re(G.nu) + 1),
abs(arg(G.argument)) == G.delta*pi)]
cond = Or(*cond)
if cond == False:
raise IntegralTransformError(
'Inverse Mellin', F, 'does not converge')
return (h*fac).subs(x, x_), cond
raise IntegralTransformError('Inverse Mellin', F, '')
_allowed = None
class InverseMellinTransform(IntegralTransform):
"""
Class representing unevaluated inverse Mellin transforms.
For usage of this class, see the :class:`IntegralTransform` docstring.
For how to compute inverse Mellin transforms, see the
:func:`inverse_mellin_transform` docstring.
"""
_name = 'Inverse Mellin'
_none_sentinel = Dummy('None')
_c = Dummy('c')
def __new__(cls, F, s, x, a, b, **opts):
if a is None:
a = InverseMellinTransform._none_sentinel
if b is None:
b = InverseMellinTransform._none_sentinel
return IntegralTransform.__new__(cls, F, s, x, a, b, **opts)
@property
def fundamental_strip(self):
a, b = self.args[3], self.args[4]
if a is InverseMellinTransform._none_sentinel:
a = None
if b is InverseMellinTransform._none_sentinel:
b = None
return a, b
def _compute_transform(self, F, s, x, **hints):
from sympy import postorder_traversal
global _allowed
if _allowed is None:
from sympy import (
exp, gamma, sin, cos, tan, cot, cosh, sinh, tanh,
coth, factorial, rf)
_allowed = set(
[exp, gamma, sin, cos, tan, cot, cosh, sinh, tanh, coth,
factorial, rf])
for f in postorder_traversal(F):
if f.is_Function and f.has(s) and f.func not in _allowed:
raise IntegralTransformError('Inverse Mellin', F,
'Component %s not recognised.' % f)
strip = self.fundamental_strip
return _inverse_mellin_transform(F, s, x, strip, **hints)
def _as_integral(self, F, s, x):
from sympy import I
c = self.__class__._c
return Integral(F*x**(-s), (s, c - I*oo, c + I*oo))/(2*S.Pi*S.ImaginaryUnit)
def inverse_mellin_transform(F, s, x, strip, **hints):
r"""
Compute the inverse Mellin transform of `F(s)` over the fundamental
strip given by ``strip=(a, b)``.
This can be defined as
.. math:: f(x) = \frac{1}{2\pi i} \int_{c - i\infty}^{c + i\infty} x^{-s} F(s) \mathrm{d}s,
for any `c` in the fundamental strip. Under certain regularity
conditions on `F` and/or `f`,
this recovers `f` from its Mellin transform `F`
(and vice versa), for positive real `x`.
One of `a` or `b` may be passed as ``None``; a suitable `c` will be
inferred.
If the integral cannot be computed in closed form, this function returns
an unevaluated :class:`InverseMellinTransform` object.
Note that this function will assume x to be positive and real, regardless
of the sympy assumptions!
For a description of possible hints, refer to the docstring of
:func:`sympy.integrals.transforms.IntegralTransform.doit`.
>>> from sympy.integrals.transforms import inverse_mellin_transform
>>> from sympy import oo, gamma
>>> from sympy.abc import x, s
>>> inverse_mellin_transform(gamma(s), s, x, (0, oo))
exp(-x)
The fundamental strip matters:
>>> f = 1/(s**2 - 1)
>>> inverse_mellin_transform(f, s, x, (-oo, -1))
(x/2 - 1/(2*x))*Heaviside(x - 1)
>>> inverse_mellin_transform(f, s, x, (-1, 1))
-x*Heaviside(1 - x)/2 - Heaviside(x - 1)/(2*x)
>>> inverse_mellin_transform(f, s, x, (1, oo))
(-x/2 + 1/(2*x))*Heaviside(1 - x)
See Also
========
mellin_transform
hankel_transform, inverse_hankel_transform
"""
return InverseMellinTransform(F, s, x, strip[0], strip[1]).doit(**hints)
##########################################################################
# Laplace Transform
##########################################################################
def _simplifyconds(expr, s, a):
r"""
Naively simplify some conditions occurring in ``expr``, given that `\operatorname{Re}(s) > a`.
>>> from sympy.integrals.transforms import _simplifyconds as simp
>>> from sympy.abc import x
>>> from sympy import sympify as S
>>> simp(abs(x**2) < 1, x, 1)
False
>>> simp(abs(x**2) < 1, x, 2)
False
>>> simp(abs(x**2) < 1, x, 0)
Abs(x**2) < 1
>>> simp(abs(1/x**2) < 1, x, 1)
True
>>> simp(S(1) < abs(x), x, 1)
True
>>> simp(S(1) < abs(1/x), x, 1)
False
>>> from sympy import Ne
>>> simp(Ne(1, x**3), x, 1)
True
>>> simp(Ne(1, x**3), x, 2)
True
>>> simp(Ne(1, x**3), x, 0)
Ne(1, x**3)
"""
from sympy.core.relational import ( StrictGreaterThan, StrictLessThan,
Unequality )
from sympy import Abs
def power(ex):
if ex == s:
return 1
if ex.is_Pow and ex.base == s:
return ex.exp
return None
def bigger(ex1, ex2):
""" Return True only if |ex1| > |ex2|, False only if |ex1| < |ex2|.
Else return None. """
if ex1.has(s) and ex2.has(s):
return None
if isinstance(ex1, Abs):
ex1 = ex1.args[0]
if isinstance(ex2, Abs):
ex2 = ex2.args[0]
if ex1.has(s):
return bigger(1/ex2, 1/ex1)
n = power(ex2)
if n is None:
return None
try:
if n > 0 and (abs(ex1) <= abs(a)**n) == True:
return False
if n < 0 and (abs(ex1) >= abs(a)**n) == True:
return True
except TypeError:
pass
def replie(x, y):
""" simplify x < y """
if not (x.is_positive or isinstance(x, Abs)) \
or not (y.is_positive or isinstance(y, Abs)):
return (x < y)
r = bigger(x, y)
if r is not None:
return not r
return (x < y)
def replue(x, y):
b = bigger(x, y)
if b == True or b == False:
return True
return Unequality(x, y)
def repl(ex, *args):
if ex == True or ex == False:
return bool(ex)
return ex.replace(*args)
from sympy.simplify.radsimp import collect_abs
expr = collect_abs(expr)
expr = repl(expr, StrictLessThan, replie)
expr = repl(expr, StrictGreaterThan, lambda x, y: replie(y, x))
expr = repl(expr, Unequality, replue)
return S(expr)
@_noconds
def _laplace_transform(f, t, s_, simplify=True):
""" The backend function for Laplace transforms. """
from sympy import (re, Max, exp, pi, Min, periodic_argument as arg_,
arg, cos, Wild, symbols, polar_lift)
s = Dummy('s')
F = integrate(exp(-s*t) * f, (t, 0, oo))
if not F.has(Integral):
return _simplify(F.subs(s, s_), simplify), -oo, S.true
if not F.is_Piecewise:
raise IntegralTransformError(
'Laplace', f, 'could not compute integral')
F, cond = F.args[0]
if F.has(Integral):
raise IntegralTransformError(
'Laplace', f, 'integral in unexpected form')
def process_conds(conds):
""" Turn ``conds`` into a strip and auxiliary conditions. """
a = -oo
aux = S.true
conds = conjuncts(to_cnf(conds))
p, q, w1, w2, w3, w4, w5 = symbols(
'p q w1 w2 w3 w4 w5', cls=Wild, exclude=[s])
patterns = (
p*abs(arg((s + w3)*q)) < w2,
p*abs(arg((s + w3)*q)) <= w2,
abs(arg_((s + w3)**p*q, w1)) < w2,
abs(arg_((s + w3)**p*q, w1)) <= w2,
abs(arg_((polar_lift(s + w3))**p*q, w1)) < w2,
abs(arg_((polar_lift(s + w3))**p*q, w1)) <= w2)
for c in conds:
a_ = oo
aux_ = []
for d in disjuncts(c):
if d.is_Relational and s in d.rhs.free_symbols:
d = d.reversed
if d.is_Relational and isinstance(d, (Ge, Gt)):
d = d.reversedsign
for pat in patterns:
m = d.match(pat)
if m:
break
if m:
if m[q].is_positive and m[w2]/m[p] == pi/2:
d = -re(s + m[w3]) < 0
m = d.match(p - cos(w1*abs(arg(s*w5))*w2)*abs(s**w3)**w4 < 0)
if not m:
m = d.match(
cos(p - abs(arg_(s**w1*w5, q))*w2)*abs(s**w3)**w4 < 0)
if not m:
m = d.match(
p - cos(abs(arg_(polar_lift(s)**w1*w5, q))*w2
)*abs(s**w3)**w4 < 0)
if m and all(m[wild].is_positive for wild in [w1, w2, w3, w4, w5]):
d = re(s) > m[p]
d_ = d.replace(
re, lambda x: x.expand().as_real_imag()[0]).subs(re(s), t)
if not d.is_Relational or \
d.rel_op in ('==', '!=') \
or d_.has(s) or not d_.has(t):
aux_ += [d]
continue
soln = _solve_inequality(d_, t)
if not soln.is_Relational or \
soln.rel_op in ('==', '!='):
aux_ += [d]
continue
if soln.lts == t:
raise IntegralTransformError('Laplace', f,
'convergence not in half-plane?')
else:
a_ = Min(soln.lts, a_)
if a_ != oo:
a = Max(a_, a)
else:
aux = And(aux, Or(*aux_))
return a, aux
conds = [process_conds(c) for c in disjuncts(cond)]
conds2 = [x for x in conds if x[1] != False and x[0] != -oo]
if not conds2:
conds2 = [x for x in conds if x[1] != False]
conds = conds2
def cnt(expr):
if expr == True or expr == False:
return 0
return expr.count_ops()
conds.sort(key=lambda x: (-x[0], cnt(x[1])))
if not conds:
raise IntegralTransformError('Laplace', f, 'no convergence found')
a, aux = conds[0]
def sbs(expr):
return expr.subs(s, s_)
if simplify:
F = _simplifyconds(F, s, a)
aux = _simplifyconds(aux, s, a)
return _simplify(F.subs(s, s_), simplify), sbs(a), _canonical(sbs(aux))
class LaplaceTransform(IntegralTransform):
"""
Class representing unevaluated Laplace transforms.
For usage of this class, see the :class:`IntegralTransform` docstring.
For how to compute Laplace transforms, see the :func:`laplace_transform`
docstring.
"""
_name = 'Laplace'
def _compute_transform(self, f, t, s, **hints):
return _laplace_transform(f, t, s, **hints)
def _as_integral(self, f, t, s):
from sympy import exp
return Integral(f*exp(-s*t), (t, 0, oo))
def _collapse_extra(self, extra):
from sympy import Max
conds = []
planes = []
for plane, cond in extra:
conds.append(cond)
planes.append(plane)
cond = And(*conds)
plane = Max(*planes)
if cond == False:
raise IntegralTransformError(
'Laplace', None, 'No combined convergence.')
return plane, cond
def laplace_transform(f, t, s, **hints):
r"""
Compute the Laplace Transform `F(s)` of `f(t)`,
.. math :: F(s) = \int_0^\infty e^{-st} f(t) \mathrm{d}t.
For all "sensible" functions, this converges absolutely in a
half plane `a < \operatorname{Re}(s)`.
This function returns ``(F, a, cond)``
where ``F`` is the Laplace transform of ``f``, `\operatorname{Re}(s) > a` is the half-plane
of convergence, and ``cond`` are auxiliary convergence conditions.
If the integral cannot be computed in closed form, this function returns
an unevaluated :class:`LaplaceTransform` object.
For a description of possible hints, refer to the docstring of
:func:`sympy.integrals.transforms.IntegralTransform.doit`. If ``noconds=True``,
only `F` will be returned (i.e. not ``cond``, and also not the plane ``a``).
>>> from sympy.integrals import laplace_transform
>>> from sympy.abc import t, s, a
>>> laplace_transform(t**a, t, s)
(s**(-a)*gamma(a + 1)/s, 0, re(a) > -1)
See Also
========
inverse_laplace_transform, mellin_transform, fourier_transform
hankel_transform, inverse_hankel_transform
"""
if isinstance(f, MatrixBase) and hasattr(f, 'applyfunc'):
return f.applyfunc(lambda fij: laplace_transform(fij, t, s, **hints))
return LaplaceTransform(f, t, s).doit(**hints)
@_noconds_(True)
def _inverse_laplace_transform(F, s, t_, plane, simplify=True):
""" The backend function for inverse Laplace transforms. """
from sympy import exp, Heaviside, log, expand_complex, Integral, Piecewise
from sympy.integrals.meijerint import meijerint_inversion, _get_coeff_exp
# There are two strategies we can try:
# 1) Use inverse mellin transforms - related by a simple change of variables.
# 2) Use the inversion integral.
t = Dummy('t', real=True)
def pw_simp(*args):
""" Simplify a piecewise expression from hyperexpand. """
# XXX we break modularity here!
if len(args) != 3:
return Piecewise(*args)
arg = args[2].args[0].argument
coeff, exponent = _get_coeff_exp(arg, t)
e1 = args[0].args[0]
e2 = args[1].args[0]
return Heaviside(1/abs(coeff) - t**exponent)*e1 \
+ Heaviside(t**exponent - 1/abs(coeff))*e2
try:
f, cond = inverse_mellin_transform(F, s, exp(-t), (None, oo),
needeval=True, noconds=False)
except IntegralTransformError:
f = None
if f is None:
f = meijerint_inversion(F, s, t)
if f is None:
raise IntegralTransformError('Inverse Laplace', f, '')
if f.is_Piecewise:
f, cond = f.args[0]
if f.has(Integral):
raise IntegralTransformError('Inverse Laplace', f,
'inversion integral of unrecognised form.')
else:
cond = S.true
f = f.replace(Piecewise, pw_simp)
if f.is_Piecewise:
# many of the functions called below can't work with piecewise
# (b/c it has a bool in args)
return f.subs(t, t_), cond
u = Dummy('u')
def simp_heaviside(arg):
a = arg.subs(exp(-t), u)
if a.has(t):
return Heaviside(arg)
rel = _solve_inequality(a > 0, u)
if rel.lts == u:
k = log(rel.gts)
return Heaviside(t + k)
else:
k = log(rel.lts)
return Heaviside(-(t + k))
f = f.replace(Heaviside, simp_heaviside)
def simp_exp(arg):
return expand_complex(exp(arg))
f = f.replace(exp, simp_exp)
# TODO it would be nice to fix cosh and sinh ... simplify messes these
# exponentials up
return _simplify(f.subs(t, t_), simplify), cond
class InverseLaplaceTransform(IntegralTransform):
"""
Class representing unevaluated inverse Laplace transforms.
For usage of this class, see the :class:`IntegralTransform` docstring.
For how to compute inverse Laplace transforms, see the
:func:`inverse_laplace_transform` docstring.
"""
_name = 'Inverse Laplace'
_none_sentinel = Dummy('None')
_c = Dummy('c')
def __new__(cls, F, s, x, plane, **opts):
if plane is None:
plane = InverseLaplaceTransform._none_sentinel
return IntegralTransform.__new__(cls, F, s, x, plane, **opts)
@property
def fundamental_plane(self):
plane = self.args[3]
if plane is InverseLaplaceTransform._none_sentinel:
plane = None
return plane
def _compute_transform(self, F, s, t, **hints):
return _inverse_laplace_transform(F, s, t, self.fundamental_plane, **hints)
def _as_integral(self, F, s, t):
from sympy import I, exp
c = self.__class__._c
return Integral(exp(s*t)*F, (s, c - I*oo, c + I*oo))/(2*S.Pi*S.ImaginaryUnit)
def inverse_laplace_transform(F, s, t, plane=None, **hints):
r"""
Compute the inverse Laplace transform of `F(s)`, defined as
.. math :: f(t) = \frac{1}{2\pi i} \int_{c-i\infty}^{c+i\infty} e^{st} F(s) \mathrm{d}s,
for `c` so large that `F(s)` has no singularites in the
half-plane `\operatorname{Re}(s) > c-\epsilon`.
The plane can be specified by
argument ``plane``, but will be inferred if passed as None.
Under certain regularity conditions, this recovers `f(t)` from its
Laplace Transform `F(s)`, for non-negative `t`, and vice
versa.
If the integral cannot be computed in closed form, this function returns
an unevaluated :class:`InverseLaplaceTransform` object.
Note that this function will always assume `t` to be real,
regardless of the sympy assumption on `t`.
For a description of possible hints, refer to the docstring of
:func:`sympy.integrals.transforms.IntegralTransform.doit`.
>>> from sympy.integrals.transforms import inverse_laplace_transform
>>> from sympy import exp, Symbol
>>> from sympy.abc import s, t
>>> a = Symbol('a', positive=True)
>>> inverse_laplace_transform(exp(-a*s)/s, s, t)
Heaviside(-a + t)
See Also
========
laplace_transform
hankel_transform, inverse_hankel_transform
"""
if isinstance(F, MatrixBase) and hasattr(F, 'applyfunc'):
return F.applyfunc(lambda Fij: inverse_laplace_transform(Fij, s, t, plane, **hints))
return InverseLaplaceTransform(F, s, t, plane).doit(**hints)
##########################################################################
# Fourier Transform
##########################################################################
@_noconds_(True)
def _fourier_transform(f, x, k, a, b, name, simplify=True):
r"""
Compute a general Fourier-type transform
.. math::
F(k) = a \int_{-\infty}^{\infty} e^{bixk} f(x)\, dx.
For suitable choice of *a* and *b*, this reduces to the standard Fourier
and inverse Fourier transforms.
"""
from sympy import exp, I
F = integrate(a*f*exp(b*I*x*k), (x, -oo, oo))
if not F.has(Integral):
return _simplify(F, simplify), S.true
integral_f = integrate(f, (x, -oo, oo))
if integral_f in (-oo, oo, S.NaN) or integral_f.has(Integral):
raise IntegralTransformError(name, f, 'function not integrable on real axis')
if not F.is_Piecewise:
raise IntegralTransformError(name, f, 'could not compute integral')
F, cond = F.args[0]
if F.has(Integral):
raise IntegralTransformError(name, f, 'integral in unexpected form')
return _simplify(F, simplify), cond
class FourierTypeTransform(IntegralTransform):
""" Base class for Fourier transforms."""
def a(self):
raise NotImplementedError(
"Class %s must implement a(self) but does not" % self.__class__)
def b(self):
raise NotImplementedError(
"Class %s must implement b(self) but does not" % self.__class__)
def _compute_transform(self, f, x, k, **hints):
return _fourier_transform(f, x, k,
self.a(), self.b(),
self.__class__._name, **hints)
def _as_integral(self, f, x, k):
from sympy import exp, I
a = self.a()
b = self.b()
return Integral(a*f*exp(b*I*x*k), (x, -oo, oo))
class FourierTransform(FourierTypeTransform):
"""
Class representing unevaluated Fourier transforms.
For usage of this class, see the :class:`IntegralTransform` docstring.
For how to compute Fourier transforms, see the :func:`fourier_transform`
docstring.
"""
_name = 'Fourier'
def a(self):
return 1
def b(self):
return -2*S.Pi
def fourier_transform(f, x, k, **hints):
r"""
Compute the unitary, ordinary-frequency Fourier transform of `f`, defined
as
.. math:: F(k) = \int_{-\infty}^\infty f(x) e^{-2\pi i x k} \mathrm{d} x.
If the transform cannot be computed in closed form, this
function returns an unevaluated :class:`FourierTransform` object.
For other Fourier transform conventions, see the function
:func:`sympy.integrals.transforms._fourier_transform`.
For a description of possible hints, refer to the docstring of
:func:`sympy.integrals.transforms.IntegralTransform.doit`.
Note that for this transform, by default ``noconds=True``.
>>> from sympy import fourier_transform, exp
>>> from sympy.abc import x, k
>>> fourier_transform(exp(-x**2), x, k)
sqrt(pi)*exp(-pi**2*k**2)
>>> fourier_transform(exp(-x**2), x, k, noconds=False)
(sqrt(pi)*exp(-pi**2*k**2), True)
See Also
========
inverse_fourier_transform
sine_transform, inverse_sine_transform
cosine_transform, inverse_cosine_transform
hankel_transform, inverse_hankel_transform
mellin_transform, laplace_transform
"""
return FourierTransform(f, x, k).doit(**hints)
class InverseFourierTransform(FourierTypeTransform):
"""
Class representing unevaluated inverse Fourier transforms.
For usage of this class, see the :class:`IntegralTransform` docstring.
For how to compute inverse Fourier transforms, see the
:func:`inverse_fourier_transform` docstring.
"""
_name = 'Inverse Fourier'
def a(self):
return 1
def b(self):
return 2*S.Pi
def inverse_fourier_transform(F, k, x, **hints):
r"""
Compute the unitary, ordinary-frequency inverse Fourier transform of `F`,
defined as
.. math:: f(x) = \int_{-\infty}^\infty F(k) e^{2\pi i x k} \mathrm{d} k.
If the transform cannot be computed in closed form, this
function returns an unevaluated :class:`InverseFourierTransform` object.
For other Fourier transform conventions, see the function
:func:`sympy.integrals.transforms._fourier_transform`.
For a description of possible hints, refer to the docstring of
:func:`sympy.integrals.transforms.IntegralTransform.doit`.
Note that for this transform, by default ``noconds=True``.
>>> from sympy import inverse_fourier_transform, exp, sqrt, pi
>>> from sympy.abc import x, k
>>> inverse_fourier_transform(sqrt(pi)*exp(-(pi*k)**2), k, x)
exp(-x**2)
>>> inverse_fourier_transform(sqrt(pi)*exp(-(pi*k)**2), k, x, noconds=False)
(exp(-x**2), True)
See Also
========
fourier_transform
sine_transform, inverse_sine_transform
cosine_transform, inverse_cosine_transform
hankel_transform, inverse_hankel_transform
mellin_transform, laplace_transform
"""
return InverseFourierTransform(F, k, x).doit(**hints)
##########################################################################
# Fourier Sine and Cosine Transform
##########################################################################
from sympy import sin, cos, sqrt, pi
@_noconds_(True)
def _sine_cosine_transform(f, x, k, a, b, K, name, simplify=True):
"""
Compute a general sine or cosine-type transform
F(k) = a int_0^oo b*sin(x*k) f(x) dx.
F(k) = a int_0^oo b*cos(x*k) f(x) dx.
For suitable choice of a and b, this reduces to the standard sine/cosine
and inverse sine/cosine transforms.
"""
F = integrate(a*f*K(b*x*k), (x, 0, oo))
if not F.has(Integral):
return _simplify(F, simplify), S.true
if not F.is_Piecewise:
raise IntegralTransformError(name, f, 'could not compute integral')
F, cond = F.args[0]
if F.has(Integral):
raise IntegralTransformError(name, f, 'integral in unexpected form')
return _simplify(F, simplify), cond
class SineCosineTypeTransform(IntegralTransform):
"""
Base class for sine and cosine transforms.
Specify cls._kern.
"""
def a(self):
raise NotImplementedError(
"Class %s must implement a(self) but does not" % self.__class__)
def b(self):
raise NotImplementedError(
"Class %s must implement b(self) but does not" % self.__class__)
def _compute_transform(self, f, x, k, **hints):
return _sine_cosine_transform(f, x, k,
self.a(), self.b(),
self.__class__._kern,
self.__class__._name, **hints)
def _as_integral(self, f, x, k):
a = self.a()
b = self.b()
K = self.__class__._kern
return Integral(a*f*K(b*x*k), (x, 0, oo))
class SineTransform(SineCosineTypeTransform):
"""
Class representing unevaluated sine transforms.
For usage of this class, see the :class:`IntegralTransform` docstring.
For how to compute sine transforms, see the :func:`sine_transform`
docstring.
"""
_name = 'Sine'
_kern = sin
def a(self):
return sqrt(2)/sqrt(pi)
def b(self):
return 1
def sine_transform(f, x, k, **hints):
r"""
Compute the unitary, ordinary-frequency sine transform of `f`, defined
as
.. math:: F(k) = \sqrt{\frac{2}{\pi}} \int_{0}^\infty f(x) \sin(2\pi x k) \mathrm{d} x.
If the transform cannot be computed in closed form, this
function returns an unevaluated :class:`SineTransform` object.
For a description of possible hints, refer to the docstring of
:func:`sympy.integrals.transforms.IntegralTransform.doit`.
Note that for this transform, by default ``noconds=True``.
>>> from sympy import sine_transform, exp
>>> from sympy.abc import x, k, a
>>> sine_transform(x*exp(-a*x**2), x, k)
sqrt(2)*k*exp(-k**2/(4*a))/(4*a**(3/2))
>>> sine_transform(x**(-a), x, k)
2**(1/2 - a)*k**(a - 1)*gamma(1 - a/2)/gamma(a/2 + 1/2)
See Also
========
fourier_transform, inverse_fourier_transform
inverse_sine_transform
cosine_transform, inverse_cosine_transform
hankel_transform, inverse_hankel_transform
mellin_transform, laplace_transform
"""
return SineTransform(f, x, k).doit(**hints)
class InverseSineTransform(SineCosineTypeTransform):
"""
Class representing unevaluated inverse sine transforms.
For usage of this class, see the :class:`IntegralTransform` docstring.
For how to compute inverse sine transforms, see the
:func:`inverse_sine_transform` docstring.
"""
_name = 'Inverse Sine'
_kern = sin
def a(self):
return sqrt(2)/sqrt(pi)
def b(self):
return 1
def inverse_sine_transform(F, k, x, **hints):
r"""
Compute the unitary, ordinary-frequency inverse sine transform of `F`,
defined as
.. math:: f(x) = \sqrt{\frac{2}{\pi}} \int_{0}^\infty F(k) \sin(2\pi x k) \mathrm{d} k.
If the transform cannot be computed in closed form, this
function returns an unevaluated :class:`InverseSineTransform` object.
For a description of possible hints, refer to the docstring of
:func:`sympy.integrals.transforms.IntegralTransform.doit`.
Note that for this transform, by default ``noconds=True``.
>>> from sympy import inverse_sine_transform, exp, sqrt, gamma, pi
>>> from sympy.abc import x, k, a
>>> inverse_sine_transform(2**((1-2*a)/2)*k**(a - 1)*
... gamma(-a/2 + 1)/gamma((a+1)/2), k, x)
x**(-a)
>>> inverse_sine_transform(sqrt(2)*k*exp(-k**2/(4*a))/(4*sqrt(a)**3), k, x)
x*exp(-a*x**2)
See Also
========
fourier_transform, inverse_fourier_transform
sine_transform
cosine_transform, inverse_cosine_transform
hankel_transform, inverse_hankel_transform
mellin_transform, laplace_transform
"""
return InverseSineTransform(F, k, x).doit(**hints)
class CosineTransform(SineCosineTypeTransform):
"""
Class representing unevaluated cosine transforms.
For usage of this class, see the :class:`IntegralTransform` docstring.
For how to compute cosine transforms, see the :func:`cosine_transform`
docstring.
"""
_name = 'Cosine'
_kern = cos
def a(self):
return sqrt(2)/sqrt(pi)
def b(self):
return 1
def cosine_transform(f, x, k, **hints):
r"""
Compute the unitary, ordinary-frequency cosine transform of `f`, defined
as
.. math:: F(k) = \sqrt{\frac{2}{\pi}} \int_{0}^\infty f(x) \cos(2\pi x k) \mathrm{d} x.
If the transform cannot be computed in closed form, this
function returns an unevaluated :class:`CosineTransform` object.
For a description of possible hints, refer to the docstring of
:func:`sympy.integrals.transforms.IntegralTransform.doit`.
Note that for this transform, by default ``noconds=True``.
>>> from sympy import cosine_transform, exp, sqrt, cos
>>> from sympy.abc import x, k, a
>>> cosine_transform(exp(-a*x), x, k)
sqrt(2)*a/(sqrt(pi)*(a**2 + k**2))
>>> cosine_transform(exp(-a*sqrt(x))*cos(a*sqrt(x)), x, k)
a*exp(-a**2/(2*k))/(2*k**(3/2))
See Also
========
fourier_transform, inverse_fourier_transform,
sine_transform, inverse_sine_transform
inverse_cosine_transform
hankel_transform, inverse_hankel_transform
mellin_transform, laplace_transform
"""
return CosineTransform(f, x, k).doit(**hints)
class InverseCosineTransform(SineCosineTypeTransform):
"""
Class representing unevaluated inverse cosine transforms.
For usage of this class, see the :class:`IntegralTransform` docstring.
For how to compute inverse cosine transforms, see the
:func:`inverse_cosine_transform` docstring.
"""
_name = 'Inverse Cosine'
_kern = cos
def a(self):
return sqrt(2)/sqrt(pi)
def b(self):
return 1
def inverse_cosine_transform(F, k, x, **hints):
r"""
Compute the unitary, ordinary-frequency inverse cosine transform of `F`,
defined as
.. math:: f(x) = \sqrt{\frac{2}{\pi}} \int_{0}^\infty F(k) \cos(2\pi x k) \mathrm{d} k.
If the transform cannot be computed in closed form, this
function returns an unevaluated :class:`InverseCosineTransform` object.
For a description of possible hints, refer to the docstring of
:func:`sympy.integrals.transforms.IntegralTransform.doit`.
Note that for this transform, by default ``noconds=True``.
>>> from sympy import inverse_cosine_transform, exp, sqrt, pi
>>> from sympy.abc import x, k, a
>>> inverse_cosine_transform(sqrt(2)*a/(sqrt(pi)*(a**2 + k**2)), k, x)
exp(-a*x)
>>> inverse_cosine_transform(1/sqrt(k), k, x)
1/sqrt(x)
See Also
========
fourier_transform, inverse_fourier_transform,
sine_transform, inverse_sine_transform
cosine_transform
hankel_transform, inverse_hankel_transform
mellin_transform, laplace_transform
"""
return InverseCosineTransform(F, k, x).doit(**hints)
##########################################################################
# Hankel Transform
##########################################################################
@_noconds_(True)
def _hankel_transform(f, r, k, nu, name, simplify=True):
r"""
Compute a general Hankel transform
.. math:: F_\nu(k) = \int_{0}^\infty f(r) J_\nu(k r) r \mathrm{d} r.
"""
from sympy import besselj
F = integrate(f*besselj(nu, k*r)*r, (r, 0, oo))
if not F.has(Integral):
return _simplify(F, simplify), S.true
if not F.is_Piecewise:
raise IntegralTransformError(name, f, 'could not compute integral')
F, cond = F.args[0]
if F.has(Integral):
raise IntegralTransformError(name, f, 'integral in unexpected form')
return _simplify(F, simplify), cond
class HankelTypeTransform(IntegralTransform):
"""
Base class for Hankel transforms.
"""
def doit(self, **hints):
return self._compute_transform(self.function,
self.function_variable,
self.transform_variable,
self.args[3],
**hints)
def _compute_transform(self, f, r, k, nu, **hints):
return _hankel_transform(f, r, k, nu, self._name, **hints)
def _as_integral(self, f, r, k, nu):
from sympy import besselj
return Integral(f*besselj(nu, k*r)*r, (r, 0, oo))
@property
def as_integral(self):
return self._as_integral(self.function,
self.function_variable,
self.transform_variable,
self.args[3])
class HankelTransform(HankelTypeTransform):
"""
Class representing unevaluated Hankel transforms.
For usage of this class, see the :class:`IntegralTransform` docstring.
For how to compute Hankel transforms, see the :func:`hankel_transform`
docstring.
"""
_name = 'Hankel'
def hankel_transform(f, r, k, nu, **hints):
r"""
Compute the Hankel transform of `f`, defined as
.. math:: F_\nu(k) = \int_{0}^\infty f(r) J_\nu(k r) r \mathrm{d} r.
If the transform cannot be computed in closed form, this
function returns an unevaluated :class:`HankelTransform` object.
For a description of possible hints, refer to the docstring of
:func:`sympy.integrals.transforms.IntegralTransform.doit`.
Note that for this transform, by default ``noconds=True``.
>>> from sympy import hankel_transform, inverse_hankel_transform
>>> from sympy import gamma, exp, sinh, cosh
>>> from sympy.abc import r, k, m, nu, a
>>> ht = hankel_transform(1/r**m, r, k, nu)
>>> ht
2*2**(-m)*k**(m - 2)*gamma(-m/2 + nu/2 + 1)/gamma(m/2 + nu/2)
>>> inverse_hankel_transform(ht, k, r, nu)
r**(-m)
>>> ht = hankel_transform(exp(-a*r), r, k, 0)
>>> ht
a/(k**3*(a**2/k**2 + 1)**(3/2))
>>> inverse_hankel_transform(ht, k, r, 0)
exp(-a*r)
See Also
========
fourier_transform, inverse_fourier_transform
sine_transform, inverse_sine_transform
cosine_transform, inverse_cosine_transform
inverse_hankel_transform
mellin_transform, laplace_transform
"""
return HankelTransform(f, r, k, nu).doit(**hints)
class InverseHankelTransform(HankelTypeTransform):
"""
Class representing unevaluated inverse Hankel transforms.
For usage of this class, see the :class:`IntegralTransform` docstring.
For how to compute inverse Hankel transforms, see the
:func:`inverse_hankel_transform` docstring.
"""
_name = 'Inverse Hankel'
def inverse_hankel_transform(F, k, r, nu, **hints):
r"""
Compute the inverse Hankel transform of `F` defined as
.. math:: f(r) = \int_{0}^\infty F_\nu(k) J_\nu(k r) k \mathrm{d} k.
If the transform cannot be computed in closed form, this
function returns an unevaluated :class:`InverseHankelTransform` object.
For a description of possible hints, refer to the docstring of
:func:`sympy.integrals.transforms.IntegralTransform.doit`.
Note that for this transform, by default ``noconds=True``.
>>> from sympy import hankel_transform, inverse_hankel_transform, gamma
>>> from sympy import gamma, exp, sinh, cosh
>>> from sympy.abc import r, k, m, nu, a
>>> ht = hankel_transform(1/r**m, r, k, nu)
>>> ht
2*2**(-m)*k**(m - 2)*gamma(-m/2 + nu/2 + 1)/gamma(m/2 + nu/2)
>>> inverse_hankel_transform(ht, k, r, nu)
r**(-m)
>>> ht = hankel_transform(exp(-a*r), r, k, 0)
>>> ht
a/(k**3*(a**2/k**2 + 1)**(3/2))
>>> inverse_hankel_transform(ht, k, r, 0)
exp(-a*r)
See Also
========
fourier_transform, inverse_fourier_transform
sine_transform, inverse_sine_transform
cosine_transform, inverse_cosine_transform
hankel_transform
mellin_transform, laplace_transform
"""
return InverseHankelTransform(F, k, r, nu).doit(**hints)
|
009ec1fff16ea697eea28c1c6030a46d08c88cfc48b61421b43eae9234089f0f | from __future__ import print_function, division
from sympy.core import S, Dummy, pi
from sympy.functions.combinatorial.factorials import factorial
from sympy.functions.elementary.trigonometric import sin, cos
from sympy.functions.elementary.miscellaneous import sqrt
from sympy.functions.special.gamma_functions import gamma
from sympy.polys.orthopolys import (legendre_poly, laguerre_poly,
hermite_poly, jacobi_poly)
from sympy.polys.rootoftools import RootOf
def gauss_legendre(n, n_digits):
r"""
Computes the Gauss-Legendre quadrature [1]_ points and weights.
The Gauss-Legendre quadrature approximates the integral:
.. math::
\int_{-1}^1 f(x)\,dx \approx \sum_{i=1}^n w_i f(x_i)
The nodes `x_i` of an order `n` quadrature rule are the roots of `P_n`
and the weights `w_i` are given by:
.. math::
w_i = \frac{2}{\left(1-x_i^2\right) \left(P'_n(x_i)\right)^2}
Parameters
==========
n : the order of quadrature
n_digits : number of significant digits of the points and weights to return
Returns
=======
(x, w) : the ``x`` and ``w`` are lists of points and weights as Floats.
The points `x_i` and weights `w_i` are returned as ``(x, w)``
tuple of lists.
Examples
========
>>> from sympy.integrals.quadrature import gauss_legendre
>>> x, w = gauss_legendre(3, 5)
>>> x
[-0.7746, 0, 0.7746]
>>> w
[0.55556, 0.88889, 0.55556]
>>> x, w = gauss_legendre(4, 5)
>>> x
[-0.86114, -0.33998, 0.33998, 0.86114]
>>> w
[0.34785, 0.65215, 0.65215, 0.34785]
See Also
========
gauss_laguerre, gauss_gen_laguerre, gauss_hermite, gauss_chebyshev_t, gauss_chebyshev_u, gauss_jacobi, gauss_lobatto
References
==========
.. [1] https://en.wikipedia.org/wiki/Gaussian_quadrature
.. [2] http://people.sc.fsu.edu/~jburkardt/cpp_src/legendre_rule/legendre_rule.html
"""
x = Dummy("x")
p = legendre_poly(n, x, polys=True)
pd = p.diff(x)
xi = []
w = []
for r in p.real_roots():
if isinstance(r, RootOf):
r = r.eval_rational(S.One/10**(n_digits+2))
xi.append(r.n(n_digits))
w.append((2/((1-r**2) * pd.subs(x, r)**2)).n(n_digits))
return xi, w
def gauss_laguerre(n, n_digits):
r"""
Computes the Gauss-Laguerre quadrature [1]_ points and weights.
The Gauss-Laguerre quadrature approximates the integral:
.. math::
\int_0^{\infty} e^{-x} f(x)\,dx \approx \sum_{i=1}^n w_i f(x_i)
The nodes `x_i` of an order `n` quadrature rule are the roots of `L_n`
and the weights `w_i` are given by:
.. math::
w_i = \frac{x_i}{(n+1)^2 \left(L_{n+1}(x_i)\right)^2}
Parameters
==========
n : the order of quadrature
n_digits : number of significant digits of the points and weights to return
Returns
=======
(x, w) : the ``x`` and ``w`` are lists of points and weights as Floats.
The points `x_i` and weights `w_i` are returned as ``(x, w)``
tuple of lists.
Examples
========
>>> from sympy.integrals.quadrature import gauss_laguerre
>>> x, w = gauss_laguerre(3, 5)
>>> x
[0.41577, 2.2943, 6.2899]
>>> w
[0.71109, 0.27852, 0.010389]
>>> x, w = gauss_laguerre(6, 5)
>>> x
[0.22285, 1.1889, 2.9927, 5.7751, 9.8375, 15.983]
>>> w
[0.45896, 0.417, 0.11337, 0.010399, 0.00026102, 8.9855e-7]
See Also
========
gauss_legendre, gauss_gen_laguerre, gauss_hermite, gauss_chebyshev_t, gauss_chebyshev_u, gauss_jacobi, gauss_lobatto
References
==========
.. [1] https://en.wikipedia.org/wiki/Gauss%E2%80%93Laguerre_quadrature
.. [2] http://people.sc.fsu.edu/~jburkardt/cpp_src/laguerre_rule/laguerre_rule.html
"""
x = Dummy("x")
p = laguerre_poly(n, x, polys=True)
p1 = laguerre_poly(n+1, x, polys=True)
xi = []
w = []
for r in p.real_roots():
if isinstance(r, RootOf):
r = r.eval_rational(S.One/10**(n_digits+2))
xi.append(r.n(n_digits))
w.append((r/((n+1)**2 * p1.subs(x, r)**2)).n(n_digits))
return xi, w
def gauss_hermite(n, n_digits):
r"""
Computes the Gauss-Hermite quadrature [1]_ points and weights.
The Gauss-Hermite quadrature approximates the integral:
.. math::
\int_{-\infty}^{\infty} e^{-x^2} f(x)\,dx \approx
\sum_{i=1}^n w_i f(x_i)
The nodes `x_i` of an order `n` quadrature rule are the roots of `H_n`
and the weights `w_i` are given by:
.. math::
w_i = \frac{2^{n-1} n! \sqrt{\pi}}{n^2 \left(H_{n-1}(x_i)\right)^2}
Parameters
==========
n : the order of quadrature
n_digits : number of significant digits of the points and weights to return
Returns
=======
(x, w) : the ``x`` and ``w`` are lists of points and weights as Floats.
The points `x_i` and weights `w_i` are returned as ``(x, w)``
tuple of lists.
Examples
========
>>> from sympy.integrals.quadrature import gauss_hermite
>>> x, w = gauss_hermite(3, 5)
>>> x
[-1.2247, 0, 1.2247]
>>> w
[0.29541, 1.1816, 0.29541]
>>> x, w = gauss_hermite(6, 5)
>>> x
[-2.3506, -1.3358, -0.43608, 0.43608, 1.3358, 2.3506]
>>> w
[0.00453, 0.15707, 0.72463, 0.72463, 0.15707, 0.00453]
See Also
========
gauss_legendre, gauss_laguerre, gauss_gen_laguerre, gauss_chebyshev_t, gauss_chebyshev_u, gauss_jacobi, gauss_lobatto
References
==========
.. [1] https://en.wikipedia.org/wiki/Gauss-Hermite_Quadrature
.. [2] http://people.sc.fsu.edu/~jburkardt/cpp_src/hermite_rule/hermite_rule.html
.. [3] http://people.sc.fsu.edu/~jburkardt/cpp_src/gen_hermite_rule/gen_hermite_rule.html
"""
x = Dummy("x")
p = hermite_poly(n, x, polys=True)
p1 = hermite_poly(n-1, x, polys=True)
xi = []
w = []
for r in p.real_roots():
if isinstance(r, RootOf):
r = r.eval_rational(S.One/10**(n_digits+2))
xi.append(r.n(n_digits))
w.append(((2**(n-1) * factorial(n) * sqrt(pi)) /
(n**2 * p1.subs(x, r)**2)).n(n_digits))
return xi, w
def gauss_gen_laguerre(n, alpha, n_digits):
r"""
Computes the generalized Gauss-Laguerre quadrature [1]_ points and weights.
The generalized Gauss-Laguerre quadrature approximates the integral:
.. math::
\int_{0}^\infty x^{\alpha} e^{-x} f(x)\,dx \approx
\sum_{i=1}^n w_i f(x_i)
The nodes `x_i` of an order `n` quadrature rule are the roots of
`L^{\alpha}_n` and the weights `w_i` are given by:
.. math::
w_i = \frac{\Gamma(\alpha+n)}
{n \Gamma(n) L^{\alpha}_{n-1}(x_i) L^{\alpha+1}_{n-1}(x_i)}
Parameters
==========
n : the order of quadrature
alpha : the exponent of the singularity, `\alpha > -1`
n_digits : number of significant digits of the points and weights to return
Returns
=======
(x, w) : the ``x`` and ``w`` are lists of points and weights as Floats.
The points `x_i` and weights `w_i` are returned as ``(x, w)``
tuple of lists.
Examples
========
>>> from sympy import S
>>> from sympy.integrals.quadrature import gauss_gen_laguerre
>>> x, w = gauss_gen_laguerre(3, -S.Half, 5)
>>> x
[0.19016, 1.7845, 5.5253]
>>> w
[1.4493, 0.31413, 0.00906]
>>> x, w = gauss_gen_laguerre(4, 3*S.Half, 5)
>>> x
[0.97851, 2.9904, 6.3193, 11.712]
>>> w
[0.53087, 0.67721, 0.11895, 0.0023152]
See Also
========
gauss_legendre, gauss_laguerre, gauss_hermite, gauss_chebyshev_t, gauss_chebyshev_u, gauss_jacobi, gauss_lobatto
References
==========
.. [1] https://en.wikipedia.org/wiki/Gauss%E2%80%93Laguerre_quadrature
.. [2] http://people.sc.fsu.edu/~jburkardt/cpp_src/gen_laguerre_rule/gen_laguerre_rule.html
"""
x = Dummy("x")
p = laguerre_poly(n, x, alpha=alpha, polys=True)
p1 = laguerre_poly(n-1, x, alpha=alpha, polys=True)
p2 = laguerre_poly(n-1, x, alpha=alpha+1, polys=True)
xi = []
w = []
for r in p.real_roots():
if isinstance(r, RootOf):
r = r.eval_rational(S.One/10**(n_digits+2))
xi.append(r.n(n_digits))
w.append((gamma(alpha+n) /
(n*gamma(n)*p1.subs(x, r)*p2.subs(x, r))).n(n_digits))
return xi, w
def gauss_chebyshev_t(n, n_digits):
r"""
Computes the Gauss-Chebyshev quadrature [1]_ points and weights of
the first kind.
The Gauss-Chebyshev quadrature of the first kind approximates the integral:
.. math::
\int_{-1}^{1} \frac{1}{\sqrt{1-x^2}} f(x)\,dx \approx
\sum_{i=1}^n w_i f(x_i)
The nodes `x_i` of an order `n` quadrature rule are the roots of `T_n`
and the weights `w_i` are given by:
.. math::
w_i = \frac{\pi}{n}
Parameters
==========
n : the order of quadrature
n_digits : number of significant digits of the points and weights to return
Returns
=======
(x, w) : the ``x`` and ``w`` are lists of points and weights as Floats.
The points `x_i` and weights `w_i` are returned as ``(x, w)``
tuple of lists.
Examples
========
>>> from sympy import S
>>> from sympy.integrals.quadrature import gauss_chebyshev_t
>>> x, w = gauss_chebyshev_t(3, 5)
>>> x
[0.86602, 0, -0.86602]
>>> w
[1.0472, 1.0472, 1.0472]
>>> x, w = gauss_chebyshev_t(6, 5)
>>> x
[0.96593, 0.70711, 0.25882, -0.25882, -0.70711, -0.96593]
>>> w
[0.5236, 0.5236, 0.5236, 0.5236, 0.5236, 0.5236]
See Also
========
gauss_legendre, gauss_laguerre, gauss_hermite, gauss_gen_laguerre, gauss_chebyshev_u, gauss_jacobi, gauss_lobatto
References
==========
.. [1] https://en.wikipedia.org/wiki/Chebyshev%E2%80%93Gauss_quadrature
.. [2] http://people.sc.fsu.edu/~jburkardt/cpp_src/chebyshev1_rule/chebyshev1_rule.html
"""
xi = []
w = []
for i in range(1, n+1):
xi.append((cos((2*i-S.One)/(2*n)*S.Pi)).n(n_digits))
w.append((S.Pi/n).n(n_digits))
return xi, w
def gauss_chebyshev_u(n, n_digits):
r"""
Computes the Gauss-Chebyshev quadrature [1]_ points and weights of
the second kind.
The Gauss-Chebyshev quadrature of the second kind approximates the
integral:
.. math::
\int_{-1}^{1} \sqrt{1-x^2} f(x)\,dx \approx \sum_{i=1}^n w_i f(x_i)
The nodes `x_i` of an order `n` quadrature rule are the roots of `U_n`
and the weights `w_i` are given by:
.. math::
w_i = \frac{\pi}{n+1} \sin^2 \left(\frac{i}{n+1}\pi\right)
Parameters
==========
n : the order of quadrature
n_digits : number of significant digits of the points and weights to return
Returns
=======
(x, w) : the ``x`` and ``w`` are lists of points and weights as Floats.
The points `x_i` and weights `w_i` are returned as ``(x, w)``
tuple of lists.
Examples
========
>>> from sympy import S
>>> from sympy.integrals.quadrature import gauss_chebyshev_u
>>> x, w = gauss_chebyshev_u(3, 5)
>>> x
[0.70711, 0, -0.70711]
>>> w
[0.3927, 0.7854, 0.3927]
>>> x, w = gauss_chebyshev_u(6, 5)
>>> x
[0.90097, 0.62349, 0.22252, -0.22252, -0.62349, -0.90097]
>>> w
[0.084489, 0.27433, 0.42658, 0.42658, 0.27433, 0.084489]
See Also
========
gauss_legendre, gauss_laguerre, gauss_hermite, gauss_gen_laguerre, gauss_chebyshev_t, gauss_jacobi, gauss_lobatto
References
==========
.. [1] https://en.wikipedia.org/wiki/Chebyshev%E2%80%93Gauss_quadrature
.. [2] http://people.sc.fsu.edu/~jburkardt/cpp_src/chebyshev2_rule/chebyshev2_rule.html
"""
xi = []
w = []
for i in range(1, n+1):
xi.append((cos(i/(n+S.One)*S.Pi)).n(n_digits))
w.append((S.Pi/(n+S.One)*sin(i*S.Pi/(n+S.One))**2).n(n_digits))
return xi, w
def gauss_jacobi(n, alpha, beta, n_digits):
r"""
Computes the Gauss-Jacobi quadrature [1]_ points and weights.
The Gauss-Jacobi quadrature of the first kind approximates the integral:
.. math::
\int_{-1}^1 (1-x)^\alpha (1+x)^\beta f(x)\,dx \approx
\sum_{i=1}^n w_i f(x_i)
The nodes `x_i` of an order `n` quadrature rule are the roots of
`P^{(\alpha,\beta)}_n` and the weights `w_i` are given by:
.. math::
w_i = -\frac{2n+\alpha+\beta+2}{n+\alpha+\beta+1}
\frac{\Gamma(n+\alpha+1)\Gamma(n+\beta+1)}
{\Gamma(n+\alpha+\beta+1)(n+1)!}
\frac{2^{\alpha+\beta}}{P'_n(x_i)
P^{(\alpha,\beta)}_{n+1}(x_i)}
Parameters
==========
n : the order of quadrature
alpha : the first parameter of the Jacobi Polynomial, `\alpha > -1`
beta : the second parameter of the Jacobi Polynomial, `\beta > -1`
n_digits : number of significant digits of the points and weights to return
Returns
=======
(x, w) : the ``x`` and ``w`` are lists of points and weights as Floats.
The points `x_i` and weights `w_i` are returned as ``(x, w)``
tuple of lists.
Examples
========
>>> from sympy import S
>>> from sympy.integrals.quadrature import gauss_jacobi
>>> x, w = gauss_jacobi(3, S.Half, -S.Half, 5)
>>> x
[-0.90097, -0.22252, 0.62349]
>>> w
[1.7063, 1.0973, 0.33795]
>>> x, w = gauss_jacobi(6, 1, 1, 5)
>>> x
[-0.87174, -0.5917, -0.2093, 0.2093, 0.5917, 0.87174]
>>> w
[0.050584, 0.22169, 0.39439, 0.39439, 0.22169, 0.050584]
See Also
========
gauss_legendre, gauss_laguerre, gauss_hermite, gauss_gen_laguerre, gauss_chebyshev_t, gauss_chebyshev_u, gauss_lobatto
References
==========
.. [1] https://en.wikipedia.org/wiki/Gauss%E2%80%93Jacobi_quadrature
.. [2] http://people.sc.fsu.edu/~jburkardt/cpp_src/jacobi_rule/jacobi_rule.html
.. [3] http://people.sc.fsu.edu/~jburkardt/cpp_src/gegenbauer_rule/gegenbauer_rule.html
"""
x = Dummy("x")
p = jacobi_poly(n, alpha, beta, x, polys=True)
pd = p.diff(x)
pn = jacobi_poly(n+1, alpha, beta, x, polys=True)
xi = []
w = []
for r in p.real_roots():
if isinstance(r, RootOf):
r = r.eval_rational(S.One/10**(n_digits+2))
xi.append(r.n(n_digits))
w.append((
- (2*n+alpha+beta+2) / (n+alpha+beta+S.One) *
(gamma(n+alpha+1)*gamma(n+beta+1)) /
(gamma(n+alpha+beta+S.One)*gamma(n+2)) *
2**(alpha+beta) / (pd.subs(x, r) * pn.subs(x, r))).n(n_digits))
return xi, w
def gauss_lobatto(n, n_digits):
r"""
Computes the Gauss-Lobatto quadrature [1]_ points and weights.
The Gauss-Lobatto quadrature approximates the integral:
.. math::
\int_{-1}^1 f(x)\,dx \approx \sum_{i=1}^n w_i f(x_i)
The nodes `x_i` of an order `n` quadrature rule are the roots of `P'_(n-1)`
and the weights `w_i` are given by:
.. math::
&w_i = \frac{2}{n(n-1) \left[P_{n-1}(x_i)\right]^2},\quad x\neq\pm 1\\
&w_i = \frac{2}{n(n-1)},\quad x=\pm 1
Parameters
==========
n : the order of quadrature
n_digits : number of significant digits of the points and weights to return
Returns
=======
(x, w) : the ``x`` and ``w`` are lists of points and weights as Floats.
The points `x_i` and weights `w_i` are returned as ``(x, w)``
tuple of lists.
Examples
========
>>> from sympy.integrals.quadrature import gauss_lobatto
>>> x, w = gauss_lobatto(3, 5)
>>> x
[-1, 0, 1]
>>> w
[0.33333, 1.3333, 0.33333]
>>> x, w = gauss_lobatto(4, 5)
>>> x
[-1, -0.44721, 0.44721, 1]
>>> w
[0.16667, 0.83333, 0.83333, 0.16667]
See Also
========
gauss_legendre,gauss_laguerre, gauss_gen_laguerre, gauss_hermite, gauss_chebyshev_t, gauss_chebyshev_u, gauss_jacobi
References
==========
.. [1] https://en.wikipedia.org/wiki/Gaussian_quadrature#Gauss.E2.80.93Lobatto_rules
.. [2] http://people.math.sfu.ca/~cbm/aands/page_888.htm
"""
x = Dummy("x")
p = legendre_poly(n-1, x, polys=True)
pd = p.diff(x)
xi = []
w = []
for r in pd.real_roots():
if isinstance(r, RootOf):
r = r.eval_rational(S.One/10**(n_digits+2))
xi.append(r.n(n_digits))
w.append((2/(n*(n-1) * p.subs(x, r)**2)).n(n_digits))
xi.insert(0, -1)
xi.append(1)
w.insert(0, (S(2)/(n*(n-1))).n(n_digits))
w.append((S(2)/(n*(n-1))).n(n_digits))
return xi, w
|
cfa8567aa1ece43f4943b789767c54441958996c9c967f950317f33c393ba93f | from __future__ import print_function, division
from sympy.concrete.expr_with_limits import AddWithLimits
from sympy.core.add import Add
from sympy.core.basic import Basic
from sympy.core.compatibility import is_sequence
from sympy.core.containers import Tuple
from sympy.core.expr import Expr
from sympy.core.function import diff
from sympy.core.logic import fuzzy_bool
from sympy.core.mul import Mul
from sympy.core.numbers import oo, pi
from sympy.core.relational import Ne
from sympy.core.singleton import S
from sympy.core.symbol import (Dummy, Symbol, Wild)
from sympy.core.sympify import sympify
from sympy.functions import Piecewise, sqrt, piecewise_fold, tan, cot, atan
from sympy.functions.elementary.exponential import log
from sympy.functions.elementary.integers import floor
from sympy.functions.elementary.complexes import Abs, sign
from sympy.functions.elementary.miscellaneous import Min, Max
from sympy.integrals.manualintegrate import manualintegrate
from sympy.integrals.trigonometry import trigintegrate
from sympy.integrals.meijerint import meijerint_definite, meijerint_indefinite
from sympy.matrices import MatrixBase
from sympy.polys import Poly, PolynomialError
from sympy.series import limit
from sympy.series.order import Order
from sympy.series.formal import FormalPowerSeries
from sympy.simplify.fu import sincos_to_sum
from sympy.utilities.misc import filldedent
from sympy.utilities.exceptions import SymPyDeprecationWarning
class Integral(AddWithLimits):
"""Represents unevaluated integral."""
__slots__ = ('is_commutative',)
def __new__(cls, function, *symbols, **assumptions):
"""Create an unevaluated integral.
Arguments are an integrand followed by one or more limits.
If no limits are given and there is only one free symbol in the
expression, that symbol will be used, otherwise an error will be
raised.
>>> from sympy import Integral
>>> from sympy.abc import x, y
>>> Integral(x)
Integral(x, x)
>>> Integral(y)
Integral(y, y)
When limits are provided, they are interpreted as follows (using
``x`` as though it were the variable of integration):
(x,) or x - indefinite integral
(x, a) - "evaluate at" integral is an abstract antiderivative
(x, a, b) - definite integral
The ``as_dummy`` method can be used to see which symbols cannot be
targeted by subs: those with a prepended underscore cannot be
changed with ``subs``. (Also, the integration variables themselves --
the first element of a limit -- can never be changed by subs.)
>>> i = Integral(x, x)
>>> at = Integral(x, (x, x))
>>> i.as_dummy()
Integral(x, x)
>>> at.as_dummy()
Integral(_0, (_0, x))
"""
#This will help other classes define their own definitions
#of behaviour with Integral.
if hasattr(function, '_eval_Integral'):
return function._eval_Integral(*symbols, **assumptions)
if isinstance(function, Poly):
SymPyDeprecationWarning(
feature="Using integrate/Integral with Poly",
issue=18613,
deprecated_since_version="1.6",
useinstead="the as_expr or integrate methods of Poly").warn()
obj = AddWithLimits.__new__(cls, function, *symbols, **assumptions)
return obj
def __getnewargs__(self):
return (self.function,) + tuple([tuple(xab) for xab in self.limits])
@property
def free_symbols(self):
"""
This method returns the symbols that will exist when the
integral is evaluated. This is useful if one is trying to
determine whether an integral depends on a certain
symbol or not.
Examples
========
>>> from sympy import Integral
>>> from sympy.abc import x, y
>>> Integral(x, (x, y, 1)).free_symbols
{y}
See Also
========
sympy.concrete.expr_with_limits.ExprWithLimits.function
sympy.concrete.expr_with_limits.ExprWithLimits.limits
sympy.concrete.expr_with_limits.ExprWithLimits.variables
"""
return AddWithLimits.free_symbols.fget(self)
def _eval_is_zero(self):
# This is a very naive and quick test, not intended to do the integral to
# answer whether it is zero or not, e.g. Integral(sin(x), (x, 0, 2*pi))
# is zero but this routine should return None for that case. But, like
# Mul, there are trivial situations for which the integral will be
# zero so we check for those.
if self.function.is_zero:
return True
got_none = False
for l in self.limits:
if len(l) == 3:
z = (l[1] == l[2]) or (l[1] - l[2]).is_zero
if z:
return True
elif z is None:
got_none = True
free = self.function.free_symbols
for xab in self.limits:
if len(xab) == 1:
free.add(xab[0])
continue
if len(xab) == 2 and xab[0] not in free:
if xab[1].is_zero:
return True
elif xab[1].is_zero is None:
got_none = True
# take integration symbol out of free since it will be replaced
# with the free symbols in the limits
free.discard(xab[0])
# add in the new symbols
for i in xab[1:]:
free.update(i.free_symbols)
if self.function.is_zero is False and got_none is False:
return False
def transform(self, x, u):
r"""
Performs a change of variables from `x` to `u` using the relationship
given by `x` and `u` which will define the transformations `f` and `F`
(which are inverses of each other) as follows:
1) If `x` is a Symbol (which is a variable of integration) then `u`
will be interpreted as some function, f(u), with inverse F(u).
This, in effect, just makes the substitution of x with f(x).
2) If `u` is a Symbol then `x` will be interpreted as some function,
F(x), with inverse f(u). This is commonly referred to as
u-substitution.
Once f and F have been identified, the transformation is made as
follows:
.. math:: \int_a^b x \mathrm{d}x \rightarrow \int_{F(a)}^{F(b)} f(x)
\frac{\mathrm{d}}{\mathrm{d}x}
where `F(x)` is the inverse of `f(x)` and the limits and integrand have
been corrected so as to retain the same value after integration.
Notes
=====
The mappings, F(x) or f(u), must lead to a unique integral. Linear
or rational linear expression, `2*x`, `1/x` and `sqrt(x)`, will
always work; quadratic expressions like `x**2 - 1` are acceptable
as long as the resulting integrand does not depend on the sign of
the solutions (see examples).
The integral will be returned unchanged if `x` is not a variable of
integration.
`x` must be (or contain) only one of of the integration variables. If
`u` has more than one free symbol then it should be sent as a tuple
(`u`, `uvar`) where `uvar` identifies which variable is replacing
the integration variable.
XXX can it contain another integration variable?
Examples
========
>>> from sympy.abc import a, b, c, d, x, u, y
>>> from sympy import Integral, S, cos, sqrt
>>> i = Integral(x*cos(x**2 - 1), (x, 0, 1))
transform can change the variable of integration
>>> i.transform(x, u)
Integral(u*cos(u**2 - 1), (u, 0, 1))
transform can perform u-substitution as long as a unique
integrand is obtained:
>>> i.transform(x**2 - 1, u)
Integral(cos(u)/2, (u, -1, 0))
This attempt fails because x = +/-sqrt(u + 1) and the
sign does not cancel out of the integrand:
>>> Integral(cos(x**2 - 1), (x, 0, 1)).transform(x**2 - 1, u)
Traceback (most recent call last):
...
ValueError:
The mapping between F(x) and f(u) did not give a unique integrand.
transform can do a substitution. Here, the previous
result is transformed back into the original expression
using "u-substitution":
>>> ui = _
>>> _.transform(sqrt(u + 1), x) == i
True
We can accomplish the same with a regular substitution:
>>> ui.transform(u, x**2 - 1) == i
True
If the `x` does not contain a symbol of integration then
the integral will be returned unchanged. Integral `i` does
not have an integration variable `a` so no change is made:
>>> i.transform(a, x) == i
True
When `u` has more than one free symbol the symbol that is
replacing `x` must be identified by passing `u` as a tuple:
>>> Integral(x, (x, 0, 1)).transform(x, (u + a, u))
Integral(a + u, (u, -a, 1 - a))
>>> Integral(x, (x, 0, 1)).transform(x, (u + a, a))
Integral(a + u, (a, -u, 1 - u))
See Also
========
sympy.concrete.expr_with_limits.ExprWithLimits.variables : Lists the integration variables
as_dummy : Replace integration variables with dummy ones
"""
from sympy.solvers.solvers import solve, posify
d = Dummy('d')
xfree = x.free_symbols.intersection(self.variables)
if len(xfree) > 1:
raise ValueError(
'F(x) can only contain one of: %s' % self.variables)
xvar = xfree.pop() if xfree else d
if xvar not in self.variables:
return self
u = sympify(u)
if isinstance(u, Expr):
ufree = u.free_symbols
if len(ufree) == 0:
raise ValueError(filldedent('''
f(u) cannot be a constant'''))
if len(ufree) > 1:
raise ValueError(filldedent('''
When f(u) has more than one free symbol, the one replacing x
must be identified: pass f(u) as (f(u), u)'''))
uvar = ufree.pop()
else:
u, uvar = u
if uvar not in u.free_symbols:
raise ValueError(filldedent('''
Expecting a tuple (expr, symbol) where symbol identified
a free symbol in expr, but symbol is not in expr's free
symbols.'''))
if not isinstance(uvar, Symbol):
# This probably never evaluates to True
raise ValueError(filldedent('''
Expecting a tuple (expr, symbol) but didn't get
a symbol; got %s''' % uvar))
if x.is_Symbol and u.is_Symbol:
return self.xreplace({x: u})
if not x.is_Symbol and not u.is_Symbol:
raise ValueError('either x or u must be a symbol')
if uvar == xvar:
return self.transform(x, (u.subs(uvar, d), d)).xreplace({d: uvar})
if uvar in self.limits:
raise ValueError(filldedent('''
u must contain the same variable as in x
or a variable that is not already an integration variable'''))
if not x.is_Symbol:
F = [x.subs(xvar, d)]
soln = solve(u - x, xvar, check=False)
if not soln:
raise ValueError('no solution for solve(F(x) - f(u), x)')
f = [fi.subs(uvar, d) for fi in soln]
else:
f = [u.subs(uvar, d)]
pdiff, reps = posify(u - x)
puvar = uvar.subs([(v, k) for k, v in reps.items()])
soln = [s.subs(reps) for s in solve(pdiff, puvar)]
if not soln:
raise ValueError('no solution for solve(F(x) - f(u), u)')
F = [fi.subs(xvar, d) for fi in soln]
newfuncs = set([(self.function.subs(xvar, fi)*fi.diff(d)
).subs(d, uvar) for fi in f])
if len(newfuncs) > 1:
raise ValueError(filldedent('''
The mapping between F(x) and f(u) did not give
a unique integrand.'''))
newfunc = newfuncs.pop()
def _calc_limit_1(F, a, b):
"""
replace d with a, using subs if possible, otherwise limit
where sign of b is considered
"""
wok = F.subs(d, a)
if wok is S.NaN or wok.is_finite is False and a.is_finite:
return limit(sign(b)*F, d, a)
return wok
def _calc_limit(a, b):
"""
replace d with a, using subs if possible, otherwise limit
where sign of b is considered
"""
avals = list({_calc_limit_1(Fi, a, b) for Fi in F})
if len(avals) > 1:
raise ValueError(filldedent('''
The mapping between F(x) and f(u) did not
give a unique limit.'''))
return avals[0]
newlimits = []
for xab in self.limits:
sym = xab[0]
if sym == xvar:
if len(xab) == 3:
a, b = xab[1:]
a, b = _calc_limit(a, b), _calc_limit(b, a)
if fuzzy_bool(a - b > 0):
a, b = b, a
newfunc = -newfunc
newlimits.append((uvar, a, b))
elif len(xab) == 2:
a = _calc_limit(xab[1], 1)
newlimits.append((uvar, a))
else:
newlimits.append(uvar)
else:
newlimits.append(xab)
return self.func(newfunc, *newlimits)
def doit(self, **hints):
"""
Perform the integration using any hints given.
Examples
========
>>> from sympy import Integral, Piecewise, S
>>> from sympy.abc import x, t
>>> p = x**2 + Piecewise((0, x/t < 0), (1, True))
>>> p.integrate((t, S(4)/5, 1), (x, -1, 1))
1/3
See Also
========
sympy.integrals.trigonometry.trigintegrate
sympy.integrals.heurisch.heurisch
sympy.integrals.rationaltools.ratint
as_sum : Approximate the integral using a sum
"""
from sympy.concrete.summations import Sum
if not hints.get('integrals', True):
return self
deep = hints.get('deep', True)
meijerg = hints.get('meijerg', None)
conds = hints.get('conds', 'piecewise')
risch = hints.get('risch', None)
heurisch = hints.get('heurisch', None)
manual = hints.get('manual', None)
if len(list(filter(None, (manual, meijerg, risch, heurisch)))) > 1:
raise ValueError("At most one of manual, meijerg, risch, heurisch can be True")
elif manual:
meijerg = risch = heurisch = False
elif meijerg:
manual = risch = heurisch = False
elif risch:
manual = meijerg = heurisch = False
elif heurisch:
manual = meijerg = risch = False
eval_kwargs = dict(meijerg=meijerg, risch=risch, manual=manual, heurisch=heurisch,
conds=conds)
if conds not in ['separate', 'piecewise', 'none']:
raise ValueError('conds must be one of "separate", "piecewise", '
'"none", got: %s' % conds)
if risch and any(len(xab) > 1 for xab in self.limits):
raise ValueError('risch=True is only allowed for indefinite integrals.')
# check for the trivial zero
if self.is_zero:
return S.Zero
# hacks to handle integrals of
# nested summations
if isinstance(self.function, Sum):
if any(v in self.function.limits[0] for v in self.variables):
raise ValueError('Limit of the sum cannot be an integration variable.')
if any(l.is_infinite for l in self.function.limits[0][1:]):
return self
_i = self
_sum = self.function
return _sum.func(_i.func(_sum.function, *_i.limits).doit(), *_sum.limits).doit()
# now compute and check the function
function = self.function
if deep:
function = function.doit(**hints)
if function.is_zero:
return S.Zero
# hacks to handle special cases
if isinstance(function, MatrixBase):
return function.applyfunc(
lambda f: self.func(f, self.limits).doit(**hints))
if isinstance(function, FormalPowerSeries):
if len(self.limits) > 1:
raise NotImplementedError
xab = self.limits[0]
if len(xab) > 1:
return function.integrate(xab, **eval_kwargs)
else:
return function.integrate(xab[0], **eval_kwargs)
# There is no trivial answer and special handling
# is done so continue
# first make sure any definite limits have integration
# variables with matching assumptions
reps = {}
for xab in self.limits:
if len(xab) != 3:
continue
x, a, b = xab
l = (a, b)
if all(i.is_nonnegative for i in l) and not x.is_nonnegative:
d = Dummy(positive=True)
elif all(i.is_nonpositive for i in l) and not x.is_nonpositive:
d = Dummy(negative=True)
elif all(i.is_real for i in l) and not x.is_real:
d = Dummy(real=True)
else:
d = None
if d:
reps[x] = d
if reps:
undo = dict([(v, k) for k, v in reps.items()])
did = self.xreplace(reps).doit(**hints)
if type(did) is tuple: # when separate=True
did = tuple([i.xreplace(undo) for i in did])
else:
did = did.xreplace(undo)
return did
# continue with existing assumptions
undone_limits = []
# ulj = free symbols of any undone limits' upper and lower limits
ulj = set()
for xab in self.limits:
# compute uli, the free symbols in the
# Upper and Lower limits of limit I
if len(xab) == 1:
uli = set(xab[:1])
elif len(xab) == 2:
uli = xab[1].free_symbols
elif len(xab) == 3:
uli = xab[1].free_symbols.union(xab[2].free_symbols)
# this integral can be done as long as there is no blocking
# limit that has been undone. An undone limit is blocking if
# it contains an integration variable that is in this limit's
# upper or lower free symbols or vice versa
if xab[0] in ulj or any(v[0] in uli for v in undone_limits):
undone_limits.append(xab)
ulj.update(uli)
function = self.func(*([function] + [xab]))
factored_function = function.factor()
if not isinstance(factored_function, Integral):
function = factored_function
continue
if function.has(Abs, sign) and (
(len(xab) < 3 and all(x.is_extended_real for x in xab)) or
(len(xab) == 3 and all(x.is_extended_real and not x.is_infinite for
x in xab[1:]))):
# some improper integrals are better off with Abs
xr = Dummy("xr", real=True)
function = (function.xreplace({xab[0]: xr})
.rewrite(Piecewise).xreplace({xr: xab[0]}))
elif function.has(Min, Max):
function = function.rewrite(Piecewise)
if (function.has(Piecewise) and
not isinstance(function, Piecewise)):
function = piecewise_fold(function)
if isinstance(function, Piecewise):
if len(xab) == 1:
antideriv = function._eval_integral(xab[0],
**eval_kwargs)
else:
antideriv = self._eval_integral(
function, xab[0], **eval_kwargs)
else:
# There are a number of tradeoffs in using the
# Meijer G method. It can sometimes be a lot faster
# than other methods, and sometimes slower. And
# there are certain types of integrals for which it
# is more likely to work than others. These
# heuristics are incorporated in deciding what
# integration methods to try, in what order. See the
# integrate() docstring for details.
def try_meijerg(function, xab):
ret = None
if len(xab) == 3 and meijerg is not False:
x, a, b = xab
try:
res = meijerint_definite(function, x, a, b)
except NotImplementedError:
from sympy.integrals.meijerint import _debug
_debug('NotImplementedError '
'from meijerint_definite')
res = None
if res is not None:
f, cond = res
if conds == 'piecewise':
ret = Piecewise(
(f, cond),
(self.func(
function, (x, a, b)), True))
elif conds == 'separate':
if len(self.limits) != 1:
raise ValueError(filldedent('''
conds=separate not supported in
multiple integrals'''))
ret = f, cond
else:
ret = f
return ret
meijerg1 = meijerg
if (meijerg is not False and
len(xab) == 3 and xab[1].is_extended_real and xab[2].is_extended_real
and not function.is_Poly and
(xab[1].has(oo, -oo) or xab[2].has(oo, -oo))):
ret = try_meijerg(function, xab)
if ret is not None:
function = ret
continue
meijerg1 = False
# If the special meijerg code did not succeed in
# finding a definite integral, then the code using
# meijerint_indefinite will not either (it might
# find an antiderivative, but the answer is likely
# to be nonsensical). Thus if we are requested to
# only use Meijer G-function methods, we give up at
# this stage. Otherwise we just disable G-function
# methods.
if meijerg1 is False and meijerg is True:
antideriv = None
else:
antideriv = self._eval_integral(
function, xab[0], **eval_kwargs)
if antideriv is None and meijerg is True:
ret = try_meijerg(function, xab)
if ret is not None:
function = ret
continue
if not isinstance(antideriv, Integral) and antideriv is not None:
for atan_term in antideriv.atoms(atan):
atan_arg = atan_term.args[0]
# Checking `atan_arg` to be linear combination of `tan` or `cot`
for tan_part in atan_arg.atoms(tan):
x1 = Dummy('x1')
tan_exp1 = atan_arg.subs(tan_part, x1)
# The coefficient of `tan` should be constant
coeff = tan_exp1.diff(x1)
if x1 not in coeff.free_symbols:
a = tan_part.args[0]
antideriv = antideriv.subs(atan_term, Add(atan_term,
sign(coeff)*pi*floor((a-pi/2)/pi)))
for cot_part in atan_arg.atoms(cot):
x1 = Dummy('x1')
cot_exp1 = atan_arg.subs(cot_part, x1)
# The coefficient of `cot` should be constant
coeff = cot_exp1.diff(x1)
if x1 not in coeff.free_symbols:
a = cot_part.args[0]
antideriv = antideriv.subs(atan_term, Add(atan_term,
sign(coeff)*pi*floor((a)/pi)))
if antideriv is None:
undone_limits.append(xab)
function = self.func(*([function] + [xab])).factor()
factored_function = function.factor()
if not isinstance(factored_function, Integral):
function = factored_function
continue
else:
if len(xab) == 1:
function = antideriv
else:
if len(xab) == 3:
x, a, b = xab
elif len(xab) == 2:
x, b = xab
a = None
else:
raise NotImplementedError
if deep:
if isinstance(a, Basic):
a = a.doit(**hints)
if isinstance(b, Basic):
b = b.doit(**hints)
if antideriv.is_Poly:
gens = list(antideriv.gens)
gens.remove(x)
antideriv = antideriv.as_expr()
function = antideriv._eval_interval(x, a, b)
function = Poly(function, *gens)
else:
def is_indef_int(g, x):
return (isinstance(g, Integral) and
any(i == (x,) for i in g.limits))
def eval_factored(f, x, a, b):
# _eval_interval for integrals with
# (constant) factors
# a single indefinite integral is assumed
args = []
for g in Mul.make_args(f):
if is_indef_int(g, x):
args.append(g._eval_interval(x, a, b))
else:
args.append(g)
return Mul(*args)
integrals, others, piecewises = [], [], []
for f in Add.make_args(antideriv):
if any(is_indef_int(g, x)
for g in Mul.make_args(f)):
integrals.append(f)
elif any(isinstance(g, Piecewise)
for g in Mul.make_args(f)):
piecewises.append(piecewise_fold(f))
else:
others.append(f)
uneval = Add(*[eval_factored(f, x, a, b)
for f in integrals])
try:
evalued = Add(*others)._eval_interval(x, a, b)
evalued_pw = piecewise_fold(Add(*piecewises))._eval_interval(x, a, b)
function = uneval + evalued + evalued_pw
except NotImplementedError:
# This can happen if _eval_interval depends in a
# complicated way on limits that cannot be computed
undone_limits.append(xab)
function = self.func(*([function] + [xab]))
factored_function = function.factor()
if not isinstance(factored_function, Integral):
function = factored_function
return function
def _eval_derivative(self, sym):
"""Evaluate the derivative of the current Integral object by
differentiating under the integral sign [1], using the Fundamental
Theorem of Calculus [2] when possible.
Whenever an Integral is encountered that is equivalent to zero or
has an integrand that is independent of the variable of integration
those integrals are performed. All others are returned as Integral
instances which can be resolved with doit() (provided they are integrable).
References:
[1] https://en.wikipedia.org/wiki/Differentiation_under_the_integral_sign
[2] https://en.wikipedia.org/wiki/Fundamental_theorem_of_calculus
Examples
========
>>> from sympy import Integral
>>> from sympy.abc import x, y
>>> i = Integral(x + y, y, (y, 1, x))
>>> i.diff(x)
Integral(x + y, (y, x)) + Integral(1, y, (y, 1, x))
>>> i.doit().diff(x) == i.diff(x).doit()
True
>>> i.diff(y)
0
The previous must be true since there is no y in the evaluated integral:
>>> i.free_symbols
{x}
>>> i.doit()
2*x**3/3 - x/2 - 1/6
"""
# differentiate under the integral sign; we do not
# check for regularity conditions (TODO), see issue 4215
# get limits and the function
f, limits = self.function, list(self.limits)
# the order matters if variables of integration appear in the limits
# so work our way in from the outside to the inside.
limit = limits.pop(-1)
if len(limit) == 3:
x, a, b = limit
elif len(limit) == 2:
x, b = limit
a = None
else:
a = b = None
x = limit[0]
if limits: # f is the argument to an integral
f = self.func(f, *tuple(limits))
# assemble the pieces
def _do(f, ab):
dab_dsym = diff(ab, sym)
if not dab_dsym:
return S.Zero
if isinstance(f, Integral):
limits = [(x, x) if (len(l) == 1 and l[0] == x) else l
for l in f.limits]
f = self.func(f.function, *limits)
return f.subs(x, ab)*dab_dsym
rv = S.Zero
if b is not None:
rv += _do(f, b)
if a is not None:
rv -= _do(f, a)
if len(limit) == 1 and sym == x:
# the dummy variable *is* also the real-world variable
arg = f
rv += arg
else:
# the dummy variable might match sym but it's
# only a dummy and the actual variable is determined
# by the limits, so mask off the variable of integration
# while differentiating
u = Dummy('u')
arg = f.subs(x, u).diff(sym).subs(u, x)
if arg:
rv += self.func(arg, Tuple(x, a, b))
return rv
def _eval_integral(self, f, x, meijerg=None, risch=None, manual=None,
heurisch=None, conds='piecewise'):
"""
Calculate the anti-derivative to the function f(x).
The following algorithms are applied (roughly in this order):
1. Simple heuristics (based on pattern matching and integral table):
- most frequently used functions (e.g. polynomials, products of
trig functions)
2. Integration of rational functions:
- A complete algorithm for integrating rational functions is
implemented (the Lazard-Rioboo-Trager algorithm). The algorithm
also uses the partial fraction decomposition algorithm
implemented in apart() as a preprocessor to make this process
faster. Note that the integral of a rational function is always
elementary, but in general, it may include a RootSum.
3. Full Risch algorithm:
- The Risch algorithm is a complete decision
procedure for integrating elementary functions, which means that
given any elementary function, it will either compute an
elementary antiderivative, or else prove that none exists.
Currently, part of transcendental case is implemented, meaning
elementary integrals containing exponentials, logarithms, and
(soon!) trigonometric functions can be computed. The algebraic
case, e.g., functions containing roots, is much more difficult
and is not implemented yet.
- If the routine fails (because the integrand is not elementary, or
because a case is not implemented yet), it continues on to the
next algorithms below. If the routine proves that the integrals
is nonelementary, it still moves on to the algorithms below,
because we might be able to find a closed-form solution in terms
of special functions. If risch=True, however, it will stop here.
4. The Meijer G-Function algorithm:
- This algorithm works by first rewriting the integrand in terms of
very general Meijer G-Function (meijerg in SymPy), integrating
it, and then rewriting the result back, if possible. This
algorithm is particularly powerful for definite integrals (which
is actually part of a different method of Integral), since it can
compute closed-form solutions of definite integrals even when no
closed-form indefinite integral exists. But it also is capable
of computing many indefinite integrals as well.
- Another advantage of this method is that it can use some results
about the Meijer G-Function to give a result in terms of a
Piecewise expression, which allows to express conditionally
convergent integrals.
- Setting meijerg=True will cause integrate() to use only this
method.
5. The "manual integration" algorithm:
- This algorithm tries to mimic how a person would find an
antiderivative by hand, for example by looking for a
substitution or applying integration by parts. This algorithm
does not handle as many integrands but can return results in a
more familiar form.
- Sometimes this algorithm can evaluate parts of an integral; in
this case integrate() will try to evaluate the rest of the
integrand using the other methods here.
- Setting manual=True will cause integrate() to use only this
method.
6. The Heuristic Risch algorithm:
- This is a heuristic version of the Risch algorithm, meaning that
it is not deterministic. This is tried as a last resort because
it can be very slow. It is still used because not enough of the
full Risch algorithm is implemented, so that there are still some
integrals that can only be computed using this method. The goal
is to implement enough of the Risch and Meijer G-function methods
so that this can be deleted.
Setting heurisch=True will cause integrate() to use only this
method. Set heurisch=False to not use it.
"""
from sympy.integrals.deltafunctions import deltaintegrate
from sympy.integrals.singularityfunctions import singularityintegrate
from sympy.integrals.heurisch import heurisch as heurisch_, heurisch_wrapper
from sympy.integrals.rationaltools import ratint
from sympy.integrals.risch import risch_integrate
if risch:
try:
return risch_integrate(f, x, conds=conds)
except NotImplementedError:
return None
if manual:
try:
result = manualintegrate(f, x)
if result is not None and result.func != Integral:
return result
except (ValueError, PolynomialError):
pass
eval_kwargs = dict(meijerg=meijerg, risch=risch, manual=manual,
heurisch=heurisch, conds=conds)
# if it is a poly(x) then let the polynomial integrate itself (fast)
#
# It is important to make this check first, otherwise the other code
# will return a sympy expression instead of a Polynomial.
#
# see Polynomial for details.
if isinstance(f, Poly) and not (manual or meijerg or risch):
SymPyDeprecationWarning(
feature="Using integrate/Integral with Poly",
issue=18613,
deprecated_since_version="1.6",
useinstead="the as_expr or integrate methods of Poly").warn()
return f.integrate(x)
# Piecewise antiderivatives need to call special integrate.
if isinstance(f, Piecewise):
return f.piecewise_integrate(x, **eval_kwargs)
# let's cut it short if `f` does not depend on `x`; if
# x is only a dummy, that will be handled below
if not f.has(x):
return f*x
# try to convert to poly(x) and then integrate if successful (fast)
poly = f.as_poly(x)
if poly is not None and not (manual or meijerg or risch):
return poly.integrate().as_expr()
if risch is not False:
try:
result, i = risch_integrate(f, x, separate_integral=True,
conds=conds)
except NotImplementedError:
pass
else:
if i:
# There was a nonelementary integral. Try integrating it.
# if no part of the NonElementaryIntegral is integrated by
# the Risch algorithm, then use the original function to
# integrate, instead of re-written one
if result == 0:
from sympy.integrals.risch import NonElementaryIntegral
return NonElementaryIntegral(f, x).doit(risch=False)
else:
return result + i.doit(risch=False)
else:
return result
# since Integral(f=g1+g2+...) == Integral(g1) + Integral(g2) + ...
# we are going to handle Add terms separately,
# if `f` is not Add -- we only have one term
# Note that in general, this is a bad idea, because Integral(g1) +
# Integral(g2) might not be computable, even if Integral(g1 + g2) is.
# For example, Integral(x**x + x**x*log(x)). But many heuristics only
# work term-wise. So we compute this step last, after trying
# risch_integrate. We also try risch_integrate again in this loop,
# because maybe the integral is a sum of an elementary part and a
# nonelementary part (like erf(x) + exp(x)). risch_integrate() is
# quite fast, so this is acceptable.
parts = []
args = Add.make_args(f)
for g in args:
coeff, g = g.as_independent(x)
# g(x) = const
if g is S.One and not meijerg:
parts.append(coeff*x)
continue
# g(x) = expr + O(x**n)
order_term = g.getO()
if order_term is not None:
h = self._eval_integral(g.removeO(), x, **eval_kwargs)
if h is not None:
h_order_expr = self._eval_integral(order_term.expr, x, **eval_kwargs)
if h_order_expr is not None:
h_order_term = order_term.func(
h_order_expr, *order_term.variables)
parts.append(coeff*(h + h_order_term))
continue
# NOTE: if there is O(x**n) and we fail to integrate then
# there is no point in trying other methods because they
# will fail, too.
return None
# c
# g(x) = (a*x+b)
if g.is_Pow and not g.exp.has(x) and not meijerg:
a = Wild('a', exclude=[x])
b = Wild('b', exclude=[x])
M = g.base.match(a*x + b)
if M is not None:
if g.exp == -1:
h = log(g.base)
elif conds != 'piecewise':
h = g.base**(g.exp + 1) / (g.exp + 1)
else:
h1 = log(g.base)
h2 = g.base**(g.exp + 1) / (g.exp + 1)
h = Piecewise((h2, Ne(g.exp, -1)), (h1, True))
parts.append(coeff * h / M[a])
continue
# poly(x)
# g(x) = -------
# poly(x)
if g.is_rational_function(x) and not (manual or meijerg or risch):
parts.append(coeff * ratint(g, x))
continue
if not (manual or meijerg or risch):
# g(x) = Mul(trig)
h = trigintegrate(g, x, conds=conds)
if h is not None:
parts.append(coeff * h)
continue
# g(x) has at least a DiracDelta term
h = deltaintegrate(g, x)
if h is not None:
parts.append(coeff * h)
continue
# g(x) has at least a Singularity Function term
h = singularityintegrate(g, x)
if h is not None:
parts.append(coeff * h)
continue
# Try risch again.
if risch is not False:
try:
h, i = risch_integrate(g, x,
separate_integral=True, conds=conds)
except NotImplementedError:
h = None
else:
if i:
h = h + i.doit(risch=False)
parts.append(coeff*h)
continue
# fall back to heurisch
if heurisch is not False:
try:
if conds == 'piecewise':
h = heurisch_wrapper(g, x, hints=[])
else:
h = heurisch_(g, x, hints=[])
except PolynomialError:
# XXX: this exception means there is a bug in the
# implementation of heuristic Risch integration
# algorithm.
h = None
else:
h = None
if meijerg is not False and h is None:
# rewrite using G functions
try:
h = meijerint_indefinite(g, x)
except NotImplementedError:
from sympy.integrals.meijerint import _debug
_debug('NotImplementedError from meijerint_definite')
if h is not None:
parts.append(coeff * h)
continue
if h is None and manual is not False:
try:
result = manualintegrate(g, x)
if result is not None and not isinstance(result, Integral):
if result.has(Integral) and not manual:
# Try to have other algorithms do the integrals
# manualintegrate can't handle,
# unless we were asked to use manual only.
# Keep the rest of eval_kwargs in case another
# method was set to False already
new_eval_kwargs = eval_kwargs
new_eval_kwargs["manual"] = False
result = result.func(*[
arg.doit(**new_eval_kwargs) if
arg.has(Integral) else arg
for arg in result.args
]).expand(multinomial=False,
log=False,
power_exp=False,
power_base=False)
if not result.has(Integral):
parts.append(coeff * result)
continue
except (ValueError, PolynomialError):
# can't handle some SymPy expressions
pass
# if we failed maybe it was because we had
# a product that could have been expanded,
# so let's try an expansion of the whole
# thing before giving up; we don't try this
# at the outset because there are things
# that cannot be solved unless they are
# NOT expanded e.g., x**x*(1+log(x)). There
# should probably be a checker somewhere in this
# routine to look for such cases and try to do
# collection on the expressions if they are already
# in an expanded form
if not h and len(args) == 1:
f = sincos_to_sum(f).expand(mul=True, deep=False)
if f.is_Add:
# Note: risch will be identical on the expanded
# expression, but maybe it will be able to pick out parts,
# like x*(exp(x) + erf(x)).
return self._eval_integral(f, x, **eval_kwargs)
if h is not None:
parts.append(coeff * h)
else:
return None
return Add(*parts)
def _eval_lseries(self, x, logx):
expr = self.as_dummy()
symb = x
for l in expr.limits:
if x in l[1:]:
symb = l[0]
break
for term in expr.function.lseries(symb, logx):
yield integrate(term, *expr.limits)
def _eval_nseries(self, x, n, logx):
expr = self.as_dummy()
symb = x
for l in expr.limits:
if x in l[1:]:
symb = l[0]
break
terms, order = expr.function.nseries(
x=symb, n=n, logx=logx).as_coeff_add(Order)
order = [o.subs(symb, x) for o in order]
return integrate(terms, *expr.limits) + Add(*order)*x
def _eval_as_leading_term(self, x):
series_gen = self.args[0].lseries(x)
for leading_term in series_gen:
if leading_term != 0:
break
return integrate(leading_term, *self.args[1:])
def _eval_simplify(self, **kwargs):
from sympy.core.exprtools import factor_terms
from sympy.simplify.simplify import simplify
expr = factor_terms(self)
if isinstance(expr, Integral):
return expr.func(*[simplify(i, **kwargs) for i in expr.args])
return expr.simplify(**kwargs)
def as_sum(self, n=None, method="midpoint", evaluate=True):
"""
Approximates a definite integral by a sum.
Arguments
---------
n
The number of subintervals to use, optional.
method
One of: 'left', 'right', 'midpoint', 'trapezoid'.
evaluate
If False, returns an unevaluated Sum expression. The default
is True, evaluate the sum.
These methods of approximate integration are described in [1].
[1] https://en.wikipedia.org/wiki/Riemann_sum#Methods
Examples
========
>>> from sympy import sin, sqrt
>>> from sympy.abc import x, n
>>> from sympy.integrals import Integral
>>> e = Integral(sin(x), (x, 3, 7))
>>> e
Integral(sin(x), (x, 3, 7))
For demonstration purposes, this interval will only be split into 2
regions, bounded by [3, 5] and [5, 7].
The left-hand rule uses function evaluations at the left of each
interval:
>>> e.as_sum(2, 'left')
2*sin(5) + 2*sin(3)
The midpoint rule uses evaluations at the center of each interval:
>>> e.as_sum(2, 'midpoint')
2*sin(4) + 2*sin(6)
The right-hand rule uses function evaluations at the right of each
interval:
>>> e.as_sum(2, 'right')
2*sin(5) + 2*sin(7)
The trapezoid rule uses function evaluations on both sides of the
intervals. This is equivalent to taking the average of the left and
right hand rule results:
>>> e.as_sum(2, 'trapezoid')
2*sin(5) + sin(3) + sin(7)
>>> (e.as_sum(2, 'left') + e.as_sum(2, 'right'))/2 == _
True
Here, the discontinuity at x = 0 can be avoided by using the
midpoint or right-hand method:
>>> e = Integral(1/sqrt(x), (x, 0, 1))
>>> e.as_sum(5).n(4)
1.730
>>> e.as_sum(10).n(4)
1.809
>>> e.doit().n(4) # the actual value is 2
2.000
The left- or trapezoid method will encounter the discontinuity and
return infinity:
>>> e.as_sum(5, 'left')
zoo
The number of intervals can be symbolic. If omitted, a dummy symbol
will be used for it.
>>> e = Integral(x**2, (x, 0, 2))
>>> e.as_sum(n, 'right').expand()
8/3 + 4/n + 4/(3*n**2)
This shows that the midpoint rule is more accurate, as its error
term decays as the square of n:
>>> e.as_sum(method='midpoint').expand()
8/3 - 2/(3*_n**2)
A symbolic sum is returned with evaluate=False:
>>> e.as_sum(n, 'midpoint', evaluate=False)
2*Sum((2*_k/n - 1/n)**2, (_k, 1, n))/n
See Also
========
Integral.doit : Perform the integration using any hints
"""
from sympy.concrete.summations import Sum
limits = self.limits
if len(limits) > 1:
raise NotImplementedError(
"Multidimensional midpoint rule not implemented yet")
else:
limit = limits[0]
if (len(limit) != 3 or limit[1].is_finite is False or
limit[2].is_finite is False):
raise ValueError("Expecting a definite integral over "
"a finite interval.")
if n is None:
n = Dummy('n', integer=True, positive=True)
else:
n = sympify(n)
if (n.is_positive is False or n.is_integer is False or
n.is_finite is False):
raise ValueError("n must be a positive integer, got %s" % n)
x, a, b = limit
dx = (b - a)/n
k = Dummy('k', integer=True, positive=True)
f = self.function
if method == "left":
result = dx*Sum(f.subs(x, a + (k-1)*dx), (k, 1, n))
elif method == "right":
result = dx*Sum(f.subs(x, a + k*dx), (k, 1, n))
elif method == "midpoint":
result = dx*Sum(f.subs(x, a + k*dx - dx/2), (k, 1, n))
elif method == "trapezoid":
result = dx*((f.subs(x, a) + f.subs(x, b))/2 +
Sum(f.subs(x, a + k*dx), (k, 1, n - 1)))
else:
raise ValueError("Unknown method %s" % method)
return result.doit() if evaluate else result
def _sage_(self):
import sage.all as sage
f, limits = self.function._sage_(), list(self.limits)
for limit_ in limits:
if len(limit_) == 1:
x = limit_[0]
f = sage.integral(f,
x._sage_(),
hold=True)
elif len(limit_) == 2:
x, b = limit_
f = sage.integral(f,
x._sage_(),
b._sage_(),
hold=True)
else:
x, a, b = limit_
f = sage.integral(f,
(x._sage_(),
a._sage_(),
b._sage_()),
hold=True)
return f
def principal_value(self, **kwargs):
"""
Compute the Cauchy Principal Value of the definite integral of a real function in the given interval
on the real axis.
In mathematics, the Cauchy principal value, is a method for assigning values to certain improper
integrals which would otherwise be undefined.
Examples
========
>>> from sympy import Dummy, symbols, integrate, limit, oo
>>> from sympy.integrals.integrals import Integral
>>> from sympy.calculus.singularities import singularities
>>> x = symbols('x')
>>> Integral(x+1, (x, -oo, oo)).principal_value()
oo
>>> f = 1 / (x**3)
>>> Integral(f, (x, -oo, oo)).principal_value()
0
>>> Integral(f, (x, -10, 10)).principal_value()
0
>>> Integral(f, (x, -10, oo)).principal_value() + Integral(f, (x, -oo, 10)).principal_value()
0
References
==========
.. [1] https://en.wikipedia.org/wiki/Cauchy_principal_value
.. [2] http://mathworld.wolfram.com/CauchyPrincipalValue.html
"""
from sympy.calculus import singularities
if len(self.limits) != 1 or len(list(self.limits[0])) != 3:
raise ValueError("You need to insert a variable, lower_limit, and upper_limit correctly to calculate "
"cauchy's principal value")
x, a, b = self.limits[0]
if not (a.is_comparable and b.is_comparable and a <= b):
raise ValueError("The lower_limit must be smaller than or equal to the upper_limit to calculate "
"cauchy's principal value. Also, a and b need to be comparable.")
if a == b:
return 0
r = Dummy('r')
f = self.function
singularities_list = [s for s in singularities(f, x) if s.is_comparable and a <= s <= b]
for i in singularities_list:
if (i == b) or (i == a):
raise ValueError(
'The principal value is not defined in the given interval due to singularity at %d.' % (i))
F = integrate(f, x, **kwargs)
if F.has(Integral):
return self
if a is -oo and b is oo:
I = limit(F - F.subs(x, -x), x, oo)
else:
I = limit(F, x, b, '-') - limit(F, x, a, '+')
for s in singularities_list:
I += limit(((F.subs(x, s - r)) - F.subs(x, s + r)), r, 0, '+')
return I
def integrate(*args, **kwargs):
"""integrate(f, var, ...)
Compute definite or indefinite integral of one or more variables
using Risch-Norman algorithm and table lookup. This procedure is
able to handle elementary algebraic and transcendental functions
and also a huge class of special functions, including Airy,
Bessel, Whittaker and Lambert.
var can be:
- a symbol -- indefinite integration
- a tuple (symbol, a) -- indefinite integration with result
given with `a` replacing `symbol`
- a tuple (symbol, a, b) -- definite integration
Several variables can be specified, in which case the result is
multiple integration. (If var is omitted and the integrand is
univariate, the indefinite integral in that variable will be performed.)
Indefinite integrals are returned without terms that are independent
of the integration variables. (see examples)
Definite improper integrals often entail delicate convergence
conditions. Pass conds='piecewise', 'separate' or 'none' to have
these returned, respectively, as a Piecewise function, as a separate
result (i.e. result will be a tuple), or not at all (default is
'piecewise').
**Strategy**
SymPy uses various approaches to definite integration. One method is to
find an antiderivative for the integrand, and then use the fundamental
theorem of calculus. Various functions are implemented to integrate
polynomial, rational and trigonometric functions, and integrands
containing DiracDelta terms.
SymPy also implements the part of the Risch algorithm, which is a decision
procedure for integrating elementary functions, i.e., the algorithm can
either find an elementary antiderivative, or prove that one does not
exist. There is also a (very successful, albeit somewhat slow) general
implementation of the heuristic Risch algorithm. This algorithm will
eventually be phased out as more of the full Risch algorithm is
implemented. See the docstring of Integral._eval_integral() for more
details on computing the antiderivative using algebraic methods.
The option risch=True can be used to use only the (full) Risch algorithm.
This is useful if you want to know if an elementary function has an
elementary antiderivative. If the indefinite Integral returned by this
function is an instance of NonElementaryIntegral, that means that the
Risch algorithm has proven that integral to be non-elementary. Note that
by default, additional methods (such as the Meijer G method outlined
below) are tried on these integrals, as they may be expressible in terms
of special functions, so if you only care about elementary answers, use
risch=True. Also note that an unevaluated Integral returned by this
function is not necessarily a NonElementaryIntegral, even with risch=True,
as it may just be an indication that the particular part of the Risch
algorithm needed to integrate that function is not yet implemented.
Another family of strategies comes from re-writing the integrand in
terms of so-called Meijer G-functions. Indefinite integrals of a
single G-function can always be computed, and the definite integral
of a product of two G-functions can be computed from zero to
infinity. Various strategies are implemented to rewrite integrands
as G-functions, and use this information to compute integrals (see
the ``meijerint`` module).
The option manual=True can be used to use only an algorithm that tries
to mimic integration by hand. This algorithm does not handle as many
integrands as the other algorithms implemented but may return results in
a more familiar form. The ``manualintegrate`` module has functions that
return the steps used (see the module docstring for more information).
In general, the algebraic methods work best for computing
antiderivatives of (possibly complicated) combinations of elementary
functions. The G-function methods work best for computing definite
integrals from zero to infinity of moderately complicated
combinations of special functions, or indefinite integrals of very
simple combinations of special functions.
The strategy employed by the integration code is as follows:
- If computing a definite integral, and both limits are real,
and at least one limit is +- oo, try the G-function method of
definite integration first.
- Try to find an antiderivative, using all available methods, ordered
by performance (that is try fastest method first, slowest last; in
particular polynomial integration is tried first, Meijer
G-functions second to last, and heuristic Risch last).
- If still not successful, try G-functions irrespective of the
limits.
The option meijerg=True, False, None can be used to, respectively:
always use G-function methods and no others, never use G-function
methods, or use all available methods (in order as described above).
It defaults to None.
Examples
========
>>> from sympy import integrate, log, exp, oo
>>> from sympy.abc import a, x, y
>>> integrate(x*y, x)
x**2*y/2
>>> integrate(log(x), x)
x*log(x) - x
>>> integrate(log(x), (x, 1, a))
a*log(a) - a + 1
>>> integrate(x)
x**2/2
Terms that are independent of x are dropped by indefinite integration:
>>> from sympy import sqrt
>>> integrate(sqrt(1 + x), (x, 0, x))
2*(x + 1)**(3/2)/3 - 2/3
>>> integrate(sqrt(1 + x), x)
2*(x + 1)**(3/2)/3
>>> integrate(x*y)
Traceback (most recent call last):
...
ValueError: specify integration variables to integrate x*y
Note that ``integrate(x)`` syntax is meant only for convenience
in interactive sessions and should be avoided in library code.
>>> integrate(x**a*exp(-x), (x, 0, oo)) # same as conds='piecewise'
Piecewise((gamma(a + 1), re(a) > -1),
(Integral(x**a*exp(-x), (x, 0, oo)), True))
>>> integrate(x**a*exp(-x), (x, 0, oo), conds='none')
gamma(a + 1)
>>> integrate(x**a*exp(-x), (x, 0, oo), conds='separate')
(gamma(a + 1), -re(a) < 1)
See Also
========
Integral, Integral.doit
"""
doit_flags = {
'deep': False,
'meijerg': kwargs.pop('meijerg', None),
'conds': kwargs.pop('conds', 'piecewise'),
'risch': kwargs.pop('risch', None),
'heurisch': kwargs.pop('heurisch', None),
'manual': kwargs.pop('manual', None)
}
integral = Integral(*args, **kwargs)
if isinstance(integral, Integral):
return integral.doit(**doit_flags)
else:
new_args = [a.doit(**doit_flags) if isinstance(a, Integral) else a
for a in integral.args]
return integral.func(*new_args)
def line_integrate(field, curve, vars):
"""line_integrate(field, Curve, variables)
Compute the line integral.
Examples
========
>>> from sympy import Curve, line_integrate, E, ln
>>> from sympy.abc import x, y, t
>>> C = Curve([E**t + 1, E**t - 1], (t, 0, ln(2)))
>>> line_integrate(x + y, C, [x, y])
3*sqrt(2)
See Also
========
sympy.integrals.integrals.integrate, Integral
"""
from sympy.geometry import Curve
F = sympify(field)
if not F:
raise ValueError(
"Expecting function specifying field as first argument.")
if not isinstance(curve, Curve):
raise ValueError("Expecting Curve entity as second argument.")
if not is_sequence(vars):
raise ValueError("Expecting ordered iterable for variables.")
if len(curve.functions) != len(vars):
raise ValueError("Field variable size does not match curve dimension.")
if curve.parameter in vars:
raise ValueError("Curve parameter clashes with field parameters.")
# Calculate derivatives for line parameter functions
# F(r) -> F(r(t)) and finally F(r(t)*r'(t))
Ft = F
dldt = 0
for i, var in enumerate(vars):
_f = curve.functions[i]
_dn = diff(_f, curve.parameter)
# ...arc length
dldt = dldt + (_dn * _dn)
Ft = Ft.subs(var, _f)
Ft = Ft * sqrt(dldt)
integral = Integral(Ft, curve.limits).doit(deep=False)
return integral
|
fc9a1571f8e23ea66bd035b48c01b7381d14350c4ae8230170a6c3c5ddafed3a | from __future__ import print_function, division
from typing import Dict, List
from itertools import permutations
from sympy.core.add import Add
from sympy.core.basic import Basic
from sympy.core.mul import Mul
from sympy.core.symbol import Wild, Dummy
from sympy.core.basic import sympify
from sympy.core.numbers import Rational, pi, I
from sympy.core.relational import Eq, Ne
from sympy.core.singleton import S
from sympy.functions import exp, sin, cos, tan, cot, asin, atan
from sympy.functions import log, sinh, cosh, tanh, coth, asinh, acosh
from sympy.functions import sqrt, erf, erfi, li, Ei
from sympy.functions import besselj, bessely, besseli, besselk
from sympy.functions import hankel1, hankel2, jn, yn
from sympy.functions.elementary.complexes import Abs, re, im, sign, arg
from sympy.functions.elementary.exponential import LambertW
from sympy.functions.elementary.integers import floor, ceiling
from sympy.functions.elementary.piecewise import Piecewise
from sympy.functions.special.delta_functions import Heaviside, DiracDelta
from sympy.simplify.radsimp import collect
from sympy.logic.boolalg import And, Or
from sympy.utilities.iterables import uniq
from sympy.polys import quo, gcd, lcm, factor, cancel, PolynomialError
from sympy.polys.monomials import itermonomials
from sympy.polys.polyroots import root_factors
from sympy.polys.rings import PolyRing
from sympy.polys.solvers import solve_lin_sys
from sympy.polys.constructor import construct_domain
from sympy.core.compatibility import reduce, ordered
from sympy.integrals.integrals import integrate
def components(f, x):
"""
Returns a set of all functional components of the given expression
which includes symbols, function applications and compositions and
non-integer powers. Fractional powers are collected with
minimal, positive exponents.
>>> from sympy import cos, sin
>>> from sympy.abc import x, y
>>> from sympy.integrals.heurisch import components
>>> components(sin(x)*cos(x)**2, x)
{x, sin(x), cos(x)}
See Also
========
heurisch
"""
result = set()
if x in f.free_symbols:
if f.is_symbol and f.is_commutative:
result.add(f)
elif f.is_Function or f.is_Derivative:
for g in f.args:
result |= components(g, x)
result.add(f)
elif f.is_Pow:
result |= components(f.base, x)
if not f.exp.is_Integer:
if f.exp.is_Rational:
result.add(f.base**Rational(1, f.exp.q))
else:
result |= components(f.exp, x) | {f}
else:
for g in f.args:
result |= components(g, x)
return result
# name -> [] of symbols
_symbols_cache = {} # type: Dict[str, List[Dummy]]
# NB @cacheit is not convenient here
def _symbols(name, n):
"""get vector of symbols local to this module"""
try:
lsyms = _symbols_cache[name]
except KeyError:
lsyms = []
_symbols_cache[name] = lsyms
while len(lsyms) < n:
lsyms.append( Dummy('%s%i' % (name, len(lsyms))) )
return lsyms[:n]
def heurisch_wrapper(f, x, rewrite=False, hints=None, mappings=None, retries=3,
degree_offset=0, unnecessary_permutations=None,
_try_heurisch=None):
"""
A wrapper around the heurisch integration algorithm.
This method takes the result from heurisch and checks for poles in the
denominator. For each of these poles, the integral is reevaluated, and
the final integration result is given in terms of a Piecewise.
Examples
========
>>> from sympy.core import symbols
>>> from sympy.functions import cos
>>> from sympy.integrals.heurisch import heurisch, heurisch_wrapper
>>> n, x = symbols('n x')
>>> heurisch(cos(n*x), x)
sin(n*x)/n
>>> heurisch_wrapper(cos(n*x), x)
Piecewise((sin(n*x)/n, Ne(n, 0)), (x, True))
See Also
========
heurisch
"""
from sympy.solvers.solvers import solve, denoms
f = sympify(f)
if x not in f.free_symbols:
return f*x
res = heurisch(f, x, rewrite, hints, mappings, retries, degree_offset,
unnecessary_permutations, _try_heurisch)
if not isinstance(res, Basic):
return res
# We consider each denominator in the expression, and try to find
# cases where one or more symbolic denominator might be zero. The
# conditions for these cases are stored in the list slns.
slns = []
for d in denoms(res):
try:
slns += solve(d, dict=True, exclude=(x,))
except NotImplementedError:
pass
if not slns:
return res
slns = list(uniq(slns))
# Remove the solutions corresponding to poles in the original expression.
slns0 = []
for d in denoms(f):
try:
slns0 += solve(d, dict=True, exclude=(x,))
except NotImplementedError:
pass
slns = [s for s in slns if s not in slns0]
if not slns:
return res
if len(slns) > 1:
eqs = []
for sub_dict in slns:
eqs.extend([Eq(key, value) for key, value in sub_dict.items()])
slns = solve(eqs, dict=True, exclude=(x,)) + slns
# For each case listed in the list slns, we reevaluate the integral.
pairs = []
for sub_dict in slns:
expr = heurisch(f.subs(sub_dict), x, rewrite, hints, mappings, retries,
degree_offset, unnecessary_permutations,
_try_heurisch)
cond = And(*[Eq(key, value) for key, value in sub_dict.items()])
generic = Or(*[Ne(key, value) for key, value in sub_dict.items()])
if expr is None:
expr = integrate(f.subs(sub_dict),x)
pairs.append((expr, cond))
# If there is one condition, put the generic case first. Otherwise,
# doing so may lead to longer Piecewise formulas
if len(pairs) == 1:
pairs = [(heurisch(f, x, rewrite, hints, mappings, retries,
degree_offset, unnecessary_permutations,
_try_heurisch),
generic),
(pairs[0][0], True)]
else:
pairs.append((heurisch(f, x, rewrite, hints, mappings, retries,
degree_offset, unnecessary_permutations,
_try_heurisch),
True))
return Piecewise(*pairs)
class BesselTable(object):
"""
Derivatives of Bessel functions of orders n and n-1
in terms of each other.
See the docstring of DiffCache.
"""
def __init__(self):
self.table = {}
self.n = Dummy('n')
self.z = Dummy('z')
self._create_table()
def _create_table(t):
table, n, z = t.table, t.n, t.z
for f in (besselj, bessely, hankel1, hankel2):
table[f] = (f(n-1, z) - n*f(n, z)/z,
(n-1)*f(n-1, z)/z - f(n, z))
f = besseli
table[f] = (f(n-1, z) - n*f(n, z)/z,
(n-1)*f(n-1, z)/z + f(n, z))
f = besselk
table[f] = (-f(n-1, z) - n*f(n, z)/z,
(n-1)*f(n-1, z)/z - f(n, z))
for f in (jn, yn):
table[f] = (f(n-1, z) - (n+1)*f(n, z)/z,
(n-1)*f(n-1, z)/z - f(n, z))
def diffs(t, f, n, z):
if f in t.table:
diff0, diff1 = t.table[f]
repl = [(t.n, n), (t.z, z)]
return (diff0.subs(repl), diff1.subs(repl))
def has(t, f):
return f in t.table
_bessel_table = None
class DiffCache(object):
"""
Store for derivatives of expressions.
The standard form of the derivative of a Bessel function of order n
contains two Bessel functions of orders n-1 and n+1, respectively.
Such forms cannot be used in parallel Risch algorithm, because
there is a linear recurrence relation between the three functions
while the algorithm expects that functions and derivatives are
represented in terms of algebraically independent transcendentals.
The solution is to take two of the functions, e.g., those of orders
n and n-1, and to express the derivatives in terms of the pair.
To guarantee that the proper form is used the two derivatives are
cached as soon as one is encountered.
Derivatives of other functions are also cached at no extra cost.
All derivatives are with respect to the same variable `x`.
"""
def __init__(self, x):
self.cache = {}
self.x = x
global _bessel_table
if not _bessel_table:
_bessel_table = BesselTable()
def get_diff(self, f):
cache = self.cache
if f in cache:
pass
elif (not hasattr(f, 'func') or
not _bessel_table.has(f.func)):
cache[f] = cancel(f.diff(self.x))
else:
n, z = f.args
d0, d1 = _bessel_table.diffs(f.func, n, z)
dz = self.get_diff(z)
cache[f] = d0*dz
cache[f.func(n-1, z)] = d1*dz
return cache[f]
def heurisch(f, x, rewrite=False, hints=None, mappings=None, retries=3,
degree_offset=0, unnecessary_permutations=None,
_try_heurisch=None):
"""
Compute indefinite integral using heuristic Risch algorithm.
This is a heuristic approach to indefinite integration in finite
terms using the extended heuristic (parallel) Risch algorithm, based
on Manuel Bronstein's "Poor Man's Integrator".
The algorithm supports various classes of functions including
transcendental elementary or special functions like Airy,
Bessel, Whittaker and Lambert.
Note that this algorithm is not a decision procedure. If it isn't
able to compute the antiderivative for a given function, then this is
not a proof that such a functions does not exist. One should use
recursive Risch algorithm in such case. It's an open question if
this algorithm can be made a full decision procedure.
This is an internal integrator procedure. You should use toplevel
'integrate' function in most cases, as this procedure needs some
preprocessing steps and otherwise may fail.
Specification
=============
heurisch(f, x, rewrite=False, hints=None)
where
f : expression
x : symbol
rewrite -> force rewrite 'f' in terms of 'tan' and 'tanh'
hints -> a list of functions that may appear in anti-derivate
- hints = None --> no suggestions at all
- hints = [ ] --> try to figure out
- hints = [f1, ..., fn] --> we know better
Examples
========
>>> from sympy import tan
>>> from sympy.integrals.heurisch import heurisch
>>> from sympy.abc import x, y
>>> heurisch(y*tan(x), x)
y*log(tan(x)**2 + 1)/2
See Manuel Bronstein's "Poor Man's Integrator":
[1] http://www-sop.inria.fr/cafe/Manuel.Bronstein/pmint/index.html
For more information on the implemented algorithm refer to:
[2] K. Geddes, L. Stefanus, On the Risch-Norman Integration
Method and its Implementation in Maple, Proceedings of
ISSAC'89, ACM Press, 212-217.
[3] J. H. Davenport, On the Parallel Risch Algorithm (I),
Proceedings of EUROCAM'82, LNCS 144, Springer, 144-157.
[4] J. H. Davenport, On the Parallel Risch Algorithm (III):
Use of Tangents, SIGSAM Bulletin 16 (1982), 3-6.
[5] J. H. Davenport, B. M. Trager, On the Parallel Risch
Algorithm (II), ACM Transactions on Mathematical
Software 11 (1985), 356-362.
See Also
========
sympy.integrals.integrals.Integral.doit
sympy.integrals.integrals.Integral
sympy.integrals.heurisch.components
"""
f = sympify(f)
# There are some functions that Heurisch cannot currently handle,
# so do not even try.
# Set _try_heurisch=True to skip this check
if _try_heurisch is not True:
if f.has(Abs, re, im, sign, Heaviside, DiracDelta, floor, ceiling, arg):
return
if x not in f.free_symbols:
return f*x
if not f.is_Add:
indep, f = f.as_independent(x)
else:
indep = S.One
rewritables = {
(sin, cos, cot): tan,
(sinh, cosh, coth): tanh,
}
if rewrite:
for candidates, rule in rewritables.items():
f = f.rewrite(candidates, rule)
else:
for candidates in rewritables.keys():
if f.has(*candidates):
break
else:
rewrite = True
terms = components(f, x)
if hints is not None:
if not hints:
a = Wild('a', exclude=[x])
b = Wild('b', exclude=[x])
c = Wild('c', exclude=[x])
for g in set(terms): # using copy of terms
if g.is_Function:
if isinstance(g, li):
M = g.args[0].match(a*x**b)
if M is not None:
terms.add( x*(li(M[a]*x**M[b]) - (M[a]*x**M[b])**(-1/M[b])*Ei((M[b]+1)*log(M[a]*x**M[b])/M[b])) )
#terms.add( x*(li(M[a]*x**M[b]) - (x**M[b])**(-1/M[b])*Ei((M[b]+1)*log(M[a]*x**M[b])/M[b])) )
#terms.add( x*(li(M[a]*x**M[b]) - x*Ei((M[b]+1)*log(M[a]*x**M[b])/M[b])) )
#terms.add( li(M[a]*x**M[b]) - Ei((M[b]+1)*log(M[a]*x**M[b])/M[b]) )
elif isinstance(g, exp):
M = g.args[0].match(a*x**2)
if M is not None:
if M[a].is_positive:
terms.add(erfi(sqrt(M[a])*x))
else: # M[a].is_negative or unknown
terms.add(erf(sqrt(-M[a])*x))
M = g.args[0].match(a*x**2 + b*x + c)
if M is not None:
if M[a].is_positive:
terms.add(sqrt(pi/4*(-M[a]))*exp(M[c] - M[b]**2/(4*M[a]))*
erfi(sqrt(M[a])*x + M[b]/(2*sqrt(M[a]))))
elif M[a].is_negative:
terms.add(sqrt(pi/4*(-M[a]))*exp(M[c] - M[b]**2/(4*M[a]))*
erf(sqrt(-M[a])*x - M[b]/(2*sqrt(-M[a]))))
M = g.args[0].match(a*log(x)**2)
if M is not None:
if M[a].is_positive:
terms.add(erfi(sqrt(M[a])*log(x) + 1/(2*sqrt(M[a]))))
if M[a].is_negative:
terms.add(erf(sqrt(-M[a])*log(x) - 1/(2*sqrt(-M[a]))))
elif g.is_Pow:
if g.exp.is_Rational and g.exp.q == 2:
M = g.base.match(a*x**2 + b)
if M is not None and M[b].is_positive:
if M[a].is_positive:
terms.add(asinh(sqrt(M[a]/M[b])*x))
elif M[a].is_negative:
terms.add(asin(sqrt(-M[a]/M[b])*x))
M = g.base.match(a*x**2 - b)
if M is not None and M[b].is_positive:
if M[a].is_positive:
terms.add(acosh(sqrt(M[a]/M[b])*x))
elif M[a].is_negative:
terms.add((-M[b]/2*sqrt(-M[a])*
atan(sqrt(-M[a])*x/sqrt(M[a]*x**2 - M[b]))))
else:
terms |= set(hints)
dcache = DiffCache(x)
for g in set(terms): # using copy of terms
terms |= components(dcache.get_diff(g), x)
# TODO: caching is significant factor for why permutations work at all. Change this.
V = _symbols('x', len(terms))
# sort mapping expressions from largest to smallest (last is always x).
mapping = list(reversed(list(zip(*ordered( #
[(a[0].as_independent(x)[1], a) for a in zip(terms, V)])))[1])) #
rev_mapping = {v: k for k, v in mapping} #
if mappings is None: #
# optimizing the number of permutations of mapping #
assert mapping[-1][0] == x # if not, find it and correct this comment
unnecessary_permutations = [mapping.pop(-1)]
mappings = permutations(mapping)
else:
unnecessary_permutations = unnecessary_permutations or []
def _substitute(expr):
return expr.subs(mapping)
for mapping in mappings:
mapping = list(mapping)
mapping = mapping + unnecessary_permutations
diffs = [ _substitute(dcache.get_diff(g)) for g in terms ]
denoms = [ g.as_numer_denom()[1] for g in diffs ]
if all(h.is_polynomial(*V) for h in denoms) and _substitute(f).is_rational_function(*V):
denom = reduce(lambda p, q: lcm(p, q, *V), denoms)
break
else:
if not rewrite:
result = heurisch(f, x, rewrite=True, hints=hints,
unnecessary_permutations=unnecessary_permutations)
if result is not None:
return indep*result
return None
numers = [ cancel(denom*g) for g in diffs ]
def _derivation(h):
return Add(*[ d * h.diff(v) for d, v in zip(numers, V) ])
def _deflation(p):
for y in V:
if not p.has(y):
continue
if _derivation(p) is not S.Zero:
c, q = p.as_poly(y).primitive()
return _deflation(c)*gcd(q, q.diff(y)).as_expr()
return p
def _splitter(p):
for y in V:
if not p.has(y):
continue
if _derivation(y) is not S.Zero:
c, q = p.as_poly(y).primitive()
q = q.as_expr()
h = gcd(q, _derivation(q), y)
s = quo(h, gcd(q, q.diff(y), y), y)
c_split = _splitter(c)
if s.as_poly(y).degree() == 0:
return (c_split[0], q * c_split[1])
q_split = _splitter(cancel(q / s))
return (c_split[0]*q_split[0]*s, c_split[1]*q_split[1])
return (S.One, p)
special = {}
for term in terms:
if term.is_Function:
if isinstance(term, tan):
special[1 + _substitute(term)**2] = False
elif isinstance(term, tanh):
special[1 + _substitute(term)] = False
special[1 - _substitute(term)] = False
elif isinstance(term, LambertW):
special[_substitute(term)] = True
F = _substitute(f)
P, Q = F.as_numer_denom()
u_split = _splitter(denom)
v_split = _splitter(Q)
polys = set(list(v_split) + [ u_split[0] ] + list(special.keys()))
s = u_split[0] * Mul(*[ k for k, v in special.items() if v ])
polified = [ p.as_poly(*V) for p in [s, P, Q] ]
if None in polified:
return None
#--- definitions for _integrate
a, b, c = [ p.total_degree() for p in polified ]
poly_denom = (s * v_split[0] * _deflation(v_split[1])).as_expr()
def _exponent(g):
if g.is_Pow:
if g.exp.is_Rational and g.exp.q != 1:
if g.exp.p > 0:
return g.exp.p + g.exp.q - 1
else:
return abs(g.exp.p + g.exp.q)
else:
return 1
elif not g.is_Atom and g.args:
return max([ _exponent(h) for h in g.args ])
else:
return 1
A, B = _exponent(f), a + max(b, c)
if A > 1 and B > 1:
monoms = tuple(itermonomials(V, A + B - 1 + degree_offset))
else:
monoms = tuple(itermonomials(V, A + B + degree_offset))
poly_coeffs = _symbols('A', len(monoms))
poly_part = Add(*[ poly_coeffs[i]*monomial
for i, monomial in enumerate(monoms) ])
reducibles = set()
for poly in polys:
if poly.has(*V):
try:
factorization = factor(poly, greedy=True)
except PolynomialError:
factorization = poly
if factorization.is_Mul:
factors = factorization.args
else:
factors = (factorization, )
for fact in factors:
if fact.is_Pow:
reducibles.add(fact.base)
else:
reducibles.add(fact)
def _integrate(field=None):
irreducibles = set()
atans = set()
pairs = set()
for poly in reducibles:
for z in poly.free_symbols:
if z in V:
break # should this be: `irreducibles |= \
else: # set(root_factors(poly, z, filter=field))`
continue # and the line below deleted?
# |
# V
irreducibles |= set(root_factors(poly, z, filter=field))
log_part, atan_part = [], []
for poly in list(irreducibles):
m = collect(poly, I, evaluate=False)
y = m.get(I, S.Zero)
if y:
x = m.get(S.One, S.Zero)
if x.has(I) or y.has(I):
continue # nontrivial x + I*y
pairs.add((x, y))
irreducibles.remove(poly)
while pairs:
x, y = pairs.pop()
if (x, -y) in pairs:
pairs.remove((x, -y))
# Choosing b with no minus sign
if y.could_extract_minus_sign():
y = -y
irreducibles.add(x*x + y*y)
atans.add(atan(x/y))
else:
irreducibles.add(x + I*y)
B = _symbols('B', len(irreducibles))
C = _symbols('C', len(atans))
# Note: the ordering matters here
for poly, b in reversed(list(ordered(zip(irreducibles, B)))):
if poly.has(*V):
poly_coeffs.append(b)
log_part.append(b * log(poly))
for poly, c in reversed(list(ordered(zip(atans, C)))):
if poly.has(*V):
poly_coeffs.append(c)
atan_part.append(c * poly)
# TODO: Currently it's better to use symbolic expressions here instead
# of rational functions, because it's simpler and FracElement doesn't
# give big speed improvement yet. This is because cancellation is slow
# due to slow polynomial GCD algorithms. If this gets improved then
# revise this code.
candidate = poly_part/poly_denom + Add(*log_part) + Add(*atan_part)
h = F - _derivation(candidate) / denom
raw_numer = h.as_numer_denom()[0]
# Rewrite raw_numer as a polynomial in K[coeffs][V] where K is a field
# that we have to determine. We can't use simply atoms() because log(3),
# sqrt(y) and similar expressions can appear, leading to non-trivial
# domains.
syms = set(poly_coeffs) | set(V)
non_syms = set([])
def find_non_syms(expr):
if expr.is_Integer or expr.is_Rational:
pass # ignore trivial numbers
elif expr in syms:
pass # ignore variables
elif not expr.has(*syms):
non_syms.add(expr)
elif expr.is_Add or expr.is_Mul or expr.is_Pow:
list(map(find_non_syms, expr.args))
else:
# TODO: Non-polynomial expression. This should have been
# filtered out at an earlier stage.
raise PolynomialError
try:
find_non_syms(raw_numer)
except PolynomialError:
return None
else:
ground, _ = construct_domain(non_syms, field=True)
coeff_ring = PolyRing(poly_coeffs, ground)
ring = PolyRing(V, coeff_ring)
try:
numer = ring.from_expr(raw_numer)
except ValueError:
raise PolynomialError
solution = solve_lin_sys(numer.coeffs(), coeff_ring, _raw=False)
if solution is None:
return None
else:
return candidate.subs(solution).subs(
list(zip(poly_coeffs, [S.Zero]*len(poly_coeffs))))
if not (F.free_symbols - set(V)):
solution = _integrate('Q')
if solution is None:
solution = _integrate()
else:
solution = _integrate()
if solution is not None:
antideriv = solution.subs(rev_mapping)
antideriv = cancel(antideriv).expand(force=True)
if antideriv.is_Add:
antideriv = antideriv.as_independent(x)[1]
return indep*antideriv
else:
if retries >= 0:
result = heurisch(f, x, mappings=mappings, rewrite=rewrite, hints=hints, retries=retries - 1, unnecessary_permutations=unnecessary_permutations)
if result is not None:
return indep*result
return None
|
21774b473037ef433acf90051833d44e07cf64784fd7ae0c37e149e745e21ce1 | """
Algorithms for solving the Risch differential equation.
Given a differential field K of characteristic 0 that is a simple
monomial extension of a base field k and f, g in K, the Risch
Differential Equation problem is to decide if there exist y in K such
that Dy + f*y == g and to find one if there are some. If t is a
monomial over k and the coefficients of f and g are in k(t), then y is
in k(t), and the outline of the algorithm here is given as:
1. Compute the normal part n of the denominator of y. The problem is
then reduced to finding y' in k<t>, where y == y'/n.
2. Compute the special part s of the denominator of y. The problem is
then reduced to finding y'' in k[t], where y == y''/(n*s)
3. Bound the degree of y''.
4. Reduce the equation Dy + f*y == g to a similar equation with f, g in
k[t].
5. Find the solutions in k[t] of bounded degree of the reduced equation.
See Chapter 6 of "Symbolic Integration I: Transcendental Functions" by
Manuel Bronstein. See also the docstring of risch.py.
"""
from __future__ import print_function, division
from operator import mul
from sympy.core import oo
from sympy.core.compatibility import reduce
from sympy.core.symbol import Dummy
from sympy.polys import Poly, gcd, ZZ, cancel
from sympy import sqrt, re, im
from sympy.integrals.risch import (gcdex_diophantine, frac_in, derivation,
splitfactor, NonElementaryIntegralException, DecrementLevel, recognize_log_derivative)
# TODO: Add messages to NonElementaryIntegralException errors
def order_at(a, p, t):
"""
Computes the order of a at p, with respect to t.
For a, p in k[t], the order of a at p is defined as nu_p(a) = max({n
in Z+ such that p**n|a}), where a != 0. If a == 0, nu_p(a) = +oo.
To compute the order at a rational function, a/b, use the fact that
nu_p(a/b) == nu_p(a) - nu_p(b).
"""
if a.is_zero:
return oo
if p == Poly(t, t):
return a.as_poly(t).ET()[0][0]
# Uses binary search for calculating the power. power_list collects the tuples
# (p^k,k) where each k is some power of 2. After deciding the largest k
# such that k is power of 2 and p^k|a the loop iteratively calculates
# the actual power.
power_list = []
p1 = p
r = a.rem(p1)
tracks_power = 1
while r.is_zero:
power_list.append((p1,tracks_power))
p1 = p1*p1
tracks_power *= 2
r = a.rem(p1)
n = 0
product = Poly(1, t)
while len(power_list) != 0:
final = power_list.pop()
productf = product*final[0]
r = a.rem(productf)
if r.is_zero:
n += final[1]
product = productf
return n
def order_at_oo(a, d, t):
"""
Computes the order of a/d at oo (infinity), with respect to t.
For f in k(t), the order or f at oo is defined as deg(d) - deg(a), where
f == a/d.
"""
if a.is_zero:
return oo
return d.degree(t) - a.degree(t)
def weak_normalizer(a, d, DE, z=None):
"""
Weak normalization.
Given a derivation D on k[t] and f == a/d in k(t), return q in k[t]
such that f - Dq/q is weakly normalized with respect to t.
f in k(t) is said to be "weakly normalized" with respect to t if
residue_p(f) is not a positive integer for any normal irreducible p
in k[t] such that f is in R_p (Definition 6.1.1). If f has an
elementary integral, this is equivalent to no logarithm of
integral(f) whose argument depends on t has a positive integer
coefficient, where the arguments of the logarithms not in k(t) are
in k[t].
Returns (q, f - Dq/q)
"""
z = z or Dummy('z')
dn, ds = splitfactor(d, DE)
# Compute d1, where dn == d1*d2**2*...*dn**n is a square-free
# factorization of d.
g = gcd(dn, dn.diff(DE.t))
d_sqf_part = dn.quo(g)
d1 = d_sqf_part.quo(gcd(d_sqf_part, g))
a1, b = gcdex_diophantine(d.quo(d1).as_poly(DE.t), d1.as_poly(DE.t),
a.as_poly(DE.t))
r = (a - Poly(z, DE.t)*derivation(d1, DE)).as_poly(DE.t).resultant(
d1.as_poly(DE.t))
r = Poly(r, z)
if not r.expr.has(z):
return (Poly(1, DE.t), (a, d))
N = [i for i in r.real_roots() if i in ZZ and i > 0]
q = reduce(mul, [gcd(a - Poly(n, DE.t)*derivation(d1, DE), d1) for n in N],
Poly(1, DE.t))
dq = derivation(q, DE)
sn = q*a - d*dq
sd = q*d
sn, sd = sn.cancel(sd, include=True)
return (q, (sn, sd))
def normal_denom(fa, fd, ga, gd, DE):
"""
Normal part of the denominator.
Given a derivation D on k[t] and f, g in k(t) with f weakly
normalized with respect to t, either raise NonElementaryIntegralException,
in which case the equation Dy + f*y == g has no solution in k(t), or the
quadruplet (a, b, c, h) such that a, h in k[t], b, c in k<t>, and for any
solution y in k(t) of Dy + f*y == g, q = y*h in k<t> satisfies
a*Dq + b*q == c.
This constitutes step 1 in the outline given in the rde.py docstring.
"""
dn, ds = splitfactor(fd, DE)
en, es = splitfactor(gd, DE)
p = dn.gcd(en)
h = en.gcd(en.diff(DE.t)).quo(p.gcd(p.diff(DE.t)))
a = dn*h
c = a*h
if c.div(en)[1]:
# en does not divide dn*h**2
raise NonElementaryIntegralException
ca = c*ga
ca, cd = ca.cancel(gd, include=True)
ba = a*fa - dn*derivation(h, DE)*fd
ba, bd = ba.cancel(fd, include=True)
# (dn*h, dn*h*f - dn*Dh, dn*h**2*g, h)
return (a, (ba, bd), (ca, cd), h)
def special_denom(a, ba, bd, ca, cd, DE, case='auto'):
"""
Special part of the denominator.
case is one of {'exp', 'tan', 'primitive'} for the hyperexponential,
hypertangent, and primitive cases, respectively. For the
hyperexponential (resp. hypertangent) case, given a derivation D on
k[t] and a in k[t], b, c, in k<t> with Dt/t in k (resp. Dt/(t**2 + 1) in
k, sqrt(-1) not in k), a != 0, and gcd(a, t) == 1 (resp.
gcd(a, t**2 + 1) == 1), return the quadruplet (A, B, C, 1/h) such that
A, B, C, h in k[t] and for any solution q in k<t> of a*Dq + b*q == c,
r = qh in k[t] satisfies A*Dr + B*r == C.
For case == 'primitive', k<t> == k[t], so it returns (a, b, c, 1) in
this case.
This constitutes step 2 of the outline given in the rde.py docstring.
"""
from sympy.integrals.prde import parametric_log_deriv
# TODO: finish writing this and write tests
if case == 'auto':
case = DE.case
if case == 'exp':
p = Poly(DE.t, DE.t)
elif case == 'tan':
p = Poly(DE.t**2 + 1, DE.t)
elif case in ['primitive', 'base']:
B = ba.to_field().quo(bd)
C = ca.to_field().quo(cd)
return (a, B, C, Poly(1, DE.t))
else:
raise ValueError("case must be one of {'exp', 'tan', 'primitive', "
"'base'}, not %s." % case)
nb = order_at(ba, p, DE.t) - order_at(bd, p, DE.t)
nc = order_at(ca, p, DE.t) - order_at(cd, p, DE.t)
n = min(0, nc - min(0, nb))
if not nb:
# Possible cancellation.
if case == 'exp':
dcoeff = DE.d.quo(Poly(DE.t, DE.t))
with DecrementLevel(DE): # We are guaranteed to not have problems,
# because case != 'base'.
alphaa, alphad = frac_in(-ba.eval(0)/bd.eval(0)/a.eval(0), DE.t)
etaa, etad = frac_in(dcoeff, DE.t)
A = parametric_log_deriv(alphaa, alphad, etaa, etad, DE)
if A is not None:
Q, m, z = A
if Q == 1:
n = min(n, m)
elif case == 'tan':
dcoeff = DE.d.quo(Poly(DE.t**2+1, DE.t))
with DecrementLevel(DE): # We are guaranteed to not have problems,
# because case != 'base'.
alphaa, alphad = frac_in(im(-ba.eval(sqrt(-1))/bd.eval(sqrt(-1))/a.eval(sqrt(-1))), DE.t)
betaa, betad = frac_in(re(-ba.eval(sqrt(-1))/bd.eval(sqrt(-1))/a.eval(sqrt(-1))), DE.t)
etaa, etad = frac_in(dcoeff, DE.t)
if recognize_log_derivative(Poly(2, DE.t)*betaa, betad, DE):
A = parametric_log_deriv(alphaa*Poly(sqrt(-1), DE.t)*betad+alphad*betaa, alphad*betad, etaa, etad, DE)
if A is not None:
Q, m, z = A
if Q == 1:
n = min(n, m)
N = max(0, -nb, n - nc)
pN = p**N
pn = p**-n
A = a*pN
B = ba*pN.quo(bd) + Poly(n, DE.t)*a*derivation(p, DE).quo(p)*pN
C = (ca*pN*pn).quo(cd)
h = pn
# (a*p**N, (b + n*a*Dp/p)*p**N, c*p**(N - n), p**-n)
return (A, B, C, h)
def bound_degree(a, b, cQ, DE, case='auto', parametric=False):
"""
Bound on polynomial solutions.
Given a derivation D on k[t] and a, b, c in k[t] with a != 0, return
n in ZZ such that deg(q) <= n for any solution q in k[t] of
a*Dq + b*q == c, when parametric=False, or deg(q) <= n for any solution
c1, ..., cm in Const(k) and q in k[t] of a*Dq + b*q == Sum(ci*gi, (i, 1, m))
when parametric=True.
For parametric=False, cQ is c, a Poly; for parametric=True, cQ is Q ==
[q1, ..., qm], a list of Polys.
This constitutes step 3 of the outline given in the rde.py docstring.
"""
from sympy.integrals.prde import (parametric_log_deriv, limited_integrate,
is_log_deriv_k_t_radical_in_field)
# TODO: finish writing this and write tests
if case == 'auto':
case = DE.case
da = a.degree(DE.t)
db = b.degree(DE.t)
# The parametric and regular cases are identical, except for this part
if parametric:
dc = max([i.degree(DE.t) for i in cQ])
else:
dc = cQ.degree(DE.t)
alpha = cancel(-b.as_poly(DE.t).LC().as_expr()/
a.as_poly(DE.t).LC().as_expr())
if case == 'base':
n = max(0, dc - max(db, da - 1))
if db == da - 1 and alpha.is_Integer:
n = max(0, alpha, dc - db)
elif case == 'primitive':
if db > da:
n = max(0, dc - db)
else:
n = max(0, dc - da + 1)
etaa, etad = frac_in(DE.d, DE.T[DE.level - 1])
t1 = DE.t
with DecrementLevel(DE):
alphaa, alphad = frac_in(alpha, DE.t)
if db == da - 1:
# if alpha == m*Dt + Dz for z in k and m in ZZ:
try:
(za, zd), m = limited_integrate(alphaa, alphad, [(etaa, etad)],
DE)
except NonElementaryIntegralException:
pass
else:
if len(m) != 1:
raise ValueError("Length of m should be 1")
n = max(n, m[0])
elif db == da:
# if alpha == Dz/z for z in k*:
# beta = -lc(a*Dz + b*z)/(z*lc(a))
# if beta == m*Dt + Dw for w in k and m in ZZ:
# n = max(n, m)
A = is_log_deriv_k_t_radical_in_field(alphaa, alphad, DE)
if A is not None:
aa, z = A
if aa == 1:
beta = -(a*derivation(z, DE).as_poly(t1) +
b*z.as_poly(t1)).LC()/(z.as_expr()*a.LC())
betaa, betad = frac_in(beta, DE.t)
try:
(za, zd), m = limited_integrate(betaa, betad,
[(etaa, etad)], DE)
except NonElementaryIntegralException:
pass
else:
if len(m) != 1:
raise ValueError("Length of m should be 1")
n = max(n, m[0])
elif case == 'exp':
n = max(0, dc - max(db, da))
if da == db:
etaa, etad = frac_in(DE.d.quo(Poly(DE.t, DE.t)), DE.T[DE.level - 1])
with DecrementLevel(DE):
alphaa, alphad = frac_in(alpha, DE.t)
A = parametric_log_deriv(alphaa, alphad, etaa, etad, DE)
if A is not None:
# if alpha == m*Dt/t + Dz/z for z in k* and m in ZZ:
# n = max(n, m)
a, m, z = A
if a == 1:
n = max(n, m)
elif case in ['tan', 'other_nonlinear']:
delta = DE.d.degree(DE.t)
lam = DE.d.LC()
alpha = cancel(alpha/lam)
n = max(0, dc - max(da + delta - 1, db))
if db == da + delta - 1 and alpha.is_Integer:
n = max(0, alpha, dc - db)
else:
raise ValueError("case must be one of {'exp', 'tan', 'primitive', "
"'other_nonlinear', 'base'}, not %s." % case)
return n
def spde(a, b, c, n, DE):
"""
Rothstein's Special Polynomial Differential Equation algorithm.
Given a derivation D on k[t], an integer n and a, b, c in k[t] with
a != 0, either raise NonElementaryIntegralException, in which case the
equation a*Dq + b*q == c has no solution of degree at most n in
k[t], or return the tuple (B, C, m, alpha, beta) such that B, C,
alpha, beta in k[t], m in ZZ, and any solution q in k[t] of degree
at most n of a*Dq + b*q == c must be of the form
q == alpha*h + beta, where h in k[t], deg(h) <= m, and Dh + B*h == C.
This constitutes step 4 of the outline given in the rde.py docstring.
"""
zero = Poly(0, DE.t)
alpha = Poly(1, DE.t)
beta = Poly(0, DE.t)
while True:
if c.is_zero:
return (zero, zero, 0, zero, beta) # -1 is more to the point
if (n < 0) is True:
raise NonElementaryIntegralException
g = a.gcd(b)
if not c.rem(g).is_zero: # g does not divide c
raise NonElementaryIntegralException
a, b, c = a.quo(g), b.quo(g), c.quo(g)
if a.degree(DE.t) == 0:
b = b.to_field().quo(a)
c = c.to_field().quo(a)
return (b, c, n, alpha, beta)
r, z = gcdex_diophantine(b, a, c)
b += derivation(a, DE)
c = z - derivation(r, DE)
n -= a.degree(DE.t)
beta += alpha * r
alpha *= a
def no_cancel_b_large(b, c, n, DE):
"""
Poly Risch Differential Equation - No cancellation: deg(b) large enough.
Given a derivation D on k[t], n either an integer or +oo, and b, c
in k[t] with b != 0 and either D == d/dt or
deg(b) > max(0, deg(D) - 1), either raise NonElementaryIntegralException, in
which case the equation Dq + b*q == c has no solution of degree at
most n in k[t], or a solution q in k[t] of this equation with
deg(q) < n.
"""
q = Poly(0, DE.t)
while not c.is_zero:
m = c.degree(DE.t) - b.degree(DE.t)
if not 0 <= m <= n: # n < 0 or m < 0 or m > n
raise NonElementaryIntegralException
p = Poly(c.as_poly(DE.t).LC()/b.as_poly(DE.t).LC()*DE.t**m, DE.t,
expand=False)
q = q + p
n = m - 1
c = c - derivation(p, DE) - b*p
return q
def no_cancel_b_small(b, c, n, DE):
"""
Poly Risch Differential Equation - No cancellation: deg(b) small enough.
Given a derivation D on k[t], n either an integer or +oo, and b, c
in k[t] with deg(b) < deg(D) - 1 and either D == d/dt or
deg(D) >= 2, either raise NonElementaryIntegralException, in which case the
equation Dq + b*q == c has no solution of degree at most n in k[t],
or a solution q in k[t] of this equation with deg(q) <= n, or the
tuple (h, b0, c0) such that h in k[t], b0, c0, in k, and for any
solution q in k[t] of degree at most n of Dq + bq == c, y == q - h
is a solution in k of Dy + b0*y == c0.
"""
q = Poly(0, DE.t)
while not c.is_zero:
if n == 0:
m = 0
else:
m = c.degree(DE.t) - DE.d.degree(DE.t) + 1
if not 0 <= m <= n: # n < 0 or m < 0 or m > n
raise NonElementaryIntegralException
if m > 0:
p = Poly(c.as_poly(DE.t).LC()/(m*DE.d.as_poly(DE.t).LC())*DE.t**m,
DE.t, expand=False)
else:
if b.degree(DE.t) != c.degree(DE.t):
raise NonElementaryIntegralException
if b.degree(DE.t) == 0:
return (q, b.as_poly(DE.T[DE.level - 1]),
c.as_poly(DE.T[DE.level - 1]))
p = Poly(c.as_poly(DE.t).LC()/b.as_poly(DE.t).LC(), DE.t,
expand=False)
q = q + p
n = m - 1
c = c - derivation(p, DE) - b*p
return q
# TODO: better name for this function
def no_cancel_equal(b, c, n, DE):
"""
Poly Risch Differential Equation - No cancellation: deg(b) == deg(D) - 1
Given a derivation D on k[t] with deg(D) >= 2, n either an integer
or +oo, and b, c in k[t] with deg(b) == deg(D) - 1, either raise
NonElementaryIntegralException, in which case the equation Dq + b*q == c has
no solution of degree at most n in k[t], or a solution q in k[t] of
this equation with deg(q) <= n, or the tuple (h, m, C) such that h
in k[t], m in ZZ, and C in k[t], and for any solution q in k[t] of
degree at most n of Dq + b*q == c, y == q - h is a solution in k[t]
of degree at most m of Dy + b*y == C.
"""
q = Poly(0, DE.t)
lc = cancel(-b.as_poly(DE.t).LC()/DE.d.as_poly(DE.t).LC())
if lc.is_Integer and lc.is_positive:
M = lc
else:
M = -1
while not c.is_zero:
m = max(M, c.degree(DE.t) - DE.d.degree(DE.t) + 1)
if not 0 <= m <= n: # n < 0 or m < 0 or m > n
raise NonElementaryIntegralException
u = cancel(m*DE.d.as_poly(DE.t).LC() + b.as_poly(DE.t).LC())
if u.is_zero:
return (q, m, c)
if m > 0:
p = Poly(c.as_poly(DE.t).LC()/u*DE.t**m, DE.t, expand=False)
else:
if c.degree(DE.t) != DE.d.degree(DE.t) - 1:
raise NonElementaryIntegralException
else:
p = c.as_poly(DE.t).LC()/b.as_poly(DE.t).LC()
q = q + p
n = m - 1
c = c - derivation(p, DE) - b*p
return q
def cancel_primitive(b, c, n, DE):
"""
Poly Risch Differential Equation - Cancellation: Primitive case.
Given a derivation D on k[t], n either an integer or +oo, b in k, and
c in k[t] with Dt in k and b != 0, either raise
NonElementaryIntegralException, in which case the equation Dq + b*q == c
has no solution of degree at most n in k[t], or a solution q in k[t] of
this equation with deg(q) <= n.
"""
from sympy.integrals.prde import is_log_deriv_k_t_radical_in_field
with DecrementLevel(DE):
ba, bd = frac_in(b, DE.t)
A = is_log_deriv_k_t_radical_in_field(ba, bd, DE)
if A is not None:
n, z = A
if n == 1: # b == Dz/z
raise NotImplementedError("is_deriv_in_field() is required to "
" solve this problem.")
# if z*c == Dp for p in k[t] and deg(p) <= n:
# return p/z
# else:
# raise NonElementaryIntegralException
if c.is_zero:
return c # return 0
if n < c.degree(DE.t):
raise NonElementaryIntegralException
q = Poly(0, DE.t)
while not c.is_zero:
m = c.degree(DE.t)
if n < m:
raise NonElementaryIntegralException
with DecrementLevel(DE):
a2a, a2d = frac_in(c.LC(), DE.t)
sa, sd = rischDE(ba, bd, a2a, a2d, DE)
stm = Poly(sa.as_expr()/sd.as_expr()*DE.t**m, DE.t, expand=False)
q += stm
n = m - 1
c -= b*stm + derivation(stm, DE)
return q
def cancel_exp(b, c, n, DE):
"""
Poly Risch Differential Equation - Cancellation: Hyperexponential case.
Given a derivation D on k[t], n either an integer or +oo, b in k, and
c in k[t] with Dt/t in k and b != 0, either raise
NonElementaryIntegralException, in which case the equation Dq + b*q == c
has no solution of degree at most n in k[t], or a solution q in k[t] of
this equation with deg(q) <= n.
"""
from sympy.integrals.prde import parametric_log_deriv
eta = DE.d.quo(Poly(DE.t, DE.t)).as_expr()
with DecrementLevel(DE):
etaa, etad = frac_in(eta, DE.t)
ba, bd = frac_in(b, DE.t)
A = parametric_log_deriv(ba, bd, etaa, etad, DE)
if A is not None:
a, m, z = A
if a == 1:
raise NotImplementedError("is_deriv_in_field() is required to "
"solve this problem.")
# if c*z*t**m == Dp for p in k<t> and q = p/(z*t**m) in k[t] and
# deg(q) <= n:
# return q
# else:
# raise NonElementaryIntegralException
if c.is_zero:
return c # return 0
if n < c.degree(DE.t):
raise NonElementaryIntegralException
q = Poly(0, DE.t)
while not c.is_zero:
m = c.degree(DE.t)
if n < m:
raise NonElementaryIntegralException
# a1 = b + m*Dt/t
a1 = b.as_expr()
with DecrementLevel(DE):
# TODO: Write a dummy function that does this idiom
a1a, a1d = frac_in(a1, DE.t)
a1a = a1a*etad + etaa*a1d*Poly(m, DE.t)
a1d = a1d*etad
a2a, a2d = frac_in(c.LC(), DE.t)
sa, sd = rischDE(a1a, a1d, a2a, a2d, DE)
stm = Poly(sa.as_expr()/sd.as_expr()*DE.t**m, DE.t, expand=False)
q += stm
n = m - 1
c -= b*stm + derivation(stm, DE) # deg(c) becomes smaller
return q
def solve_poly_rde(b, cQ, n, DE, parametric=False):
"""
Solve a Polynomial Risch Differential Equation with degree bound n.
This constitutes step 4 of the outline given in the rde.py docstring.
For parametric=False, cQ is c, a Poly; for parametric=True, cQ is Q ==
[q1, ..., qm], a list of Polys.
"""
from sympy.integrals.prde import (prde_no_cancel_b_large,
prde_no_cancel_b_small)
# No cancellation
if not b.is_zero and (DE.case == 'base' or
b.degree(DE.t) > max(0, DE.d.degree(DE.t) - 1)):
if parametric:
return prde_no_cancel_b_large(b, cQ, n, DE)
return no_cancel_b_large(b, cQ, n, DE)
elif (b.is_zero or b.degree(DE.t) < DE.d.degree(DE.t) - 1) and \
(DE.case == 'base' or DE.d.degree(DE.t) >= 2):
if parametric:
return prde_no_cancel_b_small(b, cQ, n, DE)
R = no_cancel_b_small(b, cQ, n, DE)
if isinstance(R, Poly):
return R
else:
# XXX: Might k be a field? (pg. 209)
h, b0, c0 = R
with DecrementLevel(DE):
b0, c0 = b0.as_poly(DE.t), c0.as_poly(DE.t)
if b0 is None: # See above comment
raise ValueError("b0 should be a non-Null value")
if c0 is None:
raise ValueError("c0 should be a non-Null value")
y = solve_poly_rde(b0, c0, n, DE).as_poly(DE.t)
return h + y
elif DE.d.degree(DE.t) >= 2 and b.degree(DE.t) == DE.d.degree(DE.t) - 1 and \
n > -b.as_poly(DE.t).LC()/DE.d.as_poly(DE.t).LC():
# TODO: Is this check necessary, and if so, what should it do if it fails?
# b comes from the first element returned from spde()
if not b.as_poly(DE.t).LC().is_number:
raise TypeError("Result should be a number")
if parametric:
raise NotImplementedError("prde_no_cancel_b_equal() is not yet "
"implemented.")
R = no_cancel_equal(b, cQ, n, DE)
if isinstance(R, Poly):
return R
else:
h, m, C = R
# XXX: Or should it be rischDE()?
y = solve_poly_rde(b, C, m, DE)
return h + y
else:
# Cancellation
if b.is_zero:
raise NotImplementedError("Remaining cases for Poly (P)RDE are "
"not yet implemented (is_deriv_in_field() required).")
else:
if DE.case == 'exp':
if parametric:
raise NotImplementedError("Parametric RDE cancellation "
"hyperexponential case is not yet implemented.")
return cancel_exp(b, cQ, n, DE)
elif DE.case == 'primitive':
if parametric:
raise NotImplementedError("Parametric RDE cancellation "
"primitive case is not yet implemented.")
return cancel_primitive(b, cQ, n, DE)
else:
raise NotImplementedError("Other Poly (P)RDE cancellation "
"cases are not yet implemented (%s)." % DE.case)
if parametric:
raise NotImplementedError("Remaining cases for Poly PRDE not yet "
"implemented.")
raise NotImplementedError("Remaining cases for Poly RDE not yet "
"implemented.")
def rischDE(fa, fd, ga, gd, DE):
"""
Solve a Risch Differential Equation: Dy + f*y == g.
See the outline in the docstring of rde.py for more information
about the procedure used. Either raise NonElementaryIntegralException, in
which case there is no solution y in the given differential field,
or return y in k(t) satisfying Dy + f*y == g, or raise
NotImplementedError, in which case, the algorithms necessary to
solve the given Risch Differential Equation have not yet been
implemented.
"""
_, (fa, fd) = weak_normalizer(fa, fd, DE)
a, (ba, bd), (ca, cd), hn = normal_denom(fa, fd, ga, gd, DE)
A, B, C, hs = special_denom(a, ba, bd, ca, cd, DE)
try:
# Until this is fully implemented, use oo. Note that this will almost
# certainly cause non-termination in spde() (unless A == 1), and
# *might* lead to non-termination in the next step for a nonelementary
# integral (I don't know for certain yet). Fortunately, spde() is
# currently written recursively, so this will just give
# RuntimeError: maximum recursion depth exceeded.
n = bound_degree(A, B, C, DE)
except NotImplementedError:
# Useful for debugging:
# import warnings
# warnings.warn("rischDE: Proceeding with n = oo; may cause "
# "non-termination.")
n = oo
B, C, m, alpha, beta = spde(A, B, C, n, DE)
if C.is_zero:
y = C
else:
y = solve_poly_rde(B, C, m, DE)
return (alpha*y + beta, hn*hs)
|
5d53e511f2fed5b40640411104d2673fd0eefc149184916091f86f901170bd91 | """ This module cooks up a docstring when imported. Its only purpose is to
be displayed in the sphinx documentation. """
from __future__ import print_function, division
from typing import Any, Dict, List, Tuple, Type
from sympy.integrals.meijerint import _create_lookup_table
from sympy import latex, Eq, Add, Symbol
t = {} # type: Dict[Tuple[Type, ...], List[Any]]
_create_lookup_table(t)
doc = ""
for about, category in sorted(t.items()):
if about == ():
doc += 'Elementary functions:\n\n'
else:
doc += 'Functions involving ' + ', '.join('`%s`' % latex(
list(category[0][0].atoms(func))[0]) for func in about) + ':\n\n'
for formula, gs, cond, hint in category:
if not isinstance(gs, list):
g = Symbol('\\text{generated}')
else:
g = Add(*[fac*f for (fac, f) in gs])
obj = Eq(formula, g)
if cond is True:
cond = ""
else:
cond = ',\\text{ if } %s' % latex(cond)
doc += ".. math::\n %s%s\n\n" % (latex(obj), cond)
__doc__ = doc
|
66bde03b752bcf040bf037fa4d8ceee2877d7d00aae416725694423b90de204b | """
The Risch Algorithm for transcendental function integration.
The core algorithms for the Risch algorithm are here. The subproblem
algorithms are in the rde.py and prde.py files for the Risch
Differential Equation solver and the parametric problems solvers,
respectively. All important information concerning the differential extension
for an integrand is stored in a DifferentialExtension object, which in the code
is usually called DE. Throughout the code and Inside the DifferentialExtension
object, the conventions/attribute names are that the base domain is QQ and each
differential extension is x, t0, t1, ..., tn-1 = DE.t. DE.x is the variable of
integration (Dx == 1), DE.D is a list of the derivatives of
x, t1, t2, ..., tn-1 = t, DE.T is the list [x, t1, t2, ..., tn-1], DE.t is the
outer-most variable of the differential extension at the given level (the level
can be adjusted using DE.increment_level() and DE.decrement_level()),
k is the field C(x, t0, ..., tn-2), where C is the constant field. The
numerator of a fraction is denoted by a and the denominator by
d. If the fraction is named f, fa == numer(f) and fd == denom(f).
Fractions are returned as tuples (fa, fd). DE.d and DE.t are used to
represent the topmost derivation and extension variable, respectively.
The docstring of a function signifies whether an argument is in k[t], in
which case it will just return a Poly in t, or in k(t), in which case it
will return the fraction (fa, fd). Other variable names probably come
from the names used in Bronstein's book.
"""
from __future__ import print_function, division
from sympy import real_roots, default_sort_key
from sympy.abc import z
from sympy.core.function import Lambda
from sympy.core.numbers import ilcm, oo, I
from sympy.core.mul import Mul
from sympy.core.power import Pow
from sympy.core.relational import Ne
from sympy.core.singleton import S
from sympy.core.symbol import Symbol, Dummy
from sympy.core.compatibility import reduce, ordered
from sympy.integrals.heurisch import _symbols
from sympy.functions import (acos, acot, asin, atan, cos, cot, exp, log,
Piecewise, sin, tan)
from sympy.functions import sinh, cosh, tanh, coth
from sympy.integrals import Integral, integrate
from sympy.polys import gcd, cancel, PolynomialError, Poly, reduced, RootSum, DomainError
from sympy.utilities.iterables import numbered_symbols
from types import GeneratorType
def integer_powers(exprs):
"""
Rewrites a list of expressions as integer multiples of each other.
For example, if you have [x, x/2, x**2 + 1, 2*x/3], then you can rewrite
this as [(x/6) * 6, (x/6) * 3, (x**2 + 1) * 1, (x/6) * 4]. This is useful
in the Risch integration algorithm, where we must write exp(x) + exp(x/2)
as (exp(x/2))**2 + exp(x/2), but not as exp(x) + sqrt(exp(x)) (this is
because only the transcendental case is implemented and we therefore cannot
integrate algebraic extensions). The integer multiples returned by this
function for each term are the smallest possible (their content equals 1).
Returns a list of tuples where the first element is the base term and the
second element is a list of `(item, factor)` terms, where `factor` is the
integer multiplicative factor that must multiply the base term to obtain
the original item.
The easiest way to understand this is to look at an example:
>>> from sympy.abc import x
>>> from sympy.integrals.risch import integer_powers
>>> integer_powers([x, x/2, x**2 + 1, 2*x/3])
[(x/6, [(x, 6), (x/2, 3), (2*x/3, 4)]), (x**2 + 1, [(x**2 + 1, 1)])]
We can see how this relates to the example at the beginning of the
docstring. It chose x/6 as the first base term. Then, x can be written as
(x/2) * 2, so we get (0, 2), and so on. Now only element (x**2 + 1)
remains, and there are no other terms that can be written as a rational
multiple of that, so we get that it can be written as (x**2 + 1) * 1.
"""
# Here is the strategy:
# First, go through each term and determine if it can be rewritten as a
# rational multiple of any of the terms gathered so far.
# cancel(a/b).is_Rational is sufficient for this. If it is a multiple, we
# add its multiple to the dictionary.
terms = {}
for term in exprs:
for j in terms:
a = cancel(term/j)
if a.is_Rational:
terms[j].append((term, a))
break
else:
terms[term] = [(term, S.One)]
# After we have done this, we have all the like terms together, so we just
# need to find a common denominator so that we can get the base term and
# integer multiples such that each term can be written as an integer
# multiple of the base term, and the content of the integers is 1.
newterms = {}
for term in terms:
common_denom = reduce(ilcm, [i.as_numer_denom()[1] for _, i in
terms[term]])
newterm = term/common_denom
newmults = [(i, j*common_denom) for i, j in terms[term]]
newterms[newterm] = newmults
return sorted(iter(newterms.items()), key=lambda item: item[0].sort_key())
class DifferentialExtension(object):
"""
A container for all the information relating to a differential extension.
The attributes of this object are (see also the docstring of __init__):
- f: The original (Expr) integrand.
- x: The variable of integration.
- T: List of variables in the extension.
- D: List of derivations in the extension; corresponds to the elements of T.
- fa: Poly of the numerator of the integrand.
- fd: Poly of the denominator of the integrand.
- Tfuncs: Lambda() representations of each element of T (except for x).
For back-substitution after integration.
- backsubs: A (possibly empty) list of further substitutions to be made on
the final integral to make it look more like the integrand.
- exts:
- extargs:
- cases: List of string representations of the cases of T.
- t: The top level extension variable, as defined by the current level
(see level below).
- d: The top level extension derivation, as defined by the current
derivation (see level below).
- case: The string representation of the case of self.d.
(Note that self.T and self.D will always contain the complete extension,
regardless of the level. Therefore, you should ALWAYS use DE.t and DE.d
instead of DE.T[-1] and DE.D[-1]. If you want to have a list of the
derivations or variables only up to the current level, use
DE.D[:len(DE.D) + DE.level + 1] and DE.T[:len(DE.T) + DE.level + 1]. Note
that, in particular, the derivation() function does this.)
The following are also attributes, but will probably not be useful other
than in internal use:
- newf: Expr form of fa/fd.
- level: The number (between -1 and -len(self.T)) such that
self.T[self.level] == self.t and self.D[self.level] == self.d.
Use the methods self.increment_level() and self.decrement_level() to change
the current level.
"""
# __slots__ is defined mainly so we can iterate over all the attributes
# of the class easily (the memory use doesn't matter too much, since we
# only create one DifferentialExtension per integration). Also, it's nice
# to have a safeguard when debugging.
__slots__ = ('f', 'x', 'T', 'D', 'fa', 'fd', 'Tfuncs', 'backsubs',
'exts', 'extargs', 'cases', 'case', 't', 'd', 'newf', 'level',
'ts', 'dummy')
def __init__(self, f=None, x=None, handle_first='log', dummy=False, extension=None, rewrite_complex=None):
"""
Tries to build a transcendental extension tower from f with respect to x.
If it is successful, creates a DifferentialExtension object with, among
others, the attributes fa, fd, D, T, Tfuncs, and backsubs such that
fa and fd are Polys in T[-1] with rational coefficients in T[:-1],
fa/fd == f, and D[i] is a Poly in T[i] with rational coefficients in
T[:i] representing the derivative of T[i] for each i from 1 to len(T).
Tfuncs is a list of Lambda objects for back replacing the functions
after integrating. Lambda() is only used (instead of lambda) to make
them easier to test and debug. Note that Tfuncs corresponds to the
elements of T, except for T[0] == x, but they should be back-substituted
in reverse order. backsubs is a (possibly empty) back-substitution list
that should be applied on the completed integral to make it look more
like the original integrand.
If it is unsuccessful, it raises NotImplementedError.
You can also create an object by manually setting the attributes as a
dictionary to the extension keyword argument. You must include at least
D. Warning, any attribute that is not given will be set to None. The
attributes T, t, d, cases, case, x, and level are set automatically and
do not need to be given. The functions in the Risch Algorithm will NOT
check to see if an attribute is None before using it. This also does not
check to see if the extension is valid (non-algebraic) or even if it is
self-consistent. Therefore, this should only be used for
testing/debugging purposes.
"""
# XXX: If you need to debug this function, set the break point here
if extension:
if 'D' not in extension:
raise ValueError("At least the key D must be included with "
"the extension flag to DifferentialExtension.")
for attr in extension:
setattr(self, attr, extension[attr])
self._auto_attrs()
return
elif f is None or x is None:
raise ValueError("Either both f and x or a manual extension must "
"be given.")
if handle_first not in ['log', 'exp']:
raise ValueError("handle_first must be 'log' or 'exp', not %s." %
str(handle_first))
# f will be the original function, self.f might change if we reset
# (e.g., we pull out a constant from an exponential)
self.f = f
self.x = x
# setting the default value 'dummy'
self.dummy = dummy
self.reset()
exp_new_extension, log_new_extension = True, True
# case of 'automatic' choosing
if rewrite_complex is None:
rewrite_complex = I in self.f.atoms()
if rewrite_complex:
rewritables = {
(sin, cos, cot, tan, sinh, cosh, coth, tanh): exp,
(asin, acos, acot, atan): log,
}
# rewrite the trigonometric components
for candidates, rule in rewritables.items():
self.newf = self.newf.rewrite(candidates, rule)
self.newf = cancel(self.newf)
else:
if any(i.has(x) for i in self.f.atoms(sin, cos, tan, atan, asin, acos)):
raise NotImplementedError("Trigonometric extensions are not "
"supported (yet!)")
exps = set()
pows = set()
numpows = set()
sympows = set()
logs = set()
symlogs = set()
while True:
if self.newf.is_rational_function(*self.T):
break
if not exp_new_extension and not log_new_extension:
# We couldn't find a new extension on the last pass, so I guess
# we can't do it.
raise NotImplementedError("Couldn't find an elementary "
"transcendental extension for %s. Try using a " % str(f) +
"manual extension with the extension flag.")
exps, pows, numpows, sympows, log_new_extension = \
self._rewrite_exps_pows(exps, pows, numpows, sympows, log_new_extension)
logs, symlogs = self._rewrite_logs(logs, symlogs)
if handle_first == 'exp' or not log_new_extension:
exp_new_extension = self._exp_part(exps)
if exp_new_extension is None:
# reset and restart
self.f = self.newf
self.reset()
exp_new_extension = True
continue
if handle_first == 'log' or not exp_new_extension:
log_new_extension = self._log_part(logs)
self.fa, self.fd = frac_in(self.newf, self.t)
self._auto_attrs()
return
def __getattr__(self, attr):
# Avoid AttributeErrors when debugging
if attr not in self.__slots__:
raise AttributeError("%s has no attribute %s" % (repr(self), repr(attr)))
return None
def _rewrite_exps_pows(self, exps, pows, numpows,
sympows, log_new_extension):
"""
Rewrite exps/pows for better processing.
"""
# Pre-preparsing.
#################
# Get all exp arguments, so we can avoid ahead of time doing
# something like t1 = exp(x), t2 = exp(x/2) == sqrt(t1).
# Things like sqrt(exp(x)) do not automatically simplify to
# exp(x/2), so they will be viewed as algebraic. The easiest way
# to handle this is to convert all instances of (a**b)**Rational
# to a**(Rational*b) before doing anything else. Note that the
# _exp_part code can generate terms of this form, so we do need to
# do this at each pass (or else modify it to not do that).
from sympy.integrals.prde import is_deriv_k
ratpows = [i for i in self.newf.atoms(Pow).union(self.newf.atoms(exp))
if (i.base.is_Pow or isinstance(i.base, exp) and i.exp.is_Rational)]
ratpows_repl = [
(i, i.base.base**(i.exp*i.base.exp)) for i in ratpows]
self.backsubs += [(j, i) for i, j in ratpows_repl]
self.newf = self.newf.xreplace(dict(ratpows_repl))
# To make the process deterministic, the args are sorted
# so that functions with smaller op-counts are processed first.
# Ties are broken with the default_sort_key.
# XXX Although the method is deterministic no additional work
# has been done to guarantee that the simplest solution is
# returned and that it would be affected be using different
# variables. Though it is possible that this is the case
# one should know that it has not been done intentionally, so
# further improvements may be possible.
# TODO: This probably doesn't need to be completely recomputed at
# each pass.
exps = update_sets(exps, self.newf.atoms(exp),
lambda i: i.exp.is_rational_function(*self.T) and
i.exp.has(*self.T))
pows = update_sets(pows, self.newf.atoms(Pow),
lambda i: i.exp.is_rational_function(*self.T) and
i.exp.has(*self.T))
numpows = update_sets(numpows, set(pows),
lambda i: not i.base.has(*self.T))
sympows = update_sets(sympows, set(pows) - set(numpows),
lambda i: i.base.is_rational_function(*self.T) and
not i.exp.is_Integer)
# The easiest way to deal with non-base E powers is to convert them
# into base E, integrate, and then convert back.
for i in ordered(pows):
old = i
new = exp(i.exp*log(i.base))
# If exp is ever changed to automatically reduce exp(x*log(2))
# to 2**x, then this will break. The solution is to not change
# exp to do that :)
if i in sympows:
if i.exp.is_Rational:
raise NotImplementedError("Algebraic extensions are "
"not supported (%s)." % str(i))
# We can add a**b only if log(a) in the extension, because
# a**b == exp(b*log(a)).
basea, based = frac_in(i.base, self.t)
A = is_deriv_k(basea, based, self)
if A is None:
# Nonelementary monomial (so far)
# TODO: Would there ever be any benefit from just
# adding log(base) as a new monomial?
# ANSWER: Yes, otherwise we can't integrate x**x (or
# rather prove that it has no elementary integral)
# without first manually rewriting it as exp(x*log(x))
self.newf = self.newf.xreplace({old: new})
self.backsubs += [(new, old)]
log_new_extension = self._log_part([log(i.base)])
exps = update_sets(exps, self.newf.atoms(exp), lambda i:
i.exp.is_rational_function(*self.T) and i.exp.has(*self.T))
continue
ans, u, const = A
newterm = exp(i.exp*(log(const) + u))
# Under the current implementation, exp kills terms
# only if they are of the form a*log(x), where a is a
# Number. This case should have already been killed by the
# above tests. Again, if this changes to kill more than
# that, this will break, which maybe is a sign that you
# shouldn't be changing that. Actually, if anything, this
# auto-simplification should be removed. See
# http://groups.google.com/group/sympy/browse_thread/thread/a61d48235f16867f
self.newf = self.newf.xreplace({i: newterm})
elif i not in numpows:
continue
else:
# i in numpows
newterm = new
# TODO: Just put it in self.Tfuncs
self.backsubs.append((new, old))
self.newf = self.newf.xreplace({old: newterm})
exps.append(newterm)
return exps, pows, numpows, sympows, log_new_extension
def _rewrite_logs(self, logs, symlogs):
"""
Rewrite logs for better processing.
"""
atoms = self.newf.atoms(log)
logs = update_sets(logs, atoms,
lambda i: i.args[0].is_rational_function(*self.T) and
i.args[0].has(*self.T))
symlogs = update_sets(symlogs, atoms,
lambda i: i.has(*self.T) and i.args[0].is_Pow and
i.args[0].base.is_rational_function(*self.T) and
not i.args[0].exp.is_Integer)
# We can handle things like log(x**y) by converting it to y*log(x)
# This will fix not only symbolic exponents of the argument, but any
# non-Integer exponent, like log(sqrt(x)). The exponent can also
# depend on x, like log(x**x).
for i in ordered(symlogs):
# Unlike in the exponential case above, we do not ever
# potentially add new monomials (above we had to add log(a)).
# Therefore, there is no need to run any is_deriv functions
# here. Just convert log(a**b) to b*log(a) and let
# log_new_extension() handle it from there.
lbase = log(i.args[0].base)
logs.append(lbase)
new = i.args[0].exp*lbase
self.newf = self.newf.xreplace({i: new})
self.backsubs.append((new, i))
# remove any duplicates
logs = sorted(set(logs), key=default_sort_key)
return logs, symlogs
def _auto_attrs(self):
"""
Set attributes that are generated automatically.
"""
if not self.T:
# i.e., when using the extension flag and T isn't given
self.T = [i.gen for i in self.D]
if not self.x:
self.x = self.T[0]
self.cases = [get_case(d, t) for d, t in zip(self.D, self.T)]
self.level = -1
self.t = self.T[self.level]
self.d = self.D[self.level]
self.case = self.cases[self.level]
def _exp_part(self, exps):
"""
Try to build an exponential extension.
Returns True if there was a new extension, False if there was no new
extension but it was able to rewrite the given exponentials in terms
of the existing extension, and None if the entire extension building
process should be restarted. If the process fails because there is no
way around an algebraic extension (e.g., exp(log(x)/2)), it will raise
NotImplementedError.
"""
from sympy.integrals.prde import is_log_deriv_k_t_radical
new_extension = False
restart = False
expargs = [i.exp for i in exps]
ip = integer_powers(expargs)
for arg, others in ip:
# Minimize potential problems with algebraic substitution
others.sort(key=lambda i: i[1])
arga, argd = frac_in(arg, self.t)
A = is_log_deriv_k_t_radical(arga, argd, self)
if A is not None:
ans, u, n, const = A
# if n is 1 or -1, it's algebraic, but we can handle it
if n == -1:
# This probably will never happen, because
# Rational.as_numer_denom() returns the negative term in
# the numerator. But in case that changes, reduce it to
# n == 1.
n = 1
u **= -1
const *= -1
ans = [(i, -j) for i, j in ans]
if n == 1:
# Example: exp(x + x**2) over QQ(x, exp(x), exp(x**2))
self.newf = self.newf.xreplace({exp(arg): exp(const)*Mul(*[
u**power for u, power in ans])})
self.newf = self.newf.xreplace({exp(p*exparg):
exp(const*p) * Mul(*[u**power for u, power in ans])
for exparg, p in others})
# TODO: Add something to backsubs to put exp(const*p)
# back together.
continue
else:
# Bad news: we have an algebraic radical. But maybe we
# could still avoid it by choosing a different extension.
# For example, integer_powers() won't handle exp(x/2 + 1)
# over QQ(x, exp(x)), but if we pull out the exp(1), it
# will. Or maybe we have exp(x + x**2/2), over
# QQ(x, exp(x), exp(x**2)), which is exp(x)*sqrt(exp(x**2)),
# but if we use QQ(x, exp(x), exp(x**2/2)), then they will
# all work.
#
# So here is what we do: If there is a non-zero const, pull
# it out and retry. Also, if len(ans) > 1, then rewrite
# exp(arg) as the product of exponentials from ans, and
# retry that. If const == 0 and len(ans) == 1, then we
# assume that it would have been handled by either
# integer_powers() or n == 1 above if it could be handled,
# so we give up at that point. For example, you can never
# handle exp(log(x)/2) because it equals sqrt(x).
if const or len(ans) > 1:
rad = Mul(*[term**(power/n) for term, power in ans])
self.newf = self.newf.xreplace(dict((exp(p*exparg),
exp(const*p)*rad) for exparg, p in others))
self.newf = self.newf.xreplace(dict(list(zip(reversed(self.T),
reversed([f(self.x) for f in self.Tfuncs])))))
restart = True
break
else:
# TODO: give algebraic dependence in error string
raise NotImplementedError("Cannot integrate over "
"algebraic extensions.")
else:
arga, argd = frac_in(arg, self.t)
darga = (argd*derivation(Poly(arga, self.t), self) -
arga*derivation(Poly(argd, self.t), self))
dargd = argd**2
darga, dargd = darga.cancel(dargd, include=True)
darg = darga.as_expr()/dargd.as_expr()
self.t = next(self.ts)
self.T.append(self.t)
self.extargs.append(arg)
self.exts.append('exp')
self.D.append(darg.as_poly(self.t, expand=False)*Poly(self.t,
self.t, expand=False))
if self.dummy:
i = Dummy("i")
else:
i = Symbol('i')
self.Tfuncs += [Lambda(i, exp(arg.subs(self.x, i)))]
self.newf = self.newf.xreplace(
dict((exp(exparg), self.t**p) for exparg, p in others))
new_extension = True
if restart:
return None
return new_extension
def _log_part(self, logs):
"""
Try to build a logarithmic extension.
Returns True if there was a new extension and False if there was no new
extension but it was able to rewrite the given logarithms in terms
of the existing extension. Unlike with exponential extensions, there
is no way that a logarithm is not transcendental over and cannot be
rewritten in terms of an already existing extension in a non-algebraic
way, so this function does not ever return None or raise
NotImplementedError.
"""
from sympy.integrals.prde import is_deriv_k
new_extension = False
logargs = [i.args[0] for i in logs]
for arg in ordered(logargs):
# The log case is easier, because whenever a logarithm is algebraic
# over the base field, it is of the form a1*t1 + ... an*tn + c,
# which is a polynomial, so we can just replace it with that.
# In other words, we don't have to worry about radicals.
arga, argd = frac_in(arg, self.t)
A = is_deriv_k(arga, argd, self)
if A is not None:
ans, u, const = A
newterm = log(const) + u
self.newf = self.newf.xreplace({log(arg): newterm})
continue
else:
arga, argd = frac_in(arg, self.t)
darga = (argd*derivation(Poly(arga, self.t), self) -
arga*derivation(Poly(argd, self.t), self))
dargd = argd**2
darg = darga.as_expr()/dargd.as_expr()
self.t = next(self.ts)
self.T.append(self.t)
self.extargs.append(arg)
self.exts.append('log')
self.D.append(cancel(darg.as_expr()/arg).as_poly(self.t,
expand=False))
if self.dummy:
i = Dummy("i")
else:
i = Symbol('i')
self.Tfuncs += [Lambda(i, log(arg.subs(self.x, i)))]
self.newf = self.newf.xreplace({log(arg): self.t})
new_extension = True
return new_extension
@property
def _important_attrs(self):
"""
Returns some of the more important attributes of self.
Used for testing and debugging purposes.
The attributes are (fa, fd, D, T, Tfuncs, backsubs,
exts, extargs).
"""
return (self.fa, self.fd, self.D, self.T, self.Tfuncs,
self.backsubs, self.exts, self.extargs)
# NOTE: this printing doesn't follow the Python's standard
# eval(repr(DE)) == DE, where DE is the DifferentialExtension object
# , also this printing is supposed to contain all the important
# attributes of a DifferentialExtension object
def __repr__(self):
# no need to have GeneratorType object printed in it
r = [(attr, getattr(self, attr)) for attr in self.__slots__
if not isinstance(getattr(self, attr), GeneratorType)]
return self.__class__.__name__ + '(dict(%r))' % (r)
# fancy printing of DifferentialExtension object
def __str__(self):
return (self.__class__.__name__ + '({fa=%s, fd=%s, D=%s})' %
(self.fa, self.fd, self.D))
# should only be used for debugging purposes, internally
# f1 = f2 = log(x) at different places in code execution
# may return D1 != D2 as True, since 'level' or other attribute
# may differ
def __eq__(self, other):
for attr in self.__class__.__slots__:
d1, d2 = getattr(self, attr), getattr(other, attr)
if not (isinstance(d1, GeneratorType) or d1 == d2):
return False
return True
def reset(self):
"""
Reset self to an initial state. Used by __init__.
"""
self.t = self.x
self.T = [self.x]
self.D = [Poly(1, self.x)]
self.level = -1
self.exts = [None]
self.extargs = [None]
if self.dummy:
self.ts = numbered_symbols('t', cls=Dummy)
else:
# For testing
self.ts = numbered_symbols('t')
# For various things that we change to make things work that we need to
# change back when we are done.
self.backsubs = []
self.Tfuncs = []
self.newf = self.f
def indices(self, extension):
"""
Args:
extension (str): represents a valid extension type.
Returns:
list: A list of indices of 'exts' where extension of
type 'extension' is present.
Examples
========
>>> from sympy.integrals.risch import DifferentialExtension
>>> from sympy import log, exp
>>> from sympy.abc import x
>>> DE = DifferentialExtension(log(x) + exp(x), x, handle_first='exp')
>>> DE.indices('log')
[2]
>>> DE.indices('exp')
[1]
"""
return [i for i, ext in enumerate(self.exts) if ext == extension]
def increment_level(self):
"""
Increment the level of self.
This makes the working differential extension larger. self.level is
given relative to the end of the list (-1, -2, etc.), so we don't need
do worry about it when building the extension.
"""
if self.level >= -1:
raise ValueError("The level of the differential extension cannot "
"be incremented any further.")
self.level += 1
self.t = self.T[self.level]
self.d = self.D[self.level]
self.case = self.cases[self.level]
return None
def decrement_level(self):
"""
Decrease the level of self.
This makes the working differential extension smaller. self.level is
given relative to the end of the list (-1, -2, etc.), so we don't need
do worry about it when building the extension.
"""
if self.level <= -len(self.T):
raise ValueError("The level of the differential extension cannot "
"be decremented any further.")
self.level -= 1
self.t = self.T[self.level]
self.d = self.D[self.level]
self.case = self.cases[self.level]
return None
def update_sets(seq, atoms, func):
s = set(seq)
s = atoms.intersection(s)
new = atoms - s
s.update(list(filter(func, new)))
return list(s)
class DecrementLevel(object):
"""
A context manager for decrementing the level of a DifferentialExtension.
"""
__slots__ = ('DE',)
def __init__(self, DE):
self.DE = DE
return
def __enter__(self):
self.DE.decrement_level()
def __exit__(self, exc_type, exc_value, traceback):
self.DE.increment_level()
class NonElementaryIntegralException(Exception):
"""
Exception used by subroutines within the Risch algorithm to indicate to one
another that the function being integrated does not have an elementary
integral in the given differential field.
"""
# TODO: Rewrite algorithms below to use this (?)
# TODO: Pass through information about why the integral was nonelementary,
# and store that in the resulting NonElementaryIntegral somehow.
pass
def gcdex_diophantine(a, b, c):
"""
Extended Euclidean Algorithm, Diophantine version.
Given a, b in K[x] and c in (a, b), the ideal generated by a and b,
return (s, t) such that s*a + t*b == c and either s == 0 or s.degree()
< b.degree().
"""
# Extended Euclidean Algorithm (Diophantine Version) pg. 13
# TODO: This should go in densetools.py.
# XXX: Bettter name?
s, g = a.half_gcdex(b)
s *= c.exquo(g) # Inexact division means c is not in (a, b)
if s and s.degree() >= b.degree():
_, s = s.div(b)
t = (c - s*a).exquo(b)
return (s, t)
def frac_in(f, t, **kwargs):
"""
Returns the tuple (fa, fd), where fa and fd are Polys in t.
This is a common idiom in the Risch Algorithm functions, so we abstract
it out here. f should be a basic expression, a Poly, or a tuple (fa, fd),
where fa and fd are either basic expressions or Polys, and f == fa/fd.
**kwargs are applied to Poly.
"""
cancel = kwargs.pop('cancel', False)
if type(f) is tuple:
fa, fd = f
f = fa.as_expr()/fd.as_expr()
fa, fd = f.as_expr().as_numer_denom()
fa, fd = fa.as_poly(t, **kwargs), fd.as_poly(t, **kwargs)
if cancel:
fa, fd = fa.cancel(fd, include=True)
if fa is None or fd is None:
raise ValueError("Could not turn %s into a fraction in %s." % (f, t))
return (fa, fd)
def as_poly_1t(p, t, z):
"""
(Hackish) way to convert an element p of K[t, 1/t] to K[t, z].
In other words, z == 1/t will be a dummy variable that Poly can handle
better.
See issue 5131.
Examples
========
>>> from sympy import random_poly
>>> from sympy.integrals.risch import as_poly_1t
>>> from sympy.abc import x, z
>>> p1 = random_poly(x, 10, -10, 10)
>>> p2 = random_poly(x, 10, -10, 10)
>>> p = p1 + p2.subs(x, 1/x)
>>> as_poly_1t(p, x, z).as_expr().subs(z, 1/x) == p
True
"""
# TODO: Use this on the final result. That way, we can avoid answers like
# (...)*exp(-x).
pa, pd = frac_in(p, t, cancel=True)
if not pd.is_monomial:
# XXX: Is there a better Poly exception that we could raise here?
# Either way, if you see this (from the Risch Algorithm) it indicates
# a bug.
raise PolynomialError("%s is not an element of K[%s, 1/%s]." % (p, t, t))
d = pd.degree(t)
one_t_part = pa.slice(0, d + 1)
r = pd.degree() - pa.degree()
t_part = pa - one_t_part
try:
t_part = t_part.to_field().exquo(pd)
except DomainError as e:
# issue 4950
raise NotImplementedError(e)
# Compute the negative degree parts.
one_t_part = Poly.from_list(reversed(one_t_part.rep.rep), *one_t_part.gens,
domain=one_t_part.domain)
if 0 < r < oo:
one_t_part *= Poly(t**r, t)
one_t_part = one_t_part.replace(t, z) # z will be 1/t
if pd.nth(d):
one_t_part *= Poly(1/pd.nth(d), z, expand=False)
ans = t_part.as_poly(t, z, expand=False) + one_t_part.as_poly(t, z,
expand=False)
return ans
def derivation(p, DE, coefficientD=False, basic=False):
"""
Computes Dp.
Given the derivation D with D = d/dx and p is a polynomial in t over
K(x), return Dp.
If coefficientD is True, it computes the derivation kD
(kappaD), which is defined as kD(sum(ai*Xi**i, (i, 0, n))) ==
sum(Dai*Xi**i, (i, 1, n)) (Definition 3.2.2, page 80). X in this case is
T[-1], so coefficientD computes the derivative just with respect to T[:-1],
with T[-1] treated as a constant.
If basic=True, the returns a Basic expression. Elements of D can still be
instances of Poly.
"""
if basic:
r = 0
else:
r = Poly(0, DE.t)
t = DE.t
if coefficientD:
if DE.level <= -len(DE.T):
# 'base' case, the answer is 0.
return r
DE.decrement_level()
D = DE.D[:len(DE.D) + DE.level + 1]
T = DE.T[:len(DE.T) + DE.level + 1]
for d, v in zip(D, T):
pv = p.as_poly(v)
if pv is None or basic:
pv = p.as_expr()
if basic:
r += d.as_expr()*pv.diff(v)
else:
r += (d.as_expr()*pv.diff(v).as_expr()).as_poly(t)
if basic:
r = cancel(r)
if coefficientD:
DE.increment_level()
return r
def get_case(d, t):
"""
Returns the type of the derivation d.
Returns one of {'exp', 'tan', 'base', 'primitive', 'other_linear',
'other_nonlinear'}.
"""
if not d.expr.has(t):
if d.is_one:
return 'base'
return 'primitive'
if d.rem(Poly(t, t)).is_zero:
return 'exp'
if d.rem(Poly(1 + t**2, t)).is_zero:
return 'tan'
if d.degree(t) > 1:
return 'other_nonlinear'
return 'other_linear'
def splitfactor(p, DE, coefficientD=False, z=None):
"""
Splitting factorization.
Given a derivation D on k[t] and p in k[t], return (p_n, p_s) in
k[t] x k[t] such that p = p_n*p_s, p_s is special, and each square
factor of p_n is normal.
Page. 100
"""
kinv = [1/x for x in DE.T[:DE.level]]
if z:
kinv.append(z)
One = Poly(1, DE.t, domain=p.get_domain())
Dp = derivation(p, DE, coefficientD=coefficientD)
# XXX: Is this right?
if p.is_zero:
return (p, One)
if not p.expr.has(DE.t):
s = p.as_poly(*kinv).gcd(Dp.as_poly(*kinv)).as_poly(DE.t)
n = p.exquo(s)
return (n, s)
if not Dp.is_zero:
h = p.gcd(Dp).to_field()
g = p.gcd(p.diff(DE.t)).to_field()
s = h.exquo(g)
if s.degree(DE.t) == 0:
return (p, One)
q_split = splitfactor(p.exquo(s), DE, coefficientD=coefficientD)
return (q_split[0], q_split[1]*s)
else:
return (p, One)
def splitfactor_sqf(p, DE, coefficientD=False, z=None, basic=False):
"""
Splitting Square-free Factorization
Given a derivation D on k[t] and p in k[t], returns (N1, ..., Nm)
and (S1, ..., Sm) in k[t]^m such that p =
(N1*N2**2*...*Nm**m)*(S1*S2**2*...*Sm**m) is a splitting
factorization of p and the Ni and Si are square-free and coprime.
"""
# TODO: This algorithm appears to be faster in every case
# TODO: Verify this and splitfactor() for multiple extensions
kkinv = [1/x for x in DE.T[:DE.level]] + DE.T[:DE.level]
if z:
kkinv = [z]
S = []
N = []
p_sqf = p.sqf_list_include()
if p.is_zero:
return (((p, 1),), ())
for pi, i in p_sqf:
Si = pi.as_poly(*kkinv).gcd(derivation(pi, DE,
coefficientD=coefficientD,basic=basic).as_poly(*kkinv)).as_poly(DE.t)
pi = Poly(pi, DE.t)
Si = Poly(Si, DE.t)
Ni = pi.exquo(Si)
if not Si.is_one:
S.append((Si, i))
if not Ni.is_one:
N.append((Ni, i))
return (tuple(N), tuple(S))
def canonical_representation(a, d, DE):
"""
Canonical Representation.
Given a derivation D on k[t] and f = a/d in k(t), return (f_p, f_s,
f_n) in k[t] x k(t) x k(t) such that f = f_p + f_s + f_n is the
canonical representation of f (f_p is a polynomial, f_s is reduced
(has a special denominator), and f_n is simple (has a normal
denominator).
"""
# Make d monic
l = Poly(1/d.LC(), DE.t)
a, d = a.mul(l), d.mul(l)
q, r = a.div(d)
dn, ds = splitfactor(d, DE)
b, c = gcdex_diophantine(dn.as_poly(DE.t), ds.as_poly(DE.t), r.as_poly(DE.t))
b, c = b.as_poly(DE.t), c.as_poly(DE.t)
return (q, (b, ds), (c, dn))
def hermite_reduce(a, d, DE):
"""
Hermite Reduction - Mack's Linear Version.
Given a derivation D on k(t) and f = a/d in k(t), returns g, h, r in
k(t) such that f = Dg + h + r, h is simple, and r is reduced.
"""
# Make d monic
l = Poly(1/d.LC(), DE.t)
a, d = a.mul(l), d.mul(l)
fp, fs, fn = canonical_representation(a, d, DE)
a, d = fn
l = Poly(1/d.LC(), DE.t)
a, d = a.mul(l), d.mul(l)
ga = Poly(0, DE.t)
gd = Poly(1, DE.t)
dd = derivation(d, DE)
dm = gcd(d, dd).as_poly(DE.t)
ds, r = d.div(dm)
while dm.degree(DE.t)>0:
ddm = derivation(dm, DE)
dm2 = gcd(dm, ddm)
dms, r = dm.div(dm2)
ds_ddm = ds.mul(ddm)
ds_ddm_dm, r = ds_ddm.div(dm)
b, c = gcdex_diophantine(-ds_ddm_dm.as_poly(DE.t), dms.as_poly(DE.t), a.as_poly(DE.t))
b, c = b.as_poly(DE.t), c.as_poly(DE.t)
db = derivation(b, DE).as_poly(DE.t)
ds_dms, r = ds.div(dms)
a = c.as_poly(DE.t) - db.mul(ds_dms).as_poly(DE.t)
ga = ga*dm + b*gd
gd = gd*dm
ga, gd = ga.cancel(gd, include=True)
dm = dm2
d = ds
q, r = a.div(d)
ga, gd = ga.cancel(gd, include=True)
r, d = r.cancel(d, include=True)
rra = q*fs[1] + fp*fs[1] + fs[0]
rrd = fs[1]
rra, rrd = rra.cancel(rrd, include=True)
return ((ga, gd), (r, d), (rra, rrd))
def polynomial_reduce(p, DE):
"""
Polynomial Reduction.
Given a derivation D on k(t) and p in k[t] where t is a nonlinear
monomial over k, return q, r in k[t] such that p = Dq + r, and
deg(r) < deg_t(Dt).
"""
q = Poly(0, DE.t)
while p.degree(DE.t) >= DE.d.degree(DE.t):
m = p.degree(DE.t) - DE.d.degree(DE.t) + 1
q0 = Poly(DE.t**m, DE.t).mul(Poly(p.as_poly(DE.t).LC()/
(m*DE.d.LC()), DE.t))
q += q0
p = p - derivation(q0, DE)
return (q, p)
def laurent_series(a, d, F, n, DE):
"""
Contribution of F to the full partial fraction decomposition of A/D
Given a field K of characteristic 0 and A,D,F in K[x] with D monic,
nonzero, coprime with A, and F the factor of multiplicity n in the square-
free factorization of D, return the principal parts of the Laurent series of
A/D at all the zeros of F.
"""
if F.degree()==0:
return 0
Z = _symbols('z', n)
Z.insert(0, z)
delta_a = Poly(0, DE.t)
delta_d = Poly(1, DE.t)
E = d.quo(F**n)
ha, hd = (a, E*Poly(z**n, DE.t))
dF = derivation(F,DE)
B, G = gcdex_diophantine(E, F, Poly(1,DE.t))
C, G = gcdex_diophantine(dF, F, Poly(1,DE.t))
# initialization
F_store = F
V, DE_D_list, H_list= [], [], []
for j in range(0, n):
# jth derivative of z would be substituted with dfnth/(j+1) where dfnth =(d^n)f/(dx)^n
F_store = derivation(F_store, DE)
v = (F_store.as_expr())/(j + 1)
V.append(v)
DE_D_list.append(Poly(Z[j + 1],Z[j]))
DE_new = DifferentialExtension(extension = {'D': DE_D_list}) #a differential indeterminate
for j in range(0, n):
zEha = Poly(z**(n + j), DE.t)*E**(j + 1)*ha
zEhd = hd
Pa, Pd = cancel((zEha, zEhd))[1], cancel((zEha, zEhd))[2]
Q = Pa.quo(Pd)
for i in range(0, j + 1):
Q = Q.subs(Z[i], V[i])
Dha = (hd*derivation(ha, DE, basic=True).as_poly(DE.t)
+ ha*derivation(hd, DE, basic=True).as_poly(DE.t)
+ hd*derivation(ha, DE_new, basic=True).as_poly(DE.t)
+ ha*derivation(hd, DE_new, basic=True).as_poly(DE.t))
Dhd = Poly(j + 1, DE.t)*hd**2
ha, hd = Dha, Dhd
Ff, Fr = F.div(gcd(F, Q))
F_stara, F_stard = frac_in(Ff, DE.t)
if F_stara.degree(DE.t) - F_stard.degree(DE.t) > 0:
QBC = Poly(Q, DE.t)*B**(1 + j)*C**(n + j)
H = QBC
H_list.append(H)
H = (QBC*F_stard).rem(F_stara)
alphas = real_roots(F_stara)
for alpha in list(alphas):
delta_a = delta_a*Poly((DE.t - alpha)**(n - j), DE.t) + Poly(H.eval(alpha), DE.t)
delta_d = delta_d*Poly((DE.t - alpha)**(n - j), DE.t)
return (delta_a, delta_d, H_list)
def recognize_derivative(a, d, DE, z=None):
"""
Compute the squarefree factorization of the denominator of f
and for each Di the polynomial H in K[x] (see Theorem 2.7.1), using the
LaurentSeries algorithm. Write Di = GiEi where Gj = gcd(Hn, Di) and
gcd(Ei,Hn) = 1. Since the residues of f at the roots of Gj are all 0, and
the residue of f at a root alpha of Ei is Hi(a) != 0, f is the derivative of a
rational function if and only if Ei = 1 for each i, which is equivalent to
Di | H[-1] for each i.
"""
flag =True
a, d = a.cancel(d, include=True)
q, r = a.div(d)
Np, Sp = splitfactor_sqf(d, DE, coefficientD=True, z=z)
j = 1
for (s, i) in Sp:
delta_a, delta_d, H = laurent_series(r, d, s, j, DE)
g = gcd(d, H[-1]).as_poly()
if g is not d:
flag = False
break
j = j + 1
return flag
def recognize_log_derivative(a, d, DE, z=None):
"""
There exists a v in K(x)* such that f = dv/v
where f a rational function if and only if f can be written as f = A/D
where D is squarefree,deg(A) < deg(D), gcd(A, D) = 1,
and all the roots of the Rothstein-Trager resultant are integers. In that case,
any of the Rothstein-Trager, Lazard-Rioboo-Trager or Czichowski algorithm
produces u in K(x) such that du/dx = uf.
"""
z = z or Dummy('z')
a, d = a.cancel(d, include=True)
p, a = a.div(d)
pz = Poly(z, DE.t)
Dd = derivation(d, DE)
q = a - pz*Dd
r, R = d.resultant(q, includePRS=True)
r = Poly(r, z)
Np, Sp = splitfactor_sqf(r, DE, coefficientD=True, z=z)
for s, i in Sp:
# TODO also consider the complex roots
# incase we have complex roots it should turn the flag false
a = real_roots(s.as_poly(z))
if any(not j.is_Integer for j in a):
return False
return True
def residue_reduce(a, d, DE, z=None, invert=True):
"""
Lazard-Rioboo-Rothstein-Trager resultant reduction.
Given a derivation D on k(t) and f in k(t) simple, return g
elementary over k(t) and a Boolean b in {True, False} such that f -
Dg in k[t] if b == True or f + h and f + h - Dg do not have an
elementary integral over k(t) for any h in k<t> (reduced) if b ==
False.
Returns (G, b), where G is a tuple of tuples of the form (s_i, S_i),
such that g = Add(*[RootSum(s_i, lambda z: z*log(S_i(z, t))) for
S_i, s_i in G]). f - Dg is the remaining integral, which is elementary
only if b == True, and hence the integral of f is elementary only if
b == True.
f - Dg is not calculated in this function because that would require
explicitly calculating the RootSum. Use residue_reduce_derivation().
"""
# TODO: Use log_to_atan() from rationaltools.py
# If r = residue_reduce(...), then the logarithmic part is given by:
# sum([RootSum(a[0].as_poly(z), lambda i: i*log(a[1].as_expr()).subs(z,
# i)).subs(t, log(x)) for a in r[0]])
z = z or Dummy('z')
a, d = a.cancel(d, include=True)
a, d = a.to_field().mul_ground(1/d.LC()), d.to_field().mul_ground(1/d.LC())
kkinv = [1/x for x in DE.T[:DE.level]] + DE.T[:DE.level]
if a.is_zero:
return ([], True)
p, a = a.div(d)
pz = Poly(z, DE.t)
Dd = derivation(d, DE)
q = a - pz*Dd
if Dd.degree(DE.t) <= d.degree(DE.t):
r, R = d.resultant(q, includePRS=True)
else:
r, R = q.resultant(d, includePRS=True)
R_map, H = {}, []
for i in R:
R_map[i.degree()] = i
r = Poly(r, z)
Np, Sp = splitfactor_sqf(r, DE, coefficientD=True, z=z)
for s, i in Sp:
if i == d.degree(DE.t):
s = Poly(s, z).monic()
H.append((s, d))
else:
h = R_map.get(i)
if h is None:
continue
h_lc = Poly(h.as_poly(DE.t).LC(), DE.t, field=True)
h_lc_sqf = h_lc.sqf_list_include(all=True)
for a, j in h_lc_sqf:
h = Poly(h, DE.t, field=True).exquo(Poly(gcd(a, s**j, *kkinv),
DE.t))
s = Poly(s, z).monic()
if invert:
h_lc = Poly(h.as_poly(DE.t).LC(), DE.t, field=True, expand=False)
inv, coeffs = h_lc.as_poly(z, field=True).invert(s), [S.One]
for coeff in h.coeffs()[1:]:
L = reduced(inv*coeff.as_poly(inv.gens), [s])[1]
coeffs.append(L.as_expr())
h = Poly(dict(list(zip(h.monoms(), coeffs))), DE.t)
H.append((s, h))
b = all([not cancel(i.as_expr()).has(DE.t, z) for i, _ in Np])
return (H, b)
def residue_reduce_to_basic(H, DE, z):
"""
Converts the tuple returned by residue_reduce() into a Basic expression.
"""
# TODO: check what Lambda does with RootOf
i = Dummy('i')
s = list(zip(reversed(DE.T), reversed([f(DE.x) for f in DE.Tfuncs])))
return sum((RootSum(a[0].as_poly(z), Lambda(i, i*log(a[1].as_expr()).subs(
{z: i}).subs(s))) for a in H))
def residue_reduce_derivation(H, DE, z):
"""
Computes the derivation of an expression returned by residue_reduce().
In general, this is a rational function in t, so this returns an
as_expr() result.
"""
# TODO: verify that this is correct for multiple extensions
i = Dummy('i')
return S(sum((RootSum(a[0].as_poly(z), Lambda(i, i*derivation(a[1],
DE).as_expr().subs(z, i)/a[1].as_expr().subs(z, i))) for a in H)))
def integrate_primitive_polynomial(p, DE):
"""
Integration of primitive polynomials.
Given a primitive monomial t over k, and p in k[t], return q in k[t],
r in k, and a bool b in {True, False} such that r = p - Dq is in k if b is
True, or r = p - Dq does not have an elementary integral over k(t) if b is
False.
"""
from sympy.integrals.prde import limited_integrate
Zero = Poly(0, DE.t)
q = Poly(0, DE.t)
if not p.expr.has(DE.t):
return (Zero, p, True)
while True:
if not p.expr.has(DE.t):
return (q, p, True)
Dta, Dtb = frac_in(DE.d, DE.T[DE.level - 1])
with DecrementLevel(DE): # We had better be integrating the lowest extension (x)
# with ratint().
a = p.LC()
aa, ad = frac_in(a, DE.t)
try:
rv = limited_integrate(aa, ad, [(Dta, Dtb)], DE)
if rv is None:
raise NonElementaryIntegralException
(ba, bd), c = rv
except NonElementaryIntegralException:
return (q, p, False)
m = p.degree(DE.t)
q0 = c[0].as_poly(DE.t)*Poly(DE.t**(m + 1)/(m + 1), DE.t) + \
(ba.as_expr()/bd.as_expr()).as_poly(DE.t)*Poly(DE.t**m, DE.t)
p = p - derivation(q0, DE)
q = q + q0
def integrate_primitive(a, d, DE, z=None):
"""
Integration of primitive functions.
Given a primitive monomial t over k and f in k(t), return g elementary over
k(t), i in k(t), and b in {True, False} such that i = f - Dg is in k if b
is True or i = f - Dg does not have an elementary integral over k(t) if b
is False.
This function returns a Basic expression for the first argument. If b is
True, the second argument is Basic expression in k to recursively integrate.
If b is False, the second argument is an unevaluated Integral, which has
been proven to be nonelementary.
"""
# XXX: a and d must be canceled, or this might return incorrect results
z = z or Dummy("z")
s = list(zip(reversed(DE.T), reversed([f(DE.x) for f in DE.Tfuncs])))
g1, h, r = hermite_reduce(a, d, DE)
g2, b = residue_reduce(h[0], h[1], DE, z=z)
if not b:
i = cancel(a.as_expr()/d.as_expr() - (g1[1]*derivation(g1[0], DE) -
g1[0]*derivation(g1[1], DE)).as_expr()/(g1[1]**2).as_expr() -
residue_reduce_derivation(g2, DE, z))
i = NonElementaryIntegral(cancel(i).subs(s), DE.x)
return ((g1[0].as_expr()/g1[1].as_expr()).subs(s) +
residue_reduce_to_basic(g2, DE, z), i, b)
# h - Dg2 + r
p = cancel(h[0].as_expr()/h[1].as_expr() - residue_reduce_derivation(g2,
DE, z) + r[0].as_expr()/r[1].as_expr())
p = p.as_poly(DE.t)
q, i, b = integrate_primitive_polynomial(p, DE)
ret = ((g1[0].as_expr()/g1[1].as_expr() + q.as_expr()).subs(s) +
residue_reduce_to_basic(g2, DE, z))
if not b:
# TODO: This does not do the right thing when b is False
i = NonElementaryIntegral(cancel(i.as_expr()).subs(s), DE.x)
else:
i = cancel(i.as_expr())
return (ret, i, b)
def integrate_hyperexponential_polynomial(p, DE, z):
"""
Integration of hyperexponential polynomials.
Given a hyperexponential monomial t over k and p in k[t, 1/t], return q in
k[t, 1/t] and a bool b in {True, False} such that p - Dq in k if b is True,
or p - Dq does not have an elementary integral over k(t) if b is False.
"""
from sympy.integrals.rde import rischDE
t1 = DE.t
dtt = DE.d.exquo(Poly(DE.t, DE.t))
qa = Poly(0, DE.t)
qd = Poly(1, DE.t)
b = True
if p.is_zero:
return(qa, qd, b)
with DecrementLevel(DE):
for i in range(-p.degree(z), p.degree(t1) + 1):
if not i:
continue
elif i < 0:
# If you get AttributeError: 'NoneType' object has no attribute 'nth'
# then this should really not have expand=False
# But it shouldn't happen because p is already a Poly in t and z
a = p.as_poly(z, expand=False).nth(-i)
else:
# If you get AttributeError: 'NoneType' object has no attribute 'nth'
# then this should really not have expand=False
a = p.as_poly(t1, expand=False).nth(i)
aa, ad = frac_in(a, DE.t, field=True)
aa, ad = aa.cancel(ad, include=True)
iDt = Poly(i, t1)*dtt
iDta, iDtd = frac_in(iDt, DE.t, field=True)
try:
va, vd = rischDE(iDta, iDtd, Poly(aa, DE.t), Poly(ad, DE.t), DE)
va, vd = frac_in((va, vd), t1, cancel=True)
except NonElementaryIntegralException:
b = False
else:
qa = qa*vd + va*Poly(t1**i)*qd
qd *= vd
return (qa, qd, b)
def integrate_hyperexponential(a, d, DE, z=None, conds='piecewise'):
"""
Integration of hyperexponential functions.
Given a hyperexponential monomial t over k and f in k(t), return g
elementary over k(t), i in k(t), and a bool b in {True, False} such that
i = f - Dg is in k if b is True or i = f - Dg does not have an elementary
integral over k(t) if b is False.
This function returns a Basic expression for the first argument. If b is
True, the second argument is Basic expression in k to recursively integrate.
If b is False, the second argument is an unevaluated Integral, which has
been proven to be nonelementary.
"""
# XXX: a and d must be canceled, or this might return incorrect results
z = z or Dummy("z")
s = list(zip(reversed(DE.T), reversed([f(DE.x) for f in DE.Tfuncs])))
g1, h, r = hermite_reduce(a, d, DE)
g2, b = residue_reduce(h[0], h[1], DE, z=z)
if not b:
i = cancel(a.as_expr()/d.as_expr() - (g1[1]*derivation(g1[0], DE) -
g1[0]*derivation(g1[1], DE)).as_expr()/(g1[1]**2).as_expr() -
residue_reduce_derivation(g2, DE, z))
i = NonElementaryIntegral(cancel(i.subs(s)), DE.x)
return ((g1[0].as_expr()/g1[1].as_expr()).subs(s) +
residue_reduce_to_basic(g2, DE, z), i, b)
# p should be a polynomial in t and 1/t, because Sirr == k[t, 1/t]
# h - Dg2 + r
p = cancel(h[0].as_expr()/h[1].as_expr() - residue_reduce_derivation(g2,
DE, z) + r[0].as_expr()/r[1].as_expr())
pp = as_poly_1t(p, DE.t, z)
qa, qd, b = integrate_hyperexponential_polynomial(pp, DE, z)
i = pp.nth(0, 0)
ret = ((g1[0].as_expr()/g1[1].as_expr()).subs(s) \
+ residue_reduce_to_basic(g2, DE, z))
qas = qa.as_expr().subs(s)
qds = qd.as_expr().subs(s)
if conds == 'piecewise' and DE.x not in qds.free_symbols:
# We have to be careful if the exponent is S.Zero!
# XXX: Does qd = 0 always necessarily correspond to the exponential
# equaling 1?
ret += Piecewise(
(qas/qds, Ne(qds, 0)),
(integrate((p - i).subs(DE.t, 1).subs(s), DE.x), True)
)
else:
ret += qas/qds
if not b:
i = p - (qd*derivation(qa, DE) - qa*derivation(qd, DE)).as_expr()/\
(qd**2).as_expr()
i = NonElementaryIntegral(cancel(i).subs(s), DE.x)
return (ret, i, b)
def integrate_hypertangent_polynomial(p, DE):
"""
Integration of hypertangent polynomials.
Given a differential field k such that sqrt(-1) is not in k, a
hypertangent monomial t over k, and p in k[t], return q in k[t] and
c in k such that p - Dq - c*D(t**2 + 1)/(t**1 + 1) is in k and p -
Dq does not have an elementary integral over k(t) if Dc != 0.
"""
# XXX: Make sure that sqrt(-1) is not in k.
q, r = polynomial_reduce(p, DE)
a = DE.d.exquo(Poly(DE.t**2 + 1, DE.t))
c = Poly(r.nth(1)/(2*a.as_expr()), DE.t)
return (q, c)
def integrate_nonlinear_no_specials(a, d, DE, z=None):
"""
Integration of nonlinear monomials with no specials.
Given a nonlinear monomial t over k such that Sirr ({p in k[t] | p is
special, monic, and irreducible}) is empty, and f in k(t), returns g
elementary over k(t) and a Boolean b in {True, False} such that f - Dg is
in k if b == True, or f - Dg does not have an elementary integral over k(t)
if b == False.
This function is applicable to all nonlinear extensions, but in the case
where it returns b == False, it will only have proven that the integral of
f - Dg is nonelementary if Sirr is empty.
This function returns a Basic expression.
"""
# TODO: Integral from k?
# TODO: split out nonelementary integral
# XXX: a and d must be canceled, or this might not return correct results
z = z or Dummy("z")
s = list(zip(reversed(DE.T), reversed([f(DE.x) for f in DE.Tfuncs])))
g1, h, r = hermite_reduce(a, d, DE)
g2, b = residue_reduce(h[0], h[1], DE, z=z)
if not b:
return ((g1[0].as_expr()/g1[1].as_expr()).subs(s) +
residue_reduce_to_basic(g2, DE, z), b)
# Because f has no specials, this should be a polynomial in t, or else
# there is a bug.
p = cancel(h[0].as_expr()/h[1].as_expr() - residue_reduce_derivation(g2,
DE, z).as_expr() + r[0].as_expr()/r[1].as_expr()).as_poly(DE.t)
q1, q2 = polynomial_reduce(p, DE)
if q2.expr.has(DE.t):
b = False
else:
b = True
ret = (cancel(g1[0].as_expr()/g1[1].as_expr() + q1.as_expr()).subs(s) +
residue_reduce_to_basic(g2, DE, z))
return (ret, b)
class NonElementaryIntegral(Integral):
"""
Represents a nonelementary Integral.
If the result of integrate() is an instance of this class, it is
guaranteed to be nonelementary. Note that integrate() by default will try
to find any closed-form solution, even in terms of special functions which
may themselves not be elementary. To make integrate() only give
elementary solutions, or, in the cases where it can prove the integral to
be nonelementary, instances of this class, use integrate(risch=True).
In this case, integrate() may raise NotImplementedError if it cannot make
such a determination.
integrate() uses the deterministic Risch algorithm to integrate elementary
functions or prove that they have no elementary integral. In some cases,
this algorithm can split an integral into an elementary and nonelementary
part, so that the result of integrate will be the sum of an elementary
expression and a NonElementaryIntegral.
Examples
========
>>> from sympy import integrate, exp, log, Integral
>>> from sympy.abc import x
>>> a = integrate(exp(-x**2), x, risch=True)
>>> print(a)
Integral(exp(-x**2), x)
>>> type(a)
<class 'sympy.integrals.risch.NonElementaryIntegral'>
>>> expr = (2*log(x)**2 - log(x) - x**2)/(log(x)**3 - x**2*log(x))
>>> b = integrate(expr, x, risch=True)
>>> print(b)
-log(-x + log(x))/2 + log(x + log(x))/2 + Integral(1/log(x), x)
>>> type(b.atoms(Integral).pop())
<class 'sympy.integrals.risch.NonElementaryIntegral'>
"""
# TODO: This is useful in and of itself, because isinstance(result,
# NonElementaryIntegral) will tell if the integral has been proven to be
# elementary. But should we do more? Perhaps a no-op .doit() if
# elementary=True? Or maybe some information on why the integral is
# nonelementary.
pass
def risch_integrate(f, x, extension=None, handle_first='log',
separate_integral=False, rewrite_complex=None,
conds='piecewise'):
r"""
The Risch Integration Algorithm.
Only transcendental functions are supported. Currently, only exponentials
and logarithms are supported, but support for trigonometric functions is
forthcoming.
If this function returns an unevaluated Integral in the result, it means
that it has proven that integral to be nonelementary. Any errors will
result in raising NotImplementedError. The unevaluated Integral will be
an instance of NonElementaryIntegral, a subclass of Integral.
handle_first may be either 'exp' or 'log'. This changes the order in
which the extension is built, and may result in a different (but
equivalent) solution (for an example of this, see issue 5109). It is also
possible that the integral may be computed with one but not the other,
because not all cases have been implemented yet. It defaults to 'log' so
that the outer extension is exponential when possible, because more of the
exponential case has been implemented.
If separate_integral is True, the result is returned as a tuple (ans, i),
where the integral is ans + i, ans is elementary, and i is either a
NonElementaryIntegral or 0. This useful if you want to try further
integrating the NonElementaryIntegral part using other algorithms to
possibly get a solution in terms of special functions. It is False by
default.
Examples
========
>>> from sympy.integrals.risch import risch_integrate
>>> from sympy import exp, log, pprint
>>> from sympy.abc import x
First, we try integrating exp(-x**2). Except for a constant factor of
2/sqrt(pi), this is the famous error function.
>>> pprint(risch_integrate(exp(-x**2), x))
/
|
| 2
| -x
| e dx
|
/
The unevaluated Integral in the result means that risch_integrate() has
proven that exp(-x**2) does not have an elementary anti-derivative.
In many cases, risch_integrate() can split out the elementary
anti-derivative part from the nonelementary anti-derivative part.
For example,
>>> pprint(risch_integrate((2*log(x)**2 - log(x) - x**2)/(log(x)**3 -
... x**2*log(x)), x))
/
|
log(-x + log(x)) log(x + log(x)) | 1
- ---------------- + --------------- + | ------ dx
2 2 | log(x)
|
/
This means that it has proven that the integral of 1/log(x) is
nonelementary. This function is also known as the logarithmic integral,
and is often denoted as Li(x).
risch_integrate() currently only accepts purely transcendental functions
with exponentials and logarithms, though note that this can include
nested exponentials and logarithms, as well as exponentials with bases
other than E.
>>> pprint(risch_integrate(exp(x)*exp(exp(x)), x))
/ x\
\e /
e
>>> pprint(risch_integrate(exp(exp(x)), x))
/
|
| / x\
| \e /
| e dx
|
/
>>> pprint(risch_integrate(x*x**x*log(x) + x**x + x*x**x, x))
x
x*x
>>> pprint(risch_integrate(x**x, x))
/
|
| x
| x dx
|
/
>>> pprint(risch_integrate(-1/(x*log(x)*log(log(x))**2), x))
1
-----------
log(log(x))
"""
f = S(f)
DE = extension or DifferentialExtension(f, x, handle_first=handle_first,
dummy=True, rewrite_complex=rewrite_complex)
fa, fd = DE.fa, DE.fd
result = S.Zero
for case in reversed(DE.cases):
if not fa.expr.has(DE.t) and not fd.expr.has(DE.t) and not case == 'base':
DE.decrement_level()
fa, fd = frac_in((fa, fd), DE.t)
continue
fa, fd = fa.cancel(fd, include=True)
if case == 'exp':
ans, i, b = integrate_hyperexponential(fa, fd, DE, conds=conds)
elif case == 'primitive':
ans, i, b = integrate_primitive(fa, fd, DE)
elif case == 'base':
# XXX: We can't call ratint() directly here because it doesn't
# handle polynomials correctly.
ans = integrate(fa.as_expr()/fd.as_expr(), DE.x, risch=False)
b = False
i = S.Zero
else:
raise NotImplementedError("Only exponential and logarithmic "
"extensions are currently supported.")
result += ans
if b:
DE.decrement_level()
fa, fd = frac_in(i, DE.t)
else:
result = result.subs(DE.backsubs)
if not i.is_zero:
i = NonElementaryIntegral(i.function.subs(DE.backsubs),i.limits)
if not separate_integral:
result += i
return result
else:
if isinstance(i, NonElementaryIntegral):
return (result, i)
else:
return (result, 0)
|
e2e14d13cd9691a9c39fd0540c099f2cba89901ae74d581028e341db767170c7 | """This module implements tools for integrating rational functions. """
from __future__ import print_function, division
from sympy import S, Symbol, symbols, I, log, atan, \
roots, RootSum, Lambda, cancel, Dummy
from sympy.polys import Poly, resultant, ZZ
def ratint(f, x, **flags):
"""
Performs indefinite integration of rational functions.
Given a field :math:`K` and a rational function :math:`f = p/q`,
where :math:`p` and :math:`q` are polynomials in :math:`K[x]`,
returns a function :math:`g` such that :math:`f = g'`.
>>> from sympy.integrals.rationaltools import ratint
>>> from sympy.abc import x
>>> ratint(36/(x**5 - 2*x**4 - 2*x**3 + 4*x**2 + x - 2), x)
(12*x + 6)/(x**2 - 1) + 4*log(x - 2) - 4*log(x + 1)
References
==========
.. [Bro05] M. Bronstein, Symbolic Integration I: Transcendental
Functions, Second Edition, Springer-Verlag, 2005, pp. 35-70
See Also
========
sympy.integrals.integrals.Integral.doit
sympy.integrals.rationaltools.ratint_logpart
sympy.integrals.rationaltools.ratint_ratpart
"""
if type(f) is not tuple:
p, q = f.as_numer_denom()
else:
p, q = f
p, q = Poly(p, x, composite=False, field=True), Poly(q, x, composite=False, field=True)
coeff, p, q = p.cancel(q)
poly, p = p.div(q)
result = poly.integrate(x).as_expr()
if p.is_zero:
return coeff*result
g, h = ratint_ratpart(p, q, x)
P, Q = h.as_numer_denom()
P = Poly(P, x)
Q = Poly(Q, x)
q, r = P.div(Q)
result += g + q.integrate(x).as_expr()
if not r.is_zero:
symbol = flags.get('symbol', 't')
if not isinstance(symbol, Symbol):
t = Dummy(symbol)
else:
t = symbol.as_dummy()
L = ratint_logpart(r, Q, x, t)
real = flags.get('real')
if real is None:
if type(f) is not tuple:
atoms = f.atoms()
else:
p, q = f
atoms = p.atoms() | q.atoms()
for elt in atoms - {x}:
if not elt.is_extended_real:
real = False
break
else:
real = True
eps = S.Zero
if not real:
for h, q in L:
_, h = h.primitive()
eps += RootSum(
q, Lambda(t, t*log(h.as_expr())), quadratic=True)
else:
for h, q in L:
_, h = h.primitive()
R = log_to_real(h, q, x, t)
if R is not None:
eps += R
else:
eps += RootSum(
q, Lambda(t, t*log(h.as_expr())), quadratic=True)
result += eps
return coeff*result
def ratint_ratpart(f, g, x):
"""
Horowitz-Ostrogradsky algorithm.
Given a field K and polynomials f and g in K[x], such that f and g
are coprime and deg(f) < deg(g), returns fractions A and B in K(x),
such that f/g = A' + B and B has square-free denominator.
Examples
========
>>> from sympy.integrals.rationaltools import ratint_ratpart
>>> from sympy.abc import x, y
>>> from sympy import Poly
>>> ratint_ratpart(Poly(1, x, domain='ZZ'),
... Poly(x + 1, x, domain='ZZ'), x)
(0, 1/(x + 1))
>>> ratint_ratpart(Poly(1, x, domain='EX'),
... Poly(x**2 + y**2, x, domain='EX'), x)
(0, 1/(x**2 + y**2))
>>> ratint_ratpart(Poly(36, x, domain='ZZ'),
... Poly(x**5 - 2*x**4 - 2*x**3 + 4*x**2 + x - 2, x, domain='ZZ'), x)
((12*x + 6)/(x**2 - 1), 12/(x**2 - x - 2))
See Also
========
ratint, ratint_logpart
"""
from sympy import solve
f = Poly(f, x)
g = Poly(g, x)
u, v, _ = g.cofactors(g.diff())
n = u.degree()
m = v.degree()
A_coeffs = [ Dummy('a' + str(n - i)) for i in range(0, n) ]
B_coeffs = [ Dummy('b' + str(m - i)) for i in range(0, m) ]
C_coeffs = A_coeffs + B_coeffs
A = Poly(A_coeffs, x, domain=ZZ[C_coeffs])
B = Poly(B_coeffs, x, domain=ZZ[C_coeffs])
H = f - A.diff()*v + A*(u.diff()*v).quo(u) - B*u
result = solve(H.coeffs(), C_coeffs)
A = A.as_expr().subs(result)
B = B.as_expr().subs(result)
rat_part = cancel(A/u.as_expr(), x)
log_part = cancel(B/v.as_expr(), x)
return rat_part, log_part
def ratint_logpart(f, g, x, t=None):
r"""
Lazard-Rioboo-Trager algorithm.
Given a field K and polynomials f and g in K[x], such that f and g
are coprime, deg(f) < deg(g) and g is square-free, returns a list
of tuples (s_i, q_i) of polynomials, for i = 1..n, such that s_i
in K[t, x] and q_i in K[t], and::
___ ___
d f d \ ` \ `
-- - = -- ) ) a log(s_i(a, x))
dx g dx /__, /__,
i=1..n a | q_i(a) = 0
Examples
========
>>> from sympy.integrals.rationaltools import ratint_logpart
>>> from sympy.abc import x
>>> from sympy import Poly
>>> ratint_logpart(Poly(1, x, domain='ZZ'),
... Poly(x**2 + x + 1, x, domain='ZZ'), x)
[(Poly(x + 3*_t/2 + 1/2, x, domain='QQ[_t]'),
...Poly(3*_t**2 + 1, _t, domain='ZZ'))]
>>> ratint_logpart(Poly(12, x, domain='ZZ'),
... Poly(x**2 - x - 2, x, domain='ZZ'), x)
[(Poly(x - 3*_t/8 - 1/2, x, domain='QQ[_t]'),
...Poly(-_t**2 + 16, _t, domain='ZZ'))]
See Also
========
ratint, ratint_ratpart
"""
f, g = Poly(f, x), Poly(g, x)
t = t or Dummy('t')
a, b = g, f - g.diff()*Poly(t, x)
res, R = resultant(a, b, includePRS=True)
res = Poly(res, t, composite=False)
assert res, "BUG: resultant(%s, %s) can't be zero" % (a, b)
R_map, H = {}, []
for r in R:
R_map[r.degree()] = r
def _include_sign(c, sqf):
if c.is_extended_real and (c < 0) == True:
h, k = sqf[0]
c_poly = c.as_poly(h.gens)
sqf[0] = h*c_poly, k
C, res_sqf = res.sqf_list()
_include_sign(C, res_sqf)
for q, i in res_sqf:
_, q = q.primitive()
if g.degree() == i:
H.append((g, q))
else:
h = R_map[i]
h_lc = Poly(h.LC(), t, field=True)
c, h_lc_sqf = h_lc.sqf_list(all=True)
_include_sign(c, h_lc_sqf)
for a, j in h_lc_sqf:
h = h.quo(Poly(a.gcd(q)**j, x))
inv, coeffs = h_lc.invert(q), [S.One]
for coeff in h.coeffs()[1:]:
coeff = coeff.as_poly(inv.gens)
T = (inv*coeff).rem(q)
coeffs.append(T.as_expr())
h = Poly(dict(list(zip(h.monoms(), coeffs))), x)
H.append((h, q))
return H
def log_to_atan(f, g):
"""
Convert complex logarithms to real arctangents.
Given a real field K and polynomials f and g in K[x], with g != 0,
returns a sum h of arctangents of polynomials in K[x], such that:
dh d f + I g
-- = -- I log( ------- )
dx dx f - I g
Examples
========
>>> from sympy.integrals.rationaltools import log_to_atan
>>> from sympy.abc import x
>>> from sympy import Poly, sqrt, S
>>> log_to_atan(Poly(x, x, domain='ZZ'), Poly(1, x, domain='ZZ'))
2*atan(x)
>>> log_to_atan(Poly(x + S(1)/2, x, domain='QQ'),
... Poly(sqrt(3)/2, x, domain='EX'))
2*atan(2*sqrt(3)*x/3 + sqrt(3)/3)
See Also
========
log_to_real
"""
if f.degree() < g.degree():
f, g = -g, f
f = f.to_field()
g = g.to_field()
p, q = f.div(g)
if q.is_zero:
return 2*atan(p.as_expr())
else:
s, t, h = g.gcdex(-f)
u = (f*s + g*t).quo(h)
A = 2*atan(u.as_expr())
return A + log_to_atan(s, t)
def log_to_real(h, q, x, t):
r"""
Convert complex logarithms to real functions.
Given real field K and polynomials h in K[t,x] and q in K[t],
returns real function f such that:
___
df d \ `
-- = -- ) a log(h(a, x))
dx dx /__,
a | q(a) = 0
Examples
========
>>> from sympy.integrals.rationaltools import log_to_real
>>> from sympy.abc import x, y
>>> from sympy import Poly, sqrt, S
>>> log_to_real(Poly(x + 3*y/2 + S(1)/2, x, domain='QQ[y]'),
... Poly(3*y**2 + 1, y, domain='ZZ'), x, y)
2*sqrt(3)*atan(2*sqrt(3)*x/3 + sqrt(3)/3)/3
>>> log_to_real(Poly(x**2 - 1, x, domain='ZZ'),
... Poly(-2*y + 1, y, domain='ZZ'), x, y)
log(x**2 - 1)/2
See Also
========
log_to_atan
"""
from sympy import collect
u, v = symbols('u,v', cls=Dummy)
H = h.as_expr().subs({t: u + I*v}).expand()
Q = q.as_expr().subs({t: u + I*v}).expand()
H_map = collect(H, I, evaluate=False)
Q_map = collect(Q, I, evaluate=False)
a, b = H_map.get(S.One, S.Zero), H_map.get(I, S.Zero)
c, d = Q_map.get(S.One, S.Zero), Q_map.get(I, S.Zero)
R = Poly(resultant(c, d, v), u)
R_u = roots(R, filter='R')
if len(R_u) != R.count_roots():
return None
result = S.Zero
for r_u in R_u.keys():
C = Poly(c.subs({u: r_u}), v)
R_v = roots(C, filter='R')
if len(R_v) != C.count_roots():
return None
R_v_paired = [] # take one from each pair of conjugate roots
for r_v in R_v:
if r_v not in R_v_paired and -r_v not in R_v_paired:
if r_v.is_negative or r_v.could_extract_minus_sign():
R_v_paired.append(-r_v)
elif not r_v.is_zero:
R_v_paired.append(r_v)
for r_v in R_v_paired:
D = d.subs({u: r_u, v: r_v})
if D.evalf(chop=True) != 0:
continue
A = Poly(a.subs({u: r_u, v: r_v}), x)
B = Poly(b.subs({u: r_u, v: r_v}), x)
AB = (A**2 + B**2).as_expr()
result += r_u*log(AB) + r_v*log_to_atan(A, B)
R_q = roots(q, filter='R')
if len(R_q) != q.count_roots():
return None
for r in R_q.keys():
result += r*log(h.as_expr().subs(t, r))
return result
|
176a3c51effcafdb98c712ac24592a3e03b2be3410788de7c94ecc169fe4a915 | """
Algorithms for solving Parametric Risch Differential Equations.
The methods used for solving Parametric Risch Differential Equations parallel
those for solving Risch Differential Equations. See the outline in the
docstring of rde.py for more information.
The Parametric Risch Differential Equation problem is, given f, g1, ..., gm in
K(t), to determine if there exist y in K(t) and c1, ..., cm in Const(K) such
that Dy + f*y == Sum(ci*gi, (i, 1, m)), and to find such y and ci if they exist.
For the algorithms here G is a list of tuples of factions of the terms on the
right hand side of the equation (i.e., gi in k(t)), and Q is a list of terms on
the right hand side of the equation (i.e., qi in k[t]). See the docstring of
each function for more information.
"""
from __future__ import print_function, division
from sympy.core import Dummy, ilcm, Add, Mul, Pow, S
from sympy.core.compatibility import reduce
from sympy.integrals.rde import (order_at, order_at_oo, weak_normalizer,
bound_degree)
from sympy.integrals.risch import (gcdex_diophantine, frac_in, derivation,
residue_reduce, splitfactor, residue_reduce_derivation, DecrementLevel,
recognize_log_derivative)
from sympy.matrices import zeros, eye
from sympy.polys import Poly, lcm, cancel, sqf_list
from sympy.polys.polymatrix import PolyMatrix as Matrix
from sympy.solvers import solve
def prde_normal_denom(fa, fd, G, DE):
"""
Parametric Risch Differential Equation - Normal part of the denominator.
Given a derivation D on k[t] and f, g1, ..., gm in k(t) with f weakly
normalized with respect to t, return the tuple (a, b, G, h) such that
a, h in k[t], b in k<t>, G = [g1, ..., gm] in k(t)^m, and for any solution
c1, ..., cm in Const(k) and y in k(t) of Dy + f*y == Sum(ci*gi, (i, 1, m)),
q == y*h in k<t> satisfies a*Dq + b*q == Sum(ci*Gi, (i, 1, m)).
"""
dn, ds = splitfactor(fd, DE)
Gas, Gds = list(zip(*G))
gd = reduce(lambda i, j: i.lcm(j), Gds, Poly(1, DE.t))
en, es = splitfactor(gd, DE)
p = dn.gcd(en)
h = en.gcd(en.diff(DE.t)).quo(p.gcd(p.diff(DE.t)))
a = dn*h
c = a*h
ba = a*fa - dn*derivation(h, DE)*fd
ba, bd = ba.cancel(fd, include=True)
G = [(c*A).cancel(D, include=True) for A, D in G]
return (a, (ba, bd), G, h)
def real_imag(ba, bd, gen):
"""
Helper function, to get the real and imaginary part of a rational function
evaluated at sqrt(-1) without actually evaluating it at sqrt(-1)
Separates the even and odd power terms by checking the degree of terms wrt
mod 4. Returns a tuple (ba[0], ba[1], bd) where ba[0] is real part
of the numerator ba[1] is the imaginary part and bd is the denominator
of the rational function.
"""
bd = bd.as_poly(gen).as_dict()
ba = ba.as_poly(gen).as_dict()
denom_real = [value if key[0] % 4 == 0 else -value if key[0] % 4 == 2 else 0 for key, value in bd.items()]
denom_imag = [value if key[0] % 4 == 1 else -value if key[0] % 4 == 3 else 0 for key, value in bd.items()]
bd_real = sum(r for r in denom_real)
bd_imag = sum(r for r in denom_imag)
num_real = [value if key[0] % 4 == 0 else -value if key[0] % 4 == 2 else 0 for key, value in ba.items()]
num_imag = [value if key[0] % 4 == 1 else -value if key[0] % 4 == 3 else 0 for key, value in ba.items()]
ba_real = sum(r for r in num_real)
ba_imag = sum(r for r in num_imag)
ba = ((ba_real*bd_real + ba_imag*bd_imag).as_poly(gen), (ba_imag*bd_real - ba_real*bd_imag).as_poly(gen))
bd = (bd_real*bd_real + bd_imag*bd_imag).as_poly(gen)
return (ba[0], ba[1], bd)
def prde_special_denom(a, ba, bd, G, DE, case='auto'):
"""
Parametric Risch Differential Equation - Special part of the denominator.
case is one of {'exp', 'tan', 'primitive'} for the hyperexponential,
hypertangent, and primitive cases, respectively. For the hyperexponential
(resp. hypertangent) case, given a derivation D on k[t] and a in k[t],
b in k<t>, and g1, ..., gm in k(t) with Dt/t in k (resp. Dt/(t**2 + 1) in
k, sqrt(-1) not in k), a != 0, and gcd(a, t) == 1 (resp.
gcd(a, t**2 + 1) == 1), return the tuple (A, B, GG, h) such that A, B, h in
k[t], GG = [gg1, ..., ggm] in k(t)^m, and for any solution c1, ..., cm in
Const(k) and q in k<t> of a*Dq + b*q == Sum(ci*gi, (i, 1, m)), r == q*h in
k[t] satisfies A*Dr + B*r == Sum(ci*ggi, (i, 1, m)).
For case == 'primitive', k<t> == k[t], so it returns (a, b, G, 1) in this
case.
"""
# TODO: Merge this with the very similar special_denom() in rde.py
if case == 'auto':
case = DE.case
if case == 'exp':
p = Poly(DE.t, DE.t)
elif case == 'tan':
p = Poly(DE.t**2 + 1, DE.t)
elif case in ['primitive', 'base']:
B = ba.quo(bd)
return (a, B, G, Poly(1, DE.t))
else:
raise ValueError("case must be one of {'exp', 'tan', 'primitive', "
"'base'}, not %s." % case)
nb = order_at(ba, p, DE.t) - order_at(bd, p, DE.t)
nc = min([order_at(Ga, p, DE.t) - order_at(Gd, p, DE.t) for Ga, Gd in G])
n = min(0, nc - min(0, nb))
if not nb:
# Possible cancellation.
if case == 'exp':
dcoeff = DE.d.quo(Poly(DE.t, DE.t))
with DecrementLevel(DE): # We are guaranteed to not have problems,
# because case != 'base'.
alphaa, alphad = frac_in(-ba.eval(0)/bd.eval(0)/a.eval(0), DE.t)
etaa, etad = frac_in(dcoeff, DE.t)
A = parametric_log_deriv(alphaa, alphad, etaa, etad, DE)
if A is not None:
Q, m, z = A
if Q == 1:
n = min(n, m)
elif case == 'tan':
dcoeff = DE.d.quo(Poly(DE.t**2 + 1, DE.t))
with DecrementLevel(DE): # We are guaranteed to not have problems,
# because case != 'base'.
betaa, alphaa, alphad = real_imag(ba, bd*a, DE.t)
betad = alphad
etaa, etad = frac_in(dcoeff, DE.t)
if recognize_log_derivative(Poly(2, DE.t)*betaa, betad, DE):
A = parametric_log_deriv(alphaa, alphad, etaa, etad, DE)
B = parametric_log_deriv(betaa, betad, etaa, etad, DE)
if A is not None and B is not None:
Q, s, z = A
# TODO: Add test
if Q == 1:
n = min(n, s/2)
N = max(0, -nb)
pN = p**N
pn = p**-n # This is 1/h
A = a*pN
B = ba*pN.quo(bd) + Poly(n, DE.t)*a*derivation(p, DE).quo(p)*pN
G = [(Ga*pN*pn).cancel(Gd, include=True) for Ga, Gd in G]
h = pn
# (a*p**N, (b + n*a*Dp/p)*p**N, g1*p**(N - n), ..., gm*p**(N - n), p**-n)
return (A, B, G, h)
def prde_linear_constraints(a, b, G, DE):
"""
Parametric Risch Differential Equation - Generate linear constraints on the constants.
Given a derivation D on k[t], a, b, in k[t] with gcd(a, b) == 1, and
G = [g1, ..., gm] in k(t)^m, return Q = [q1, ..., qm] in k[t]^m and a
matrix M with entries in k(t) such that for any solution c1, ..., cm in
Const(k) and p in k[t] of a*Dp + b*p == Sum(ci*gi, (i, 1, m)),
(c1, ..., cm) is a solution of Mx == 0, and p and the ci satisfy
a*Dp + b*p == Sum(ci*qi, (i, 1, m)).
Because M has entries in k(t), and because Matrix doesn't play well with
Poly, M will be a Matrix of Basic expressions.
"""
m = len(G)
Gns, Gds = list(zip(*G))
d = reduce(lambda i, j: i.lcm(j), Gds)
d = Poly(d, field=True)
Q = [(ga*(d).quo(gd)).div(d) for ga, gd in G]
if not all([ri.is_zero for _, ri in Q]):
N = max([ri.degree(DE.t) for _, ri in Q])
M = Matrix(N + 1, m, lambda i, j: Q[j][1].nth(i))
else:
M = Matrix(0, m, []) # No constraints, return the empty matrix.
qs, _ = list(zip(*Q))
return (qs, M)
def poly_linear_constraints(p, d):
"""
Given p = [p1, ..., pm] in k[t]^m and d in k[t], return
q = [q1, ..., qm] in k[t]^m and a matrix M with entries in k such
that Sum(ci*pi, (i, 1, m)), for c1, ..., cm in k, is divisible
by d if and only if (c1, ..., cm) is a solution of Mx = 0, in
which case the quotient is Sum(ci*qi, (i, 1, m)).
"""
m = len(p)
q, r = zip(*[pi.div(d) for pi in p])
if not all([ri.is_zero for ri in r]):
n = max([ri.degree() for ri in r])
M = Matrix(n + 1, m, lambda i, j: r[j].nth(i))
else:
M = Matrix(0, m, []) # No constraints.
return q, M
def constant_system(A, u, DE):
"""
Generate a system for the constant solutions.
Given a differential field (K, D) with constant field C = Const(K), a Matrix
A, and a vector (Matrix) u with coefficients in K, returns the tuple
(B, v, s), where B is a Matrix with coefficients in C and v is a vector
(Matrix) such that either v has coefficients in C, in which case s is True
and the solutions in C of Ax == u are exactly all the solutions of Bx == v,
or v has a non-constant coefficient, in which case s is False Ax == u has no
constant solution.
This algorithm is used both in solving parametric problems and in
determining if an element a of K is a derivative of an element of K or the
logarithmic derivative of a K-radical using the structure theorem approach.
Because Poly does not play well with Matrix yet, this algorithm assumes that
all matrix entries are Basic expressions.
"""
if not A:
return A, u
Au = A.row_join(u)
Au = Au.rref(simplify=cancel, normalize_last=False)[0]
# Warning: This will NOT return correct results if cancel() cannot reduce
# an identically zero expression to 0. The danger is that we might
# incorrectly prove that an integral is nonelementary (such as
# risch_integrate(exp((sin(x)**2 + cos(x)**2 - 1)*x**2), x).
# But this is a limitation in computer algebra in general, and implicit
# in the correctness of the Risch Algorithm is the computability of the
# constant field (actually, this same correctness problem exists in any
# algorithm that uses rref()).
#
# We therefore limit ourselves to constant fields that are computable
# via the cancel() function, in order to prevent a speed bottleneck from
# calling some more complex simplification function (rational function
# coefficients will fall into this class). Furthermore, (I believe) this
# problem will only crop up if the integral explicitly contains an
# expression in the constant field that is identically zero, but cannot
# be reduced to such by cancel(). Therefore, a careful user can avoid this
# problem entirely by being careful with the sorts of expressions that
# appear in his integrand in the variables other than the integration
# variable (the structure theorems should be able to completely decide these
# problems in the integration variable).
Au = Au.applyfunc(cancel)
A, u = Au[:, :-1], Au[:, -1]
for j in range(A.cols):
for i in range(A.rows):
if A[i, j].has(*DE.T):
# This assumes that const(F(t0, ..., tn) == const(K) == F
Ri = A[i, :]
# Rm+1; m = A.rows
Rm1 = Ri.applyfunc(lambda x: derivation(x, DE, basic=True)/
derivation(A[i, j], DE, basic=True))
Rm1 = Rm1.applyfunc(cancel)
um1 = cancel(derivation(u[i], DE, basic=True)/
derivation(A[i, j], DE, basic=True))
for s in range(A.rows):
# A[s, :] = A[s, :] - A[s, i]*A[:, m+1]
Asj = A[s, j]
A.row_op(s, lambda r, jj: cancel(r - Asj*Rm1[jj]))
# u[s] = u[s] - A[s, j]*u[m+1
u.row_op(s, lambda r, jj: cancel(r - Asj*um1))
A = A.col_join(Rm1)
u = u.col_join(Matrix([um1]))
return (A, u)
def prde_spde(a, b, Q, n, DE):
"""
Special Polynomial Differential Equation algorithm: Parametric Version.
Given a derivation D on k[t], an integer n, and a, b, q1, ..., qm in k[t]
with deg(a) > 0 and gcd(a, b) == 1, return (A, B, Q, R, n1), with
Qq = [q1, ..., qm] and R = [r1, ..., rm], such that for any solution
c1, ..., cm in Const(k) and q in k[t] of degree at most n of
a*Dq + b*q == Sum(ci*gi, (i, 1, m)), p = (q - Sum(ci*ri, (i, 1, m)))/a has
degree at most n1 and satisfies A*Dp + B*p == Sum(ci*qi, (i, 1, m))
"""
R, Z = list(zip(*[gcdex_diophantine(b, a, qi) for qi in Q]))
A = a
B = b + derivation(a, DE)
Qq = [zi - derivation(ri, DE) for ri, zi in zip(R, Z)]
R = list(R)
n1 = n - a.degree(DE.t)
return (A, B, Qq, R, n1)
def prde_no_cancel_b_large(b, Q, n, DE):
"""
Parametric Poly Risch Differential Equation - No cancellation: deg(b) large enough.
Given a derivation D on k[t], n in ZZ, and b, q1, ..., qm in k[t] with
b != 0 and either D == d/dt or deg(b) > max(0, deg(D) - 1), returns
h1, ..., hr in k[t] and a matrix A with coefficients in Const(k) such that
if c1, ..., cm in Const(k) and q in k[t] satisfy deg(q) <= n and
Dq + b*q == Sum(ci*qi, (i, 1, m)), then q = Sum(dj*hj, (j, 1, r)), where
d1, ..., dr in Const(k) and A*Matrix([[c1, ..., cm, d1, ..., dr]]).T == 0.
"""
db = b.degree(DE.t)
m = len(Q)
H = [Poly(0, DE.t)]*m
for N in range(n, -1, -1): # [n, ..., 0]
for i in range(m):
si = Q[i].nth(N + db)/b.LC()
sitn = Poly(si*DE.t**N, DE.t)
H[i] = H[i] + sitn
Q[i] = Q[i] - derivation(sitn, DE) - b*sitn
if all(qi.is_zero for qi in Q):
dc = -1
M = zeros(0, 2)
else:
dc = max([qi.degree(DE.t) for qi in Q])
M = Matrix(dc + 1, m, lambda i, j: Q[j].nth(i))
A, u = constant_system(M, zeros(dc + 1, 1), DE)
c = eye(m)
A = A.row_join(zeros(A.rows, m)).col_join(c.row_join(-c))
return (H, A)
def prde_no_cancel_b_small(b, Q, n, DE):
"""
Parametric Poly Risch Differential Equation - No cancellation: deg(b) small enough.
Given a derivation D on k[t], n in ZZ, and b, q1, ..., qm in k[t] with
deg(b) < deg(D) - 1 and either D == d/dt or deg(D) >= 2, returns
h1, ..., hr in k[t] and a matrix A with coefficients in Const(k) such that
if c1, ..., cm in Const(k) and q in k[t] satisfy deg(q) <= n and
Dq + b*q == Sum(ci*qi, (i, 1, m)) then q = Sum(dj*hj, (j, 1, r)) where
d1, ..., dr in Const(k) and A*Matrix([[c1, ..., cm, d1, ..., dr]]).T == 0.
"""
m = len(Q)
H = [Poly(0, DE.t)]*m
for N in range(n, 0, -1): # [n, ..., 1]
for i in range(m):
si = Q[i].nth(N + DE.d.degree(DE.t) - 1)/(N*DE.d.LC())
sitn = Poly(si*DE.t**N, DE.t)
H[i] = H[i] + sitn
Q[i] = Q[i] - derivation(sitn, DE) - b*sitn
if b.degree(DE.t) > 0:
for i in range(m):
si = Poly(Q[i].nth(b.degree(DE.t))/b.LC(), DE.t)
H[i] = H[i] + si
Q[i] = Q[i] - derivation(si, DE) - b*si
if all(qi.is_zero for qi in Q):
dc = -1
M = Matrix()
else:
dc = max([qi.degree(DE.t) for qi in Q])
M = Matrix(dc + 1, m, lambda i, j: Q[j].nth(i))
A, u = constant_system(M, zeros(dc + 1, 1), DE)
c = eye(m)
A = A.row_join(zeros(A.rows, m)).col_join(c.row_join(-c))
return (H, A)
# else: b is in k, deg(qi) < deg(Dt)
t = DE.t
if DE.case != 'base':
with DecrementLevel(DE):
t0 = DE.t # k = k0(t0)
ba, bd = frac_in(b, t0, field=True)
Q0 = [frac_in(qi.TC(), t0, field=True) for qi in Q]
f, B = param_rischDE(ba, bd, Q0, DE)
# f = [f1, ..., fr] in k^r and B is a matrix with
# m + r columns and entries in Const(k) = Const(k0)
# such that Dy0 + b*y0 = Sum(ci*qi, (i, 1, m)) has
# a solution y0 in k with c1, ..., cm in Const(k)
# if and only y0 = Sum(dj*fj, (j, 1, r)) where
# d1, ..., dr ar in Const(k) and
# B*Matrix([c1, ..., cm, d1, ..., dr]) == 0.
# Transform fractions (fa, fd) in f into constant
# polynomials fa/fd in k[t].
# (Is there a better way?)
f = [Poly(fa.as_expr()/fd.as_expr(), t, field=True)
for fa, fd in f]
else:
# Base case. Dy == 0 for all y in k and b == 0.
# Dy + b*y = Sum(ci*qi) is solvable if and only if
# Sum(ci*qi) == 0 in which case the solutions are
# y = d1*f1 for f1 = 1 and any d1 in Const(k) = k.
f = [Poly(1, t, field=True)] # r = 1
B = Matrix([[qi.TC() for qi in Q] + [S.Zero]])
# The condition for solvability is
# B*Matrix([c1, ..., cm, d1]) == 0
# There are no constraints on d1.
# Coefficients of t^j (j > 0) in Sum(ci*qi) must be zero.
d = max([qi.degree(DE.t) for qi in Q])
if d > 0:
M = Matrix(d, m, lambda i, j: Q[j].nth(i + 1))
A, _ = constant_system(M, zeros(d, 1), DE)
else:
# No constraints on the hj.
A = Matrix(0, m, [])
# Solutions of the original equation are
# y = Sum(dj*fj, (j, 1, r) + Sum(ei*hi, (i, 1, m)),
# where ei == ci (i = 1, ..., m), when
# A*Matrix([c1, ..., cm]) == 0 and
# B*Matrix([c1, ..., cm, d1, ..., dr]) == 0
# Build combined constraint matrix with m + r + m columns.
r = len(f)
I = eye(m)
A = A.row_join(zeros(A.rows, r + m))
B = B.row_join(zeros(B.rows, m))
C = I.row_join(zeros(m, r)).row_join(-I)
return f + H, A.col_join(B).col_join(C)
def prde_cancel_liouvillian(b, Q, n, DE):
"""
Pg, 237.
"""
H = []
# Why use DecrementLevel? Below line answers that:
# Assuming that we can solve such problems over 'k' (not k[t])
if DE.case == 'primitive':
with DecrementLevel(DE):
ba, bd = frac_in(b, DE.t, field=True)
for i in range(n, -1, -1):
if DE.case == 'exp': # this re-checking can be avoided
with DecrementLevel(DE):
ba, bd = frac_in(b + (i*(derivation(DE.t, DE)/DE.t)).as_poly(b.gens),
DE.t, field=True)
with DecrementLevel(DE):
Qy = [frac_in(q.nth(i), DE.t, field=True) for q in Q]
fi, Ai = param_rischDE(ba, bd, Qy, DE)
fi = [Poly(fa.as_expr()/fd.as_expr(), DE.t, field=True)
for fa, fd in fi]
ri = len(fi)
if i == n:
M = Ai
else:
M = Ai.col_join(M.row_join(zeros(M.rows, ri)))
Fi, hi = [None]*ri, [None]*ri
# from eq. on top of p.238 (unnumbered)
for j in range(ri):
hji = fi[j] * (DE.t**i).as_poly(fi[j].gens)
hi[j] = hji
# building up Sum(djn*(D(fjn*t^n) - b*fjnt^n))
Fi[j] = -(derivation(hji, DE) - b*hji)
H += hi
# in the next loop instead of Q it has
# to be Q + Fi taking its place
Q = Q + Fi
return (H, M)
def param_poly_rischDE(a, b, q, n, DE):
"""Polynomial solutions of a parametric Risch differential equation.
Given a derivation D in k[t], a, b in k[t] relatively prime, and q
= [q1, ..., qm] in k[t]^m, return h = [h1, ..., hr] in k[t]^r and
a matrix A with m + r columns and entries in Const(k) such that
a*Dp + b*p = Sum(ci*qi, (i, 1, m)) has a solution p of degree <= n
in k[t] with c1, ..., cm in Const(k) if and only if p = Sum(dj*hj,
(j, 1, r)) where d1, ..., dr are in Const(k) and (c1, ..., cm,
d1, ..., dr) is a solution of Ax == 0.
"""
m = len(q)
if n < 0:
# Only the trivial zero solution is possible.
# Find relations between the qi.
if all([qi.is_zero for qi in q]):
return [], zeros(1, m) # No constraints.
N = max([qi.degree(DE.t) for qi in q])
M = Matrix(N + 1, m, lambda i, j: q[j].nth(i))
A, _ = constant_system(M, zeros(M.rows, 1), DE)
return [], A
if a.is_ground:
# Normalization: a = 1.
a = a.LC()
b, q = b.quo_ground(a), [qi.quo_ground(a) for qi in q]
if not b.is_zero and (DE.case == 'base' or
b.degree() > max(0, DE.d.degree() - 1)):
return prde_no_cancel_b_large(b, q, n, DE)
elif ((b.is_zero or b.degree() < DE.d.degree() - 1)
and (DE.case == 'base' or DE.d.degree() >= 2)):
return prde_no_cancel_b_small(b, q, n, DE)
elif (DE.d.degree() >= 2 and
b.degree() == DE.d.degree() - 1 and
n > -b.as_poly().LC()/DE.d.as_poly().LC()):
raise NotImplementedError("prde_no_cancel_b_equal() is "
"not yet implemented.")
else:
# Liouvillian cases
if DE.case == 'primitive' or DE.case == 'exp':
return prde_cancel_liouvillian(b, q, n, DE)
else:
raise NotImplementedError("non-linear and hypertangent "
"cases have not yet been implemented")
# else: deg(a) > 0
# Iterate SPDE as long as possible cumulating coefficient
# and terms for the recovery of original solutions.
alpha, beta = a.one, [a.zero]*m
while n >= 0: # and a, b relatively prime
a, b, q, r, n = prde_spde(a, b, q, n, DE)
beta = [betai + alpha*ri for betai, ri in zip(beta, r)]
alpha *= a
# Solutions p of a*Dp + b*p = Sum(ci*qi) correspond to
# solutions alpha*p + Sum(ci*betai) of the initial equation.
d = a.gcd(b)
if not d.is_ground:
break
# a*Dp + b*p = Sum(ci*qi) may have a polynomial solution
# only if the sum is divisible by d.
qq, M = poly_linear_constraints(q, d)
# qq = [qq1, ..., qqm] where qqi = qi.quo(d).
# M is a matrix with m columns an entries in k.
# Sum(fi*qi, (i, 1, m)), where f1, ..., fm are elements of k, is
# divisible by d if and only if M*Matrix([f1, ..., fm]) == 0,
# in which case the quotient is Sum(fi*qqi).
A, _ = constant_system(M, zeros(M.rows, 1), DE)
# A is a matrix with m columns and entries in Const(k).
# Sum(ci*qqi) is Sum(ci*qi).quo(d), and the remainder is zero
# for c1, ..., cm in Const(k) if and only if
# A*Matrix([c1, ...,cm]) == 0.
V = A.nullspace()
# V = [v1, ..., vu] where each vj is a column matrix with
# entries aj1, ..., ajm in Const(k).
# Sum(aji*qi) is divisible by d with exact quotient Sum(aji*qqi).
# Sum(ci*qi) is divisible by d if and only if ci = Sum(dj*aji)
# (i = 1, ..., m) for some d1, ..., du in Const(k).
# In that case, solutions of
# a*Dp + b*p = Sum(ci*qi) = Sum(dj*Sum(aji*qi))
# are the same as those of
# (a/d)*Dp + (b/d)*p = Sum(dj*rj)
# where rj = Sum(aji*qqi).
if not V: # No non-trivial solution.
return [], eye(m) # Could return A, but this has
# the minimum number of rows.
Mqq = Matrix([qq]) # A single row.
r = [(Mqq*vj)[0] for vj in V] # [r1, ..., ru]
# Solutions of (a/d)*Dp + (b/d)*p = Sum(dj*rj) correspond to
# solutions alpha*p + Sum(Sum(dj*aji)*betai) of the initial
# equation. These are equal to alpha*p + Sum(dj*fj) where
# fj = Sum(aji*betai).
Mbeta = Matrix([beta])
f = [(Mbeta*vj)[0] for vj in V] # [f1, ..., fu]
#
# Solve the reduced equation recursively.
#
g, B = param_poly_rischDE(a.quo(d), b.quo(d), r, n, DE)
# g = [g1, ..., gv] in k[t]^v and and B is a matrix with u + v
# columns and entries in Const(k) such that
# (a/d)*Dp + (b/d)*p = Sum(dj*rj) has a solution p of degree <= n
# in k[t] if and only if p = Sum(ek*gk) where e1, ..., ev are in
# Const(k) and B*Matrix([d1, ..., du, e1, ..., ev]) == 0.
# The solutions of the original equation are then
# Sum(dj*fj, (j, 1, u)) + alpha*Sum(ek*gk, (k, 1, v)).
# Collect solution components.
h = f + [alpha*gk for gk in g]
# Build combined relation matrix.
A = -eye(m)
for vj in V:
A = A.row_join(vj)
A = A.row_join(zeros(m, len(g)))
A = A.col_join(zeros(B.rows, m).row_join(B))
return h, A
def param_rischDE(fa, fd, G, DE):
"""
Solve a Parametric Risch Differential Equation: Dy + f*y == Sum(ci*Gi, (i, 1, m)).
Given a derivation D in k(t), f in k(t), and G
= [G1, ..., Gm] in k(t)^m, return h = [h1, ..., hr] in k(t)^r and
a matrix A with m + r columns and entries in Const(k) such that
Dy + f*y = Sum(ci*Gi, (i, 1, m)) has a solution y
in k(t) with c1, ..., cm in Const(k) if and only if y = Sum(dj*hj,
(j, 1, r)) where d1, ..., dr are in Const(k) and (c1, ..., cm,
d1, ..., dr) is a solution of Ax == 0.
Elements of k(t) are tuples (a, d) with a and d in k[t].
"""
m = len(G)
q, (fa, fd) = weak_normalizer(fa, fd, DE)
# Solutions of the weakly normalized equation Dz + f*z = q*Sum(ci*Gi)
# correspond to solutions y = z/q of the original equation.
gamma = q
G = [(q*ga).cancel(gd, include=True) for ga, gd in G]
a, (ba, bd), G, hn = prde_normal_denom(fa, fd, G, DE)
# Solutions q in k<t> of a*Dq + b*q = Sum(ci*Gi) correspond
# to solutions z = q/hn of the weakly normalized equation.
gamma *= hn
A, B, G, hs = prde_special_denom(a, ba, bd, G, DE)
# Solutions p in k[t] of A*Dp + B*p = Sum(ci*Gi) correspond
# to solutions q = p/hs of the previous equation.
gamma *= hs
g = A.gcd(B)
a, b, g = A.quo(g), B.quo(g), [gia.cancel(gid*g, include=True) for
gia, gid in G]
# a*Dp + b*p = Sum(ci*gi) may have a polynomial solution
# only if the sum is in k[t].
q, M = prde_linear_constraints(a, b, g, DE)
# q = [q1, ..., qm] where qi in k[t] is the polynomial component
# of the partial fraction expansion of gi.
# M is a matrix with m columns and entries in k.
# Sum(fi*gi, (i, 1, m)), where f1, ..., fm are elements of k,
# is a polynomial if and only if M*Matrix([f1, ..., fm]) == 0,
# in which case the sum is equal to Sum(fi*qi).
M, _ = constant_system(M, zeros(M.rows, 1), DE)
# M is a matrix with m columns and entries in Const(k).
# Sum(ci*gi) is in k[t] for c1, ..., cm in Const(k)
# if and only if M*Matrix([c1, ..., cm]) == 0,
# in which case the sum is Sum(ci*qi).
## Reduce number of constants at this point
V = M.nullspace()
# V = [v1, ..., vu] where each vj is a column matrix with
# entries aj1, ..., ajm in Const(k).
# Sum(aji*gi) is in k[t] and equal to Sum(aji*qi) (j = 1, ..., u).
# Sum(ci*gi) is in k[t] if and only is ci = Sum(dj*aji)
# (i = 1, ..., m) for some d1, ..., du in Const(k).
# In that case,
# Sum(ci*gi) = Sum(ci*qi) = Sum(dj*Sum(aji*qi)) = Sum(dj*rj)
# where rj = Sum(aji*qi) (j = 1, ..., u) in k[t].
if not V: # No non-trivial solution
return [], eye(m)
Mq = Matrix([q]) # A single row.
r = [(Mq*vj)[0] for vj in V] # [r1, ..., ru]
# Solutions of a*Dp + b*p = Sum(dj*rj) correspond to solutions
# y = p/gamma of the initial equation with ci = Sum(dj*aji).
try:
# We try n=5. At least for prde_spde, it will always
# terminate no matter what n is.
n = bound_degree(a, b, r, DE, parametric=True)
except NotImplementedError:
# A temporary bound is set. Eventually, it will be removed.
# the currently added test case takes large time
# even with n=5, and much longer with large n's.
n = 5
h, B = param_poly_rischDE(a, b, r, n, DE)
# h = [h1, ..., hv] in k[t]^v and and B is a matrix with u + v
# columns and entries in Const(k) such that
# a*Dp + b*p = Sum(dj*rj) has a solution p of degree <= n
# in k[t] if and only if p = Sum(ek*hk) where e1, ..., ev are in
# Const(k) and B*Matrix([d1, ..., du, e1, ..., ev]) == 0.
# The solutions of the original equation for ci = Sum(dj*aji)
# (i = 1, ..., m) are then y = Sum(ek*hk, (k, 1, v))/gamma.
## Build combined relation matrix with m + u + v columns.
A = -eye(m)
for vj in V:
A = A.row_join(vj)
A = A.row_join(zeros(m, len(h)))
A = A.col_join(zeros(B.rows, m).row_join(B))
## Eliminate d1, ..., du.
W = A.nullspace()
# W = [w1, ..., wt] where each wl is a column matrix with
# entries blk (k = 1, ..., m + u + v) in Const(k).
# The vectors (bl1, ..., blm) generate the space of those
# constant families (c1, ..., cm) for which a solution of
# the equation Dy + f*y == Sum(ci*Gi) exists. They generate
# the space and form a basis except possibly when Dy + f*y == 0
# is solvable in k(t}. The corresponding solutions are
# y = Sum(blk'*hk, (k, 1, v))/gamma, where k' = k + m + u.
v = len(h)
M = Matrix([wl[:m] + wl[-v:] for wl in W]) # excise dj's.
N = M.nullspace()
# N = [n1, ..., ns] where the ni in Const(k)^(m + v) are column
# vectors generating the space of linear relations between
# c1, ..., cm, e1, ..., ev.
C = Matrix([ni[:] for ni in N]) # rows n1, ..., ns.
return [hk.cancel(gamma, include=True) for hk in h], C
def limited_integrate_reduce(fa, fd, G, DE):
"""
Simpler version of step 1 & 2 for the limited integration problem.
Given a derivation D on k(t) and f, g1, ..., gn in k(t), return
(a, b, h, N, g, V) such that a, b, h in k[t], N is a non-negative integer,
g in k(t), V == [v1, ..., vm] in k(t)^m, and for any solution v in k(t),
c1, ..., cm in C of f == Dv + Sum(ci*wi, (i, 1, m)), p = v*h is in k<t>, and
p and the ci satisfy a*Dp + b*p == g + Sum(ci*vi, (i, 1, m)). Furthermore,
if S1irr == Sirr, then p is in k[t], and if t is nonlinear or Liouvillian
over k, then deg(p) <= N.
So that the special part is always computed, this function calls the more
general prde_special_denom() automatically if it cannot determine that
S1irr == Sirr. Furthermore, it will automatically call bound_degree() when
t is linear and non-Liouvillian, which for the transcendental case, implies
that Dt == a*t + b with for some a, b in k*.
"""
dn, ds = splitfactor(fd, DE)
E = [splitfactor(gd, DE) for _, gd in G]
En, Es = list(zip(*E))
c = reduce(lambda i, j: i.lcm(j), (dn,) + En) # lcm(dn, en1, ..., enm)
hn = c.gcd(c.diff(DE.t))
a = hn
b = -derivation(hn, DE)
N = 0
# These are the cases where we know that S1irr = Sirr, but there could be
# others, and this algorithm will need to be extended to handle them.
if DE.case in ['base', 'primitive', 'exp', 'tan']:
hs = reduce(lambda i, j: i.lcm(j), (ds,) + Es) # lcm(ds, es1, ..., esm)
a = hn*hs
b -= (hn*derivation(hs, DE)).quo(hs)
mu = min(order_at_oo(fa, fd, DE.t), min([order_at_oo(ga, gd, DE.t) for
ga, gd in G]))
# So far, all the above are also nonlinear or Liouvillian, but if this
# changes, then this will need to be updated to call bound_degree()
# as per the docstring of this function (DE.case == 'other_linear').
N = hn.degree(DE.t) + hs.degree(DE.t) + max(0, 1 - DE.d.degree(DE.t) - mu)
else:
# TODO: implement this
raise NotImplementedError
V = [(-a*hn*ga).cancel(gd, include=True) for ga, gd in G]
return (a, b, a, N, (a*hn*fa).cancel(fd, include=True), V)
def limited_integrate(fa, fd, G, DE):
"""
Solves the limited integration problem: f = Dv + Sum(ci*wi, (i, 1, n))
"""
fa, fd = fa*Poly(1/fd.LC(), DE.t), fd.monic()
# interpreting limited integration problem as a
# parametric Risch DE problem
Fa = Poly(0, DE.t)
Fd = Poly(1, DE.t)
G = [(fa, fd)] + G
h, A = param_rischDE(Fa, Fd, G, DE)
V = A.nullspace()
V = [v for v in V if v[0] != 0]
if not V:
return None
else:
# we can take any vector from V, we take V[0]
c0 = V[0][0]
# v = [-1, c1, ..., cm, d1, ..., dr]
v = V[0]/(-c0)
r = len(h)
m = len(v) - r - 1
C = list(v[1: m + 1])
y = -sum([v[m + 1 + i]*h[i][0].as_expr()/h[i][1].as_expr() \
for i in range(r)])
y_num, y_den = y.as_numer_denom()
Ya, Yd = Poly(y_num, DE.t), Poly(y_den, DE.t)
Y = Ya*Poly(1/Yd.LC(), DE.t), Yd.monic()
return Y, C
def parametric_log_deriv_heu(fa, fd, wa, wd, DE, c1=None):
"""
Parametric logarithmic derivative heuristic.
Given a derivation D on k[t], f in k(t), and a hyperexponential monomial
theta over k(t), raises either NotImplementedError, in which case the
heuristic failed, or returns None, in which case it has proven that no
solution exists, or returns a solution (n, m, v) of the equation
n*f == Dv/v + m*Dtheta/theta, with v in k(t)* and n, m in ZZ with n != 0.
If this heuristic fails, the structure theorem approach will need to be
used.
The argument w == Dtheta/theta
"""
# TODO: finish writing this and write tests
c1 = c1 or Dummy('c1')
p, a = fa.div(fd)
q, b = wa.div(wd)
B = max(0, derivation(DE.t, DE).degree(DE.t) - 1)
C = max(p.degree(DE.t), q.degree(DE.t))
if q.degree(DE.t) > B:
eqs = [p.nth(i) - c1*q.nth(i) for i in range(B + 1, C + 1)]
s = solve(eqs, c1)
if not s or not s[c1].is_Rational:
# deg(q) > B, no solution for c.
return None
M, N = s[c1].as_numer_denom()
M_poly = M.as_poly(q.gens)
N_poly = N.as_poly(q.gens)
nfmwa = N_poly*fa*wd - M_poly*wa*fd
nfmwd = fd*wd
Qv = is_log_deriv_k_t_radical_in_field(nfmwa, nfmwd, DE, 'auto')
if Qv is None:
# (N*f - M*w) is not the logarithmic derivative of a k(t)-radical.
return None
Q, v = Qv
if Q.is_zero or v.is_zero:
return None
return (Q*N, Q*M, v)
if p.degree(DE.t) > B:
return None
c = lcm(fd.as_poly(DE.t).LC(), wd.as_poly(DE.t).LC())
l = fd.monic().lcm(wd.monic())*Poly(c, DE.t)
ln, ls = splitfactor(l, DE)
z = ls*ln.gcd(ln.diff(DE.t))
if not z.has(DE.t):
# TODO: We treat this as 'no solution', until the structure
# theorem version of parametric_log_deriv is implemented.
return None
u1, r1 = (fa*l.quo(fd)).div(z) # (l*f).div(z)
u2, r2 = (wa*l.quo(wd)).div(z) # (l*w).div(z)
eqs = [r1.nth(i) - c1*r2.nth(i) for i in range(z.degree(DE.t))]
s = solve(eqs, c1)
if not s or not s[c1].is_Rational:
# deg(q) <= B, no solution for c.
return None
M, N = s[c1].as_numer_denom()
nfmwa = N.as_poly(DE.t)*fa*wd - M.as_poly(DE.t)*wa*fd
nfmwd = fd*wd
Qv = is_log_deriv_k_t_radical_in_field(nfmwa, nfmwd, DE)
if Qv is None:
# (N*f - M*w) is not the logarithmic derivative of a k(t)-radical.
return None
Q, v = Qv
if Q.is_zero or v.is_zero:
return None
return (Q*N, Q*M, v)
def parametric_log_deriv(fa, fd, wa, wd, DE):
# TODO: Write the full algorithm using the structure theorems.
# try:
A = parametric_log_deriv_heu(fa, fd, wa, wd, DE)
# except NotImplementedError:
# Heuristic failed, we have to use the full method.
# TODO: This could be implemented more efficiently.
# It isn't too worrisome, because the heuristic handles most difficult
# cases.
return A
def is_deriv_k(fa, fd, DE):
r"""
Checks if Df/f is the derivative of an element of k(t).
a in k(t) is the derivative of an element of k(t) if there exists b in k(t)
such that a = Db. Either returns (ans, u), such that Df/f == Du, or None,
which means that Df/f is not the derivative of an element of k(t). ans is
a list of tuples such that Add(*[i*j for i, j in ans]) == u. This is useful
for seeing exactly which elements of k(t) produce u.
This function uses the structure theorem approach, which says that for any
f in K, Df/f is the derivative of a element of K if and only if there are ri
in QQ such that::
--- --- Dt
\ r * Dt + \ r * i Df
/ i i / i --- = --.
--- --- t f
i in L i in E i
K/C(x) K/C(x)
Where C = Const(K), L_K/C(x) = { i in {1, ..., n} such that t_i is
transcendental over C(x)(t_1, ..., t_i-1) and Dt_i = Da_i/a_i, for some a_i
in C(x)(t_1, ..., t_i-1)* } (i.e., the set of all indices of logarithmic
monomials of K over C(x)), and E_K/C(x) = { i in {1, ..., n} such that t_i
is transcendental over C(x)(t_1, ..., t_i-1) and Dt_i/t_i = Da_i, for some
a_i in C(x)(t_1, ..., t_i-1) } (i.e., the set of all indices of
hyperexponential monomials of K over C(x)). If K is an elementary extension
over C(x), then the cardinality of L_K/C(x) U E_K/C(x) is exactly the
transcendence degree of K over C(x). Furthermore, because Const_D(K) ==
Const_D(C(x)) == C, deg(Dt_i) == 1 when t_i is in E_K/C(x) and
deg(Dt_i) == 0 when t_i is in L_K/C(x), implying in particular that E_K/C(x)
and L_K/C(x) are disjoint.
The sets L_K/C(x) and E_K/C(x) must, by their nature, be computed
recursively using this same function. Therefore, it is required to pass
them as indices to D (or T). E_args are the arguments of the
hyperexponentials indexed by E_K (i.e., if i is in E_K, then T[i] ==
exp(E_args[i])). This is needed to compute the final answer u such that
Df/f == Du.
log(f) will be the same as u up to a additive constant. This is because
they will both behave the same as monomials. For example, both log(x) and
log(2*x) == log(x) + log(2) satisfy Dt == 1/x, because log(2) is constant.
Therefore, the term const is returned. const is such that
log(const) + f == u. This is calculated by dividing the arguments of one
logarithm from the other. Therefore, it is necessary to pass the arguments
of the logarithmic terms in L_args.
To handle the case where we are given Df/f, not f, use is_deriv_k_in_field().
See also
========
is_log_deriv_k_t_radical_in_field, is_log_deriv_k_t_radical
"""
# Compute Df/f
dfa, dfd = (fd*derivation(fa, DE) - fa*derivation(fd, DE)), fd*fa
dfa, dfd = dfa.cancel(dfd, include=True)
# Our assumption here is that each monomial is recursively transcendental
if len(DE.exts) != len(DE.D):
if [i for i in DE.cases if i == 'tan'] or \
(set([i for i in DE.cases if i == 'primitive']) -
set(DE.indices('log'))):
raise NotImplementedError("Real version of the structure "
"theorems with hypertangent support is not yet implemented.")
# TODO: What should really be done in this case?
raise NotImplementedError("Nonelementary extensions not supported "
"in the structure theorems.")
E_part = [DE.D[i].quo(Poly(DE.T[i], DE.T[i])).as_expr() for i in DE.indices('exp')]
L_part = [DE.D[i].as_expr() for i in DE.indices('log')]
lhs = Matrix([E_part + L_part])
rhs = Matrix([dfa.as_expr()/dfd.as_expr()])
A, u = constant_system(lhs, rhs, DE)
if not all(derivation(i, DE, basic=True).is_zero for i in u) or not A:
# If the elements of u are not all constant
# Note: See comment in constant_system
# Also note: derivation(basic=True) calls cancel()
return None
else:
if not all(i.is_Rational for i in u):
raise NotImplementedError("Cannot work with non-rational "
"coefficients in this case.")
else:
terms = ([DE.extargs[i] for i in DE.indices('exp')] +
[DE.T[i] for i in DE.indices('log')])
ans = list(zip(terms, u))
result = Add(*[Mul(i, j) for i, j in ans])
argterms = ([DE.T[i] for i in DE.indices('exp')] +
[DE.extargs[i] for i in DE.indices('log')])
l = []
ld = []
for i, j in zip(argterms, u):
# We need to get around things like sqrt(x**2) != x
# and also sqrt(x**2 + 2*x + 1) != x + 1
# Issue 10798: i need not be a polynomial
i, d = i.as_numer_denom()
icoeff, iterms = sqf_list(i)
l.append(Mul(*([Pow(icoeff, j)] + [Pow(b, e*j) for b, e in iterms])))
dcoeff, dterms = sqf_list(d)
ld.append(Mul(*([Pow(dcoeff, j)] + [Pow(b, e*j) for b, e in dterms])))
const = cancel(fa.as_expr()/fd.as_expr()/Mul(*l)*Mul(*ld))
return (ans, result, const)
def is_log_deriv_k_t_radical(fa, fd, DE, Df=True):
r"""
Checks if Df is the logarithmic derivative of a k(t)-radical.
b in k(t) can be written as the logarithmic derivative of a k(t) radical if
there exist n in ZZ and u in k(t) with n, u != 0 such that n*b == Du/u.
Either returns (ans, u, n, const) or None, which means that Df cannot be
written as the logarithmic derivative of a k(t)-radical. ans is a list of
tuples such that Mul(*[i**j for i, j in ans]) == u. This is useful for
seeing exactly what elements of k(t) produce u.
This function uses the structure theorem approach, which says that for any
f in K, Df is the logarithmic derivative of a K-radical if and only if there
are ri in QQ such that::
--- --- Dt
\ r * Dt + \ r * i
/ i i / i --- = Df.
--- --- t
i in L i in E i
K/C(x) K/C(x)
Where C = Const(K), L_K/C(x) = { i in {1, ..., n} such that t_i is
transcendental over C(x)(t_1, ..., t_i-1) and Dt_i = Da_i/a_i, for some a_i
in C(x)(t_1, ..., t_i-1)* } (i.e., the set of all indices of logarithmic
monomials of K over C(x)), and E_K/C(x) = { i in {1, ..., n} such that t_i
is transcendental over C(x)(t_1, ..., t_i-1) and Dt_i/t_i = Da_i, for some
a_i in C(x)(t_1, ..., t_i-1) } (i.e., the set of all indices of
hyperexponential monomials of K over C(x)). If K is an elementary extension
over C(x), then the cardinality of L_K/C(x) U E_K/C(x) is exactly the
transcendence degree of K over C(x). Furthermore, because Const_D(K) ==
Const_D(C(x)) == C, deg(Dt_i) == 1 when t_i is in E_K/C(x) and
deg(Dt_i) == 0 when t_i is in L_K/C(x), implying in particular that E_K/C(x)
and L_K/C(x) are disjoint.
The sets L_K/C(x) and E_K/C(x) must, by their nature, be computed
recursively using this same function. Therefore, it is required to pass
them as indices to D (or T). L_args are the arguments of the logarithms
indexed by L_K (i.e., if i is in L_K, then T[i] == log(L_args[i])). This is
needed to compute the final answer u such that n*f == Du/u.
exp(f) will be the same as u up to a multiplicative constant. This is
because they will both behave the same as monomials. For example, both
exp(x) and exp(x + 1) == E*exp(x) satisfy Dt == t. Therefore, the term const
is returned. const is such that exp(const)*f == u. This is calculated by
subtracting the arguments of one exponential from the other. Therefore, it
is necessary to pass the arguments of the exponential terms in E_args.
To handle the case where we are given Df, not f, use
is_log_deriv_k_t_radical_in_field().
See also
========
is_log_deriv_k_t_radical_in_field, is_deriv_k
"""
if Df:
dfa, dfd = (fd*derivation(fa, DE) - fa*derivation(fd, DE)).cancel(fd**2,
include=True)
else:
dfa, dfd = fa, fd
# Our assumption here is that each monomial is recursively transcendental
if len(DE.exts) != len(DE.D):
if [i for i in DE.cases if i == 'tan'] or \
(set([i for i in DE.cases if i == 'primitive']) -
set(DE.indices('log'))):
raise NotImplementedError("Real version of the structure "
"theorems with hypertangent support is not yet implemented.")
# TODO: What should really be done in this case?
raise NotImplementedError("Nonelementary extensions not supported "
"in the structure theorems.")
E_part = [DE.D[i].quo(Poly(DE.T[i], DE.T[i])).as_expr() for i in DE.indices('exp')]
L_part = [DE.D[i].as_expr() for i in DE.indices('log')]
lhs = Matrix([E_part + L_part])
rhs = Matrix([dfa.as_expr()/dfd.as_expr()])
A, u = constant_system(lhs, rhs, DE)
if not all(derivation(i, DE, basic=True).is_zero for i in u) or not A:
# If the elements of u are not all constant
# Note: See comment in constant_system
# Also note: derivation(basic=True) calls cancel()
return None
else:
if not all(i.is_Rational for i in u):
# TODO: But maybe we can tell if they're not rational, like
# log(2)/log(3). Also, there should be an option to continue
# anyway, even if the result might potentially be wrong.
raise NotImplementedError("Cannot work with non-rational "
"coefficients in this case.")
else:
n = reduce(ilcm, [i.as_numer_denom()[1] for i in u])
u *= n
terms = ([DE.T[i] for i in DE.indices('exp')] +
[DE.extargs[i] for i in DE.indices('log')])
ans = list(zip(terms, u))
result = Mul(*[Pow(i, j) for i, j in ans])
# exp(f) will be the same as result up to a multiplicative
# constant. We now find the log of that constant.
argterms = ([DE.extargs[i] for i in DE.indices('exp')] +
[DE.T[i] for i in DE.indices('log')])
const = cancel(fa.as_expr()/fd.as_expr() -
Add(*[Mul(i, j/n) for i, j in zip(argterms, u)]))
return (ans, result, n, const)
def is_log_deriv_k_t_radical_in_field(fa, fd, DE, case='auto', z=None):
"""
Checks if f can be written as the logarithmic derivative of a k(t)-radical.
It differs from is_log_deriv_k_t_radical(fa, fd, DE, Df=False)
for any given fa, fd, DE in that it finds the solution in the
given field not in some (possibly unspecified extension) and
"in_field" with the function name is used to indicate that.
f in k(t) can be written as the logarithmic derivative of a k(t) radical if
there exist n in ZZ and u in k(t) with n, u != 0 such that n*f == Du/u.
Either returns (n, u) or None, which means that f cannot be written as the
logarithmic derivative of a k(t)-radical.
case is one of {'primitive', 'exp', 'tan', 'auto'} for the primitive,
hyperexponential, and hypertangent cases, respectively. If case is 'auto',
it will attempt to determine the type of the derivation automatically.
See also
========
is_log_deriv_k_t_radical, is_deriv_k
"""
fa, fd = fa.cancel(fd, include=True)
# f must be simple
n, s = splitfactor(fd, DE)
if not s.is_one:
pass
z = z or Dummy('z')
H, b = residue_reduce(fa, fd, DE, z=z)
if not b:
# I will have to verify, but I believe that the answer should be
# None in this case. This should never happen for the
# functions given when solving the parametric logarithmic
# derivative problem when integration elementary functions (see
# Bronstein's book, page 255), so most likely this indicates a bug.
return None
roots = [(i, i.real_roots()) for i, _ in H]
if not all(len(j) == i.degree() and all(k.is_Rational for k in j) for
i, j in roots):
# If f is the logarithmic derivative of a k(t)-radical, then all the
# roots of the resultant must be rational numbers.
return None
# [(a, i), ...], where i*log(a) is a term in the log-part of the integral
# of f
respolys, residues = list(zip(*roots)) or [[], []]
# Note: this might be empty, but everything below should work find in that
# case (it should be the same as if it were [[1, 1]])
residueterms = [(H[j][1].subs(z, i), i) for j in range(len(H)) for
i in residues[j]]
# TODO: finish writing this and write tests
p = cancel(fa.as_expr()/fd.as_expr() - residue_reduce_derivation(H, DE, z))
p = p.as_poly(DE.t)
if p is None:
# f - Dg will be in k[t] if f is the logarithmic derivative of a k(t)-radical
return None
if p.degree(DE.t) >= max(1, DE.d.degree(DE.t)):
return None
if case == 'auto':
case = DE.case
if case == 'exp':
wa, wd = derivation(DE.t, DE).cancel(Poly(DE.t, DE.t), include=True)
with DecrementLevel(DE):
pa, pd = frac_in(p, DE.t, cancel=True)
wa, wd = frac_in((wa, wd), DE.t)
A = parametric_log_deriv(pa, pd, wa, wd, DE)
if A is None:
return None
n, e, u = A
u *= DE.t**e
elif case == 'primitive':
with DecrementLevel(DE):
pa, pd = frac_in(p, DE.t)
A = is_log_deriv_k_t_radical_in_field(pa, pd, DE, case='auto')
if A is None:
return None
n, u = A
elif case == 'base':
# TODO: we can use more efficient residue reduction from ratint()
if not fd.is_sqf or fa.degree() >= fd.degree():
# f is the logarithmic derivative in the base case if and only if
# f = fa/fd, fd is square-free, deg(fa) < deg(fd), and
# gcd(fa, fd) == 1. The last condition is handled by cancel() above.
return None
# Note: if residueterms = [], returns (1, 1)
# f had better be 0 in that case.
n = reduce(ilcm, [i.as_numer_denom()[1] for _, i in residueterms], S.One)
u = Mul(*[Pow(i, j*n) for i, j in residueterms])
return (n, u)
elif case == 'tan':
raise NotImplementedError("The hypertangent case is "
"not yet implemented for is_log_deriv_k_t_radical_in_field()")
elif case in ['other_linear', 'other_nonlinear']:
# XXX: If these are supported by the structure theorems, change to NotImplementedError.
raise ValueError("The %s case is not supported in this function." % case)
else:
raise ValueError("case must be one of {'primitive', 'exp', 'tan', "
"'base', 'auto'}, not %s" % case)
common_denom = reduce(ilcm, [i.as_numer_denom()[1] for i in [j for _, j in
residueterms]] + [n], S.One)
residueterms = [(i, j*common_denom) for i, j in residueterms]
m = common_denom//n
if common_denom != n*m: # Verify exact division
raise ValueError("Inexact division")
u = cancel(u**m*Mul(*[Pow(i, j) for i, j in residueterms]))
return (common_denom, u)
|
436298d2438d97b26be951d2e27a56970c6e1e9ddc7956eb34a5a496adcf3905 | from __future__ import print_function, division
from sympy.core import cacheit, Dummy, Ne, Integer, Rational, S, Wild
from sympy.functions import binomial, sin, cos, Piecewise
# TODO sin(a*x)*cos(b*x) -> sin((a+b)x) + sin((a-b)x) ?
# creating, each time, Wild's and sin/cos/Mul is expensive. Also, our match &
# subs are very slow when not cached, and if we create Wild each time, we
# effectively block caching.
#
# so we cache the pattern
# need to use a function instead of lamda since hash of lambda changes on
# each call to _pat_sincos
def _integer_instance(n):
return isinstance(n , Integer)
@cacheit
def _pat_sincos(x):
a = Wild('a', exclude=[x])
n, m = [Wild(s, exclude=[x], properties=[_integer_instance])
for s in 'nm']
pat = sin(a*x)**n * cos(a*x)**m
return pat, a, n, m
_u = Dummy('u')
def trigintegrate(f, x, conds='piecewise'):
"""Integrate f = Mul(trig) over x
>>> from sympy import Symbol, sin, cos, tan, sec, csc, cot
>>> from sympy.integrals.trigonometry import trigintegrate
>>> from sympy.abc import x
>>> trigintegrate(sin(x)*cos(x), x)
sin(x)**2/2
>>> trigintegrate(sin(x)**2, x)
x/2 - sin(x)*cos(x)/2
>>> trigintegrate(tan(x)*sec(x), x)
1/cos(x)
>>> trigintegrate(sin(x)*tan(x), x)
-log(sin(x) - 1)/2 + log(sin(x) + 1)/2 - sin(x)
http://en.wikibooks.org/wiki/Calculus/Integration_techniques
See Also
========
sympy.integrals.integrals.Integral.doit
sympy.integrals.integrals.Integral
"""
from sympy.integrals.integrals import integrate
pat, a, n, m = _pat_sincos(x)
f = f.rewrite('sincos')
M = f.match(pat)
if M is None:
return
n, m = M[n], M[m]
if n.is_zero and m.is_zero:
return x
zz = x if n.is_zero else S.Zero
a = M[a]
if n.is_odd or m.is_odd:
u = _u
n_, m_ = n.is_odd, m.is_odd
# take smallest n or m -- to choose simplest substitution
if n_ and m_:
# Make sure to choose the positive one
# otherwise an incorrect integral can occur.
if n < 0 and m > 0:
m_ = True
n_ = False
elif m < 0 and n > 0:
n_ = True
m_ = False
# Both are negative so choose the smallest n or m
# in absolute value for simplest substitution.
elif (n < 0 and m < 0):
n_ = n > m
m_ = not (n > m)
# Both n and m are odd and positive
else:
n_ = (n < m) # NB: careful here, one of the
m_ = not (n < m) # conditions *must* be true
# n m u=C (n-1)/2 m
# S(x) * C(x) dx --> -(1-u^2) * u du
if n_:
ff = -(1 - u**2)**((n - 1)/2) * u**m
uu = cos(a*x)
# n m u=S n (m-1)/2
# S(x) * C(x) dx --> u * (1-u^2) du
elif m_:
ff = u**n * (1 - u**2)**((m - 1)/2)
uu = sin(a*x)
fi = integrate(ff, u) # XXX cyclic deps
fx = fi.subs(u, uu)
if conds == 'piecewise':
return Piecewise((fx / a, Ne(a, 0)), (zz, True))
return fx / a
# n & m are both even
#
# 2k 2m 2l 2l
# we transform S (x) * C (x) into terms with only S (x) or C (x)
#
# example:
# 100 4 100 2 2 100 4 2
# S (x) * C (x) = S (x) * (1-S (x)) = S (x) * (1 + S (x) - 2*S (x))
#
# 104 102 100
# = S (x) - 2*S (x) + S (x)
# 2k
# then S is integrated with recursive formula
# take largest n or m -- to choose simplest substitution
n_ = (abs(n) > abs(m))
m_ = (abs(m) > abs(n))
res = S.Zero
if n_:
# 2k 2 k i 2i
# C = (1 - S ) = sum(i, (-) * B(k, i) * S )
if m > 0:
for i in range(0, m//2 + 1):
res += ((-1)**i * binomial(m//2, i) *
_sin_pow_integrate(n + 2*i, x))
elif m == 0:
res = _sin_pow_integrate(n, x)
else:
# m < 0 , |n| > |m|
# /
# |
# | m n
# | cos (x) sin (x) dx =
# |
# |
#/
# /
# |
# -1 m+1 n-1 n - 1 | m+2 n-2
# ________ cos (x) sin (x) + _______ | cos (x) sin (x) dx
# |
# m + 1 m + 1 |
# /
res = (Rational(-1, m + 1) * cos(x)**(m + 1) * sin(x)**(n - 1) +
Rational(n - 1, m + 1) *
trigintegrate(cos(x)**(m + 2)*sin(x)**(n - 2), x))
elif m_:
# 2k 2 k i 2i
# S = (1 - C ) = sum(i, (-) * B(k, i) * C )
if n > 0:
# / /
# | |
# | m n | -m n
# | cos (x)*sin (x) dx or | cos (x) * sin (x) dx
# | |
# / /
#
# |m| > |n| ; m, n >0 ; m, n belong to Z - {0}
# n 2
# sin (x) term is expanded here in terms of cos (x),
# and then integrated.
#
for i in range(0, n//2 + 1):
res += ((-1)**i * binomial(n//2, i) *
_cos_pow_integrate(m + 2*i, x))
elif n == 0:
# /
# |
# | 1
# | _ _ _
# | m
# | cos (x)
# /
#
res = _cos_pow_integrate(m, x)
else:
# n < 0 , |m| > |n|
# /
# |
# | m n
# | cos (x) sin (x) dx =
# |
# |
#/
# /
# |
# 1 m-1 n+1 m - 1 | m-2 n+2
# _______ cos (x) sin (x) + _______ | cos (x) sin (x) dx
# |
# n + 1 n + 1 |
# /
res = (Rational(1, n + 1) * cos(x)**(m - 1)*sin(x)**(n + 1) +
Rational(m - 1, n + 1) *
trigintegrate(cos(x)**(m - 2)*sin(x)**(n + 2), x))
else:
if m == n:
##Substitute sin(2x)/2 for sin(x)cos(x) and then Integrate.
res = integrate((sin(2*x)*S.Half)**m, x)
elif (m == -n):
if n < 0:
# Same as the scheme described above.
# the function argument to integrate in the end will
# be 1 , this cannot be integrated by trigintegrate.
# Hence use sympy.integrals.integrate.
res = (Rational(1, n + 1) * cos(x)**(m - 1) * sin(x)**(n + 1) +
Rational(m - 1, n + 1) *
integrate(cos(x)**(m - 2) * sin(x)**(n + 2), x))
else:
res = (Rational(-1, m + 1) * cos(x)**(m + 1) * sin(x)**(n - 1) +
Rational(n - 1, m + 1) *
integrate(cos(x)**(m + 2)*sin(x)**(n - 2), x))
if conds == 'piecewise':
return Piecewise((res.subs(x, a*x) / a, Ne(a, 0)), (zz, True))
return res.subs(x, a*x) / a
def _sin_pow_integrate(n, x):
if n > 0:
if n == 1:
#Recursion break
return -cos(x)
# n > 0
# / /
# | |
# | n -1 n-1 n - 1 | n-2
# | sin (x) dx = ______ cos (x) sin (x) + _______ | sin (x) dx
# | |
# | n n |
#/ /
#
#
return (Rational(-1, n) * cos(x) * sin(x)**(n - 1) +
Rational(n - 1, n) * _sin_pow_integrate(n - 2, x))
if n < 0:
if n == -1:
##Make sure this does not come back here again.
##Recursion breaks here or at n==0.
return trigintegrate(1/sin(x), x)
# n < 0
# / /
# | |
# | n 1 n+1 n + 2 | n+2
# | sin (x) dx = _______ cos (x) sin (x) + _______ | sin (x) dx
# | |
# | n + 1 n + 1 |
#/ /
#
return (Rational(1, n + 1) * cos(x) * sin(x)**(n + 1) +
Rational(n + 2, n + 1) * _sin_pow_integrate(n + 2, x))
else:
#n == 0
#Recursion break.
return x
def _cos_pow_integrate(n, x):
if n > 0:
if n == 1:
#Recursion break.
return sin(x)
# n > 0
# / /
# | |
# | n 1 n-1 n - 1 | n-2
# | sin (x) dx = ______ sin (x) cos (x) + _______ | cos (x) dx
# | |
# | n n |
#/ /
#
return (Rational(1, n) * sin(x) * cos(x)**(n - 1) +
Rational(n - 1, n) * _cos_pow_integrate(n - 2, x))
if n < 0:
if n == -1:
##Recursion break
return trigintegrate(1/cos(x), x)
# n < 0
# / /
# | |
# | n -1 n+1 n + 2 | n+2
# | cos (x) dx = _______ sin (x) cos (x) + _______ | cos (x) dx
# | |
# | n + 1 n + 1 |
#/ /
#
return (Rational(-1, n + 1) * sin(x) * cos(x)**(n + 1) +
Rational(n + 2, n + 1) * _cos_pow_integrate(n + 2, x))
else:
# n == 0
#Recursion Break.
return x
|
577fab98452fcb1282429734919aafb5f60129e7eb5249369b112edc1033976a | """
Integrate functions by rewriting them as Meijer G-functions.
There are three user-visible functions that can be used by other parts of the
sympy library to solve various integration problems:
- meijerint_indefinite
- meijerint_definite
- meijerint_inversion
They can be used to compute, respectively, indefinite integrals, definite
integrals over intervals of the real line, and inverse laplace-type integrals
(from c-I*oo to c+I*oo). See the respective docstrings for details.
The main references for this are:
[L] Luke, Y. L. (1969), The Special Functions and Their Approximations,
Volume 1
[R] Kelly B. Roach. Meijer G Function Representations.
In: Proceedings of the 1997 International Symposium on Symbolic and
Algebraic Computation, pages 205-211, New York, 1997. ACM.
[P] A. P. Prudnikov, Yu. A. Brychkov and O. I. Marichev (1990).
Integrals and Series: More Special Functions, Vol. 3,.
Gordon and Breach Science Publisher
"""
from __future__ import print_function, division
from typing import Dict, Tuple
from sympy.core import oo, S, pi, Expr
from sympy.core.exprtools import factor_terms
from sympy.core.function import expand, expand_mul, expand_power_base
from sympy.core.add import Add
from sympy.core.mul import Mul
from sympy.core.numbers import Rational
from sympy.core.cache import cacheit
from sympy.core.symbol import Dummy, Wild
from sympy.simplify import hyperexpand, powdenest, collect
from sympy.simplify.fu import sincos_to_sum
from sympy.logic.boolalg import And, Or, BooleanAtom
from sympy.functions.special.delta_functions import DiracDelta, Heaviside
from sympy.functions.elementary.exponential import exp
from sympy.functions.elementary.piecewise import Piecewise, piecewise_fold
from sympy.functions.elementary.hyperbolic import \
_rewrite_hyperbolics_as_exp, HyperbolicFunction
from sympy.functions.elementary.trigonometric import cos, sin
from sympy.functions.special.hyper import meijerg
from sympy.utilities.iterables import multiset_partitions, ordered
from sympy.utilities.misc import debug as _debug
from sympy.utilities import default_sort_key
# keep this at top for easy reference
z = Dummy('z')
def _has(res, *f):
# return True if res has f; in the case of Piecewise
# only return True if *all* pieces have f
res = piecewise_fold(res)
if getattr(res, 'is_Piecewise', False):
return all(_has(i, *f) for i in res.args)
return res.has(*f)
def _create_lookup_table(table):
""" Add formulae for the function -> meijerg lookup table. """
def wild(n):
return Wild(n, exclude=[z])
p, q, a, b, c = list(map(wild, 'pqabc'))
n = Wild('n', properties=[lambda x: x.is_Integer and x > 0])
t = p*z**q
def add(formula, an, ap, bm, bq, arg=t, fac=S.One, cond=True, hint=True):
table.setdefault(_mytype(formula, z), []).append((formula,
[(fac, meijerg(an, ap, bm, bq, arg))], cond, hint))
def addi(formula, inst, cond, hint=True):
table.setdefault(
_mytype(formula, z), []).append((formula, inst, cond, hint))
def constant(a):
return [(a, meijerg([1], [], [], [0], z)),
(a, meijerg([], [1], [0], [], z))]
table[()] = [(a, constant(a), True, True)]
# [P], Section 8.
from sympy import unpolarify, Function, Not
class IsNonPositiveInteger(Function):
@classmethod
def eval(cls, arg):
arg = unpolarify(arg)
if arg.is_Integer is True:
return arg <= 0
# Section 8.4.2
from sympy import (gamma, pi, cos, exp, re, sin, sinc, sqrt, sinh, cosh,
factorial, log, erf, erfc, erfi, polar_lift)
# TODO this needs more polar_lift (c/f entry for exp)
add(Heaviside(t - b)*(t - b)**(a - 1), [a], [], [], [0], t/b,
gamma(a)*b**(a - 1), And(b > 0))
add(Heaviside(b - t)*(b - t)**(a - 1), [], [a], [0], [], t/b,
gamma(a)*b**(a - 1), And(b > 0))
add(Heaviside(z - (b/p)**(1/q))*(t - b)**(a - 1), [a], [], [], [0], t/b,
gamma(a)*b**(a - 1), And(b > 0))
add(Heaviside((b/p)**(1/q) - z)*(b - t)**(a - 1), [], [a], [0], [], t/b,
gamma(a)*b**(a - 1), And(b > 0))
add((b + t)**(-a), [1 - a], [], [0], [], t/b, b**(-a)/gamma(a),
hint=Not(IsNonPositiveInteger(a)))
add(abs(b - t)**(-a), [1 - a], [(1 - a)/2], [0], [(1 - a)/2], t/b,
2*sin(pi*a/2)*gamma(1 - a)*abs(b)**(-a), re(a) < 1)
add((t**a - b**a)/(t - b), [0, a], [], [0, a], [], t/b,
b**(a - 1)*sin(a*pi)/pi)
# 12
def A1(r, sign, nu):
return pi**Rational(-1, 2)*(-sign*nu/2)**(1 - 2*r)
def tmpadd(r, sgn):
# XXX the a**2 is bad for matching
add((sqrt(a**2 + t) + sgn*a)**b/(a**2 + t)**r,
[(1 + b)/2, 1 - 2*r + b/2], [],
[(b - sgn*b)/2], [(b + sgn*b)/2], t/a**2,
a**(b - 2*r)*A1(r, sgn, b))
tmpadd(0, 1)
tmpadd(0, -1)
tmpadd(S.Half, 1)
tmpadd(S.Half, -1)
# 13
def tmpadd(r, sgn):
add((sqrt(a + p*z**q) + sgn*sqrt(p)*z**(q/2))**b/(a + p*z**q)**r,
[1 - r + sgn*b/2], [1 - r - sgn*b/2], [0, S.Half], [],
p*z**q/a, a**(b/2 - r)*A1(r, sgn, b))
tmpadd(0, 1)
tmpadd(0, -1)
tmpadd(S.Half, 1)
tmpadd(S.Half, -1)
# (those after look obscure)
# Section 8.4.3
add(exp(polar_lift(-1)*t), [], [], [0], [])
# TODO can do sin^n, sinh^n by expansion ... where?
# 8.4.4 (hyperbolic functions)
add(sinh(t), [], [1], [S.Half], [1, 0], t**2/4, pi**Rational(3, 2))
add(cosh(t), [], [S.Half], [0], [S.Half, S.Half], t**2/4, pi**Rational(3, 2))
# Section 8.4.5
# TODO can do t + a. but can also do by expansion... (XXX not really)
add(sin(t), [], [], [S.Half], [0], t**2/4, sqrt(pi))
add(cos(t), [], [], [0], [S.Half], t**2/4, sqrt(pi))
# Section 8.4.6 (sinc function)
add(sinc(t), [], [], [0], [Rational(-1, 2)], t**2/4, sqrt(pi)/2)
# Section 8.5.5
def make_log1(subs):
N = subs[n]
return [((-1)**N*factorial(N),
meijerg([], [1]*(N + 1), [0]*(N + 1), [], t))]
def make_log2(subs):
N = subs[n]
return [(factorial(N),
meijerg([1]*(N + 1), [], [], [0]*(N + 1), t))]
# TODO these only hold for positive p, and can be made more general
# but who uses log(x)*Heaviside(a-x) anyway ...
# TODO also it would be nice to derive them recursively ...
addi(log(t)**n*Heaviside(1 - t), make_log1, True)
addi(log(t)**n*Heaviside(t - 1), make_log2, True)
def make_log3(subs):
return make_log1(subs) + make_log2(subs)
addi(log(t)**n, make_log3, True)
addi(log(t + a),
constant(log(a)) + [(S.One, meijerg([1, 1], [], [1], [0], t/a))],
True)
addi(log(abs(t - a)), constant(log(abs(a))) +
[(pi, meijerg([1, 1], [S.Half], [1], [0, S.Half], t/a))],
True)
# TODO log(x)/(x+a) and log(x)/(x-1) can also be done. should they
# be derivable?
# TODO further formulae in this section seem obscure
# Sections 8.4.9-10
# TODO
# Section 8.4.11
from sympy import Ei, I, expint, Si, Ci, Shi, Chi, fresnels, fresnelc
addi(Ei(t),
constant(-I*pi) + [(S.NegativeOne, meijerg([], [1], [0, 0], [],
t*polar_lift(-1)))],
True)
# Section 8.4.12
add(Si(t), [1], [], [S.Half], [0, 0], t**2/4, sqrt(pi)/2)
add(Ci(t), [], [1], [0, 0], [S.Half], t**2/4, -sqrt(pi)/2)
# Section 8.4.13
add(Shi(t), [S.Half], [], [0], [Rational(-1, 2), Rational(-1, 2)], polar_lift(-1)*t**2/4,
t*sqrt(pi)/4)
add(Chi(t), [], [S.Half, 1], [0, 0], [S.Half, S.Half], t**2/4, -
pi**S('3/2')/2)
# generalized exponential integral
add(expint(a, t), [], [a], [a - 1, 0], [], t)
# Section 8.4.14
add(erf(t), [1], [], [S.Half], [0], t**2, 1/sqrt(pi))
# TODO exp(-x)*erf(I*x) does not work
add(erfc(t), [], [1], [0, S.Half], [], t**2, 1/sqrt(pi))
# This formula for erfi(z) yields a wrong(?) minus sign
#add(erfi(t), [1], [], [S.Half], [0], -t**2, I/sqrt(pi))
add(erfi(t), [S.Half], [], [0], [Rational(-1, 2)], -t**2, t/sqrt(pi))
# Fresnel Integrals
add(fresnels(t), [1], [], [Rational(3, 4)], [0, Rational(1, 4)], pi**2*t**4/16, S.Half)
add(fresnelc(t), [1], [], [Rational(1, 4)], [0, Rational(3, 4)], pi**2*t**4/16, S.Half)
##### bessel-type functions #####
from sympy import besselj, bessely, besseli, besselk
# Section 8.4.19
add(besselj(a, t), [], [], [a/2], [-a/2], t**2/4)
# all of the following are derivable
#add(sin(t)*besselj(a, t), [Rational(1, 4), Rational(3, 4)], [], [(1+a)/2],
# [-a/2, a/2, (1-a)/2], t**2, 1/sqrt(2))
#add(cos(t)*besselj(a, t), [Rational(1, 4), Rational(3, 4)], [], [a/2],
# [-a/2, (1+a)/2, (1-a)/2], t**2, 1/sqrt(2))
#add(besselj(a, t)**2, [S.Half], [], [a], [-a, 0], t**2, 1/sqrt(pi))
#add(besselj(a, t)*besselj(b, t), [0, S.Half], [], [(a + b)/2],
# [-(a+b)/2, (a - b)/2, (b - a)/2], t**2, 1/sqrt(pi))
# Section 8.4.20
add(bessely(a, t), [], [-(a + 1)/2], [a/2, -a/2], [-(a + 1)/2], t**2/4)
# TODO all of the following should be derivable
#add(sin(t)*bessely(a, t), [Rational(1, 4), Rational(3, 4)], [(1 - a - 1)/2],
# [(1 + a)/2, (1 - a)/2], [(1 - a - 1)/2, (1 - 1 - a)/2, (1 - 1 + a)/2],
# t**2, 1/sqrt(2))
#add(cos(t)*bessely(a, t), [Rational(1, 4), Rational(3, 4)], [(0 - a - 1)/2],
# [(0 + a)/2, (0 - a)/2], [(0 - a - 1)/2, (1 - 0 - a)/2, (1 - 0 + a)/2],
# t**2, 1/sqrt(2))
#add(besselj(a, t)*bessely(b, t), [0, S.Half], [(a - b - 1)/2],
# [(a + b)/2, (a - b)/2], [(a - b - 1)/2, -(a + b)/2, (b - a)/2],
# t**2, 1/sqrt(pi))
#addi(bessely(a, t)**2,
# [(2/sqrt(pi), meijerg([], [S.Half, S.Half - a], [0, a, -a],
# [S.Half - a], t**2)),
# (1/sqrt(pi), meijerg([S.Half], [], [a], [-a, 0], t**2))],
# True)
#addi(bessely(a, t)*bessely(b, t),
# [(2/sqrt(pi), meijerg([], [0, S.Half, (1 - a - b)/2],
# [(a + b)/2, (a - b)/2, (b - a)/2, -(a + b)/2],
# [(1 - a - b)/2], t**2)),
# (1/sqrt(pi), meijerg([0, S.Half], [], [(a + b)/2],
# [-(a + b)/2, (a - b)/2, (b - a)/2], t**2))],
# True)
# Section 8.4.21 ?
# Section 8.4.22
add(besseli(a, t), [], [(1 + a)/2], [a/2], [-a/2, (1 + a)/2], t**2/4, pi)
# TODO many more formulas. should all be derivable
# Section 8.4.23
add(besselk(a, t), [], [], [a/2, -a/2], [], t**2/4, S.Half)
# TODO many more formulas. should all be derivable
# Complete elliptic integrals K(z) and E(z)
from sympy import elliptic_k, elliptic_e
add(elliptic_k(t), [S.Half, S.Half], [], [0], [0], -t, S.Half)
add(elliptic_e(t), [S.Half, 3*S.Half], [], [0], [0], -t, Rational(-1, 2)/2)
####################################################################
# First some helper functions.
####################################################################
from sympy.utilities.timeutils import timethis
timeit = timethis('meijerg')
def _mytype(f, x):
""" Create a hashable entity describing the type of f. """
if x not in f.free_symbols:
return ()
elif f.is_Function:
return (type(f),)
else:
types = [_mytype(a, x) for a in f.args]
res = []
for t in types:
res += list(t)
res.sort()
return tuple(res)
class _CoeffExpValueError(ValueError):
"""
Exception raised by _get_coeff_exp, for internal use only.
"""
pass
def _get_coeff_exp(expr, x):
"""
When expr is known to be of the form c*x**b, with c and/or b possibly 1,
return c, b.
>>> from sympy.abc import x, a, b
>>> from sympy.integrals.meijerint import _get_coeff_exp
>>> _get_coeff_exp(a*x**b, x)
(a, b)
>>> _get_coeff_exp(x, x)
(1, 1)
>>> _get_coeff_exp(2*x, x)
(2, 1)
>>> _get_coeff_exp(x**3, x)
(1, 3)
"""
from sympy import powsimp
(c, m) = expand_power_base(powsimp(expr)).as_coeff_mul(x)
if not m:
return c, S.Zero
[m] = m
if m.is_Pow:
if m.base != x:
raise _CoeffExpValueError('expr not of form a*x**b')
return c, m.exp
elif m == x:
return c, S.One
else:
raise _CoeffExpValueError('expr not of form a*x**b: %s' % expr)
def _exponents(expr, x):
"""
Find the exponents of ``x`` (not including zero) in ``expr``.
>>> from sympy.integrals.meijerint import _exponents
>>> from sympy.abc import x, y
>>> from sympy import sin
>>> _exponents(x, x)
{1}
>>> _exponents(x**2, x)
{2}
>>> _exponents(x**2 + x, x)
{1, 2}
>>> _exponents(x**3*sin(x + x**y) + 1/x, x)
{-1, 1, 3, y}
"""
def _exponents_(expr, x, res):
if expr == x:
res.update([1])
return
if expr.is_Pow and expr.base == x:
res.update([expr.exp])
return
for arg in expr.args:
_exponents_(arg, x, res)
res = set()
_exponents_(expr, x, res)
return res
def _functions(expr, x):
""" Find the types of functions in expr, to estimate the complexity. """
from sympy import Function
return set(e.func for e in expr.atoms(Function) if x in e.free_symbols)
def _find_splitting_points(expr, x):
"""
Find numbers a such that a linear substitution x -> x + a would
(hopefully) simplify expr.
>>> from sympy.integrals.meijerint import _find_splitting_points as fsp
>>> from sympy import sin
>>> from sympy.abc import a, x
>>> fsp(x, x)
{0}
>>> fsp((x-1)**3, x)
{1}
>>> fsp(sin(x+3)*x, x)
{-3, 0}
"""
p, q = [Wild(n, exclude=[x]) for n in 'pq']
def compute_innermost(expr, res):
if not isinstance(expr, Expr):
return
m = expr.match(p*x + q)
if m and m[p] != 0:
res.add(-m[q]/m[p])
return
if expr.is_Atom:
return
for arg in expr.args:
compute_innermost(arg, res)
innermost = set()
compute_innermost(expr, innermost)
return innermost
def _split_mul(f, x):
"""
Split expression ``f`` into fac, po, g, where fac is a constant factor,
po = x**s for some s independent of s, and g is "the rest".
>>> from sympy.integrals.meijerint import _split_mul
>>> from sympy import sin
>>> from sympy.abc import s, x
>>> _split_mul((3*x)**s*sin(x**2)*x, x)
(3**s, x*x**s, sin(x**2))
"""
from sympy import polarify, unpolarify
fac = S.One
po = S.One
g = S.One
f = expand_power_base(f)
args = Mul.make_args(f)
for a in args:
if a == x:
po *= x
elif x not in a.free_symbols:
fac *= a
else:
if a.is_Pow and x not in a.exp.free_symbols:
c, t = a.base.as_coeff_mul(x)
if t != (x,):
c, t = expand_mul(a.base).as_coeff_mul(x)
if t == (x,):
po *= x**a.exp
fac *= unpolarify(polarify(c**a.exp, subs=False))
continue
g *= a
return fac, po, g
def _mul_args(f):
"""
Return a list ``L`` such that ``Mul(*L) == f``.
If ``f`` is not a ``Mul`` or ``Pow``, ``L=[f]``.
If ``f=g**n`` for an integer ``n``, ``L=[g]*n``.
If ``f`` is a ``Mul``, ``L`` comes from applying ``_mul_args`` to all factors of ``f``.
"""
args = Mul.make_args(f)
gs = []
for g in args:
if g.is_Pow and g.exp.is_Integer:
n = g.exp
base = g.base
if n < 0:
n = -n
base = 1/base
gs += [base]*n
else:
gs.append(g)
return gs
def _mul_as_two_parts(f):
"""
Find all the ways to split f into a product of two terms.
Return None on failure.
Although the order is canonical from multiset_partitions, this is
not necessarily the best order to process the terms. For example,
if the case of len(gs) == 2 is removed and multiset is allowed to
sort the terms, some tests fail.
>>> from sympy.integrals.meijerint import _mul_as_two_parts
>>> from sympy import sin, exp, ordered
>>> from sympy.abc import x
>>> list(ordered(_mul_as_two_parts(x*sin(x)*exp(x))))
[(x, exp(x)*sin(x)), (x*exp(x), sin(x)), (x*sin(x), exp(x))]
"""
gs = _mul_args(f)
if len(gs) < 2:
return None
if len(gs) == 2:
return [tuple(gs)]
return [(Mul(*x), Mul(*y)) for (x, y) in multiset_partitions(gs, 2)]
def _inflate_g(g, n):
""" Return C, h such that h is a G function of argument z**n and
g = C*h. """
# TODO should this be a method of meijerg?
# See: [L, page 150, equation (5)]
def inflate(params, n):
""" (a1, .., ak) -> (a1/n, (a1+1)/n, ..., (ak + n-1)/n) """
res = []
for a in params:
for i in range(n):
res.append((a + i)/n)
return res
v = S(len(g.ap) - len(g.bq))
C = n**(1 + g.nu + v/2)
C /= (2*pi)**((n - 1)*g.delta)
return C, meijerg(inflate(g.an, n), inflate(g.aother, n),
inflate(g.bm, n), inflate(g.bother, n),
g.argument**n * n**(n*v))
def _flip_g(g):
""" Turn the G function into one of inverse argument
(i.e. G(1/x) -> G'(x)) """
# See [L], section 5.2
def tr(l):
return [1 - a for a in l]
return meijerg(tr(g.bm), tr(g.bother), tr(g.an), tr(g.aother), 1/g.argument)
def _inflate_fox_h(g, a):
r"""
Let d denote the integrand in the definition of the G function ``g``.
Consider the function H which is defined in the same way, but with
integrand d/Gamma(a*s) (contour conventions as usual).
If a is rational, the function H can be written as C*G, for a constant C
and a G-function G.
This function returns C, G.
"""
if a < 0:
return _inflate_fox_h(_flip_g(g), -a)
p = S(a.p)
q = S(a.q)
# We use the substitution s->qs, i.e. inflate g by q. We are left with an
# extra factor of Gamma(p*s), for which we use Gauss' multiplication
# theorem.
D, g = _inflate_g(g, q)
z = g.argument
D /= (2*pi)**((1 - p)/2)*p**Rational(-1, 2)
z /= p**p
bs = [(n + 1)/p for n in range(p)]
return D, meijerg(g.an, g.aother, g.bm, list(g.bother) + bs, z)
_dummies = {} # type: Dict[Tuple[str, str], Dummy]
def _dummy(name, token, expr, **kwargs):
"""
Return a dummy. This will return the same dummy if the same token+name is
requested more than once, and it is not already in expr.
This is for being cache-friendly.
"""
d = _dummy_(name, token, **kwargs)
if d in expr.free_symbols:
return Dummy(name, **kwargs)
return d
def _dummy_(name, token, **kwargs):
"""
Return a dummy associated to name and token. Same effect as declaring
it globally.
"""
global _dummies
if not (name, token) in _dummies:
_dummies[(name, token)] = Dummy(name, **kwargs)
return _dummies[(name, token)]
def _is_analytic(f, x):
""" Check if f(x), when expressed using G functions on the positive reals,
will in fact agree with the G functions almost everywhere """
from sympy import Heaviside, Abs
return not any(x in expr.free_symbols for expr in f.atoms(Heaviside, Abs))
def _condsimp(cond):
"""
Do naive simplifications on ``cond``.
Note that this routine is completely ad-hoc, simplification rules being
added as need arises rather than following any logical pattern.
>>> from sympy.integrals.meijerint import _condsimp as simp
>>> from sympy import Or, Eq, unbranched_argument as arg, And
>>> from sympy.abc import x, y, z
>>> simp(Or(x < y, z, Eq(x, y)))
z | (x <= y)
>>> simp(Or(x <= y, And(x < y, z)))
x <= y
"""
from sympy import (
symbols, Wild, Eq, unbranched_argument, exp_polar, pi, I,
arg, periodic_argument, oo, polar_lift)
from sympy.logic.boolalg import BooleanFunction
if not isinstance(cond, BooleanFunction):
return cond
cond = cond.func(*list(map(_condsimp, cond.args)))
change = True
p, q, r = symbols('p q r', cls=Wild)
rules = [
(Or(p < q, Eq(p, q)), p <= q),
# The next two obviously are instances of a general pattern, but it is
# easier to spell out the few cases we care about.
(And(abs(arg(p)) <= pi, abs(arg(p) - 2*pi) <= pi),
Eq(arg(p) - pi, 0)),
(And(abs(2*arg(p) + pi) <= pi, abs(2*arg(p) - pi) <= pi),
Eq(arg(p), 0)),
(And(abs(unbranched_argument(p)) <= pi,
abs(unbranched_argument(exp_polar(-2*pi*I)*p)) <= pi),
Eq(unbranched_argument(exp_polar(-I*pi)*p), 0)),
(And(abs(unbranched_argument(p)) <= pi/2,
abs(unbranched_argument(exp_polar(-pi*I)*p)) <= pi/2),
Eq(unbranched_argument(exp_polar(-I*pi/2)*p), 0)),
(Or(p <= q, And(p < q, r)), p <= q)
]
while change:
change = False
for fro, to in rules:
if fro.func != cond.func:
continue
for n, arg1 in enumerate(cond.args):
if r in fro.args[0].free_symbols:
m = arg1.match(fro.args[1])
num = 1
else:
num = 0
m = arg1.match(fro.args[0])
if not m:
continue
otherargs = [x.subs(m) for x in fro.args[:num] + fro.args[num + 1:]]
otherlist = [n]
for arg2 in otherargs:
for k, arg3 in enumerate(cond.args):
if k in otherlist:
continue
if arg2 == arg3:
otherlist += [k]
break
if isinstance(arg3, And) and arg2.args[1] == r and \
isinstance(arg2, And) and arg2.args[0] in arg3.args:
otherlist += [k]
break
if isinstance(arg3, And) and arg2.args[0] == r and \
isinstance(arg2, And) and arg2.args[1] in arg3.args:
otherlist += [k]
break
if len(otherlist) != len(otherargs) + 1:
continue
newargs = [arg_ for (k, arg_) in enumerate(cond.args)
if k not in otherlist] + [to.subs(m)]
cond = cond.func(*newargs)
change = True
break
# final tweak
def repl_eq(orig):
if orig.lhs == 0:
expr = orig.rhs
elif orig.rhs == 0:
expr = orig.lhs
else:
return orig
m = expr.match(arg(p)**q)
if not m:
m = expr.match(unbranched_argument(polar_lift(p)**q))
if not m:
if isinstance(expr, periodic_argument) and not expr.args[0].is_polar \
and expr.args[1] is oo:
return (expr.args[0] > 0)
return orig
return (m[p] > 0)
return cond.replace(
lambda expr: expr.is_Relational and expr.rel_op == '==',
repl_eq)
def _eval_cond(cond):
""" Re-evaluate the conditions. """
if isinstance(cond, bool):
return cond
return _condsimp(cond.doit())
####################################################################
# Now the "backbone" functions to do actual integration.
####################################################################
def _my_principal_branch(expr, period, full_pb=False):
""" Bring expr nearer to its principal branch by removing superfluous
factors.
This function does *not* guarantee to yield the principal branch,
to avoid introducing opaque principal_branch() objects,
unless full_pb=True. """
from sympy import principal_branch
res = principal_branch(expr, period)
if not full_pb:
res = res.replace(principal_branch, lambda x, y: x)
return res
def _rewrite_saxena_1(fac, po, g, x):
"""
Rewrite the integral fac*po*g dx, from zero to infinity, as
integral fac*G, where G has argument a*x. Note po=x**s.
Return fac, G.
"""
_, s = _get_coeff_exp(po, x)
a, b = _get_coeff_exp(g.argument, x)
period = g.get_period()
a = _my_principal_branch(a, period)
# We substitute t = x**b.
C = fac/(abs(b)*a**((s + 1)/b - 1))
# Absorb a factor of (at)**((1 + s)/b - 1).
def tr(l):
return [a + (1 + s)/b - 1 for a in l]
return C, meijerg(tr(g.an), tr(g.aother), tr(g.bm), tr(g.bother),
a*x)
def _check_antecedents_1(g, x, helper=False):
r"""
Return a condition under which the mellin transform of g exists.
Any power of x has already been absorbed into the G function,
so this is just $\int_0^\infty g\, dx$.
See [L, section 5.6.1]. (Note that s=1.)
If ``helper`` is True, only check if the MT exists at infinity, i.e. if
$\int_1^\infty g\, dx$ exists.
"""
# NOTE if you update these conditions, please update the documentation as well
from sympy import Eq, Not, ceiling, Ne, re, unbranched_argument as arg
delta = g.delta
eta, _ = _get_coeff_exp(g.argument, x)
m, n, p, q = S([len(g.bm), len(g.an), len(g.ap), len(g.bq)])
if p > q:
def tr(l):
return [1 - x for x in l]
return _check_antecedents_1(meijerg(tr(g.bm), tr(g.bother),
tr(g.an), tr(g.aother), x/eta),
x)
tmp = []
for b in g.bm:
tmp += [-re(b) < 1]
for a in g.an:
tmp += [1 < 1 - re(a)]
cond_3 = And(*tmp)
for b in g.bother:
tmp += [-re(b) < 1]
for a in g.aother:
tmp += [1 < 1 - re(a)]
cond_3_star = And(*tmp)
cond_4 = (-re(g.nu) + (q + 1 - p)/2 > q - p)
def debug(*msg):
_debug(*msg)
debug('Checking antecedents for 1 function:')
debug(' delta=%s, eta=%s, m=%s, n=%s, p=%s, q=%s'
% (delta, eta, m, n, p, q))
debug(' ap = %s, %s' % (list(g.an), list(g.aother)))
debug(' bq = %s, %s' % (list(g.bm), list(g.bother)))
debug(' cond_3=%s, cond_3*=%s, cond_4=%s' % (cond_3, cond_3_star, cond_4))
conds = []
# case 1
case1 = []
tmp1 = [1 <= n, p < q, 1 <= m]
tmp2 = [1 <= p, 1 <= m, Eq(q, p + 1), Not(And(Eq(n, 0), Eq(m, p + 1)))]
tmp3 = [1 <= p, Eq(q, p)]
for k in range(ceiling(delta/2) + 1):
tmp3 += [Ne(abs(arg(eta)), (delta - 2*k)*pi)]
tmp = [delta > 0, abs(arg(eta)) < delta*pi]
extra = [Ne(eta, 0), cond_3]
if helper:
extra = []
for t in [tmp1, tmp2, tmp3]:
case1 += [And(*(t + tmp + extra))]
conds += case1
debug(' case 1:', case1)
# case 2
extra = [cond_3]
if helper:
extra = []
case2 = [And(Eq(n, 0), p + 1 <= m, m <= q,
abs(arg(eta)) < delta*pi, *extra)]
conds += case2
debug(' case 2:', case2)
# case 3
extra = [cond_3, cond_4]
if helper:
extra = []
case3 = [And(p < q, 1 <= m, delta > 0, Eq(abs(arg(eta)), delta*pi),
*extra)]
case3 += [And(p <= q - 2, Eq(delta, 0), Eq(abs(arg(eta)), 0), *extra)]
conds += case3
debug(' case 3:', case3)
# TODO altered cases 4-7
# extra case from wofram functions site:
# (reproduced verbatim from Prudnikov, section 2.24.2)
# http://functions.wolfram.com/HypergeometricFunctions/MeijerG/21/02/01/
case_extra = []
case_extra += [Eq(p, q), Eq(delta, 0), Eq(arg(eta), 0), Ne(eta, 0)]
if not helper:
case_extra += [cond_3]
s = []
for a, b in zip(g.ap, g.bq):
s += [b - a]
case_extra += [re(Add(*s)) < 0]
case_extra = And(*case_extra)
conds += [case_extra]
debug(' extra case:', [case_extra])
case_extra_2 = [And(delta > 0, abs(arg(eta)) < delta*pi)]
if not helper:
case_extra_2 += [cond_3]
case_extra_2 = And(*case_extra_2)
conds += [case_extra_2]
debug(' second extra case:', [case_extra_2])
# TODO This leaves only one case from the three listed by Prudnikov.
# Investigate if these indeed cover everything; if so, remove the rest.
return Or(*conds)
def _int0oo_1(g, x):
r"""
Evaluate $\int_0^\infty g\, dx$ using G functions,
assuming the necessary conditions are fulfilled.
>>> from sympy.abc import a, b, c, d, x, y
>>> from sympy import meijerg
>>> from sympy.integrals.meijerint import _int0oo_1
>>> _int0oo_1(meijerg([a], [b], [c], [d], x*y), x)
gamma(-a)*gamma(c + 1)/(y*gamma(-d)*gamma(b + 1))
"""
# See [L, section 5.6.1]. Note that s=1.
from sympy import gamma, gammasimp, unpolarify
eta, _ = _get_coeff_exp(g.argument, x)
res = 1/eta
# XXX TODO we should reduce order first
for b in g.bm:
res *= gamma(b + 1)
for a in g.an:
res *= gamma(1 - a - 1)
for b in g.bother:
res /= gamma(1 - b - 1)
for a in g.aother:
res /= gamma(a + 1)
return gammasimp(unpolarify(res))
def _rewrite_saxena(fac, po, g1, g2, x, full_pb=False):
"""
Rewrite the integral fac*po*g1*g2 from 0 to oo in terms of G functions
with argument c*x.
Return C, f1, f2 such that integral C f1 f2 from 0 to infinity equals
integral fac po g1 g2 from 0 to infinity.
>>> from sympy.integrals.meijerint import _rewrite_saxena
>>> from sympy.abc import s, t, m
>>> from sympy import meijerg
>>> g1 = meijerg([], [], [0], [], s*t)
>>> g2 = meijerg([], [], [m/2], [-m/2], t**2/4)
>>> r = _rewrite_saxena(1, t**0, g1, g2, t)
>>> r[0]
s/(4*sqrt(pi))
>>> r[1]
meijerg(((), ()), ((-1/2, 0), ()), s**2*t/4)
>>> r[2]
meijerg(((), ()), ((m/2,), (-m/2,)), t/4)
"""
from sympy.core.numbers import ilcm
def pb(g):
a, b = _get_coeff_exp(g.argument, x)
per = g.get_period()
return meijerg(g.an, g.aother, g.bm, g.bother,
_my_principal_branch(a, per, full_pb)*x**b)
_, s = _get_coeff_exp(po, x)
_, b1 = _get_coeff_exp(g1.argument, x)
_, b2 = _get_coeff_exp(g2.argument, x)
if (b1 < 0) == True:
b1 = -b1
g1 = _flip_g(g1)
if (b2 < 0) == True:
b2 = -b2
g2 = _flip_g(g2)
if not b1.is_Rational or not b2.is_Rational:
return
m1, n1 = b1.p, b1.q
m2, n2 = b2.p, b2.q
tau = ilcm(m1*n2, m2*n1)
r1 = tau//(m1*n2)
r2 = tau//(m2*n1)
C1, g1 = _inflate_g(g1, r1)
C2, g2 = _inflate_g(g2, r2)
g1 = pb(g1)
g2 = pb(g2)
fac *= C1*C2
a1, b = _get_coeff_exp(g1.argument, x)
a2, _ = _get_coeff_exp(g2.argument, x)
# arbitrarily tack on the x**s part to g1
# TODO should we try both?
exp = (s + 1)/b - 1
fac = fac/(abs(b) * a1**exp)
def tr(l):
return [a + exp for a in l]
g1 = meijerg(tr(g1.an), tr(g1.aother), tr(g1.bm), tr(g1.bother), a1*x)
g2 = meijerg(g2.an, g2.aother, g2.bm, g2.bother, a2*x)
return powdenest(fac, polar=True), g1, g2
def _check_antecedents(g1, g2, x):
""" Return a condition under which the integral theorem applies. """
from sympy import re, Eq, Ne, cos, I, exp, sin, sign, unpolarify
from sympy import arg as arg_, unbranched_argument as arg
# Yes, this is madness.
# XXX TODO this is a testing *nightmare*
# NOTE if you update these conditions, please update the documentation as well
# The following conditions are found in
# [P], Section 2.24.1
#
# They are also reproduced (verbatim!) at
# http://functions.wolfram.com/HypergeometricFunctions/MeijerG/21/02/03/
#
# Note: k=l=r=alpha=1
sigma, _ = _get_coeff_exp(g1.argument, x)
omega, _ = _get_coeff_exp(g2.argument, x)
s, t, u, v = S([len(g1.bm), len(g1.an), len(g1.ap), len(g1.bq)])
m, n, p, q = S([len(g2.bm), len(g2.an), len(g2.ap), len(g2.bq)])
bstar = s + t - (u + v)/2
cstar = m + n - (p + q)/2
rho = g1.nu + (u - v)/2 + 1
mu = g2.nu + (p - q)/2 + 1
phi = q - p - (v - u)
eta = 1 - (v - u) - mu - rho
psi = (pi*(q - m - n) + abs(arg(omega)))/(q - p)
theta = (pi*(v - s - t) + abs(arg(sigma)))/(v - u)
_debug('Checking antecedents:')
_debug(' sigma=%s, s=%s, t=%s, u=%s, v=%s, b*=%s, rho=%s'
% (sigma, s, t, u, v, bstar, rho))
_debug(' omega=%s, m=%s, n=%s, p=%s, q=%s, c*=%s, mu=%s,'
% (omega, m, n, p, q, cstar, mu))
_debug(' phi=%s, eta=%s, psi=%s, theta=%s' % (phi, eta, psi, theta))
def _c1():
for g in [g1, g2]:
for i in g.an:
for j in g.bm:
diff = i - j
if diff.is_integer and diff.is_positive:
return False
return True
c1 = _c1()
c2 = And(*[re(1 + i + j) > 0 for i in g1.bm for j in g2.bm])
c3 = And(*[re(1 + i + j) < 1 + 1 for i in g1.an for j in g2.an])
c4 = And(*[(p - q)*re(1 + i - 1) - re(mu) > Rational(-3, 2) for i in g1.an])
c5 = And(*[(p - q)*re(1 + i) - re(mu) > Rational(-3, 2) for i in g1.bm])
c6 = And(*[(u - v)*re(1 + i - 1) - re(rho) > Rational(-3, 2) for i in g2.an])
c7 = And(*[(u - v)*re(1 + i) - re(rho) > Rational(-3, 2) for i in g2.bm])
c8 = (abs(phi) + 2*re((rho - 1)*(q - p) + (v - u)*(q - p) + (mu -
1)*(v - u)) > 0)
c9 = (abs(phi) - 2*re((rho - 1)*(q - p) + (v - u)*(q - p) + (mu -
1)*(v - u)) > 0)
c10 = (abs(arg(sigma)) < bstar*pi)
c11 = Eq(abs(arg(sigma)), bstar*pi)
c12 = (abs(arg(omega)) < cstar*pi)
c13 = Eq(abs(arg(omega)), cstar*pi)
# The following condition is *not* implemented as stated on the wolfram
# function site. In the book of Prudnikov there is an additional part
# (the And involving re()). However, I only have this book in russian, and
# I don't read any russian. The following condition is what other people
# have told me it means.
# Worryingly, it is different from the condition implemented in REDUCE.
# The REDUCE implementation:
# https://reduce-algebra.svn.sourceforge.net/svnroot/reduce-algebra/trunk/packages/defint/definta.red
# (search for tst14)
# The Wolfram alpha version:
# http://functions.wolfram.com/HypergeometricFunctions/MeijerG/21/02/03/03/0014/
z0 = exp(-(bstar + cstar)*pi*I)
zos = unpolarify(z0*omega/sigma)
zso = unpolarify(z0*sigma/omega)
if zos == 1/zso:
c14 = And(Eq(phi, 0), bstar + cstar <= 1,
Or(Ne(zos, 1), re(mu + rho + v - u) < 1,
re(mu + rho + q - p) < 1))
else:
def _cond(z):
'''Returns True if abs(arg(1-z)) < pi, avoiding arg(0).
Note: if `z` is 1 then arg is NaN. This raises a
TypeError on `NaN < pi`. Previously this gave `False` so
this behavior has been hardcoded here but someone should
check if this NaN is more serious! This NaN is triggered by
test_meijerint() in test_meijerint.py:
`meijerint_definite(exp(x), x, 0, I)`
'''
return z != 1 and abs(arg_(1 - z)) < pi
c14 = And(Eq(phi, 0), bstar - 1 + cstar <= 0,
Or(And(Ne(zos, 1), _cond(zos)),
And(re(mu + rho + v - u) < 1, Eq(zos, 1))))
c14_alt = And(Eq(phi, 0), cstar - 1 + bstar <= 0,
Or(And(Ne(zso, 1), _cond(zso)),
And(re(mu + rho + q - p) < 1, Eq(zso, 1))))
# Since r=k=l=1, in our case there is c14_alt which is the same as calling
# us with (g1, g2) = (g2, g1). The conditions below enumerate all cases
# (i.e. we don't have to try arguments reversed by hand), and indeed try
# all symmetric cases. (i.e. whenever there is a condition involving c14,
# there is also a dual condition which is exactly what we would get when g1,
# g2 were interchanged, *but c14 was unaltered*).
# Hence the following seems correct:
c14 = Or(c14, c14_alt)
'''
When `c15` is NaN (e.g. from `psi` being NaN as happens during
'test_issue_4992' and/or `theta` is NaN as in 'test_issue_6253',
both in `test_integrals.py`) the comparison to 0 formerly gave False
whereas now an error is raised. To keep the old behavior, the value
of NaN is replaced with False but perhaps a closer look at this condition
should be made: XXX how should conditions leading to c15=NaN be handled?
'''
try:
lambda_c = (q - p)*abs(omega)**(1/(q - p))*cos(psi) \
+ (v - u)*abs(sigma)**(1/(v - u))*cos(theta)
# the TypeError might be raised here, e.g. if lambda_c is NaN
if _eval_cond(lambda_c > 0) != False:
c15 = (lambda_c > 0)
else:
def lambda_s0(c1, c2):
return c1*(q - p)*abs(omega)**(1/(q - p))*sin(psi) \
+ c2*(v - u)*abs(sigma)**(1/(v - u))*sin(theta)
lambda_s = Piecewise(
((lambda_s0(+1, +1)*lambda_s0(-1, -1)),
And(Eq(arg(sigma), 0), Eq(arg(omega), 0))),
(lambda_s0(sign(arg(omega)), +1)*lambda_s0(sign(arg(omega)), -1),
And(Eq(arg(sigma), 0), Ne(arg(omega), 0))),
(lambda_s0(+1, sign(arg(sigma)))*lambda_s0(-1, sign(arg(sigma))),
And(Ne(arg(sigma), 0), Eq(arg(omega), 0))),
(lambda_s0(sign(arg(omega)), sign(arg(sigma))), True))
tmp = [lambda_c > 0,
And(Eq(lambda_c, 0), Ne(lambda_s, 0), re(eta) > -1),
And(Eq(lambda_c, 0), Eq(lambda_s, 0), re(eta) > 0)]
c15 = Or(*tmp)
except TypeError:
c15 = False
for cond, i in [(c1, 1), (c2, 2), (c3, 3), (c4, 4), (c5, 5), (c6, 6),
(c7, 7), (c8, 8), (c9, 9), (c10, 10), (c11, 11),
(c12, 12), (c13, 13), (c14, 14), (c15, 15)]:
_debug(' c%s:' % i, cond)
# We will return Or(*conds)
conds = []
def pr(count):
_debug(' case %s:' % count, conds[-1])
conds += [And(m*n*s*t != 0, bstar.is_positive is True, cstar.is_positive is True, c1, c2, c3, c10,
c12)] # 1
pr(1)
conds += [And(Eq(u, v), Eq(bstar, 0), cstar.is_positive is True, sigma.is_positive is True, re(rho) < 1,
c1, c2, c3, c12)] # 2
pr(2)
conds += [And(Eq(p, q), Eq(cstar, 0), bstar.is_positive is True, omega.is_positive is True, re(mu) < 1,
c1, c2, c3, c10)] # 3
pr(3)
conds += [And(Eq(p, q), Eq(u, v), Eq(bstar, 0), Eq(cstar, 0),
sigma.is_positive is True, omega.is_positive is True, re(mu) < 1, re(rho) < 1,
Ne(sigma, omega), c1, c2, c3)] # 4
pr(4)
conds += [And(Eq(p, q), Eq(u, v), Eq(bstar, 0), Eq(cstar, 0),
sigma.is_positive is True, omega.is_positive is True, re(mu + rho) < 1,
Ne(omega, sigma), c1, c2, c3)] # 5
pr(5)
conds += [And(p > q, s.is_positive is True, bstar.is_positive is True, cstar >= 0,
c1, c2, c3, c5, c10, c13)] # 6
pr(6)
conds += [And(p < q, t.is_positive is True, bstar.is_positive is True, cstar >= 0,
c1, c2, c3, c4, c10, c13)] # 7
pr(7)
conds += [And(u > v, m.is_positive is True, cstar.is_positive is True, bstar >= 0,
c1, c2, c3, c7, c11, c12)] # 8
pr(8)
conds += [And(u < v, n.is_positive is True, cstar.is_positive is True, bstar >= 0,
c1, c2, c3, c6, c11, c12)] # 9
pr(9)
conds += [And(p > q, Eq(u, v), Eq(bstar, 0), cstar >= 0, sigma.is_positive is True,
re(rho) < 1, c1, c2, c3, c5, c13)] # 10
pr(10)
conds += [And(p < q, Eq(u, v), Eq(bstar, 0), cstar >= 0, sigma.is_positive is True,
re(rho) < 1, c1, c2, c3, c4, c13)] # 11
pr(11)
conds += [And(Eq(p, q), u > v, bstar >= 0, Eq(cstar, 0), omega.is_positive is True,
re(mu) < 1, c1, c2, c3, c7, c11)] # 12
pr(12)
conds += [And(Eq(p, q), u < v, bstar >= 0, Eq(cstar, 0), omega.is_positive is True,
re(mu) < 1, c1, c2, c3, c6, c11)] # 13
pr(13)
conds += [And(p < q, u > v, bstar >= 0, cstar >= 0,
c1, c2, c3, c4, c7, c11, c13)] # 14
pr(14)
conds += [And(p > q, u < v, bstar >= 0, cstar >= 0,
c1, c2, c3, c5, c6, c11, c13)] # 15
pr(15)
conds += [And(p > q, u > v, bstar >= 0, cstar >= 0,
c1, c2, c3, c5, c7, c8, c11, c13, c14)] # 16
pr(16)
conds += [And(p < q, u < v, bstar >= 0, cstar >= 0,
c1, c2, c3, c4, c6, c9, c11, c13, c14)] # 17
pr(17)
conds += [And(Eq(t, 0), s.is_positive is True, bstar.is_positive is True, phi.is_positive is True, c1, c2, c10)] # 18
pr(18)
conds += [And(Eq(s, 0), t.is_positive is True, bstar.is_positive is True, phi.is_negative is True, c1, c3, c10)] # 19
pr(19)
conds += [And(Eq(n, 0), m.is_positive is True, cstar.is_positive is True, phi.is_negative is True, c1, c2, c12)] # 20
pr(20)
conds += [And(Eq(m, 0), n.is_positive is True, cstar.is_positive is True, phi.is_positive is True, c1, c3, c12)] # 21
pr(21)
conds += [And(Eq(s*t, 0), bstar.is_positive is True, cstar.is_positive is True,
c1, c2, c3, c10, c12)] # 22
pr(22)
conds += [And(Eq(m*n, 0), bstar.is_positive is True, cstar.is_positive is True,
c1, c2, c3, c10, c12)] # 23
pr(23)
# The following case is from [Luke1969]. As far as I can tell, it is *not*
# covered by Prudnikov's.
# Let G1 and G2 be the two G-functions. Suppose the integral exists from
# 0 to a > 0 (this is easy the easy part), that G1 is exponential decay at
# infinity, and that the mellin transform of G2 exists.
# Then the integral exists.
mt1_exists = _check_antecedents_1(g1, x, helper=True)
mt2_exists = _check_antecedents_1(g2, x, helper=True)
conds += [And(mt2_exists, Eq(t, 0), u < s, bstar.is_positive is True, c10, c1, c2, c3)]
pr('E1')
conds += [And(mt2_exists, Eq(s, 0), v < t, bstar.is_positive is True, c10, c1, c2, c3)]
pr('E2')
conds += [And(mt1_exists, Eq(n, 0), p < m, cstar.is_positive is True, c12, c1, c2, c3)]
pr('E3')
conds += [And(mt1_exists, Eq(m, 0), q < n, cstar.is_positive is True, c12, c1, c2, c3)]
pr('E4')
# Let's short-circuit if this worked ...
# the rest is corner-cases and terrible to read.
r = Or(*conds)
if _eval_cond(r) != False:
return r
conds += [And(m + n > p, Eq(t, 0), Eq(phi, 0), s.is_positive is True, bstar.is_positive is True, cstar.is_negative is True,
abs(arg(omega)) < (m + n - p + 1)*pi,
c1, c2, c10, c14, c15)] # 24
pr(24)
conds += [And(m + n > q, Eq(s, 0), Eq(phi, 0), t.is_positive is True, bstar.is_positive is True, cstar.is_negative is True,
abs(arg(omega)) < (m + n - q + 1)*pi,
c1, c3, c10, c14, c15)] # 25
pr(25)
conds += [And(Eq(p, q - 1), Eq(t, 0), Eq(phi, 0), s.is_positive is True, bstar.is_positive is True,
cstar >= 0, cstar*pi < abs(arg(omega)),
c1, c2, c10, c14, c15)] # 26
pr(26)
conds += [And(Eq(p, q + 1), Eq(s, 0), Eq(phi, 0), t.is_positive is True, bstar.is_positive is True,
cstar >= 0, cstar*pi < abs(arg(omega)),
c1, c3, c10, c14, c15)] # 27
pr(27)
conds += [And(p < q - 1, Eq(t, 0), Eq(phi, 0), s.is_positive is True, bstar.is_positive is True,
cstar >= 0, cstar*pi < abs(arg(omega)),
abs(arg(omega)) < (m + n - p + 1)*pi,
c1, c2, c10, c14, c15)] # 28
pr(28)
conds += [And(
p > q + 1, Eq(s, 0), Eq(phi, 0), t.is_positive is True, bstar.is_positive is True, cstar >= 0,
cstar*pi < abs(arg(omega)),
abs(arg(omega)) < (m + n - q + 1)*pi,
c1, c3, c10, c14, c15)] # 29
pr(29)
conds += [And(Eq(n, 0), Eq(phi, 0), s + t > 0, m.is_positive is True, cstar.is_positive is True, bstar.is_negative is True,
abs(arg(sigma)) < (s + t - u + 1)*pi,
c1, c2, c12, c14, c15)] # 30
pr(30)
conds += [And(Eq(m, 0), Eq(phi, 0), s + t > v, n.is_positive is True, cstar.is_positive is True, bstar.is_negative is True,
abs(arg(sigma)) < (s + t - v + 1)*pi,
c1, c3, c12, c14, c15)] # 31
pr(31)
conds += [And(Eq(n, 0), Eq(phi, 0), Eq(u, v - 1), m.is_positive is True, cstar.is_positive is True,
bstar >= 0, bstar*pi < abs(arg(sigma)),
abs(arg(sigma)) < (bstar + 1)*pi,
c1, c2, c12, c14, c15)] # 32
pr(32)
conds += [And(Eq(m, 0), Eq(phi, 0), Eq(u, v + 1), n.is_positive is True, cstar.is_positive is True,
bstar >= 0, bstar*pi < abs(arg(sigma)),
abs(arg(sigma)) < (bstar + 1)*pi,
c1, c3, c12, c14, c15)] # 33
pr(33)
conds += [And(
Eq(n, 0), Eq(phi, 0), u < v - 1, m.is_positive is True, cstar.is_positive is True, bstar >= 0,
bstar*pi < abs(arg(sigma)),
abs(arg(sigma)) < (s + t - u + 1)*pi,
c1, c2, c12, c14, c15)] # 34
pr(34)
conds += [And(
Eq(m, 0), Eq(phi, 0), u > v + 1, n.is_positive is True, cstar.is_positive is True, bstar >= 0,
bstar*pi < abs(arg(sigma)),
abs(arg(sigma)) < (s + t - v + 1)*pi,
c1, c3, c12, c14, c15)] # 35
pr(35)
return Or(*conds)
# NOTE An alternative, but as far as I can tell weaker, set of conditions
# can be found in [L, section 5.6.2].
def _int0oo(g1, g2, x):
"""
Express integral from zero to infinity g1*g2 using a G function,
assuming the necessary conditions are fulfilled.
>>> from sympy.integrals.meijerint import _int0oo
>>> from sympy.abc import s, t, m
>>> from sympy import meijerg, S
>>> g1 = meijerg([], [], [-S(1)/2, 0], [], s**2*t/4)
>>> g2 = meijerg([], [], [m/2], [-m/2], t/4)
>>> _int0oo(g1, g2, t)
4*meijerg(((1/2, 0), ()), ((m/2,), (-m/2,)), s**(-2))/s**2
"""
# See: [L, section 5.6.2, equation (1)]
eta, _ = _get_coeff_exp(g1.argument, x)
omega, _ = _get_coeff_exp(g2.argument, x)
def neg(l):
return [-x for x in l]
a1 = neg(g1.bm) + list(g2.an)
a2 = list(g2.aother) + neg(g1.bother)
b1 = neg(g1.an) + list(g2.bm)
b2 = list(g2.bother) + neg(g1.aother)
return meijerg(a1, a2, b1, b2, omega/eta)/eta
def _rewrite_inversion(fac, po, g, x):
""" Absorb ``po`` == x**s into g. """
_, s = _get_coeff_exp(po, x)
a, b = _get_coeff_exp(g.argument, x)
def tr(l):
return [t + s/b for t in l]
return (powdenest(fac/a**(s/b), polar=True),
meijerg(tr(g.an), tr(g.aother), tr(g.bm), tr(g.bother), g.argument))
def _check_antecedents_inversion(g, x):
""" Check antecedents for the laplace inversion integral. """
from sympy import re, im, Or, And, Eq, exp, I, Add, nan, Ne
_debug('Checking antecedents for inversion:')
z = g.argument
_, e = _get_coeff_exp(z, x)
if e < 0:
_debug(' Flipping G.')
# We want to assume that argument gets large as |x| -> oo
return _check_antecedents_inversion(_flip_g(g), x)
def statement_half(a, b, c, z, plus):
coeff, exponent = _get_coeff_exp(z, x)
a *= exponent
b *= coeff**c
c *= exponent
conds = []
wp = b*exp(I*re(c)*pi/2)
wm = b*exp(-I*re(c)*pi/2)
if plus:
w = wp
else:
w = wm
conds += [And(Or(Eq(b, 0), re(c) <= 0), re(a) <= -1)]
conds += [And(Ne(b, 0), Eq(im(c), 0), re(c) > 0, re(w) < 0)]
conds += [And(Ne(b, 0), Eq(im(c), 0), re(c) > 0, re(w) <= 0,
re(a) <= -1)]
return Or(*conds)
def statement(a, b, c, z):
""" Provide a convergence statement for z**a * exp(b*z**c),
c/f sphinx docs. """
return And(statement_half(a, b, c, z, True),
statement_half(a, b, c, z, False))
# Notations from [L], section 5.7-10
m, n, p, q = S([len(g.bm), len(g.an), len(g.ap), len(g.bq)])
tau = m + n - p
nu = q - m - n
rho = (tau - nu)/2
sigma = q - p
if sigma == 1:
epsilon = S.Half
elif sigma > 1:
epsilon = 1
else:
epsilon = nan
theta = ((1 - sigma)/2 + Add(*g.bq) - Add(*g.ap))/sigma
delta = g.delta
_debug(' m=%s, n=%s, p=%s, q=%s, tau=%s, nu=%s, rho=%s, sigma=%s' % (
m, n, p, q, tau, nu, rho, sigma))
_debug(' epsilon=%s, theta=%s, delta=%s' % (epsilon, theta, delta))
# First check if the computation is valid.
if not (g.delta >= e/2 or (p >= 1 and p >= q)):
_debug(' Computation not valid for these parameters.')
return False
# Now check if the inversion integral exists.
# Test "condition A"
for a in g.an:
for b in g.bm:
if (a - b).is_integer and a > b:
_debug(' Not a valid G function.')
return False
# There are two cases. If p >= q, we can directly use a slater expansion
# like [L], 5.2 (11). Note in particular that the asymptotics of such an
# expansion even hold when some of the parameters differ by integers, i.e.
# the formula itself would not be valid! (b/c G functions are cts. in their
# parameters)
# When p < q, we need to use the theorems of [L], 5.10.
if p >= q:
_debug(' Using asymptotic Slater expansion.')
return And(*[statement(a - 1, 0, 0, z) for a in g.an])
def E(z):
return And(*[statement(a - 1, 0, 0, z) for a in g.an])
def H(z):
return statement(theta, -sigma, 1/sigma, z)
def Hp(z):
return statement_half(theta, -sigma, 1/sigma, z, True)
def Hm(z):
return statement_half(theta, -sigma, 1/sigma, z, False)
# [L], section 5.10
conds = []
# Theorem 1 -- p < q from test above
conds += [And(1 <= n, 1 <= m, rho*pi - delta >= pi/2, delta > 0,
E(z*exp(I*pi*(nu + 1))))]
# Theorem 2, statements (2) and (3)
conds += [And(p + 1 <= m, m + 1 <= q, delta > 0, delta < pi/2, n == 0,
(m - p + 1)*pi - delta >= pi/2,
Hp(z*exp(I*pi*(q - m))), Hm(z*exp(-I*pi*(q - m))))]
# Theorem 2, statement (5) -- p < q from test above
conds += [And(m == q, n == 0, delta > 0,
(sigma + epsilon)*pi - delta >= pi/2, H(z))]
# Theorem 3, statements (6) and (7)
conds += [And(Or(And(p <= q - 2, 1 <= tau, tau <= sigma/2),
And(p + 1 <= m + n, m + n <= (p + q)/2)),
delta > 0, delta < pi/2, (tau + 1)*pi - delta >= pi/2,
Hp(z*exp(I*pi*nu)), Hm(z*exp(-I*pi*nu)))]
# Theorem 4, statements (10) and (11) -- p < q from test above
conds += [And(1 <= m, rho > 0, delta > 0, delta + rho*pi < pi/2,
(tau + epsilon)*pi - delta >= pi/2,
Hp(z*exp(I*pi*nu)), Hm(z*exp(-I*pi*nu)))]
# Trivial case
conds += [m == 0]
# TODO
# Theorem 5 is quite general
# Theorem 6 contains special cases for q=p+1
return Or(*conds)
def _int_inversion(g, x, t):
"""
Compute the laplace inversion integral, assuming the formula applies.
"""
b, a = _get_coeff_exp(g.argument, x)
C, g = _inflate_fox_h(meijerg(g.an, g.aother, g.bm, g.bother, b/t**a), -a)
return C/t*g
####################################################################
# Finally, the real meat.
####################################################################
_lookup_table = None
@cacheit
@timeit
def _rewrite_single(f, x, recursive=True):
"""
Try to rewrite f as a sum of single G functions of the form
C*x**s*G(a*x**b), where b is a rational number and C is independent of x.
We guarantee that result.argument.as_coeff_mul(x) returns (a, (x**b,))
or (a, ()).
Returns a list of tuples (C, s, G) and a condition cond.
Returns None on failure.
"""
from sympy import polarify, unpolarify, oo, zoo, Tuple
global _lookup_table
if not _lookup_table:
_lookup_table = {}
_create_lookup_table(_lookup_table)
if isinstance(f, meijerg):
from sympy import factor
coeff, m = factor(f.argument, x).as_coeff_mul(x)
if len(m) > 1:
return None
m = m[0]
if m.is_Pow:
if m.base != x or not m.exp.is_Rational:
return None
elif m != x:
return None
return [(1, 0, meijerg(f.an, f.aother, f.bm, f.bother, coeff*m))], True
f_ = f
f = f.subs(x, z)
t = _mytype(f, z)
if t in _lookup_table:
l = _lookup_table[t]
for formula, terms, cond, hint in l:
subs = f.match(formula, old=True)
if subs:
subs_ = {}
for fro, to in subs.items():
subs_[fro] = unpolarify(polarify(to, lift=True),
exponents_only=True)
subs = subs_
if not isinstance(hint, bool):
hint = hint.subs(subs)
if hint == False:
continue
if not isinstance(cond, (bool, BooleanAtom)):
cond = unpolarify(cond.subs(subs))
if _eval_cond(cond) == False:
continue
if not isinstance(terms, list):
terms = terms(subs)
res = []
for fac, g in terms:
r1 = _get_coeff_exp(unpolarify(fac.subs(subs).subs(z, x),
exponents_only=True), x)
try:
g = g.subs(subs).subs(z, x)
except ValueError:
continue
# NOTE these substitutions can in principle introduce oo,
# zoo and other absurdities. It shouldn't matter,
# but better be safe.
if Tuple(*(r1 + (g,))).has(oo, zoo, -oo):
continue
g = meijerg(g.an, g.aother, g.bm, g.bother,
unpolarify(g.argument, exponents_only=True))
res.append(r1 + (g,))
if res:
return res, cond
# try recursive mellin transform
if not recursive:
return None
_debug('Trying recursive Mellin transform method.')
from sympy.integrals.transforms import (mellin_transform,
inverse_mellin_transform, IntegralTransformError,
MellinTransformStripError)
from sympy import oo, nan, zoo, simplify, cancel
def my_imt(F, s, x, strip):
""" Calling simplify() all the time is slow and not helpful, since
most of the time it only factors things in a way that has to be
un-done anyway. But sometimes it can remove apparent poles. """
# XXX should this be in inverse_mellin_transform?
try:
return inverse_mellin_transform(F, s, x, strip,
as_meijerg=True, needeval=True)
except MellinTransformStripError:
return inverse_mellin_transform(
simplify(cancel(expand(F))), s, x, strip,
as_meijerg=True, needeval=True)
f = f_
s = _dummy('s', 'rewrite-single', f)
# to avoid infinite recursion, we have to force the two g functions case
def my_integrator(f, x):
from sympy import Integral, hyperexpand
r = _meijerint_definite_4(f, x, only_double=True)
if r is not None:
res, cond = r
res = _my_unpolarify(hyperexpand(res, rewrite='nonrepsmall'))
return Piecewise((res, cond),
(Integral(f, (x, 0, oo)), True))
return Integral(f, (x, 0, oo))
try:
F, strip, _ = mellin_transform(f, x, s, integrator=my_integrator,
simplify=False, needeval=True)
g = my_imt(F, s, x, strip)
except IntegralTransformError:
g = None
if g is None:
# We try to find an expression by analytic continuation.
# (also if the dummy is already in the expression, there is no point in
# putting in another one)
a = _dummy_('a', 'rewrite-single')
if a not in f.free_symbols and _is_analytic(f, x):
try:
F, strip, _ = mellin_transform(f.subs(x, a*x), x, s,
integrator=my_integrator,
needeval=True, simplify=False)
g = my_imt(F, s, x, strip).subs(a, 1)
except IntegralTransformError:
g = None
if g is None or g.has(oo, nan, zoo):
_debug('Recursive Mellin transform failed.')
return None
args = Add.make_args(g)
res = []
for f in args:
c, m = f.as_coeff_mul(x)
if len(m) > 1:
raise NotImplementedError('Unexpected form...')
g = m[0]
a, b = _get_coeff_exp(g.argument, x)
res += [(c, 0, meijerg(g.an, g.aother, g.bm, g.bother,
unpolarify(polarify(
a, lift=True), exponents_only=True)
*x**b))]
_debug('Recursive Mellin transform worked:', g)
return res, True
def _rewrite1(f, x, recursive=True):
"""
Try to rewrite f using a (sum of) single G functions with argument a*x**b.
Return fac, po, g such that f = fac*po*g, fac is independent of x
and po = x**s.
Here g is a result from _rewrite_single.
Return None on failure.
"""
fac, po, g = _split_mul(f, x)
g = _rewrite_single(g, x, recursive)
if g:
return fac, po, g[0], g[1]
def _rewrite2(f, x):
"""
Try to rewrite f as a product of two G functions of arguments a*x**b.
Return fac, po, g1, g2 such that f = fac*po*g1*g2, where fac is
independent of x and po is x**s.
Here g1 and g2 are results of _rewrite_single.
Returns None on failure.
"""
fac, po, g = _split_mul(f, x)
if any(_rewrite_single(expr, x, False) is None for expr in _mul_args(g)):
return None
l = _mul_as_two_parts(g)
if not l:
return None
l = list(ordered(l, [
lambda p: max(len(_exponents(p[0], x)), len(_exponents(p[1], x))),
lambda p: max(len(_functions(p[0], x)), len(_functions(p[1], x))),
lambda p: max(len(_find_splitting_points(p[0], x)),
len(_find_splitting_points(p[1], x)))]))
for recursive in [False, True]:
for fac1, fac2 in l:
g1 = _rewrite_single(fac1, x, recursive)
g2 = _rewrite_single(fac2, x, recursive)
if g1 and g2:
cond = And(g1[1], g2[1])
if cond != False:
return fac, po, g1[0], g2[0], cond
def meijerint_indefinite(f, x):
"""
Compute an indefinite integral of ``f`` by rewriting it as a G function.
Examples
========
>>> from sympy.integrals.meijerint import meijerint_indefinite
>>> from sympy import sin
>>> from sympy.abc import x
>>> meijerint_indefinite(sin(x), x)
-cos(x)
"""
from sympy import hyper, meijerg
results = []
for a in sorted(_find_splitting_points(f, x) | {S.Zero}, key=default_sort_key):
res = _meijerint_indefinite_1(f.subs(x, x + a), x)
if not res:
continue
res = res.subs(x, x - a)
if _has(res, hyper, meijerg):
results.append(res)
else:
return res
if f.has(HyperbolicFunction):
_debug('Try rewriting hyperbolics in terms of exp.')
rv = meijerint_indefinite(
_rewrite_hyperbolics_as_exp(f), x)
if rv:
if not type(rv) is list:
return collect(factor_terms(rv), rv.atoms(exp))
results.extend(rv)
if results:
return next(ordered(results))
def _meijerint_indefinite_1(f, x):
""" Helper that does not attempt any substitution. """
from sympy import Integral, piecewise_fold, nan, zoo
_debug('Trying to compute the indefinite integral of', f, 'wrt', x)
gs = _rewrite1(f, x)
if gs is None:
# Note: the code that calls us will do expand() and try again
return None
fac, po, gl, cond = gs
_debug(' could rewrite:', gs)
res = S.Zero
for C, s, g in gl:
a, b = _get_coeff_exp(g.argument, x)
_, c = _get_coeff_exp(po, x)
c += s
# we do a substitution t=a*x**b, get integrand fac*t**rho*g
fac_ = fac * C / (b*a**((1 + c)/b))
rho = (c + 1)/b - 1
# we now use t**rho*G(params, t) = G(params + rho, t)
# [L, page 150, equation (4)]
# and integral G(params, t) dt = G(1, params+1, 0, t)
# (or a similar expression with 1 and 0 exchanged ... pick the one
# which yields a well-defined function)
# [R, section 5]
# (Note that this dummy will immediately go away again, so we
# can safely pass S.One for ``expr``.)
t = _dummy('t', 'meijerint-indefinite', S.One)
def tr(p):
return [a + rho + 1 for a in p]
if any(b.is_integer and (b <= 0) == True for b in tr(g.bm)):
r = -meijerg(
tr(g.an), tr(g.aother) + [1], tr(g.bm) + [0], tr(g.bother), t)
else:
r = meijerg(
tr(g.an) + [1], tr(g.aother), tr(g.bm), tr(g.bother) + [0], t)
# The antiderivative is most often expected to be defined
# in the neighborhood of x = 0.
if b.is_extended_nonnegative and not f.subs(x, 0).has(nan, zoo):
place = 0 # Assume we can expand at zero
else:
place = None
r = hyperexpand(r.subs(t, a*x**b), place=place)
# now substitute back
# Note: we really do want the powers of x to combine.
res += powdenest(fac_*r, polar=True)
def _clean(res):
"""This multiplies out superfluous powers of x we created, and chops off
constants:
>> _clean(x*(exp(x)/x - 1/x) + 3)
exp(x)
cancel is used before mul_expand since it is possible for an
expression to have an additive constant that doesn't become isolated
with simple expansion. Such a situation was identified in issue 6369:
>>> from sympy import sqrt, cancel
>>> from sympy.abc import x
>>> a = sqrt(2*x + 1)
>>> bad = (3*x*a**5 + 2*x - a**5 + 1)/a**2
>>> bad.expand().as_independent(x)[0]
0
>>> cancel(bad).expand().as_independent(x)[0]
1
"""
from sympy import cancel
res = expand_mul(cancel(res), deep=False)
return Add._from_args(res.as_coeff_add(x)[1])
res = piecewise_fold(res)
if res.is_Piecewise:
newargs = []
for expr, cond in res.args:
expr = _my_unpolarify(_clean(expr))
newargs += [(expr, cond)]
res = Piecewise(*newargs)
else:
res = _my_unpolarify(_clean(res))
return Piecewise((res, _my_unpolarify(cond)), (Integral(f, x), True))
@timeit
def meijerint_definite(f, x, a, b):
"""
Integrate ``f`` over the interval [``a``, ``b``], by rewriting it as a product
of two G functions, or as a single G function.
Return res, cond, where cond are convergence conditions.
Examples
========
>>> from sympy.integrals.meijerint import meijerint_definite
>>> from sympy import exp, oo
>>> from sympy.abc import x
>>> meijerint_definite(exp(-x**2), x, -oo, oo)
(sqrt(pi), True)
This function is implemented as a succession of functions
meijerint_definite, _meijerint_definite_2, _meijerint_definite_3,
_meijerint_definite_4. Each function in the list calls the next one
(presumably) several times. This means that calling meijerint_definite
can be very costly.
"""
# This consists of three steps:
# 1) Change the integration limits to 0, oo
# 2) Rewrite in terms of G functions
# 3) Evaluate the integral
#
# There are usually several ways of doing this, and we want to try all.
# This function does (1), calls _meijerint_definite_2 for step (2).
from sympy import arg, exp, I, And, DiracDelta, SingularityFunction
_debug('Integrating', f, 'wrt %s from %s to %s.' % (x, a, b))
if f.has(DiracDelta):
_debug('Integrand has DiracDelta terms - giving up.')
return None
if f.has(SingularityFunction):
_debug('Integrand has Singularity Function terms - giving up.')
return None
f_, x_, a_, b_ = f, x, a, b
# Let's use a dummy in case any of the boundaries has x.
d = Dummy('x')
f = f.subs(x, d)
x = d
if a == b:
return (S.Zero, True)
results = []
if a is -oo and b is not oo:
return meijerint_definite(f.subs(x, -x), x, -b, -a)
elif a is -oo:
# Integrating -oo to oo. We need to find a place to split the integral.
_debug(' Integrating -oo to +oo.')
innermost = _find_splitting_points(f, x)
_debug(' Sensible splitting points:', innermost)
for c in sorted(innermost, key=default_sort_key, reverse=True) + [S.Zero]:
_debug(' Trying to split at', c)
if not c.is_extended_real:
_debug(' Non-real splitting point.')
continue
res1 = _meijerint_definite_2(f.subs(x, x + c), x)
if res1 is None:
_debug(' But could not compute first integral.')
continue
res2 = _meijerint_definite_2(f.subs(x, c - x), x)
if res2 is None:
_debug(' But could not compute second integral.')
continue
res1, cond1 = res1
res2, cond2 = res2
cond = _condsimp(And(cond1, cond2))
if cond == False:
_debug(' But combined condition is always false.')
continue
res = res1 + res2
return res, cond
elif a is oo:
res = meijerint_definite(f, x, b, oo)
return -res[0], res[1]
elif (a, b) == (0, oo):
# This is a common case - try it directly first.
res = _meijerint_definite_2(f, x)
if res:
if _has(res[0], meijerg):
results.append(res)
else:
return res
else:
if b is oo:
for split in _find_splitting_points(f, x):
if (a - split >= 0) == True:
_debug('Trying x -> x + %s' % split)
res = _meijerint_definite_2(f.subs(x, x + split)
*Heaviside(x + split - a), x)
if res:
if _has(res[0], meijerg):
results.append(res)
else:
return res
f = f.subs(x, x + a)
b = b - a
a = 0
if b != oo:
phi = exp(I*arg(b))
b = abs(b)
f = f.subs(x, phi*x)
f *= Heaviside(b - x)*phi
b = oo
_debug('Changed limits to', a, b)
_debug('Changed function to', f)
res = _meijerint_definite_2(f, x)
if res:
if _has(res[0], meijerg):
results.append(res)
else:
return res
if f_.has(HyperbolicFunction):
_debug('Try rewriting hyperbolics in terms of exp.')
rv = meijerint_definite(
_rewrite_hyperbolics_as_exp(f_), x_, a_, b_)
if rv:
if not type(rv) is list:
rv = (collect(factor_terms(rv[0]), rv[0].atoms(exp)),) + rv[1:]
return rv
results.extend(rv)
if results:
return next(ordered(results))
def _guess_expansion(f, x):
""" Try to guess sensible rewritings for integrand f(x). """
from sympy import expand_trig
from sympy.functions.elementary.trigonometric import TrigonometricFunction
res = [(f, 'original integrand')]
orig = res[-1][0]
saw = {orig}
expanded = expand_mul(orig)
if expanded not in saw:
res += [(expanded, 'expand_mul')]
saw.add(expanded)
expanded = expand(orig)
if expanded not in saw:
res += [(expanded, 'expand')]
saw.add(expanded)
if orig.has(TrigonometricFunction, HyperbolicFunction):
expanded = expand_mul(expand_trig(orig))
if expanded not in saw:
res += [(expanded, 'expand_trig, expand_mul')]
saw.add(expanded)
if orig.has(cos, sin):
reduced = sincos_to_sum(orig)
if reduced not in saw:
res += [(reduced, 'trig power reduction')]
saw.add(reduced)
return res
def _meijerint_definite_2(f, x):
"""
Try to integrate f dx from zero to infinity.
The body of this function computes various 'simplifications'
f1, f2, ... of f (e.g. by calling expand_mul(), trigexpand()
- see _guess_expansion) and calls _meijerint_definite_3 with each of
these in succession.
If _meijerint_definite_3 succeeds with any of the simplified functions,
returns this result.
"""
# This function does preparation for (2), calls
# _meijerint_definite_3 for (2) and (3) combined.
# use a positive dummy - we integrate from 0 to oo
# XXX if a nonnegative symbol is used there will be test failures
dummy = _dummy('x', 'meijerint-definite2', f, positive=True)
f = f.subs(x, dummy)
x = dummy
if f == 0:
return S.Zero, True
for g, explanation in _guess_expansion(f, x):
_debug('Trying', explanation)
res = _meijerint_definite_3(g, x)
if res:
return res
def _meijerint_definite_3(f, x):
"""
Try to integrate f dx from zero to infinity.
This function calls _meijerint_definite_4 to try to compute the
integral. If this fails, it tries using linearity.
"""
res = _meijerint_definite_4(f, x)
if res and res[1] != False:
return res
if f.is_Add:
_debug('Expanding and evaluating all terms.')
ress = [_meijerint_definite_4(g, x) for g in f.args]
if all(r is not None for r in ress):
conds = []
res = S.Zero
for r, c in ress:
res += r
conds += [c]
c = And(*conds)
if c != False:
return res, c
def _my_unpolarify(f):
from sympy import unpolarify
return _eval_cond(unpolarify(f))
@timeit
def _meijerint_definite_4(f, x, only_double=False):
"""
Try to integrate f dx from zero to infinity.
This function tries to apply the integration theorems found in literature,
i.e. it tries to rewrite f as either one or a product of two G-functions.
The parameter ``only_double`` is used internally in the recursive algorithm
to disable trying to rewrite f as a single G-function.
"""
# This function does (2) and (3)
_debug('Integrating', f)
# Try single G function.
if not only_double:
gs = _rewrite1(f, x, recursive=False)
if gs is not None:
fac, po, g, cond = gs
_debug('Could rewrite as single G function:', fac, po, g)
res = S.Zero
for C, s, f in g:
if C == 0:
continue
C, f = _rewrite_saxena_1(fac*C, po*x**s, f, x)
res += C*_int0oo_1(f, x)
cond = And(cond, _check_antecedents_1(f, x))
if cond == False:
break
cond = _my_unpolarify(cond)
if cond == False:
_debug('But cond is always False.')
else:
_debug('Result before branch substitutions is:', res)
return _my_unpolarify(hyperexpand(res)), cond
# Try two G functions.
gs = _rewrite2(f, x)
if gs is not None:
for full_pb in [False, True]:
fac, po, g1, g2, cond = gs
_debug('Could rewrite as two G functions:', fac, po, g1, g2)
res = S.Zero
for C1, s1, f1 in g1:
for C2, s2, f2 in g2:
r = _rewrite_saxena(fac*C1*C2, po*x**(s1 + s2),
f1, f2, x, full_pb)
if r is None:
_debug('Non-rational exponents.')
return
C, f1_, f2_ = r
_debug('Saxena subst for yielded:', C, f1_, f2_)
cond = And(cond, _check_antecedents(f1_, f2_, x))
if cond == False:
break
res += C*_int0oo(f1_, f2_, x)
else:
continue
break
cond = _my_unpolarify(cond)
if cond == False:
_debug('But cond is always False (full_pb=%s).' % full_pb)
else:
_debug('Result before branch substitutions is:', res)
if only_double:
return res, cond
return _my_unpolarify(hyperexpand(res)), cond
def meijerint_inversion(f, x, t):
r"""
Compute the inverse laplace transform
$\int_{c+i\infty}^{c-i\infty} f(x) e^{tx}\, dx$,
for real c larger than the real part of all singularities of f.
Note that ``t`` is always assumed real and positive.
Return None if the integral does not exist or could not be evaluated.
Examples
========
>>> from sympy.abc import x, t
>>> from sympy.integrals.meijerint import meijerint_inversion
>>> meijerint_inversion(1/x, x, t)
Heaviside(t)
"""
from sympy import exp, expand, log, Add, Mul, Heaviside
f_ = f
t_ = t
t = Dummy('t', polar=True) # We don't want sqrt(t**2) = abs(t) etc
f = f.subs(t_, t)
_debug('Laplace-inverting', f)
if not _is_analytic(f, x):
_debug('But expression is not analytic.')
return None
# Exponentials correspond to shifts; we filter them out and then
# shift the result later. If we are given an Add this will not
# work, but the calling code will take care of that.
shift = S.Zero
if f.is_Mul:
args = list(f.args)
elif isinstance(f, exp):
args = [f]
else:
args = None
if args:
newargs = []
exponentials = []
while args:
arg = args.pop()
if isinstance(arg, exp):
arg2 = expand(arg)
if arg2.is_Mul:
args += arg2.args
continue
try:
a, b = _get_coeff_exp(arg.args[0], x)
except _CoeffExpValueError:
b = 0
if b == 1:
exponentials.append(a)
else:
newargs.append(arg)
elif arg.is_Pow:
arg2 = expand(arg)
if arg2.is_Mul:
args += arg2.args
continue
if x not in arg.base.free_symbols:
try:
a, b = _get_coeff_exp(arg.exp, x)
except _CoeffExpValueError:
b = 0
if b == 1:
exponentials.append(a*log(arg.base))
newargs.append(arg)
else:
newargs.append(arg)
shift = Add(*exponentials)
f = Mul(*newargs)
if x not in f.free_symbols:
_debug('Expression consists of constant and exp shift:', f, shift)
from sympy import Eq, im
cond = Eq(im(shift), 0)
if cond == False:
_debug('but shift is nonreal, cannot be a Laplace transform')
return None
res = f*DiracDelta(t + shift)
_debug('Result is a delta function, possibly conditional:', res, cond)
# cond is True or Eq
return Piecewise((res.subs(t, t_), cond))
gs = _rewrite1(f, x)
if gs is not None:
fac, po, g, cond = gs
_debug('Could rewrite as single G function:', fac, po, g)
res = S.Zero
for C, s, f in g:
C, f = _rewrite_inversion(fac*C, po*x**s, f, x)
res += C*_int_inversion(f, x, t)
cond = And(cond, _check_antecedents_inversion(f, x))
if cond == False:
break
cond = _my_unpolarify(cond)
if cond == False:
_debug('But cond is always False.')
else:
_debug('Result before branch substitution:', res)
res = _my_unpolarify(hyperexpand(res))
if not res.has(Heaviside):
res *= Heaviside(t)
res = res.subs(t, t + shift)
if not isinstance(cond, bool):
cond = cond.subs(t, t + shift)
from sympy import InverseLaplaceTransform
return Piecewise((res.subs(t, t_), cond),
(InverseLaplaceTransform(f_.subs(t, t_), x, t_, None), True))
|
5255075a50c9530a641e120d066d4a1cb9f3dd2231264c9bac998f73b230b7dc | """Base class for all the objects in SymPy"""
from __future__ import print_function, division
from collections import defaultdict
from itertools import chain, zip_longest
from .assumptions import BasicMeta, ManagedProperties
from .cache import cacheit
from .sympify import _sympify, sympify, SympifyError
from .compatibility import iterable, ordered, Mapping
from .singleton import S
from inspect import getmro
def as_Basic(expr):
"""Return expr as a Basic instance using strict sympify
or raise a TypeError; this is just a wrapper to _sympify,
raising a TypeError instead of a SympifyError."""
from sympy.utilities.misc import func_name
try:
return _sympify(expr)
except SympifyError:
raise TypeError(
'Argument must be a Basic object, not `%s`' % func_name(
expr))
class Basic(metaclass=ManagedProperties):
"""
Base class for all objects in SymPy.
Conventions:
1) Always use ``.args``, when accessing parameters of some instance:
>>> from sympy import cot
>>> from sympy.abc import x, y
>>> cot(x).args
(x,)
>>> cot(x).args[0]
x
>>> (x*y).args
(x, y)
>>> (x*y).args[1]
y
2) Never use internal methods or variables (the ones prefixed with ``_``):
>>> cot(x)._args # do not use this, use cot(x).args instead
(x,)
"""
__slots__ = ('_mhash', # hash value
'_args', # arguments
'_assumptions'
)
# To be overridden with True in the appropriate subclasses
is_number = False
is_Atom = False
is_Symbol = False
is_symbol = False
is_Indexed = False
is_Dummy = False
is_Wild = False
is_Function = False
is_Add = False
is_Mul = False
is_Pow = False
is_Number = False
is_Float = False
is_Rational = False
is_Integer = False
is_NumberSymbol = False
is_Order = False
is_Derivative = False
is_Piecewise = False
is_Poly = False
is_AlgebraicNumber = False
is_Relational = False
is_Equality = False
is_Boolean = False
is_Not = False
is_Matrix = False
is_Vector = False
is_Point = False
is_MatAdd = False
is_MatMul = False
def __new__(cls, *args):
obj = object.__new__(cls)
obj._assumptions = cls.default_assumptions
obj._mhash = None # will be set by __hash__ method.
obj._args = args # all items in args must be Basic objects
return obj
def copy(self):
return self.func(*self.args)
def __reduce_ex__(self, proto):
""" Pickling support."""
return type(self), self.__getnewargs__(), self.__getstate__()
def __getnewargs__(self):
return self.args
def __getstate__(self):
return {}
def __setstate__(self, state):
for k, v in state.items():
setattr(self, k, v)
def __hash__(self):
# hash cannot be cached using cache_it because infinite recurrence
# occurs as hash is needed for setting cache dictionary keys
h = self._mhash
if h is None:
h = hash((type(self).__name__,) + self._hashable_content())
self._mhash = h
return h
def _hashable_content(self):
"""Return a tuple of information about self that can be used to
compute the hash. If a class defines additional attributes,
like ``name`` in Symbol, then this method should be updated
accordingly to return such relevant attributes.
Defining more than _hashable_content is necessary if __eq__ has
been defined by a class. See note about this in Basic.__eq__."""
return self._args
@property
def assumptions0(self):
"""
Return object `type` assumptions.
For example:
Symbol('x', real=True)
Symbol('x', integer=True)
are different objects. In other words, besides Python type (Symbol in
this case), the initial assumptions are also forming their typeinfo.
Examples
========
>>> from sympy import Symbol
>>> from sympy.abc import x
>>> x.assumptions0
{'commutative': True}
>>> x = Symbol("x", positive=True)
>>> x.assumptions0
{'commutative': True, 'complex': True, 'extended_negative': False,
'extended_nonnegative': True, 'extended_nonpositive': False,
'extended_nonzero': True, 'extended_positive': True, 'extended_real':
True, 'finite': True, 'hermitian': True, 'imaginary': False,
'infinite': False, 'negative': False, 'nonnegative': True,
'nonpositive': False, 'nonzero': True, 'positive': True, 'real':
True, 'zero': False}
"""
return {}
def compare(self, other):
"""
Return -1, 0, 1 if the object is smaller, equal, or greater than other.
Not in the mathematical sense. If the object is of a different type
from the "other" then their classes are ordered according to
the sorted_classes list.
Examples
========
>>> from sympy.abc import x, y
>>> x.compare(y)
-1
>>> x.compare(x)
0
>>> y.compare(x)
1
"""
# all redefinitions of __cmp__ method should start with the
# following lines:
if self is other:
return 0
n1 = self.__class__
n2 = other.__class__
c = (n1 > n2) - (n1 < n2)
if c:
return c
#
st = self._hashable_content()
ot = other._hashable_content()
c = (len(st) > len(ot)) - (len(st) < len(ot))
if c:
return c
for l, r in zip(st, ot):
l = Basic(*l) if isinstance(l, frozenset) else l
r = Basic(*r) if isinstance(r, frozenset) else r
if isinstance(l, Basic):
c = l.compare(r)
else:
c = (l > r) - (l < r)
if c:
return c
return 0
@staticmethod
def _compare_pretty(a, b):
from sympy.series.order import Order
if isinstance(a, Order) and not isinstance(b, Order):
return 1
if not isinstance(a, Order) and isinstance(b, Order):
return -1
if a.is_Rational and b.is_Rational:
l = a.p * b.q
r = b.p * a.q
return (l > r) - (l < r)
else:
from sympy.core.symbol import Wild
p1, p2, p3 = Wild("p1"), Wild("p2"), Wild("p3")
r_a = a.match(p1 * p2**p3)
if r_a and p3 in r_a:
a3 = r_a[p3]
r_b = b.match(p1 * p2**p3)
if r_b and p3 in r_b:
b3 = r_b[p3]
c = Basic.compare(a3, b3)
if c != 0:
return c
return Basic.compare(a, b)
@classmethod
def fromiter(cls, args, **assumptions):
"""
Create a new object from an iterable.
This is a convenience function that allows one to create objects from
any iterable, without having to convert to a list or tuple first.
Examples
========
>>> from sympy import Tuple
>>> Tuple.fromiter(i for i in range(5))
(0, 1, 2, 3, 4)
"""
return cls(*tuple(args), **assumptions)
@classmethod
def class_key(cls):
"""Nice order of classes. """
return 5, 0, cls.__name__
@cacheit
def sort_key(self, order=None):
"""
Return a sort key.
Examples
========
>>> from sympy.core import S, I
>>> sorted([S(1)/2, I, -I], key=lambda x: x.sort_key())
[1/2, -I, I]
>>> S("[x, 1/x, 1/x**2, x**2, x**(1/2), x**(1/4), x**(3/2)]")
[x, 1/x, x**(-2), x**2, sqrt(x), x**(1/4), x**(3/2)]
>>> sorted(_, key=lambda x: x.sort_key())
[x**(-2), 1/x, x**(1/4), sqrt(x), x, x**(3/2), x**2]
"""
# XXX: remove this when issue 5169 is fixed
def inner_key(arg):
if isinstance(arg, Basic):
return arg.sort_key(order)
else:
return arg
args = self._sorted_args
args = len(args), tuple([inner_key(arg) for arg in args])
return self.class_key(), args, S.One.sort_key(), S.One
def __eq__(self, other):
"""Return a boolean indicating whether a == b on the basis of
their symbolic trees.
This is the same as a.compare(b) == 0 but faster.
Notes
=====
If a class that overrides __eq__() needs to retain the
implementation of __hash__() from a parent class, the
interpreter must be told this explicitly by setting __hash__ =
<ParentClass>.__hash__. Otherwise the inheritance of __hash__()
will be blocked, just as if __hash__ had been explicitly set to
None.
References
==========
from http://docs.python.org/dev/reference/datamodel.html#object.__hash__
"""
if self is other:
return True
tself = type(self)
tother = type(other)
if tself is not tother:
try:
other = _sympify(other)
tother = type(other)
except SympifyError:
return NotImplemented
# As long as we have the ordering of classes (sympy.core),
# comparing types will be slow in Python 2, because it uses
# __cmp__. Until we can remove it
# (https://github.com/sympy/sympy/issues/4269), we only compare
# types in Python 2 directly if they actually have __ne__.
if type(tself).__ne__ is not type.__ne__:
if tself != tother:
return False
elif tself is not tother:
return False
return self._hashable_content() == other._hashable_content()
def __ne__(self, other):
"""``a != b`` -> Compare two symbolic trees and see whether they are different
this is the same as:
``a.compare(b) != 0``
but faster
"""
return not self == other
def dummy_eq(self, other, symbol=None):
"""
Compare two expressions and handle dummy symbols.
Examples
========
>>> from sympy import Dummy
>>> from sympy.abc import x, y
>>> u = Dummy('u')
>>> (u**2 + 1).dummy_eq(x**2 + 1)
True
>>> (u**2 + 1) == (x**2 + 1)
False
>>> (u**2 + y).dummy_eq(x**2 + y, x)
True
>>> (u**2 + y).dummy_eq(x**2 + y, y)
False
"""
s = self.as_dummy()
o = _sympify(other)
o = o.as_dummy()
dummy_symbols = [i for i in s.free_symbols if i.is_Dummy]
if len(dummy_symbols) == 1:
dummy = dummy_symbols.pop()
else:
return s == o
if symbol is None:
symbols = o.free_symbols
if len(symbols) == 1:
symbol = symbols.pop()
else:
return s == o
tmp = dummy.__class__()
return s.subs(dummy, tmp) == o.subs(symbol, tmp)
# Note, we always use the default ordering (lex) in __str__ and __repr__,
# regardless of the global setting. See issue 5487.
def __repr__(self):
"""Method to return the string representation.
Return the expression as a string.
"""
from sympy.printing import sstr
return sstr(self, order=None)
def __str__(self):
from sympy.printing import sstr
return sstr(self, order=None)
# We don't define _repr_png_ here because it would add a large amount of
# data to any notebook containing SymPy expressions, without adding
# anything useful to the notebook. It can still enabled manually, e.g.,
# for the qtconsole, with init_printing().
def _repr_latex_(self):
"""
IPython/Jupyter LaTeX printing
To change the behavior of this (e.g., pass in some settings to LaTeX),
use init_printing(). init_printing() will also enable LaTeX printing
for built in numeric types like ints and container types that contain
SymPy objects, like lists and dictionaries of expressions.
"""
from sympy.printing.latex import latex
s = latex(self, mode='plain')
return "$\\displaystyle %s$" % s
_repr_latex_orig = _repr_latex_
def atoms(self, *types):
"""Returns the atoms that form the current object.
By default, only objects that are truly atomic and can't
be divided into smaller pieces are returned: symbols, numbers,
and number symbols like I and pi. It is possible to request
atoms of any type, however, as demonstrated below.
Examples
========
>>> from sympy import I, pi, sin
>>> from sympy.abc import x, y
>>> (1 + x + 2*sin(y + I*pi)).atoms()
{1, 2, I, pi, x, y}
If one or more types are given, the results will contain only
those types of atoms.
>>> from sympy import Number, NumberSymbol, Symbol
>>> (1 + x + 2*sin(y + I*pi)).atoms(Symbol)
{x, y}
>>> (1 + x + 2*sin(y + I*pi)).atoms(Number)
{1, 2}
>>> (1 + x + 2*sin(y + I*pi)).atoms(Number, NumberSymbol)
{1, 2, pi}
>>> (1 + x + 2*sin(y + I*pi)).atoms(Number, NumberSymbol, I)
{1, 2, I, pi}
Note that I (imaginary unit) and zoo (complex infinity) are special
types of number symbols and are not part of the NumberSymbol class.
The type can be given implicitly, too:
>>> (1 + x + 2*sin(y + I*pi)).atoms(x) # x is a Symbol
{x, y}
Be careful to check your assumptions when using the implicit option
since ``S(1).is_Integer = True`` but ``type(S(1))`` is ``One``, a special type
of sympy atom, while ``type(S(2))`` is type ``Integer`` and will find all
integers in an expression:
>>> from sympy import S
>>> (1 + x + 2*sin(y + I*pi)).atoms(S(1))
{1}
>>> (1 + x + 2*sin(y + I*pi)).atoms(S(2))
{1, 2}
Finally, arguments to atoms() can select more than atomic atoms: any
sympy type (loaded in core/__init__.py) can be listed as an argument
and those types of "atoms" as found in scanning the arguments of the
expression recursively:
>>> from sympy import Function, Mul
>>> from sympy.core.function import AppliedUndef
>>> f = Function('f')
>>> (1 + f(x) + 2*sin(y + I*pi)).atoms(Function)
{f(x), sin(y + I*pi)}
>>> (1 + f(x) + 2*sin(y + I*pi)).atoms(AppliedUndef)
{f(x)}
>>> (1 + x + 2*sin(y + I*pi)).atoms(Mul)
{I*pi, 2*sin(y + I*pi)}
"""
if types:
types = tuple(
[t if isinstance(t, type) else type(t) for t in types])
nodes = preorder_traversal(self)
if types:
result = {node for node in nodes if isinstance(node, types)}
else:
result = {node for node in nodes if not node.args}
return result
@property
def free_symbols(self):
"""Return from the atoms of self those which are free symbols.
For most expressions, all symbols are free symbols. For some classes
this is not true. e.g. Integrals use Symbols for the dummy variables
which are bound variables, so Integral has a method to return all
symbols except those. Derivative keeps track of symbols with respect
to which it will perform a derivative; those are
bound variables, too, so it has its own free_symbols method.
Any other method that uses bound variables should implement a
free_symbols method."""
return set().union(*[a.free_symbols for a in self.args])
@property
def expr_free_symbols(self):
return set([])
def as_dummy(self):
"""Return the expression with any objects having structurally
bound symbols replaced with unique, canonical symbols within
the object in which they appear and having only the default
assumption for commutativity being True.
Examples
========
>>> from sympy import Integral, Symbol
>>> from sympy.abc import x, y
>>> r = Symbol('r', real=True)
>>> Integral(r, (r, x)).as_dummy()
Integral(_0, (_0, x))
>>> _.variables[0].is_real is None
True
Notes
=====
Any object that has structural dummy variables should have
a property, `bound_symbols` that returns a list of structural
dummy symbols of the object itself.
Lambda and Subs have bound symbols, but because of how they
are cached, they already compare the same regardless of their
bound symbols:
>>> from sympy import Lambda
>>> Lambda(x, x + 1) == Lambda(y, y + 1)
True
"""
def can(x):
d = {i: i.as_dummy() for i in x.bound_symbols}
# mask free that shadow bound
x = x.subs(d)
c = x.canonical_variables
# replace bound
x = x.xreplace(c)
# undo masking
x = x.xreplace(dict((v, k) for k, v in d.items()))
return x
return self.replace(
lambda x: hasattr(x, 'bound_symbols'),
lambda x: can(x))
@property
def canonical_variables(self):
"""Return a dictionary mapping any variable defined in
``self.bound_symbols`` to Symbols that do not clash
with any existing symbol in the expression.
Examples
========
>>> from sympy import Lambda
>>> from sympy.abc import x
>>> Lambda(x, 2*x).canonical_variables
{x: _0}
"""
from sympy.core.symbol import Symbol
from sympy.utilities.iterables import numbered_symbols
if not hasattr(self, 'bound_symbols'):
return {}
dums = numbered_symbols('_')
reps = {}
v = self.bound_symbols
# this free will include bound symbols that are not part of
# self's bound symbols
free = set([i.name for i in self.atoms(Symbol) - set(v)])
for v in v:
d = next(dums)
if v.is_Symbol:
while v.name == d.name or d.name in free:
d = next(dums)
reps[v] = d
return reps
def rcall(self, *args):
"""Apply on the argument recursively through the expression tree.
This method is used to simulate a common abuse of notation for
operators. For instance in SymPy the the following will not work:
``(x+Lambda(y, 2*y))(z) == x+2*z``,
however you can use
>>> from sympy import Lambda
>>> from sympy.abc import x, y, z
>>> (x + Lambda(y, 2*y)).rcall(z)
x + 2*z
"""
return Basic._recursive_call(self, args)
@staticmethod
def _recursive_call(expr_to_call, on_args):
"""Helper for rcall method."""
from sympy import Symbol
def the_call_method_is_overridden(expr):
for cls in getmro(type(expr)):
if '__call__' in cls.__dict__:
return cls != Basic
if callable(expr_to_call) and the_call_method_is_overridden(expr_to_call):
if isinstance(expr_to_call, Symbol): # XXX When you call a Symbol it is
return expr_to_call # transformed into an UndefFunction
else:
return expr_to_call(*on_args)
elif expr_to_call.args:
args = [Basic._recursive_call(
sub, on_args) for sub in expr_to_call.args]
return type(expr_to_call)(*args)
else:
return expr_to_call
def is_hypergeometric(self, k):
from sympy.simplify import hypersimp
return hypersimp(self, k) is not None
@property
def is_comparable(self):
"""Return True if self can be computed to a real number
(or already is a real number) with precision, else False.
Examples
========
>>> from sympy import exp_polar, pi, I
>>> (I*exp_polar(I*pi/2)).is_comparable
True
>>> (I*exp_polar(I*pi*2)).is_comparable
False
A False result does not mean that `self` cannot be rewritten
into a form that would be comparable. For example, the
difference computed below is zero but without simplification
it does not evaluate to a zero with precision:
>>> e = 2**pi*(1 + 2**pi)
>>> dif = e - e.expand()
>>> dif.is_comparable
False
>>> dif.n(2)._prec
1
"""
is_extended_real = self.is_extended_real
if is_extended_real is False:
return False
if not self.is_number:
return False
# don't re-eval numbers that are already evaluated since
# this will create spurious precision
n, i = [p.evalf(2) if not p.is_Number else p
for p in self.as_real_imag()]
if not (i.is_Number and n.is_Number):
return False
if i:
# if _prec = 1 we can't decide and if not,
# the answer is False because numbers with
# imaginary parts can't be compared
# so return False
return False
else:
return n._prec != 1
@property
def func(self):
"""
The top-level function in an expression.
The following should hold for all objects::
>> x == x.func(*x.args)
Examples
========
>>> from sympy.abc import x
>>> a = 2*x
>>> a.func
<class 'sympy.core.mul.Mul'>
>>> a.args
(2, x)
>>> a.func(*a.args)
2*x
>>> a == a.func(*a.args)
True
"""
return self.__class__
@property
def args(self):
"""Returns a tuple of arguments of 'self'.
Examples
========
>>> from sympy import cot
>>> from sympy.abc import x, y
>>> cot(x).args
(x,)
>>> cot(x).args[0]
x
>>> (x*y).args
(x, y)
>>> (x*y).args[1]
y
Notes
=====
Never use self._args, always use self.args.
Only use _args in __new__ when creating a new function.
Don't override .args() from Basic (so that it's easy to
change the interface in the future if needed).
"""
return self._args
@property
def _sorted_args(self):
"""
The same as ``args``. Derived classes which don't fix an
order on their arguments should override this method to
produce the sorted representation.
"""
return self.args
def as_content_primitive(self, radical=False, clear=True):
"""A stub to allow Basic args (like Tuple) to be skipped when computing
the content and primitive components of an expression.
See Also
========
sympy.core.expr.Expr.as_content_primitive
"""
return S.One, self
def subs(self, *args, **kwargs):
"""
Substitutes old for new in an expression after sympifying args.
`args` is either:
- two arguments, e.g. foo.subs(old, new)
- one iterable argument, e.g. foo.subs(iterable). The iterable may be
o an iterable container with (old, new) pairs. In this case the
replacements are processed in the order given with successive
patterns possibly affecting replacements already made.
o a dict or set whose key/value items correspond to old/new pairs.
In this case the old/new pairs will be sorted by op count and in
case of a tie, by number of args and the default_sort_key. The
resulting sorted list is then processed as an iterable container
(see previous).
If the keyword ``simultaneous`` is True, the subexpressions will not be
evaluated until all the substitutions have been made.
Examples
========
>>> from sympy import pi, exp, limit, oo
>>> from sympy.abc import x, y
>>> (1 + x*y).subs(x, pi)
pi*y + 1
>>> (1 + x*y).subs({x:pi, y:2})
1 + 2*pi
>>> (1 + x*y).subs([(x, pi), (y, 2)])
1 + 2*pi
>>> reps = [(y, x**2), (x, 2)]
>>> (x + y).subs(reps)
6
>>> (x + y).subs(reversed(reps))
x**2 + 2
>>> (x**2 + x**4).subs(x**2, y)
y**2 + y
To replace only the x**2 but not the x**4, use xreplace:
>>> (x**2 + x**4).xreplace({x**2: y})
x**4 + y
To delay evaluation until all substitutions have been made,
set the keyword ``simultaneous`` to True:
>>> (x/y).subs([(x, 0), (y, 0)])
0
>>> (x/y).subs([(x, 0), (y, 0)], simultaneous=True)
nan
This has the added feature of not allowing subsequent substitutions
to affect those already made:
>>> ((x + y)/y).subs({x + y: y, y: x + y})
1
>>> ((x + y)/y).subs({x + y: y, y: x + y}, simultaneous=True)
y/(x + y)
In order to obtain a canonical result, unordered iterables are
sorted by count_op length, number of arguments and by the
default_sort_key to break any ties. All other iterables are left
unsorted.
>>> from sympy import sqrt, sin, cos
>>> from sympy.abc import a, b, c, d, e
>>> A = (sqrt(sin(2*x)), a)
>>> B = (sin(2*x), b)
>>> C = (cos(2*x), c)
>>> D = (x, d)
>>> E = (exp(x), e)
>>> expr = sqrt(sin(2*x))*sin(exp(x)*x)*cos(2*x) + sin(2*x)
>>> expr.subs(dict([A, B, C, D, E]))
a*c*sin(d*e) + b
The resulting expression represents a literal replacement of the
old arguments with the new arguments. This may not reflect the
limiting behavior of the expression:
>>> (x**3 - 3*x).subs({x: oo})
nan
>>> limit(x**3 - 3*x, x, oo)
oo
If the substitution will be followed by numerical
evaluation, it is better to pass the substitution to
evalf as
>>> (1/x).evalf(subs={x: 3.0}, n=21)
0.333333333333333333333
rather than
>>> (1/x).subs({x: 3.0}).evalf(21)
0.333333333333333314830
as the former will ensure that the desired level of precision is
obtained.
See Also
========
replace: replacement capable of doing wildcard-like matching,
parsing of match, and conditional replacements
xreplace: exact node replacement in expr tree; also capable of
using matching rules
sympy.core.evalf.EvalfMixin.evalf: calculates the given formula to a desired level of precision
"""
from sympy.core.containers import Dict
from sympy.utilities.iterables import sift
from sympy import Dummy, Symbol
unordered = False
if len(args) == 1:
sequence = args[0]
if isinstance(sequence, set):
unordered = True
elif isinstance(sequence, (Dict, Mapping)):
unordered = True
sequence = sequence.items()
elif not iterable(sequence):
from sympy.utilities.misc import filldedent
raise ValueError(filldedent("""
When a single argument is passed to subs
it should be a dictionary of old: new pairs or an iterable
of (old, new) tuples."""))
elif len(args) == 2:
sequence = [args]
else:
raise ValueError("subs accepts either 1 or 2 arguments")
sequence = list(sequence)
for i, s in enumerate(sequence):
if isinstance(s[0], str):
# when old is a string we prefer Symbol
s = Symbol(s[0]), s[1]
try:
s = [sympify(_, strict=not isinstance(_, str))
for _ in s]
except SympifyError:
# if it can't be sympified, skip it
sequence[i] = None
continue
# skip if there is no change
sequence[i] = None if _aresame(*s) else tuple(s)
sequence = list(filter(None, sequence))
if unordered:
sequence = dict(sequence)
atoms, nonatoms = sift(list(sequence),
lambda x: x.is_Atom, binary=True)
sequence = [(k, sequence[k]) for k in
list(reversed(list(ordered(nonatoms)))) + list(ordered(atoms))]
if kwargs.pop('simultaneous', False): # XXX should this be the default for dict subs?
reps = {}
rv = self
kwargs['hack2'] = True
m = Dummy('subs_m')
for old, new in sequence:
com = new.is_commutative
if com is None:
com = True
d = Dummy('subs_d', commutative=com)
# using d*m so Subs will be used on dummy variables
# in things like Derivative(f(x, y), x) in which x
# is both free and bound
rv = rv._subs(old, d*m, **kwargs)
if not isinstance(rv, Basic):
break
reps[d] = new
reps[m] = S.One # get rid of m
return rv.xreplace(reps)
else:
rv = self
for old, new in sequence:
rv = rv._subs(old, new, **kwargs)
if not isinstance(rv, Basic):
break
return rv
@cacheit
def _subs(self, old, new, **hints):
"""Substitutes an expression old -> new.
If self is not equal to old then _eval_subs is called.
If _eval_subs doesn't want to make any special replacement
then a None is received which indicates that the fallback
should be applied wherein a search for replacements is made
amongst the arguments of self.
>>> from sympy import Add
>>> from sympy.abc import x, y, z
Examples
========
Add's _eval_subs knows how to target x + y in the following
so it makes the change:
>>> (x + y + z).subs(x + y, 1)
z + 1
Add's _eval_subs doesn't need to know how to find x + y in
the following:
>>> Add._eval_subs(z*(x + y) + 3, x + y, 1) is None
True
The returned None will cause the fallback routine to traverse the args and
pass the z*(x + y) arg to Mul where the change will take place and the
substitution will succeed:
>>> (z*(x + y) + 3).subs(x + y, 1)
z + 3
** Developers Notes **
An _eval_subs routine for a class should be written if:
1) any arguments are not instances of Basic (e.g. bool, tuple);
2) some arguments should not be targeted (as in integration
variables);
3) if there is something other than a literal replacement
that should be attempted (as in Piecewise where the condition
may be updated without doing a replacement).
If it is overridden, here are some special cases that might arise:
1) If it turns out that no special change was made and all
the original sub-arguments should be checked for
replacements then None should be returned.
2) If it is necessary to do substitutions on a portion of
the expression then _subs should be called. _subs will
handle the case of any sub-expression being equal to old
(which usually would not be the case) while its fallback
will handle the recursion into the sub-arguments. For
example, after Add's _eval_subs removes some matching terms
it must process the remaining terms so it calls _subs
on each of the un-matched terms and then adds them
onto the terms previously obtained.
3) If the initial expression should remain unchanged then
the original expression should be returned. (Whenever an
expression is returned, modified or not, no further
substitution of old -> new is attempted.) Sum's _eval_subs
routine uses this strategy when a substitution is attempted
on any of its summation variables.
"""
def fallback(self, old, new):
"""
Try to replace old with new in any of self's arguments.
"""
hit = False
args = list(self.args)
for i, arg in enumerate(args):
if not hasattr(arg, '_eval_subs'):
continue
arg = arg._subs(old, new, **hints)
if not _aresame(arg, args[i]):
hit = True
args[i] = arg
if hit:
rv = self.func(*args)
hack2 = hints.get('hack2', False)
if hack2 and self.is_Mul and not rv.is_Mul: # 2-arg hack
coeff = S.One
nonnumber = []
for i in args:
if i.is_Number:
coeff *= i
else:
nonnumber.append(i)
nonnumber = self.func(*nonnumber)
if coeff is S.One:
return nonnumber
else:
return self.func(coeff, nonnumber, evaluate=False)
return rv
return self
if _aresame(self, old):
return new
rv = self._eval_subs(old, new)
if rv is None:
rv = fallback(self, old, new)
return rv
def _eval_subs(self, old, new):
"""Override this stub if you want to do anything more than
attempt a replacement of old with new in the arguments of self.
See also
========
_subs
"""
return None
def xreplace(self, rule):
"""
Replace occurrences of objects within the expression.
Parameters
==========
rule : dict-like
Expresses a replacement rule
Returns
=======
xreplace : the result of the replacement
Examples
========
>>> from sympy import symbols, pi, exp
>>> x, y, z = symbols('x y z')
>>> (1 + x*y).xreplace({x: pi})
pi*y + 1
>>> (1 + x*y).xreplace({x: pi, y: 2})
1 + 2*pi
Replacements occur only if an entire node in the expression tree is
matched:
>>> (x*y + z).xreplace({x*y: pi})
z + pi
>>> (x*y*z).xreplace({x*y: pi})
x*y*z
>>> (2*x).xreplace({2*x: y, x: z})
y
>>> (2*2*x).xreplace({2*x: y, x: z})
4*z
>>> (x + y + 2).xreplace({x + y: 2})
x + y + 2
>>> (x + 2 + exp(x + 2)).xreplace({x + 2: y})
x + exp(y) + 2
xreplace doesn't differentiate between free and bound symbols. In the
following, subs(x, y) would not change x since it is a bound symbol,
but xreplace does:
>>> from sympy import Integral
>>> Integral(x, (x, 1, 2*x)).xreplace({x: y})
Integral(y, (y, 1, 2*y))
Trying to replace x with an expression raises an error:
>>> Integral(x, (x, 1, 2*x)).xreplace({x: 2*y}) # doctest: +SKIP
ValueError: Invalid limits given: ((2*y, 1, 4*y),)
See Also
========
replace: replacement capable of doing wildcard-like matching,
parsing of match, and conditional replacements
subs: substitution of subexpressions as defined by the objects
themselves.
"""
value, _ = self._xreplace(rule)
return value
def _xreplace(self, rule):
"""
Helper for xreplace. Tracks whether a replacement actually occurred.
"""
if self in rule:
return rule[self], True
elif rule:
args = []
changed = False
for a in self.args:
_xreplace = getattr(a, '_xreplace', None)
if _xreplace is not None:
a_xr = _xreplace(rule)
args.append(a_xr[0])
changed |= a_xr[1]
else:
args.append(a)
args = tuple(args)
if changed:
return self.func(*args), True
return self, False
@cacheit
def has(self, *patterns):
"""
Test whether any subexpression matches any of the patterns.
Examples
========
>>> from sympy import sin
>>> from sympy.abc import x, y, z
>>> (x**2 + sin(x*y)).has(z)
False
>>> (x**2 + sin(x*y)).has(x, y, z)
True
>>> x.has(x)
True
Note ``has`` is a structural algorithm with no knowledge of
mathematics. Consider the following half-open interval:
>>> from sympy.sets import Interval
>>> i = Interval.Lopen(0, 5); i
Interval.Lopen(0, 5)
>>> i.args
(0, 5, True, False)
>>> i.has(4) # there is no "4" in the arguments
False
>>> i.has(0) # there *is* a "0" in the arguments
True
Instead, use ``contains`` to determine whether a number is in the
interval or not:
>>> i.contains(4)
True
>>> i.contains(0)
False
Note that ``expr.has(*patterns)`` is exactly equivalent to
``any(expr.has(p) for p in patterns)``. In particular, ``False`` is
returned when the list of patterns is empty.
>>> x.has()
False
"""
return any(self._has(pattern) for pattern in patterns)
def _has(self, pattern):
"""Helper for .has()"""
from sympy.core.function import UndefinedFunction, Function
if isinstance(pattern, UndefinedFunction):
return any(f.func == pattern or f == pattern
for f in self.atoms(Function, UndefinedFunction))
pattern = sympify(pattern)
if isinstance(pattern, BasicMeta):
return any(isinstance(arg, pattern)
for arg in preorder_traversal(self))
_has_matcher = getattr(pattern, '_has_matcher', None)
if _has_matcher is not None:
match = _has_matcher()
return any(match(arg) for arg in preorder_traversal(self))
else:
return any(arg == pattern for arg in preorder_traversal(self))
def _has_matcher(self):
"""Helper for .has()"""
return lambda other: self == other
def replace(self, query, value, map=False, simultaneous=True, exact=None):
"""
Replace matching subexpressions of ``self`` with ``value``.
If ``map = True`` then also return the mapping {old: new} where ``old``
was a sub-expression found with query and ``new`` is the replacement
value for it. If the expression itself doesn't match the query, then
the returned value will be ``self.xreplace(map)`` otherwise it should
be ``self.subs(ordered(map.items()))``.
Traverses an expression tree and performs replacement of matching
subexpressions from the bottom to the top of the tree. The default
approach is to do the replacement in a simultaneous fashion so
changes made are targeted only once. If this is not desired or causes
problems, ``simultaneous`` can be set to False.
In addition, if an expression containing more than one Wild symbol
is being used to match subexpressions and the ``exact`` flag is None
it will be set to True so the match will only succeed if all non-zero
values are received for each Wild that appears in the match pattern.
Setting this to False accepts a match of 0; while setting it True
accepts all matches that have a 0 in them. See example below for
cautions.
The list of possible combinations of queries and replacement values
is listed below:
Examples
========
Initial setup
>>> from sympy import log, sin, cos, tan, Wild, Mul, Add
>>> from sympy.abc import x, y
>>> f = log(sin(x)) + tan(sin(x**2))
1.1. type -> type
obj.replace(type, newtype)
When object of type ``type`` is found, replace it with the
result of passing its argument(s) to ``newtype``.
>>> f.replace(sin, cos)
log(cos(x)) + tan(cos(x**2))
>>> sin(x).replace(sin, cos, map=True)
(cos(x), {sin(x): cos(x)})
>>> (x*y).replace(Mul, Add)
x + y
1.2. type -> func
obj.replace(type, func)
When object of type ``type`` is found, apply ``func`` to its
argument(s). ``func`` must be written to handle the number
of arguments of ``type``.
>>> f.replace(sin, lambda arg: sin(2*arg))
log(sin(2*x)) + tan(sin(2*x**2))
>>> (x*y).replace(Mul, lambda *args: sin(2*Mul(*args)))
sin(2*x*y)
2.1. pattern -> expr
obj.replace(pattern(wild), expr(wild))
Replace subexpressions matching ``pattern`` with the expression
written in terms of the Wild symbols in ``pattern``.
>>> a, b = map(Wild, 'ab')
>>> f.replace(sin(a), tan(a))
log(tan(x)) + tan(tan(x**2))
>>> f.replace(sin(a), tan(a/2))
log(tan(x/2)) + tan(tan(x**2/2))
>>> f.replace(sin(a), a)
log(x) + tan(x**2)
>>> (x*y).replace(a*x, a)
y
Matching is exact by default when more than one Wild symbol
is used: matching fails unless the match gives non-zero
values for all Wild symbols:
>>> (2*x + y).replace(a*x + b, b - a)
y - 2
>>> (2*x).replace(a*x + b, b - a)
2*x
When set to False, the results may be non-intuitive:
>>> (2*x).replace(a*x + b, b - a, exact=False)
2/x
2.2. pattern -> func
obj.replace(pattern(wild), lambda wild: expr(wild))
All behavior is the same as in 2.1 but now a function in terms of
pattern variables is used rather than an expression:
>>> f.replace(sin(a), lambda a: sin(2*a))
log(sin(2*x)) + tan(sin(2*x**2))
3.1. func -> func
obj.replace(filter, func)
Replace subexpression ``e`` with ``func(e)`` if ``filter(e)``
is True.
>>> g = 2*sin(x**3)
>>> g.replace(lambda expr: expr.is_Number, lambda expr: expr**2)
4*sin(x**9)
The expression itself is also targeted by the query but is done in
such a fashion that changes are not made twice.
>>> e = x*(x*y + 1)
>>> e.replace(lambda x: x.is_Mul, lambda x: 2*x)
2*x*(2*x*y + 1)
When matching a single symbol, `exact` will default to True, but
this may or may not be the behavior that is desired:
Here, we want `exact=False`:
>>> from sympy import Function
>>> f = Function('f')
>>> e = f(1) + f(0)
>>> q = f(a), lambda a: f(a + 1)
>>> e.replace(*q, exact=False)
f(1) + f(2)
>>> e.replace(*q, exact=True)
f(0) + f(2)
But here, the nature of matching makes selecting
the right setting tricky:
>>> e = x**(1 + y)
>>> (x**(1 + y)).replace(x**(1 + a), lambda a: x**-a, exact=False)
1
>>> (x**(1 + y)).replace(x**(1 + a), lambda a: x**-a, exact=True)
x**(-x - y + 1)
>>> (x**y).replace(x**(1 + a), lambda a: x**-a, exact=False)
1
>>> (x**y).replace(x**(1 + a), lambda a: x**-a, exact=True)
x**(1 - y)
It is probably better to use a different form of the query
that describes the target expression more precisely:
>>> (1 + x**(1 + y)).replace(
... lambda x: x.is_Pow and x.exp.is_Add and x.exp.args[0] == 1,
... lambda x: x.base**(1 - (x.exp - 1)))
...
x**(1 - y) + 1
See Also
========
subs: substitution of subexpressions as defined by the objects
themselves.
xreplace: exact node replacement in expr tree; also capable of
using matching rules
"""
from sympy.core.symbol import Dummy, Wild
from sympy.simplify.simplify import bottom_up
try:
query = _sympify(query)
except SympifyError:
pass
try:
value = _sympify(value)
except SympifyError:
pass
if isinstance(query, type):
_query = lambda expr: isinstance(expr, query)
if isinstance(value, type):
_value = lambda expr, result: value(*expr.args)
elif callable(value):
_value = lambda expr, result: value(*expr.args)
else:
raise TypeError(
"given a type, replace() expects another "
"type or a callable")
elif isinstance(query, Basic):
_query = lambda expr: expr.match(query)
if exact is None:
exact = (len(query.atoms(Wild)) > 1)
if isinstance(value, Basic):
if exact:
_value = lambda expr, result: (value.subs(result)
if all(result.values()) else expr)
else:
_value = lambda expr, result: value.subs(result)
elif callable(value):
# match dictionary keys get the trailing underscore stripped
# from them and are then passed as keywords to the callable;
# if ``exact`` is True, only accept match if there are no null
# values amongst those matched.
if exact:
_value = lambda expr, result: (value(**
{str(k)[:-1]: v for k, v in result.items()})
if all(val for val in result.values()) else expr)
else:
_value = lambda expr, result: value(**
{str(k)[:-1]: v for k, v in result.items()})
else:
raise TypeError(
"given an expression, replace() expects "
"another expression or a callable")
elif callable(query):
_query = query
if callable(value):
_value = lambda expr, result: value(expr)
else:
raise TypeError(
"given a callable, replace() expects "
"another callable")
else:
raise TypeError(
"first argument to replace() must be a "
"type, an expression or a callable")
mapping = {} # changes that took place
mask = [] # the dummies that were used as change placeholders
def rec_replace(expr):
result = _query(expr)
if result or result == {}:
new = _value(expr, result)
if new is not None and new != expr:
mapping[expr] = new
if simultaneous:
# don't let this change during rebuilding;
# XXX this may fail if the object being replaced
# cannot be represented as a Dummy in the expression
# tree, e.g. an ExprConditionPair in Piecewise
# cannot be represented with a Dummy
com = getattr(new, 'is_commutative', True)
if com is None:
com = True
d = Dummy('rec_replace', commutative=com)
mask.append((d, new))
expr = d
else:
expr = new
return expr
rv = bottom_up(self, rec_replace, atoms=True)
# restore original expressions for Dummy symbols
if simultaneous:
mask = list(reversed(mask))
for o, n in mask:
r = {o: n}
# if a sub-expression could not be replaced with
# a Dummy then this will fail; either filter
# against such sub-expressions or figure out a
# way to carry out simultaneous replacement
# in this situation.
rv = rv.xreplace(r) # if this fails, see above
if not map:
return rv
else:
if simultaneous:
# restore subexpressions in mapping
for o, n in mask:
r = {o: n}
mapping = {k.xreplace(r): v.xreplace(r)
for k, v in mapping.items()}
return rv, mapping
def find(self, query, group=False):
"""Find all subexpressions matching a query. """
query = _make_find_query(query)
results = list(filter(query, preorder_traversal(self)))
if not group:
return set(results)
else:
groups = {}
for result in results:
if result in groups:
groups[result] += 1
else:
groups[result] = 1
return groups
def count(self, query):
"""Count the number of matching subexpressions. """
query = _make_find_query(query)
return sum(bool(query(sub)) for sub in preorder_traversal(self))
def matches(self, expr, repl_dict={}, old=False):
"""
Helper method for match() that looks for a match between Wild symbols
in self and expressions in expr.
Examples
========
>>> from sympy import symbols, Wild, Basic
>>> a, b, c = symbols('a b c')
>>> x = Wild('x')
>>> Basic(a + x, x).matches(Basic(a + b, c)) is None
True
>>> Basic(a + x, x).matches(Basic(a + b + c, b + c))
{x_: b + c}
"""
expr = sympify(expr)
if not isinstance(expr, self.__class__):
return None
if self == expr:
return repl_dict
if len(self.args) != len(expr.args):
return None
d = repl_dict.copy()
for arg, other_arg in zip(self.args, expr.args):
if arg == other_arg:
continue
d = arg.xreplace(d).matches(other_arg, d, old=old)
if d is None:
return None
return d
def match(self, pattern, old=False):
"""
Pattern matching.
Wild symbols match all.
Return ``None`` when expression (self) does not match
with pattern. Otherwise return a dictionary such that::
pattern.xreplace(self.match(pattern)) == self
Examples
========
>>> from sympy import Wild
>>> from sympy.abc import x, y
>>> p = Wild("p")
>>> q = Wild("q")
>>> r = Wild("r")
>>> e = (x+y)**(x+y)
>>> e.match(p**p)
{p_: x + y}
>>> e.match(p**q)
{p_: x + y, q_: x + y}
>>> e = (2*x)**2
>>> e.match(p*q**r)
{p_: 4, q_: x, r_: 2}
>>> (p*q**r).xreplace(e.match(p*q**r))
4*x**2
The ``old`` flag will give the old-style pattern matching where
expressions and patterns are essentially solved to give the
match. Both of the following give None unless ``old=True``:
>>> (x - 2).match(p - x, old=True)
{p_: 2*x - 2}
>>> (2/x).match(p*x, old=True)
{p_: 2/x**2}
"""
pattern = sympify(pattern)
return pattern.matches(self, old=old)
def count_ops(self, visual=None):
"""wrapper for count_ops that returns the operation count."""
from sympy import count_ops
return count_ops(self, visual)
def doit(self, **hints):
"""Evaluate objects that are not evaluated by default like limits,
integrals, sums and products. All objects of this kind will be
evaluated recursively, unless some species were excluded via 'hints'
or unless the 'deep' hint was set to 'False'.
>>> from sympy import Integral
>>> from sympy.abc import x
>>> 2*Integral(x, x)
2*Integral(x, x)
>>> (2*Integral(x, x)).doit()
x**2
>>> (2*Integral(x, x)).doit(deep=False)
2*Integral(x, x)
"""
if hints.get('deep', True):
terms = [term.doit(**hints) if isinstance(term, Basic) else term
for term in self.args]
return self.func(*terms)
else:
return self
def simplify(self, **kwargs):
"""See the simplify function in sympy.simplify"""
from sympy.simplify import simplify
return simplify(self, **kwargs)
def _eval_rewrite(self, pattern, rule, **hints):
if self.is_Atom:
if hasattr(self, rule):
return getattr(self, rule)()
return self
if hints.get('deep', True):
args = [a._eval_rewrite(pattern, rule, **hints)
if isinstance(a, Basic) else a
for a in self.args]
else:
args = self.args
if pattern is None or isinstance(self, pattern):
if hasattr(self, rule):
rewritten = getattr(self, rule)(*args, **hints)
if rewritten is not None:
return rewritten
return self.func(*args) if hints.get('evaluate', True) else self
def _accept_eval_derivative(self, s):
# This method needs to be overridden by array-like objects
return s._visit_eval_derivative_scalar(self)
def _visit_eval_derivative_scalar(self, base):
# Base is a scalar
# Types are (base: scalar, self: scalar)
return base._eval_derivative(self)
def _visit_eval_derivative_array(self, base):
# Types are (base: array/matrix, self: scalar)
# Base is some kind of array/matrix,
# it should have `.applyfunc(lambda x: x.diff(self)` implemented:
return base._eval_derivative_array(self)
def _eval_derivative_n_times(self, s, n):
# This is the default evaluator for derivatives (as called by `diff`
# and `Derivative`), it will attempt a loop to derive the expression
# `n` times by calling the corresponding `_eval_derivative` method,
# while leaving the derivative unevaluated if `n` is symbolic. This
# method should be overridden if the object has a closed form for its
# symbolic n-th derivative.
from sympy import Integer
if isinstance(n, (int, Integer)):
obj = self
for i in range(n):
obj2 = obj._accept_eval_derivative(s)
if obj == obj2 or obj2 is None:
break
obj = obj2
return obj2
else:
return None
def rewrite(self, *args, **hints):
""" Rewrite functions in terms of other functions.
Rewrites expression containing applications of functions
of one kind in terms of functions of different kind. For
example you can rewrite trigonometric functions as complex
exponentials or combinatorial functions as gamma function.
As a pattern this function accepts a list of functions to
to rewrite (instances of DefinedFunction class). As rule
you can use string or a destination function instance (in
this case rewrite() will use the str() function).
There is also the possibility to pass hints on how to rewrite
the given expressions. For now there is only one such hint
defined called 'deep'. When 'deep' is set to False it will
forbid functions to rewrite their contents.
Examples
========
>>> from sympy import sin, exp
>>> from sympy.abc import x
Unspecified pattern:
>>> sin(x).rewrite(exp)
-I*(exp(I*x) - exp(-I*x))/2
Pattern as a single function:
>>> sin(x).rewrite(sin, exp)
-I*(exp(I*x) - exp(-I*x))/2
Pattern as a list of functions:
>>> sin(x).rewrite([sin, ], exp)
-I*(exp(I*x) - exp(-I*x))/2
"""
if not args:
return self
else:
pattern = args[:-1]
if isinstance(args[-1], str):
rule = '_eval_rewrite_as_' + args[-1]
else:
# rewrite arg is usually a class but can also be a
# singleton (e.g. GoldenRatio) so we check
# __name__ or __class__.__name__
clsname = getattr(args[-1], "__name__", None)
if clsname is None:
clsname = args[-1].__class__.__name__
rule = '_eval_rewrite_as_' + clsname
if not pattern:
return self._eval_rewrite(None, rule, **hints)
else:
if iterable(pattern[0]):
pattern = pattern[0]
pattern = [p for p in pattern if self.has(p)]
if pattern:
return self._eval_rewrite(tuple(pattern), rule, **hints)
else:
return self
_constructor_postprocessor_mapping = {} # type: ignore
@classmethod
def _exec_constructor_postprocessors(cls, obj):
# WARNING: This API is experimental.
# This is an experimental API that introduces constructor
# postprosessors for SymPy Core elements. If an argument of a SymPy
# expression has a `_constructor_postprocessor_mapping` attribute, it will
# be interpreted as a dictionary containing lists of postprocessing
# functions for matching expression node names.
clsname = obj.__class__.__name__
postprocessors = defaultdict(list)
for i in obj.args:
try:
postprocessor_mappings = (
Basic._constructor_postprocessor_mapping[cls].items()
for cls in type(i).mro()
if cls in Basic._constructor_postprocessor_mapping
)
for k, v in chain.from_iterable(postprocessor_mappings):
postprocessors[k].extend([j for j in v if j not in postprocessors[k]])
except TypeError:
pass
for f in postprocessors.get(clsname, []):
obj = f(obj)
return obj
class Atom(Basic):
"""
A parent class for atomic things. An atom is an expression with no subexpressions.
Examples
========
Symbol, Number, Rational, Integer, ...
But not: Add, Mul, Pow, ...
"""
is_Atom = True
__slots__ = ()
def matches(self, expr, repl_dict={}, old=False):
if self == expr:
return repl_dict
def xreplace(self, rule, hack2=False):
return rule.get(self, self)
def doit(self, **hints):
return self
@classmethod
def class_key(cls):
return 2, 0, cls.__name__
@cacheit
def sort_key(self, order=None):
return self.class_key(), (1, (str(self),)), S.One.sort_key(), S.One
def _eval_simplify(self, **kwargs):
return self
@property
def _sorted_args(self):
# this is here as a safeguard against accidentally using _sorted_args
# on Atoms -- they cannot be rebuilt as atom.func(*atom._sorted_args)
# since there are no args. So the calling routine should be checking
# to see that this property is not called for Atoms.
raise AttributeError('Atoms have no args. It might be necessary'
' to make a check for Atoms in the calling code.')
def _aresame(a, b):
"""Return True if a and b are structurally the same, else False.
Examples
========
In SymPy (as in Python) two numbers compare the same if they
have the same underlying base-2 representation even though
they may not be the same type:
>>> from sympy import S
>>> 2.0 == S(2)
True
>>> 0.5 == S.Half
True
This routine was written to provide a query for such cases that
would give false when the types do not match:
>>> from sympy.core.basic import _aresame
>>> _aresame(S(2.0), S(2))
False
"""
from .numbers import Number
from .function import AppliedUndef, UndefinedFunction as UndefFunc
if isinstance(a, Number) and isinstance(b, Number):
return a == b and a.__class__ == b.__class__
for i, j in zip_longest(preorder_traversal(a), preorder_traversal(b)):
if i != j or type(i) != type(j):
if ((isinstance(i, UndefFunc) and isinstance(j, UndefFunc)) or
(isinstance(i, AppliedUndef) and isinstance(j, AppliedUndef))):
if i.class_key() != j.class_key():
return False
else:
return False
return True
def _atomic(e, recursive=False):
"""Return atom-like quantities as far as substitution is
concerned: Derivatives, Functions and Symbols. Don't
return any 'atoms' that are inside such quantities unless
they also appear outside, too, unless `recursive` is True.
Examples
========
>>> from sympy import Derivative, Function, cos
>>> from sympy.abc import x, y
>>> from sympy.core.basic import _atomic
>>> f = Function('f')
>>> _atomic(x + y)
{x, y}
>>> _atomic(x + f(y))
{x, f(y)}
>>> _atomic(Derivative(f(x), x) + cos(x) + y)
{y, cos(x), Derivative(f(x), x)}
"""
from sympy import Derivative, Function, Symbol
pot = preorder_traversal(e)
seen = set()
if isinstance(e, Basic):
free = getattr(e, "free_symbols", None)
if free is None:
return {e}
else:
return set()
atoms = set()
for p in pot:
if p in seen:
pot.skip()
continue
seen.add(p)
if isinstance(p, Symbol) and p in free:
atoms.add(p)
elif isinstance(p, (Derivative, Function)):
if not recursive:
pot.skip()
atoms.add(p)
return atoms
class preorder_traversal(object):
"""
Do a pre-order traversal of a tree.
This iterator recursively yields nodes that it has visited in a pre-order
fashion. That is, it yields the current node then descends through the
tree breadth-first to yield all of a node's children's pre-order
traversal.
For an expression, the order of the traversal depends on the order of
.args, which in many cases can be arbitrary.
Parameters
==========
node : sympy expression
The expression to traverse.
keys : (default None) sort key(s)
The key(s) used to sort args of Basic objects. When None, args of Basic
objects are processed in arbitrary order. If key is defined, it will
be passed along to ordered() as the only key(s) to use to sort the
arguments; if ``key`` is simply True then the default keys of ordered
will be used.
Yields
======
subtree : sympy expression
All of the subtrees in the tree.
Examples
========
>>> from sympy import symbols
>>> from sympy.core.basic import preorder_traversal
>>> x, y, z = symbols('x y z')
The nodes are returned in the order that they are encountered unless key
is given; simply passing key=True will guarantee that the traversal is
unique.
>>> list(preorder_traversal((x + y)*z, keys=None)) # doctest: +SKIP
[z*(x + y), z, x + y, y, x]
>>> list(preorder_traversal((x + y)*z, keys=True))
[z*(x + y), z, x + y, x, y]
"""
def __init__(self, node, keys=None):
self._skip_flag = False
self._pt = self._preorder_traversal(node, keys)
def _preorder_traversal(self, node, keys):
yield node
if self._skip_flag:
self._skip_flag = False
return
if isinstance(node, Basic):
if not keys and hasattr(node, '_argset'):
# LatticeOp keeps args as a set. We should use this if we
# don't care about the order, to prevent unnecessary sorting.
args = node._argset
else:
args = node.args
if keys:
if keys != True:
args = ordered(args, keys, default=False)
else:
args = ordered(args)
for arg in args:
for subtree in self._preorder_traversal(arg, keys):
yield subtree
elif iterable(node):
for item in node:
for subtree in self._preorder_traversal(item, keys):
yield subtree
def skip(self):
"""
Skip yielding current node's (last yielded node's) subtrees.
Examples
========
>>> from sympy.core import symbols
>>> from sympy.core.basic import preorder_traversal
>>> x, y, z = symbols('x y z')
>>> pt = preorder_traversal((x+y*z)*z)
>>> for i in pt:
... print(i)
... if i == x+y*z:
... pt.skip()
z*(x + y*z)
z
x + y*z
"""
self._skip_flag = True
def __next__(self):
return next(self._pt)
def __iter__(self):
return self
def _make_find_query(query):
"""Convert the argument of Basic.find() into a callable"""
try:
query = sympify(query)
except SympifyError:
pass
if isinstance(query, type):
return lambda expr: isinstance(expr, query)
elif isinstance(query, Basic):
return lambda expr: expr.match(query) is not None
return query
|
3bf57f4a7bbabc558e971dca43b7c8b6d0c46d4361b4528f4223229a65506067 | from __future__ import print_function, division
from math import log as _log
from .sympify import _sympify
from .cache import cacheit
from .singleton import S
from .expr import Expr
from .evalf import PrecisionExhausted
from .function import (_coeff_isneg, expand_complex, expand_multinomial,
expand_mul)
from .logic import fuzzy_bool, fuzzy_not, fuzzy_and
from .compatibility import as_int, HAS_GMPY, gmpy
from .parameters import global_parameters
from sympy.utilities.iterables import sift
from mpmath.libmp import sqrtrem as mpmath_sqrtrem
from math import sqrt as _sqrt
def isqrt(n):
"""Return the largest integer less than or equal to sqrt(n)."""
if n < 0:
raise ValueError("n must be nonnegative")
n = int(n)
# Fast path: with IEEE 754 binary64 floats and a correctly-rounded
# math.sqrt, int(math.sqrt(n)) works for any integer n satisfying 0 <= n <
# 4503599761588224 = 2**52 + 2**27. But Python doesn't guarantee either
# IEEE 754 format floats *or* correct rounding of math.sqrt, so check the
# answer and fall back to the slow method if necessary.
if n < 4503599761588224:
s = int(_sqrt(n))
if 0 <= n - s*s <= 2*s:
return s
return integer_nthroot(n, 2)[0]
def integer_nthroot(y, n):
"""
Return a tuple containing x = floor(y**(1/n))
and a boolean indicating whether the result is exact (that is,
whether x**n == y).
Examples
========
>>> from sympy import integer_nthroot
>>> integer_nthroot(16, 2)
(4, True)
>>> integer_nthroot(26, 2)
(5, False)
To simply determine if a number is a perfect square, the is_square
function should be used:
>>> from sympy.ntheory.primetest import is_square
>>> is_square(26)
False
See Also
========
sympy.ntheory.primetest.is_square
integer_log
"""
y, n = as_int(y), as_int(n)
if y < 0:
raise ValueError("y must be nonnegative")
if n < 1:
raise ValueError("n must be positive")
if HAS_GMPY and n < 2**63:
# Currently it works only for n < 2**63, else it produces TypeError
# sympy issue: https://github.com/sympy/sympy/issues/18374
# gmpy2 issue: https://github.com/aleaxit/gmpy/issues/257
if HAS_GMPY >= 2:
x, t = gmpy.iroot(y, n)
else:
x, t = gmpy.root(y, n)
return as_int(x), bool(t)
return _integer_nthroot_python(y, n)
def _integer_nthroot_python(y, n):
if y in (0, 1):
return y, True
if n == 1:
return y, True
if n == 2:
x, rem = mpmath_sqrtrem(y)
return int(x), not rem
if n > y:
return 1, False
# Get initial estimate for Newton's method. Care must be taken to
# avoid overflow
try:
guess = int(y**(1./n) + 0.5)
except OverflowError:
exp = _log(y, 2)/n
if exp > 53:
shift = int(exp - 53)
guess = int(2.0**(exp - shift) + 1) << shift
else:
guess = int(2.0**exp)
if guess > 2**50:
# Newton iteration
xprev, x = -1, guess
while 1:
t = x**(n - 1)
xprev, x = x, ((n - 1)*x + y//t)//n
if abs(x - xprev) < 2:
break
else:
x = guess
# Compensate
t = x**n
while t < y:
x += 1
t = x**n
while t > y:
x -= 1
t = x**n
return int(x), t == y # int converts long to int if possible
def integer_log(y, x):
r"""
Returns ``(e, bool)`` where e is the largest nonnegative integer
such that :math:`|y| \geq |x^e|` and ``bool`` is True if $y = x^e$.
Examples
========
>>> from sympy import integer_log
>>> integer_log(125, 5)
(3, True)
>>> integer_log(17, 9)
(1, False)
>>> integer_log(4, -2)
(2, True)
>>> integer_log(-125,-5)
(3, True)
See Also
========
integer_nthroot
sympy.ntheory.primetest.is_square
sympy.ntheory.factor_.multiplicity
sympy.ntheory.factor_.perfect_power
"""
if x == 1:
raise ValueError('x cannot take value as 1')
if y == 0:
raise ValueError('y cannot take value as 0')
if x in (-2, 2):
x = int(x)
y = as_int(y)
e = y.bit_length() - 1
return e, x**e == y
if x < 0:
n, b = integer_log(y if y > 0 else -y, -x)
return n, b and bool(n % 2 if y < 0 else not n % 2)
x = as_int(x)
y = as_int(y)
r = e = 0
while y >= x:
d = x
m = 1
while y >= d:
y, rem = divmod(y, d)
r = r or rem
e += m
if y > d:
d *= d
m *= 2
return e, r == 0 and y == 1
class Pow(Expr):
"""
Defines the expression x**y as "x raised to a power y"
Singleton definitions involving (0, 1, -1, oo, -oo, I, -I):
+--------------+---------+-----------------------------------------------+
| expr | value | reason |
+==============+=========+===============================================+
| z**0 | 1 | Although arguments over 0**0 exist, see [2]. |
+--------------+---------+-----------------------------------------------+
| z**1 | z | |
+--------------+---------+-----------------------------------------------+
| (-oo)**(-1) | 0 | |
+--------------+---------+-----------------------------------------------+
| (-1)**-1 | -1 | |
+--------------+---------+-----------------------------------------------+
| S.Zero**-1 | zoo | This is not strictly true, as 0**-1 may be |
| | | undefined, but is convenient in some contexts |
| | | where the base is assumed to be positive. |
+--------------+---------+-----------------------------------------------+
| 1**-1 | 1 | |
+--------------+---------+-----------------------------------------------+
| oo**-1 | 0 | |
+--------------+---------+-----------------------------------------------+
| 0**oo | 0 | Because for all complex numbers z near |
| | | 0, z**oo -> 0. |
+--------------+---------+-----------------------------------------------+
| 0**-oo | zoo | This is not strictly true, as 0**oo may be |
| | | oscillating between positive and negative |
| | | values or rotating in the complex plane. |
| | | It is convenient, however, when the base |
| | | is positive. |
+--------------+---------+-----------------------------------------------+
| 1**oo | nan | Because there are various cases where |
| 1**-oo | | lim(x(t),t)=1, lim(y(t),t)=oo (or -oo), |
| | | but lim( x(t)**y(t), t) != 1. See [3]. |
+--------------+---------+-----------------------------------------------+
| b**zoo | nan | Because b**z has no limit as z -> zoo |
+--------------+---------+-----------------------------------------------+
| (-1)**oo | nan | Because of oscillations in the limit. |
| (-1)**(-oo) | | |
+--------------+---------+-----------------------------------------------+
| oo**oo | oo | |
+--------------+---------+-----------------------------------------------+
| oo**-oo | 0 | |
+--------------+---------+-----------------------------------------------+
| (-oo)**oo | nan | |
| (-oo)**-oo | | |
+--------------+---------+-----------------------------------------------+
| oo**I | nan | oo**e could probably be best thought of as |
| (-oo)**I | | the limit of x**e for real x as x tends to |
| | | oo. If e is I, then the limit does not exist |
| | | and nan is used to indicate that. |
+--------------+---------+-----------------------------------------------+
| oo**(1+I) | zoo | If the real part of e is positive, then the |
| (-oo)**(1+I) | | limit of abs(x**e) is oo. So the limit value |
| | | is zoo. |
+--------------+---------+-----------------------------------------------+
| oo**(-1+I) | 0 | If the real part of e is negative, then the |
| -oo**(-1+I) | | limit is 0. |
+--------------+---------+-----------------------------------------------+
Because symbolic computations are more flexible that floating point
calculations and we prefer to never return an incorrect answer,
we choose not to conform to all IEEE 754 conventions. This helps
us avoid extra test-case code in the calculation of limits.
See Also
========
sympy.core.numbers.Infinity
sympy.core.numbers.NegativeInfinity
sympy.core.numbers.NaN
References
==========
.. [1] https://en.wikipedia.org/wiki/Exponentiation
.. [2] https://en.wikipedia.org/wiki/Exponentiation#Zero_to_the_power_of_zero
.. [3] https://en.wikipedia.org/wiki/Indeterminate_forms
"""
is_Pow = True
__slots__ = ('is_commutative',)
@cacheit
def __new__(cls, b, e, evaluate=None):
if evaluate is None:
evaluate = global_parameters.evaluate
from sympy.functions.elementary.exponential import exp_polar
b = _sympify(b)
e = _sympify(e)
# XXX: Maybe only Expr should be allowed...
from sympy.core.relational import Relational
if isinstance(b, Relational) or isinstance(e, Relational):
raise TypeError('Relational can not be used in Pow')
if evaluate:
if e is S.ComplexInfinity:
return S.NaN
if e is S.Zero:
return S.One
elif e is S.One:
return b
elif e == -1 and not b:
return S.ComplexInfinity
# Only perform autosimplification if exponent or base is a Symbol or number
elif (b.is_Symbol or b.is_number) and (e.is_Symbol or e.is_number) and\
e.is_integer and _coeff_isneg(b):
if e.is_even:
b = -b
elif e.is_odd:
return -Pow(-b, e)
if S.NaN in (b, e): # XXX S.NaN**x -> S.NaN under assumption that x != 0
return S.NaN
elif b is S.One:
if abs(e).is_infinite:
return S.NaN
return S.One
else:
# recognize base as E
if not e.is_Atom and b is not S.Exp1 and not isinstance(b, exp_polar):
from sympy import numer, denom, log, sign, im, factor_terms
c, ex = factor_terms(e, sign=False).as_coeff_Mul()
den = denom(ex)
if isinstance(den, log) and den.args[0] == b:
return S.Exp1**(c*numer(ex))
elif den.is_Add:
s = sign(im(b))
if s.is_Number and s and den == \
log(-factor_terms(b, sign=False)) + s*S.ImaginaryUnit*S.Pi:
return S.Exp1**(c*numer(ex))
obj = b._eval_power(e)
if obj is not None:
return obj
obj = Expr.__new__(cls, b, e)
obj = cls._exec_constructor_postprocessors(obj)
if not isinstance(obj, Pow):
return obj
obj.is_commutative = (b.is_commutative and e.is_commutative)
return obj
@property
def base(self):
return self._args[0]
@property
def exp(self):
return self._args[1]
@classmethod
def class_key(cls):
return 3, 2, cls.__name__
def _eval_refine(self, assumptions):
from sympy.assumptions.ask import ask, Q
b, e = self.as_base_exp()
if ask(Q.integer(e), assumptions) and _coeff_isneg(b):
if ask(Q.even(e), assumptions):
return Pow(-b, e)
elif ask(Q.odd(e), assumptions):
return -Pow(-b, e)
def _eval_power(self, other):
from sympy import arg, exp, floor, im, log, re, sign
b, e = self.as_base_exp()
if b is S.NaN:
return (b**e)**other # let __new__ handle it
s = None
if other.is_integer:
s = 1
elif b.is_polar: # e.g. exp_polar, besselj, var('p', polar=True)...
s = 1
elif e.is_extended_real is not None:
# helper functions ===========================
def _half(e):
"""Return True if the exponent has a literal 2 as the
denominator, else None."""
if getattr(e, 'q', None) == 2:
return True
n, d = e.as_numer_denom()
if n.is_integer and d == 2:
return True
def _n2(e):
"""Return ``e`` evaluated to a Number with 2 significant
digits, else None."""
try:
rv = e.evalf(2, strict=True)
if rv.is_Number:
return rv
except PrecisionExhausted:
pass
# ===================================================
if e.is_extended_real:
# we need _half(other) with constant floor or
# floor(S.Half - e*arg(b)/2/pi) == 0
# handle -1 as special case
if e == -1:
# floor arg. is 1/2 + arg(b)/2/pi
if _half(other):
if b.is_negative is True:
return S.NegativeOne**other*Pow(-b, e*other)
elif b.is_negative is False:
return Pow(b, -other)
elif e.is_even:
if b.is_extended_real:
b = abs(b)
if b.is_imaginary:
b = abs(im(b))*S.ImaginaryUnit
if (abs(e) < 1) == True or e == 1:
s = 1 # floor = 0
elif b.is_extended_nonnegative:
s = 1 # floor = 0
elif re(b).is_extended_nonnegative and (abs(e) < 2) == True:
s = 1 # floor = 0
elif fuzzy_not(im(b).is_zero) and abs(e) == 2:
s = 1 # floor = 0
elif _half(other):
s = exp(2*S.Pi*S.ImaginaryUnit*other*floor(
S.Half - e*arg(b)/(2*S.Pi)))
if s.is_extended_real and _n2(sign(s) - s) == 0:
s = sign(s)
else:
s = None
else:
# e.is_extended_real is False requires:
# _half(other) with constant floor or
# floor(S.Half - im(e*log(b))/2/pi) == 0
try:
s = exp(2*S.ImaginaryUnit*S.Pi*other*
floor(S.Half - im(e*log(b))/2/S.Pi))
# be careful to test that s is -1 or 1 b/c sign(I) == I:
# so check that s is real
if s.is_extended_real and _n2(sign(s) - s) == 0:
s = sign(s)
else:
s = None
except PrecisionExhausted:
s = None
if s is not None:
return s*Pow(b, e*other)
def _eval_Mod(self, q):
r"""A dispatched function to compute `b^e \bmod q`, dispatched
by ``Mod``.
Notes
=====
Algorithms:
1. For unevaluated integer power, use built-in ``pow`` function
with 3 arguments, if powers are not too large wrt base.
2. For very large powers, use totient reduction if e >= lg(m).
Bound on m, is for safe factorization memory wise ie m^(1/4).
For pollard-rho to be faster than built-in pow lg(e) > m^(1/4)
check is added.
3. For any unevaluated power found in `b` or `e`, the step 2
will be recursed down to the base and the exponent
such that the `b \bmod q` becomes the new base and
``\phi(q) + e \bmod \phi(q)`` becomes the new exponent, and then
the computation for the reduced expression can be done.
"""
from sympy.ntheory import totient
from .mod import Mod
base, exp = self.base, self.exp
if exp.is_integer and exp.is_positive:
if q.is_integer and base % q == 0:
return S.Zero
if base.is_Integer and exp.is_Integer and q.is_Integer:
b, e, m = int(base), int(exp), int(q)
mb = m.bit_length()
if mb <= 80 and e >= mb and e.bit_length()**4 >= m:
phi = totient(m)
return Integer(pow(b, phi + e%phi, m))
return Integer(pow(b, e, m))
if isinstance(base, Pow) and base.is_integer and base.is_number:
base = Mod(base, q)
return Mod(Pow(base, exp, evaluate=False), q)
if isinstance(exp, Pow) and exp.is_integer and exp.is_number:
bit_length = int(q).bit_length()
# XXX Mod-Pow actually attempts to do a hanging evaluation
# if this dispatched function returns None.
# May need some fixes in the dispatcher itself.
if bit_length <= 80:
phi = totient(q)
exp = phi + Mod(exp, phi)
return Mod(Pow(base, exp, evaluate=False), q)
def _eval_is_even(self):
if self.exp.is_integer and self.exp.is_positive:
return self.base.is_even
def _eval_is_negative(self):
ext_neg = Pow._eval_is_extended_negative(self)
if ext_neg is True:
return self.is_finite
return ext_neg
def _eval_is_positive(self):
ext_pos = Pow._eval_is_extended_positive(self)
if ext_pos is True:
return self.is_finite
return ext_pos
def _eval_is_extended_positive(self):
from sympy import log
if self.base == self.exp:
if self.base.is_extended_nonnegative:
return True
elif self.base.is_positive:
if self.exp.is_real:
return True
elif self.base.is_extended_negative:
if self.exp.is_even:
return True
if self.exp.is_odd:
return False
elif self.base.is_zero:
if self.exp.is_extended_real:
return self.exp.is_zero
elif self.base.is_extended_nonpositive:
if self.exp.is_odd:
return False
elif self.base.is_imaginary:
if self.exp.is_integer:
m = self.exp % 4
if m.is_zero:
return True
if m.is_integer and m.is_zero is False:
return False
if self.exp.is_imaginary:
return log(self.base).is_imaginary
def _eval_is_extended_negative(self):
if self.exp is S(1)/2:
if self.base.is_complex or self.base.is_extended_real:
return False
if self.base.is_extended_negative:
if self.exp.is_odd and self.base.is_finite:
return True
if self.exp.is_even:
return False
elif self.base.is_extended_positive:
if self.exp.is_extended_real:
return False
elif self.base.is_zero:
if self.exp.is_extended_real:
return False
elif self.base.is_extended_nonnegative:
if self.exp.is_extended_nonnegative:
return False
elif self.base.is_extended_nonpositive:
if self.exp.is_even:
return False
elif self.base.is_extended_real:
if self.exp.is_even:
return False
def _eval_is_zero(self):
if self.base.is_zero:
if self.exp.is_extended_positive:
return True
elif self.exp.is_extended_nonpositive:
return False
elif self.base.is_zero is False:
if self.exp.is_negative:
return self.base.is_infinite
elif self.exp.is_nonnegative:
return False
elif self.exp.is_infinite:
if (1 - abs(self.base)).is_extended_positive:
return self.exp.is_extended_positive
elif (1 - abs(self.base)).is_extended_negative:
return self.exp.is_extended_negative
else:
# when self.base.is_zero is None
return None
def _eval_is_integer(self):
b, e = self.args
if b.is_rational:
if b.is_integer is False and e.is_positive:
return False # rat**nonneg
if b.is_integer and e.is_integer:
if b is S.NegativeOne:
return True
if e.is_nonnegative or e.is_positive:
return True
if b.is_integer and e.is_negative and (e.is_finite or e.is_integer):
if fuzzy_not((b - 1).is_zero) and fuzzy_not((b + 1).is_zero):
return False
if b.is_Number and e.is_Number:
check = self.func(*self.args)
return check.is_Integer
def _eval_is_extended_real(self):
from sympy import arg, exp, log, Mul
real_b = self.base.is_extended_real
if real_b is None:
if self.base.func == exp and self.base.args[0].is_imaginary:
return self.exp.is_imaginary
return
real_e = self.exp.is_extended_real
if real_e is None:
return
if real_b and real_e:
if self.base.is_extended_positive:
return True
elif self.base.is_extended_nonnegative and self.exp.is_extended_nonnegative:
return True
elif self.exp.is_integer and self.base.is_extended_nonzero:
return True
elif self.exp.is_integer and self.exp.is_nonnegative:
return True
elif self.base.is_extended_negative:
if self.exp.is_Rational:
return False
if real_e and self.exp.is_extended_negative and self.base.is_zero is False:
return Pow(self.base, -self.exp).is_extended_real
im_b = self.base.is_imaginary
im_e = self.exp.is_imaginary
if im_b:
if self.exp.is_integer:
if self.exp.is_even:
return True
elif self.exp.is_odd:
return False
elif im_e and log(self.base).is_imaginary:
return True
elif self.exp.is_Add:
c, a = self.exp.as_coeff_Add()
if c and c.is_Integer:
return Mul(
self.base**c, self.base**a, evaluate=False).is_extended_real
elif self.base in (-S.ImaginaryUnit, S.ImaginaryUnit):
if (self.exp/2).is_integer is False:
return False
if real_b and im_e:
if self.base is S.NegativeOne:
return True
c = self.exp.coeff(S.ImaginaryUnit)
if c:
if self.base.is_rational and c.is_rational:
if self.base.is_nonzero and (self.base - 1).is_nonzero and c.is_nonzero:
return False
ok = (c*log(self.base)/S.Pi).is_integer
if ok is not None:
return ok
if real_b is False: # we already know it's not imag
i = arg(self.base)*self.exp/S.Pi
return i.is_integer
def _eval_is_complex(self):
if all(a.is_complex for a in self.args) and self._eval_is_finite():
return True
def _eval_is_imaginary(self):
from sympy import arg, log
if self.base.is_imaginary:
if self.exp.is_integer:
odd = self.exp.is_odd
if odd is not None:
return odd
return
if self.exp.is_imaginary:
imlog = log(self.base).is_imaginary
if imlog is not None:
return False # I**i -> real; (2*I)**i -> complex ==> not imaginary
if self.base.is_extended_real and self.exp.is_extended_real:
if self.base.is_positive:
return False
else:
rat = self.exp.is_rational
if not rat:
return rat
if self.exp.is_integer:
return False
else:
half = (2*self.exp).is_integer
if half:
return self.base.is_negative
return half
if self.base.is_extended_real is False: # we already know it's not imag
i = arg(self.base)*self.exp/S.Pi
isodd = (2*i).is_odd
if isodd is not None:
return isodd
if self.exp.is_negative:
return (1/self).is_imaginary
def _eval_is_odd(self):
if self.exp.is_integer:
if self.exp.is_positive:
return self.base.is_odd
elif self.exp.is_nonnegative and self.base.is_odd:
return True
elif self.base is S.NegativeOne:
return True
def _eval_is_finite(self):
if self.exp.is_negative:
if self.base.is_zero:
return False
if self.base.is_infinite or self.base.is_nonzero:
return True
c1 = self.base.is_finite
if c1 is None:
return
c2 = self.exp.is_finite
if c2 is None:
return
if c1 and c2:
if self.exp.is_nonnegative or fuzzy_not(self.base.is_zero):
return True
def _eval_is_prime(self):
'''
An integer raised to the n(>=2)-th power cannot be a prime.
'''
if self.base.is_integer and self.exp.is_integer and (self.exp - 1).is_positive:
return False
def _eval_is_composite(self):
"""
A power is composite if both base and exponent are greater than 1
"""
if (self.base.is_integer and self.exp.is_integer and
((self.base - 1).is_positive and (self.exp - 1).is_positive or
(self.base + 1).is_negative and self.exp.is_positive and self.exp.is_even)):
return True
def _eval_is_polar(self):
return self.base.is_polar
def _eval_subs(self, old, new):
from sympy import exp, log, Symbol
def _check(ct1, ct2, old):
"""Return (bool, pow, remainder_pow) where, if bool is True, then the
exponent of Pow `old` will combine with `pow` so the substitution
is valid, otherwise bool will be False.
For noncommutative objects, `pow` will be an integer, and a factor
`Pow(old.base, remainder_pow)` needs to be included. If there is
no such factor, None is returned. For commutative objects,
remainder_pow is always None.
cti are the coefficient and terms of an exponent of self or old
In this _eval_subs routine a change like (b**(2*x)).subs(b**x, y)
will give y**2 since (b**x)**2 == b**(2*x); if that equality does
not hold then the substitution should not occur so `bool` will be
False.
"""
coeff1, terms1 = ct1
coeff2, terms2 = ct2
if terms1 == terms2:
if old.is_commutative:
# Allow fractional powers for commutative objects
pow = coeff1/coeff2
try:
as_int(pow, strict=False)
combines = True
except ValueError:
combines = isinstance(Pow._eval_power(
Pow(*old.as_base_exp(), evaluate=False),
pow), (Pow, exp, Symbol))
return combines, pow, None
else:
# With noncommutative symbols, substitute only integer powers
if not isinstance(terms1, tuple):
terms1 = (terms1,)
if not all(term.is_integer for term in terms1):
return False, None, None
try:
# Round pow toward zero
pow, remainder = divmod(as_int(coeff1), as_int(coeff2))
if pow < 0 and remainder != 0:
pow += 1
remainder -= as_int(coeff2)
if remainder == 0:
remainder_pow = None
else:
remainder_pow = Mul(remainder, *terms1)
return True, pow, remainder_pow
except ValueError:
# Can't substitute
pass
return False, None, None
if old == self.base:
return new**self.exp._subs(old, new)
# issue 10829: (4**x - 3*y + 2).subs(2**x, y) -> y**2 - 3*y + 2
if isinstance(old, self.func) and self.exp == old.exp:
l = log(self.base, old.base)
if l.is_Number:
return Pow(new, l)
if isinstance(old, self.func) and self.base == old.base:
if self.exp.is_Add is False:
ct1 = self.exp.as_independent(Symbol, as_Add=False)
ct2 = old.exp.as_independent(Symbol, as_Add=False)
ok, pow, remainder_pow = _check(ct1, ct2, old)
if ok:
# issue 5180: (x**(6*y)).subs(x**(3*y),z)->z**2
result = self.func(new, pow)
if remainder_pow is not None:
result = Mul(result, Pow(old.base, remainder_pow))
return result
else: # b**(6*x + a).subs(b**(3*x), y) -> y**2 * b**a
# exp(exp(x) + exp(x**2)).subs(exp(exp(x)), w) -> w * exp(exp(x**2))
oarg = old.exp
new_l = []
o_al = []
ct2 = oarg.as_coeff_mul()
for a in self.exp.args:
newa = a._subs(old, new)
ct1 = newa.as_coeff_mul()
ok, pow, remainder_pow = _check(ct1, ct2, old)
if ok:
new_l.append(new**pow)
if remainder_pow is not None:
o_al.append(remainder_pow)
continue
elif not old.is_commutative and not newa.is_integer:
# If any term in the exponent is non-integer,
# we do not do any substitutions in the noncommutative case
return
o_al.append(newa)
if new_l:
expo = Add(*o_al)
new_l.append(Pow(self.base, expo, evaluate=False) if expo != 1 else self.base)
return Mul(*new_l)
if isinstance(old, exp) and self.exp.is_extended_real and self.base.is_positive:
ct1 = old.args[0].as_independent(Symbol, as_Add=False)
ct2 = (self.exp*log(self.base)).as_independent(
Symbol, as_Add=False)
ok, pow, remainder_pow = _check(ct1, ct2, old)
if ok:
result = self.func(new, pow) # (2**x).subs(exp(x*log(2)), z) -> z
if remainder_pow is not None:
result = Mul(result, Pow(old.base, remainder_pow))
return result
def as_base_exp(self):
"""Return base and exp of self.
If base is 1/Integer, then return Integer, -exp. If this extra
processing is not needed, the base and exp properties will
give the raw arguments
Examples
========
>>> from sympy import Pow, S
>>> p = Pow(S.Half, 2, evaluate=False)
>>> p.as_base_exp()
(2, -2)
>>> p.args
(1/2, 2)
"""
b, e = self.args
if b.is_Rational and b.p == 1 and b.q != 1:
return Integer(b.q), -e
return b, e
def _eval_adjoint(self):
from sympy.functions.elementary.complexes import adjoint
i, p = self.exp.is_integer, self.base.is_positive
if i:
return adjoint(self.base)**self.exp
if p:
return self.base**adjoint(self.exp)
if i is False and p is False:
expanded = expand_complex(self)
if expanded != self:
return adjoint(expanded)
def _eval_conjugate(self):
from sympy.functions.elementary.complexes import conjugate as c
i, p = self.exp.is_integer, self.base.is_positive
if i:
return c(self.base)**self.exp
if p:
return self.base**c(self.exp)
if i is False and p is False:
expanded = expand_complex(self)
if expanded != self:
return c(expanded)
if self.is_extended_real:
return self
def _eval_transpose(self):
from sympy.functions.elementary.complexes import transpose
i, p = self.exp.is_integer, (self.base.is_complex or self.base.is_infinite)
if p:
return self.base**self.exp
if i:
return transpose(self.base)**self.exp
if i is False and p is False:
expanded = expand_complex(self)
if expanded != self:
return transpose(expanded)
def _eval_expand_power_exp(self, **hints):
"""a**(n + m) -> a**n*a**m"""
b = self.base
e = self.exp
if e.is_Add and e.is_commutative:
expr = []
for x in e.args:
expr.append(self.func(self.base, x))
return Mul(*expr)
return self.func(b, e)
def _eval_expand_power_base(self, **hints):
"""(a*b)**n -> a**n * b**n"""
force = hints.get('force', False)
b = self.base
e = self.exp
if not b.is_Mul:
return self
cargs, nc = b.args_cnc(split_1=False)
# expand each term - this is top-level-only
# expansion but we have to watch out for things
# that don't have an _eval_expand method
if nc:
nc = [i._eval_expand_power_base(**hints)
if hasattr(i, '_eval_expand_power_base') else i
for i in nc]
if e.is_Integer:
if e.is_positive:
rv = Mul(*nc*e)
else:
rv = Mul(*[i**-1 for i in nc[::-1]]*-e)
if cargs:
rv *= Mul(*cargs)**e
return rv
if not cargs:
return self.func(Mul(*nc), e, evaluate=False)
nc = [Mul(*nc)]
# sift the commutative bases
other, maybe_real = sift(cargs, lambda x: x.is_extended_real is False,
binary=True)
def pred(x):
if x is S.ImaginaryUnit:
return S.ImaginaryUnit
polar = x.is_polar
if polar:
return True
if polar is None:
return fuzzy_bool(x.is_extended_nonnegative)
sifted = sift(maybe_real, pred)
nonneg = sifted[True]
other += sifted[None]
neg = sifted[False]
imag = sifted[S.ImaginaryUnit]
if imag:
I = S.ImaginaryUnit
i = len(imag) % 4
if i == 0:
pass
elif i == 1:
other.append(I)
elif i == 2:
if neg:
nonn = -neg.pop()
if nonn is not S.One:
nonneg.append(nonn)
else:
neg.append(S.NegativeOne)
else:
if neg:
nonn = -neg.pop()
if nonn is not S.One:
nonneg.append(nonn)
else:
neg.append(S.NegativeOne)
other.append(I)
del imag
# bring out the bases that can be separated from the base
if force or e.is_integer:
# treat all commutatives the same and put nc in other
cargs = nonneg + neg + other
other = nc
else:
# this is just like what is happening automatically, except
# that now we are doing it for an arbitrary exponent for which
# no automatic expansion is done
assert not e.is_Integer
# handle negatives by making them all positive and putting
# the residual -1 in other
if len(neg) > 1:
o = S.One
if not other and neg[0].is_Number:
o *= neg.pop(0)
if len(neg) % 2:
o = -o
for n in neg:
nonneg.append(-n)
if o is not S.One:
other.append(o)
elif neg and other:
if neg[0].is_Number and neg[0] is not S.NegativeOne:
other.append(S.NegativeOne)
nonneg.append(-neg[0])
else:
other.extend(neg)
else:
other.extend(neg)
del neg
cargs = nonneg
other += nc
rv = S.One
if cargs:
if e.is_Rational:
npow, cargs = sift(cargs, lambda x: x.is_Pow and
x.exp.is_Rational and x.base.is_number,
binary=True)
rv = Mul(*[self.func(b.func(*b.args), e) for b in npow])
rv *= Mul(*[self.func(b, e, evaluate=False) for b in cargs])
if other:
rv *= self.func(Mul(*other), e, evaluate=False)
return rv
def _eval_expand_multinomial(self, **hints):
"""(a + b + ..)**n -> a**n + n*a**(n-1)*b + .., n is nonzero integer"""
base, exp = self.args
result = self
if exp.is_Rational and exp.p > 0 and base.is_Add:
if not exp.is_Integer:
n = Integer(exp.p // exp.q)
if not n:
return result
else:
radical, result = self.func(base, exp - n), []
expanded_base_n = self.func(base, n)
if expanded_base_n.is_Pow:
expanded_base_n = \
expanded_base_n._eval_expand_multinomial()
for term in Add.make_args(expanded_base_n):
result.append(term*radical)
return Add(*result)
n = int(exp)
if base.is_commutative:
order_terms, other_terms = [], []
for b in base.args:
if b.is_Order:
order_terms.append(b)
else:
other_terms.append(b)
if order_terms:
# (f(x) + O(x^n))^m -> f(x)^m + m*f(x)^{m-1} *O(x^n)
f = Add(*other_terms)
o = Add(*order_terms)
if n == 2:
return expand_multinomial(f**n, deep=False) + n*f*o
else:
g = expand_multinomial(f**(n - 1), deep=False)
return expand_mul(f*g, deep=False) + n*g*o
if base.is_number:
# Efficiently expand expressions of the form (a + b*I)**n
# where 'a' and 'b' are real numbers and 'n' is integer.
a, b = base.as_real_imag()
if a.is_Rational and b.is_Rational:
if not a.is_Integer:
if not b.is_Integer:
k = self.func(a.q * b.q, n)
a, b = a.p*b.q, a.q*b.p
else:
k = self.func(a.q, n)
a, b = a.p, a.q*b
elif not b.is_Integer:
k = self.func(b.q, n)
a, b = a*b.q, b.p
else:
k = 1
a, b, c, d = int(a), int(b), 1, 0
while n:
if n & 1:
c, d = a*c - b*d, b*c + a*d
n -= 1
a, b = a*a - b*b, 2*a*b
n //= 2
I = S.ImaginaryUnit
if k == 1:
return c + I*d
else:
return Integer(c)/k + I*d/k
p = other_terms
# (x + y)**3 -> x**3 + 3*x**2*y + 3*x*y**2 + y**3
# in this particular example:
# p = [x,y]; n = 3
# so now it's easy to get the correct result -- we get the
# coefficients first:
from sympy import multinomial_coefficients
from sympy.polys.polyutils import basic_from_dict
expansion_dict = multinomial_coefficients(len(p), n)
# in our example: {(3, 0): 1, (1, 2): 3, (0, 3): 1, (2, 1): 3}
# and now construct the expression.
return basic_from_dict(expansion_dict, *p)
else:
if n == 2:
return Add(*[f*g for f in base.args for g in base.args])
else:
multi = (base**(n - 1))._eval_expand_multinomial()
if multi.is_Add:
return Add(*[f*g for f in base.args
for g in multi.args])
else:
# XXX can this ever happen if base was an Add?
return Add(*[f*multi for f in base.args])
elif (exp.is_Rational and exp.p < 0 and base.is_Add and
abs(exp.p) > exp.q):
return 1 / self.func(base, -exp)._eval_expand_multinomial()
elif exp.is_Add and base.is_Number:
# a + b a b
# n --> n n , where n, a, b are Numbers
coeff, tail = S.One, S.Zero
for term in exp.args:
if term.is_Number:
coeff *= self.func(base, term)
else:
tail += term
return coeff * self.func(base, tail)
else:
return result
def as_real_imag(self, deep=True, **hints):
from sympy import atan2, cos, im, re, sin
from sympy.polys.polytools import poly
if self.exp.is_Integer:
exp = self.exp
re_e, im_e = self.base.as_real_imag(deep=deep)
if not im_e:
return self, S.Zero
a, b = symbols('a b', cls=Dummy)
if exp >= 0:
if re_e.is_Number and im_e.is_Number:
# We can be more efficient in this case
expr = expand_multinomial(self.base**exp)
if expr != self:
return expr.as_real_imag()
expr = poly(
(a + b)**exp) # a = re, b = im; expr = (a + b*I)**exp
else:
mag = re_e**2 + im_e**2
re_e, im_e = re_e/mag, -im_e/mag
if re_e.is_Number and im_e.is_Number:
# We can be more efficient in this case
expr = expand_multinomial((re_e + im_e*S.ImaginaryUnit)**-exp)
if expr != self:
return expr.as_real_imag()
expr = poly((a + b)**-exp)
# Terms with even b powers will be real
r = [i for i in expr.terms() if not i[0][1] % 2]
re_part = Add(*[cc*a**aa*b**bb for (aa, bb), cc in r])
# Terms with odd b powers will be imaginary
r = [i for i in expr.terms() if i[0][1] % 4 == 1]
im_part1 = Add(*[cc*a**aa*b**bb for (aa, bb), cc in r])
r = [i for i in expr.terms() if i[0][1] % 4 == 3]
im_part3 = Add(*[cc*a**aa*b**bb for (aa, bb), cc in r])
return (re_part.subs({a: re_e, b: S.ImaginaryUnit*im_e}),
im_part1.subs({a: re_e, b: im_e}) + im_part3.subs({a: re_e, b: -im_e}))
elif self.exp.is_Rational:
re_e, im_e = self.base.as_real_imag(deep=deep)
if im_e.is_zero and self.exp is S.Half:
if re_e.is_extended_nonnegative:
return self, S.Zero
if re_e.is_extended_nonpositive:
return S.Zero, (-self.base)**self.exp
# XXX: This is not totally correct since for x**(p/q) with
# x being imaginary there are actually q roots, but
# only a single one is returned from here.
r = self.func(self.func(re_e, 2) + self.func(im_e, 2), S.Half)
t = atan2(im_e, re_e)
rp, tp = self.func(r, self.exp), t*self.exp
return (rp*cos(tp), rp*sin(tp))
else:
if deep:
hints['complex'] = False
expanded = self.expand(deep, **hints)
if hints.get('ignore') == expanded:
return None
else:
return (re(expanded), im(expanded))
else:
return (re(self), im(self))
def _eval_derivative(self, s):
from sympy import log
dbase = self.base.diff(s)
dexp = self.exp.diff(s)
return self * (dexp * log(self.base) + dbase * self.exp/self.base)
def _eval_evalf(self, prec):
base, exp = self.as_base_exp()
base = base._evalf(prec)
if not exp.is_Integer:
exp = exp._evalf(prec)
if exp.is_negative and base.is_number and base.is_extended_real is False:
base = base.conjugate() / (base * base.conjugate())._evalf(prec)
exp = -exp
return self.func(base, exp).expand()
return self.func(base, exp)
def _eval_is_polynomial(self, syms):
if self.exp.has(*syms):
return False
if self.base.has(*syms):
return bool(self.base._eval_is_polynomial(syms) and
self.exp.is_Integer and (self.exp >= 0))
else:
return True
def _eval_is_rational(self):
# The evaluation of self.func below can be very expensive in the case
# of integer**integer if the exponent is large. We should try to exit
# before that if possible:
if (self.exp.is_integer and self.base.is_rational
and fuzzy_not(fuzzy_and([self.exp.is_negative, self.base.is_zero]))):
return True
p = self.func(*self.as_base_exp()) # in case it's unevaluated
if not p.is_Pow:
return p.is_rational
b, e = p.as_base_exp()
if e.is_Rational and b.is_Rational:
# we didn't check that e is not an Integer
# because Rational**Integer autosimplifies
return False
if e.is_integer:
if b.is_rational:
if fuzzy_not(b.is_zero) or e.is_nonnegative:
return True
if b == e: # always rational, even for 0**0
return True
elif b.is_irrational:
return e.is_zero
def _eval_is_algebraic(self):
def _is_one(expr):
try:
return (expr - 1).is_zero
except ValueError:
# when the operation is not allowed
return False
if self.base.is_zero or _is_one(self.base):
return True
elif self.exp.is_rational:
if self.base.is_algebraic is False:
return self.exp.is_zero
if self.base.is_zero is False:
if self.exp.is_nonzero:
return self.base.is_algebraic
elif self.base.is_algebraic:
return True
if self.exp.is_positive:
return self.base.is_algebraic
elif self.base.is_algebraic and self.exp.is_algebraic:
if ((fuzzy_not(self.base.is_zero)
and fuzzy_not(_is_one(self.base)))
or self.base.is_integer is False
or self.base.is_irrational):
return self.exp.is_rational
def _eval_is_rational_function(self, syms):
if self.exp.has(*syms):
return False
if self.base.has(*syms):
return self.base._eval_is_rational_function(syms) and \
self.exp.is_Integer
else:
return True
def _eval_is_algebraic_expr(self, syms):
if self.exp.has(*syms):
return False
if self.base.has(*syms):
return self.base._eval_is_algebraic_expr(syms) and \
self.exp.is_Rational
else:
return True
def _eval_rewrite_as_exp(self, base, expo, **kwargs):
from sympy import exp, log, I, arg
if base.is_zero or base.has(exp) or expo.has(exp):
return base**expo
if base.has(Symbol):
# delay evaluation if expo is non symbolic
# (as exp(x*log(5)) automatically reduces to x**5)
return exp(log(base)*expo, evaluate=expo.has(Symbol))
else:
return exp((log(abs(base)) + I*arg(base))*expo)
def as_numer_denom(self):
if not self.is_commutative:
return self, S.One
base, exp = self.as_base_exp()
n, d = base.as_numer_denom()
# this should be the same as ExpBase.as_numer_denom wrt
# exponent handling
neg_exp = exp.is_negative
if not neg_exp and not (-exp).is_negative:
neg_exp = _coeff_isneg(exp)
int_exp = exp.is_integer
# the denominator cannot be separated from the numerator if
# its sign is unknown unless the exponent is an integer, e.g.
# sqrt(a/b) != sqrt(a)/sqrt(b) when a=1 and b=-1. But if the
# denominator is negative the numerator and denominator can
# be negated and the denominator (now positive) separated.
if not (d.is_extended_real or int_exp):
n = base
d = S.One
dnonpos = d.is_nonpositive
if dnonpos:
n, d = -n, -d
elif dnonpos is None and not int_exp:
n = base
d = S.One
if neg_exp:
n, d = d, n
exp = -exp
if exp.is_infinite:
if n is S.One and d is not S.One:
return n, self.func(d, exp)
if n is not S.One and d is S.One:
return self.func(n, exp), d
return self.func(n, exp), self.func(d, exp)
def matches(self, expr, repl_dict={}, old=False):
expr = _sympify(expr)
# special case, pattern = 1 and expr.exp can match to 0
if expr is S.One:
d = repl_dict.copy()
d = self.exp.matches(S.Zero, d)
if d is not None:
return d
# make sure the expression to be matched is an Expr
if not isinstance(expr, Expr):
return None
b, e = expr.as_base_exp()
# special case number
sb, se = self.as_base_exp()
if sb.is_Symbol and se.is_Integer and expr:
if e.is_rational:
return sb.matches(b**(e/se), repl_dict)
return sb.matches(expr**(1/se), repl_dict)
d = repl_dict.copy()
d = self.base.matches(b, d)
if d is None:
return None
d = self.exp.xreplace(d).matches(e, d)
if d is None:
return Expr.matches(self, expr, repl_dict)
return d
def _eval_nseries(self, x, n, logx):
# NOTE! This function is an important part of the gruntz algorithm
# for computing limits. It has to return a generalized power
# series with coefficients in C(log, log(x)). In more detail:
# It has to return an expression
# c_0*x**e_0 + c_1*x**e_1 + ... (finitely many terms)
# where e_i are numbers (not necessarily integers) and c_i are
# expressions involving only numbers, the log function, and log(x).
from sympy import ceiling, collect, exp, log, O, Order, powsimp
b, e = self.args
if e.is_Integer:
if e > 0:
# positive integer powers are easy to expand, e.g.:
# sin(x)**4 = (x - x**3/3 + ...)**4 = ...
return expand_multinomial(self.func(b._eval_nseries(x, n=n,
logx=logx), e), deep=False)
elif e is S.NegativeOne:
# this is also easy to expand using the formula:
# 1/(1 + x) = 1 - x + x**2 - x**3 ...
# so we need to rewrite base to the form "1 + x"
nuse = n
cf = 1
try:
ord = b.as_leading_term(x)
cf = Order(ord, x).getn()
if cf and cf.is_Number:
nuse = n + 2*ceiling(cf)
else:
cf = 1
except NotImplementedError:
pass
b_orig, prefactor = b, O(1, x)
while prefactor.is_Order:
nuse += 1
b = b_orig._eval_nseries(x, n=nuse, logx=logx)
prefactor = b.as_leading_term(x)
# express "rest" as: rest = 1 + k*x**l + ... + O(x**n)
rest = expand_mul((b - prefactor)/prefactor)
rest = rest.simplify() #test_issue_6364
if rest.is_Order:
return 1/prefactor + rest/prefactor + O(x**n, x)
k, l = rest.leadterm(x)
if l.is_Rational and l > 0:
pass
elif l.is_number and l > 0:
l = l.evalf()
elif l == 0:
k = k.simplify()
if k == 0:
# if prefactor == w**4 + x**2*w**4 + 2*x*w**4, we need to
# factor the w**4 out using collect:
return 1/collect(prefactor, x)
else:
raise NotImplementedError()
else:
raise NotImplementedError()
if cf < 0:
cf = S.One/abs(cf)
try:
dn = Order(1/prefactor, x).getn()
if dn and dn < 0:
pass
else:
dn = 0
except NotImplementedError:
dn = 0
terms = [1/prefactor]
for m in range(1, ceiling((n - dn + 1)/l*cf)):
new_term = terms[-1]*(-rest)
if new_term.is_Pow:
new_term = new_term._eval_expand_multinomial(
deep=False)
else:
new_term = expand_mul(new_term, deep=False)
terms.append(new_term)
terms.append(O(x**n, x))
return powsimp(Add(*terms), deep=True, combine='exp')
else:
# negative powers are rewritten to the cases above, for
# example:
# sin(x)**(-4) = 1/(sin(x)**4) = ...
# and expand the denominator:
nuse, denominator = n, O(1, x)
while denominator.is_Order:
denominator = (b**(-e))._eval_nseries(x, n=nuse, logx=logx)
nuse += 1
if 1/denominator == self:
return self
# now we have a type 1/f(x), that we know how to expand
return (1/denominator)._eval_nseries(x, n=n, logx=logx)
if e.has(Symbol):
return exp(e*log(b))._eval_nseries(x, n=n, logx=logx)
# see if the base is as simple as possible
bx = b
while bx.is_Pow and bx.exp.is_Rational:
bx = bx.base
if bx == x:
return self
# work for b(x)**e where e is not an Integer and does not contain x
# and hopefully has no other symbols
def e2int(e):
"""return the integer value (if possible) of e and a
flag indicating whether it is bounded or not."""
n = e.limit(x, 0)
infinite = n.is_infinite
if not infinite:
# XXX was int or floor intended? int used to behave like floor
# so int(-Rational(1, 2)) returned -1 rather than int's 0
try:
n = int(n)
except TypeError:
# well, the n is something more complicated (like 1 + log(2))
try:
n = int(n.evalf()) + 1 # XXX why is 1 being added?
except TypeError:
pass # hope that base allows this to be resolved
n = _sympify(n)
return n, infinite
order = O(x**n, x)
ei, infinite = e2int(e)
b0 = b.limit(x, 0)
if infinite and (b0 is S.One or b0.has(Symbol)):
# XXX what order
if b0 is S.One:
resid = (b - 1)
if resid.is_positive:
return S.Infinity
elif resid.is_negative:
return S.Zero
raise ValueError('cannot determine sign of %s' % resid)
return b0**ei
if (b0 is S.Zero or b0.is_infinite):
if infinite is not False:
return b0**e # XXX what order
if not ei.is_number: # if not, how will we proceed?
raise ValueError(
'expecting numerical exponent but got %s' % ei)
nuse = n - ei
if e.is_real:
lt = b.as_leading_term(x)
# Try to correct nuse (= m) guess from:
# (lt + rest + O(x**m))**e =
# lt**e*(1 + rest/lt + O(x**m)/lt)**e =
# lt**e + ... + O(x**m)*lt**(e - 1) = ... + O(x**n)
try:
cf = Order(lt, x).getn()
nuse = ceiling(n - cf*(e - 1))
except NotImplementedError:
pass
bs = b._eval_nseries(x, n=nuse, logx=logx)
terms = bs.removeO()
if terms.is_Add:
bs = terms
lt = terms.as_leading_term(x)
# bs -> lt + rest -> lt*(1 + (bs/lt - 1))
return ((self.func(lt, e) * self.func((bs/lt).expand(), e).nseries(
x, n=nuse, logx=logx)).expand() + order)
if bs.is_Add:
from sympy import O
# So, bs + O() == terms
c = Dummy('c')
res = []
for arg in bs.args:
if arg.is_Order:
arg = c*arg.expr
res.append(arg)
bs = Add(*res)
rv = (bs**e).series(x).subs(c, O(1, x))
rv += order
return rv
rv = bs**e
if terms != bs:
rv += order
return rv
# either b0 is bounded but neither 1 nor 0 or e is infinite
# b -> b0 + (b - b0) -> b0 * (1 + (b/b0 - 1))
o2 = order*(b0**-e)
z = (b/b0 - 1)
o = O(z, x)
if o is S.Zero or o2 is S.Zero:
infinite = True
else:
if o.expr.is_number:
e2 = log(o2.expr*x)/log(x)
else:
e2 = log(o2.expr)/log(o.expr)
n, infinite = e2int(e2)
if infinite:
# requested accuracy gives infinite series,
# order is probably non-polynomial e.g. O(exp(-1/x), x).
r = 1 + z
else:
l = []
g = None
for i in range(n + 2):
g = self._taylor_term(i, z, g)
g = g.nseries(x, n=n, logx=logx)
l.append(g)
r = Add(*l)
return expand_mul(r*b0**e) + order
def _eval_as_leading_term(self, x):
from sympy import exp, log
if not self.exp.has(x):
return self.func(self.base.as_leading_term(x), self.exp)
return exp(self.exp * log(self.base)).as_leading_term(x)
@cacheit
def _taylor_term(self, n, x, *previous_terms): # of (1 + x)**e
from sympy import binomial
return binomial(self.exp, n) * self.func(x, n)
def _sage_(self):
return self.args[0]._sage_()**self.args[1]._sage_()
def as_content_primitive(self, radical=False, clear=True):
"""Return the tuple (R, self/R) where R is the positive Rational
extracted from self.
Examples
========
>>> from sympy import sqrt
>>> sqrt(4 + 4*sqrt(2)).as_content_primitive()
(2, sqrt(1 + sqrt(2)))
>>> sqrt(3 + 3*sqrt(2)).as_content_primitive()
(1, sqrt(3)*sqrt(1 + sqrt(2)))
>>> from sympy import expand_power_base, powsimp, Mul
>>> from sympy.abc import x, y
>>> ((2*x + 2)**2).as_content_primitive()
(4, (x + 1)**2)
>>> (4**((1 + y)/2)).as_content_primitive()
(2, 4**(y/2))
>>> (3**((1 + y)/2)).as_content_primitive()
(1, 3**((y + 1)/2))
>>> (3**((5 + y)/2)).as_content_primitive()
(9, 3**((y + 1)/2))
>>> eq = 3**(2 + 2*x)
>>> powsimp(eq) == eq
True
>>> eq.as_content_primitive()
(9, 3**(2*x))
>>> powsimp(Mul(*_))
3**(2*x + 2)
>>> eq = (2 + 2*x)**y
>>> s = expand_power_base(eq); s.is_Mul, s
(False, (2*x + 2)**y)
>>> eq.as_content_primitive()
(1, (2*(x + 1))**y)
>>> s = expand_power_base(_[1]); s.is_Mul, s
(True, 2**y*(x + 1)**y)
See docstring of Expr.as_content_primitive for more examples.
"""
b, e = self.as_base_exp()
b = _keep_coeff(*b.as_content_primitive(radical=radical, clear=clear))
ce, pe = e.as_content_primitive(radical=radical, clear=clear)
if b.is_Rational:
#e
#= ce*pe
#= ce*(h + t)
#= ce*h + ce*t
#=> self
#= b**(ce*h)*b**(ce*t)
#= b**(cehp/cehq)*b**(ce*t)
#= b**(iceh + r/cehq)*b**(ce*t)
#= b**(iceh)*b**(r/cehq)*b**(ce*t)
#= b**(iceh)*b**(ce*t + r/cehq)
h, t = pe.as_coeff_Add()
if h.is_Rational:
ceh = ce*h
c = self.func(b, ceh)
r = S.Zero
if not c.is_Rational:
iceh, r = divmod(ceh.p, ceh.q)
c = self.func(b, iceh)
return c, self.func(b, _keep_coeff(ce, t + r/ce/ceh.q))
e = _keep_coeff(ce, pe)
# b**e = (h*t)**e = h**e*t**e = c*m*t**e
if e.is_Rational and b.is_Mul:
h, t = b.as_content_primitive(radical=radical, clear=clear) # h is positive
c, m = self.func(h, e).as_coeff_Mul() # so c is positive
m, me = m.as_base_exp()
if m is S.One or me == e: # probably always true
# return the following, not return c, m*Pow(t, e)
# which would change Pow into Mul; we let sympy
# decide what to do by using the unevaluated Mul, e.g
# should it stay as sqrt(2 + 2*sqrt(5)) or become
# sqrt(2)*sqrt(1 + sqrt(5))
return c, self.func(_keep_coeff(m, t), e)
return S.One, self.func(b, e)
def is_constant(self, *wrt, **flags):
expr = self
if flags.get('simplify', True):
expr = expr.simplify()
b, e = expr.as_base_exp()
bz = b.equals(0)
if bz: # recalculate with assumptions in case it's unevaluated
new = b**e
if new != expr:
return new.is_constant()
econ = e.is_constant(*wrt)
bcon = b.is_constant(*wrt)
if bcon:
if econ:
return True
bz = b.equals(0)
if bz is False:
return False
elif bcon is None:
return None
return e.equals(0)
def _eval_difference_delta(self, n, step):
b, e = self.args
if e.has(n) and not b.has(n):
new_e = e.subs(n, n + step)
return (b**(new_e - e) - 1) * self
from .add import Add
from .numbers import Integer
from .mul import Mul, _keep_coeff
from .symbol import Symbol, Dummy, symbols
|
562a054fce090ea332e29a85031b1636371c00f8360e0a8efc5e2201b6dcc52d | """Tools for manipulating of large commutative expressions. """
from __future__ import print_function, division
from sympy.core.add import Add
from sympy.core.compatibility import iterable, is_sequence, SYMPY_INTS
from sympy.core.mul import Mul, _keep_coeff
from sympy.core.power import Pow
from sympy.core.basic import Basic, preorder_traversal
from sympy.core.expr import Expr
from sympy.core.sympify import sympify
from sympy.core.numbers import Rational, Integer, Number, I
from sympy.core.singleton import S
from sympy.core.symbol import Dummy
from sympy.core.coreerrors import NonCommutativeExpression
from sympy.core.containers import Tuple, Dict
from sympy.utilities import default_sort_key
from sympy.utilities.iterables import (common_prefix, common_suffix,
variations, ordered)
from collections import defaultdict
_eps = Dummy(positive=True)
def _isnumber(i):
return isinstance(i, (SYMPY_INTS, float)) or i.is_Number
def _monotonic_sign(self):
"""Return the value closest to 0 that ``self`` may have if all symbols
are signed and the result is uniformly the same sign for all values of symbols.
If a symbol is only signed but not known to be an
integer or the result is 0 then a symbol representative of the sign of self
will be returned. Otherwise, None is returned if a) the sign could be positive
or negative or b) self is not in one of the following forms:
- L(x, y, ...) + A: a function linear in all symbols x, y, ... with an
additive constant; if A is zero then the function can be a monomial whose
sign is monotonic over the range of the variables, e.g. (x + 1)**3 if x is
nonnegative.
- A/L(x, y, ...) + B: the inverse of a function linear in all symbols x, y, ...
that does not have a sign change from positive to negative for any set
of values for the variables.
- M(x, y, ...) + A: a monomial M whose factors are all signed and a constant, A.
- A/M(x, y, ...) + B: the inverse of a monomial and constants A and B.
- P(x): a univariate polynomial
Examples
========
>>> from sympy.core.exprtools import _monotonic_sign as F
>>> from sympy import Dummy, S
>>> nn = Dummy(integer=True, nonnegative=True)
>>> p = Dummy(integer=True, positive=True)
>>> p2 = Dummy(integer=True, positive=True)
>>> F(nn + 1)
1
>>> F(p - 1)
_nneg
>>> F(nn*p + 1)
1
>>> F(p2*p + 1)
2
>>> F(nn - 1) # could be negative, zero or positive
"""
if not self.is_extended_real:
return
if (-self).is_Symbol:
rv = _monotonic_sign(-self)
return rv if rv is None else -rv
if not self.is_Add and self.as_numer_denom()[1].is_number:
s = self
if s.is_prime:
if s.is_odd:
return S(3)
else:
return S(2)
elif s.is_composite:
if s.is_odd:
return S(9)
else:
return S(4)
elif s.is_positive:
if s.is_even:
if s.is_prime is False:
return S(4)
else:
return S(2)
elif s.is_integer:
return S.One
else:
return _eps
elif s.is_extended_negative:
if s.is_even:
return S(-2)
elif s.is_integer:
return S.NegativeOne
else:
return -_eps
if s.is_zero or s.is_extended_nonpositive or s.is_extended_nonnegative:
return S.Zero
return None
# univariate polynomial
free = self.free_symbols
if len(free) == 1:
if self.is_polynomial():
from sympy.polys.polytools import real_roots
from sympy.polys.polyroots import roots
from sympy.polys.polyerrors import PolynomialError
x = free.pop()
x0 = _monotonic_sign(x)
if x0 == _eps or x0 == -_eps:
x0 = S.Zero
if x0 is not None:
d = self.diff(x)
if d.is_number:
currentroots = []
else:
try:
currentroots = real_roots(d)
except (PolynomialError, NotImplementedError):
currentroots = [r for r in roots(d, x) if r.is_extended_real]
y = self.subs(x, x0)
if x.is_nonnegative and all(r <= x0 for r in currentroots):
if y.is_nonnegative and d.is_positive:
if y:
return y if y.is_positive else Dummy('pos', positive=True)
else:
return Dummy('nneg', nonnegative=True)
if y.is_nonpositive and d.is_negative:
if y:
return y if y.is_negative else Dummy('neg', negative=True)
else:
return Dummy('npos', nonpositive=True)
elif x.is_nonpositive and all(r >= x0 for r in currentroots):
if y.is_nonnegative and d.is_negative:
if y:
return Dummy('pos', positive=True)
else:
return Dummy('nneg', nonnegative=True)
if y.is_nonpositive and d.is_positive:
if y:
return Dummy('neg', negative=True)
else:
return Dummy('npos', nonpositive=True)
else:
n, d = self.as_numer_denom()
den = None
if n.is_number:
den = _monotonic_sign(d)
elif not d.is_number:
if _monotonic_sign(n) is not None:
den = _monotonic_sign(d)
if den is not None and (den.is_positive or den.is_negative):
v = n*den
if v.is_positive:
return Dummy('pos', positive=True)
elif v.is_nonnegative:
return Dummy('nneg', nonnegative=True)
elif v.is_negative:
return Dummy('neg', negative=True)
elif v.is_nonpositive:
return Dummy('npos', nonpositive=True)
return None
# multivariate
c, a = self.as_coeff_Add()
v = None
if not a.is_polynomial():
# F/A or A/F where A is a number and F is a signed, rational monomial
n, d = a.as_numer_denom()
if not (n.is_number or d.is_number):
return
if (
a.is_Mul or a.is_Pow) and \
a.is_rational and \
all(p.exp.is_Integer for p in a.atoms(Pow) if p.is_Pow) and \
(a.is_positive or a.is_negative):
v = S.One
for ai in Mul.make_args(a):
if ai.is_number:
v *= ai
continue
reps = {}
for x in ai.free_symbols:
reps[x] = _monotonic_sign(x)
if reps[x] is None:
return
v *= ai.subs(reps)
elif c:
# signed linear expression
if not any(p for p in a.atoms(Pow) if not p.is_number) and (a.is_nonpositive or a.is_nonnegative):
free = list(a.free_symbols)
p = {}
for i in free:
v = _monotonic_sign(i)
if v is None:
return
p[i] = v or (_eps if i.is_nonnegative else -_eps)
v = a.xreplace(p)
if v is not None:
rv = v + c
if v.is_nonnegative and rv.is_positive:
return rv.subs(_eps, 0)
if v.is_nonpositive and rv.is_negative:
return rv.subs(_eps, 0)
def decompose_power(expr):
"""
Decompose power into symbolic base and integer exponent.
This is strictly only valid if the exponent from which
the integer is extracted is itself an integer or the
base is positive. These conditions are assumed and not
checked here.
Examples
========
>>> from sympy.core.exprtools import decompose_power
>>> from sympy.abc import x, y
>>> decompose_power(x)
(x, 1)
>>> decompose_power(x**2)
(x, 2)
>>> decompose_power(x**(2*y))
(x**y, 2)
>>> decompose_power(x**(2*y/3))
(x**(y/3), 2)
"""
base, exp = expr.as_base_exp()
if exp.is_Number:
if exp.is_Rational:
if not exp.is_Integer:
base = Pow(base, Rational(1, exp.q))
exp = exp.p
else:
base, exp = expr, 1
else:
exp, tail = exp.as_coeff_Mul(rational=True)
if exp is S.NegativeOne:
base, exp = Pow(base, tail), -1
elif exp is not S.One:
tail = _keep_coeff(Rational(1, exp.q), tail)
base, exp = Pow(base, tail), exp.p
else:
base, exp = expr, 1
return base, exp
def decompose_power_rat(expr):
"""
Decompose power into symbolic base and rational exponent.
"""
base, exp = expr.as_base_exp()
if exp.is_Number:
if not exp.is_Rational:
base, exp = expr, 1
else:
exp, tail = exp.as_coeff_Mul(rational=True)
if exp is S.NegativeOne:
base, exp = Pow(base, tail), -1
elif exp is not S.One:
tail = _keep_coeff(Rational(1, exp.q), tail)
base, exp = Pow(base, tail), exp.p
else:
base, exp = expr, 1
return base, exp
class Factors(object):
"""Efficient representation of ``f_1*f_2*...*f_n``."""
__slots__ = ('factors', 'gens')
def __init__(self, factors=None): # Factors
"""Initialize Factors from dict or expr.
Examples
========
>>> from sympy.core.exprtools import Factors
>>> from sympy.abc import x
>>> from sympy import I
>>> e = 2*x**3
>>> Factors(e)
Factors({2: 1, x: 3})
>>> Factors(e.as_powers_dict())
Factors({2: 1, x: 3})
>>> f = _
>>> f.factors # underlying dictionary
{2: 1, x: 3}
>>> f.gens # base of each factor
frozenset({2, x})
>>> Factors(0)
Factors({0: 1})
>>> Factors(I)
Factors({I: 1})
Notes
=====
Although a dictionary can be passed, only minimal checking is
performed: powers of -1 and I are made canonical.
"""
if isinstance(factors, (SYMPY_INTS, float)):
factors = S(factors)
if isinstance(factors, Factors):
factors = factors.factors.copy()
elif factors is None or factors is S.One:
factors = {}
elif factors is S.Zero or factors == 0:
factors = {S.Zero: S.One}
elif isinstance(factors, Number):
n = factors
factors = {}
if n < 0:
factors[S.NegativeOne] = S.One
n = -n
if n is not S.One:
if n.is_Float or n.is_Integer or n is S.Infinity:
factors[n] = S.One
elif n.is_Rational:
# since we're processing Numbers, the denominator is
# stored with a negative exponent; all other factors
# are left .
if n.p != 1:
factors[Integer(n.p)] = S.One
factors[Integer(n.q)] = S.NegativeOne
else:
raise ValueError('Expected Float|Rational|Integer, not %s' % n)
elif isinstance(factors, Basic) and not factors.args:
factors = {factors: S.One}
elif isinstance(factors, Expr):
c, nc = factors.args_cnc()
i = c.count(I)
for _ in range(i):
c.remove(I)
factors = dict(Mul._from_args(c).as_powers_dict())
# Handle all rational Coefficients
for f in list(factors.keys()):
if isinstance(f, Rational) and not isinstance(f, Integer):
p, q = Integer(f.p), Integer(f.q)
factors[p] = (factors[p] if p in factors else S.Zero) + factors[f]
factors[q] = (factors[q] if q in factors else S.Zero) - factors[f]
factors.pop(f)
if i:
factors[I] = S.One*i
if nc:
factors[Mul(*nc, evaluate=False)] = S.One
else:
factors = factors.copy() # /!\ should be dict-like
# tidy up -/+1 and I exponents if Rational
handle = []
for k in factors:
if k is I or k in (-1, 1):
handle.append(k)
if handle:
i1 = S.One
for k in handle:
if not _isnumber(factors[k]):
continue
i1 *= k**factors.pop(k)
if i1 is not S.One:
for a in i1.args if i1.is_Mul else [i1]: # at worst, -1.0*I*(-1)**e
if a is S.NegativeOne:
factors[a] = S.One
elif a is I:
factors[I] = S.One
elif a.is_Pow:
if S.NegativeOne not in factors:
factors[S.NegativeOne] = S.Zero
factors[S.NegativeOne] += a.exp
elif a == 1:
factors[a] = S.One
elif a == -1:
factors[-a] = S.One
factors[S.NegativeOne] = S.One
else:
raise ValueError('unexpected factor in i1: %s' % a)
self.factors = factors
keys = getattr(factors, 'keys', None)
if keys is None:
raise TypeError('expecting Expr or dictionary')
self.gens = frozenset(keys())
def __hash__(self): # Factors
keys = tuple(ordered(self.factors.keys()))
values = [self.factors[k] for k in keys]
return hash((keys, values))
def __repr__(self): # Factors
return "Factors({%s})" % ', '.join(
['%s: %s' % (k, v) for k, v in ordered(self.factors.items())])
@property
def is_zero(self): # Factors
"""
>>> from sympy.core.exprtools import Factors
>>> Factors(0).is_zero
True
"""
f = self.factors
return len(f) == 1 and S.Zero in f
@property
def is_one(self): # Factors
"""
>>> from sympy.core.exprtools import Factors
>>> Factors(1).is_one
True
"""
return not self.factors
def as_expr(self): # Factors
"""Return the underlying expression.
Examples
========
>>> from sympy.core.exprtools import Factors
>>> from sympy.abc import x, y
>>> Factors((x*y**2).as_powers_dict()).as_expr()
x*y**2
"""
args = []
for factor, exp in self.factors.items():
if exp != 1:
if isinstance(exp, Integer):
b, e = factor.as_base_exp()
e = _keep_coeff(exp, e)
args.append(b**e)
else:
args.append(factor**exp)
else:
args.append(factor)
return Mul(*args)
def mul(self, other): # Factors
"""Return Factors of ``self * other``.
Examples
========
>>> from sympy.core.exprtools import Factors
>>> from sympy.abc import x, y, z
>>> a = Factors((x*y**2).as_powers_dict())
>>> b = Factors((x*y/z).as_powers_dict())
>>> a.mul(b)
Factors({x: 2, y: 3, z: -1})
>>> a*b
Factors({x: 2, y: 3, z: -1})
"""
if not isinstance(other, Factors):
other = Factors(other)
if any(f.is_zero for f in (self, other)):
return Factors(S.Zero)
factors = dict(self.factors)
for factor, exp in other.factors.items():
if factor in factors:
exp = factors[factor] + exp
if not exp:
del factors[factor]
continue
factors[factor] = exp
return Factors(factors)
def normal(self, other):
"""Return ``self`` and ``other`` with ``gcd`` removed from each.
The only differences between this and method ``div`` is that this
is 1) optimized for the case when there are few factors in common and
2) this does not raise an error if ``other`` is zero.
See Also
========
div
"""
if not isinstance(other, Factors):
other = Factors(other)
if other.is_zero:
return (Factors(), Factors(S.Zero))
if self.is_zero:
return (Factors(S.Zero), Factors())
self_factors = dict(self.factors)
other_factors = dict(other.factors)
for factor, self_exp in self.factors.items():
try:
other_exp = other.factors[factor]
except KeyError:
continue
exp = self_exp - other_exp
if not exp:
del self_factors[factor]
del other_factors[factor]
elif _isnumber(exp):
if exp > 0:
self_factors[factor] = exp
del other_factors[factor]
else:
del self_factors[factor]
other_factors[factor] = -exp
else:
r = self_exp.extract_additively(other_exp)
if r is not None:
if r:
self_factors[factor] = r
del other_factors[factor]
else: # should be handled already
del self_factors[factor]
del other_factors[factor]
else:
sc, sa = self_exp.as_coeff_Add()
if sc:
oc, oa = other_exp.as_coeff_Add()
diff = sc - oc
if diff > 0:
self_factors[factor] -= oc
other_exp = oa
elif diff < 0:
self_factors[factor] -= sc
other_factors[factor] -= sc
other_exp = oa - diff
else:
self_factors[factor] = sa
other_exp = oa
if other_exp:
other_factors[factor] = other_exp
else:
del other_factors[factor]
return Factors(self_factors), Factors(other_factors)
def div(self, other): # Factors
"""Return ``self`` and ``other`` with ``gcd`` removed from each.
This is optimized for the case when there are many factors in common.
Examples
========
>>> from sympy.core.exprtools import Factors
>>> from sympy.abc import x, y, z
>>> from sympy import S
>>> a = Factors((x*y**2).as_powers_dict())
>>> a.div(a)
(Factors({}), Factors({}))
>>> a.div(x*z)
(Factors({y: 2}), Factors({z: 1}))
The ``/`` operator only gives ``quo``:
>>> a/x
Factors({y: 2})
Factors treats its factors as though they are all in the numerator, so
if you violate this assumption the results will be correct but will
not strictly correspond to the numerator and denominator of the ratio:
>>> a.div(x/z)
(Factors({y: 2}), Factors({z: -1}))
Factors is also naive about bases: it does not attempt any denesting
of Rational-base terms, for example the following does not become
2**(2*x)/2.
>>> Factors(2**(2*x + 2)).div(S(8))
(Factors({2: 2*x + 2}), Factors({8: 1}))
factor_terms can clean up such Rational-bases powers:
>>> from sympy.core.exprtools import factor_terms
>>> n, d = Factors(2**(2*x + 2)).div(S(8))
>>> n.as_expr()/d.as_expr()
2**(2*x + 2)/8
>>> factor_terms(_)
2**(2*x)/2
"""
quo, rem = dict(self.factors), {}
if not isinstance(other, Factors):
other = Factors(other)
if other.is_zero:
raise ZeroDivisionError
if self.is_zero:
return (Factors(S.Zero), Factors())
for factor, exp in other.factors.items():
if factor in quo:
d = quo[factor] - exp
if _isnumber(d):
if d <= 0:
del quo[factor]
if d >= 0:
if d:
quo[factor] = d
continue
exp = -d
else:
r = quo[factor].extract_additively(exp)
if r is not None:
if r:
quo[factor] = r
else: # should be handled already
del quo[factor]
else:
other_exp = exp
sc, sa = quo[factor].as_coeff_Add()
if sc:
oc, oa = other_exp.as_coeff_Add()
diff = sc - oc
if diff > 0:
quo[factor] -= oc
other_exp = oa
elif diff < 0:
quo[factor] -= sc
other_exp = oa - diff
else:
quo[factor] = sa
other_exp = oa
if other_exp:
rem[factor] = other_exp
else:
assert factor not in rem
continue
rem[factor] = exp
return Factors(quo), Factors(rem)
def quo(self, other): # Factors
"""Return numerator Factor of ``self / other``.
Examples
========
>>> from sympy.core.exprtools import Factors
>>> from sympy.abc import x, y, z
>>> a = Factors((x*y**2).as_powers_dict())
>>> b = Factors((x*y/z).as_powers_dict())
>>> a.quo(b) # same as a/b
Factors({y: 1})
"""
return self.div(other)[0]
def rem(self, other): # Factors
"""Return denominator Factors of ``self / other``.
Examples
========
>>> from sympy.core.exprtools import Factors
>>> from sympy.abc import x, y, z
>>> a = Factors((x*y**2).as_powers_dict())
>>> b = Factors((x*y/z).as_powers_dict())
>>> a.rem(b)
Factors({z: -1})
>>> a.rem(a)
Factors({})
"""
return self.div(other)[1]
def pow(self, other): # Factors
"""Return self raised to a non-negative integer power.
Examples
========
>>> from sympy.core.exprtools import Factors
>>> from sympy.abc import x, y
>>> a = Factors((x*y**2).as_powers_dict())
>>> a**2
Factors({x: 2, y: 4})
"""
if isinstance(other, Factors):
other = other.as_expr()
if other.is_Integer:
other = int(other)
if isinstance(other, SYMPY_INTS) and other >= 0:
factors = {}
if other:
for factor, exp in self.factors.items():
factors[factor] = exp*other
return Factors(factors)
else:
raise ValueError("expected non-negative integer, got %s" % other)
def gcd(self, other): # Factors
"""Return Factors of ``gcd(self, other)``. The keys are
the intersection of factors with the minimum exponent for
each factor.
Examples
========
>>> from sympy.core.exprtools import Factors
>>> from sympy.abc import x, y, z
>>> a = Factors((x*y**2).as_powers_dict())
>>> b = Factors((x*y/z).as_powers_dict())
>>> a.gcd(b)
Factors({x: 1, y: 1})
"""
if not isinstance(other, Factors):
other = Factors(other)
if other.is_zero:
return Factors(self.factors)
factors = {}
for factor, exp in self.factors.items():
factor, exp = sympify(factor), sympify(exp)
if factor in other.factors:
lt = (exp - other.factors[factor]).is_negative
if lt == True:
factors[factor] = exp
elif lt == False:
factors[factor] = other.factors[factor]
return Factors(factors)
def lcm(self, other): # Factors
"""Return Factors of ``lcm(self, other)`` which are
the union of factors with the maximum exponent for
each factor.
Examples
========
>>> from sympy.core.exprtools import Factors
>>> from sympy.abc import x, y, z
>>> a = Factors((x*y**2).as_powers_dict())
>>> b = Factors((x*y/z).as_powers_dict())
>>> a.lcm(b)
Factors({x: 1, y: 2, z: -1})
"""
if not isinstance(other, Factors):
other = Factors(other)
if any(f.is_zero for f in (self, other)):
return Factors(S.Zero)
factors = dict(self.factors)
for factor, exp in other.factors.items():
if factor in factors:
exp = max(exp, factors[factor])
factors[factor] = exp
return Factors(factors)
def __mul__(self, other): # Factors
return self.mul(other)
def __divmod__(self, other): # Factors
return self.div(other)
def __div__(self, other): # Factors
return self.quo(other)
__truediv__ = __div__
def __mod__(self, other): # Factors
return self.rem(other)
def __pow__(self, other): # Factors
return self.pow(other)
def __eq__(self, other): # Factors
if not isinstance(other, Factors):
other = Factors(other)
return self.factors == other.factors
def __ne__(self, other): # Factors
return not self == other
class Term(object):
"""Efficient representation of ``coeff*(numer/denom)``. """
__slots__ = ('coeff', 'numer', 'denom')
def __init__(self, term, numer=None, denom=None): # Term
if numer is None and denom is None:
if not term.is_commutative:
raise NonCommutativeExpression(
'commutative expression expected')
coeff, factors = term.as_coeff_mul()
numer, denom = defaultdict(int), defaultdict(int)
for factor in factors:
base, exp = decompose_power(factor)
if base.is_Add:
cont, base = base.primitive()
coeff *= cont**exp
if exp > 0:
numer[base] += exp
else:
denom[base] += -exp
numer = Factors(numer)
denom = Factors(denom)
else:
coeff = term
if numer is None:
numer = Factors()
if denom is None:
denom = Factors()
self.coeff = coeff
self.numer = numer
self.denom = denom
def __hash__(self): # Term
return hash((self.coeff, self.numer, self.denom))
def __repr__(self): # Term
return "Term(%s, %s, %s)" % (self.coeff, self.numer, self.denom)
def as_expr(self): # Term
return self.coeff*(self.numer.as_expr()/self.denom.as_expr())
def mul(self, other): # Term
coeff = self.coeff*other.coeff
numer = self.numer.mul(other.numer)
denom = self.denom.mul(other.denom)
numer, denom = numer.normal(denom)
return Term(coeff, numer, denom)
def inv(self): # Term
return Term(1/self.coeff, self.denom, self.numer)
def quo(self, other): # Term
return self.mul(other.inv())
def pow(self, other): # Term
if other < 0:
return self.inv().pow(-other)
else:
return Term(self.coeff ** other,
self.numer.pow(other),
self.denom.pow(other))
def gcd(self, other): # Term
return Term(self.coeff.gcd(other.coeff),
self.numer.gcd(other.numer),
self.denom.gcd(other.denom))
def lcm(self, other): # Term
return Term(self.coeff.lcm(other.coeff),
self.numer.lcm(other.numer),
self.denom.lcm(other.denom))
def __mul__(self, other): # Term
if isinstance(other, Term):
return self.mul(other)
else:
return NotImplemented
def __div__(self, other): # Term
if isinstance(other, Term):
return self.quo(other)
else:
return NotImplemented
__truediv__ = __div__
def __pow__(self, other): # Term
if isinstance(other, SYMPY_INTS):
return self.pow(other)
else:
return NotImplemented
def __eq__(self, other): # Term
return (self.coeff == other.coeff and
self.numer == other.numer and
self.denom == other.denom)
def __ne__(self, other): # Term
return not self == other
def _gcd_terms(terms, isprimitive=False, fraction=True):
"""Helper function for :func:`gcd_terms`.
If ``isprimitive`` is True then the call to primitive
for an Add will be skipped. This is useful when the
content has already been extrated.
If ``fraction`` is True then the expression will appear over a common
denominator, the lcm of all term denominators.
"""
if isinstance(terms, Basic) and not isinstance(terms, Tuple):
terms = Add.make_args(terms)
terms = list(map(Term, [t for t in terms if t]))
# there is some simplification that may happen if we leave this
# here rather than duplicate it before the mapping of Term onto
# the terms
if len(terms) == 0:
return S.Zero, S.Zero, S.One
if len(terms) == 1:
cont = terms[0].coeff
numer = terms[0].numer.as_expr()
denom = terms[0].denom.as_expr()
else:
cont = terms[0]
for term in terms[1:]:
cont = cont.gcd(term)
for i, term in enumerate(terms):
terms[i] = term.quo(cont)
if fraction:
denom = terms[0].denom
for term in terms[1:]:
denom = denom.lcm(term.denom)
numers = []
for term in terms:
numer = term.numer.mul(denom.quo(term.denom))
numers.append(term.coeff*numer.as_expr())
else:
numers = [t.as_expr() for t in terms]
denom = Term(S.One).numer
cont = cont.as_expr()
numer = Add(*numers)
denom = denom.as_expr()
if not isprimitive and numer.is_Add:
_cont, numer = numer.primitive()
cont *= _cont
return cont, numer, denom
def gcd_terms(terms, isprimitive=False, clear=True, fraction=True):
"""Compute the GCD of ``terms`` and put them together.
``terms`` can be an expression or a non-Basic sequence of expressions
which will be handled as though they are terms from a sum.
If ``isprimitive`` is True the _gcd_terms will not run the primitive
method on the terms.
``clear`` controls the removal of integers from the denominator of an Add
expression. When True (default), all numerical denominator will be cleared;
when False the denominators will be cleared only if all terms had numerical
denominators other than 1.
``fraction``, when True (default), will put the expression over a common
denominator.
Examples
========
>>> from sympy.core import gcd_terms
>>> from sympy.abc import x, y
>>> gcd_terms((x + 1)**2*y + (x + 1)*y**2)
y*(x + 1)*(x + y + 1)
>>> gcd_terms(x/2 + 1)
(x + 2)/2
>>> gcd_terms(x/2 + 1, clear=False)
x/2 + 1
>>> gcd_terms(x/2 + y/2, clear=False)
(x + y)/2
>>> gcd_terms(x/2 + 1/x)
(x**2 + 2)/(2*x)
>>> gcd_terms(x/2 + 1/x, fraction=False)
(x + 2/x)/2
>>> gcd_terms(x/2 + 1/x, fraction=False, clear=False)
x/2 + 1/x
>>> gcd_terms(x/2/y + 1/x/y)
(x**2 + 2)/(2*x*y)
>>> gcd_terms(x/2/y + 1/x/y, clear=False)
(x**2/2 + 1)/(x*y)
>>> gcd_terms(x/2/y + 1/x/y, clear=False, fraction=False)
(x/2 + 1/x)/y
The ``clear`` flag was ignored in this case because the returned
expression was a rational expression, not a simple sum.
See Also
========
factor_terms, sympy.polys.polytools.terms_gcd
"""
def mask(terms):
"""replace nc portions of each term with a unique Dummy symbols
and return the replacements to restore them"""
args = [(a, []) if a.is_commutative else a.args_cnc() for a in terms]
reps = []
for i, (c, nc) in enumerate(args):
if nc:
nc = Mul(*nc)
d = Dummy()
reps.append((d, nc))
c.append(d)
args[i] = Mul(*c)
else:
args[i] = c
return args, dict(reps)
isadd = isinstance(terms, Add)
addlike = isadd or not isinstance(terms, Basic) and \
is_sequence(terms, include=set) and \
not isinstance(terms, Dict)
if addlike:
if isadd: # i.e. an Add
terms = list(terms.args)
else:
terms = sympify(terms)
terms, reps = mask(terms)
cont, numer, denom = _gcd_terms(terms, isprimitive, fraction)
numer = numer.xreplace(reps)
coeff, factors = cont.as_coeff_Mul()
if not clear:
c, _coeff = coeff.as_coeff_Mul()
if not c.is_Integer and not clear and numer.is_Add:
n, d = c.as_numer_denom()
_numer = numer/d
if any(a.as_coeff_Mul()[0].is_Integer
for a in _numer.args):
numer = _numer
coeff = n*_coeff
return _keep_coeff(coeff, factors*numer/denom, clear=clear)
if not isinstance(terms, Basic):
return terms
if terms.is_Atom:
return terms
if terms.is_Mul:
c, args = terms.as_coeff_mul()
return _keep_coeff(c, Mul(*[gcd_terms(i, isprimitive, clear, fraction)
for i in args]), clear=clear)
def handle(a):
# don't treat internal args like terms of an Add
if not isinstance(a, Expr):
if isinstance(a, Basic):
return a.func(*[handle(i) for i in a.args])
return type(a)([handle(i) for i in a])
return gcd_terms(a, isprimitive, clear, fraction)
if isinstance(terms, Dict):
return Dict(*[(k, handle(v)) for k, v in terms.args])
return terms.func(*[handle(i) for i in terms.args])
def _factor_sum_int(expr, **kwargs):
"""Return Sum or Integral object with factors that are not
in the wrt variables removed. In cases where there are additive
terms in the function of the object that are independent, the
object will be separated into two objects.
Examples
========
>>> from sympy import Sum, factor_terms
>>> from sympy.abc import x, y
>>> factor_terms(Sum(x + y, (x, 1, 3)))
y*Sum(1, (x, 1, 3)) + Sum(x, (x, 1, 3))
>>> factor_terms(Sum(x*y, (x, 1, 3)))
y*Sum(x, (x, 1, 3))
Notes
=====
If a function in the summand or integrand is replaced
with a symbol, then this simplification should not be
done or else an incorrect result will be obtained when
the symbol is replaced with an expression that depends
on the variables of summation/integration:
>>> eq = Sum(y, (x, 1, 3))
>>> factor_terms(eq).subs(y, x).doit()
3*x
>>> eq.subs(y, x).doit()
6
"""
result = expr.function
if result == 0:
return S.Zero
limits = expr.limits
# get the wrt variables
wrt = set([i.args[0] for i in limits])
# factor out any common terms that are independent of wrt
f = factor_terms(result, **kwargs)
i, d = f.as_independent(*wrt)
if isinstance(f, Add):
return i * expr.func(1, *limits) + expr.func(d, *limits)
else:
return i * expr.func(d, *limits)
def factor_terms(expr, radical=False, clear=False, fraction=False, sign=True):
"""Remove common factors from terms in all arguments without
changing the underlying structure of the expr. No expansion or
simplification (and no processing of non-commutatives) is performed.
If radical=True then a radical common to all terms will be factored
out of any Add sub-expressions of the expr.
If clear=False (default) then coefficients will not be separated
from a single Add if they can be distributed to leave one or more
terms with integer coefficients.
If fraction=True (default is False) then a common denominator will be
constructed for the expression.
If sign=True (default) then even if the only factor in common is a -1,
it will be factored out of the expression.
Examples
========
>>> from sympy import factor_terms, Symbol
>>> from sympy.abc import x, y
>>> factor_terms(x + x*(2 + 4*y)**3)
x*(8*(2*y + 1)**3 + 1)
>>> A = Symbol('A', commutative=False)
>>> factor_terms(x*A + x*A + x*y*A)
x*(y*A + 2*A)
When ``clear`` is False, a rational will only be factored out of an
Add expression if all terms of the Add have coefficients that are
fractions:
>>> factor_terms(x/2 + 1, clear=False)
x/2 + 1
>>> factor_terms(x/2 + 1, clear=True)
(x + 2)/2
If a -1 is all that can be factored out, to *not* factor it out, the
flag ``sign`` must be False:
>>> factor_terms(-x - y)
-(x + y)
>>> factor_terms(-x - y, sign=False)
-x - y
>>> factor_terms(-2*x - 2*y, sign=False)
-2*(x + y)
See Also
========
gcd_terms, sympy.polys.polytools.terms_gcd
"""
def do(expr):
from sympy.concrete.summations import Sum
from sympy.integrals.integrals import Integral
is_iterable = iterable(expr)
if not isinstance(expr, Basic) or expr.is_Atom:
if is_iterable:
return type(expr)([do(i) for i in expr])
return expr
if expr.is_Pow or expr.is_Function or \
is_iterable or not hasattr(expr, 'args_cnc'):
args = expr.args
newargs = tuple([do(i) for i in args])
if newargs == args:
return expr
return expr.func(*newargs)
if isinstance(expr, (Sum, Integral)):
return _factor_sum_int(expr,
radical=radical, clear=clear,
fraction=fraction, sign=sign)
cont, p = expr.as_content_primitive(radical=radical, clear=clear)
if p.is_Add:
list_args = [do(a) for a in Add.make_args(p)]
# get a common negative (if there) which gcd_terms does not remove
if all(a.as_coeff_Mul()[0].extract_multiplicatively(-1) is not None
for a in list_args):
cont = -cont
list_args = [-a for a in list_args]
# watch out for exp(-(x+2)) which gcd_terms will change to exp(-x-2)
special = {}
for i, a in enumerate(list_args):
b, e = a.as_base_exp()
if e.is_Mul and e != Mul(*e.args):
list_args[i] = Dummy()
special[list_args[i]] = a
# rebuild p not worrying about the order which gcd_terms will fix
p = Add._from_args(list_args)
p = gcd_terms(p,
isprimitive=True,
clear=clear,
fraction=fraction).xreplace(special)
elif p.args:
p = p.func(
*[do(a) for a in p.args])
rv = _keep_coeff(cont, p, clear=clear, sign=sign)
return rv
expr = sympify(expr)
return do(expr)
def _mask_nc(eq, name=None):
"""
Return ``eq`` with non-commutative objects replaced with Dummy
symbols. A dictionary that can be used to restore the original
values is returned: if it is None, the expression is noncommutative
and cannot be made commutative. The third value returned is a list
of any non-commutative symbols that appear in the returned equation.
``name``, if given, is the name that will be used with numbered Dummy
variables that will replace the non-commutative objects and is mainly
used for doctesting purposes.
Notes
=====
All non-commutative objects other than Symbols are replaced with
a non-commutative Symbol. Identical objects will be identified
by identical symbols.
If there is only 1 non-commutative object in an expression it will
be replaced with a commutative symbol. Otherwise, the non-commutative
entities are retained and the calling routine should handle
replacements in this case since some care must be taken to keep
track of the ordering of symbols when they occur within Muls.
Examples
========
>>> from sympy.physics.secondquant import Commutator, NO, F, Fd
>>> from sympy import symbols, Mul
>>> from sympy.core.exprtools import _mask_nc
>>> from sympy.abc import x, y
>>> A, B, C = symbols('A,B,C', commutative=False)
One nc-symbol:
>>> _mask_nc(A**2 - x**2, 'd')
(_d0**2 - x**2, {_d0: A}, [])
Multiple nc-symbols:
>>> _mask_nc(A**2 - B**2, 'd')
(A**2 - B**2, {}, [A, B])
An nc-object with nc-symbols but no others outside of it:
>>> _mask_nc(1 + x*Commutator(A, B), 'd')
(_d0*x + 1, {_d0: Commutator(A, B)}, [])
>>> _mask_nc(NO(Fd(x)*F(y)), 'd')
(_d0, {_d0: NO(CreateFermion(x)*AnnihilateFermion(y))}, [])
Multiple nc-objects:
>>> eq = x*Commutator(A, B) + x*Commutator(A, C)*Commutator(A, B)
>>> _mask_nc(eq, 'd')
(x*_d0 + x*_d1*_d0, {_d0: Commutator(A, B), _d1: Commutator(A, C)}, [_d0, _d1])
Multiple nc-objects and nc-symbols:
>>> eq = A*Commutator(A, B) + B*Commutator(A, C)
>>> _mask_nc(eq, 'd')
(A*_d0 + B*_d1, {_d0: Commutator(A, B), _d1: Commutator(A, C)}, [_d0, _d1, A, B])
If there is an object that:
- doesn't contain nc-symbols
- but has arguments which derive from Basic, not Expr
- and doesn't define an _eval_is_commutative routine
then it will give False (or None?) for the is_commutative test. Such
objects are also removed by this routine:
>>> from sympy import Basic
>>> eq = (1 + Mul(Basic(), Basic(), evaluate=False))
>>> eq.is_commutative
False
>>> _mask_nc(eq, 'd')
(_d0**2 + 1, {_d0: Basic()}, [])
"""
name = name or 'mask'
# Make Dummy() append sequential numbers to the name
def numbered_names():
i = 0
while True:
yield name + str(i)
i += 1
names = numbered_names()
def Dummy(*args, **kwargs):
from sympy import Dummy
return Dummy(next(names), *args, **kwargs)
expr = eq
if expr.is_commutative:
return eq, {}, []
# identify nc-objects; symbols and other
rep = []
nc_obj = set()
nc_syms = set()
pot = preorder_traversal(expr, keys=default_sort_key)
for i, a in enumerate(pot):
if any(a == r[0] for r in rep):
pot.skip()
elif not a.is_commutative:
if a.is_symbol:
nc_syms.add(a)
pot.skip()
elif not (a.is_Add or a.is_Mul or a.is_Pow):
nc_obj.add(a)
pot.skip()
# If there is only one nc symbol or object, it can be factored regularly
# but polys is going to complain, so replace it with a Dummy.
if len(nc_obj) == 1 and not nc_syms:
rep.append((nc_obj.pop(), Dummy()))
elif len(nc_syms) == 1 and not nc_obj:
rep.append((nc_syms.pop(), Dummy()))
# Any remaining nc-objects will be replaced with an nc-Dummy and
# identified as an nc-Symbol to watch out for
nc_obj = sorted(nc_obj, key=default_sort_key)
for n in nc_obj:
nc = Dummy(commutative=False)
rep.append((n, nc))
nc_syms.add(nc)
expr = expr.subs(rep)
nc_syms = list(nc_syms)
nc_syms.sort(key=default_sort_key)
return expr, {v: k for k, v in rep}, nc_syms
def factor_nc(expr):
"""Return the factored form of ``expr`` while handling non-commutative
expressions.
Examples
========
>>> from sympy.core.exprtools import factor_nc
>>> from sympy import Symbol
>>> from sympy.abc import x
>>> A = Symbol('A', commutative=False)
>>> B = Symbol('B', commutative=False)
>>> factor_nc((x**2 + 2*A*x + A**2).expand())
(x + A)**2
>>> factor_nc(((x + A)*(x + B)).expand())
(x + A)*(x + B)
"""
from sympy.simplify.simplify import powsimp
from sympy.polys import gcd, factor
def _pemexpand(expr):
"Expand with the minimal set of hints necessary to check the result."
return expr.expand(deep=True, mul=True, power_exp=True,
power_base=False, basic=False, multinomial=True, log=False)
expr = sympify(expr)
if not isinstance(expr, Expr) or not expr.args:
return expr
if not expr.is_Add:
return expr.func(*[factor_nc(a) for a in expr.args])
expr, rep, nc_symbols = _mask_nc(expr)
if rep:
return factor(expr).subs(rep)
else:
args = [a.args_cnc() for a in Add.make_args(expr)]
c = g = l = r = S.One
hit = False
# find any commutative gcd term
for i, a in enumerate(args):
if i == 0:
c = Mul._from_args(a[0])
elif a[0]:
c = gcd(c, Mul._from_args(a[0]))
else:
c = S.One
if c is not S.One:
hit = True
c, g = c.as_coeff_Mul()
if g is not S.One:
for i, (cc, _) in enumerate(args):
cc = list(Mul.make_args(Mul._from_args(list(cc))/g))
args[i][0] = cc
for i, (cc, _) in enumerate(args):
cc[0] = cc[0]/c
args[i][0] = cc
# find any noncommutative common prefix
for i, a in enumerate(args):
if i == 0:
n = a[1][:]
else:
n = common_prefix(n, a[1])
if not n:
# is there a power that can be extracted?
if not args[0][1]:
break
b, e = args[0][1][0].as_base_exp()
ok = False
if e.is_Integer:
for t in args:
if not t[1]:
break
bt, et = t[1][0].as_base_exp()
if et.is_Integer and bt == b:
e = min(e, et)
else:
break
else:
ok = hit = True
l = b**e
il = b**-e
for _ in args:
_[1][0] = il*_[1][0]
break
if not ok:
break
else:
hit = True
lenn = len(n)
l = Mul(*n)
for _ in args:
_[1] = _[1][lenn:]
# find any noncommutative common suffix
for i, a in enumerate(args):
if i == 0:
n = a[1][:]
else:
n = common_suffix(n, a[1])
if not n:
# is there a power that can be extracted?
if not args[0][1]:
break
b, e = args[0][1][-1].as_base_exp()
ok = False
if e.is_Integer:
for t in args:
if not t[1]:
break
bt, et = t[1][-1].as_base_exp()
if et.is_Integer and bt == b:
e = min(e, et)
else:
break
else:
ok = hit = True
r = b**e
il = b**-e
for _ in args:
_[1][-1] = _[1][-1]*il
break
if not ok:
break
else:
hit = True
lenn = len(n)
r = Mul(*n)
for _ in args:
_[1] = _[1][:len(_[1]) - lenn]
if hit:
mid = Add(*[Mul(*cc)*Mul(*nc) for cc, nc in args])
else:
mid = expr
# sort the symbols so the Dummys would appear in the same
# order as the original symbols, otherwise you may introduce
# a factor of -1, e.g. A**2 - B**2) -- {A:y, B:x} --> y**2 - x**2
# and the former factors into two terms, (A - B)*(A + B) while the
# latter factors into 3 terms, (-1)*(x - y)*(x + y)
rep1 = [(n, Dummy()) for n in sorted(nc_symbols, key=default_sort_key)]
unrep1 = [(v, k) for k, v in rep1]
unrep1.reverse()
new_mid, r2, _ = _mask_nc(mid.subs(rep1))
new_mid = powsimp(factor(new_mid))
new_mid = new_mid.subs(r2).subs(unrep1)
if new_mid.is_Pow:
return _keep_coeff(c, g*l*new_mid*r)
if new_mid.is_Mul:
# XXX TODO there should be a way to inspect what order the terms
# must be in and just select the plausible ordering without
# checking permutations
cfac = []
ncfac = []
for f in new_mid.args:
if f.is_commutative:
cfac.append(f)
else:
b, e = f.as_base_exp()
if e.is_Integer:
ncfac.extend([b]*e)
else:
ncfac.append(f)
pre_mid = g*Mul(*cfac)*l
target = _pemexpand(expr/c)
for s in variations(ncfac, len(ncfac)):
ok = pre_mid*Mul(*s)*r
if _pemexpand(ok) == target:
return _keep_coeff(c, ok)
# mid was an Add that didn't factor successfully
return _keep_coeff(c, g*l*mid*r)
|
a130772a972b7237639eb32ba5da5d9659a249700590f8dd58c89eb12feb5e0f | """ The core's core. """
from __future__ import print_function, division
# used for canonical ordering of symbolic sequences
# via __cmp__ method:
# FIXME this is *so* irrelevant and outdated!
ordering_of_classes = [
# singleton numbers
'Zero', 'One', 'Half', 'Infinity', 'NaN', 'NegativeOne', 'NegativeInfinity',
# numbers
'Integer', 'Rational', 'Float',
# singleton symbols
'Exp1', 'Pi', 'ImaginaryUnit',
# symbols
'Symbol', 'Wild', 'Temporary',
# arithmetic operations
'Pow', 'Mul', 'Add',
# function values
'Derivative', 'Integral',
# defined singleton functions
'Abs', 'Sign', 'Sqrt',
'Floor', 'Ceiling',
'Re', 'Im', 'Arg',
'Conjugate',
'Exp', 'Log',
'Sin', 'Cos', 'Tan', 'Cot', 'ASin', 'ACos', 'ATan', 'ACot',
'Sinh', 'Cosh', 'Tanh', 'Coth', 'ASinh', 'ACosh', 'ATanh', 'ACoth',
'RisingFactorial', 'FallingFactorial',
'factorial', 'binomial',
'Gamma', 'LowerGamma', 'UpperGamma', 'PolyGamma',
'Erf',
# special polynomials
'Chebyshev', 'Chebyshev2',
# undefined functions
'Function', 'WildFunction',
# anonymous functions
'Lambda',
# Landau O symbol
'Order',
# relational operations
'Equality', 'Unequality', 'StrictGreaterThan', 'StrictLessThan',
'GreaterThan', 'LessThan',
]
class Registry(object):
"""
Base class for registry objects.
Registries map a name to an object using attribute notation. Registry
classes behave singletonically: all their instances share the same state,
which is stored in the class object.
All subclasses should set `__slots__ = ()`.
"""
__slots__ = ()
def __setattr__(self, name, obj):
setattr(self.__class__, name, obj)
def __delattr__(self, name):
delattr(self.__class__, name)
#A set containing all sympy class objects
all_classes = set()
class BasicMeta(type):
def __init__(cls, *args, **kws):
all_classes.add(cls)
cls.__sympy__ = property(lambda self: True)
def __cmp__(cls, other):
# If the other object is not a Basic subclass, then we are not equal to
# it.
if not isinstance(other, BasicMeta):
return -1
n1 = cls.__name__
n2 = other.__name__
if n1 == n2:
return 0
UNKNOWN = len(ordering_of_classes) + 1
try:
i1 = ordering_of_classes.index(n1)
except ValueError:
i1 = UNKNOWN
try:
i2 = ordering_of_classes.index(n2)
except ValueError:
i2 = UNKNOWN
if i1 == UNKNOWN and i2 == UNKNOWN:
return (n1 > n2) - (n1 < n2)
return (i1 > i2) - (i1 < i2)
def __lt__(cls, other):
if cls.__cmp__(other) == -1:
return True
return False
def __gt__(cls, other):
if cls.__cmp__(other) == 1:
return True
return False
|
4b0b6f6290f35893139b48bc524de665ef2a45faca91a28d74b665965d07acae | """Singleton mechanism"""
from __future__ import print_function, division
from typing import Any, Dict, Type
from .core import Registry
from .assumptions import ManagedProperties
from .sympify import sympify
class SingletonRegistry(Registry):
"""
The registry for the singleton classes (accessible as ``S``).
This class serves as two separate things.
The first thing it is is the ``SingletonRegistry``. Several classes in
SymPy appear so often that they are singletonized, that is, using some
metaprogramming they are made so that they can only be instantiated once
(see the :class:`sympy.core.singleton.Singleton` class for details). For
instance, every time you create ``Integer(0)``, this will return the same
instance, :class:`sympy.core.numbers.Zero`. All singleton instances are
attributes of the ``S`` object, so ``Integer(0)`` can also be accessed as
``S.Zero``.
Singletonization offers two advantages: it saves memory, and it allows
fast comparison. It saves memory because no matter how many times the
singletonized objects appear in expressions in memory, they all point to
the same single instance in memory. The fast comparison comes from the
fact that you can use ``is`` to compare exact instances in Python
(usually, you need to use ``==`` to compare things). ``is`` compares
objects by memory address, and is very fast. For instance
>>> from sympy import S, Integer
>>> a = Integer(0)
>>> a is S.Zero
True
For the most part, the fact that certain objects are singletonized is an
implementation detail that users shouldn't need to worry about. In SymPy
library code, ``is`` comparison is often used for performance purposes
The primary advantage of ``S`` for end users is the convenient access to
certain instances that are otherwise difficult to type, like ``S.Half``
(instead of ``Rational(1, 2)``).
When using ``is`` comparison, make sure the argument is sympified. For
instance,
>>> 0 is S.Zero
False
This problem is not an issue when using ``==``, which is recommended for
most use-cases:
>>> 0 == S.Zero
True
The second thing ``S`` is is a shortcut for
:func:`sympy.core.sympify.sympify`. :func:`sympy.core.sympify.sympify` is
the function that converts Python objects such as ``int(1)`` into SymPy
objects such as ``Integer(1)``. It also converts the string form of an
expression into a SymPy expression, like ``sympify("x**2")`` ->
``Symbol("x")**2``. ``S(1)`` is the same thing as ``sympify(1)``
(basically, ``S.__call__`` has been defined to call ``sympify``).
This is for convenience, since ``S`` is a single letter. It's mostly
useful for defining rational numbers. Consider an expression like ``x +
1/2``. If you enter this directly in Python, it will evaluate the ``1/2``
and give ``0.5`` (or just ``0`` in Python 2, because of integer division),
because both arguments are ints (see also
:ref:`tutorial-gotchas-final-notes`). However, in SymPy, you usually want
the quotient of two integers to give an exact rational number. The way
Python's evaluation works, at least one side of an operator needs to be a
SymPy object for the SymPy evaluation to take over. You could write this
as ``x + Rational(1, 2)``, but this is a lot more typing. A shorter
version is ``x + S(1)/2``. Since ``S(1)`` returns ``Integer(1)``, the
division will return a ``Rational`` type, since it will call
``Integer.__div__``, which knows how to return a ``Rational``.
"""
__slots__ = ()
# Also allow things like S(5)
__call__ = staticmethod(sympify)
def __init__(self):
self._classes_to_install = {}
# Dict of classes that have been registered, but that have not have been
# installed as an attribute of this SingletonRegistry.
# Installation automatically happens at the first attempt to access the
# attribute.
# The purpose of this is to allow registration during class
# initialization during import, but not trigger object creation until
# actual use (which should not happen until after all imports are
# finished).
def register(self, cls):
# Make sure a duplicate class overwrites the old one
if hasattr(self, cls.__name__):
delattr(self, cls.__name__)
self._classes_to_install[cls.__name__] = cls
def __getattr__(self, name):
"""Python calls __getattr__ if no attribute of that name was installed
yet.
This __getattr__ checks whether a class with the requested name was
already registered but not installed; if no, raises an AttributeError.
Otherwise, retrieves the class, calculates its singleton value, installs
it as an attribute of the given name, and unregisters the class."""
if name not in self._classes_to_install:
raise AttributeError(
"Attribute '%s' was not installed on SymPy registry %s" % (
name, self))
class_to_install = self._classes_to_install[name]
value_to_install = class_to_install()
self.__setattr__(name, value_to_install)
del self._classes_to_install[name]
return value_to_install
def __repr__(self):
return "S"
S = SingletonRegistry()
class Singleton(ManagedProperties):
"""
Metaclass for singleton classes.
A singleton class has only one instance which is returned every time the
class is instantiated. Additionally, this instance can be accessed through
the global registry object ``S`` as ``S.<class_name>``.
Examples
========
>>> from sympy import S, Basic
>>> from sympy.core.singleton import Singleton
>>> from sympy.core.compatibility import with_metaclass
>>> class MySingleton(Basic, metaclass=Singleton):
... pass
>>> Basic() is Basic()
False
>>> MySingleton() is MySingleton()
True
>>> S.MySingleton is MySingleton()
True
Notes
=====
Instance creation is delayed until the first time the value is accessed.
(SymPy versions before 1.0 would create the instance during class
creation time, which would be prone to import cycles.)
This metaclass is a subclass of ManagedProperties because that is the
metaclass of many classes that need to be Singletons (Python does not allow
subclasses to have a different metaclass than the superclass, except the
subclass may use a subclassed metaclass).
"""
_instances = {} # type: Dict[Type[Any], Any]
"Maps singleton classes to their instances."
def __new__(cls, *args, **kwargs):
result = super(Singleton, cls).__new__(cls, *args, **kwargs)
S.register(result)
return result
def __call__(self, *args, **kwargs):
# Called when application code says SomeClass(), where SomeClass is a
# class of which Singleton is the metaclas.
# __call__ is invoked first, before __new__() and __init__().
if self not in Singleton._instances:
Singleton._instances[self] = \
super(Singleton, self).__call__(*args, **kwargs)
# Invokes the standard constructor of SomeClass.
return Singleton._instances[self]
# Inject pickling support.
def __getnewargs__(self):
return ()
self.__getnewargs__ = __getnewargs__
|
719a6f8785f5ed8a07740344d1049887aa0e8cb9e651e95d26b45f8fb476c308 | """
This module contains the machinery handling assumptions.
All symbolic objects have assumption attributes that can be accessed via
.is_<assumption name> attribute.
Assumptions determine certain properties of symbolic objects and can
have 3 possible values: True, False, None. True is returned if the
object has the property and False is returned if it doesn't or can't
(i.e. doesn't make sense):
>>> from sympy import I
>>> I.is_algebraic
True
>>> I.is_real
False
>>> I.is_prime
False
When the property cannot be determined (or when a method is not
implemented) None will be returned, e.g. a generic symbol, x, may or
may not be positive so a value of None is returned for x.is_positive.
By default, all symbolic values are in the largest set in the given context
without specifying the property. For example, a symbol that has a property
being integer, is also real, complex, etc.
Here follows a list of possible assumption names:
.. glossary::
commutative
object commutes with any other object with
respect to multiplication operation.
complex
object can have only values from the set
of complex numbers.
imaginary
object value is a number that can be written as a real
number multiplied by the imaginary unit ``I``. See
[3]_. Please note, that ``0`` is not considered to be an
imaginary number, see
`issue #7649 <https://github.com/sympy/sympy/issues/7649>`_.
real
object can have only values from the set
of real numbers.
integer
object can have only values from the set
of integers.
odd
even
object can have only values from the set of
odd (even) integers [2]_.
prime
object is a natural number greater than ``1`` that has
no positive divisors other than ``1`` and itself. See [6]_.
composite
object is a positive integer that has at least one positive
divisor other than ``1`` or the number itself. See [4]_.
zero
object has the value of ``0``.
nonzero
object is a real number that is not zero.
rational
object can have only values from the set
of rationals.
algebraic
object can have only values from the set
of algebraic numbers [11]_.
transcendental
object can have only values from the set
of transcendental numbers [10]_.
irrational
object value cannot be represented exactly by Rational, see [5]_.
finite
infinite
object absolute value is bounded (arbitrarily large).
See [7]_, [8]_, [9]_.
negative
nonnegative
object can have only negative (nonnegative)
values [1]_.
positive
nonpositive
object can have only positive (only
nonpositive) values.
hermitian
antihermitian
object belongs to the field of hermitian
(antihermitian) operators.
Examples
========
>>> from sympy import Symbol
>>> x = Symbol('x', real=True); x
x
>>> x.is_real
True
>>> x.is_complex
True
See Also
========
.. seealso::
:py:class:`sympy.core.numbers.ImaginaryUnit`
:py:class:`sympy.core.numbers.Zero`
:py:class:`sympy.core.numbers.One`
Notes
=====
Assumption values are stored in obj._assumptions dictionary or
are returned by getter methods (with property decorators) or are
attributes of objects/classes.
References
==========
.. [1] https://en.wikipedia.org/wiki/Negative_number
.. [2] https://en.wikipedia.org/wiki/Parity_%28mathematics%29
.. [3] https://en.wikipedia.org/wiki/Imaginary_number
.. [4] https://en.wikipedia.org/wiki/Composite_number
.. [5] https://en.wikipedia.org/wiki/Irrational_number
.. [6] https://en.wikipedia.org/wiki/Prime_number
.. [7] https://en.wikipedia.org/wiki/Finite
.. [8] https://docs.python.org/3/library/math.html#math.isfinite
.. [9] http://docs.scipy.org/doc/numpy/reference/generated/numpy.isfinite.html
.. [10] https://en.wikipedia.org/wiki/Transcendental_number
.. [11] https://en.wikipedia.org/wiki/Algebraic_number
"""
from __future__ import print_function, division
from sympy.core.facts import FactRules, FactKB
from sympy.core.core import BasicMeta
from random import shuffle
_assume_rules = FactRules([
'integer -> rational',
'rational -> real',
'rational -> algebraic',
'algebraic -> complex',
'transcendental == complex & !algebraic',
'real -> hermitian',
'imaginary -> complex',
'imaginary -> antihermitian',
'extended_real -> commutative',
'complex -> commutative',
'complex -> finite',
'odd == integer & !even',
'even == integer & !odd',
'real -> complex',
'extended_real -> real | infinite',
'real == extended_real & finite',
'extended_real == extended_negative | zero | extended_positive',
'extended_negative == extended_nonpositive & extended_nonzero',
'extended_positive == extended_nonnegative & extended_nonzero',
'extended_nonpositive == extended_real & !extended_positive',
'extended_nonnegative == extended_real & !extended_negative',
'real == negative | zero | positive',
'negative == nonpositive & nonzero',
'positive == nonnegative & nonzero',
'nonpositive == real & !positive',
'nonnegative == real & !negative',
'positive == extended_positive & finite',
'negative == extended_negative & finite',
'nonpositive == extended_nonpositive & finite',
'nonnegative == extended_nonnegative & finite',
'nonzero == extended_nonzero & finite',
'zero -> even & finite',
'zero == extended_nonnegative & extended_nonpositive',
'zero == nonnegative & nonpositive',
'nonzero -> real',
'prime -> integer & positive',
'composite -> integer & positive & !prime',
'!composite -> !positive | !even | prime',
'irrational == real & !rational',
'imaginary -> !extended_real',
'infinite -> !finite',
'noninteger == extended_real & !integer',
'extended_nonzero == extended_real & !zero',
])
_assume_defined = _assume_rules.defined_facts.copy()
_assume_defined.add('polar')
_assume_defined = frozenset(_assume_defined)
class StdFactKB(FactKB):
"""A FactKB specialised for the built-in rules
This is the only kind of FactKB that Basic objects should use.
"""
def __init__(self, facts=None):
super(StdFactKB, self).__init__(_assume_rules)
# save a copy of the facts dict
if not facts:
self._generator = {}
elif not isinstance(facts, FactKB):
self._generator = facts.copy()
else:
self._generator = facts.generator
if facts:
self.deduce_all_facts(facts)
def copy(self):
return self.__class__(self)
@property
def generator(self):
return self._generator.copy()
def as_property(fact):
"""Convert a fact name to the name of the corresponding property"""
return 'is_%s' % fact
def make_property(fact):
"""Create the automagic property corresponding to a fact."""
def getit(self):
try:
return self._assumptions[fact]
except KeyError:
if self._assumptions is self.default_assumptions:
self._assumptions = self.default_assumptions.copy()
return _ask(fact, self)
getit.func_name = as_property(fact)
return property(getit)
def _ask(fact, obj):
"""
Find the truth value for a property of an object.
This function is called when a request is made to see what a fact
value is.
For this we use several techniques:
First, the fact-evaluation function is tried, if it exists (for
example _eval_is_integer). Then we try related facts. For example
rational --> integer
another example is joined rule:
integer & !odd --> even
so in the latter case if we are looking at what 'even' value is,
'integer' and 'odd' facts will be asked.
In all cases, when we settle on some fact value, its implications are
deduced, and the result is cached in ._assumptions.
"""
assumptions = obj._assumptions
handler_map = obj._prop_handler
# Store None into the assumptions so that recursive attempts at
# evaluating the same fact don't trigger infinite recursion.
assumptions._tell(fact, None)
# First try the assumption evaluation function if it exists
try:
evaluate = handler_map[fact]
except KeyError:
pass
else:
a = evaluate(obj)
if a is not None:
assumptions.deduce_all_facts(((fact, a),))
return a
# Try assumption's prerequisites
prereq = list(_assume_rules.prereq[fact])
shuffle(prereq)
for pk in prereq:
if pk in assumptions:
continue
if pk in handler_map:
_ask(pk, obj)
# we might have found the value of fact
ret_val = assumptions.get(fact)
if ret_val is not None:
return ret_val
# Note: the result has already been cached
return None
class ManagedProperties(BasicMeta):
"""Metaclass for classes with old-style assumptions"""
def __init__(cls, *args, **kws):
BasicMeta.__init__(cls, *args, **kws)
local_defs = {}
for k in _assume_defined:
attrname = as_property(k)
v = cls.__dict__.get(attrname, '')
if isinstance(v, (bool, int, type(None))):
if v is not None:
v = bool(v)
local_defs[k] = v
defs = {}
for base in reversed(cls.__bases__):
assumptions = getattr(base, '_explicit_class_assumptions', None)
if assumptions is not None:
defs.update(assumptions)
defs.update(local_defs)
cls._explicit_class_assumptions = defs
cls.default_assumptions = StdFactKB(defs)
cls._prop_handler = {}
for k in _assume_defined:
eval_is_meth = getattr(cls, '_eval_is_%s' % k, None)
if eval_is_meth is not None:
cls._prop_handler[k] = eval_is_meth
# Put definite results directly into the class dict, for speed
for k, v in cls.default_assumptions.items():
setattr(cls, as_property(k), v)
# protection e.g. for Integer.is_even=F <- (Rational.is_integer=F)
derived_from_bases = set()
for base in cls.__bases__:
default_assumptions = getattr(base, 'default_assumptions', None)
# is an assumption-aware class
if default_assumptions is not None:
derived_from_bases.update(default_assumptions)
for fact in derived_from_bases - set(cls.default_assumptions):
pname = as_property(fact)
if pname not in cls.__dict__:
setattr(cls, pname, make_property(fact))
# Finally, add any missing automagic property (e.g. for Basic)
for fact in _assume_defined:
pname = as_property(fact)
if not hasattr(cls, pname):
setattr(cls, pname, make_property(fact))
|
f6ca525dbf81cefde07ab3214d208fe490db2780c79c8f42754554b0606ed76e | """
There are three types of functions implemented in SymPy:
1) defined functions (in the sense that they can be evaluated) like
exp or sin; they have a name and a body:
f = exp
2) undefined function which have a name but no body. Undefined
functions can be defined using a Function class as follows:
f = Function('f')
(the result will be a Function instance)
3) anonymous function (or lambda function) which have a body (defined
with dummy variables) but have no name:
f = Lambda(x, exp(x)*x)
f = Lambda((x, y), exp(x)*y)
The fourth type of functions are composites, like (sin + cos)(x); these work in
SymPy core, but are not yet part of SymPy.
Examples
========
>>> import sympy
>>> f = sympy.Function("f")
>>> from sympy.abc import x
>>> f(x)
f(x)
>>> print(sympy.srepr(f(x).func))
Function('f')
>>> f(x).args
(x,)
"""
from __future__ import print_function, division
from typing import Any, Dict as tDict, Optional, Set as tSet
from .add import Add
from .assumptions import ManagedProperties
from .basic import Basic, _atomic
from .cache import cacheit
from .compatibility import iterable, is_sequence, as_int, ordered, Iterable
from .decorators import _sympifyit
from .expr import Expr, AtomicExpr
from .numbers import Rational, Float
from .operations import LatticeOp
from .rules import Transform
from .singleton import S
from .sympify import sympify
from sympy.core.containers import Tuple, Dict
from sympy.core.parameters import global_parameters
from sympy.core.logic import fuzzy_and
from sympy.utilities import default_sort_key
from sympy.utilities.exceptions import SymPyDeprecationWarning
from sympy.utilities.iterables import has_dups, sift
from sympy.utilities.misc import filldedent
import mpmath
import mpmath.libmp as mlib
import inspect
from collections import Counter
def _coeff_isneg(a):
"""Return True if the leading Number is negative.
Examples
========
>>> from sympy.core.function import _coeff_isneg
>>> from sympy import S, Symbol, oo, pi
>>> _coeff_isneg(-3*pi)
True
>>> _coeff_isneg(S(3))
False
>>> _coeff_isneg(-oo)
True
>>> _coeff_isneg(Symbol('n', negative=True)) # coeff is 1
False
For matrix expressions:
>>> from sympy import MatrixSymbol, sqrt
>>> A = MatrixSymbol("A", 3, 3)
>>> _coeff_isneg(-sqrt(2)*A)
True
>>> _coeff_isneg(sqrt(2)*A)
False
"""
if a.is_MatMul:
a = a.args[0]
if a.is_Mul:
a = a.args[0]
return a.is_Number and a.is_extended_negative
class PoleError(Exception):
pass
class ArgumentIndexError(ValueError):
def __str__(self):
return ("Invalid operation with argument number %s for Function %s" %
(self.args[1], self.args[0]))
class BadSignatureError(TypeError):
'''Raised when a Lambda is created with an invalid signature'''
pass
class BadArgumentsError(TypeError):
'''Raised when a Lambda is called with an incorrect number of arguments'''
pass
# Python 2/3 version that does not raise a Deprecation warning
def arity(cls):
"""Return the arity of the function if it is known, else None.
When default values are specified for some arguments, they are
optional and the arity is reported as a tuple of possible values.
Examples
========
>>> from sympy.core.function import arity
>>> from sympy import log
>>> arity(lambda x: x)
1
>>> arity(log)
(1, 2)
>>> arity(lambda *x: sum(x)) is None
True
"""
eval_ = getattr(cls, 'eval', cls)
parameters = inspect.signature(eval_).parameters.items()
if [p for _, p in parameters if p.kind == p.VAR_POSITIONAL]:
return
p_or_k = [p for _, p in parameters if p.kind == p.POSITIONAL_OR_KEYWORD]
# how many have no default and how many have a default value
no, yes = map(len, sift(p_or_k,
lambda p:p.default == p.empty, binary=True))
return no if not yes else tuple(range(no, no + yes + 1))
class FunctionClass(ManagedProperties):
"""
Base class for function classes. FunctionClass is a subclass of type.
Use Function('<function name>' [ , signature ]) to create
undefined function classes.
"""
_new = type.__new__
def __init__(cls, *args, **kwargs):
# honor kwarg value or class-defined value before using
# the number of arguments in the eval function (if present)
nargs = kwargs.pop('nargs', cls.__dict__.get('nargs', arity(cls)))
if nargs is None and 'nargs' not in cls.__dict__:
for supcls in cls.__mro__:
if hasattr(supcls, '_nargs'):
nargs = supcls._nargs
break
else:
continue
# Canonicalize nargs here; change to set in nargs.
if is_sequence(nargs):
if not nargs:
raise ValueError(filldedent('''
Incorrectly specified nargs as %s:
if there are no arguments, it should be
`nargs = 0`;
if there are any number of arguments,
it should be
`nargs = None`''' % str(nargs)))
nargs = tuple(ordered(set(nargs)))
elif nargs is not None:
nargs = (as_int(nargs),)
cls._nargs = nargs
super(FunctionClass, cls).__init__(*args, **kwargs)
@property
def __signature__(self):
"""
Allow Python 3's inspect.signature to give a useful signature for
Function subclasses.
"""
# Python 3 only, but backports (like the one in IPython) still might
# call this.
try:
from inspect import signature
except ImportError:
return None
# TODO: Look at nargs
return signature(self.eval)
@property
def free_symbols(self):
return set()
@property
def xreplace(self):
# Function needs args so we define a property that returns
# a function that takes args...and then use that function
# to return the right value
return lambda rule, **_: rule.get(self, self)
@property
def nargs(self):
"""Return a set of the allowed number of arguments for the function.
Examples
========
>>> from sympy.core.function import Function
>>> from sympy.abc import x, y
>>> f = Function('f')
If the function can take any number of arguments, the set of whole
numbers is returned:
>>> Function('f').nargs
Naturals0
If the function was initialized to accept one or more arguments, a
corresponding set will be returned:
>>> Function('f', nargs=1).nargs
FiniteSet(1)
>>> Function('f', nargs=(2, 1)).nargs
FiniteSet(1, 2)
The undefined function, after application, also has the nargs
attribute; the actual number of arguments is always available by
checking the ``args`` attribute:
>>> f = Function('f')
>>> f(1).nargs
Naturals0
>>> len(f(1).args)
1
"""
from sympy.sets.sets import FiniteSet
# XXX it would be nice to handle this in __init__ but there are import
# problems with trying to import FiniteSet there
return FiniteSet(*self._nargs) if self._nargs else S.Naturals0
def __repr__(cls):
return cls.__name__
class Application(Basic, metaclass=FunctionClass):
"""
Base class for applied functions.
Instances of Application represent the result of applying an application of
any type to any object.
"""
is_Function = True
@cacheit
def __new__(cls, *args, **options):
from sympy.sets.fancysets import Naturals0
from sympy.sets.sets import FiniteSet
args = list(map(sympify, args))
evaluate = options.pop('evaluate', global_parameters.evaluate)
# WildFunction (and anything else like it) may have nargs defined
# and we throw that value away here
options.pop('nargs', None)
if options:
raise ValueError("Unknown options: %s" % options)
if evaluate:
evaluated = cls.eval(*args)
if evaluated is not None:
return evaluated
obj = super(Application, cls).__new__(cls, *args, **options)
# make nargs uniform here
sentinel = object()
objnargs = getattr(obj, "nargs", sentinel)
if objnargs is not sentinel:
# things passing through here:
# - functions subclassed from Function (e.g. myfunc(1).nargs)
# - functions like cos(1).nargs
# - AppliedUndef with given nargs like Function('f', nargs=1)(1).nargs
# Canonicalize nargs here
if is_sequence(objnargs):
nargs = tuple(ordered(set(objnargs)))
elif objnargs is not None:
nargs = (as_int(objnargs),)
else:
nargs = None
else:
# things passing through here:
# - WildFunction('f').nargs
# - AppliedUndef with no nargs like Function('f')(1).nargs
nargs = obj._nargs # note the underscore here
# convert to FiniteSet
obj.nargs = FiniteSet(*nargs) if nargs else Naturals0()
return obj
@classmethod
def eval(cls, *args):
"""
Returns a canonical form of cls applied to arguments args.
The eval() method is called when the class cls is about to be
instantiated and it should return either some simplified instance
(possible of some other class), or if the class cls should be
unmodified, return None.
Examples of eval() for the function "sign"
---------------------------------------------
.. code-block:: python
@classmethod
def eval(cls, arg):
if arg is S.NaN:
return S.NaN
if arg.is_zero: return S.Zero
if arg.is_positive: return S.One
if arg.is_negative: return S.NegativeOne
if isinstance(arg, Mul):
coeff, terms = arg.as_coeff_Mul(rational=True)
if coeff is not S.One:
return cls(coeff) * cls(terms)
"""
return
@property
def func(self):
return self.__class__
def _eval_subs(self, old, new):
if (old.is_Function and new.is_Function and
callable(old) and callable(new) and
old == self.func and len(self.args) in new.nargs):
return new(*[i._subs(old, new) for i in self.args])
class Function(Application, Expr):
"""
Base class for applied mathematical functions.
It also serves as a constructor for undefined function classes.
Examples
========
First example shows how to use Function as a constructor for undefined
function classes:
>>> from sympy import Function, Symbol
>>> x = Symbol('x')
>>> f = Function('f')
>>> g = Function('g')(x)
>>> f
f
>>> f(x)
f(x)
>>> g
g(x)
>>> f(x).diff(x)
Derivative(f(x), x)
>>> g.diff(x)
Derivative(g(x), x)
Assumptions can be passed to Function, and if function is initialized with a
Symbol, the function inherits the name and assumptions associated with the Symbol:
>>> f_real = Function('f', real=True)
>>> f_real(x).is_real
True
>>> f_real_inherit = Function(Symbol('f', real=True))
>>> f_real_inherit(x).is_real
True
Note that assumptions on a function are unrelated to the assumptions on
the variable it is called on. If you want to add a relationship, subclass
Function and define the appropriate ``_eval_is_assumption`` methods.
In the following example Function is used as a base class for
``my_func`` that represents a mathematical function *my_func*. Suppose
that it is well known, that *my_func(0)* is *1* and *my_func* at infinity
goes to *0*, so we want those two simplifications to occur automatically.
Suppose also that *my_func(x)* is real exactly when *x* is real. Here is
an implementation that honours those requirements:
>>> from sympy import Function, S, oo, I, sin
>>> class my_func(Function):
...
... @classmethod
... def eval(cls, x):
... if x.is_Number:
... if x.is_zero:
... return S.One
... elif x is S.Infinity:
... return S.Zero
...
... def _eval_is_real(self):
... return self.args[0].is_real
...
>>> x = S('x')
>>> my_func(0) + sin(0)
1
>>> my_func(oo)
0
>>> my_func(3.54).n() # Not yet implemented for my_func.
my_func(3.54)
>>> my_func(I).is_real
False
In order for ``my_func`` to become useful, several other methods would
need to be implemented. See source code of some of the already
implemented functions for more complete examples.
Also, if the function can take more than one argument, then ``nargs``
must be defined, e.g. if ``my_func`` can take one or two arguments
then,
>>> class my_func(Function):
... nargs = (1, 2)
...
>>>
"""
@property
def _diff_wrt(self):
return False
@cacheit
def __new__(cls, *args, **options):
# Handle calls like Function('f')
if cls is Function:
return UndefinedFunction(*args, **options)
n = len(args)
if n not in cls.nargs:
# XXX: exception message must be in exactly this format to
# make it work with NumPy's functions like vectorize(). See,
# for example, https://github.com/numpy/numpy/issues/1697.
# The ideal solution would be just to attach metadata to
# the exception and change NumPy to take advantage of this.
temp = ('%(name)s takes %(qual)s %(args)s '
'argument%(plural)s (%(given)s given)')
raise TypeError(temp % {
'name': cls,
'qual': 'exactly' if len(cls.nargs) == 1 else 'at least',
'args': min(cls.nargs),
'plural': 's'*(min(cls.nargs) != 1),
'given': n})
evaluate = options.get('evaluate', global_parameters.evaluate)
result = super(Function, cls).__new__(cls, *args, **options)
if evaluate and isinstance(result, cls) and result.args:
pr2 = min(cls._should_evalf(a) for a in result.args)
if pr2 > 0:
pr = max(cls._should_evalf(a) for a in result.args)
result = result.evalf(mlib.libmpf.prec_to_dps(pr))
return result
@classmethod
def _should_evalf(cls, arg):
"""
Decide if the function should automatically evalf().
By default (in this implementation), this happens if (and only if) the
ARG is a floating point number.
This function is used by __new__.
Returns the precision to evalf to, or -1 if it shouldn't evalf.
"""
from sympy.core.evalf import pure_complex
if arg.is_Float:
return arg._prec
if not arg.is_Add:
return -1
m = pure_complex(arg)
if m is None or not (m[0].is_Float or m[1].is_Float):
return -1
l = [i._prec for i in m if i.is_Float]
l.append(-1)
return max(l)
@classmethod
def class_key(cls):
from sympy.sets.fancysets import Naturals0
funcs = {
'exp': 10,
'log': 11,
'sin': 20,
'cos': 21,
'tan': 22,
'cot': 23,
'sinh': 30,
'cosh': 31,
'tanh': 32,
'coth': 33,
'conjugate': 40,
're': 41,
'im': 42,
'arg': 43,
}
name = cls.__name__
try:
i = funcs[name]
except KeyError:
i = 0 if isinstance(cls.nargs, Naturals0) else 10000
return 4, i, name
def _eval_evalf(self, prec):
def _get_mpmath_func(fname):
"""Lookup mpmath function based on name"""
if isinstance(self, AppliedUndef):
# Shouldn't lookup in mpmath but might have ._imp_
return None
if not hasattr(mpmath, fname):
from sympy.utilities.lambdify import MPMATH_TRANSLATIONS
fname = MPMATH_TRANSLATIONS.get(fname, None)
if fname is None:
return None
return getattr(mpmath, fname)
func = _get_mpmath_func(self.func.__name__)
# Fall-back evaluation
if func is None:
imp = getattr(self, '_imp_', None)
if imp is None:
return None
try:
return Float(imp(*[i.evalf(prec) for i in self.args]), prec)
except (TypeError, ValueError):
return None
# Convert all args to mpf or mpc
# Convert the arguments to *higher* precision than requested for the
# final result.
# XXX + 5 is a guess, it is similar to what is used in evalf.py. Should
# we be more intelligent about it?
try:
args = [arg._to_mpmath(prec + 5) for arg in self.args]
def bad(m):
from mpmath import mpf, mpc
# the precision of an mpf value is the last element
# if that is 1 (and m[1] is not 1 which would indicate a
# power of 2), then the eval failed; so check that none of
# the arguments failed to compute to a finite precision.
# Note: An mpc value has two parts, the re and imag tuple;
# check each of those parts, too. Anything else is allowed to
# pass
if isinstance(m, mpf):
m = m._mpf_
return m[1] !=1 and m[-1] == 1
elif isinstance(m, mpc):
m, n = m._mpc_
return m[1] !=1 and m[-1] == 1 and \
n[1] !=1 and n[-1] == 1
else:
return False
if any(bad(a) for a in args):
raise ValueError # one or more args failed to compute with significance
except ValueError:
return
with mpmath.workprec(prec):
v = func(*args)
return Expr._from_mpmath(v, prec)
def _eval_derivative(self, s):
# f(x).diff(s) -> x.diff(s) * f.fdiff(1)(s)
i = 0
l = []
for a in self.args:
i += 1
da = a.diff(s)
if da.is_zero:
continue
try:
df = self.fdiff(i)
except ArgumentIndexError:
df = Function.fdiff(self, i)
l.append(df * da)
return Add(*l)
def _eval_is_commutative(self):
return fuzzy_and(a.is_commutative for a in self.args)
def as_base_exp(self):
"""
Returns the method as the 2-tuple (base, exponent).
"""
return self, S.One
def _eval_aseries(self, n, args0, x, logx):
"""
Compute an asymptotic expansion around args0, in terms of self.args.
This function is only used internally by _eval_nseries and should not
be called directly; derived classes can overwrite this to implement
asymptotic expansions.
"""
from sympy.utilities.misc import filldedent
raise PoleError(filldedent('''
Asymptotic expansion of %s around %s is
not implemented.''' % (type(self), args0)))
def _eval_nseries(self, x, n, logx):
"""
This function does compute series for multivariate functions,
but the expansion is always in terms of *one* variable.
Examples
========
>>> from sympy import atan2
>>> from sympy.abc import x, y
>>> atan2(x, y).series(x, n=2)
atan2(0, y) + x/y + O(x**2)
>>> atan2(x, y).series(y, n=2)
-y/x + atan2(x, 0) + O(y**2)
This function also computes asymptotic expansions, if necessary
and possible:
>>> from sympy import loggamma
>>> loggamma(1/x)._eval_nseries(x,0,None)
-1/x - log(x)/x + log(x)/2 + O(1)
"""
from sympy import Order
from sympy.sets.sets import FiniteSet
args = self.args
args0 = [t.limit(x, 0) for t in args]
if any(t.is_finite is False for t in args0):
from sympy import oo, zoo, nan
# XXX could use t.as_leading_term(x) here but it's a little
# slower
a = [t.compute_leading_term(x, logx=logx) for t in args]
a0 = [t.limit(x, 0) for t in a]
if any([t.has(oo, -oo, zoo, nan) for t in a0]):
return self._eval_aseries(n, args0, x, logx)
# Careful: the argument goes to oo, but only logarithmically so. We
# are supposed to do a power series expansion "around the
# logarithmic term". e.g.
# f(1+x+log(x))
# -> f(1+logx) + x*f'(1+logx) + O(x**2)
# where 'logx' is given in the argument
a = [t._eval_nseries(x, n, logx) for t in args]
z = [r - r0 for (r, r0) in zip(a, a0)]
p = [Dummy() for _ in z]
q = []
v = None
for ai, zi, pi in zip(a0, z, p):
if zi.has(x):
if v is not None:
raise NotImplementedError
q.append(ai + pi)
v = pi
else:
q.append(ai)
e1 = self.func(*q)
if v is None:
return e1
s = e1._eval_nseries(v, n, logx)
o = s.getO()
s = s.removeO()
s = s.subs(v, zi).expand() + Order(o.expr.subs(v, zi), x)
return s
if (self.func.nargs is S.Naturals0
or (self.func.nargs == FiniteSet(1) and args0[0])
or any(c > 1 for c in self.func.nargs)):
e = self
e1 = e.expand()
if e == e1:
#for example when e = sin(x+1) or e = sin(cos(x))
#let's try the general algorithm
if len(e.args) == 1:
# issue 14411
e = e.func(e.args[0].cancel())
term = e.subs(x, S.Zero)
if term.is_finite is False or term is S.NaN:
raise PoleError("Cannot expand %s around 0" % (self))
series = term
fact = S.One
_x = Dummy('x')
e = e.subs(x, _x)
for i in range(n - 1):
i += 1
fact *= Rational(i)
e = e.diff(_x)
subs = e.subs(_x, S.Zero)
if subs is S.NaN:
# try to evaluate a limit if we have to
subs = e.limit(_x, S.Zero)
if subs.is_finite is False:
raise PoleError("Cannot expand %s around 0" % (self))
term = subs*(x**i)/fact
term = term.expand()
series += term
return series + Order(x**n, x)
return e1.nseries(x, n=n, logx=logx)
arg = self.args[0]
l = []
g = None
# try to predict a number of terms needed
nterms = n + 2
cf = Order(arg.as_leading_term(x), x).getn()
if cf != 0:
nterms = (n/cf).ceiling()
for i in range(nterms):
g = self.taylor_term(i, arg, g)
g = g.nseries(x, n=n, logx=logx)
l.append(g)
return Add(*l) + Order(x**n, x)
def fdiff(self, argindex=1):
"""
Returns the first derivative of the function.
"""
if not (1 <= argindex <= len(self.args)):
raise ArgumentIndexError(self, argindex)
ix = argindex - 1
A = self.args[ix]
if A._diff_wrt:
if len(self.args) == 1 or not A.is_Symbol:
return Derivative(self, A)
for i, v in enumerate(self.args):
if i != ix and A in v.free_symbols:
# it can't be in any other argument's free symbols
# issue 8510
break
else:
return Derivative(self, A)
# See issue 4624 and issue 4719, 5600 and 8510
D = Dummy('xi_%i' % argindex, dummy_index=hash(A))
args = self.args[:ix] + (D,) + self.args[ix + 1:]
return Subs(Derivative(self.func(*args), D), D, A)
def _eval_as_leading_term(self, x):
"""Stub that should be overridden by new Functions to return
the first non-zero term in a series if ever an x-dependent
argument whose leading term vanishes as x -> 0 might be encountered.
See, for example, cos._eval_as_leading_term.
"""
from sympy import Order
args = [a.as_leading_term(x) for a in self.args]
o = Order(1, x)
if any(x in a.free_symbols and o.contains(a) for a in args):
# Whereas x and any finite number are contained in O(1, x),
# expressions like 1/x are not. If any arg simplified to a
# vanishing expression as x -> 0 (like x or x**2, but not
# 3, 1/x, etc...) then the _eval_as_leading_term is needed
# to supply the first non-zero term of the series,
#
# e.g. expression leading term
# ---------- ------------
# cos(1/x) cos(1/x)
# cos(cos(x)) cos(1)
# cos(x) 1 <- _eval_as_leading_term needed
# sin(x) x <- _eval_as_leading_term needed
#
raise NotImplementedError(
'%s has no _eval_as_leading_term routine' % self.func)
else:
return self.func(*args)
def _sage_(self):
import sage.all as sage
fname = self.func.__name__
func = getattr(sage, fname, None)
args = [arg._sage_() for arg in self.args]
# In the case the function is not known in sage:
if func is None:
import sympy
if getattr(sympy, fname, None) is None:
# abstract function
return sage.function(fname)(*args)
else:
# the function defined in sympy is not known in sage
# this exception is caught in sage
raise AttributeError
return func(*args)
class AppliedUndef(Function):
"""
Base class for expressions resulting from the application of an undefined
function.
"""
is_number = False
def __new__(cls, *args, **options):
args = list(map(sympify, args))
u = [a.name for a in args if isinstance(a, UndefinedFunction)]
if u:
raise TypeError('Invalid argument: expecting an expression, not UndefinedFunction%s: %s' % (
's'*(len(u) > 1), ', '.join(u)))
obj = super(AppliedUndef, cls).__new__(cls, *args, **options)
return obj
def _eval_as_leading_term(self, x):
return self
def _sage_(self):
import sage.all as sage
fname = str(self.func)
args = [arg._sage_() for arg in self.args]
func = sage.function(fname)(*args)
return func
@property
def _diff_wrt(self):
"""
Allow derivatives wrt to undefined functions.
Examples
========
>>> from sympy import Function, Symbol
>>> f = Function('f')
>>> x = Symbol('x')
>>> f(x)._diff_wrt
True
>>> f(x).diff(x)
Derivative(f(x), x)
"""
return True
class UndefSageHelper(object):
"""
Helper to facilitate Sage conversion.
"""
def __get__(self, ins, typ):
import sage.all as sage
if ins is None:
return lambda: sage.function(typ.__name__)
else:
args = [arg._sage_() for arg in ins.args]
return lambda : sage.function(ins.__class__.__name__)(*args)
_undef_sage_helper = UndefSageHelper()
class UndefinedFunction(FunctionClass):
"""
The (meta)class of undefined functions.
"""
def __new__(mcl, name, bases=(AppliedUndef,), __dict__=None, **kwargs):
from .symbol import _filter_assumptions
# Allow Function('f', real=True)
# and/or Function(Symbol('f', real=True))
assumptions, kwargs = _filter_assumptions(kwargs)
if isinstance(name, Symbol):
assumptions = name._merge(assumptions)
name = name.name
elif not isinstance(name, str):
raise TypeError('expecting string or Symbol for name')
else:
commutative = assumptions.get('commutative', None)
assumptions = Symbol(name, **assumptions).assumptions0
if commutative is None:
assumptions.pop('commutative')
__dict__ = __dict__ or {}
# put the `is_*` for into __dict__
__dict__.update({'is_%s' % k: v for k, v in assumptions.items()})
# You can add other attributes, although they do have to be hashable
# (but seriously, if you want to add anything other than assumptions,
# just subclass Function)
__dict__.update(kwargs)
# add back the sanitized assumptions without the is_ prefix
kwargs.update(assumptions)
# Save these for __eq__
__dict__.update({'_kwargs': kwargs})
# do this for pickling
__dict__['__module__'] = None
obj = super(UndefinedFunction, mcl).__new__(mcl, name, bases, __dict__)
obj.name = name
obj._sage_ = _undef_sage_helper
return obj
def __instancecheck__(cls, instance):
return cls in type(instance).__mro__
_kwargs = {} # type: tDict[str, Optional[bool]]
def __hash__(self):
return hash((self.class_key(), frozenset(self._kwargs.items())))
def __eq__(self, other):
return (isinstance(other, self.__class__) and
self.class_key() == other.class_key() and
self._kwargs == other._kwargs)
def __ne__(self, other):
return not self == other
@property
def _diff_wrt(self):
return False
# XXX: The type: ignore on WildFunction is because mypy complains:
#
# sympy/core/function.py:939: error: Cannot determine type of 'sort_key' in
# base class 'Expr'
#
# Somehow this is because of the @cacheit decorator but it is not clear how to
# fix it.
class WildFunction(Function, AtomicExpr): # type: ignore
"""
A WildFunction function matches any function (with its arguments).
Examples
========
>>> from sympy import WildFunction, Function, cos
>>> from sympy.abc import x, y
>>> F = WildFunction('F')
>>> f = Function('f')
>>> F.nargs
Naturals0
>>> x.match(F)
>>> F.match(F)
{F_: F_}
>>> f(x).match(F)
{F_: f(x)}
>>> cos(x).match(F)
{F_: cos(x)}
>>> f(x, y).match(F)
{F_: f(x, y)}
To match functions with a given number of arguments, set ``nargs`` to the
desired value at instantiation:
>>> F = WildFunction('F', nargs=2)
>>> F.nargs
FiniteSet(2)
>>> f(x).match(F)
>>> f(x, y).match(F)
{F_: f(x, y)}
To match functions with a range of arguments, set ``nargs`` to a tuple
containing the desired number of arguments, e.g. if ``nargs = (1, 2)``
then functions with 1 or 2 arguments will be matched.
>>> F = WildFunction('F', nargs=(1, 2))
>>> F.nargs
FiniteSet(1, 2)
>>> f(x).match(F)
{F_: f(x)}
>>> f(x, y).match(F)
{F_: f(x, y)}
>>> f(x, y, 1).match(F)
"""
# XXX: What is this class attribute used for?
include = set() # type: tSet[Any]
def __init__(cls, name, **assumptions):
from sympy.sets.sets import Set, FiniteSet
cls.name = name
nargs = assumptions.pop('nargs', S.Naturals0)
if not isinstance(nargs, Set):
# Canonicalize nargs here. See also FunctionClass.
if is_sequence(nargs):
nargs = tuple(ordered(set(nargs)))
elif nargs is not None:
nargs = (as_int(nargs),)
nargs = FiniteSet(*nargs)
cls.nargs = nargs
def matches(self, expr, repl_dict={}, old=False):
if not isinstance(expr, (AppliedUndef, Function)):
return None
if len(expr.args) not in self.nargs:
return None
repl_dict = repl_dict.copy()
repl_dict[self] = expr
return repl_dict
class Derivative(Expr):
"""
Carries out differentiation of the given expression with respect to symbols.
Examples
========
>>> from sympy import Derivative, Function, symbols, Subs
>>> from sympy.abc import x, y
>>> f, g = symbols('f g', cls=Function)
>>> Derivative(x**2, x, evaluate=True)
2*x
Denesting of derivatives retains the ordering of variables:
>>> Derivative(Derivative(f(x, y), y), x)
Derivative(f(x, y), y, x)
Contiguously identical symbols are merged into a tuple giving
the symbol and the count:
>>> Derivative(f(x), x, x, y, x)
Derivative(f(x), (x, 2), y, x)
If the derivative cannot be performed, and evaluate is True, the
order of the variables of differentiation will be made canonical:
>>> Derivative(f(x, y), y, x, evaluate=True)
Derivative(f(x, y), x, y)
Derivatives with respect to undefined functions can be calculated:
>>> Derivative(f(x)**2, f(x), evaluate=True)
2*f(x)
Such derivatives will show up when the chain rule is used to
evalulate a derivative:
>>> f(g(x)).diff(x)
Derivative(f(g(x)), g(x))*Derivative(g(x), x)
Substitution is used to represent derivatives of functions with
arguments that are not symbols or functions:
>>> f(2*x + 3).diff(x) == 2*Subs(f(y).diff(y), y, 2*x + 3)
True
Notes
=====
Simplification of high-order derivatives:
Because there can be a significant amount of simplification that can be
done when multiple differentiations are performed, results will be
automatically simplified in a fairly conservative fashion unless the
keyword ``simplify`` is set to False.
>>> from sympy import cos, sin, sqrt, diff, Function, symbols
>>> from sympy.abc import x, y, z
>>> f, g = symbols('f,g', cls=Function)
>>> e = sqrt((x + 1)**2 + x)
>>> diff(e, (x, 5), simplify=False).count_ops()
136
>>> diff(e, (x, 5)).count_ops()
30
Ordering of variables:
If evaluate is set to True and the expression cannot be evaluated, the
list of differentiation symbols will be sorted, that is, the expression is
assumed to have continuous derivatives up to the order asked.
Derivative wrt non-Symbols:
For the most part, one may not differentiate wrt non-symbols.
For example, we do not allow differentiation wrt `x*y` because
there are multiple ways of structurally defining where x*y appears
in an expression: a very strict definition would make
(x*y*z).diff(x*y) == 0. Derivatives wrt defined functions (like
cos(x)) are not allowed, either:
>>> (x*y*z).diff(x*y)
Traceback (most recent call last):
...
ValueError: Can't calculate derivative wrt x*y.
To make it easier to work with variational calculus, however,
derivatives wrt AppliedUndef and Derivatives are allowed.
For example, in the Euler-Lagrange method one may write
F(t, u, v) where u = f(t) and v = f'(t). These variables can be
written explicitly as functions of time::
>>> from sympy.abc import t
>>> F = Function('F')
>>> U = f(t)
>>> V = U.diff(t)
The derivative wrt f(t) can be obtained directly:
>>> direct = F(t, U, V).diff(U)
When differentiation wrt a non-Symbol is attempted, the non-Symbol
is temporarily converted to a Symbol while the differentiation
is performed and the same answer is obtained:
>>> indirect = F(t, U, V).subs(U, x).diff(x).subs(x, U)
>>> assert direct == indirect
The implication of this non-symbol replacement is that all
functions are treated as independent of other functions and the
symbols are independent of the functions that contain them::
>>> x.diff(f(x))
0
>>> g(x).diff(f(x))
0
It also means that derivatives are assumed to depend only
on the variables of differentiation, not on anything contained
within the expression being differentiated::
>>> F = f(x)
>>> Fx = F.diff(x)
>>> Fx.diff(F) # derivative depends on x, not F
0
>>> Fxx = Fx.diff(x)
>>> Fxx.diff(Fx) # derivative depends on x, not Fx
0
The last example can be made explicit by showing the replacement
of Fx in Fxx with y:
>>> Fxx.subs(Fx, y)
Derivative(y, x)
Since that in itself will evaluate to zero, differentiating
wrt Fx will also be zero:
>>> _.doit()
0
Replacing undefined functions with concrete expressions
One must be careful to replace undefined functions with expressions
that contain variables consistent with the function definition and
the variables of differentiation or else insconsistent result will
be obtained. Consider the following example:
>>> eq = f(x)*g(y)
>>> eq.subs(f(x), x*y).diff(x, y).doit()
y*Derivative(g(y), y) + g(y)
>>> eq.diff(x, y).subs(f(x), x*y).doit()
y*Derivative(g(y), y)
The results differ because `f(x)` was replaced with an expression
that involved both variables of differentiation. In the abstract
case, differentiation of `f(x)` by `y` is 0; in the concrete case,
the presence of `y` made that derivative nonvanishing and produced
the extra `g(y)` term.
Defining differentiation for an object
An object must define ._eval_derivative(symbol) method that returns
the differentiation result. This function only needs to consider the
non-trivial case where expr contains symbol and it should call the diff()
method internally (not _eval_derivative); Derivative should be the only
one to call _eval_derivative.
Any class can allow derivatives to be taken with respect to
itself (while indicating its scalar nature). See the
docstring of Expr._diff_wrt.
See Also
========
_sort_variable_count
"""
is_Derivative = True
@property
def _diff_wrt(self):
"""An expression may be differentiated wrt a Derivative if
it is in elementary form.
Examples
========
>>> from sympy import Function, Derivative, cos
>>> from sympy.abc import x
>>> f = Function('f')
>>> Derivative(f(x), x)._diff_wrt
True
>>> Derivative(cos(x), x)._diff_wrt
False
>>> Derivative(x + 1, x)._diff_wrt
False
A Derivative might be an unevaluated form of what will not be
a valid variable of differentiation if evaluated. For example,
>>> Derivative(f(f(x)), x).doit()
Derivative(f(x), x)*Derivative(f(f(x)), f(x))
Such an expression will present the same ambiguities as arise
when dealing with any other product, like ``2*x``, so ``_diff_wrt``
is False:
>>> Derivative(f(f(x)), x)._diff_wrt
False
"""
return self.expr._diff_wrt and isinstance(self.doit(), Derivative)
def __new__(cls, expr, *variables, **kwargs):
from sympy.matrices.common import MatrixCommon
from sympy import Integer, MatrixExpr
from sympy.tensor.array import Array, NDimArray
from sympy.utilities.misc import filldedent
expr = sympify(expr)
symbols_or_none = getattr(expr, "free_symbols", None)
has_symbol_set = isinstance(symbols_or_none, set)
if not has_symbol_set:
raise ValueError(filldedent('''
Since there are no variables in the expression %s,
it cannot be differentiated.''' % expr))
# determine value for variables if it wasn't given
if not variables:
variables = expr.free_symbols
if len(variables) != 1:
if expr.is_number:
return S.Zero
if len(variables) == 0:
raise ValueError(filldedent('''
Since there are no variables in the expression,
the variable(s) of differentiation must be supplied
to differentiate %s''' % expr))
else:
raise ValueError(filldedent('''
Since there is more than one variable in the
expression, the variable(s) of differentiation
must be supplied to differentiate %s''' % expr))
# Standardize the variables by sympifying them:
variables = list(sympify(variables))
# Split the list of variables into a list of the variables we are diff
# wrt, where each element of the list has the form (s, count) where
# s is the entity to diff wrt and count is the order of the
# derivative.
variable_count = []
array_likes = (tuple, list, Tuple)
for i, v in enumerate(variables):
if isinstance(v, Integer):
if i == 0:
raise ValueError("First variable cannot be a number: %i" % v)
count = v
prev, prevcount = variable_count[-1]
if prevcount != 1:
raise TypeError("tuple {0} followed by number {1}".format((prev, prevcount), v))
if count == 0:
variable_count.pop()
else:
variable_count[-1] = Tuple(prev, count)
else:
if isinstance(v, array_likes):
if len(v) == 0:
# Ignore empty tuples: Derivative(expr, ... , (), ... )
continue
if isinstance(v[0], array_likes):
# Derive by array: Derivative(expr, ... , [[x, y, z]], ... )
if len(v) == 1:
v = Array(v[0])
count = 1
else:
v, count = v
v = Array(v)
else:
v, count = v
if count == 0:
continue
elif isinstance(v, UndefinedFunction):
raise TypeError(
"cannot differentiate wrt "
"UndefinedFunction: %s" % v)
else:
count = 1
variable_count.append(Tuple(v, count))
# light evaluation of contiguous, identical
# items: (x, 1), (x, 1) -> (x, 2)
merged = []
for t in variable_count:
v, c = t
if c.is_negative:
raise ValueError(
'order of differentiation must be nonnegative')
if merged and merged[-1][0] == v:
c += merged[-1][1]
if not c:
merged.pop()
else:
merged[-1] = Tuple(v, c)
else:
merged.append(t)
variable_count = merged
# sanity check of variables of differentation; we waited
# until the counts were computed since some variables may
# have been removed because the count was 0
for v, c in variable_count:
# v must have _diff_wrt True
if not v._diff_wrt:
__ = '' # filler to make error message neater
raise ValueError(filldedent('''
Can't calculate derivative wrt %s.%s''' % (v,
__)))
# We make a special case for 0th derivative, because there is no
# good way to unambiguously print this.
if len(variable_count) == 0:
return expr
evaluate = kwargs.get('evaluate', False)
if evaluate:
if isinstance(expr, Derivative):
expr = expr.canonical
variable_count = [
(v.canonical if isinstance(v, Derivative) else v, c)
for v, c in variable_count]
# Look for a quick exit if there are symbols that don't appear in
# expression at all. Note, this cannot check non-symbols like
# Derivatives as those can be created by intermediate
# derivatives.
zero = False
free = expr.free_symbols
for v, c in variable_count:
vfree = v.free_symbols
if c.is_positive and vfree:
if isinstance(v, AppliedUndef):
# these match exactly since
# x.diff(f(x)) == g(x).diff(f(x)) == 0
# and are not created by differentiation
D = Dummy()
if not expr.xreplace({v: D}).has(D):
zero = True
break
elif isinstance(v, MatrixExpr):
zero = False
break
elif isinstance(v, Symbol) and v not in free:
zero = True
break
else:
if not free & vfree:
# e.g. v is IndexedBase or Matrix
zero = True
break
if zero:
if isinstance(expr, (MatrixCommon, NDimArray)):
return expr.zeros(*expr.shape)
elif isinstance(expr, MatrixExpr):
from sympy import ZeroMatrix
return ZeroMatrix(*expr.shape)
elif expr.is_scalar:
return S.Zero
# make the order of symbols canonical
#TODO: check if assumption of discontinuous derivatives exist
variable_count = cls._sort_variable_count(variable_count)
# denest
if isinstance(expr, Derivative):
variable_count = list(expr.variable_count) + variable_count
expr = expr.expr
return Derivative(expr, *variable_count, **kwargs)
# we return here if evaluate is False or if there is no
# _eval_derivative method
if not evaluate or not hasattr(expr, '_eval_derivative'):
# return an unevaluated Derivative
if evaluate and variable_count == [(expr, 1)] and expr.is_scalar:
# special hack providing evaluation for classes
# that have defined is_scalar=True but have no
# _eval_derivative defined
return S.One
return Expr.__new__(cls, expr, *variable_count)
# evaluate the derivative by calling _eval_derivative method
# of expr for each variable
# -------------------------------------------------------------
nderivs = 0 # how many derivatives were performed
unhandled = []
for i, (v, count) in enumerate(variable_count):
old_expr = expr
old_v = None
is_symbol = v.is_symbol or isinstance(v,
(Iterable, Tuple, MatrixCommon, NDimArray))
if not is_symbol:
old_v = v
v = Dummy('xi')
expr = expr.xreplace({old_v: v})
# Derivatives and UndefinedFunctions are independent
# of all others
clashing = not (isinstance(old_v, Derivative) or \
isinstance(old_v, AppliedUndef))
if not v in expr.free_symbols and not clashing:
return expr.diff(v) # expr's version of 0
if not old_v.is_scalar and not hasattr(
old_v, '_eval_derivative'):
# special hack providing evaluation for classes
# that have defined is_scalar=True but have no
# _eval_derivative defined
expr *= old_v.diff(old_v)
# Evaluate the derivative `n` times. If
# `_eval_derivative_n_times` is not overridden by the current
# object, the default in `Basic` will call a loop over
# `_eval_derivative`:
obj = expr._eval_derivative_n_times(v, count)
if obj is not None and obj.is_zero:
return obj
nderivs += count
if old_v is not None:
if obj is not None:
# remove the dummy that was used
obj = obj.subs(v, old_v)
# restore expr
expr = old_expr
if obj is None:
# we've already checked for quick-exit conditions
# that give 0 so the remaining variables
# are contained in the expression but the expression
# did not compute a derivative so we stop taking
# derivatives
unhandled = variable_count[i:]
break
expr = obj
# what we have so far can be made canonical
expr = expr.replace(
lambda x: isinstance(x, Derivative),
lambda x: x.canonical)
if unhandled:
if isinstance(expr, Derivative):
unhandled = list(expr.variable_count) + unhandled
expr = expr.expr
expr = Expr.__new__(cls, expr, *unhandled)
if (nderivs > 1) == True and kwargs.get('simplify', True):
from sympy.core.exprtools import factor_terms
from sympy.simplify.simplify import signsimp
expr = factor_terms(signsimp(expr))
return expr
@property
def canonical(cls):
return cls.func(cls.expr,
*Derivative._sort_variable_count(cls.variable_count))
@classmethod
def _sort_variable_count(cls, vc):
"""
Sort (variable, count) pairs into canonical order while
retaining order of variables that do not commute during
differentiation:
* symbols and functions commute with each other
* derivatives commute with each other
* a derivative doesn't commute with anything it contains
* any other object is not allowed to commute if it has
free symbols in common with another object
Examples
========
>>> from sympy import Derivative, Function, symbols, cos
>>> vsort = Derivative._sort_variable_count
>>> x, y, z = symbols('x y z')
>>> f, g, h = symbols('f g h', cls=Function)
Contiguous items are collapsed into one pair:
>>> vsort([(x, 1), (x, 1)])
[(x, 2)]
>>> vsort([(y, 1), (f(x), 1), (y, 1), (f(x), 1)])
[(y, 2), (f(x), 2)]
Ordering is canonical.
>>> def vsort0(*v):
... # docstring helper to
... # change vi -> (vi, 0), sort, and return vi vals
... return [i[0] for i in vsort([(i, 0) for i in v])]
>>> vsort0(y, x)
[x, y]
>>> vsort0(g(y), g(x), f(y))
[f(y), g(x), g(y)]
Symbols are sorted as far to the left as possible but never
move to the left of a derivative having the same symbol in
its variables; the same applies to AppliedUndef which are
always sorted after Symbols:
>>> dfx = f(x).diff(x)
>>> assert vsort0(dfx, y) == [y, dfx]
>>> assert vsort0(dfx, x) == [dfx, x]
"""
from sympy.utilities.iterables import uniq, topological_sort
if not vc:
return []
vc = list(vc)
if len(vc) == 1:
return [Tuple(*vc[0])]
V = list(range(len(vc)))
E = []
v = lambda i: vc[i][0]
D = Dummy()
def _block(d, v, wrt=False):
# return True if v should not come before d else False
if d == v:
return wrt
if d.is_Symbol:
return False
if isinstance(d, Derivative):
# a derivative blocks if any of it's variables contain
# v; the wrt flag will return True for an exact match
# and will cause an AppliedUndef to block if v is in
# the arguments
if any(_block(k, v, wrt=True)
for k in d._wrt_variables):
return True
return False
if not wrt and isinstance(d, AppliedUndef):
return False
if v.is_Symbol:
return v in d.free_symbols
if isinstance(v, AppliedUndef):
return _block(d.xreplace({v: D}), D)
return d.free_symbols & v.free_symbols
for i in range(len(vc)):
for j in range(i):
if _block(v(j), v(i)):
E.append((j,i))
# this is the default ordering to use in case of ties
O = dict(zip(ordered(uniq([i for i, c in vc])), range(len(vc))))
ix = topological_sort((V, E), key=lambda i: O[v(i)])
# merge counts of contiguously identical items
merged = []
for v, c in [vc[i] for i in ix]:
if merged and merged[-1][0] == v:
merged[-1][1] += c
else:
merged.append([v, c])
return [Tuple(*i) for i in merged]
def _eval_is_commutative(self):
return self.expr.is_commutative
def _eval_derivative(self, v):
# If v (the variable of differentiation) is not in
# self.variables, we might be able to take the derivative.
if v not in self._wrt_variables:
dedv = self.expr.diff(v)
if isinstance(dedv, Derivative):
return dedv.func(dedv.expr, *(self.variable_count + dedv.variable_count))
# dedv (d(self.expr)/dv) could have simplified things such that the
# derivative wrt things in self.variables can now be done. Thus,
# we set evaluate=True to see if there are any other derivatives
# that can be done. The most common case is when dedv is a simple
# number so that the derivative wrt anything else will vanish.
return self.func(dedv, *self.variables, evaluate=True)
# In this case v was in self.variables so the derivative wrt v has
# already been attempted and was not computed, either because it
# couldn't be or evaluate=False originally.
variable_count = list(self.variable_count)
variable_count.append((v, 1))
return self.func(self.expr, *variable_count, evaluate=False)
def doit(self, **hints):
expr = self.expr
if hints.get('deep', True):
expr = expr.doit(**hints)
hints['evaluate'] = True
rv = self.func(expr, *self.variable_count, **hints)
if rv!= self and rv.has(Derivative):
rv = rv.doit(**hints)
return rv
@_sympifyit('z0', NotImplementedError)
def doit_numerically(self, z0):
"""
Evaluate the derivative at z numerically.
When we can represent derivatives at a point, this should be folded
into the normal evalf. For now, we need a special method.
"""
if len(self.free_symbols) != 1 or len(self.variables) != 1:
raise NotImplementedError('partials and higher order derivatives')
z = list(self.free_symbols)[0]
def eval(x):
f0 = self.expr.subs(z, Expr._from_mpmath(x, prec=mpmath.mp.prec))
f0 = f0.evalf(mlib.libmpf.prec_to_dps(mpmath.mp.prec))
return f0._to_mpmath(mpmath.mp.prec)
return Expr._from_mpmath(mpmath.diff(eval,
z0._to_mpmath(mpmath.mp.prec)),
mpmath.mp.prec)
@property
def expr(self):
return self._args[0]
@property
def _wrt_variables(self):
# return the variables of differentiation without
# respect to the type of count (int or symbolic)
return [i[0] for i in self.variable_count]
@property
def variables(self):
# TODO: deprecate? YES, make this 'enumerated_variables' and
# name _wrt_variables as variables
# TODO: support for `d^n`?
rv = []
for v, count in self.variable_count:
if not count.is_Integer:
raise TypeError(filldedent('''
Cannot give expansion for symbolic count. If you just
want a list of all variables of differentiation, use
_wrt_variables.'''))
rv.extend([v]*count)
return tuple(rv)
@property
def variable_count(self):
return self._args[1:]
@property
def derivative_count(self):
return sum([count for var, count in self.variable_count], 0)
@property
def free_symbols(self):
ret = self.expr.free_symbols
# Add symbolic counts to free_symbols
for var, count in self.variable_count:
ret.update(count.free_symbols)
return ret
def _eval_subs(self, old, new):
# The substitution (old, new) cannot be done inside
# Derivative(expr, vars) for a variety of reasons
# as handled below.
if old in self._wrt_variables:
# first handle the counts
expr = self.func(self.expr, *[(v, c.subs(old, new))
for v, c in self.variable_count])
if expr != self:
return expr._eval_subs(old, new)
# quick exit case
if not getattr(new, '_diff_wrt', False):
# case (0): new is not a valid variable of
# differentiation
if isinstance(old, Symbol):
# don't introduce a new symbol if the old will do
return Subs(self, old, new)
else:
xi = Dummy('xi')
return Subs(self.xreplace({old: xi}), xi, new)
# If both are Derivatives with the same expr, check if old is
# equivalent to self or if old is a subderivative of self.
if old.is_Derivative and old.expr == self.expr:
if self.canonical == old.canonical:
return new
# collections.Counter doesn't have __le__
def _subset(a, b):
return all((a[i] <= b[i]) == True for i in a)
old_vars = Counter(dict(reversed(old.variable_count)))
self_vars = Counter(dict(reversed(self.variable_count)))
if _subset(old_vars, self_vars):
return Derivative(new, *(self_vars - old_vars).items()).canonical
args = list(self.args)
newargs = list(x._subs(old, new) for x in args)
if args[0] == old:
# complete replacement of self.expr
# we already checked that the new is valid so we know
# it won't be a problem should it appear in variables
return Derivative(*newargs)
if newargs[0] != args[0]:
# case (1) can't change expr by introducing something that is in
# the _wrt_variables if it was already in the expr
# e.g.
# for Derivative(f(x, g(y)), y), x cannot be replaced with
# anything that has y in it; for f(g(x), g(y)).diff(g(y))
# g(x) cannot be replaced with anything that has g(y)
syms = {vi: Dummy() for vi in self._wrt_variables
if not vi.is_Symbol}
wrt = set(syms.get(vi, vi) for vi in self._wrt_variables)
forbidden = args[0].xreplace(syms).free_symbols & wrt
nfree = new.xreplace(syms).free_symbols
ofree = old.xreplace(syms).free_symbols
if (nfree - ofree) & forbidden:
return Subs(self, old, new)
viter = ((i, j) for ((i, _), (j, _)) in zip(newargs[1:], args[1:]))
if any(i != j for i, j in viter): # a wrt-variable change
# case (2) can't change vars by introducing a variable
# that is contained in expr, e.g.
# for Derivative(f(z, g(h(x), y)), y), y cannot be changed to
# x, h(x), or g(h(x), y)
for a in _atomic(self.expr, recursive=True):
for i in range(1, len(newargs)):
vi, _ = newargs[i]
if a == vi and vi != args[i][0]:
return Subs(self, old, new)
# more arg-wise checks
vc = newargs[1:]
oldv = self._wrt_variables
newe = self.expr
subs = []
for i, (vi, ci) in enumerate(vc):
if not vi._diff_wrt:
# case (3) invalid differentiation expression so
# create a replacement dummy
xi = Dummy('xi_%i' % i)
# replace the old valid variable with the dummy
# in the expression
newe = newe.xreplace({oldv[i]: xi})
# and replace the bad variable with the dummy
vc[i] = (xi, ci)
# and record the dummy with the new (invalid)
# differentiation expression
subs.append((xi, vi))
if subs:
# handle any residual substitution in the expression
newe = newe._subs(old, new)
# return the Subs-wrapped derivative
return Subs(Derivative(newe, *vc), *zip(*subs))
# everything was ok
return Derivative(*newargs)
def _eval_lseries(self, x, logx):
dx = self.variables
for term in self.expr.lseries(x, logx=logx):
yield self.func(term, *dx)
def _eval_nseries(self, x, n, logx):
arg = self.expr.nseries(x, n=n, logx=logx)
o = arg.getO()
dx = self.variables
rv = [self.func(a, *dx) for a in Add.make_args(arg.removeO())]
if o:
rv.append(o/x)
return Add(*rv)
def _eval_as_leading_term(self, x):
series_gen = self.expr.lseries(x)
d = S.Zero
for leading_term in series_gen:
d = diff(leading_term, *self.variables)
if d != 0:
break
return d
def _sage_(self):
import sage.all as sage
args = [arg._sage_() for arg in self.args]
return sage.derivative(*args)
def as_finite_difference(self, points=1, x0=None, wrt=None):
""" Expresses a Derivative instance as a finite difference.
Parameters
==========
points : sequence or coefficient, optional
If sequence: discrete values (length >= order+1) of the
independent variable used for generating the finite
difference weights.
If it is a coefficient, it will be used as the step-size
for generating an equidistant sequence of length order+1
centered around ``x0``. Default: 1 (step-size 1)
x0 : number or Symbol, optional
the value of the independent variable (``wrt``) at which the
derivative is to be approximated. Default: same as ``wrt``.
wrt : Symbol, optional
"with respect to" the variable for which the (partial)
derivative is to be approximated for. If not provided it
is required that the derivative is ordinary. Default: ``None``.
Examples
========
>>> from sympy import symbols, Function, exp, sqrt, Symbol
>>> x, h = symbols('x h')
>>> f = Function('f')
>>> f(x).diff(x).as_finite_difference()
-f(x - 1/2) + f(x + 1/2)
The default step size and number of points are 1 and
``order + 1`` respectively. We can change the step size by
passing a symbol as a parameter:
>>> f(x).diff(x).as_finite_difference(h)
-f(-h/2 + x)/h + f(h/2 + x)/h
We can also specify the discretized values to be used in a
sequence:
>>> f(x).diff(x).as_finite_difference([x, x+h, x+2*h])
-3*f(x)/(2*h) + 2*f(h + x)/h - f(2*h + x)/(2*h)
The algorithm is not restricted to use equidistant spacing, nor
do we need to make the approximation around ``x0``, but we can get
an expression estimating the derivative at an offset:
>>> e, sq2 = exp(1), sqrt(2)
>>> xl = [x-h, x+h, x+e*h]
>>> f(x).diff(x, 1).as_finite_difference(xl, x+h*sq2) # doctest: +ELLIPSIS
2*h*((h + sqrt(2)*h)/(2*h) - (-sqrt(2)*h + h)/(2*h))*f(E*h + x)/...
To approximate ``Derivative`` around ``x0`` using a non-equidistant
spacing step, the algorithm supports assignment of undefined
functions to ``points``:
>>> dx = Function('dx')
>>> f(x).diff(x).as_finite_difference(points=dx(x), x0=x-h)
-f(-h + x - dx(-h + x)/2)/dx(-h + x) + f(-h + x + dx(-h + x)/2)/dx(-h + x)
Partial derivatives are also supported:
>>> y = Symbol('y')
>>> d2fdxdy=f(x,y).diff(x,y)
>>> d2fdxdy.as_finite_difference(wrt=x)
-Derivative(f(x - 1/2, y), y) + Derivative(f(x + 1/2, y), y)
We can apply ``as_finite_difference`` to ``Derivative`` instances in
compound expressions using ``replace``:
>>> (1 + 42**f(x).diff(x)).replace(lambda arg: arg.is_Derivative,
... lambda arg: arg.as_finite_difference())
42**(-f(x - 1/2) + f(x + 1/2)) + 1
See also
========
sympy.calculus.finite_diff.apply_finite_diff
sympy.calculus.finite_diff.differentiate_finite
sympy.calculus.finite_diff.finite_diff_weights
"""
from ..calculus.finite_diff import _as_finite_diff
return _as_finite_diff(self, points, x0, wrt)
class Lambda(Expr):
"""
Lambda(x, expr) represents a lambda function similar to Python's
'lambda x: expr'. A function of several variables is written as
Lambda((x, y, ...), expr).
A simple example:
>>> from sympy import Lambda
>>> from sympy.abc import x
>>> f = Lambda(x, x**2)
>>> f(4)
16
For multivariate functions, use:
>>> from sympy.abc import y, z, t
>>> f2 = Lambda((x, y, z, t), x + y**z + t**z)
>>> f2(1, 2, 3, 4)
73
It is also possible to unpack tuple arguments:
>>> f = Lambda( ((x, y), z) , x + y + z)
>>> f((1, 2), 3)
6
A handy shortcut for lots of arguments:
>>> p = x, y, z
>>> f = Lambda(p, x + y*z)
>>> f(*p)
x + y*z
"""
is_Function = True
def __new__(cls, signature, expr):
if iterable(signature) and not isinstance(signature, (tuple, Tuple)):
SymPyDeprecationWarning(
feature="non tuple iterable of argument symbols to Lambda",
useinstead="tuple of argument symbols",
issue=17474,
deprecated_since_version="1.5").warn()
signature = tuple(signature)
sig = signature if iterable(signature) else (signature,)
sig = sympify(sig)
cls._check_signature(sig)
if len(sig) == 1 and sig[0] == expr:
return S.IdentityFunction
return Expr.__new__(cls, sig, sympify(expr))
@classmethod
def _check_signature(cls, sig):
syms = set()
def rcheck(args):
for a in args:
if a.is_symbol:
if a in syms:
raise BadSignatureError("Duplicate symbol %s" % a)
syms.add(a)
elif isinstance(a, Tuple):
rcheck(a)
else:
raise BadSignatureError("Lambda signature should be only tuples"
" and symbols, not %s" % a)
if not isinstance(sig, Tuple):
raise BadSignatureError("Lambda signature should be a tuple not %s" % sig)
# Recurse through the signature:
rcheck(sig)
@property
def signature(self):
"""The expected form of the arguments to be unpacked into variables"""
return self._args[0]
@property
def expr(self):
"""The return value of the function"""
return self._args[1]
@property
def variables(self):
"""The variables used in the internal representation of the function"""
def _variables(args):
if isinstance(args, Tuple):
for arg in args:
for a in _variables(arg):
yield a
else:
yield args
return tuple(_variables(self.signature))
@property
def nargs(self):
from sympy.sets.sets import FiniteSet
return FiniteSet(len(self.signature))
bound_symbols = variables
@property
def free_symbols(self):
return self.expr.free_symbols - set(self.variables)
def __call__(self, *args):
n = len(args)
if n not in self.nargs: # Lambda only ever has 1 value in nargs
# XXX: exception message must be in exactly this format to
# make it work with NumPy's functions like vectorize(). See,
# for example, https://github.com/numpy/numpy/issues/1697.
# The ideal solution would be just to attach metadata to
# the exception and change NumPy to take advantage of this.
## XXX does this apply to Lambda? If not, remove this comment.
temp = ('%(name)s takes exactly %(args)s '
'argument%(plural)s (%(given)s given)')
raise BadArgumentsError(temp % {
'name': self,
'args': list(self.nargs)[0],
'plural': 's'*(list(self.nargs)[0] != 1),
'given': n})
d = self._match_signature(self.signature, args)
return self.expr.xreplace(d)
def _match_signature(self, sig, args):
symargmap = {}
def rmatch(pars, args):
for par, arg in zip(pars, args):
if par.is_symbol:
symargmap[par] = arg
elif isinstance(par, Tuple):
if not isinstance(arg, (tuple, Tuple)) or len(args) != len(pars):
raise BadArgumentsError("Can't match %s and %s" % (args, pars))
rmatch(par, arg)
rmatch(sig, args)
return symargmap
def __eq__(self, other):
if not isinstance(other, Lambda):
return False
if self.nargs != other.nargs:
return False
try:
d = self._match_signature(other.signature, self.signature)
except BadArgumentsError:
return False
return self.args == other.xreplace(d).args
def __hash__(self):
return super(Lambda, self).__hash__()
def _hashable_content(self):
return (self.expr.xreplace(self.canonical_variables),)
@property
def is_identity(self):
"""Return ``True`` if this ``Lambda`` is an identity function. """
return self.signature == self.expr
class Subs(Expr):
"""
Represents unevaluated substitutions of an expression.
``Subs(expr, x, x0)`` receives 3 arguments: an expression, a variable or
list of distinct variables and a point or list of evaluation points
corresponding to those variables.
``Subs`` objects are generally useful to represent unevaluated derivatives
calculated at a point.
The variables may be expressions, but they are subjected to the limitations
of subs(), so it is usually a good practice to use only symbols for
variables, since in that case there can be no ambiguity.
There's no automatic expansion - use the method .doit() to effect all
possible substitutions of the object and also of objects inside the
expression.
When evaluating derivatives at a point that is not a symbol, a Subs object
is returned. One is also able to calculate derivatives of Subs objects - in
this case the expression is always expanded (for the unevaluated form, use
Derivative()).
Examples
========
>>> from sympy import Subs, Function, sin, cos
>>> from sympy.abc import x, y, z
>>> f = Function('f')
Subs are created when a particular substitution cannot be made. The
x in the derivative cannot be replaced with 0 because 0 is not a
valid variables of differentiation:
>>> f(x).diff(x).subs(x, 0)
Subs(Derivative(f(x), x), x, 0)
Once f is known, the derivative and evaluation at 0 can be done:
>>> _.subs(f, sin).doit() == sin(x).diff(x).subs(x, 0) == cos(0)
True
Subs can also be created directly with one or more variables:
>>> Subs(f(x)*sin(y) + z, (x, y), (0, 1))
Subs(z + f(x)*sin(y), (x, y), (0, 1))
>>> _.doit()
z + f(0)*sin(1)
Notes
=====
In order to allow expressions to combine before doit is done, a
representation of the Subs expression is used internally to make
expressions that are superficially different compare the same:
>>> a, b = Subs(x, x, 0), Subs(y, y, 0)
>>> a + b
2*Subs(x, x, 0)
This can lead to unexpected consequences when using methods
like `has` that are cached:
>>> s = Subs(x, x, 0)
>>> s.has(x), s.has(y)
(True, False)
>>> ss = s.subs(x, y)
>>> ss.has(x), ss.has(y)
(True, False)
>>> s, ss
(Subs(x, x, 0), Subs(y, y, 0))
"""
def __new__(cls, expr, variables, point, **assumptions):
from sympy import Symbol
if not is_sequence(variables, Tuple):
variables = [variables]
variables = Tuple(*variables)
if has_dups(variables):
repeated = [str(v) for v, i in Counter(variables).items() if i > 1]
__ = ', '.join(repeated)
raise ValueError(filldedent('''
The following expressions appear more than once: %s
''' % __))
point = Tuple(*(point if is_sequence(point, Tuple) else [point]))
if len(point) != len(variables):
raise ValueError('Number of point values must be the same as '
'the number of variables.')
if not point:
return sympify(expr)
# denest
if isinstance(expr, Subs):
variables = expr.variables + variables
point = expr.point + point
expr = expr.expr
else:
expr = sympify(expr)
# use symbols with names equal to the point value (with prepended _)
# to give a variable-independent expression
pre = "_"
pts = sorted(set(point), key=default_sort_key)
from sympy.printing import StrPrinter
class CustomStrPrinter(StrPrinter):
def _print_Dummy(self, expr):
return str(expr) + str(expr.dummy_index)
def mystr(expr, **settings):
p = CustomStrPrinter(settings)
return p.doprint(expr)
while 1:
s_pts = {p: Symbol(pre + mystr(p)) for p in pts}
reps = [(v, s_pts[p])
for v, p in zip(variables, point)]
# if any underscore-prepended symbol is already a free symbol
# and is a variable with a different point value, then there
# is a clash, e.g. _0 clashes in Subs(_0 + _1, (_0, _1), (1, 0))
# because the new symbol that would be created is _1 but _1
# is already mapped to 0 so __0 and __1 are used for the new
# symbols
if any(r in expr.free_symbols and
r in variables and
Symbol(pre + mystr(point[variables.index(r)])) != r
for _, r in reps):
pre += "_"
continue
break
obj = Expr.__new__(cls, expr, Tuple(*variables), point)
obj._expr = expr.xreplace(dict(reps))
return obj
def _eval_is_commutative(self):
return self.expr.is_commutative
def doit(self, **hints):
e, v, p = self.args
# remove self mappings
for i, (vi, pi) in enumerate(zip(v, p)):
if vi == pi:
v = v[:i] + v[i + 1:]
p = p[:i] + p[i + 1:]
if not v:
return self.expr
if isinstance(e, Derivative):
# apply functions first, e.g. f -> cos
undone = []
for i, vi in enumerate(v):
if isinstance(vi, FunctionClass):
e = e.subs(vi, p[i])
else:
undone.append((vi, p[i]))
if not isinstance(e, Derivative):
e = e.doit()
if isinstance(e, Derivative):
# do Subs that aren't related to differentiation
undone2 = []
D = Dummy()
for vi, pi in undone:
if D not in e.xreplace({vi: D}).free_symbols:
e = e.subs(vi, pi)
else:
undone2.append((vi, pi))
undone = undone2
# differentiate wrt variables that are present
wrt = []
D = Dummy()
expr = e.expr
free = expr.free_symbols
for vi, ci in e.variable_count:
if isinstance(vi, Symbol) and vi in free:
expr = expr.diff((vi, ci))
elif D in expr.subs(vi, D).free_symbols:
expr = expr.diff((vi, ci))
else:
wrt.append((vi, ci))
# inject remaining subs
rv = expr.subs(undone)
# do remaining differentiation *in order given*
for vc in wrt:
rv = rv.diff(vc)
else:
# inject remaining subs
rv = e.subs(undone)
else:
rv = e.doit(**hints).subs(list(zip(v, p)))
if hints.get('deep', True) and rv != self:
rv = rv.doit(**hints)
return rv
def evalf(self, prec=None, **options):
return self.doit().evalf(prec, **options)
n = evalf
@property
def variables(self):
"""The variables to be evaluated"""
return self._args[1]
bound_symbols = variables
@property
def expr(self):
"""The expression on which the substitution operates"""
return self._args[0]
@property
def point(self):
"""The values for which the variables are to be substituted"""
return self._args[2]
@property
def free_symbols(self):
return (self.expr.free_symbols - set(self.variables) |
set(self.point.free_symbols))
@property
def expr_free_symbols(self):
return (self.expr.expr_free_symbols - set(self.variables) |
set(self.point.expr_free_symbols))
def __eq__(self, other):
if not isinstance(other, Subs):
return False
return self._hashable_content() == other._hashable_content()
def __ne__(self, other):
return not(self == other)
def __hash__(self):
return super(Subs, self).__hash__()
def _hashable_content(self):
return (self._expr.xreplace(self.canonical_variables),
) + tuple(ordered([(v, p) for v, p in
zip(self.variables, self.point) if not self.expr.has(v)]))
def _eval_subs(self, old, new):
# Subs doit will do the variables in order; the semantics
# of subs for Subs is have the following invariant for
# Subs object foo:
# foo.doit().subs(reps) == foo.subs(reps).doit()
pt = list(self.point)
if old in self.variables:
if _atomic(new) == set([new]) and not any(
i.has(new) for i in self.args):
# the substitution is neutral
return self.xreplace({old: new})
# any occurrence of old before this point will get
# handled by replacements from here on
i = self.variables.index(old)
for j in range(i, len(self.variables)):
pt[j] = pt[j]._subs(old, new)
return self.func(self.expr, self.variables, pt)
v = [i._subs(old, new) for i in self.variables]
if v != list(self.variables):
return self.func(self.expr, self.variables + (old,), pt + [new])
expr = self.expr._subs(old, new)
pt = [i._subs(old, new) for i in self.point]
return self.func(expr, v, pt)
def _eval_derivative(self, s):
# Apply the chain rule of the derivative on the substitution variables:
val = Add.fromiter(p.diff(s) * Subs(self.expr.diff(v), self.variables, self.point).doit() for v, p in zip(self.variables, self.point))
# Check if there are free symbols in `self.expr`:
# First get the `expr_free_symbols`, which returns the free symbols
# that are directly contained in an expression node (i.e. stop
# searching if the node isn't an expression). At this point turn the
# expressions into `free_symbols` and check if there are common free
# symbols in `self.expr` and the deriving factor.
fs1 = {j for i in self.expr_free_symbols for j in i.free_symbols}
if len(fs1 & s.free_symbols) > 0:
val += Subs(self.expr.diff(s), self.variables, self.point).doit()
return val
def _eval_nseries(self, x, n, logx):
if x in self.point:
# x is the variable being substituted into
apos = self.point.index(x)
other = self.variables[apos]
else:
other = x
arg = self.expr.nseries(other, n=n, logx=logx)
o = arg.getO()
terms = Add.make_args(arg.removeO())
rv = Add(*[self.func(a, *self.args[1:]) for a in terms])
if o:
rv += o.subs(other, x)
return rv
def _eval_as_leading_term(self, x):
if x in self.point:
ipos = self.point.index(x)
xvar = self.variables[ipos]
return self.expr.as_leading_term(xvar)
if x in self.variables:
# if `x` is a dummy variable, it means it won't exist after the
# substitution has been performed:
return self
# The variable is independent of the substitution:
return self.expr.as_leading_term(x)
def diff(f, *symbols, **kwargs):
"""
Differentiate f with respect to symbols.
This is just a wrapper to unify .diff() and the Derivative class; its
interface is similar to that of integrate(). You can use the same
shortcuts for multiple variables as with Derivative. For example,
diff(f(x), x, x, x) and diff(f(x), x, 3) both return the third derivative
of f(x).
You can pass evaluate=False to get an unevaluated Derivative class. Note
that if there are 0 symbols (such as diff(f(x), x, 0), then the result will
be the function (the zeroth derivative), even if evaluate=False.
Examples
========
>>> from sympy import sin, cos, Function, diff
>>> from sympy.abc import x, y
>>> f = Function('f')
>>> diff(sin(x), x)
cos(x)
>>> diff(f(x), x, x, x)
Derivative(f(x), (x, 3))
>>> diff(f(x), x, 3)
Derivative(f(x), (x, 3))
>>> diff(sin(x)*cos(y), x, 2, y, 2)
sin(x)*cos(y)
>>> type(diff(sin(x), x))
cos
>>> type(diff(sin(x), x, evaluate=False))
<class 'sympy.core.function.Derivative'>
>>> type(diff(sin(x), x, 0))
sin
>>> type(diff(sin(x), x, 0, evaluate=False))
sin
>>> diff(sin(x))
cos(x)
>>> diff(sin(x*y))
Traceback (most recent call last):
...
ValueError: specify differentiation variables to differentiate sin(x*y)
Note that ``diff(sin(x))`` syntax is meant only for convenience
in interactive sessions and should be avoided in library code.
References
==========
http://reference.wolfram.com/legacy/v5_2/Built-inFunctions/AlgebraicComputation/Calculus/D.html
See Also
========
Derivative
idiff: computes the derivative implicitly
"""
if hasattr(f, 'diff'):
return f.diff(*symbols, **kwargs)
kwargs.setdefault('evaluate', True)
return Derivative(f, *symbols, **kwargs)
def expand(e, deep=True, modulus=None, power_base=True, power_exp=True,
mul=True, log=True, multinomial=True, basic=True, **hints):
r"""
Expand an expression using methods given as hints.
Hints evaluated unless explicitly set to False are: ``basic``, ``log``,
``multinomial``, ``mul``, ``power_base``, and ``power_exp`` The following
hints are supported but not applied unless set to True: ``complex``,
``func``, and ``trig``. In addition, the following meta-hints are
supported by some or all of the other hints: ``frac``, ``numer``,
``denom``, ``modulus``, and ``force``. ``deep`` is supported by all
hints. Additionally, subclasses of Expr may define their own hints or
meta-hints.
The ``basic`` hint is used for any special rewriting of an object that
should be done automatically (along with the other hints like ``mul``)
when expand is called. This is a catch-all hint to handle any sort of
expansion that may not be described by the existing hint names. To use
this hint an object should override the ``_eval_expand_basic`` method.
Objects may also define their own expand methods, which are not run by
default. See the API section below.
If ``deep`` is set to ``True`` (the default), things like arguments of
functions are recursively expanded. Use ``deep=False`` to only expand on
the top level.
If the ``force`` hint is used, assumptions about variables will be ignored
in making the expansion.
Hints
=====
These hints are run by default
mul
---
Distributes multiplication over addition:
>>> from sympy import cos, exp, sin
>>> from sympy.abc import x, y, z
>>> (y*(x + z)).expand(mul=True)
x*y + y*z
multinomial
-----------
Expand (x + y + ...)**n where n is a positive integer.
>>> ((x + y + z)**2).expand(multinomial=True)
x**2 + 2*x*y + 2*x*z + y**2 + 2*y*z + z**2
power_exp
---------
Expand addition in exponents into multiplied bases.
>>> exp(x + y).expand(power_exp=True)
exp(x)*exp(y)
>>> (2**(x + y)).expand(power_exp=True)
2**x*2**y
power_base
----------
Split powers of multiplied bases.
This only happens by default if assumptions allow, or if the
``force`` meta-hint is used:
>>> ((x*y)**z).expand(power_base=True)
(x*y)**z
>>> ((x*y)**z).expand(power_base=True, force=True)
x**z*y**z
>>> ((2*y)**z).expand(power_base=True)
2**z*y**z
Note that in some cases where this expansion always holds, SymPy performs
it automatically:
>>> (x*y)**2
x**2*y**2
log
---
Pull out power of an argument as a coefficient and split logs products
into sums of logs.
Note that these only work if the arguments of the log function have the
proper assumptions--the arguments must be positive and the exponents must
be real--or else the ``force`` hint must be True:
>>> from sympy import log, symbols
>>> log(x**2*y).expand(log=True)
log(x**2*y)
>>> log(x**2*y).expand(log=True, force=True)
2*log(x) + log(y)
>>> x, y = symbols('x,y', positive=True)
>>> log(x**2*y).expand(log=True)
2*log(x) + log(y)
basic
-----
This hint is intended primarily as a way for custom subclasses to enable
expansion by default.
These hints are not run by default:
complex
-------
Split an expression into real and imaginary parts.
>>> x, y = symbols('x,y')
>>> (x + y).expand(complex=True)
re(x) + re(y) + I*im(x) + I*im(y)
>>> cos(x).expand(complex=True)
-I*sin(re(x))*sinh(im(x)) + cos(re(x))*cosh(im(x))
Note that this is just a wrapper around ``as_real_imag()``. Most objects
that wish to redefine ``_eval_expand_complex()`` should consider
redefining ``as_real_imag()`` instead.
func
----
Expand other functions.
>>> from sympy import gamma
>>> gamma(x + 1).expand(func=True)
x*gamma(x)
trig
----
Do trigonometric expansions.
>>> cos(x + y).expand(trig=True)
-sin(x)*sin(y) + cos(x)*cos(y)
>>> sin(2*x).expand(trig=True)
2*sin(x)*cos(x)
Note that the forms of ``sin(n*x)`` and ``cos(n*x)`` in terms of ``sin(x)``
and ``cos(x)`` are not unique, due to the identity `\sin^2(x) + \cos^2(x)
= 1`. The current implementation uses the form obtained from Chebyshev
polynomials, but this may change. See `this MathWorld article
<http://mathworld.wolfram.com/Multiple-AngleFormulas.html>`_ for more
information.
Notes
=====
- You can shut off unwanted methods::
>>> (exp(x + y)*(x + y)).expand()
x*exp(x)*exp(y) + y*exp(x)*exp(y)
>>> (exp(x + y)*(x + y)).expand(power_exp=False)
x*exp(x + y) + y*exp(x + y)
>>> (exp(x + y)*(x + y)).expand(mul=False)
(x + y)*exp(x)*exp(y)
- Use deep=False to only expand on the top level::
>>> exp(x + exp(x + y)).expand()
exp(x)*exp(exp(x)*exp(y))
>>> exp(x + exp(x + y)).expand(deep=False)
exp(x)*exp(exp(x + y))
- Hints are applied in an arbitrary, but consistent order (in the current
implementation, they are applied in alphabetical order, except
multinomial comes before mul, but this may change). Because of this,
some hints may prevent expansion by other hints if they are applied
first. For example, ``mul`` may distribute multiplications and prevent
``log`` and ``power_base`` from expanding them. Also, if ``mul`` is
applied before ``multinomial`, the expression might not be fully
distributed. The solution is to use the various ``expand_hint`` helper
functions or to use ``hint=False`` to this function to finely control
which hints are applied. Here are some examples::
>>> from sympy import expand, expand_mul, expand_power_base
>>> x, y, z = symbols('x,y,z', positive=True)
>>> expand(log(x*(y + z)))
log(x) + log(y + z)
Here, we see that ``log`` was applied before ``mul``. To get the mul
expanded form, either of the following will work::
>>> expand_mul(log(x*(y + z)))
log(x*y + x*z)
>>> expand(log(x*(y + z)), log=False)
log(x*y + x*z)
A similar thing can happen with the ``power_base`` hint::
>>> expand((x*(y + z))**x)
(x*y + x*z)**x
To get the ``power_base`` expanded form, either of the following will
work::
>>> expand((x*(y + z))**x, mul=False)
x**x*(y + z)**x
>>> expand_power_base((x*(y + z))**x)
x**x*(y + z)**x
>>> expand((x + y)*y/x)
y + y**2/x
The parts of a rational expression can be targeted::
>>> expand((x + y)*y/x/(x + 1), frac=True)
(x*y + y**2)/(x**2 + x)
>>> expand((x + y)*y/x/(x + 1), numer=True)
(x*y + y**2)/(x*(x + 1))
>>> expand((x + y)*y/x/(x + 1), denom=True)
y*(x + y)/(x**2 + x)
- The ``modulus`` meta-hint can be used to reduce the coefficients of an
expression post-expansion::
>>> expand((3*x + 1)**2)
9*x**2 + 6*x + 1
>>> expand((3*x + 1)**2, modulus=5)
4*x**2 + x + 1
- Either ``expand()`` the function or ``.expand()`` the method can be
used. Both are equivalent::
>>> expand((x + 1)**2)
x**2 + 2*x + 1
>>> ((x + 1)**2).expand()
x**2 + 2*x + 1
API
===
Objects can define their own expand hints by defining
``_eval_expand_hint()``. The function should take the form::
def _eval_expand_hint(self, **hints):
# Only apply the method to the top-level expression
...
See also the example below. Objects should define ``_eval_expand_hint()``
methods only if ``hint`` applies to that specific object. The generic
``_eval_expand_hint()`` method defined in Expr will handle the no-op case.
Each hint should be responsible for expanding that hint only.
Furthermore, the expansion should be applied to the top-level expression
only. ``expand()`` takes care of the recursion that happens when
``deep=True``.
You should only call ``_eval_expand_hint()`` methods directly if you are
100% sure that the object has the method, as otherwise you are liable to
get unexpected ``AttributeError``s. Note, again, that you do not need to
recursively apply the hint to args of your object: this is handled
automatically by ``expand()``. ``_eval_expand_hint()`` should
generally not be used at all outside of an ``_eval_expand_hint()`` method.
If you want to apply a specific expansion from within another method, use
the public ``expand()`` function, method, or ``expand_hint()`` functions.
In order for expand to work, objects must be rebuildable by their args,
i.e., ``obj.func(*obj.args) == obj`` must hold.
Expand methods are passed ``**hints`` so that expand hints may use
'metahints'--hints that control how different expand methods are applied.
For example, the ``force=True`` hint described above that causes
``expand(log=True)`` to ignore assumptions is such a metahint. The
``deep`` meta-hint is handled exclusively by ``expand()`` and is not
passed to ``_eval_expand_hint()`` methods.
Note that expansion hints should generally be methods that perform some
kind of 'expansion'. For hints that simply rewrite an expression, use the
.rewrite() API.
Examples
========
>>> from sympy import Expr, sympify
>>> class MyClass(Expr):
... def __new__(cls, *args):
... args = sympify(args)
... return Expr.__new__(cls, *args)
...
... def _eval_expand_double(self, **hints):
... '''
... Doubles the args of MyClass.
...
... If there more than four args, doubling is not performed,
... unless force=True is also used (False by default).
... '''
... force = hints.pop('force', False)
... if not force and len(self.args) > 4:
... return self
... return self.func(*(self.args + self.args))
...
>>> a = MyClass(1, 2, MyClass(3, 4))
>>> a
MyClass(1, 2, MyClass(3, 4))
>>> a.expand(double=True)
MyClass(1, 2, MyClass(3, 4, 3, 4), 1, 2, MyClass(3, 4, 3, 4))
>>> a.expand(double=True, deep=False)
MyClass(1, 2, MyClass(3, 4), 1, 2, MyClass(3, 4))
>>> b = MyClass(1, 2, 3, 4, 5)
>>> b.expand(double=True)
MyClass(1, 2, 3, 4, 5)
>>> b.expand(double=True, force=True)
MyClass(1, 2, 3, 4, 5, 1, 2, 3, 4, 5)
See Also
========
expand_log, expand_mul, expand_multinomial, expand_complex, expand_trig,
expand_power_base, expand_power_exp, expand_func, sympy.simplify.hyperexpand.hyperexpand
"""
# don't modify this; modify the Expr.expand method
hints['power_base'] = power_base
hints['power_exp'] = power_exp
hints['mul'] = mul
hints['log'] = log
hints['multinomial'] = multinomial
hints['basic'] = basic
return sympify(e).expand(deep=deep, modulus=modulus, **hints)
# This is a special application of two hints
def _mexpand(expr, recursive=False):
# expand multinomials and then expand products; this may not always
# be sufficient to give a fully expanded expression (see
# test_issue_8247_8354 in test_arit)
if expr is None:
return
was = None
while was != expr:
was, expr = expr, expand_mul(expand_multinomial(expr))
if not recursive:
break
return expr
# These are simple wrappers around single hints.
def expand_mul(expr, deep=True):
"""
Wrapper around expand that only uses the mul hint. See the expand
docstring for more information.
Examples
========
>>> from sympy import symbols, expand_mul, exp, log
>>> x, y = symbols('x,y', positive=True)
>>> expand_mul(exp(x+y)*(x+y)*log(x*y**2))
x*exp(x + y)*log(x*y**2) + y*exp(x + y)*log(x*y**2)
"""
return sympify(expr).expand(deep=deep, mul=True, power_exp=False,
power_base=False, basic=False, multinomial=False, log=False)
def expand_multinomial(expr, deep=True):
"""
Wrapper around expand that only uses the multinomial hint. See the expand
docstring for more information.
Examples
========
>>> from sympy import symbols, expand_multinomial, exp
>>> x, y = symbols('x y', positive=True)
>>> expand_multinomial((x + exp(x + 1))**2)
x**2 + 2*x*exp(x + 1) + exp(2*x + 2)
"""
return sympify(expr).expand(deep=deep, mul=False, power_exp=False,
power_base=False, basic=False, multinomial=True, log=False)
def expand_log(expr, deep=True, force=False):
"""
Wrapper around expand that only uses the log hint. See the expand
docstring for more information.
Examples
========
>>> from sympy import symbols, expand_log, exp, log
>>> x, y = symbols('x,y', positive=True)
>>> expand_log(exp(x+y)*(x+y)*log(x*y**2))
(x + y)*(log(x) + 2*log(y))*exp(x + y)
"""
return sympify(expr).expand(deep=deep, log=True, mul=False,
power_exp=False, power_base=False, multinomial=False,
basic=False, force=force)
def expand_func(expr, deep=True):
"""
Wrapper around expand that only uses the func hint. See the expand
docstring for more information.
Examples
========
>>> from sympy import expand_func, gamma
>>> from sympy.abc import x
>>> expand_func(gamma(x + 2))
x*(x + 1)*gamma(x)
"""
return sympify(expr).expand(deep=deep, func=True, basic=False,
log=False, mul=False, power_exp=False, power_base=False, multinomial=False)
def expand_trig(expr, deep=True):
"""
Wrapper around expand that only uses the trig hint. See the expand
docstring for more information.
Examples
========
>>> from sympy import expand_trig, sin
>>> from sympy.abc import x, y
>>> expand_trig(sin(x+y)*(x+y))
(x + y)*(sin(x)*cos(y) + sin(y)*cos(x))
"""
return sympify(expr).expand(deep=deep, trig=True, basic=False,
log=False, mul=False, power_exp=False, power_base=False, multinomial=False)
def expand_complex(expr, deep=True):
"""
Wrapper around expand that only uses the complex hint. See the expand
docstring for more information.
Examples
========
>>> from sympy import expand_complex, exp, sqrt, I
>>> from sympy.abc import z
>>> expand_complex(exp(z))
I*exp(re(z))*sin(im(z)) + exp(re(z))*cos(im(z))
>>> expand_complex(sqrt(I))
sqrt(2)/2 + sqrt(2)*I/2
See Also
========
sympy.core.expr.Expr.as_real_imag
"""
return sympify(expr).expand(deep=deep, complex=True, basic=False,
log=False, mul=False, power_exp=False, power_base=False, multinomial=False)
def expand_power_base(expr, deep=True, force=False):
"""
Wrapper around expand that only uses the power_base hint.
See the expand docstring for more information.
A wrapper to expand(power_base=True) which separates a power with a base
that is a Mul into a product of powers, without performing any other
expansions, provided that assumptions about the power's base and exponent
allow.
deep=False (default is True) will only apply to the top-level expression.
force=True (default is False) will cause the expansion to ignore
assumptions about the base and exponent. When False, the expansion will
only happen if the base is non-negative or the exponent is an integer.
>>> from sympy.abc import x, y, z
>>> from sympy import expand_power_base, sin, cos, exp
>>> (x*y)**2
x**2*y**2
>>> (2*x)**y
(2*x)**y
>>> expand_power_base(_)
2**y*x**y
>>> expand_power_base((x*y)**z)
(x*y)**z
>>> expand_power_base((x*y)**z, force=True)
x**z*y**z
>>> expand_power_base(sin((x*y)**z), deep=False)
sin((x*y)**z)
>>> expand_power_base(sin((x*y)**z), force=True)
sin(x**z*y**z)
>>> expand_power_base((2*sin(x))**y + (2*cos(x))**y)
2**y*sin(x)**y + 2**y*cos(x)**y
>>> expand_power_base((2*exp(y))**x)
2**x*exp(y)**x
>>> expand_power_base((2*cos(x))**y)
2**y*cos(x)**y
Notice that sums are left untouched. If this is not the desired behavior,
apply full ``expand()`` to the expression:
>>> expand_power_base(((x+y)*z)**2)
z**2*(x + y)**2
>>> (((x+y)*z)**2).expand()
x**2*z**2 + 2*x*y*z**2 + y**2*z**2
>>> expand_power_base((2*y)**(1+z))
2**(z + 1)*y**(z + 1)
>>> ((2*y)**(1+z)).expand()
2*2**z*y*y**z
"""
return sympify(expr).expand(deep=deep, log=False, mul=False,
power_exp=False, power_base=True, multinomial=False,
basic=False, force=force)
def expand_power_exp(expr, deep=True):
"""
Wrapper around expand that only uses the power_exp hint.
See the expand docstring for more information.
Examples
========
>>> from sympy import expand_power_exp
>>> from sympy.abc import x, y
>>> expand_power_exp(x**(y + 2))
x**2*x**y
"""
return sympify(expr).expand(deep=deep, complex=False, basic=False,
log=False, mul=False, power_exp=True, power_base=False, multinomial=False)
def count_ops(expr, visual=False):
"""
Return a representation (integer or expression) of the operations in expr.
If ``visual`` is ``False`` (default) then the sum of the coefficients of the
visual expression will be returned.
If ``visual`` is ``True`` then the number of each type of operation is shown
with the core class types (or their virtual equivalent) multiplied by the
number of times they occur.
If expr is an iterable, the sum of the op counts of the
items will be returned.
Examples
========
>>> from sympy.abc import a, b, x, y
>>> from sympy import sin, count_ops
Although there isn't a SUB object, minus signs are interpreted as
either negations or subtractions:
>>> (x - y).count_ops(visual=True)
SUB
>>> (-x).count_ops(visual=True)
NEG
Here, there are two Adds and a Pow:
>>> (1 + a + b**2).count_ops(visual=True)
2*ADD + POW
In the following, an Add, Mul, Pow and two functions:
>>> (sin(x)*x + sin(x)**2).count_ops(visual=True)
ADD + MUL + POW + 2*SIN
for a total of 5:
>>> (sin(x)*x + sin(x)**2).count_ops(visual=False)
5
Note that "what you type" is not always what you get. The expression
1/x/y is translated by sympy into 1/(x*y) so it gives a DIV and MUL rather
than two DIVs:
>>> (1/x/y).count_ops(visual=True)
DIV + MUL
The visual option can be used to demonstrate the difference in
operations for expressions in different forms. Here, the Horner
representation is compared with the expanded form of a polynomial:
>>> eq=x*(1 + x*(2 + x*(3 + x)))
>>> count_ops(eq.expand(), visual=True) - count_ops(eq, visual=True)
-MUL + 3*POW
The count_ops function also handles iterables:
>>> count_ops([x, sin(x), None, True, x + 2], visual=False)
2
>>> count_ops([x, sin(x), None, True, x + 2], visual=True)
ADD + SIN
>>> count_ops({x: sin(x), x + 2: y + 1}, visual=True)
2*ADD + SIN
"""
from sympy import Integral, Symbol
from sympy.core.relational import Relational
from sympy.simplify.radsimp import fraction
from sympy.logic.boolalg import BooleanFunction
from sympy.utilities.misc import func_name
expr = sympify(expr)
if isinstance(expr, Expr) and not expr.is_Relational:
ops = []
args = [expr]
NEG = Symbol('NEG')
DIV = Symbol('DIV')
SUB = Symbol('SUB')
ADD = Symbol('ADD')
while args:
a = args.pop()
if a.is_Rational:
#-1/3 = NEG + DIV
if a is not S.One:
if a.p < 0:
ops.append(NEG)
if a.q != 1:
ops.append(DIV)
continue
elif a.is_Mul or a.is_MatMul:
if _coeff_isneg(a):
ops.append(NEG)
if a.args[0] is S.NegativeOne:
a = a.as_two_terms()[1]
else:
a = -a
n, d = fraction(a)
if n.is_Integer:
ops.append(DIV)
if n < 0:
ops.append(NEG)
args.append(d)
continue # won't be -Mul but could be Add
elif d is not S.One:
if not d.is_Integer:
args.append(d)
ops.append(DIV)
args.append(n)
continue # could be -Mul
elif a.is_Add or a.is_MatAdd:
aargs = list(a.args)
negs = 0
for i, ai in enumerate(aargs):
if _coeff_isneg(ai):
negs += 1
args.append(-ai)
if i > 0:
ops.append(SUB)
else:
args.append(ai)
if i > 0:
ops.append(ADD)
if negs == len(aargs): # -x - y = NEG + SUB
ops.append(NEG)
elif _coeff_isneg(aargs[0]): # -x + y = SUB, but already recorded ADD
ops.append(SUB - ADD)
continue
if a.is_Pow and a.exp is S.NegativeOne:
ops.append(DIV)
args.append(a.base) # won't be -Mul but could be Add
continue
if (a.is_Mul or
a.is_Pow or
a.is_Function or
isinstance(a, Derivative) or
isinstance(a, Integral)):
o = Symbol(a.func.__name__.upper())
# count the args
if (a.is_Mul or isinstance(a, LatticeOp)):
ops.append(o*(len(a.args) - 1))
else:
ops.append(o)
if not a.is_Symbol:
args.extend(a.args)
elif isinstance(expr, Dict):
ops = [count_ops(k, visual=visual) +
count_ops(v, visual=visual) for k, v in expr.items()]
elif iterable(expr):
ops = [count_ops(i, visual=visual) for i in expr]
elif isinstance(expr, (Relational, BooleanFunction)):
ops = []
for arg in expr.args:
ops.append(count_ops(arg, visual=True))
o = Symbol(func_name(expr, short=True).upper())
ops.append(o)
elif not isinstance(expr, Basic):
ops = []
else: # it's Basic not isinstance(expr, Expr):
if not isinstance(expr, Basic):
raise TypeError("Invalid type of expr")
else:
ops = []
args = [expr]
while args:
a = args.pop()
if a.args:
o = Symbol(a.func.__name__.upper())
if a.is_Boolean:
ops.append(o*(len(a.args)-1))
else:
ops.append(o)
args.extend(a.args)
if not ops:
if visual:
return S.Zero
return 0
ops = Add(*ops)
if visual:
return ops
if ops.is_Number:
return int(ops)
return sum(int((a.args or [1])[0]) for a in Add.make_args(ops))
def nfloat(expr, n=15, exponent=False, dkeys=False):
"""Make all Rationals in expr Floats except those in exponents
(unless the exponents flag is set to True). When processing
dictionaries, don't modify the keys unless ``dkeys=True``.
Examples
========
>>> from sympy.core.function import nfloat
>>> from sympy.abc import x, y
>>> from sympy import cos, pi, sqrt
>>> nfloat(x**4 + x/2 + cos(pi/3) + 1 + sqrt(y))
x**4 + 0.5*x + sqrt(y) + 1.5
>>> nfloat(x**4 + sqrt(y), exponent=True)
x**4.0 + y**0.5
Container types are not modified:
>>> type(nfloat((1, 2))) is tuple
True
"""
from sympy.core.power import Pow
from sympy.polys.rootoftools import RootOf
from sympy import MatrixBase
kw = dict(n=n, exponent=exponent, dkeys=dkeys)
if isinstance(expr, MatrixBase):
return expr.applyfunc(lambda e: nfloat(e, **kw))
# handling of iterable containers
if iterable(expr, exclude=str):
if isinstance(expr, (dict, Dict)):
if dkeys:
args = [tuple(map(lambda i: nfloat(i, **kw), a))
for a in expr.items()]
else:
args = [(k, nfloat(v, **kw)) for k, v in expr.items()]
if isinstance(expr, dict):
return type(expr)(args)
else:
return expr.func(*args)
elif isinstance(expr, Basic):
return expr.func(*[nfloat(a, **kw) for a in expr.args])
return type(expr)([nfloat(a, **kw) for a in expr])
rv = sympify(expr)
if rv.is_Number:
return Float(rv, n)
elif rv.is_number:
# evalf doesn't always set the precision
rv = rv.n(n)
if rv.is_Number:
rv = Float(rv.n(n), n)
else:
pass # pure_complex(rv) is likely True
return rv
elif rv.is_Atom:
return rv
elif rv.is_Relational:
args_nfloat = (nfloat(arg, **kw) for arg in rv.args)
return rv.func(*args_nfloat)
# watch out for RootOf instances that don't like to have
# their exponents replaced with Dummies and also sometimes have
# problems with evaluating at low precision (issue 6393)
rv = rv.xreplace({ro: ro.n(n) for ro in rv.atoms(RootOf)})
if not exponent:
reps = [(p, Pow(p.base, Dummy())) for p in rv.atoms(Pow)]
rv = rv.xreplace(dict(reps))
rv = rv.n(n)
if not exponent:
rv = rv.xreplace({d.exp: p.exp for p, d in reps})
else:
# Pow._eval_evalf special cases Integer exponents so if
# exponent is suppose to be handled we have to do so here
rv = rv.xreplace(Transform(
lambda x: Pow(x.base, Float(x.exp, n)),
lambda x: x.is_Pow and x.exp.is_Integer))
return rv.xreplace(Transform(
lambda x: x.func(*nfloat(x.args, n, exponent)),
lambda x: isinstance(x, Function)))
from sympy.core.symbol import Dummy, Symbol
|
f1a978fcc0158364f09134230482d54f8f8f409e4b260306daa15943e5caa6c3 | import os
USE_SYMENGINE = os.getenv('USE_SYMENGINE', '0')
USE_SYMENGINE = USE_SYMENGINE.lower() in ('1', 't', 'true') # type: ignore
if USE_SYMENGINE:
from symengine import (Symbol, Integer, sympify, S,
SympifyError, exp, log, gamma, sqrt, I, E, pi, Matrix,
sin, cos, tan, cot, csc, sec, asin, acos, atan, acot, acsc, asec,
sinh, cosh, tanh, coth, asinh, acosh, atanh, acoth,
lambdify, symarray, diff, zeros, eye, diag, ones,
expand, Function, symbols, var, Add, Mul, Derivative,
ImmutableMatrix, MatrixBase, Rational, Basic)
from symengine.lib.symengine_wrapper import gcd as igcd
from symengine import AppliedUndef
else:
from sympy import (Symbol, Integer, sympify, S,
SympifyError, exp, log, gamma, sqrt, I, E, pi, Matrix,
sin, cos, tan, cot, csc, sec, asin, acos, atan, acot, acsc, asec,
sinh, cosh, tanh, coth, asinh, acosh, atanh, acoth,
lambdify, symarray, diff, zeros, eye, diag, ones,
expand, Function, symbols, var, Add, Mul, Derivative,
ImmutableMatrix, MatrixBase, Rational, Basic, igcd)
from sympy.core.function import AppliedUndef
__all__ = [
'Symbol', 'Integer', 'sympify', 'S', 'SympifyError', 'exp', 'log',
'gamma', 'sqrt', 'I', 'E', 'pi', 'Matrix', 'sin', 'cos', 'tan', 'cot',
'csc', 'sec', 'asin', 'acos', 'atan', 'acot', 'acsc', 'asec', 'sinh',
'cosh', 'tanh', 'coth', 'asinh', 'acosh', 'atanh', 'acoth', 'lambdify',
'symarray', 'diff', 'zeros', 'eye', 'diag', 'ones', 'expand', 'Function',
'symbols', 'var', 'Add', 'Mul', 'Derivative', 'ImmutableMatrix',
'MatrixBase', 'Rational', 'Basic', 'igcd', 'AppliedUndef',
]
|
ca7dc815d244132a00e29a1660767a962c7d9e35ed3555e93734740a57261072 | from __future__ import print_function, division
from collections import defaultdict
from functools import cmp_to_key
from .basic import Basic
from .compatibility import reduce, is_sequence
from .parameters import global_parameters
from .logic import _fuzzy_group, fuzzy_or, fuzzy_not
from .singleton import S
from .operations import AssocOp
from .cache import cacheit
from .numbers import ilcm, igcd
from .expr import Expr
# Key for sorting commutative args in canonical order
_args_sortkey = cmp_to_key(Basic.compare)
def _addsort(args):
# in-place sorting of args
args.sort(key=_args_sortkey)
def _unevaluated_Add(*args):
"""Return a well-formed unevaluated Add: Numbers are collected and
put in slot 0 and args are sorted. Use this when args have changed
but you still want to return an unevaluated Add.
Examples
========
>>> from sympy.core.add import _unevaluated_Add as uAdd
>>> from sympy import S, Add
>>> from sympy.abc import x, y
>>> a = uAdd(*[S(1.0), x, S(2)])
>>> a.args[0]
3.00000000000000
>>> a.args[1]
x
Beyond the Number being in slot 0, there is no other assurance of
order for the arguments since they are hash sorted. So, for testing
purposes, output produced by this in some other function can only
be tested against the output of this function or as one of several
options:
>>> opts = (Add(x, y, evaluated=False), Add(y, x, evaluated=False))
>>> a = uAdd(x, y)
>>> assert a in opts and a == uAdd(x, y)
>>> uAdd(x + 1, x + 2)
x + x + 3
"""
args = list(args)
newargs = []
co = S.Zero
while args:
a = args.pop()
if a.is_Add:
# this will keep nesting from building up
# so that x + (x + 1) -> x + x + 1 (3 args)
args.extend(a.args)
elif a.is_Number:
co += a
else:
newargs.append(a)
_addsort(newargs)
if co:
newargs.insert(0, co)
return Add._from_args(newargs)
class Add(Expr, AssocOp):
__slots__ = ()
is_Add = True
@classmethod
def flatten(cls, seq):
"""
Takes the sequence "seq" of nested Adds and returns a flatten list.
Returns: (commutative_part, noncommutative_part, order_symbols)
Applies associativity, all terms are commutable with respect to
addition.
NB: the removal of 0 is already handled by AssocOp.__new__
See also
========
sympy.core.mul.Mul.flatten
"""
from sympy.calculus.util import AccumBounds
from sympy.matrices.expressions import MatrixExpr
from sympy.tensor.tensor import TensExpr
rv = None
if len(seq) == 2:
a, b = seq
if b.is_Rational:
a, b = b, a
if a.is_Rational:
if b.is_Mul:
rv = [a, b], [], None
if rv:
if all(s.is_commutative for s in rv[0]):
return rv
return [], rv[0], None
terms = {} # term -> coeff
# e.g. x**2 -> 5 for ... + 5*x**2 + ...
coeff = S.Zero # coefficient (Number or zoo) to always be in slot 0
# e.g. 3 + ...
order_factors = []
extra = []
for o in seq:
# O(x)
if o.is_Order:
if o.expr.is_zero:
continue
for o1 in order_factors:
if o1.contains(o):
o = None
break
if o is None:
continue
order_factors = [o] + [
o1 for o1 in order_factors if not o.contains(o1)]
continue
# 3 or NaN
elif o.is_Number:
if (o is S.NaN or coeff is S.ComplexInfinity and
o.is_finite is False) and not extra:
# we know for sure the result will be nan
return [S.NaN], [], None
if coeff.is_Number or isinstance(coeff, AccumBounds):
coeff += o
if coeff is S.NaN and not extra:
# we know for sure the result will be nan
return [S.NaN], [], None
continue
elif isinstance(o, AccumBounds):
coeff = o.__add__(coeff)
continue
elif isinstance(o, MatrixExpr):
# can't add 0 to Matrix so make sure coeff is not 0
extra.append(o)
continue
elif isinstance(o, TensExpr):
coeff = o.__add__(coeff) if coeff else o
continue
elif o is S.ComplexInfinity:
if coeff.is_finite is False and not extra:
# we know for sure the result will be nan
return [S.NaN], [], None
coeff = S.ComplexInfinity
continue
# Add([...])
elif o.is_Add:
# NB: here we assume Add is always commutative
seq.extend(o.args) # TODO zerocopy?
continue
# Mul([...])
elif o.is_Mul:
c, s = o.as_coeff_Mul()
# check for unevaluated Pow, e.g. 2**3 or 2**(-1/2)
elif o.is_Pow:
b, e = o.as_base_exp()
if b.is_Number and (e.is_Integer or
(e.is_Rational and e.is_negative)):
seq.append(b**e)
continue
c, s = S.One, o
else:
# everything else
c = S.One
s = o
# now we have:
# o = c*s, where
#
# c is a Number
# s is an expression with number factor extracted
# let's collect terms with the same s, so e.g.
# 2*x**2 + 3*x**2 -> 5*x**2
if s in terms:
terms[s] += c
if terms[s] is S.NaN and not extra:
# we know for sure the result will be nan
return [S.NaN], [], None
else:
terms[s] = c
# now let's construct new args:
# [2*x**2, x**3, 7*x**4, pi, ...]
newseq = []
noncommutative = False
for s, c in terms.items():
# 0*s
if c.is_zero:
continue
# 1*s
elif c is S.One:
newseq.append(s)
# c*s
else:
if s.is_Mul:
# Mul, already keeps its arguments in perfect order.
# so we can simply put c in slot0 and go the fast way.
cs = s._new_rawargs(*((c,) + s.args))
newseq.append(cs)
elif s.is_Add:
# we just re-create the unevaluated Mul
newseq.append(Mul(c, s, evaluate=False))
else:
# alternatively we have to call all Mul's machinery (slow)
newseq.append(Mul(c, s))
noncommutative = noncommutative or not s.is_commutative
# oo, -oo
if coeff is S.Infinity:
newseq = [f for f in newseq if not (f.is_extended_nonnegative or f.is_real)]
elif coeff is S.NegativeInfinity:
newseq = [f for f in newseq if not (f.is_extended_nonpositive or f.is_real)]
if coeff is S.ComplexInfinity:
# zoo might be
# infinite_real + finite_im
# finite_real + infinite_im
# infinite_real + infinite_im
# addition of a finite real or imaginary number won't be able to
# change the zoo nature; adding an infinite qualtity would result
# in a NaN condition if it had sign opposite of the infinite
# portion of zoo, e.g., infinite_real - infinite_real.
newseq = [c for c in newseq if not (c.is_finite and
c.is_extended_real is not None)]
# process O(x)
if order_factors:
newseq2 = []
for t in newseq:
for o in order_factors:
# x + O(x) -> O(x)
if o.contains(t):
t = None
break
# x + O(x**2) -> x + O(x**2)
if t is not None:
newseq2.append(t)
newseq = newseq2 + order_factors
# 1 + O(1) -> O(1)
for o in order_factors:
if o.contains(coeff):
coeff = S.Zero
break
# order args canonically
_addsort(newseq)
# current code expects coeff to be first
if coeff is not S.Zero:
newseq.insert(0, coeff)
if extra:
newseq += extra
noncommutative = True
# we are done
if noncommutative:
return [], newseq, None
else:
return newseq, [], None
@classmethod
def class_key(cls):
"""Nice order of classes"""
return 3, 1, cls.__name__
def as_coefficients_dict(a):
"""Return a dictionary mapping terms to their Rational coefficient.
Since the dictionary is a defaultdict, inquiries about terms which
were not present will return a coefficient of 0. If an expression is
not an Add it is considered to have a single term.
Examples
========
>>> from sympy.abc import a, x
>>> (3*x + a*x + 4).as_coefficients_dict()
{1: 4, x: 3, a*x: 1}
>>> _[a]
0
>>> (3*a*x).as_coefficients_dict()
{a*x: 3}
"""
d = defaultdict(list)
for ai in a.args:
c, m = ai.as_coeff_Mul()
d[m].append(c)
for k, v in d.items():
if len(v) == 1:
d[k] = v[0]
else:
d[k] = Add(*v)
di = defaultdict(int)
di.update(d)
return di
@cacheit
def as_coeff_add(self, *deps):
"""
Returns a tuple (coeff, args) where self is treated as an Add and coeff
is the Number term and args is a tuple of all other terms.
Examples
========
>>> from sympy.abc import x
>>> (7 + 3*x).as_coeff_add()
(7, (3*x,))
>>> (7*x).as_coeff_add()
(0, (7*x,))
"""
if deps:
from sympy.utilities.iterables import sift
l1, l2 = sift(self.args, lambda x: x.has(*deps), binary=True)
return self._new_rawargs(*l2), tuple(l1)
coeff, notrat = self.args[0].as_coeff_add()
if coeff is not S.Zero:
return coeff, notrat + self.args[1:]
return S.Zero, self.args
def as_coeff_Add(self, rational=False, deps=None):
"""
Efficiently extract the coefficient of a summation.
"""
coeff, args = self.args[0], self.args[1:]
if coeff.is_Number and not rational or coeff.is_Rational:
return coeff, self._new_rawargs(*args)
return S.Zero, self
# Note, we intentionally do not implement Add.as_coeff_mul(). Rather, we
# let Expr.as_coeff_mul() just always return (S.One, self) for an Add. See
# issue 5524.
def _eval_power(self, e):
if e.is_Rational and self.is_number:
from sympy.core.evalf import pure_complex
from sympy.core.mul import _unevaluated_Mul
from sympy.core.exprtools import factor_terms
from sympy.core.function import expand_multinomial
from sympy.functions.elementary.complexes import sign
from sympy.functions.elementary.miscellaneous import sqrt
ri = pure_complex(self)
if ri:
r, i = ri
if e.q == 2:
D = sqrt(r**2 + i**2)
if D.is_Rational:
# (r, i, D) is a Pythagorean triple
root = sqrt(factor_terms((D - r)/2))**e.p
return root*expand_multinomial((
# principle value
(D + r)/abs(i) + sign(i)*S.ImaginaryUnit)**e.p)
elif e == -1:
return _unevaluated_Mul(
r - i*S.ImaginaryUnit,
1/(r**2 + i**2))
elif e.is_Number and abs(e) != 1:
# handle the Float case: (2.0 + 4*x)**e -> 4**e*(0.5 + x)**e
c, m = zip(*[i.as_coeff_Mul() for i in self.args])
if any(i.is_Float for i in c): # XXX should this always be done?
big = -1
for i in c:
if abs(i) >= big:
big = abs(i)
if big > 0 and big != 1:
from sympy.functions.elementary.complexes import sign
bigs = (big, -big)
c = [sign(i) if i in bigs else i/big for i in c]
addpow = Add(*[c*m for c, m in zip(c, m)])**e
return big**e*addpow
@cacheit
def _eval_derivative(self, s):
return self.func(*[a.diff(s) for a in self.args])
def _eval_nseries(self, x, n, logx):
terms = [t.nseries(x, n=n, logx=logx) for t in self.args]
return self.func(*terms)
def _matches_simple(self, expr, repl_dict):
# handle (w+3).matches('x+5') -> {w: x+2}
coeff, terms = self.as_coeff_add()
if len(terms) == 1:
return terms[0].matches(expr - coeff, repl_dict)
return
def matches(self, expr, repl_dict={}, old=False):
return AssocOp._matches_commutative(self, expr, repl_dict, old)
@staticmethod
def _combine_inverse(lhs, rhs):
"""
Returns lhs - rhs, but treats oo like a symbol so oo - oo
returns 0, instead of a nan.
"""
from sympy.simplify.simplify import signsimp
from sympy.core.symbol import Dummy
inf = (S.Infinity, S.NegativeInfinity)
if lhs.has(*inf) or rhs.has(*inf):
oo = Dummy('oo')
reps = {
S.Infinity: oo,
S.NegativeInfinity: -oo}
ireps = {v: k for k, v in reps.items()}
eq = signsimp(lhs.xreplace(reps) - rhs.xreplace(reps))
if eq.has(oo):
eq = eq.replace(
lambda x: x.is_Pow and x.base is oo,
lambda x: x.base)
return eq.xreplace(ireps)
else:
return signsimp(lhs - rhs)
@cacheit
def as_two_terms(self):
"""Return head and tail of self.
This is the most efficient way to get the head and tail of an
expression.
- if you want only the head, use self.args[0];
- if you want to process the arguments of the tail then use
self.as_coef_add() which gives the head and a tuple containing
the arguments of the tail when treated as an Add.
- if you want the coefficient when self is treated as a Mul
then use self.as_coeff_mul()[0]
>>> from sympy.abc import x, y
>>> (3*x - 2*y + 5).as_two_terms()
(5, 3*x - 2*y)
"""
return self.args[0], self._new_rawargs(*self.args[1:])
def as_numer_denom(self):
"""
Decomposes an expression to its numerator part and its
denominator part.
Examples
========
>>> from sympy.abc import x, y, z
>>> (x*y/z).as_numer_denom()
(x*y, z)
>>> (x*(y + 1)/y**7).as_numer_denom()
(x*(y + 1), y**7)
See Also
========
sympy.core.expr.Expr.as_numer_denom
"""
# clear rational denominator
content, expr = self.primitive()
ncon, dcon = content.as_numer_denom()
# collect numerators and denominators of the terms
nd = defaultdict(list)
for f in expr.args:
ni, di = f.as_numer_denom()
nd[di].append(ni)
# check for quick exit
if len(nd) == 1:
d, n = nd.popitem()
return self.func(
*[_keep_coeff(ncon, ni) for ni in n]), _keep_coeff(dcon, d)
# sum up the terms having a common denominator
for d, n in nd.items():
if len(n) == 1:
nd[d] = n[0]
else:
nd[d] = self.func(*n)
# assemble single numerator and denominator
denoms, numers = [list(i) for i in zip(*iter(nd.items()))]
n, d = self.func(*[Mul(*(denoms[:i] + [numers[i]] + denoms[i + 1:]))
for i in range(len(numers))]), Mul(*denoms)
return _keep_coeff(ncon, n), _keep_coeff(dcon, d)
def _eval_is_polynomial(self, syms):
return all(term._eval_is_polynomial(syms) for term in self.args)
def _eval_is_rational_function(self, syms):
return all(term._eval_is_rational_function(syms) for term in self.args)
def _eval_is_algebraic_expr(self, syms):
return all(term._eval_is_algebraic_expr(syms) for term in self.args)
# assumption methods
_eval_is_real = lambda self: _fuzzy_group(
(a.is_real for a in self.args), quick_exit=True)
_eval_is_extended_real = lambda self: _fuzzy_group(
(a.is_extended_real for a in self.args), quick_exit=True)
_eval_is_complex = lambda self: _fuzzy_group(
(a.is_complex for a in self.args), quick_exit=True)
_eval_is_antihermitian = lambda self: _fuzzy_group(
(a.is_antihermitian for a in self.args), quick_exit=True)
_eval_is_finite = lambda self: _fuzzy_group(
(a.is_finite for a in self.args), quick_exit=True)
_eval_is_hermitian = lambda self: _fuzzy_group(
(a.is_hermitian for a in self.args), quick_exit=True)
_eval_is_integer = lambda self: _fuzzy_group(
(a.is_integer for a in self.args), quick_exit=True)
_eval_is_rational = lambda self: _fuzzy_group(
(a.is_rational for a in self.args), quick_exit=True)
_eval_is_algebraic = lambda self: _fuzzy_group(
(a.is_algebraic for a in self.args), quick_exit=True)
_eval_is_commutative = lambda self: _fuzzy_group(
a.is_commutative for a in self.args)
def _eval_is_infinite(self):
sawinf = False
for a in self.args:
ainf = a.is_infinite
if ainf is None:
return None
elif ainf is True:
# infinite+infinite might not be infinite
if sawinf is True:
return None
sawinf = True
return sawinf
def _eval_is_imaginary(self):
nz = []
im_I = []
for a in self.args:
if a.is_extended_real:
if a.is_zero:
pass
elif a.is_zero is False:
nz.append(a)
else:
return
elif a.is_imaginary:
im_I.append(a*S.ImaginaryUnit)
elif (S.ImaginaryUnit*a).is_extended_real:
im_I.append(a*S.ImaginaryUnit)
else:
return
b = self.func(*nz)
if b.is_zero:
return fuzzy_not(self.func(*im_I).is_zero)
elif b.is_zero is False:
return False
def _eval_is_zero(self):
if self.is_commutative is False:
# issue 10528: there is no way to know if a nc symbol
# is zero or not
return
nz = []
z = 0
im_or_z = False
im = False
for a in self.args:
if a.is_extended_real:
if a.is_zero:
z += 1
elif a.is_zero is False:
nz.append(a)
else:
return
elif a.is_imaginary:
im = True
elif (S.ImaginaryUnit*a).is_extended_real:
im_or_z = True
else:
return
if z == len(self.args):
return True
if len(nz) == 0 or len(nz) == len(self.args):
return None
b = self.func(*nz)
if b.is_zero:
if not im_or_z and not im:
return True
if im and not im_or_z:
return False
if b.is_zero is False:
return False
def _eval_is_odd(self):
l = [f for f in self.args if not (f.is_even is True)]
if not l:
return False
if l[0].is_odd:
return self._new_rawargs(*l[1:]).is_even
def _eval_is_irrational(self):
for t in self.args:
a = t.is_irrational
if a:
others = list(self.args)
others.remove(t)
if all(x.is_rational is True for x in others):
return True
return None
if a is None:
return
return False
def _eval_is_extended_positive(self):
from sympy.core.exprtools import _monotonic_sign
if self.is_number:
return super(Add, self)._eval_is_extended_positive()
c, a = self.as_coeff_Add()
if not c.is_zero:
v = _monotonic_sign(a)
if v is not None:
s = v + c
if s != self and s.is_extended_positive and a.is_extended_nonnegative:
return True
if len(self.free_symbols) == 1:
v = _monotonic_sign(self)
if v is not None and v != self and v.is_extended_positive:
return True
pos = nonneg = nonpos = unknown_sign = False
saw_INF = set()
args = [a for a in self.args if not a.is_zero]
if not args:
return False
for a in args:
ispos = a.is_extended_positive
infinite = a.is_infinite
if infinite:
saw_INF.add(fuzzy_or((ispos, a.is_extended_nonnegative)))
if True in saw_INF and False in saw_INF:
return
if ispos:
pos = True
continue
elif a.is_extended_nonnegative:
nonneg = True
continue
elif a.is_extended_nonpositive:
nonpos = True
continue
if infinite is None:
return
unknown_sign = True
if saw_INF:
if len(saw_INF) > 1:
return
return saw_INF.pop()
elif unknown_sign:
return
elif not nonpos and not nonneg and pos:
return True
elif not nonpos and pos:
return True
elif not pos and not nonneg:
return False
def _eval_is_extended_nonnegative(self):
from sympy.core.exprtools import _monotonic_sign
if not self.is_number:
c, a = self.as_coeff_Add()
if not c.is_zero and a.is_extended_nonnegative:
v = _monotonic_sign(a)
if v is not None:
s = v + c
if s != self and s.is_extended_nonnegative:
return True
if len(self.free_symbols) == 1:
v = _monotonic_sign(self)
if v is not None and v != self and v.is_extended_nonnegative:
return True
def _eval_is_extended_nonpositive(self):
from sympy.core.exprtools import _monotonic_sign
if not self.is_number:
c, a = self.as_coeff_Add()
if not c.is_zero and a.is_extended_nonpositive:
v = _monotonic_sign(a)
if v is not None:
s = v + c
if s != self and s.is_extended_nonpositive:
return True
if len(self.free_symbols) == 1:
v = _monotonic_sign(self)
if v is not None and v != self and v.is_extended_nonpositive:
return True
def _eval_is_extended_negative(self):
from sympy.core.exprtools import _monotonic_sign
if self.is_number:
return super(Add, self)._eval_is_extended_negative()
c, a = self.as_coeff_Add()
if not c.is_zero:
v = _monotonic_sign(a)
if v is not None:
s = v + c
if s != self and s.is_extended_negative and a.is_extended_nonpositive:
return True
if len(self.free_symbols) == 1:
v = _monotonic_sign(self)
if v is not None and v != self and v.is_extended_negative:
return True
neg = nonpos = nonneg = unknown_sign = False
saw_INF = set()
args = [a for a in self.args if not a.is_zero]
if not args:
return False
for a in args:
isneg = a.is_extended_negative
infinite = a.is_infinite
if infinite:
saw_INF.add(fuzzy_or((isneg, a.is_extended_nonpositive)))
if True in saw_INF and False in saw_INF:
return
if isneg:
neg = True
continue
elif a.is_extended_nonpositive:
nonpos = True
continue
elif a.is_extended_nonnegative:
nonneg = True
continue
if infinite is None:
return
unknown_sign = True
if saw_INF:
if len(saw_INF) > 1:
return
return saw_INF.pop()
elif unknown_sign:
return
elif not nonneg and not nonpos and neg:
return True
elif not nonneg and neg:
return True
elif not neg and not nonpos:
return False
def _eval_subs(self, old, new):
if not old.is_Add:
if old is S.Infinity and -old in self.args:
# foo - oo is foo + (-oo) internally
return self.xreplace({-old: -new})
return None
coeff_self, terms_self = self.as_coeff_Add()
coeff_old, terms_old = old.as_coeff_Add()
if coeff_self.is_Rational and coeff_old.is_Rational:
if terms_self == terms_old: # (2 + a).subs( 3 + a, y) -> -1 + y
return self.func(new, coeff_self, -coeff_old)
if terms_self == -terms_old: # (2 + a).subs(-3 - a, y) -> -1 - y
return self.func(-new, coeff_self, coeff_old)
if coeff_self.is_Rational and coeff_old.is_Rational \
or coeff_self == coeff_old:
args_old, args_self = self.func.make_args(
terms_old), self.func.make_args(terms_self)
if len(args_old) < len(args_self): # (a+b+c).subs(b+c,x) -> a+x
self_set = set(args_self)
old_set = set(args_old)
if old_set < self_set:
ret_set = self_set - old_set
return self.func(new, coeff_self, -coeff_old,
*[s._subs(old, new) for s in ret_set])
args_old = self.func.make_args(
-terms_old) # (a+b+c+d).subs(-b-c,x) -> a-x+d
old_set = set(args_old)
if old_set < self_set:
ret_set = self_set - old_set
return self.func(-new, coeff_self, coeff_old,
*[s._subs(old, new) for s in ret_set])
def removeO(self):
args = [a for a in self.args if not a.is_Order]
return self._new_rawargs(*args)
def getO(self):
args = [a for a in self.args if a.is_Order]
if args:
return self._new_rawargs(*args)
@cacheit
def extract_leading_order(self, symbols, point=None):
"""
Returns the leading term and its order.
Examples
========
>>> from sympy.abc import x
>>> (x + 1 + 1/x**5).extract_leading_order(x)
((x**(-5), O(x**(-5))),)
>>> (1 + x).extract_leading_order(x)
((1, O(1)),)
>>> (x + x**2).extract_leading_order(x)
((x, O(x)),)
"""
from sympy import Order
lst = []
symbols = list(symbols if is_sequence(symbols) else [symbols])
if not point:
point = [0]*len(symbols)
seq = [(f, Order(f, *zip(symbols, point))) for f in self.args]
for ef, of in seq:
for e, o in lst:
if o.contains(of) and o != of:
of = None
break
if of is None:
continue
new_lst = [(ef, of)]
for e, o in lst:
if of.contains(o) and o != of:
continue
new_lst.append((e, o))
lst = new_lst
return tuple(lst)
def as_real_imag(self, deep=True, **hints):
"""
returns a tuple representing a complex number
Examples
========
>>> from sympy import I
>>> (7 + 9*I).as_real_imag()
(7, 9)
>>> ((1 + I)/(1 - I)).as_real_imag()
(0, 1)
>>> ((1 + 2*I)*(1 + 3*I)).as_real_imag()
(-5, 5)
"""
sargs = self.args
re_part, im_part = [], []
for term in sargs:
re, im = term.as_real_imag(deep=deep)
re_part.append(re)
im_part.append(im)
return (self.func(*re_part), self.func(*im_part))
def _eval_as_leading_term(self, x):
from sympy import expand_mul, Order
old = self
expr = expand_mul(self)
if not expr.is_Add:
return expr.as_leading_term(x)
infinite = [t for t in expr.args if t.is_infinite]
leading_terms = [t.as_leading_term(x) for t in expr.args]
min, new_expr = Order(0), 0
try:
for term in leading_terms:
order = Order(term, x)
if not min or order not in min:
min = order
new_expr = term
elif order == min:
new_expr += term
except TypeError:
return expr
new_expr=new_expr.together()
if new_expr.is_Add:
new_expr = new_expr.simplify()
if not new_expr:
# simple leading term analysis gave us cancelled terms but we have to send
# back a term, so compute the leading term (via series)
return old.compute_leading_term(x)
elif new_expr is S.NaN:
return old.func._from_args(infinite)
else:
return new_expr
def _eval_adjoint(self):
return self.func(*[t.adjoint() for t in self.args])
def _eval_conjugate(self):
return self.func(*[t.conjugate() for t in self.args])
def _eval_transpose(self):
return self.func(*[t.transpose() for t in self.args])
def _sage_(self):
s = 0
for x in self.args:
s += x._sage_()
return s
def primitive(self):
"""
Return ``(R, self/R)`` where ``R``` is the Rational GCD of ``self```.
``R`` is collected only from the leading coefficient of each term.
Examples
========
>>> from sympy.abc import x, y
>>> (2*x + 4*y).primitive()
(2, x + 2*y)
>>> (2*x/3 + 4*y/9).primitive()
(2/9, 3*x + 2*y)
>>> (2*x/3 + 4.2*y).primitive()
(1/3, 2*x + 12.6*y)
No subprocessing of term factors is performed:
>>> ((2 + 2*x)*x + 2).primitive()
(1, x*(2*x + 2) + 2)
Recursive processing can be done with the ``as_content_primitive()``
method:
>>> ((2 + 2*x)*x + 2).as_content_primitive()
(2, x*(x + 1) + 1)
See also: primitive() function in polytools.py
"""
terms = []
inf = False
for a in self.args:
c, m = a.as_coeff_Mul()
if not c.is_Rational:
c = S.One
m = a
inf = inf or m is S.ComplexInfinity
terms.append((c.p, c.q, m))
if not inf:
ngcd = reduce(igcd, [t[0] for t in terms], 0)
dlcm = reduce(ilcm, [t[1] for t in terms], 1)
else:
ngcd = reduce(igcd, [t[0] for t in terms if t[1]], 0)
dlcm = reduce(ilcm, [t[1] for t in terms if t[1]], 1)
if ngcd == dlcm == 1:
return S.One, self
if not inf:
for i, (p, q, term) in enumerate(terms):
terms[i] = _keep_coeff(Rational((p//ngcd)*(dlcm//q)), term)
else:
for i, (p, q, term) in enumerate(terms):
if q:
terms[i] = _keep_coeff(Rational((p//ngcd)*(dlcm//q)), term)
else:
terms[i] = _keep_coeff(Rational(p, q), term)
# we don't need a complete re-flattening since no new terms will join
# so we just use the same sort as is used in Add.flatten. When the
# coefficient changes, the ordering of terms may change, e.g.
# (3*x, 6*y) -> (2*y, x)
#
# We do need to make sure that term[0] stays in position 0, however.
#
if terms[0].is_Number or terms[0] is S.ComplexInfinity:
c = terms.pop(0)
else:
c = None
_addsort(terms)
if c:
terms.insert(0, c)
return Rational(ngcd, dlcm), self._new_rawargs(*terms)
def as_content_primitive(self, radical=False, clear=True):
"""Return the tuple (R, self/R) where R is the positive Rational
extracted from self. If radical is True (default is False) then
common radicals will be removed and included as a factor of the
primitive expression.
Examples
========
>>> from sympy import sqrt
>>> (3 + 3*sqrt(2)).as_content_primitive()
(3, 1 + sqrt(2))
Radical content can also be factored out of the primitive:
>>> (2*sqrt(2) + 4*sqrt(10)).as_content_primitive(radical=True)
(2, sqrt(2)*(1 + 2*sqrt(5)))
See docstring of Expr.as_content_primitive for more examples.
"""
con, prim = self.func(*[_keep_coeff(*a.as_content_primitive(
radical=radical, clear=clear)) for a in self.args]).primitive()
if not clear and not con.is_Integer and prim.is_Add:
con, d = con.as_numer_denom()
_p = prim/d
if any(a.as_coeff_Mul()[0].is_Integer for a in _p.args):
prim = _p
else:
con /= d
if radical and prim.is_Add:
# look for common radicals that can be removed
args = prim.args
rads = []
common_q = None
for m in args:
term_rads = defaultdict(list)
for ai in Mul.make_args(m):
if ai.is_Pow:
b, e = ai.as_base_exp()
if e.is_Rational and b.is_Integer:
term_rads[e.q].append(abs(int(b))**e.p)
if not term_rads:
break
if common_q is None:
common_q = set(term_rads.keys())
else:
common_q = common_q & set(term_rads.keys())
if not common_q:
break
rads.append(term_rads)
else:
# process rads
# keep only those in common_q
for r in rads:
for q in list(r.keys()):
if q not in common_q:
r.pop(q)
for q in r:
r[q] = prod(r[q])
# find the gcd of bases for each q
G = []
for q in common_q:
g = reduce(igcd, [r[q] for r in rads], 0)
if g != 1:
G.append(g**Rational(1, q))
if G:
G = Mul(*G)
args = [ai/G for ai in args]
prim = G*prim.func(*args)
return con, prim
@property
def _sorted_args(self):
from sympy.core.compatibility import default_sort_key
return tuple(sorted(self.args, key=default_sort_key))
def _eval_difference_delta(self, n, step):
from sympy.series.limitseq import difference_delta as dd
return self.func(*[dd(a, n, step) for a in self.args])
@property
def _mpc_(self):
"""
Convert self to an mpmath mpc if possible
"""
from sympy.core.numbers import I, Float
re_part, rest = self.as_coeff_Add()
im_part, imag_unit = rest.as_coeff_Mul()
if not imag_unit == I:
# ValueError may seem more reasonable but since it's a @property,
# we need to use AttributeError to keep from confusing things like
# hasattr.
raise AttributeError("Cannot convert Add to mpc. Must be of the form Number + Number*I")
return (Float(re_part)._mpf_, Float(im_part)._mpf_)
def __neg__(self):
if not global_parameters.distribute:
return super(Add, self).__neg__()
return Add(*[-i for i in self.args])
from .mul import Mul, _keep_coeff, prod
from sympy.core.numbers import Rational
|
1e830cb2ec0bad5d1bce93bcc5eb1fe084be6d694ecef7294cf8d850db157cf2 | """
Provides functionality for multidimensional usage of scalar-functions.
Read the vectorize docstring for more details.
"""
from __future__ import print_function, division
from sympy.core.decorators import wraps
def apply_on_element(f, args, kwargs, n):
"""
Returns a structure with the same dimension as the specified argument,
where each basic element is replaced by the function f applied on it. All
other arguments stay the same.
"""
# Get the specified argument.
if isinstance(n, int):
structure = args[n]
is_arg = True
elif isinstance(n, str):
structure = kwargs[n]
is_arg = False
# Define reduced function that is only dependent on the specified argument.
def f_reduced(x):
if hasattr(x, "__iter__"):
return list(map(f_reduced, x))
else:
if is_arg:
args[n] = x
else:
kwargs[n] = x
return f(*args, **kwargs)
# f_reduced will call itself recursively so that in the end f is applied to
# all basic elements.
return list(map(f_reduced, structure))
def iter_copy(structure):
"""
Returns a copy of an iterable object (also copying all embedded iterables).
"""
l = []
for i in structure:
if hasattr(i, "__iter__"):
l.append(iter_copy(i))
else:
l.append(i)
return l
def structure_copy(structure):
"""
Returns a copy of the given structure (numpy-array, list, iterable, ..).
"""
if hasattr(structure, "copy"):
return structure.copy()
return iter_copy(structure)
class vectorize:
"""
Generalizes a function taking scalars to accept multidimensional arguments.
For example
>>> from sympy import diff, sin, symbols, Function
>>> from sympy.core.multidimensional import vectorize
>>> x, y, z = symbols('x y z')
>>> f, g, h = list(map(Function, 'fgh'))
>>> @vectorize(0)
... def vsin(x):
... return sin(x)
>>> vsin([1, x, y])
[sin(1), sin(x), sin(y)]
>>> @vectorize(0, 1)
... def vdiff(f, y):
... return diff(f, y)
>>> vdiff([f(x, y, z), g(x, y, z), h(x, y, z)], [x, y, z])
[[Derivative(f(x, y, z), x), Derivative(f(x, y, z), y), Derivative(f(x, y, z), z)], [Derivative(g(x, y, z), x), Derivative(g(x, y, z), y), Derivative(g(x, y, z), z)], [Derivative(h(x, y, z), x), Derivative(h(x, y, z), y), Derivative(h(x, y, z), z)]]
"""
def __init__(self, *mdargs):
"""
The given numbers and strings characterize the arguments that will be
treated as data structures, where the decorated function will be applied
to every single element.
If no argument is given, everything is treated multidimensional.
"""
for a in mdargs:
if not isinstance(a, (int, str)):
raise TypeError("a is of invalid type")
self.mdargs = mdargs
def __call__(self, f):
"""
Returns a wrapper for the one-dimensional function that can handle
multidimensional arguments.
"""
@wraps(f)
def wrapper(*args, **kwargs):
# Get arguments that should be treated multidimensional
if self.mdargs:
mdargs = self.mdargs
else:
mdargs = range(len(args)) + kwargs.keys()
arglength = len(args)
for n in mdargs:
if isinstance(n, int):
if n >= arglength:
continue
entry = args[n]
is_arg = True
elif isinstance(n, str):
try:
entry = kwargs[n]
except KeyError:
continue
is_arg = False
if hasattr(entry, "__iter__"):
# Create now a copy of the given array and manipulate then
# the entries directly.
if is_arg:
args = list(args)
args[n] = structure_copy(entry)
else:
kwargs[n] = structure_copy(entry)
result = apply_on_element(wrapper, args, kwargs, n)
return result
return f(*args, **kwargs)
return wrapper
|
6b45cfb3ec7869e0f2fe431f519f48aea261bb9942e9d91ca4e94079a86ccd51 | from __future__ import print_function, division
from typing import Tuple as tTuple
from .sympify import sympify, _sympify, SympifyError
from .basic import Basic, Atom
from .singleton import S
from .evalf import EvalfMixin, pure_complex
from .decorators import call_highest_priority, sympify_method_args, sympify_return
from .cache import cacheit
from .compatibility import reduce, as_int, default_sort_key, Iterable
from sympy.utilities.misc import func_name
from mpmath.libmp import mpf_log, prec_to_dps
from collections import defaultdict
@sympify_method_args
class Expr(Basic, EvalfMixin):
"""
Base class for algebraic expressions.
Everything that requires arithmetic operations to be defined
should subclass this class, instead of Basic (which should be
used only for argument storage and expression manipulation, i.e.
pattern matching, substitutions, etc).
See Also
========
sympy.core.basic.Basic
"""
__slots__ = () # type: tTuple[str, ...]
is_scalar = True # self derivative is 1
@property
def _diff_wrt(self):
"""Return True if one can differentiate with respect to this
object, else False.
Subclasses such as Symbol, Function and Derivative return True
to enable derivatives wrt them. The implementation in Derivative
separates the Symbol and non-Symbol (_diff_wrt=True) variables and
temporarily converts the non-Symbols into Symbols when performing
the differentiation. By default, any object deriving from Expr
will behave like a scalar with self.diff(self) == 1. If this is
not desired then the object must also set `is_scalar = False` or
else define an _eval_derivative routine.
Note, see the docstring of Derivative for how this should work
mathematically. In particular, note that expr.subs(yourclass, Symbol)
should be well-defined on a structural level, or this will lead to
inconsistent results.
Examples
========
>>> from sympy import Expr
>>> e = Expr()
>>> e._diff_wrt
False
>>> class MyScalar(Expr):
... _diff_wrt = True
...
>>> MyScalar().diff(MyScalar())
1
>>> class MySymbol(Expr):
... _diff_wrt = True
... is_scalar = False
...
>>> MySymbol().diff(MySymbol())
Derivative(MySymbol(), MySymbol())
"""
return False
@cacheit
def sort_key(self, order=None):
coeff, expr = self.as_coeff_Mul()
if expr.is_Pow:
expr, exp = expr.args
else:
expr, exp = expr, S.One
if expr.is_Dummy:
args = (expr.sort_key(),)
elif expr.is_Atom:
args = (str(expr),)
else:
if expr.is_Add:
args = expr.as_ordered_terms(order=order)
elif expr.is_Mul:
args = expr.as_ordered_factors(order=order)
else:
args = expr.args
args = tuple(
[ default_sort_key(arg, order=order) for arg in args ])
args = (len(args), tuple(args))
exp = exp.sort_key(order=order)
return expr.class_key(), args, exp, coeff
def __hash__(self):
# hash cannot be cached using cache_it because infinite recurrence
# occurs as hash is needed for setting cache dictionary keys
h = self._mhash
if h is None:
h = hash((type(self).__name__,) + self._hashable_content())
self._mhash = h
return h
def _hashable_content(self):
"""Return a tuple of information about self that can be used to
compute the hash. If a class defines additional attributes,
like ``name`` in Symbol, then this method should be updated
accordingly to return such relevant attributes.
Defining more than _hashable_content is necessary if __eq__ has
been defined by a class. See note about this in Basic.__eq__."""
return self._args
def __eq__(self, other):
try:
other = _sympify(other)
if not isinstance(other, Expr):
return False
except (SympifyError, SyntaxError):
return False
# check for pure number expr
if not (self.is_Number and other.is_Number) and (
type(self) != type(other)):
return False
a, b = self._hashable_content(), other._hashable_content()
if a != b:
return False
# check number *in* an expression
for a, b in zip(a, b):
if not isinstance(a, Expr):
continue
if a.is_Number and type(a) != type(b):
return False
return True
# ***************
# * Arithmetics *
# ***************
# Expr and its sublcasses use _op_priority to determine which object
# passed to a binary special method (__mul__, etc.) will handle the
# operation. In general, the 'call_highest_priority' decorator will choose
# the object with the highest _op_priority to handle the call.
# Custom subclasses that want to define their own binary special methods
# should set an _op_priority value that is higher than the default.
#
# **NOTE**:
# This is a temporary fix, and will eventually be replaced with
# something better and more powerful. See issue 5510.
_op_priority = 10.0
def __pos__(self):
return self
def __neg__(self):
# Mul has its own __neg__ routine, so we just
# create a 2-args Mul with the -1 in the canonical
# slot 0.
c = self.is_commutative
return Mul._from_args((S.NegativeOne, self), c)
def __abs__(self):
from sympy import Abs
return Abs(self)
@sympify_return([('other', 'Expr')], NotImplemented)
@call_highest_priority('__radd__')
def __add__(self, other):
return Add(self, other)
@sympify_return([('other', 'Expr')], NotImplemented)
@call_highest_priority('__add__')
def __radd__(self, other):
return Add(other, self)
@sympify_return([('other', 'Expr')], NotImplemented)
@call_highest_priority('__rsub__')
def __sub__(self, other):
return Add(self, -other)
@sympify_return([('other', 'Expr')], NotImplemented)
@call_highest_priority('__sub__')
def __rsub__(self, other):
return Add(other, -self)
@sympify_return([('other', 'Expr')], NotImplemented)
@call_highest_priority('__rmul__')
def __mul__(self, other):
return Mul(self, other)
@sympify_return([('other', 'Expr')], NotImplemented)
@call_highest_priority('__mul__')
def __rmul__(self, other):
return Mul(other, self)
@sympify_return([('other', 'Expr')], NotImplemented)
@call_highest_priority('__rpow__')
def _pow(self, other):
return Pow(self, other)
def __pow__(self, other, mod=None):
if mod is None:
return self._pow(other)
try:
_self, other, mod = as_int(self), as_int(other), as_int(mod)
if other >= 0:
return pow(_self, other, mod)
else:
from sympy.core.numbers import mod_inverse
return mod_inverse(pow(_self, -other, mod), mod)
except ValueError:
power = self._pow(other)
try:
return power%mod
except TypeError:
return NotImplemented
@sympify_return([('other', 'Expr')], NotImplemented)
@call_highest_priority('__pow__')
def __rpow__(self, other):
return Pow(other, self)
@sympify_return([('other', 'Expr')], NotImplemented)
@call_highest_priority('__rdiv__')
def __div__(self, other):
return Mul(self, Pow(other, S.NegativeOne))
@sympify_return([('other', 'Expr')], NotImplemented)
@call_highest_priority('__div__')
def __rdiv__(self, other):
return Mul(other, Pow(self, S.NegativeOne))
__truediv__ = __div__
__rtruediv__ = __rdiv__
@sympify_return([('other', 'Expr')], NotImplemented)
@call_highest_priority('__rmod__')
def __mod__(self, other):
return Mod(self, other)
@sympify_return([('other', 'Expr')], NotImplemented)
@call_highest_priority('__mod__')
def __rmod__(self, other):
return Mod(other, self)
@sympify_return([('other', 'Expr')], NotImplemented)
@call_highest_priority('__rfloordiv__')
def __floordiv__(self, other):
from sympy.functions.elementary.integers import floor
return floor(self / other)
@sympify_return([('other', 'Expr')], NotImplemented)
@call_highest_priority('__floordiv__')
def __rfloordiv__(self, other):
from sympy.functions.elementary.integers import floor
return floor(other / self)
@sympify_return([('other', 'Expr')], NotImplemented)
@call_highest_priority('__rdivmod__')
def __divmod__(self, other):
from sympy.functions.elementary.integers import floor
return floor(self / other), Mod(self, other)
@sympify_return([('other', 'Expr')], NotImplemented)
@call_highest_priority('__divmod__')
def __rdivmod__(self, other):
from sympy.functions.elementary.integers import floor
return floor(other / self), Mod(other, self)
def __int__(self):
# Although we only need to round to the units position, we'll
# get one more digit so the extra testing below can be avoided
# unless the rounded value rounded to an integer, e.g. if an
# expression were equal to 1.9 and we rounded to the unit position
# we would get a 2 and would not know if this rounded up or not
# without doing a test (as done below). But if we keep an extra
# digit we know that 1.9 is not the same as 1 and there is no
# need for further testing: our int value is correct. If the value
# were 1.99, however, this would round to 2.0 and our int value is
# off by one. So...if our round value is the same as the int value
# (regardless of how much extra work we do to calculate extra decimal
# places) we need to test whether we are off by one.
from sympy import Dummy
if not self.is_number:
raise TypeError("can't convert symbols to int")
r = self.round(2)
if not r.is_Number:
raise TypeError("can't convert complex to int")
if r in (S.NaN, S.Infinity, S.NegativeInfinity):
raise TypeError("can't convert %s to int" % r)
i = int(r)
if not i:
return 0
# off-by-one check
if i == r and not (self - i).equals(0):
isign = 1 if i > 0 else -1
x = Dummy()
# in the following (self - i).evalf(2) will not always work while
# (self - r).evalf(2) and the use of subs does; if the test that
# was added when this comment was added passes, it might be safe
# to simply use sign to compute this rather than doing this by hand:
diff_sign = 1 if (self - x).evalf(2, subs={x: i}) > 0 else -1
if diff_sign != isign:
i -= isign
return i
__long__ = __int__
def __float__(self):
# Don't bother testing if it's a number; if it's not this is going
# to fail, and if it is we still need to check that it evalf'ed to
# a number.
result = self.evalf()
if result.is_Number:
return float(result)
if result.is_number and result.as_real_imag()[1]:
raise TypeError("can't convert complex to float")
raise TypeError("can't convert expression to float")
def __complex__(self):
result = self.evalf()
re, im = result.as_real_imag()
return complex(float(re), float(im))
def _cmp(self, other, op, cls):
assert op in ("<", ">", "<=", ">=")
try:
other = _sympify(other)
except SympifyError:
return NotImplemented
if not isinstance(other, Expr):
return NotImplemented
for me in (self, other):
if me.is_extended_real is False:
raise TypeError("Invalid comparison of non-real %s" % me)
if me is S.NaN:
raise TypeError("Invalid NaN comparison")
n2 = _n2(self, other)
if n2 is not None:
# use float comparison for infinity.
# otherwise get stuck in infinite recursion
if n2 in (S.Infinity, S.NegativeInfinity):
n2 = float(n2)
if op == "<":
return _sympify(n2 < 0)
elif op == ">":
return _sympify(n2 > 0)
elif op == "<=":
return _sympify(n2 <= 0)
else: # >=
return _sympify(n2 >= 0)
if self.is_extended_real and other.is_extended_real:
if op in ("<=", ">") \
and ((self.is_infinite and self.is_extended_negative) \
or (other.is_infinite and other.is_extended_positive)):
return S.true if op == "<=" else S.false
if op in ("<", ">=") \
and ((self.is_infinite and self.is_extended_positive) \
or (other.is_infinite and other.is_extended_negative)):
return S.true if op == ">=" else S.false
diff = self - other
if diff is not S.NaN:
if op == "<":
test = diff.is_extended_negative
elif op == ">":
test = diff.is_extended_positive
elif op == "<=":
test = diff.is_extended_nonpositive
else: # >=
test = diff.is_extended_nonnegative
if test is not None:
return S.true if test == True else S.false
# return unevaluated comparison object
return cls(self, other, evaluate=False)
def __ge__(self, other):
from sympy import GreaterThan
return self._cmp(other, ">=", GreaterThan)
def __le__(self, other):
from sympy import LessThan
return self._cmp(other, "<=", LessThan)
def __gt__(self, other):
from sympy import StrictGreaterThan
return self._cmp(other, ">", StrictGreaterThan)
def __lt__(self, other):
from sympy import StrictLessThan
return self._cmp(other, "<", StrictLessThan)
def __trunc__(self):
if not self.is_number:
raise TypeError("can't truncate symbols and expressions")
else:
return Integer(self)
@staticmethod
def _from_mpmath(x, prec):
from sympy import Float
if hasattr(x, "_mpf_"):
return Float._new(x._mpf_, prec)
elif hasattr(x, "_mpc_"):
re, im = x._mpc_
re = Float._new(re, prec)
im = Float._new(im, prec)*S.ImaginaryUnit
return re + im
else:
raise TypeError("expected mpmath number (mpf or mpc)")
@property
def is_number(self):
"""Returns True if ``self`` has no free symbols and no
undefined functions (AppliedUndef, to be precise). It will be
faster than ``if not self.free_symbols``, however, since
``is_number`` will fail as soon as it hits a free symbol
or undefined function.
Examples
========
>>> from sympy import log, Integral, cos, sin, pi
>>> from sympy.core.function import Function
>>> from sympy.abc import x
>>> f = Function('f')
>>> x.is_number
False
>>> f(1).is_number
False
>>> (2*x).is_number
False
>>> (2 + Integral(2, x)).is_number
False
>>> (2 + Integral(2, (x, 1, 2))).is_number
True
Not all numbers are Numbers in the SymPy sense:
>>> pi.is_number, pi.is_Number
(True, False)
If something is a number it should evaluate to a number with
real and imaginary parts that are Numbers; the result may not
be comparable, however, since the real and/or imaginary part
of the result may not have precision.
>>> cos(1).is_number and cos(1).is_comparable
True
>>> z = cos(1)**2 + sin(1)**2 - 1
>>> z.is_number
True
>>> z.is_comparable
False
See Also
========
sympy.core.basic.Basic.is_comparable
"""
return all(obj.is_number for obj in self.args)
def _random(self, n=None, re_min=-1, im_min=-1, re_max=1, im_max=1):
"""Return self evaluated, if possible, replacing free symbols with
random complex values, if necessary.
The random complex value for each free symbol is generated
by the random_complex_number routine giving real and imaginary
parts in the range given by the re_min, re_max, im_min, and im_max
values. The returned value is evaluated to a precision of n
(if given) else the maximum of 15 and the precision needed
to get more than 1 digit of precision. If the expression
could not be evaluated to a number, or could not be evaluated
to more than 1 digit of precision, then None is returned.
Examples
========
>>> from sympy import sqrt
>>> from sympy.abc import x, y
>>> x._random() # doctest: +SKIP
0.0392918155679172 + 0.916050214307199*I
>>> x._random(2) # doctest: +SKIP
-0.77 - 0.87*I
>>> (x + y/2)._random(2) # doctest: +SKIP
-0.57 + 0.16*I
>>> sqrt(2)._random(2)
1.4
See Also
========
sympy.testing.randtest.random_complex_number
"""
free = self.free_symbols
prec = 1
if free:
from sympy.testing.randtest import random_complex_number
a, c, b, d = re_min, re_max, im_min, im_max
reps = dict(list(zip(free, [random_complex_number(a, b, c, d, rational=True)
for zi in free])))
try:
nmag = abs(self.evalf(2, subs=reps))
except (ValueError, TypeError):
# if an out of range value resulted in evalf problems
# then return None -- XXX is there a way to know how to
# select a good random number for a given expression?
# e.g. when calculating n! negative values for n should not
# be used
return None
else:
reps = {}
nmag = abs(self.evalf(2))
if not hasattr(nmag, '_prec'):
# e.g. exp_polar(2*I*pi) doesn't evaluate but is_number is True
return None
if nmag._prec == 1:
# increase the precision up to the default maximum
# precision to see if we can get any significance
from mpmath.libmp.libintmath import giant_steps
from sympy.core.evalf import DEFAULT_MAXPREC as target
# evaluate
for prec in giant_steps(2, target):
nmag = abs(self.evalf(prec, subs=reps))
if nmag._prec != 1:
break
if nmag._prec != 1:
if n is None:
n = max(prec, 15)
return self.evalf(n, subs=reps)
# never got any significance
return None
def is_constant(self, *wrt, **flags):
"""Return True if self is constant, False if not, or None if
the constancy could not be determined conclusively.
If an expression has no free symbols then it is a constant. If
there are free symbols it is possible that the expression is a
constant, perhaps (but not necessarily) zero. To test such
expressions, a few strategies are tried:
1) numerical evaluation at two random points. If two such evaluations
give two different values and the values have a precision greater than
1 then self is not constant. If the evaluations agree or could not be
obtained with any precision, no decision is made. The numerical testing
is done only if ``wrt`` is different than the free symbols.
2) differentiation with respect to variables in 'wrt' (or all free
symbols if omitted) to see if the expression is constant or not. This
will not always lead to an expression that is zero even though an
expression is constant (see added test in test_expr.py). If
all derivatives are zero then self is constant with respect to the
given symbols.
3) finding out zeros of denominator expression with free_symbols.
It won't be constant if there are zeros. It gives more negative
answers for expression that are not constant.
If neither evaluation nor differentiation can prove the expression is
constant, None is returned unless two numerical values happened to be
the same and the flag ``failing_number`` is True -- in that case the
numerical value will be returned.
If flag simplify=False is passed, self will not be simplified;
the default is True since self should be simplified before testing.
Examples
========
>>> from sympy import cos, sin, Sum, S, pi
>>> from sympy.abc import a, n, x, y
>>> x.is_constant()
False
>>> S(2).is_constant()
True
>>> Sum(x, (x, 1, 10)).is_constant()
True
>>> Sum(x, (x, 1, n)).is_constant()
False
>>> Sum(x, (x, 1, n)).is_constant(y)
True
>>> Sum(x, (x, 1, n)).is_constant(n)
False
>>> Sum(x, (x, 1, n)).is_constant(x)
True
>>> eq = a*cos(x)**2 + a*sin(x)**2 - a
>>> eq.is_constant()
True
>>> eq.subs({x: pi, a: 2}) == eq.subs({x: pi, a: 3}) == 0
True
>>> (0**x).is_constant()
False
>>> x.is_constant()
False
>>> (x**x).is_constant()
False
>>> one = cos(x)**2 + sin(x)**2
>>> one.is_constant()
True
>>> ((one - 1)**(x + 1)).is_constant() in (True, False) # could be 0 or 1
True
"""
def check_denominator_zeros(expression):
from sympy.solvers.solvers import denoms
retNone = False
for den in denoms(expression):
z = den.is_zero
if z is True:
return True
if z is None:
retNone = True
if retNone:
return None
return False
simplify = flags.get('simplify', True)
if self.is_number:
return True
free = self.free_symbols
if not free:
return True # assume f(1) is some constant
# if we are only interested in some symbols and they are not in the
# free symbols then this expression is constant wrt those symbols
wrt = set(wrt)
if wrt and not wrt & free:
return True
wrt = wrt or free
# simplify unless this has already been done
expr = self
if simplify:
expr = expr.simplify()
# is_zero should be a quick assumptions check; it can be wrong for
# numbers (see test_is_not_constant test), giving False when it
# shouldn't, but hopefully it will never give True unless it is sure.
if expr.is_zero:
return True
# try numerical evaluation to see if we get two different values
failing_number = None
if wrt == free:
# try 0 (for a) and 1 (for b)
try:
a = expr.subs(list(zip(free, [0]*len(free))),
simultaneous=True)
if a is S.NaN:
# evaluation may succeed when substitution fails
a = expr._random(None, 0, 0, 0, 0)
except ZeroDivisionError:
a = None
if a is not None and a is not S.NaN:
try:
b = expr.subs(list(zip(free, [1]*len(free))),
simultaneous=True)
if b is S.NaN:
# evaluation may succeed when substitution fails
b = expr._random(None, 1, 0, 1, 0)
except ZeroDivisionError:
b = None
if b is not None and b is not S.NaN and b.equals(a) is False:
return False
# try random real
b = expr._random(None, -1, 0, 1, 0)
if b is not None and b is not S.NaN and b.equals(a) is False:
return False
# try random complex
b = expr._random()
if b is not None and b is not S.NaN:
if b.equals(a) is False:
return False
failing_number = a if a.is_number else b
# now we will test each wrt symbol (or all free symbols) to see if the
# expression depends on them or not using differentiation. This is
# not sufficient for all expressions, however, so we don't return
# False if we get a derivative other than 0 with free symbols.
for w in wrt:
deriv = expr.diff(w)
if simplify:
deriv = deriv.simplify()
if deriv != 0:
if not (pure_complex(deriv, or_real=True)):
if flags.get('failing_number', False):
return failing_number
elif deriv.free_symbols:
# dead line provided _random returns None in such cases
return None
return False
cd = check_denominator_zeros(self)
if cd is True:
return False
elif cd is None:
return None
return True
def equals(self, other, failing_expression=False):
"""Return True if self == other, False if it doesn't, or None. If
failing_expression is True then the expression which did not simplify
to a 0 will be returned instead of None.
If ``self`` is a Number (or complex number) that is not zero, then
the result is False.
If ``self`` is a number and has not evaluated to zero, evalf will be
used to test whether the expression evaluates to zero. If it does so
and the result has significance (i.e. the precision is either -1, for
a Rational result, or is greater than 1) then the evalf value will be
used to return True or False.
"""
from sympy.simplify.simplify import nsimplify, simplify
from sympy.solvers.solvers import solve
from sympy.polys.polyerrors import NotAlgebraic
from sympy.polys.numberfields import minimal_polynomial
other = sympify(other)
if self == other:
return True
# they aren't the same so see if we can make the difference 0;
# don't worry about doing simplification steps one at a time
# because if the expression ever goes to 0 then the subsequent
# simplification steps that are done will be very fast.
diff = factor_terms(simplify(self - other), radical=True)
if not diff:
return True
if not diff.has(Add, Mod):
# if there is no expanding to be done after simplifying
# then this can't be a zero
return False
constant = diff.is_constant(simplify=False, failing_number=True)
if constant is False:
return False
if not diff.is_number:
if constant is None:
# e.g. unless the right simplification is done, a symbolic
# zero is possible (see expression of issue 6829: without
# simplification constant will be None).
return
if constant is True:
# this gives a number whether there are free symbols or not
ndiff = diff._random()
# is_comparable will work whether the result is real
# or complex; it could be None, however.
if ndiff and ndiff.is_comparable:
return False
# sometimes we can use a simplified result to give a clue as to
# what the expression should be; if the expression is *not* zero
# then we should have been able to compute that and so now
# we can just consider the cases where the approximation appears
# to be zero -- we try to prove it via minimal_polynomial.
#
# removed
# ns = nsimplify(diff)
# if diff.is_number and (not ns or ns == diff):
#
# The thought was that if it nsimplifies to 0 that's a sure sign
# to try the following to prove it; or if it changed but wasn't
# zero that might be a sign that it's not going to be easy to
# prove. But tests seem to be working without that logic.
#
if diff.is_number:
# try to prove via self-consistency
surds = [s for s in diff.atoms(Pow) if s.args[0].is_Integer]
# it seems to work better to try big ones first
surds.sort(key=lambda x: -x.args[0])
for s in surds:
try:
# simplify is False here -- this expression has already
# been identified as being hard to identify as zero;
# we will handle the checking ourselves using nsimplify
# to see if we are in the right ballpark or not and if so
# *then* the simplification will be attempted.
sol = solve(diff, s, simplify=False)
if sol:
if s in sol:
# the self-consistent result is present
return True
if all(si.is_Integer for si in sol):
# perfect powers are removed at instantiation
# so surd s cannot be an integer
return False
if all(i.is_algebraic is False for i in sol):
# a surd is algebraic
return False
if any(si in surds for si in sol):
# it wasn't equal to s but it is in surds
# and different surds are not equal
return False
if any(nsimplify(s - si) == 0 and
simplify(s - si) == 0 for si in sol):
return True
if s.is_real:
if any(nsimplify(si, [s]) == s and simplify(si) == s
for si in sol):
return True
except NotImplementedError:
pass
# try to prove with minimal_polynomial but know when
# *not* to use this or else it can take a long time. e.g. issue 8354
if True: # change True to condition that assures non-hang
try:
mp = minimal_polynomial(diff)
if mp.is_Symbol:
return True
return False
except (NotAlgebraic, NotImplementedError):
pass
# diff has not simplified to zero; constant is either None, True
# or the number with significance (is_comparable) that was randomly
# calculated twice as the same value.
if constant not in (True, None) and constant != 0:
return False
if failing_expression:
return diff
return None
def _eval_is_positive(self):
finite = self.is_finite
if finite is False:
return False
extended_positive = self.is_extended_positive
if finite is True:
return extended_positive
if extended_positive is False:
return False
def _eval_is_negative(self):
finite = self.is_finite
if finite is False:
return False
extended_negative = self.is_extended_negative
if finite is True:
return extended_negative
if extended_negative is False:
return False
def _eval_is_extended_positive_negative(self, positive):
from sympy.polys.numberfields import minimal_polynomial
from sympy.polys.polyerrors import NotAlgebraic
if self.is_number:
if self.is_extended_real is False:
return False
# check to see that we can get a value
try:
n2 = self._eval_evalf(2)
# XXX: This shouldn't be caught here
# Catches ValueError: hypsum() failed to converge to the requested
# 34 bits of accuracy
except ValueError:
return None
if n2 is None:
return None
if getattr(n2, '_prec', 1) == 1: # no significance
return None
if n2 is S.NaN:
return None
r, i = self.evalf(2).as_real_imag()
if not i.is_Number or not r.is_Number:
return False
if r._prec != 1 and i._prec != 1:
return bool(not i and ((r > 0) if positive else (r < 0)))
elif r._prec == 1 and (not i or i._prec == 1) and \
self.is_algebraic and not self.has(Function):
try:
if minimal_polynomial(self).is_Symbol:
return False
except (NotAlgebraic, NotImplementedError):
pass
def _eval_is_extended_positive(self):
return self._eval_is_extended_positive_negative(positive=True)
def _eval_is_extended_negative(self):
return self._eval_is_extended_positive_negative(positive=False)
def _eval_interval(self, x, a, b):
"""
Returns evaluation over an interval. For most functions this is:
self.subs(x, b) - self.subs(x, a),
possibly using limit() if NaN is returned from subs, or if
singularities are found between a and b.
If b or a is None, it only evaluates -self.subs(x, a) or self.subs(b, x),
respectively.
"""
from sympy.series import limit, Limit
from sympy.solvers.solveset import solveset
from sympy.sets.sets import Interval
from sympy.functions.elementary.exponential import log
from sympy.calculus.util import AccumBounds
if (a is None and b is None):
raise ValueError('Both interval ends cannot be None.')
def _eval_endpoint(left):
c = a if left else b
if c is None:
return 0
else:
C = self.subs(x, c)
if C.has(S.NaN, S.Infinity, S.NegativeInfinity,
S.ComplexInfinity, AccumBounds):
if (a < b) != False:
C = limit(self, x, c, "+" if left else "-")
else:
C = limit(self, x, c, "-" if left else "+")
if isinstance(C, Limit):
raise NotImplementedError("Could not compute limit")
return C
if a == b:
return 0
A = _eval_endpoint(left=True)
if A is S.NaN:
return A
B = _eval_endpoint(left=False)
if (a and b) is None:
return B - A
value = B - A
if a.is_comparable and b.is_comparable:
if a < b:
domain = Interval(a, b)
else:
domain = Interval(b, a)
# check the singularities of self within the interval
# if singularities is a ConditionSet (not iterable), catch the exception and pass
singularities = solveset(self.cancel().as_numer_denom()[1], x,
domain=domain)
for logterm in self.atoms(log):
singularities = singularities | solveset(logterm.args[0], x,
domain=domain)
try:
for s in singularities:
if value is S.NaN:
# no need to keep adding, it will stay NaN
break
if not s.is_comparable:
continue
if (a < s) == (s < b) == True:
value += -limit(self, x, s, "+") + limit(self, x, s, "-")
elif (b < s) == (s < a) == True:
value += limit(self, x, s, "+") - limit(self, x, s, "-")
except TypeError:
pass
return value
def _eval_power(self, other):
# subclass to compute self**other for cases when
# other is not NaN, 0, or 1
return None
def _eval_conjugate(self):
if self.is_extended_real:
return self
elif self.is_imaginary:
return -self
def conjugate(self):
"""Returns the complex conjugate of 'self'."""
from sympy.functions.elementary.complexes import conjugate as c
return c(self)
def _eval_transpose(self):
from sympy.functions.elementary.complexes import conjugate
if (self.is_complex or self.is_infinite):
return self
elif self.is_hermitian:
return conjugate(self)
elif self.is_antihermitian:
return -conjugate(self)
def transpose(self):
from sympy.functions.elementary.complexes import transpose
return transpose(self)
def _eval_adjoint(self):
from sympy.functions.elementary.complexes import conjugate, transpose
if self.is_hermitian:
return self
elif self.is_antihermitian:
return -self
obj = self._eval_conjugate()
if obj is not None:
return transpose(obj)
obj = self._eval_transpose()
if obj is not None:
return conjugate(obj)
def adjoint(self):
from sympy.functions.elementary.complexes import adjoint
return adjoint(self)
@classmethod
def _parse_order(cls, order):
"""Parse and configure the ordering of terms. """
from sympy.polys.orderings import monomial_key
startswith = getattr(order, "startswith", None)
if startswith is None:
reverse = False
else:
reverse = startswith('rev-')
if reverse:
order = order[4:]
monom_key = monomial_key(order)
def neg(monom):
result = []
for m in monom:
if isinstance(m, tuple):
result.append(neg(m))
else:
result.append(-m)
return tuple(result)
def key(term):
_, ((re, im), monom, ncpart) = term
monom = neg(monom_key(monom))
ncpart = tuple([e.sort_key(order=order) for e in ncpart])
coeff = ((bool(im), im), (re, im))
return monom, ncpart, coeff
return key, reverse
def as_ordered_factors(self, order=None):
"""Return list of ordered factors (if Mul) else [self]."""
return [self]
def as_poly(self, *gens, **args):
"""Converts ``self`` to a polynomial or returns ``None``.
>>> from sympy import sin
>>> from sympy.abc import x, y
>>> print((x**2 + x*y).as_poly())
Poly(x**2 + x*y, x, y, domain='ZZ')
>>> print((x**2 + x*y).as_poly(x, y))
Poly(x**2 + x*y, x, y, domain='ZZ')
>>> print((x**2 + sin(y)).as_poly(x, y))
None
"""
from sympy.polys import Poly, PolynomialError
try:
poly = Poly(self, *gens, **args)
if not poly.is_Poly:
return None
else:
return poly
except PolynomialError:
return None
def as_ordered_terms(self, order=None, data=False):
"""
Transform an expression to an ordered list of terms.
Examples
========
>>> from sympy import sin, cos
>>> from sympy.abc import x
>>> (sin(x)**2*cos(x) + sin(x)**2 + 1).as_ordered_terms()
[sin(x)**2*cos(x), sin(x)**2, 1]
"""
from .numbers import Number, NumberSymbol
if order is None and self.is_Add:
# Spot the special case of Add(Number, Mul(Number, expr)) with the
# first number positive and thhe second number nagative
key = lambda x:not isinstance(x, (Number, NumberSymbol))
add_args = sorted(Add.make_args(self), key=key)
if (len(add_args) == 2
and isinstance(add_args[0], (Number, NumberSymbol))
and isinstance(add_args[1], Mul)):
mul_args = sorted(Mul.make_args(add_args[1]), key=key)
if (len(mul_args) == 2
and isinstance(mul_args[0], Number)
and add_args[0].is_positive
and mul_args[0].is_negative):
return add_args
key, reverse = self._parse_order(order)
terms, gens = self.as_terms()
if not any(term.is_Order for term, _ in terms):
ordered = sorted(terms, key=key, reverse=reverse)
else:
_terms, _order = [], []
for term, repr in terms:
if not term.is_Order:
_terms.append((term, repr))
else:
_order.append((term, repr))
ordered = sorted(_terms, key=key, reverse=True) \
+ sorted(_order, key=key, reverse=True)
if data:
return ordered, gens
else:
return [term for term, _ in ordered]
def as_terms(self):
"""Transform an expression to a list of terms. """
from .add import Add
from .mul import Mul
from .exprtools import decompose_power
gens, terms = set([]), []
for term in Add.make_args(self):
coeff, _term = term.as_coeff_Mul()
coeff = complex(coeff)
cpart, ncpart = {}, []
if _term is not S.One:
for factor in Mul.make_args(_term):
if factor.is_number:
try:
coeff *= complex(factor)
except (TypeError, ValueError):
pass
else:
continue
if factor.is_commutative:
base, exp = decompose_power(factor)
cpart[base] = exp
gens.add(base)
else:
ncpart.append(factor)
coeff = coeff.real, coeff.imag
ncpart = tuple(ncpart)
terms.append((term, (coeff, cpart, ncpart)))
gens = sorted(gens, key=default_sort_key)
k, indices = len(gens), {}
for i, g in enumerate(gens):
indices[g] = i
result = []
for term, (coeff, cpart, ncpart) in terms:
monom = [0]*k
for base, exp in cpart.items():
monom[indices[base]] = exp
result.append((term, (coeff, tuple(monom), ncpart)))
return result, gens
def removeO(self):
"""Removes the additive O(..) symbol if there is one"""
return self
def getO(self):
"""Returns the additive O(..) symbol if there is one, else None."""
return None
def getn(self):
"""
Returns the order of the expression.
The order is determined either from the O(...) term. If there
is no O(...) term, it returns None.
Examples
========
>>> from sympy import O
>>> from sympy.abc import x
>>> (1 + x + O(x**2)).getn()
2
>>> (1 + x).getn()
"""
from sympy import Dummy, Symbol
o = self.getO()
if o is None:
return None
elif o.is_Order:
o = o.expr
if o is S.One:
return S.Zero
if o.is_Symbol:
return S.One
if o.is_Pow:
return o.args[1]
if o.is_Mul: # x**n*log(x)**n or x**n/log(x)**n
for oi in o.args:
if oi.is_Symbol:
return S.One
if oi.is_Pow:
syms = oi.atoms(Symbol)
if len(syms) == 1:
x = syms.pop()
oi = oi.subs(x, Dummy('x', positive=True))
if oi.base.is_Symbol and oi.exp.is_Rational:
return abs(oi.exp)
raise NotImplementedError('not sure of order of %s' % o)
def count_ops(self, visual=None):
"""wrapper for count_ops that returns the operation count."""
from .function import count_ops
return count_ops(self, visual)
def args_cnc(self, cset=False, warn=True, split_1=True):
"""Return [commutative factors, non-commutative factors] of self.
self is treated as a Mul and the ordering of the factors is maintained.
If ``cset`` is True the commutative factors will be returned in a set.
If there were repeated factors (as may happen with an unevaluated Mul)
then an error will be raised unless it is explicitly suppressed by
setting ``warn`` to False.
Note: -1 is always separated from a Number unless split_1 is False.
>>> from sympy import symbols, oo
>>> A, B = symbols('A B', commutative=0)
>>> x, y = symbols('x y')
>>> (-2*x*y).args_cnc()
[[-1, 2, x, y], []]
>>> (-2.5*x).args_cnc()
[[-1, 2.5, x], []]
>>> (-2*x*A*B*y).args_cnc()
[[-1, 2, x, y], [A, B]]
>>> (-2*x*A*B*y).args_cnc(split_1=False)
[[-2, x, y], [A, B]]
>>> (-2*x*y).args_cnc(cset=True)
[{-1, 2, x, y}, []]
The arg is always treated as a Mul:
>>> (-2 + x + A).args_cnc()
[[], [x - 2 + A]]
>>> (-oo).args_cnc() # -oo is a singleton
[[-1, oo], []]
"""
if self.is_Mul:
args = list(self.args)
else:
args = [self]
for i, mi in enumerate(args):
if not mi.is_commutative:
c = args[:i]
nc = args[i:]
break
else:
c = args
nc = []
if c and split_1 and (
c[0].is_Number and
c[0].is_extended_negative and
c[0] is not S.NegativeOne):
c[:1] = [S.NegativeOne, -c[0]]
if cset:
clen = len(c)
c = set(c)
if clen and warn and len(c) != clen:
raise ValueError('repeated commutative arguments: %s' %
[ci for ci in c if list(self.args).count(ci) > 1])
return [c, nc]
def coeff(self, x, n=1, right=False):
"""
Returns the coefficient from the term(s) containing ``x**n``. If ``n``
is zero then all terms independent of ``x`` will be returned.
When ``x`` is noncommutative, the coefficient to the left (default) or
right of ``x`` can be returned. The keyword 'right' is ignored when
``x`` is commutative.
See Also
========
as_coefficient: separate the expression into a coefficient and factor
as_coeff_Add: separate the additive constant from an expression
as_coeff_Mul: separate the multiplicative constant from an expression
as_independent: separate x-dependent terms/factors from others
sympy.polys.polytools.Poly.coeff_monomial: efficiently find the single coefficient of a monomial in Poly
sympy.polys.polytools.Poly.nth: like coeff_monomial but powers of monomial terms are used
Examples
========
>>> from sympy import symbols
>>> from sympy.abc import x, y, z
You can select terms that have an explicit negative in front of them:
>>> (-x + 2*y).coeff(-1)
x
>>> (x - 2*y).coeff(-1)
2*y
You can select terms with no Rational coefficient:
>>> (x + 2*y).coeff(1)
x
>>> (3 + 2*x + 4*x**2).coeff(1)
0
You can select terms independent of x by making n=0; in this case
expr.as_independent(x)[0] is returned (and 0 will be returned instead
of None):
>>> (3 + 2*x + 4*x**2).coeff(x, 0)
3
>>> eq = ((x + 1)**3).expand() + 1
>>> eq
x**3 + 3*x**2 + 3*x + 2
>>> [eq.coeff(x, i) for i in reversed(range(4))]
[1, 3, 3, 2]
>>> eq -= 2
>>> [eq.coeff(x, i) for i in reversed(range(4))]
[1, 3, 3, 0]
You can select terms that have a numerical term in front of them:
>>> (-x - 2*y).coeff(2)
-y
>>> from sympy import sqrt
>>> (x + sqrt(2)*x).coeff(sqrt(2))
x
The matching is exact:
>>> (3 + 2*x + 4*x**2).coeff(x)
2
>>> (3 + 2*x + 4*x**2).coeff(x**2)
4
>>> (3 + 2*x + 4*x**2).coeff(x**3)
0
>>> (z*(x + y)**2).coeff((x + y)**2)
z
>>> (z*(x + y)**2).coeff(x + y)
0
In addition, no factoring is done, so 1 + z*(1 + y) is not obtained
from the following:
>>> (x + z*(x + x*y)).coeff(x)
1
If such factoring is desired, factor_terms can be used first:
>>> from sympy import factor_terms
>>> factor_terms(x + z*(x + x*y)).coeff(x)
z*(y + 1) + 1
>>> n, m, o = symbols('n m o', commutative=False)
>>> n.coeff(n)
1
>>> (3*n).coeff(n)
3
>>> (n*m + m*n*m).coeff(n) # = (1 + m)*n*m
1 + m
>>> (n*m + m*n*m).coeff(n, right=True) # = (1 + m)*n*m
m
If there is more than one possible coefficient 0 is returned:
>>> (n*m + m*n).coeff(n)
0
If there is only one possible coefficient, it is returned:
>>> (n*m + x*m*n).coeff(m*n)
x
>>> (n*m + x*m*n).coeff(m*n, right=1)
1
"""
x = sympify(x)
if not isinstance(x, Basic):
return S.Zero
n = as_int(n)
if not x:
return S.Zero
if x == self:
if n == 1:
return S.One
return S.Zero
if x is S.One:
co = [a for a in Add.make_args(self)
if a.as_coeff_Mul()[0] is S.One]
if not co:
return S.Zero
return Add(*co)
if n == 0:
if x.is_Add and self.is_Add:
c = self.coeff(x, right=right)
if not c:
return S.Zero
if not right:
return self - Add(*[a*x for a in Add.make_args(c)])
return self - Add(*[x*a for a in Add.make_args(c)])
return self.as_independent(x, as_Add=True)[0]
# continue with the full method, looking for this power of x:
x = x**n
def incommon(l1, l2):
if not l1 or not l2:
return []
n = min(len(l1), len(l2))
for i in range(n):
if l1[i] != l2[i]:
return l1[:i]
return l1[:]
def find(l, sub, first=True):
""" Find where list sub appears in list l. When ``first`` is True
the first occurrence from the left is returned, else the last
occurrence is returned. Return None if sub is not in l.
>> l = range(5)*2
>> find(l, [2, 3])
2
>> find(l, [2, 3], first=0)
7
>> find(l, [2, 4])
None
"""
if not sub or not l or len(sub) > len(l):
return None
n = len(sub)
if not first:
l.reverse()
sub.reverse()
for i in range(0, len(l) - n + 1):
if all(l[i + j] == sub[j] for j in range(n)):
break
else:
i = None
if not first:
l.reverse()
sub.reverse()
if i is not None and not first:
i = len(l) - (i + n)
return i
co = []
args = Add.make_args(self)
self_c = self.is_commutative
x_c = x.is_commutative
if self_c and not x_c:
return S.Zero
one_c = self_c or x_c
xargs, nx = x.args_cnc(cset=True, warn=bool(not x_c))
# find the parts that pass the commutative terms
for a in args:
margs, nc = a.args_cnc(cset=True, warn=bool(not self_c))
if nc is None:
nc = []
if len(xargs) > len(margs):
continue
resid = margs.difference(xargs)
if len(resid) + len(xargs) == len(margs):
if one_c:
co.append(Mul(*(list(resid) + nc)))
else:
co.append((resid, nc))
if one_c:
if co == []:
return S.Zero
elif co:
return Add(*co)
else: # both nc
# now check the non-comm parts
if not co:
return S.Zero
if all(n == co[0][1] for r, n in co):
ii = find(co[0][1], nx, right)
if ii is not None:
if not right:
return Mul(Add(*[Mul(*r) for r, c in co]), Mul(*co[0][1][:ii]))
else:
return Mul(*co[0][1][ii + len(nx):])
beg = reduce(incommon, (n[1] for n in co))
if beg:
ii = find(beg, nx, right)
if ii is not None:
if not right:
gcdc = co[0][0]
for i in range(1, len(co)):
gcdc = gcdc.intersection(co[i][0])
if not gcdc:
break
return Mul(*(list(gcdc) + beg[:ii]))
else:
m = ii + len(nx)
return Add(*[Mul(*(list(r) + n[m:])) for r, n in co])
end = list(reversed(
reduce(incommon, (list(reversed(n[1])) for n in co))))
if end:
ii = find(end, nx, right)
if ii is not None:
if not right:
return Add(*[Mul(*(list(r) + n[:-len(end) + ii])) for r, n in co])
else:
return Mul(*end[ii + len(nx):])
# look for single match
hit = None
for i, (r, n) in enumerate(co):
ii = find(n, nx, right)
if ii is not None:
if not hit:
hit = ii, r, n
else:
break
else:
if hit:
ii, r, n = hit
if not right:
return Mul(*(list(r) + n[:ii]))
else:
return Mul(*n[ii + len(nx):])
return S.Zero
def as_expr(self, *gens):
"""
Convert a polynomial to a SymPy expression.
Examples
========
>>> from sympy import sin
>>> from sympy.abc import x, y
>>> f = (x**2 + x*y).as_poly(x, y)
>>> f.as_expr()
x**2 + x*y
>>> sin(x).as_expr()
sin(x)
"""
return self
def as_coefficient(self, expr):
"""
Extracts symbolic coefficient at the given expression. In
other words, this functions separates 'self' into the product
of 'expr' and 'expr'-free coefficient. If such separation
is not possible it will return None.
Examples
========
>>> from sympy import E, pi, sin, I, Poly
>>> from sympy.abc import x
>>> E.as_coefficient(E)
1
>>> (2*E).as_coefficient(E)
2
>>> (2*sin(E)*E).as_coefficient(E)
Two terms have E in them so a sum is returned. (If one were
desiring the coefficient of the term exactly matching E then
the constant from the returned expression could be selected.
Or, for greater precision, a method of Poly can be used to
indicate the desired term from which the coefficient is
desired.)
>>> (2*E + x*E).as_coefficient(E)
x + 2
>>> _.args[0] # just want the exact match
2
>>> p = Poly(2*E + x*E); p
Poly(x*E + 2*E, x, E, domain='ZZ')
>>> p.coeff_monomial(E)
2
>>> p.nth(0, 1)
2
Since the following cannot be written as a product containing
E as a factor, None is returned. (If the coefficient ``2*x`` is
desired then the ``coeff`` method should be used.)
>>> (2*E*x + x).as_coefficient(E)
>>> (2*E*x + x).coeff(E)
2*x
>>> (E*(x + 1) + x).as_coefficient(E)
>>> (2*pi*I).as_coefficient(pi*I)
2
>>> (2*I).as_coefficient(pi*I)
See Also
========
coeff: return sum of terms have a given factor
as_coeff_Add: separate the additive constant from an expression
as_coeff_Mul: separate the multiplicative constant from an expression
as_independent: separate x-dependent terms/factors from others
sympy.polys.polytools.Poly.coeff_monomial: efficiently find the single coefficient of a monomial in Poly
sympy.polys.polytools.Poly.nth: like coeff_monomial but powers of monomial terms are used
"""
r = self.extract_multiplicatively(expr)
if r and not r.has(expr):
return r
def as_independent(self, *deps, **hint):
"""
A mostly naive separation of a Mul or Add into arguments that are not
are dependent on deps. To obtain as complete a separation of variables
as possible, use a separation method first, e.g.:
* separatevars() to change Mul, Add and Pow (including exp) into Mul
* .expand(mul=True) to change Add or Mul into Add
* .expand(log=True) to change log expr into an Add
The only non-naive thing that is done here is to respect noncommutative
ordering of variables and to always return (0, 0) for `self` of zero
regardless of hints.
For nonzero `self`, the returned tuple (i, d) has the
following interpretation:
* i will has no variable that appears in deps
* d will either have terms that contain variables that are in deps, or
be equal to 0 (when self is an Add) or 1 (when self is a Mul)
* if self is an Add then self = i + d
* if self is a Mul then self = i*d
* otherwise (self, S.One) or (S.One, self) is returned.
To force the expression to be treated as an Add, use the hint as_Add=True
Examples
========
-- self is an Add
>>> from sympy import sin, cos, exp
>>> from sympy.abc import x, y, z
>>> (x + x*y).as_independent(x)
(0, x*y + x)
>>> (x + x*y).as_independent(y)
(x, x*y)
>>> (2*x*sin(x) + y + x + z).as_independent(x)
(y + z, 2*x*sin(x) + x)
>>> (2*x*sin(x) + y + x + z).as_independent(x, y)
(z, 2*x*sin(x) + x + y)
-- self is a Mul
>>> (x*sin(x)*cos(y)).as_independent(x)
(cos(y), x*sin(x))
non-commutative terms cannot always be separated out when self is a Mul
>>> from sympy import symbols
>>> n1, n2, n3 = symbols('n1 n2 n3', commutative=False)
>>> (n1 + n1*n2).as_independent(n2)
(n1, n1*n2)
>>> (n2*n1 + n1*n2).as_independent(n2)
(0, n1*n2 + n2*n1)
>>> (n1*n2*n3).as_independent(n1)
(1, n1*n2*n3)
>>> (n1*n2*n3).as_independent(n2)
(n1, n2*n3)
>>> ((x-n1)*(x-y)).as_independent(x)
(1, (x - y)*(x - n1))
-- self is anything else:
>>> (sin(x)).as_independent(x)
(1, sin(x))
>>> (sin(x)).as_independent(y)
(sin(x), 1)
>>> exp(x+y).as_independent(x)
(1, exp(x + y))
-- force self to be treated as an Add:
>>> (3*x).as_independent(x, as_Add=True)
(0, 3*x)
-- force self to be treated as a Mul:
>>> (3+x).as_independent(x, as_Add=False)
(1, x + 3)
>>> (-3+x).as_independent(x, as_Add=False)
(1, x - 3)
Note how the below differs from the above in making the
constant on the dep term positive.
>>> (y*(-3+x)).as_independent(x)
(y, x - 3)
-- use .as_independent() for true independence testing instead
of .has(). The former considers only symbols in the free
symbols while the latter considers all symbols
>>> from sympy import Integral
>>> I = Integral(x, (x, 1, 2))
>>> I.has(x)
True
>>> x in I.free_symbols
False
>>> I.as_independent(x) == (I, 1)
True
>>> (I + x).as_independent(x) == (I, x)
True
Note: when trying to get independent terms, a separation method
might need to be used first. In this case, it is important to keep
track of what you send to this routine so you know how to interpret
the returned values
>>> from sympy import separatevars, log
>>> separatevars(exp(x+y)).as_independent(x)
(exp(y), exp(x))
>>> (x + x*y).as_independent(y)
(x, x*y)
>>> separatevars(x + x*y).as_independent(y)
(x, y + 1)
>>> (x*(1 + y)).as_independent(y)
(x, y + 1)
>>> (x*(1 + y)).expand(mul=True).as_independent(y)
(x, x*y)
>>> a, b=symbols('a b', positive=True)
>>> (log(a*b).expand(log=True)).as_independent(b)
(log(a), log(b))
See Also
========
.separatevars(), .expand(log=True), sympy.core.add.Add.as_two_terms(),
sympy.core.mul.Mul.as_two_terms(), .as_coeff_add(), .as_coeff_mul()
"""
from .symbol import Symbol
from .add import _unevaluated_Add
from .mul import _unevaluated_Mul
from sympy.utilities.iterables import sift
if self.is_zero:
return S.Zero, S.Zero
func = self.func
if hint.get('as_Add', isinstance(self, Add) ):
want = Add
else:
want = Mul
# sift out deps into symbolic and other and ignore
# all symbols but those that are in the free symbols
sym = set()
other = []
for d in deps:
if isinstance(d, Symbol): # Symbol.is_Symbol is True
sym.add(d)
else:
other.append(d)
def has(e):
"""return the standard has() if there are no literal symbols, else
check to see that symbol-deps are in the free symbols."""
has_other = e.has(*other)
if not sym:
return has_other
return has_other or e.has(*(e.free_symbols & sym))
if (want is not func or
func is not Add and func is not Mul):
if has(self):
return (want.identity, self)
else:
return (self, want.identity)
else:
if func is Add:
args = list(self.args)
else:
args, nc = self.args_cnc()
d = sift(args, lambda x: has(x))
depend = d[True]
indep = d[False]
if func is Add: # all terms were treated as commutative
return (Add(*indep), _unevaluated_Add(*depend))
else: # handle noncommutative by stopping at first dependent term
for i, n in enumerate(nc):
if has(n):
depend.extend(nc[i:])
break
indep.append(n)
return Mul(*indep), (
Mul(*depend, evaluate=False) if nc else
_unevaluated_Mul(*depend))
def as_real_imag(self, deep=True, **hints):
"""Performs complex expansion on 'self' and returns a tuple
containing collected both real and imaginary parts. This
method can't be confused with re() and im() functions,
which does not perform complex expansion at evaluation.
However it is possible to expand both re() and im()
functions and get exactly the same results as with
a single call to this function.
>>> from sympy import symbols, I
>>> x, y = symbols('x,y', real=True)
>>> (x + y*I).as_real_imag()
(x, y)
>>> from sympy.abc import z, w
>>> (z + w*I).as_real_imag()
(re(z) - im(w), re(w) + im(z))
"""
from sympy import im, re
if hints.get('ignore') == self:
return None
else:
return (re(self), im(self))
def as_powers_dict(self):
"""Return self as a dictionary of factors with each factor being
treated as a power. The keys are the bases of the factors and the
values, the corresponding exponents. The resulting dictionary should
be used with caution if the expression is a Mul and contains non-
commutative factors since the order that they appeared will be lost in
the dictionary.
See Also
========
as_ordered_factors: An alternative for noncommutative applications,
returning an ordered list of factors.
args_cnc: Similar to as_ordered_factors, but guarantees separation
of commutative and noncommutative factors.
"""
d = defaultdict(int)
d.update(dict([self.as_base_exp()]))
return d
def as_coefficients_dict(self):
"""Return a dictionary mapping terms to their Rational coefficient.
Since the dictionary is a defaultdict, inquiries about terms which
were not present will return a coefficient of 0. If an expression is
not an Add it is considered to have a single term.
Examples
========
>>> from sympy.abc import a, x
>>> (3*x + a*x + 4).as_coefficients_dict()
{1: 4, x: 3, a*x: 1}
>>> _[a]
0
>>> (3*a*x).as_coefficients_dict()
{a*x: 3}
"""
c, m = self.as_coeff_Mul()
if not c.is_Rational:
c = S.One
m = self
d = defaultdict(int)
d.update({m: c})
return d
def as_base_exp(self):
# a -> b ** e
return self, S.One
def as_coeff_mul(self, *deps, **kwargs):
"""Return the tuple (c, args) where self is written as a Mul, ``m``.
c should be a Rational multiplied by any factors of the Mul that are
independent of deps.
args should be a tuple of all other factors of m; args is empty
if self is a Number or if self is independent of deps (when given).
This should be used when you don't know if self is a Mul or not but
you want to treat self as a Mul or if you want to process the
individual arguments of the tail of self as a Mul.
- if you know self is a Mul and want only the head, use self.args[0];
- if you don't want to process the arguments of the tail but need the
tail then use self.as_two_terms() which gives the head and tail;
- if you want to split self into an independent and dependent parts
use ``self.as_independent(*deps)``
>>> from sympy import S
>>> from sympy.abc import x, y
>>> (S(3)).as_coeff_mul()
(3, ())
>>> (3*x*y).as_coeff_mul()
(3, (x, y))
>>> (3*x*y).as_coeff_mul(x)
(3*y, (x,))
>>> (3*y).as_coeff_mul(x)
(3*y, ())
"""
if deps:
if not self.has(*deps):
return self, tuple()
return S.One, (self,)
def as_coeff_add(self, *deps):
"""Return the tuple (c, args) where self is written as an Add, ``a``.
c should be a Rational added to any terms of the Add that are
independent of deps.
args should be a tuple of all other terms of ``a``; args is empty
if self is a Number or if self is independent of deps (when given).
This should be used when you don't know if self is an Add or not but
you want to treat self as an Add or if you want to process the
individual arguments of the tail of self as an Add.
- if you know self is an Add and want only the head, use self.args[0];
- if you don't want to process the arguments of the tail but need the
tail then use self.as_two_terms() which gives the head and tail.
- if you want to split self into an independent and dependent parts
use ``self.as_independent(*deps)``
>>> from sympy import S
>>> from sympy.abc import x, y
>>> (S(3)).as_coeff_add()
(3, ())
>>> (3 + x).as_coeff_add()
(3, (x,))
>>> (3 + x + y).as_coeff_add(x)
(y + 3, (x,))
>>> (3 + y).as_coeff_add(x)
(y + 3, ())
"""
if deps:
if not self.has(*deps):
return self, tuple()
return S.Zero, (self,)
def primitive(self):
"""Return the positive Rational that can be extracted non-recursively
from every term of self (i.e., self is treated like an Add). This is
like the as_coeff_Mul() method but primitive always extracts a positive
Rational (never a negative or a Float).
Examples
========
>>> from sympy.abc import x
>>> (3*(x + 1)**2).primitive()
(3, (x + 1)**2)
>>> a = (6*x + 2); a.primitive()
(2, 3*x + 1)
>>> b = (x/2 + 3); b.primitive()
(1/2, x + 6)
>>> (a*b).primitive() == (1, a*b)
True
"""
if not self:
return S.One, S.Zero
c, r = self.as_coeff_Mul(rational=True)
if c.is_negative:
c, r = -c, -r
return c, r
def as_content_primitive(self, radical=False, clear=True):
"""This method should recursively remove a Rational from all arguments
and return that (content) and the new self (primitive). The content
should always be positive and ``Mul(*foo.as_content_primitive()) == foo``.
The primitive need not be in canonical form and should try to preserve
the underlying structure if possible (i.e. expand_mul should not be
applied to self).
Examples
========
>>> from sympy import sqrt
>>> from sympy.abc import x, y, z
>>> eq = 2 + 2*x + 2*y*(3 + 3*y)
The as_content_primitive function is recursive and retains structure:
>>> eq.as_content_primitive()
(2, x + 3*y*(y + 1) + 1)
Integer powers will have Rationals extracted from the base:
>>> ((2 + 6*x)**2).as_content_primitive()
(4, (3*x + 1)**2)
>>> ((2 + 6*x)**(2*y)).as_content_primitive()
(1, (2*(3*x + 1))**(2*y))
Terms may end up joining once their as_content_primitives are added:
>>> ((5*(x*(1 + y)) + 2*x*(3 + 3*y))).as_content_primitive()
(11, x*(y + 1))
>>> ((3*(x*(1 + y)) + 2*x*(3 + 3*y))).as_content_primitive()
(9, x*(y + 1))
>>> ((3*(z*(1 + y)) + 2.0*x*(3 + 3*y))).as_content_primitive()
(1, 6.0*x*(y + 1) + 3*z*(y + 1))
>>> ((5*(x*(1 + y)) + 2*x*(3 + 3*y))**2).as_content_primitive()
(121, x**2*(y + 1)**2)
>>> ((x*(1 + y) + 0.4*x*(3 + 3*y))**2).as_content_primitive()
(1, 4.84*x**2*(y + 1)**2)
Radical content can also be factored out of the primitive:
>>> (2*sqrt(2) + 4*sqrt(10)).as_content_primitive(radical=True)
(2, sqrt(2)*(1 + 2*sqrt(5)))
If clear=False (default is True) then content will not be removed
from an Add if it can be distributed to leave one or more
terms with integer coefficients.
>>> (x/2 + y).as_content_primitive()
(1/2, x + 2*y)
>>> (x/2 + y).as_content_primitive(clear=False)
(1, x/2 + y)
"""
return S.One, self
def as_numer_denom(self):
""" expression -> a/b -> a, b
This is just a stub that should be defined by
an object's class methods to get anything else.
See Also
========
normal: return a/b instead of a, b
"""
return self, S.One
def normal(self):
from .mul import _unevaluated_Mul
n, d = self.as_numer_denom()
if d is S.One:
return n
if d.is_Number:
return _unevaluated_Mul(n, 1/d)
else:
return n/d
def extract_multiplicatively(self, c):
"""Return None if it's not possible to make self in the form
c * something in a nice way, i.e. preserving the properties
of arguments of self.
Examples
========
>>> from sympy import symbols, Rational
>>> x, y = symbols('x,y', real=True)
>>> ((x*y)**3).extract_multiplicatively(x**2 * y)
x*y**2
>>> ((x*y)**3).extract_multiplicatively(x**4 * y)
>>> (2*x).extract_multiplicatively(2)
x
>>> (2*x).extract_multiplicatively(3)
>>> (Rational(1, 2)*x).extract_multiplicatively(3)
x/6
"""
from .add import _unevaluated_Add
c = sympify(c)
if self is S.NaN:
return None
if c is S.One:
return self
elif c == self:
return S.One
if c.is_Add:
cc, pc = c.primitive()
if cc is not S.One:
c = Mul(cc, pc, evaluate=False)
if c.is_Mul:
a, b = c.as_two_terms()
x = self.extract_multiplicatively(a)
if x is not None:
return x.extract_multiplicatively(b)
else:
return x
quotient = self / c
if self.is_Number:
if self is S.Infinity:
if c.is_positive:
return S.Infinity
elif self is S.NegativeInfinity:
if c.is_negative:
return S.Infinity
elif c.is_positive:
return S.NegativeInfinity
elif self is S.ComplexInfinity:
if not c.is_zero:
return S.ComplexInfinity
elif self.is_Integer:
if not quotient.is_Integer:
return None
elif self.is_positive and quotient.is_negative:
return None
else:
return quotient
elif self.is_Rational:
if not quotient.is_Rational:
return None
elif self.is_positive and quotient.is_negative:
return None
else:
return quotient
elif self.is_Float:
if not quotient.is_Float:
return None
elif self.is_positive and quotient.is_negative:
return None
else:
return quotient
elif self.is_NumberSymbol or self.is_Symbol or self is S.ImaginaryUnit:
if quotient.is_Mul and len(quotient.args) == 2:
if quotient.args[0].is_Integer and quotient.args[0].is_positive and quotient.args[1] == self:
return quotient
elif quotient.is_Integer and c.is_Number:
return quotient
elif self.is_Add:
cs, ps = self.primitive()
# assert cs >= 1
if c.is_Number and c is not S.NegativeOne:
# assert c != 1 (handled at top)
if cs is not S.One:
if c.is_negative:
xc = -(cs.extract_multiplicatively(-c))
else:
xc = cs.extract_multiplicatively(c)
if xc is not None:
return xc*ps # rely on 2-arg Mul to restore Add
return # |c| != 1 can only be extracted from cs
if c == ps:
return cs
# check args of ps
newargs = []
for arg in ps.args:
newarg = arg.extract_multiplicatively(c)
if newarg is None:
return # all or nothing
newargs.append(newarg)
if cs is not S.One:
args = [cs*t for t in newargs]
# args may be in different order
return _unevaluated_Add(*args)
else:
return Add._from_args(newargs)
elif self.is_Mul:
args = list(self.args)
for i, arg in enumerate(args):
newarg = arg.extract_multiplicatively(c)
if newarg is not None:
args[i] = newarg
return Mul(*args)
elif self.is_Pow:
if c.is_Pow and c.base == self.base:
new_exp = self.exp.extract_additively(c.exp)
if new_exp is not None:
return self.base ** (new_exp)
elif c == self.base:
new_exp = self.exp.extract_additively(1)
if new_exp is not None:
return self.base ** (new_exp)
def extract_additively(self, c):
"""Return self - c if it's possible to subtract c from self and
make all matching coefficients move towards zero, else return None.
Examples
========
>>> from sympy.abc import x, y
>>> e = 2*x + 3
>>> e.extract_additively(x + 1)
x + 2
>>> e.extract_additively(3*x)
>>> e.extract_additively(4)
>>> (y*(x + 1)).extract_additively(x + 1)
>>> ((x + 1)*(x + 2*y + 1) + 3).extract_additively(x + 1)
(x + 1)*(x + 2*y) + 3
Sometimes auto-expansion will return a less simplified result
than desired; gcd_terms might be used in such cases:
>>> from sympy import gcd_terms
>>> (4*x*(y + 1) + y).extract_additively(x)
4*x*(y + 1) + x*(4*y + 3) - x*(4*y + 4) + y
>>> gcd_terms(_)
x*(4*y + 3) + y
See Also
========
extract_multiplicatively
coeff
as_coefficient
"""
c = sympify(c)
if self is S.NaN:
return None
if c.is_zero:
return self
elif c == self:
return S.Zero
elif self == S.Zero:
return None
if self.is_Number:
if not c.is_Number:
return None
co = self
diff = co - c
# XXX should we match types? i.e should 3 - .1 succeed?
if (co > 0 and diff > 0 and diff < co or
co < 0 and diff < 0 and diff > co):
return diff
return None
if c.is_Number:
co, t = self.as_coeff_Add()
xa = co.extract_additively(c)
if xa is None:
return None
return xa + t
# handle the args[0].is_Number case separately
# since we will have trouble looking for the coeff of
# a number.
if c.is_Add and c.args[0].is_Number:
# whole term as a term factor
co = self.coeff(c)
xa0 = (co.extract_additively(1) or 0)*c
if xa0:
diff = self - co*c
return (xa0 + (diff.extract_additively(c) or diff)) or None
# term-wise
h, t = c.as_coeff_Add()
sh, st = self.as_coeff_Add()
xa = sh.extract_additively(h)
if xa is None:
return None
xa2 = st.extract_additively(t)
if xa2 is None:
return None
return xa + xa2
# whole term as a term factor
co = self.coeff(c)
xa0 = (co.extract_additively(1) or 0)*c
if xa0:
diff = self - co*c
return (xa0 + (diff.extract_additively(c) or diff)) or None
# term-wise
coeffs = []
for a in Add.make_args(c):
ac, at = a.as_coeff_Mul()
co = self.coeff(at)
if not co:
return None
coc, cot = co.as_coeff_Add()
xa = coc.extract_additively(ac)
if xa is None:
return None
self -= co*at
coeffs.append((cot + xa)*at)
coeffs.append(self)
return Add(*coeffs)
@property
def expr_free_symbols(self):
"""
Like ``free_symbols``, but returns the free symbols only if they are contained in an expression node.
Examples
========
>>> from sympy.abc import x, y
>>> (x + y).expr_free_symbols
{x, y}
If the expression is contained in a non-expression object, don't return
the free symbols. Compare:
>>> from sympy import Tuple
>>> t = Tuple(x + y)
>>> t.expr_free_symbols
set()
>>> t.free_symbols
{x, y}
"""
return {j for i in self.args for j in i.expr_free_symbols}
def could_extract_minus_sign(self):
"""Return True if self is not in a canonical form with respect
to its sign.
For most expressions, e, there will be a difference in e and -e.
When there is, True will be returned for one and False for the
other; False will be returned if there is no difference.
Examples
========
>>> from sympy.abc import x, y
>>> e = x - y
>>> {i.could_extract_minus_sign() for i in (e, -e)}
{False, True}
"""
negative_self = -self
if self == negative_self:
return False # e.g. zoo*x == -zoo*x
self_has_minus = (self.extract_multiplicatively(-1) is not None)
negative_self_has_minus = (
(negative_self).extract_multiplicatively(-1) is not None)
if self_has_minus != negative_self_has_minus:
return self_has_minus
else:
if self.is_Add:
# We choose the one with less arguments with minus signs
all_args = len(self.args)
negative_args = len([False for arg in self.args if arg.could_extract_minus_sign()])
positive_args = all_args - negative_args
if positive_args > negative_args:
return False
elif positive_args < negative_args:
return True
elif self.is_Mul:
# We choose the one with an odd number of minus signs
num, den = self.as_numer_denom()
args = Mul.make_args(num) + Mul.make_args(den)
arg_signs = [arg.could_extract_minus_sign() for arg in args]
negative_args = list(filter(None, arg_signs))
return len(negative_args) % 2 == 1
# As a last resort, we choose the one with greater value of .sort_key()
return bool(self.sort_key() < negative_self.sort_key())
def extract_branch_factor(self, allow_half=False):
"""
Try to write self as ``exp_polar(2*pi*I*n)*z`` in a nice way.
Return (z, n).
>>> from sympy import exp_polar, I, pi
>>> from sympy.abc import x, y
>>> exp_polar(I*pi).extract_branch_factor()
(exp_polar(I*pi), 0)
>>> exp_polar(2*I*pi).extract_branch_factor()
(1, 1)
>>> exp_polar(-pi*I).extract_branch_factor()
(exp_polar(I*pi), -1)
>>> exp_polar(3*pi*I + x).extract_branch_factor()
(exp_polar(x + I*pi), 1)
>>> (y*exp_polar(-5*pi*I)*exp_polar(3*pi*I + 2*pi*x)).extract_branch_factor()
(y*exp_polar(2*pi*x), -1)
>>> exp_polar(-I*pi/2).extract_branch_factor()
(exp_polar(-I*pi/2), 0)
If allow_half is True, also extract exp_polar(I*pi):
>>> exp_polar(I*pi).extract_branch_factor(allow_half=True)
(1, 1/2)
>>> exp_polar(2*I*pi).extract_branch_factor(allow_half=True)
(1, 1)
>>> exp_polar(3*I*pi).extract_branch_factor(allow_half=True)
(1, 3/2)
>>> exp_polar(-I*pi).extract_branch_factor(allow_half=True)
(1, -1/2)
"""
from sympy import exp_polar, pi, I, ceiling, Add
n = S.Zero
res = S.One
args = Mul.make_args(self)
exps = []
for arg in args:
if isinstance(arg, exp_polar):
exps += [arg.exp]
else:
res *= arg
piimult = S.Zero
extras = []
while exps:
exp = exps.pop()
if exp.is_Add:
exps += exp.args
continue
if exp.is_Mul:
coeff = exp.as_coefficient(pi*I)
if coeff is not None:
piimult += coeff
continue
extras += [exp]
if piimult.is_number:
coeff = piimult
tail = ()
else:
coeff, tail = piimult.as_coeff_add(*piimult.free_symbols)
# round down to nearest multiple of 2
branchfact = ceiling(coeff/2 - S.Half)*2
n += branchfact/2
c = coeff - branchfact
if allow_half:
nc = c.extract_additively(1)
if nc is not None:
n += S.Half
c = nc
newexp = pi*I*Add(*((c, ) + tail)) + Add(*extras)
if newexp != 0:
res *= exp_polar(newexp)
return res, n
def _eval_is_polynomial(self, syms):
if self.free_symbols.intersection(syms) == set([]):
return True
return False
def is_polynomial(self, *syms):
r"""
Return True if self is a polynomial in syms and False otherwise.
This checks if self is an exact polynomial in syms. This function
returns False for expressions that are "polynomials" with symbolic
exponents. Thus, you should be able to apply polynomial algorithms to
expressions for which this returns True, and Poly(expr, \*syms) should
work if and only if expr.is_polynomial(\*syms) returns True. The
polynomial does not have to be in expanded form. If no symbols are
given, all free symbols in the expression will be used.
This is not part of the assumptions system. You cannot do
Symbol('z', polynomial=True).
Examples
========
>>> from sympy import Symbol
>>> x = Symbol('x')
>>> ((x**2 + 1)**4).is_polynomial(x)
True
>>> ((x**2 + 1)**4).is_polynomial()
True
>>> (2**x + 1).is_polynomial(x)
False
>>> n = Symbol('n', nonnegative=True, integer=True)
>>> (x**n + 1).is_polynomial(x)
False
This function does not attempt any nontrivial simplifications that may
result in an expression that does not appear to be a polynomial to
become one.
>>> from sympy import sqrt, factor, cancel
>>> y = Symbol('y', positive=True)
>>> a = sqrt(y**2 + 2*y + 1)
>>> a.is_polynomial(y)
False
>>> factor(a)
y + 1
>>> factor(a).is_polynomial(y)
True
>>> b = (y**2 + 2*y + 1)/(y + 1)
>>> b.is_polynomial(y)
False
>>> cancel(b)
y + 1
>>> cancel(b).is_polynomial(y)
True
See also .is_rational_function()
"""
if syms:
syms = set(map(sympify, syms))
else:
syms = self.free_symbols
if syms.intersection(self.free_symbols) == set([]):
# constant polynomial
return True
else:
return self._eval_is_polynomial(syms)
def _eval_is_rational_function(self, syms):
if self.free_symbols.intersection(syms) == set([]):
return True
return False
def is_rational_function(self, *syms):
"""
Test whether function is a ratio of two polynomials in the given
symbols, syms. When syms is not given, all free symbols will be used.
The rational function does not have to be in expanded or in any kind of
canonical form.
This function returns False for expressions that are "rational
functions" with symbolic exponents. Thus, you should be able to call
.as_numer_denom() and apply polynomial algorithms to the result for
expressions for which this returns True.
This is not part of the assumptions system. You cannot do
Symbol('z', rational_function=True).
Examples
========
>>> from sympy import Symbol, sin
>>> from sympy.abc import x, y
>>> (x/y).is_rational_function()
True
>>> (x**2).is_rational_function()
True
>>> (x/sin(y)).is_rational_function(y)
False
>>> n = Symbol('n', integer=True)
>>> (x**n + 1).is_rational_function(x)
False
This function does not attempt any nontrivial simplifications that may
result in an expression that does not appear to be a rational function
to become one.
>>> from sympy import sqrt, factor
>>> y = Symbol('y', positive=True)
>>> a = sqrt(y**2 + 2*y + 1)/y
>>> a.is_rational_function(y)
False
>>> factor(a)
(y + 1)/y
>>> factor(a).is_rational_function(y)
True
See also is_algebraic_expr().
"""
if self in [S.NaN, S.Infinity, S.NegativeInfinity, S.ComplexInfinity]:
return False
if syms:
syms = set(map(sympify, syms))
else:
syms = self.free_symbols
if syms.intersection(self.free_symbols) == set([]):
# constant rational function
return True
else:
return self._eval_is_rational_function(syms)
def _eval_is_algebraic_expr(self, syms):
if self.free_symbols.intersection(syms) == set([]):
return True
return False
def is_algebraic_expr(self, *syms):
"""
This tests whether a given expression is algebraic or not, in the
given symbols, syms. When syms is not given, all free symbols
will be used. The rational function does not have to be in expanded
or in any kind of canonical form.
This function returns False for expressions that are "algebraic
expressions" with symbolic exponents. This is a simple extension to the
is_rational_function, including rational exponentiation.
Examples
========
>>> from sympy import Symbol, sqrt
>>> x = Symbol('x', real=True)
>>> sqrt(1 + x).is_rational_function()
False
>>> sqrt(1 + x).is_algebraic_expr()
True
This function does not attempt any nontrivial simplifications that may
result in an expression that does not appear to be an algebraic
expression to become one.
>>> from sympy import exp, factor
>>> a = sqrt(exp(x)**2 + 2*exp(x) + 1)/(exp(x) + 1)
>>> a.is_algebraic_expr(x)
False
>>> factor(a).is_algebraic_expr()
True
See Also
========
is_rational_function()
References
==========
- https://en.wikipedia.org/wiki/Algebraic_expression
"""
if syms:
syms = set(map(sympify, syms))
else:
syms = self.free_symbols
if syms.intersection(self.free_symbols) == set([]):
# constant algebraic expression
return True
else:
return self._eval_is_algebraic_expr(syms)
###################################################################################
##################### SERIES, LEADING TERM, LIMIT, ORDER METHODS ##################
###################################################################################
def series(self, x=None, x0=0, n=6, dir="+", logx=None):
"""
Series expansion of "self" around ``x = x0`` yielding either terms of
the series one by one (the lazy series given when n=None), else
all the terms at once when n != None.
Returns the series expansion of "self" around the point ``x = x0``
with respect to ``x`` up to ``O((x - x0)**n, x, x0)`` (default n is 6).
If ``x=None`` and ``self`` is univariate, the univariate symbol will
be supplied, otherwise an error will be raised.
Parameters
==========
expr : Expression
The expression whose series is to be expanded.
x : Symbol
It is the variable of the expression to be calculated.
x0 : Value
The value around which ``x`` is calculated. Can be any value
from ``-oo`` to ``oo``.
n : Value
The number of terms upto which the series is to be expanded.
dir : String, optional
The series-expansion can be bi-directional. If ``dir="+"``,
then (x->x0+). If ``dir="-", then (x->x0-). For infinite
``x0`` (``oo`` or ``-oo``), the ``dir`` argument is determined
from the direction of the infinity (i.e., ``dir="-"`` for
``oo``).
logx : optional
It is used to replace any log(x) in the returned series with a
symbolic value rather than evaluating the actual value.
Examples
========
>>> from sympy import cos, exp, tan, oo, series
>>> from sympy.abc import x, y
>>> cos(x).series()
1 - x**2/2 + x**4/24 + O(x**6)
>>> cos(x).series(n=4)
1 - x**2/2 + O(x**4)
>>> cos(x).series(x, x0=1, n=2)
cos(1) - (x - 1)*sin(1) + O((x - 1)**2, (x, 1))
>>> e = cos(x + exp(y))
>>> e.series(y, n=2)
cos(x + 1) - y*sin(x + 1) + O(y**2)
>>> e.series(x, n=2)
cos(exp(y)) - x*sin(exp(y)) + O(x**2)
If ``n=None`` then a generator of the series terms will be returned.
>>> term=cos(x).series(n=None)
>>> [next(term) for i in range(2)]
[1, -x**2/2]
For ``dir=+`` (default) the series is calculated from the right and
for ``dir=-`` the series from the left. For smooth functions this
flag will not alter the results.
>>> abs(x).series(dir="+")
x
>>> abs(x).series(dir="-")
-x
>>> f = tan(x)
>>> f.series(x, 2, 6, "+")
tan(2) + (1 + tan(2)**2)*(x - 2) + (x - 2)**2*(tan(2)**3 + tan(2)) +
(x - 2)**3*(1/3 + 4*tan(2)**2/3 + tan(2)**4) + (x - 2)**4*(tan(2)**5 +
5*tan(2)**3/3 + 2*tan(2)/3) + (x - 2)**5*(2/15 + 17*tan(2)**2/15 +
2*tan(2)**4 + tan(2)**6) + O((x - 2)**6, (x, 2))
>>> f.series(x, 2, 3, "-")
tan(2) + (2 - x)*(-tan(2)**2 - 1) + (2 - x)**2*(tan(2)**3 + tan(2))
+ O((x - 2)**3, (x, 2))
Returns
=======
Expr : Expression
Series expansion of the expression about x0
Raises
======
TypeError
If "n" and "x0" are infinity objects
PoleError
If "x0" is an infinity object
"""
from sympy import collect, Dummy, Order, Rational, Symbol, ceiling
if x is None:
syms = self.free_symbols
if not syms:
return self
elif len(syms) > 1:
raise ValueError('x must be given for multivariate functions.')
x = syms.pop()
if isinstance(x, Symbol):
dep = x in self.free_symbols
else:
d = Dummy()
dep = d in self.xreplace({x: d}).free_symbols
if not dep:
if n is None:
return (s for s in [self])
else:
return self
if len(dir) != 1 or dir not in '+-':
raise ValueError("Dir must be '+' or '-'")
if x0 in [S.Infinity, S.NegativeInfinity]:
sgn = 1 if x0 is S.Infinity else -1
s = self.subs(x, sgn/x).series(x, n=n, dir='+')
if n is None:
return (si.subs(x, sgn/x) for si in s)
return s.subs(x, sgn/x)
# use rep to shift origin to x0 and change sign (if dir is negative)
# and undo the process with rep2
if x0 or dir == '-':
if dir == '-':
rep = -x + x0
rep2 = -x
rep2b = x0
else:
rep = x + x0
rep2 = x
rep2b = -x0
s = self.subs(x, rep).series(x, x0=0, n=n, dir='+', logx=logx)
if n is None: # lseries...
return (si.subs(x, rep2 + rep2b) for si in s)
return s.subs(x, rep2 + rep2b)
# from here on it's x0=0 and dir='+' handling
if x.is_positive is x.is_negative is None or x.is_Symbol is not True:
# replace x with an x that has a positive assumption
xpos = Dummy('x', positive=True, finite=True)
rv = self.subs(x, xpos).series(xpos, x0, n, dir, logx=logx)
if n is None:
return (s.subs(xpos, x) for s in rv)
else:
return rv.subs(xpos, x)
if n is not None: # nseries handling
s1 = self._eval_nseries(x, n=n, logx=logx)
o = s1.getO() or S.Zero
if o:
# make sure the requested order is returned
ngot = o.getn()
if ngot > n:
# leave o in its current form (e.g. with x*log(x)) so
# it eats terms properly, then replace it below
if n != 0:
s1 += o.subs(x, x**Rational(n, ngot))
else:
s1 += Order(1, x)
elif ngot < n:
# increase the requested number of terms to get the desired
# number keep increasing (up to 9) until the received order
# is different than the original order and then predict how
# many additional terms are needed
for more in range(1, 9):
s1 = self._eval_nseries(x, n=n + more, logx=logx)
newn = s1.getn()
if newn != ngot:
ndo = n + ceiling((n - ngot)*more/(newn - ngot))
s1 = self._eval_nseries(x, n=ndo, logx=logx)
while s1.getn() < n:
s1 = self._eval_nseries(x, n=ndo, logx=logx)
ndo += 1
break
else:
raise ValueError('Could not calculate %s terms for %s'
% (str(n), self))
s1 += Order(x**n, x)
o = s1.getO()
s1 = s1.removeO()
else:
o = Order(x**n, x)
s1done = s1.doit()
if (s1done + o).removeO() == s1done:
o = S.Zero
try:
return collect(s1, x) + o
except NotImplementedError:
return s1 + o
else: # lseries handling
def yield_lseries(s):
"""Return terms of lseries one at a time."""
for si in s:
if not si.is_Add:
yield si
continue
# yield terms 1 at a time if possible
# by increasing order until all the
# terms have been returned
yielded = 0
o = Order(si, x)*x
ndid = 0
ndo = len(si.args)
while 1:
do = (si - yielded + o).removeO()
o *= x
if not do or do.is_Order:
continue
if do.is_Add:
ndid += len(do.args)
else:
ndid += 1
yield do
if ndid == ndo:
break
yielded += do
return yield_lseries(self.removeO()._eval_lseries(x, logx=logx))
def aseries(self, x=None, n=6, bound=0, hir=False):
"""Asymptotic Series expansion of self.
This is equivalent to ``self.series(x, oo, n)``.
Parameters
==========
self : Expression
The expression whose series is to be expanded.
x : Symbol
It is the variable of the expression to be calculated.
n : Value
The number of terms upto which the series is to be expanded.
hir : Boolean
Set this parameter to be True to produce hierarchical series.
It stops the recursion at an early level and may provide nicer
and more useful results.
bound : Value, Integer
Use the ``bound`` parameter to give limit on rewriting
coefficients in its normalised form.
Examples
========
>>> from sympy import sin, exp
>>> from sympy.abc import x, y
>>> e = sin(1/x + exp(-x)) - sin(1/x)
>>> e.aseries(x)
(1/(24*x**4) - 1/(2*x**2) + 1 + O(x**(-6), (x, oo)))*exp(-x)
>>> e.aseries(x, n=3, hir=True)
-exp(-2*x)*sin(1/x)/2 + exp(-x)*cos(1/x) + O(exp(-3*x), (x, oo))
>>> e = exp(exp(x)/(1 - 1/x))
>>> e.aseries(x)
exp(exp(x)/(1 - 1/x))
>>> e.aseries(x, bound=3)
exp(exp(x)/x**2)*exp(exp(x)/x)*exp(-exp(x) + exp(x)/(1 - 1/x) - exp(x)/x - exp(x)/x**2)*exp(exp(x))
Returns
=======
Expr
Asymptotic series expansion of the expression.
Notes
=====
This algorithm is directly induced from the limit computational algorithm provided by Gruntz.
It majorly uses the mrv and rewrite sub-routines. The overall idea of this algorithm is first
to look for the most rapidly varying subexpression w of a given expression f and then expands f
in a series in w. Then same thing is recursively done on the leading coefficient
till we get constant coefficients.
If the most rapidly varying subexpression of a given expression f is f itself,
the algorithm tries to find a normalised representation of the mrv set and rewrites f
using this normalised representation.
If the expansion contains an order term, it will be either ``O(x ** (-n))`` or ``O(w ** (-n))``
where ``w`` belongs to the most rapidly varying expression of ``self``.
References
==========
.. [1] A New Algorithm for Computing Asymptotic Series - Dominik Gruntz
.. [2] Gruntz thesis - p90
.. [3] http://en.wikipedia.org/wiki/Asymptotic_expansion
See Also
========
Expr.aseries: See the docstring of this function for complete details of this wrapper.
"""
from sympy import Order, Dummy
from sympy.functions import exp, log
from sympy.series.gruntz import mrv, rewrite
if x.is_positive is x.is_negative is None:
xpos = Dummy('x', positive=True)
return self.subs(x, xpos).aseries(xpos, n, bound, hir).subs(xpos, x)
om, exps = mrv(self, x)
# We move one level up by replacing `x` by `exp(x)`, and then
# computing the asymptotic series for f(exp(x)). Then asymptotic series
# can be obtained by moving one-step back, by replacing x by ln(x).
if x in om:
s = self.subs(x, exp(x)).aseries(x, n, bound, hir).subs(x, log(x))
if s.getO():
return s + Order(1/x**n, (x, S.Infinity))
return s
k = Dummy('k', positive=True)
# f is rewritten in terms of omega
func, logw = rewrite(exps, om, x, k)
if self in om:
if bound <= 0:
return self
s = (self.exp).aseries(x, n, bound=bound)
s = s.func(*[t.removeO() for t in s.args])
res = exp(s.subs(x, 1/x).as_leading_term(x).subs(x, 1/x))
func = exp(self.args[0] - res.args[0]) / k
logw = log(1/res)
s = func.series(k, 0, n)
# Hierarchical series
if hir:
return s.subs(k, exp(logw))
o = s.getO()
terms = sorted(Add.make_args(s.removeO()), key=lambda i: int(i.as_coeff_exponent(k)[1]))
s = S.Zero
has_ord = False
# Then we recursively expand these coefficients one by one into
# their asymptotic series in terms of their most rapidly varying subexpressions.
for t in terms:
coeff, expo = t.as_coeff_exponent(k)
if coeff.has(x):
# Recursive step
snew = coeff.aseries(x, n, bound=bound-1)
if has_ord and snew.getO():
break
elif snew.getO():
has_ord = True
s += (snew * k**expo)
else:
s += t
if not o or has_ord:
return s.subs(k, exp(logw))
return (s + o).subs(k, exp(logw))
def taylor_term(self, n, x, *previous_terms):
"""General method for the taylor term.
This method is slow, because it differentiates n-times. Subclasses can
redefine it to make it faster by using the "previous_terms".
"""
from sympy import Dummy, factorial
x = sympify(x)
_x = Dummy('x')
return self.subs(x, _x).diff(_x, n).subs(_x, x).subs(x, 0) * x**n / factorial(n)
def lseries(self, x=None, x0=0, dir='+', logx=None):
"""
Wrapper for series yielding an iterator of the terms of the series.
Note: an infinite series will yield an infinite iterator. The following,
for exaxmple, will never terminate. It will just keep printing terms
of the sin(x) series::
for term in sin(x).lseries(x):
print term
The advantage of lseries() over nseries() is that many times you are
just interested in the next term in the series (i.e. the first term for
example), but you don't know how many you should ask for in nseries()
using the "n" parameter.
See also nseries().
"""
return self.series(x, x0, n=None, dir=dir, logx=logx)
def _eval_lseries(self, x, logx=None):
# default implementation of lseries is using nseries(), and adaptively
# increasing the "n". As you can see, it is not very efficient, because
# we are calculating the series over and over again. Subclasses should
# override this method and implement much more efficient yielding of
# terms.
n = 0
series = self._eval_nseries(x, n=n, logx=logx)
if not series.is_Order:
if series.is_Add:
yield series.removeO()
else:
yield series
return
while series.is_Order:
n += 1
series = self._eval_nseries(x, n=n, logx=logx)
e = series.removeO()
yield e
while 1:
while 1:
n += 1
series = self._eval_nseries(x, n=n, logx=logx).removeO()
if e != series:
break
yield series - e
e = series
def nseries(self, x=None, x0=0, n=6, dir='+', logx=None):
"""
Wrapper to _eval_nseries if assumptions allow, else to series.
If x is given, x0 is 0, dir='+', and self has x, then _eval_nseries is
called. This calculates "n" terms in the innermost expressions and
then builds up the final series just by "cross-multiplying" everything
out.
The optional ``logx`` parameter can be used to replace any log(x) in the
returned series with a symbolic value to avoid evaluating log(x) at 0. A
symbol to use in place of log(x) should be provided.
Advantage -- it's fast, because we don't have to determine how many
terms we need to calculate in advance.
Disadvantage -- you may end up with less terms than you may have
expected, but the O(x**n) term appended will always be correct and
so the result, though perhaps shorter, will also be correct.
If any of those assumptions is not met, this is treated like a
wrapper to series which will try harder to return the correct
number of terms.
See also lseries().
Examples
========
>>> from sympy import sin, log, Symbol
>>> from sympy.abc import x, y
>>> sin(x).nseries(x, 0, 6)
x - x**3/6 + x**5/120 + O(x**6)
>>> log(x+1).nseries(x, 0, 5)
x - x**2/2 + x**3/3 - x**4/4 + O(x**5)
Handling of the ``logx`` parameter --- in the following example the
expansion fails since ``sin`` does not have an asymptotic expansion
at -oo (the limit of log(x) as x approaches 0):
>>> e = sin(log(x))
>>> e.nseries(x, 0, 6)
Traceback (most recent call last):
...
PoleError: ...
...
>>> logx = Symbol('logx')
>>> e.nseries(x, 0, 6, logx=logx)
sin(logx)
In the following example, the expansion works but gives only an Order term
unless the ``logx`` parameter is used:
>>> e = x**y
>>> e.nseries(x, 0, 2)
O(log(x)**2)
>>> e.nseries(x, 0, 2, logx=logx)
exp(logx*y)
"""
if x and not x in self.free_symbols:
return self
if x is None or x0 or dir != '+': # {see XPOS above} or (x.is_positive == x.is_negative == None):
return self.series(x, x0, n, dir)
else:
return self._eval_nseries(x, n=n, logx=logx)
def _eval_nseries(self, x, n, logx):
"""
Return terms of series for self up to O(x**n) at x=0
from the positive direction.
This is a method that should be overridden in subclasses. Users should
never call this method directly (use .nseries() instead), so you don't
have to write docstrings for _eval_nseries().
"""
from sympy.utilities.misc import filldedent
raise NotImplementedError(filldedent("""
The _eval_nseries method should be added to
%s to give terms up to O(x**n) at x=0
from the positive direction so it is available when
nseries calls it.""" % self.func)
)
def limit(self, x, xlim, dir='+'):
""" Compute limit x->xlim.
"""
from sympy.series.limits import limit
return limit(self, x, xlim, dir)
def compute_leading_term(self, x, logx=None):
"""
as_leading_term is only allowed for results of .series()
This is a wrapper to compute a series first.
"""
from sympy import Dummy, log, Piecewise, piecewise_fold
from sympy.series.gruntz import calculate_series
if self.has(Piecewise):
expr = piecewise_fold(self)
else:
expr = self
if self.removeO() == 0:
return self
if logx is None:
d = Dummy('logx')
s = calculate_series(expr, x, d).subs(d, log(x))
else:
s = calculate_series(expr, x, logx)
return s.as_leading_term(x)
@cacheit
def as_leading_term(self, *symbols):
"""
Returns the leading (nonzero) term of the series expansion of self.
The _eval_as_leading_term routines are used to do this, and they must
always return a non-zero value.
Examples
========
>>> from sympy.abc import x
>>> (1 + x + x**2).as_leading_term(x)
1
>>> (1/x**2 + x + x**2).as_leading_term(x)
x**(-2)
"""
from sympy import powsimp
if len(symbols) > 1:
c = self
for x in symbols:
c = c.as_leading_term(x)
return c
elif not symbols:
return self
x = sympify(symbols[0])
if not x.is_symbol:
raise ValueError('expecting a Symbol but got %s' % x)
if x not in self.free_symbols:
return self
obj = self._eval_as_leading_term(x)
if obj is not None:
return powsimp(obj, deep=True, combine='exp')
raise NotImplementedError('as_leading_term(%s, %s)' % (self, x))
def _eval_as_leading_term(self, x):
return self
def as_coeff_exponent(self, x):
""" ``c*x**e -> c,e`` where x can be any symbolic expression.
"""
from sympy import collect
s = collect(self, x)
c, p = s.as_coeff_mul(x)
if len(p) == 1:
b, e = p[0].as_base_exp()
if b == x:
return c, e
return s, S.Zero
def leadterm(self, x):
"""
Returns the leading term a*x**b as a tuple (a, b).
Examples
========
>>> from sympy.abc import x
>>> (1+x+x**2).leadterm(x)
(1, 0)
>>> (1/x**2+x+x**2).leadterm(x)
(1, -2)
"""
from sympy import Dummy, log
l = self.as_leading_term(x)
d = Dummy('logx')
if l.has(log(x)):
l = l.subs(log(x), d)
c, e = l.as_coeff_exponent(x)
if x in c.free_symbols:
from sympy.utilities.misc import filldedent
raise ValueError(filldedent("""
cannot compute leadterm(%s, %s). The coefficient
should have been free of %s but got %s""" % (self, x, x, c)))
c = c.subs(d, log(x))
return c, e
def as_coeff_Mul(self, rational=False):
"""Efficiently extract the coefficient of a product. """
return S.One, self
def as_coeff_Add(self, rational=False):
"""Efficiently extract the coefficient of a summation. """
return S.Zero, self
def fps(self, x=None, x0=0, dir=1, hyper=True, order=4, rational=True,
full=False):
"""
Compute formal power power series of self.
See the docstring of the :func:`fps` function in sympy.series.formal for
more information.
"""
from sympy.series.formal import fps
return fps(self, x, x0, dir, hyper, order, rational, full)
def fourier_series(self, limits=None):
"""Compute fourier sine/cosine series of self.
See the docstring of the :func:`fourier_series` in sympy.series.fourier
for more information.
"""
from sympy.series.fourier import fourier_series
return fourier_series(self, limits)
###################################################################################
##################### DERIVATIVE, INTEGRAL, FUNCTIONAL METHODS ####################
###################################################################################
def diff(self, *symbols, **assumptions):
assumptions.setdefault("evaluate", True)
return Derivative(self, *symbols, **assumptions)
###########################################################################
###################### EXPRESSION EXPANSION METHODS #######################
###########################################################################
# Relevant subclasses should override _eval_expand_hint() methods. See
# the docstring of expand() for more info.
def _eval_expand_complex(self, **hints):
real, imag = self.as_real_imag(**hints)
return real + S.ImaginaryUnit*imag
@staticmethod
def _expand_hint(expr, hint, deep=True, **hints):
"""
Helper for ``expand()``. Recursively calls ``expr._eval_expand_hint()``.
Returns ``(expr, hit)``, where expr is the (possibly) expanded
``expr`` and ``hit`` is ``True`` if ``expr`` was truly expanded and
``False`` otherwise.
"""
hit = False
# XXX: Hack to support non-Basic args
# |
# V
if deep and getattr(expr, 'args', ()) and not expr.is_Atom:
sargs = []
for arg in expr.args:
arg, arghit = Expr._expand_hint(arg, hint, **hints)
hit |= arghit
sargs.append(arg)
if hit:
expr = expr.func(*sargs)
if hasattr(expr, hint):
newexpr = getattr(expr, hint)(**hints)
if newexpr != expr:
return (newexpr, True)
return (expr, hit)
@cacheit
def expand(self, deep=True, modulus=None, power_base=True, power_exp=True,
mul=True, log=True, multinomial=True, basic=True, **hints):
"""
Expand an expression using hints.
See the docstring of the expand() function in sympy.core.function for
more information.
"""
from sympy.simplify.radsimp import fraction
hints.update(power_base=power_base, power_exp=power_exp, mul=mul,
log=log, multinomial=multinomial, basic=basic)
expr = self
if hints.pop('frac', False):
n, d = [a.expand(deep=deep, modulus=modulus, **hints)
for a in fraction(self)]
return n/d
elif hints.pop('denom', False):
n, d = fraction(self)
return n/d.expand(deep=deep, modulus=modulus, **hints)
elif hints.pop('numer', False):
n, d = fraction(self)
return n.expand(deep=deep, modulus=modulus, **hints)/d
# Although the hints are sorted here, an earlier hint may get applied
# at a given node in the expression tree before another because of how
# the hints are applied. e.g. expand(log(x*(y + z))) -> log(x*y +
# x*z) because while applying log at the top level, log and mul are
# applied at the deeper level in the tree so that when the log at the
# upper level gets applied, the mul has already been applied at the
# lower level.
# Additionally, because hints are only applied once, the expression
# may not be expanded all the way. For example, if mul is applied
# before multinomial, x*(x + 1)**2 won't be expanded all the way. For
# now, we just use a special case to make multinomial run before mul,
# so that at least polynomials will be expanded all the way. In the
# future, smarter heuristics should be applied.
# TODO: Smarter heuristics
def _expand_hint_key(hint):
"""Make multinomial come before mul"""
if hint == 'mul':
return 'mulz'
return hint
for hint in sorted(hints.keys(), key=_expand_hint_key):
use_hint = hints[hint]
if use_hint:
hint = '_eval_expand_' + hint
expr, hit = Expr._expand_hint(expr, hint, deep=deep, **hints)
while True:
was = expr
if hints.get('multinomial', False):
expr, _ = Expr._expand_hint(
expr, '_eval_expand_multinomial', deep=deep, **hints)
if hints.get('mul', False):
expr, _ = Expr._expand_hint(
expr, '_eval_expand_mul', deep=deep, **hints)
if hints.get('log', False):
expr, _ = Expr._expand_hint(
expr, '_eval_expand_log', deep=deep, **hints)
if expr == was:
break
if modulus is not None:
modulus = sympify(modulus)
if not modulus.is_Integer or modulus <= 0:
raise ValueError(
"modulus must be a positive integer, got %s" % modulus)
terms = []
for term in Add.make_args(expr):
coeff, tail = term.as_coeff_Mul(rational=True)
coeff %= modulus
if coeff:
terms.append(coeff*tail)
expr = Add(*terms)
return expr
###########################################################################
################### GLOBAL ACTION VERB WRAPPER METHODS ####################
###########################################################################
def integrate(self, *args, **kwargs):
"""See the integrate function in sympy.integrals"""
from sympy.integrals import integrate
return integrate(self, *args, **kwargs)
def nsimplify(self, constants=[], tolerance=None, full=False):
"""See the nsimplify function in sympy.simplify"""
from sympy.simplify import nsimplify
return nsimplify(self, constants, tolerance, full)
def separate(self, deep=False, force=False):
"""See the separate function in sympy.simplify"""
from sympy.core.function import expand_power_base
return expand_power_base(self, deep=deep, force=force)
def collect(self, syms, func=None, evaluate=True, exact=False, distribute_order_term=True):
"""See the collect function in sympy.simplify"""
from sympy.simplify import collect
return collect(self, syms, func, evaluate, exact, distribute_order_term)
def together(self, *args, **kwargs):
"""See the together function in sympy.polys"""
from sympy.polys import together
return together(self, *args, **kwargs)
def apart(self, x=None, **args):
"""See the apart function in sympy.polys"""
from sympy.polys import apart
return apart(self, x, **args)
def ratsimp(self):
"""See the ratsimp function in sympy.simplify"""
from sympy.simplify import ratsimp
return ratsimp(self)
def trigsimp(self, **args):
"""See the trigsimp function in sympy.simplify"""
from sympy.simplify import trigsimp
return trigsimp(self, **args)
def radsimp(self, **kwargs):
"""See the radsimp function in sympy.simplify"""
from sympy.simplify import radsimp
return radsimp(self, **kwargs)
def powsimp(self, *args, **kwargs):
"""See the powsimp function in sympy.simplify"""
from sympy.simplify import powsimp
return powsimp(self, *args, **kwargs)
def combsimp(self):
"""See the combsimp function in sympy.simplify"""
from sympy.simplify import combsimp
return combsimp(self)
def gammasimp(self):
"""See the gammasimp function in sympy.simplify"""
from sympy.simplify import gammasimp
return gammasimp(self)
def factor(self, *gens, **args):
"""See the factor() function in sympy.polys.polytools"""
from sympy.polys import factor
return factor(self, *gens, **args)
def refine(self, assumption=True):
"""See the refine function in sympy.assumptions"""
from sympy.assumptions import refine
return refine(self, assumption)
def cancel(self, *gens, **args):
"""See the cancel function in sympy.polys"""
from sympy.polys import cancel
return cancel(self, *gens, **args)
def invert(self, g, *gens, **args):
"""Return the multiplicative inverse of ``self`` mod ``g``
where ``self`` (and ``g``) may be symbolic expressions).
See Also
========
sympy.core.numbers.mod_inverse, sympy.polys.polytools.invert
"""
from sympy.polys.polytools import invert
from sympy.core.numbers import mod_inverse
if self.is_number and getattr(g, 'is_number', True):
return mod_inverse(self, g)
return invert(self, g, *gens, **args)
def round(self, n=None):
"""Return x rounded to the given decimal place.
If a complex number would results, apply round to the real
and imaginary components of the number.
Examples
========
>>> from sympy import pi, E, I, S, Add, Mul, Number
>>> pi.round()
3
>>> pi.round(2)
3.14
>>> (2*pi + E*I).round()
6 + 3*I
The round method has a chopping effect:
>>> (2*pi + I/10).round()
6
>>> (pi/10 + 2*I).round()
2*I
>>> (pi/10 + E*I).round(2)
0.31 + 2.72*I
Notes
=====
The Python builtin function, round, always returns a
float in Python 2 while the SymPy round method (and
round with a Number argument in Python 3) returns a
Number.
>>> from sympy.core.compatibility import PY3
>>> isinstance(round(S(123), -2), Number if PY3 else float)
True
For a consistent behavior, and Python 3 rounding
rules, import `round` from sympy.core.compatibility.
>>> isinstance(round(S(123), -2), Number)
True
"""
from sympy.core.numbers import Float
x = self
if not x.is_number:
raise TypeError("can't round symbolic expression")
if not x.is_Atom:
if not pure_complex(x.n(2), or_real=True):
raise TypeError(
'Expected a number but got %s:' % func_name(x))
elif x in (S.NaN, S.Infinity, S.NegativeInfinity, S.ComplexInfinity):
return x
if not x.is_extended_real:
i, r = x.as_real_imag()
return i.round(n) + S.ImaginaryUnit*r.round(n)
if not x:
return S.Zero if n is None else x
p = as_int(n or 0)
if x.is_Integer:
return Integer(round(int(x), p))
digits_to_decimal = _mag(x) # _mag(12) = 2, _mag(.012) = -1
allow = digits_to_decimal + p
precs = [f._prec for f in x.atoms(Float)]
dps = prec_to_dps(max(precs)) if precs else None
if dps is None:
# assume everything is exact so use the Python
# float default or whatever was requested
dps = max(15, allow)
else:
allow = min(allow, dps)
# this will shift all digits to right of decimal
# and give us dps to work with as an int
shift = -digits_to_decimal + dps
extra = 1 # how far we look past known digits
# NOTE
# mpmath will calculate the binary representation to
# an arbitrary number of digits but we must base our
# answer on a finite number of those digits, e.g.
# .575 2589569785738035/2**52 in binary.
# mpmath shows us that the first 18 digits are
# >>> Float(.575).n(18)
# 0.574999999999999956
# The default precision is 15 digits and if we ask
# for 15 we get
# >>> Float(.575).n(15)
# 0.575000000000000
# mpmath handles rounding at the 15th digit. But we
# need to be careful since the user might be asking
# for rounding at the last digit and our semantics
# are to round toward the even final digit when there
# is a tie. So the extra digit will be used to make
# that decision. In this case, the value is the same
# to 15 digits:
# >>> Float(.575).n(16)
# 0.5750000000000000
# Now converting this to the 15 known digits gives
# 575000000000000.0
# which rounds to integer
# 5750000000000000
# And now we can round to the desired digt, e.g. at
# the second from the left and we get
# 5800000000000000
# and rescaling that gives
# 0.58
# as the final result.
# If the value is made slightly less than 0.575 we might
# still obtain the same value:
# >>> Float(.575-1e-16).n(16)*10**15
# 574999999999999.8
# What 15 digits best represents the known digits (which are
# to the left of the decimal? 5750000000000000, the same as
# before. The only way we will round down (in this case) is
# if we declared that we had more than 15 digits of precision.
# For example, if we use 16 digits of precision, the integer
# we deal with is
# >>> Float(.575-1e-16).n(17)*10**16
# 5749999999999998.4
# and this now rounds to 5749999999999998 and (if we round to
# the 2nd digit from the left) we get 5700000000000000.
#
xf = x.n(dps + extra)*Pow(10, shift)
xi = Integer(xf)
# use the last digit to select the value of xi
# nearest to x before rounding at the desired digit
sign = 1 if x > 0 else -1
dif2 = sign*(xf - xi).n(extra)
if dif2 < 0:
raise NotImplementedError(
'not expecting int(x) to round away from 0')
if dif2 > .5:
xi += sign # round away from 0
elif dif2 == .5:
xi += sign if xi%2 else -sign # round toward even
# shift p to the new position
ip = p - shift
# let Python handle the int rounding then rescale
xr = round(xi.p, ip)
# restore scale
rv = Rational(xr, Pow(10, shift))
# return Float or Integer
if rv.is_Integer:
if n is None: # the single-arg case
return rv
# use str or else it won't be a float
return Float(str(rv), dps) # keep same precision
else:
if not allow and rv > self:
allow += 1
return Float(rv, allow)
__round__ = round
def _eval_derivative_matrix_lines(self, x):
from sympy.matrices.expressions.matexpr import _LeftRightArgs
return [_LeftRightArgs([S.One, S.One], higher=self._eval_derivative(x))]
class AtomicExpr(Atom, Expr):
"""
A parent class for object which are both atoms and Exprs.
For example: Symbol, Number, Rational, Integer, ...
But not: Add, Mul, Pow, ...
"""
is_number = False
is_Atom = True
__slots__ = ()
def _eval_derivative(self, s):
if self == s:
return S.One
return S.Zero
def _eval_derivative_n_times(self, s, n):
from sympy import Piecewise, Eq
from sympy import Tuple, MatrixExpr
from sympy.matrices.common import MatrixCommon
if isinstance(s, (MatrixCommon, Tuple, Iterable, MatrixExpr)):
return super(AtomicExpr, self)._eval_derivative_n_times(s, n)
if self == s:
return Piecewise((self, Eq(n, 0)), (1, Eq(n, 1)), (0, True))
else:
return Piecewise((self, Eq(n, 0)), (0, True))
def _eval_is_polynomial(self, syms):
return True
def _eval_is_rational_function(self, syms):
return True
def _eval_is_algebraic_expr(self, syms):
return True
def _eval_nseries(self, x, n, logx):
return self
@property
def expr_free_symbols(self):
return {self}
def _mag(x):
"""Return integer ``i`` such that .1 <= x/10**i < 1
Examples
========
>>> from sympy.core.expr import _mag
>>> from sympy import Float
>>> _mag(Float(.1))
0
>>> _mag(Float(.01))
-1
>>> _mag(Float(1234))
4
"""
from math import log10, ceil, log
from sympy import Float
xpos = abs(x.n())
if not xpos:
return S.Zero
try:
mag_first_dig = int(ceil(log10(xpos)))
except (ValueError, OverflowError):
mag_first_dig = int(ceil(Float(mpf_log(xpos._mpf_, 53))/log(10)))
# check that we aren't off by 1
if (xpos/10**mag_first_dig) >= 1:
assert 1 <= (xpos/10**mag_first_dig) < 10
mag_first_dig += 1
return mag_first_dig
class UnevaluatedExpr(Expr):
"""
Expression that is not evaluated unless released.
Examples
========
>>> from sympy import UnevaluatedExpr
>>> from sympy.abc import a, b, x, y
>>> x*(1/x)
1
>>> x*UnevaluatedExpr(1/x)
x*1/x
"""
def __new__(cls, arg, **kwargs):
arg = _sympify(arg)
obj = Expr.__new__(cls, arg, **kwargs)
return obj
def doit(self, **kwargs):
if kwargs.get("deep", True):
return self.args[0].doit(**kwargs)
else:
return self.args[0]
def _n2(a, b):
"""Return (a - b).evalf(2) if a and b are comparable, else None.
This should only be used when a and b are already sympified.
"""
# /!\ it is very important (see issue 8245) not to
# use a re-evaluated number in the calculation of dif
if a.is_comparable and b.is_comparable:
dif = (a - b).evalf(2)
if dif.is_comparable:
return dif
def unchanged(func, *args):
"""Return True if `func` applied to the `args` is unchanged.
Can be used instead of `assert foo == foo`.
Examples
========
>>> from sympy import Piecewise, cos, pi
>>> from sympy.core.expr import unchanged
>>> from sympy.abc import x
>>> unchanged(cos, 1) # instead of assert cos(1) == cos(1)
True
>>> unchanged(cos, pi)
False
Comparison of args uses the builtin capabilities of the object's
arguments to test for equality so args can be defined loosely. Here,
the ExprCondPair arguments of Piecewise compare as equal to the
tuples that can be used to create the Piecewise:
>>> unchanged(Piecewise, (x, x > 1), (0, True))
True
"""
f = func(*args)
return f.func == func and f.args == args
class ExprBuilder(object):
def __init__(self, op, args=[], validator=None, check=True):
if not hasattr(op, "__call__"):
raise TypeError("op {} needs to be callable".format(op))
self.op = op
self.args = args
self.validator = validator
if (validator is not None) and check:
self.validate()
@staticmethod
def _build_args(args):
return [i.build() if isinstance(i, ExprBuilder) else i for i in args]
def validate(self):
if self.validator is None:
return
args = self._build_args(self.args)
self.validator(*args)
def build(self, check=True):
args = self._build_args(self.args)
if self.validator and check:
self.validator(*args)
return self.op(*args)
def append_argument(self, arg, check=True):
self.args.append(arg)
if self.validator and check:
self.validate(*self.args)
def __getitem__(self, item):
if item == 0:
return self.op
else:
return self.args[item-1]
def __repr__(self):
return str(self.build())
def search_element(self, elem):
for i, arg in enumerate(self.args):
if isinstance(arg, ExprBuilder):
ret = arg.search_index(elem)
if ret is not None:
return (i,) + ret
elif id(arg) == id(elem):
return (i,)
return None
from .mul import Mul
from .add import Add
from .power import Pow
from .function import Derivative, Function
from .mod import Mod
from .exprtools import factor_terms
from .numbers import Integer, Rational
|
545805cb8254ebff412881ba15d7b96a89b7dca73510e4375259dd8423eab117 | from __future__ import print_function, division
from typing import Dict, Type, Union
from sympy.utilities.exceptions import SymPyDeprecationWarning
from .add import _unevaluated_Add, Add
from .basic import S
from .compatibility import ordered
from .basic import Basic
from .expr import Expr
from .evalf import EvalfMixin
from .sympify import _sympify
from .parameters import global_parameters
from sympy.logic.boolalg import Boolean, BooleanAtom
__all__ = (
'Rel', 'Eq', 'Ne', 'Lt', 'Le', 'Gt', 'Ge',
'Relational', 'Equality', 'Unequality', 'StrictLessThan', 'LessThan',
'StrictGreaterThan', 'GreaterThan',
)
# Note, see issue 4986. Ideally, we wouldn't want to subclass both Boolean
# and Expr.
def _canonical(cond):
# return a condition in which all relationals are canonical
reps = {r: r.canonical for r in cond.atoms(Relational)}
return cond.xreplace(reps)
# XXX: AttributeError was being caught here but it wasn't triggered by any of
# the tests so I've removed it...
class Relational(Boolean, EvalfMixin):
"""Base class for all relation types.
Subclasses of Relational should generally be instantiated directly, but
Relational can be instantiated with a valid ``rop`` value to dispatch to
the appropriate subclass.
Parameters
==========
rop : str or None
Indicates what subclass to instantiate. Valid values can be found
in the keys of Relational.ValidRelationOperator.
Examples
========
>>> from sympy import Rel
>>> from sympy.abc import x, y
>>> Rel(y, x + x**2, '==')
Eq(y, x**2 + x)
"""
__slots__ = ()
ValidRelationOperator = {} # type: Dict[Union[str, None], Type[Relational]]
is_Relational = True
# ValidRelationOperator - Defined below, because the necessary classes
# have not yet been defined
def __new__(cls, lhs, rhs, rop=None, **assumptions):
# If called by a subclass, do nothing special and pass on to Basic.
if cls is not Relational:
return Basic.__new__(cls, lhs, rhs, **assumptions)
# XXX: Why do this? There should be a separate function to make a
# particular subclass of Relational from a string.
#
# If called directly with an operator, look up the subclass
# corresponding to that operator and delegate to it
cls = cls.ValidRelationOperator.get(rop, None)
if cls is None:
raise ValueError("Invalid relational operator symbol: %r" % rop)
# XXX: Why should the below be removed when Py2 is not supported?
#
# /// drop when Py2 is no longer supported
if not issubclass(cls, (Eq, Ne)):
# validate that Booleans are not being used in a relational
# other than Eq/Ne;
# Note: Symbol is a subclass of Boolean but is considered
# acceptable here.
from sympy.core.symbol import Symbol
from sympy.logic.boolalg import Boolean
def unacceptable(side):
return isinstance(side, Boolean) and not isinstance(side, Symbol)
if unacceptable(lhs) or unacceptable(rhs):
from sympy.utilities.misc import filldedent
raise TypeError(filldedent('''
A Boolean argument can only be used in
Eq and Ne; all other relationals expect
real expressions.
'''))
# \\\
return cls(lhs, rhs, **assumptions)
@property
def lhs(self):
"""The left-hand side of the relation."""
return self._args[0]
@property
def rhs(self):
"""The right-hand side of the relation."""
return self._args[1]
@property
def reversed(self):
"""Return the relationship with sides reversed.
Examples
========
>>> from sympy import Eq
>>> from sympy.abc import x
>>> Eq(x, 1)
Eq(x, 1)
>>> _.reversed
Eq(1, x)
>>> x < 1
x < 1
>>> _.reversed
1 > x
"""
ops = {Eq: Eq, Gt: Lt, Ge: Le, Lt: Gt, Le: Ge, Ne: Ne}
a, b = self.args
return Relational.__new__(ops.get(self.func, self.func), b, a)
@property
def reversedsign(self):
"""Return the relationship with signs reversed.
Examples
========
>>> from sympy import Eq
>>> from sympy.abc import x
>>> Eq(x, 1)
Eq(x, 1)
>>> _.reversedsign
Eq(-x, -1)
>>> x < 1
x < 1
>>> _.reversedsign
-x > -1
"""
a, b = self.args
if not (isinstance(a, BooleanAtom) or isinstance(b, BooleanAtom)):
ops = {Eq: Eq, Gt: Lt, Ge: Le, Lt: Gt, Le: Ge, Ne: Ne}
return Relational.__new__(ops.get(self.func, self.func), -a, -b)
else:
return self
@property
def negated(self):
"""Return the negated relationship.
Examples
========
>>> from sympy import Eq
>>> from sympy.abc import x
>>> Eq(x, 1)
Eq(x, 1)
>>> _.negated
Ne(x, 1)
>>> x < 1
x < 1
>>> _.negated
x >= 1
Notes
=====
This works more or less identical to ``~``/``Not``. The difference is
that ``negated`` returns the relationship even if ``evaluate=False``.
Hence, this is useful in code when checking for e.g. negated relations
to existing ones as it will not be affected by the `evaluate` flag.
"""
ops = {Eq: Ne, Ge: Lt, Gt: Le, Le: Gt, Lt: Ge, Ne: Eq}
# If there ever will be new Relational subclasses, the following line
# will work until it is properly sorted out
# return ops.get(self.func, lambda a, b, evaluate=False: ~(self.func(a,
# b, evaluate=evaluate)))(*self.args, evaluate=False)
return Relational.__new__(ops.get(self.func), *self.args)
def _eval_evalf(self, prec):
return self.func(*[s._evalf(prec) for s in self.args])
@property
def canonical(self):
"""Return a canonical form of the relational by putting a
Number on the rhs else ordering the args. The relation is also changed
so that the left-hand side expression does not start with a ``-``.
No other simplification is attempted.
Examples
========
>>> from sympy.abc import x, y
>>> x < 2
x < 2
>>> _.reversed.canonical
x < 2
>>> (-y < x).canonical
x > -y
>>> (-y > x).canonical
x < -y
"""
args = self.args
r = self
if r.rhs.is_number:
if r.rhs.is_Number and r.lhs.is_Number and r.lhs > r.rhs:
r = r.reversed
elif r.lhs.is_number:
r = r.reversed
elif tuple(ordered(args)) != args:
r = r.reversed
LHS_CEMS = getattr(r.lhs, 'could_extract_minus_sign', None)
RHS_CEMS = getattr(r.rhs, 'could_extract_minus_sign', None)
if isinstance(r.lhs, BooleanAtom) or isinstance(r.rhs, BooleanAtom):
return r
# Check if first value has negative sign
if LHS_CEMS and LHS_CEMS():
return r.reversedsign
elif not r.rhs.is_number and RHS_CEMS and RHS_CEMS():
# Right hand side has a minus, but not lhs.
# How does the expression with reversed signs behave?
# This is so that expressions of the type
# Eq(x, -y) and Eq(-x, y)
# have the same canonical representation
expr1, _ = ordered([r.lhs, -r.rhs])
if expr1 != r.lhs:
return r.reversed.reversedsign
return r
def equals(self, other, failing_expression=False):
"""Return True if the sides of the relationship are mathematically
identical and the type of relationship is the same.
If failing_expression is True, return the expression whose truth value
was unknown."""
if isinstance(other, Relational):
if self == other or self.reversed == other:
return True
a, b = self, other
if a.func in (Eq, Ne) or b.func in (Eq, Ne):
if a.func != b.func:
return False
left, right = [i.equals(j,
failing_expression=failing_expression)
for i, j in zip(a.args, b.args)]
if left is True:
return right
if right is True:
return left
lr, rl = [i.equals(j, failing_expression=failing_expression)
for i, j in zip(a.args, b.reversed.args)]
if lr is True:
return rl
if rl is True:
return lr
e = (left, right, lr, rl)
if all(i is False for i in e):
return False
for i in e:
if i not in (True, False):
return i
else:
if b.func != a.func:
b = b.reversed
if a.func != b.func:
return False
left = a.lhs.equals(b.lhs,
failing_expression=failing_expression)
if left is False:
return False
right = a.rhs.equals(b.rhs,
failing_expression=failing_expression)
if right is False:
return False
if left is True:
return right
return left
def _eval_simplify(self, **kwargs):
r = self
r = r.func(*[i.simplify(**kwargs) for i in r.args])
if r.is_Relational:
dif = r.lhs - r.rhs
# replace dif with a valid Number that will
# allow a definitive comparison with 0
v = None
if dif.is_comparable:
v = dif.n(2)
elif dif.equals(0): # XXX this is expensive
v = S.Zero
if v is not None:
r = r.func._eval_relation(v, S.Zero)
r = r.canonical
# If there is only one symbol in the expression,
# try to write it on a simplified form
free = list(filter(lambda x: x.is_real is not False, r.free_symbols))
if len(free) == 1:
try:
from sympy.solvers.solveset import linear_coeffs
x = free.pop()
dif = r.lhs - r.rhs
m, b = linear_coeffs(dif, x)
if m.is_zero is False:
if m.is_negative:
# Dividing with a negative number, so change order of arguments
# canonical will put the symbol back on the lhs later
r = r.func(-b/m, x)
else:
r = r.func(x, -b/m)
else:
r = r.func(b, S.zero)
except ValueError:
# maybe not a linear function, try polynomial
from sympy.polys import Poly, poly, PolynomialError, gcd
try:
p = poly(dif, x)
c = p.all_coeffs()
constant = c[-1]
c[-1] = 0
scale = gcd(c)
c = [ctmp/scale for ctmp in c]
r = r.func(Poly.from_list(c, x).as_expr(), -constant/scale)
except PolynomialError:
pass
elif len(free) >= 2:
try:
from sympy.solvers.solveset import linear_coeffs
from sympy.polys import gcd
free = list(ordered(free))
dif = r.lhs - r.rhs
m = linear_coeffs(dif, *free)
constant = m[-1]
del m[-1]
scale = gcd(m)
m = [mtmp/scale for mtmp in m]
nzm = list(filter(lambda f: f[0] != 0, list(zip(m, free))))
if scale.is_zero is False:
if constant != 0:
# lhs: expression, rhs: constant
newexpr = Add(*[i*j for i, j in nzm])
r = r.func(newexpr, -constant/scale)
else:
# keep first term on lhs
lhsterm = nzm[0][0]*nzm[0][1]
del nzm[0]
newexpr = Add(*[i*j for i, j in nzm])
r = r.func(lhsterm, -newexpr)
else:
r = r.func(constant, S.zero)
except ValueError:
pass
# Did we get a simplified result?
r = r.canonical
measure = kwargs['measure']
if measure(r) < kwargs['ratio']*measure(self):
return r
else:
return self
def _eval_trigsimp(self, **opts):
from sympy.simplify import trigsimp
return self.func(trigsimp(self.lhs, **opts), trigsimp(self.rhs, **opts))
def expand(self, **kwargs):
args = (arg.expand(**kwargs) for arg in self.args)
return self.func(*args)
def __nonzero__(self):
raise TypeError("cannot determine truth value of Relational")
__bool__ = __nonzero__
def _eval_as_set(self):
# self is univariate and periodicity(self, x) in (0, None)
from sympy.solvers.inequalities import solve_univariate_inequality
from sympy.sets.conditionset import ConditionSet
syms = self.free_symbols
assert len(syms) == 1
x = syms.pop()
try:
xset = solve_univariate_inequality(self, x, relational=False)
except NotImplementedError:
# solve_univariate_inequality raises NotImplementedError for
# unsolvable equations/inequalities.
xset = ConditionSet(x, self, S.Reals)
return xset
@property
def binary_symbols(self):
# override where necessary
return set()
Rel = Relational
class Equality(Relational):
"""An equal relation between two objects.
Represents that two objects are equal. If they can be easily shown
to be definitively equal (or unequal), this will reduce to True (or
False). Otherwise, the relation is maintained as an unevaluated
Equality object. Use the ``simplify`` function on this object for
more nontrivial evaluation of the equality relation.
As usual, the keyword argument ``evaluate=False`` can be used to
prevent any evaluation.
Examples
========
>>> from sympy import Eq, simplify, exp, cos
>>> from sympy.abc import x, y
>>> Eq(y, x + x**2)
Eq(y, x**2 + x)
>>> Eq(2, 5)
False
>>> Eq(2, 5, evaluate=False)
Eq(2, 5)
>>> _.doit()
False
>>> Eq(exp(x), exp(x).rewrite(cos))
Eq(exp(x), sinh(x) + cosh(x))
>>> simplify(_)
True
See Also
========
sympy.logic.boolalg.Equivalent : for representing equality between two
boolean expressions
Notes
=====
This class is not the same as the == operator. The == operator tests
for exact structural equality between two expressions; this class
compares expressions mathematically.
If either object defines an `_eval_Eq` method, it can be used in place of
the default algorithm. If `lhs._eval_Eq(rhs)` or `rhs._eval_Eq(lhs)`
returns anything other than None, that return value will be substituted for
the Equality. If None is returned by `_eval_Eq`, an Equality object will
be created as usual.
Since this object is already an expression, it does not respond to
the method `as_expr` if one tries to create `x - y` from Eq(x, y).
This can be done with the `rewrite(Add)` method.
"""
rel_op = '=='
__slots__ = ()
is_Equality = True
def __new__(cls, lhs, rhs=None, **options):
from sympy.core.add import Add
from sympy.core.logic import fuzzy_bool, fuzzy_xor, fuzzy_and, fuzzy_not
from sympy.core.expr import _n2
from sympy.functions.elementary.complexes import arg
from sympy.simplify.simplify import clear_coefficients
from sympy.utilities.iterables import sift
if rhs is None:
SymPyDeprecationWarning(
feature="Eq(expr) with rhs default to 0",
useinstead="Eq(expr, 0)",
issue=16587,
deprecated_since_version="1.5"
).warn()
rhs = 0
lhs = _sympify(lhs)
rhs = _sympify(rhs)
evaluate = options.pop('evaluate', global_parameters.evaluate)
if evaluate:
# If one expression has an _eval_Eq, return its results.
if hasattr(lhs, '_eval_Eq'):
r = lhs._eval_Eq(rhs)
if r is not None:
return r
if hasattr(rhs, '_eval_Eq'):
r = rhs._eval_Eq(lhs)
if r is not None:
return r
# If expressions have the same structure, they must be equal.
if lhs == rhs:
return S.true # e.g. True == True
elif all(isinstance(i, BooleanAtom) for i in (rhs, lhs)):
return S.false # True != False
elif not (lhs.is_Symbol or rhs.is_Symbol) and (
isinstance(lhs, Boolean) !=
isinstance(rhs, Boolean)):
return S.false # only Booleans can equal Booleans
if lhs.is_infinite or rhs.is_infinite:
if fuzzy_xor([lhs.is_infinite, rhs.is_infinite]):
return S.false
if fuzzy_xor([lhs.is_extended_real, rhs.is_extended_real]):
return S.false
if fuzzy_and([lhs.is_extended_real, rhs.is_extended_real]):
r = fuzzy_xor([lhs.is_extended_positive, fuzzy_not(rhs.is_extended_positive)])
return S(r)
# Try to split real/imaginary parts and equate them
I = S.ImaginaryUnit
def split_real_imag(expr):
real_imag = lambda t: (
'real' if t.is_extended_real else
'imag' if (I*t).is_extended_real else None)
return sift(Add.make_args(expr), real_imag)
lhs_ri = split_real_imag(lhs)
if not lhs_ri[None]:
rhs_ri = split_real_imag(rhs)
if not rhs_ri[None]:
eq_real = Eq(Add(*lhs_ri['real']), Add(*rhs_ri['real']))
eq_imag = Eq(I*Add(*lhs_ri['imag']), I*Add(*rhs_ri['imag']))
res = fuzzy_and(map(fuzzy_bool, [eq_real, eq_imag]))
if res is not None:
return S(res)
# Compare e.g. zoo with 1+I*oo by comparing args
arglhs = arg(lhs)
argrhs = arg(rhs)
# Guard against Eq(nan, nan) -> False
if not (arglhs == S.NaN and argrhs == S.NaN):
res = fuzzy_bool(Eq(arglhs, argrhs))
if res is not None:
return S(res)
return Relational.__new__(cls, lhs, rhs, **options)
if all(isinstance(i, Expr) for i in (lhs, rhs)):
# see if the difference evaluates
dif = lhs - rhs
z = dif.is_zero
if z is not None:
if z is False and dif.is_commutative: # issue 10728
return S.false
if z:
return S.true
# evaluate numerically if possible
n2 = _n2(lhs, rhs)
if n2 is not None:
return _sympify(n2 == 0)
# see if the ratio evaluates
n, d = dif.as_numer_denom()
rv = None
if n.is_zero:
rv = d.is_nonzero
elif n.is_finite:
if d.is_infinite:
rv = S.true
elif n.is_zero is False:
rv = d.is_infinite
if rv is None:
# if the condition that makes the denominator
# infinite does not make the original expression
# True then False can be returned
l, r = clear_coefficients(d, S.Infinity)
args = [_.subs(l, r) for _ in (lhs, rhs)]
if args != [lhs, rhs]:
rv = fuzzy_bool(Eq(*args))
if rv is True:
rv = None
elif any(a.is_infinite for a in Add.make_args(n)):
# (inf or nan)/x != 0
rv = S.false
if rv is not None:
return _sympify(rv)
return Relational.__new__(cls, lhs, rhs, **options)
@classmethod
def _eval_relation(cls, lhs, rhs):
return _sympify(lhs == rhs)
def _eval_rewrite_as_Add(self, *args, **kwargs):
"""return Eq(L, R) as L - R. To control the evaluation of
the result set pass `evaluate=True` to give L - R;
if `evaluate=None` then terms in L and R will not cancel
but they will be listed in canonical order; otherwise
non-canonical args will be returned.
Examples
========
>>> from sympy import Eq, Add
>>> from sympy.abc import b, x
>>> eq = Eq(x + b, x - b)
>>> eq.rewrite(Add)
2*b
>>> eq.rewrite(Add, evaluate=None).args
(b, b, x, -x)
>>> eq.rewrite(Add, evaluate=False).args
(b, x, b, -x)
"""
L, R = args
evaluate = kwargs.get('evaluate', True)
if evaluate:
# allow cancellation of args
return L - R
args = Add.make_args(L) + Add.make_args(-R)
if evaluate is None:
# no cancellation, but canonical
return _unevaluated_Add(*args)
# no cancellation, not canonical
return Add._from_args(args)
@property
def binary_symbols(self):
if S.true in self.args or S.false in self.args:
if self.lhs.is_Symbol:
return set([self.lhs])
elif self.rhs.is_Symbol:
return set([self.rhs])
return set()
def _eval_simplify(self, **kwargs):
from sympy.solvers.solveset import linear_coeffs
# standard simplify
e = super(Equality, self)._eval_simplify(**kwargs)
if not isinstance(e, Equality):
return e
free = self.free_symbols
if len(free) == 1:
try:
x = free.pop()
m, b = linear_coeffs(
e.rewrite(Add, evaluate=False), x)
if m.is_zero is False:
enew = e.func(x, -b/m)
else:
enew = e.func(m*x, -b)
measure = kwargs['measure']
if measure(enew) <= kwargs['ratio']*measure(e):
e = enew
except ValueError:
pass
return e.canonical
def integrate(self, *args, **kwargs):
"""See the integrate function in sympy.integrals"""
from sympy.integrals import integrate
return integrate(self, *args, **kwargs)
def as_poly(self, *gens, **kwargs):
'''Returns lhs-rhs as a Poly
Examples
========
>>> from sympy import Eq
>>> from sympy.abc import x, y
>>> Eq(x**2, 1).as_poly(x)
Poly(x**2 - 1, x, domain='ZZ')
'''
return (self.lhs - self.rhs).as_poly(*gens, **kwargs)
Eq = Equality
class Unequality(Relational):
"""An unequal relation between two objects.
Represents that two objects are not equal. If they can be shown to be
definitively equal, this will reduce to False; if definitively unequal,
this will reduce to True. Otherwise, the relation is maintained as an
Unequality object.
Examples
========
>>> from sympy import Ne
>>> from sympy.abc import x, y
>>> Ne(y, x+x**2)
Ne(y, x**2 + x)
See Also
========
Equality
Notes
=====
This class is not the same as the != operator. The != operator tests
for exact structural equality between two expressions; this class
compares expressions mathematically.
This class is effectively the inverse of Equality. As such, it uses the
same algorithms, including any available `_eval_Eq` methods.
"""
rel_op = '!='
__slots__ = ()
def __new__(cls, lhs, rhs, **options):
lhs = _sympify(lhs)
rhs = _sympify(rhs)
evaluate = options.pop('evaluate', global_parameters.evaluate)
if evaluate:
is_equal = Equality(lhs, rhs)
if isinstance(is_equal, BooleanAtom):
return is_equal.negated
return Relational.__new__(cls, lhs, rhs, **options)
@classmethod
def _eval_relation(cls, lhs, rhs):
return _sympify(lhs != rhs)
@property
def binary_symbols(self):
if S.true in self.args or S.false in self.args:
if self.lhs.is_Symbol:
return set([self.lhs])
elif self.rhs.is_Symbol:
return set([self.rhs])
return set()
def _eval_simplify(self, **kwargs):
# simplify as an equality
eq = Equality(*self.args)._eval_simplify(**kwargs)
if isinstance(eq, Equality):
# send back Ne with the new args
return self.func(*eq.args)
return eq.negated # result of Ne is the negated Eq
Ne = Unequality
class _Inequality(Relational):
"""Internal base class for all *Than types.
Each subclass must implement _eval_relation to provide the method for
comparing two real numbers.
"""
__slots__ = ()
def __new__(cls, lhs, rhs, **options):
lhs = _sympify(lhs)
rhs = _sympify(rhs)
evaluate = options.pop('evaluate', global_parameters.evaluate)
if evaluate:
# First we invoke the appropriate inequality method of `lhs`
# (e.g., `lhs.__lt__`). That method will try to reduce to
# boolean or raise an exception. It may keep calling
# superclasses until it reaches `Expr` (e.g., `Expr.__lt__`).
# In some cases, `Expr` will just invoke us again (if neither it
# nor a subclass was able to reduce to boolean or raise an
# exception). In that case, it must call us with
# `evaluate=False` to prevent infinite recursion.
r = cls._eval_relation(lhs, rhs)
if r is not None:
return r
# Note: not sure r could be None, perhaps we never take this
# path? In principle, could use this to shortcut out if a
# class realizes the inequality cannot be evaluated further.
# make a "non-evaluated" Expr for the inequality
return Relational.__new__(cls, lhs, rhs, **options)
class _Greater(_Inequality):
"""Not intended for general use
_Greater is only used so that GreaterThan and StrictGreaterThan may
subclass it for the .gts and .lts properties.
"""
__slots__ = ()
@property
def gts(self):
return self._args[0]
@property
def lts(self):
return self._args[1]
class _Less(_Inequality):
"""Not intended for general use.
_Less is only used so that LessThan and StrictLessThan may subclass it for
the .gts and .lts properties.
"""
__slots__ = ()
@property
def gts(self):
return self._args[1]
@property
def lts(self):
return self._args[0]
class GreaterThan(_Greater):
"""Class representations of inequalities.
Extended Summary
================
The ``*Than`` classes represent inequal relationships, where the left-hand
side is generally bigger or smaller than the right-hand side. For example,
the GreaterThan class represents an inequal relationship where the
left-hand side is at least as big as the right side, if not bigger. In
mathematical notation:
lhs >= rhs
In total, there are four ``*Than`` classes, to represent the four
inequalities:
+-----------------+--------+
|Class Name | Symbol |
+=================+========+
|GreaterThan | (>=) |
+-----------------+--------+
|LessThan | (<=) |
+-----------------+--------+
|StrictGreaterThan| (>) |
+-----------------+--------+
|StrictLessThan | (<) |
+-----------------+--------+
All classes take two arguments, lhs and rhs.
+----------------------------+-----------------+
|Signature Example | Math equivalent |
+============================+=================+
|GreaterThan(lhs, rhs) | lhs >= rhs |
+----------------------------+-----------------+
|LessThan(lhs, rhs) | lhs <= rhs |
+----------------------------+-----------------+
|StrictGreaterThan(lhs, rhs) | lhs > rhs |
+----------------------------+-----------------+
|StrictLessThan(lhs, rhs) | lhs < rhs |
+----------------------------+-----------------+
In addition to the normal .lhs and .rhs of Relations, ``*Than`` inequality
objects also have the .lts and .gts properties, which represent the "less
than side" and "greater than side" of the operator. Use of .lts and .gts
in an algorithm rather than .lhs and .rhs as an assumption of inequality
direction will make more explicit the intent of a certain section of code,
and will make it similarly more robust to client code changes:
>>> from sympy import GreaterThan, StrictGreaterThan
>>> from sympy import LessThan, StrictLessThan
>>> from sympy import And, Ge, Gt, Le, Lt, Rel, S
>>> from sympy.abc import x, y, z
>>> from sympy.core.relational import Relational
>>> e = GreaterThan(x, 1)
>>> e
x >= 1
>>> '%s >= %s is the same as %s <= %s' % (e.gts, e.lts, e.lts, e.gts)
'x >= 1 is the same as 1 <= x'
Examples
========
One generally does not instantiate these classes directly, but uses various
convenience methods:
>>> for f in [Ge, Gt, Le, Lt]: # convenience wrappers
... print(f(x, 2))
x >= 2
x > 2
x <= 2
x < 2
Another option is to use the Python inequality operators (>=, >, <=, <)
directly. Their main advantage over the Ge, Gt, Le, and Lt counterparts,
is that one can write a more "mathematical looking" statement rather than
littering the math with oddball function calls. However there are certain
(minor) caveats of which to be aware (search for 'gotcha', below).
>>> x >= 2
x >= 2
>>> _ == Ge(x, 2)
True
However, it is also perfectly valid to instantiate a ``*Than`` class less
succinctly and less conveniently:
>>> Rel(x, 1, ">")
x > 1
>>> Relational(x, 1, ">")
x > 1
>>> StrictGreaterThan(x, 1)
x > 1
>>> GreaterThan(x, 1)
x >= 1
>>> LessThan(x, 1)
x <= 1
>>> StrictLessThan(x, 1)
x < 1
Notes
=====
There are a couple of "gotchas" to be aware of when using Python's
operators.
The first is that what your write is not always what you get:
>>> 1 < x
x > 1
Due to the order that Python parses a statement, it may
not immediately find two objects comparable. When "1 < x"
is evaluated, Python recognizes that the number 1 is a native
number and that x is *not*. Because a native Python number does
not know how to compare itself with a SymPy object
Python will try the reflective operation, "x > 1" and that is the
form that gets evaluated, hence returned.
If the order of the statement is important (for visual output to
the console, perhaps), one can work around this annoyance in a
couple ways:
(1) "sympify" the literal before comparison
>>> S(1) < x
1 < x
(2) use one of the wrappers or less succinct methods described
above
>>> Lt(1, x)
1 < x
>>> Relational(1, x, "<")
1 < x
The second gotcha involves writing equality tests between relationals
when one or both sides of the test involve a literal relational:
>>> e = x < 1; e
x < 1
>>> e == e # neither side is a literal
True
>>> e == x < 1 # expecting True, too
False
>>> e != x < 1 # expecting False
x < 1
>>> x < 1 != x < 1 # expecting False or the same thing as before
Traceback (most recent call last):
...
TypeError: cannot determine truth value of Relational
The solution for this case is to wrap literal relationals in
parentheses:
>>> e == (x < 1)
True
>>> e != (x < 1)
False
>>> (x < 1) != (x < 1)
False
The third gotcha involves chained inequalities not involving
'==' or '!='. Occasionally, one may be tempted to write:
>>> e = x < y < z
Traceback (most recent call last):
...
TypeError: symbolic boolean expression has no truth value.
Due to an implementation detail or decision of Python [1]_,
there is no way for SymPy to create a chained inequality with
that syntax so one must use And:
>>> e = And(x < y, y < z)
>>> type( e )
And
>>> e
(x < y) & (y < z)
Although this can also be done with the '&' operator, it cannot
be done with the 'and' operarator:
>>> (x < y) & (y < z)
(x < y) & (y < z)
>>> (x < y) and (y < z)
Traceback (most recent call last):
...
TypeError: cannot determine truth value of Relational
.. [1] This implementation detail is that Python provides no reliable
method to determine that a chained inequality is being built.
Chained comparison operators are evaluated pairwise, using "and"
logic (see
http://docs.python.org/2/reference/expressions.html#notin). This
is done in an efficient way, so that each object being compared
is only evaluated once and the comparison can short-circuit. For
example, ``1 > 2 > 3`` is evaluated by Python as ``(1 > 2) and (2
> 3)``. The ``and`` operator coerces each side into a bool,
returning the object itself when it short-circuits. The bool of
the --Than operators will raise TypeError on purpose, because
SymPy cannot determine the mathematical ordering of symbolic
expressions. Thus, if we were to compute ``x > y > z``, with
``x``, ``y``, and ``z`` being Symbols, Python converts the
statement (roughly) into these steps:
(1) x > y > z
(2) (x > y) and (y > z)
(3) (GreaterThanObject) and (y > z)
(4) (GreaterThanObject.__nonzero__()) and (y > z)
(5) TypeError
Because of the "and" added at step 2, the statement gets turned into a
weak ternary statement, and the first object's __nonzero__ method will
raise TypeError. Thus, creating a chained inequality is not possible.
In Python, there is no way to override the ``and`` operator, or to
control how it short circuits, so it is impossible to make something
like ``x > y > z`` work. There was a PEP to change this,
:pep:`335`, but it was officially closed in March, 2012.
"""
__slots__ = ()
rel_op = '>='
@classmethod
def _eval_relation(cls, lhs, rhs):
# We don't use the op symbol here: workaround issue #7951
return _sympify(lhs.__ge__(rhs))
Ge = GreaterThan
class LessThan(_Less):
__doc__ = GreaterThan.__doc__
__slots__ = ()
rel_op = '<='
@classmethod
def _eval_relation(cls, lhs, rhs):
# We don't use the op symbol here: workaround issue #7951
return _sympify(lhs.__le__(rhs))
Le = LessThan
class StrictGreaterThan(_Greater):
__doc__ = GreaterThan.__doc__
__slots__ = ()
rel_op = '>'
@classmethod
def _eval_relation(cls, lhs, rhs):
# We don't use the op symbol here: workaround issue #7951
return _sympify(lhs.__gt__(rhs))
Gt = StrictGreaterThan
class StrictLessThan(_Less):
__doc__ = GreaterThan.__doc__
__slots__ = ()
rel_op = '<'
@classmethod
def _eval_relation(cls, lhs, rhs):
# We don't use the op symbol here: workaround issue #7951
return _sympify(lhs.__lt__(rhs))
Lt = StrictLessThan
# A class-specific (not object-specific) data item used for a minor speedup.
# It is defined here, rather than directly in the class, because the classes
# that it references have not been defined until now (e.g. StrictLessThan).
Relational.ValidRelationOperator = {
None: Equality,
'==': Equality,
'eq': Equality,
'!=': Unequality,
'<>': Unequality,
'ne': Unequality,
'>=': GreaterThan,
'ge': GreaterThan,
'<=': LessThan,
'le': LessThan,
'>': StrictGreaterThan,
'gt': StrictGreaterThan,
'<': StrictLessThan,
'lt': StrictLessThan,
}
|
b8c55d82bfa23577bfebd19d87938c1b80674ffbf5db49cdf4e5d82f369447da | from __future__ import absolute_import, print_function, division
import numbers
import decimal
import fractions
import math
import re as regex
from .containers import Tuple
from .sympify import converter, sympify, _sympify, SympifyError, _convert_numpy_types
from .singleton import S, Singleton
from .expr import Expr, AtomicExpr
from .evalf import pure_complex
from .decorators import _sympifyit
from .cache import cacheit, clear_cache
from .logic import fuzzy_not
from sympy.core.compatibility import (as_int, HAS_GMPY, SYMPY_INTS,
int_info, gmpy)
from sympy.core.cache import lru_cache
import mpmath
import mpmath.libmp as mlib
from mpmath.libmp import bitcount
from mpmath.libmp.backend import MPZ
from mpmath.libmp import mpf_pow, mpf_pi, mpf_e, phi_fixed
from mpmath.ctx_mp import mpnumeric
from mpmath.libmp.libmpf import (
finf as _mpf_inf, fninf as _mpf_ninf,
fnan as _mpf_nan, fzero, _normalize as mpf_normalize,
prec_to_dps)
from sympy.utilities.misc import debug, filldedent
from .parameters import global_parameters
from sympy.utilities.exceptions import SymPyDeprecationWarning
rnd = mlib.round_nearest
_LOG2 = math.log(2)
def comp(z1, z2, tol=None):
"""Return a bool indicating whether the error between z1 and z2
is <= tol.
Examples
========
If ``tol`` is None then True will be returned if
``abs(z1 - z2)*10**p <= 5`` where ``p`` is minimum value of the
decimal precision of each value.
>>> from sympy.core.numbers import comp, pi
>>> pi4 = pi.n(4); pi4
3.142
>>> comp(_, 3.142)
True
>>> comp(pi4, 3.141)
False
>>> comp(pi4, 3.143)
False
A comparison of strings will be made
if ``z1`` is a Number and ``z2`` is a string or ``tol`` is ''.
>>> comp(pi4, 3.1415)
True
>>> comp(pi4, 3.1415, '')
False
When ``tol`` is provided and ``z2`` is non-zero and
``|z1| > 1`` the error is normalized by ``|z1|``:
>>> abs(pi4 - 3.14)/pi4
0.000509791731426756
>>> comp(pi4, 3.14, .001) # difference less than 0.1%
True
>>> comp(pi4, 3.14, .0005) # difference less than 0.1%
False
When ``|z1| <= 1`` the absolute error is used:
>>> 1/pi4
0.3183
>>> abs(1/pi4 - 0.3183)/(1/pi4)
3.07371499106316e-5
>>> abs(1/pi4 - 0.3183)
9.78393554684764e-6
>>> comp(1/pi4, 0.3183, 1e-5)
True
To see if the absolute error between ``z1`` and ``z2`` is less
than or equal to ``tol``, call this as ``comp(z1 - z2, 0, tol)``
or ``comp(z1 - z2, tol=tol)``:
>>> abs(pi4 - 3.14)
0.00160156249999988
>>> comp(pi4 - 3.14, 0, .002)
True
>>> comp(pi4 - 3.14, 0, .001)
False
"""
if type(z2) is str:
if not pure_complex(z1, or_real=True):
raise ValueError('when z2 is a str z1 must be a Number')
return str(z1) == z2
if not z1:
z1, z2 = z2, z1
if not z1:
return True
if not tol:
a, b = z1, z2
if tol == '':
return str(a) == str(b)
if tol is None:
a, b = sympify(a), sympify(b)
if not all(i.is_number for i in (a, b)):
raise ValueError('expecting 2 numbers')
fa = a.atoms(Float)
fb = b.atoms(Float)
if not fa and not fb:
# no floats -- compare exactly
return a == b
# get a to be pure_complex
for do in range(2):
ca = pure_complex(a, or_real=True)
if not ca:
if fa:
a = a.n(prec_to_dps(min([i._prec for i in fa])))
ca = pure_complex(a, or_real=True)
break
else:
fa, fb = fb, fa
a, b = b, a
cb = pure_complex(b)
if not cb and fb:
b = b.n(prec_to_dps(min([i._prec for i in fb])))
cb = pure_complex(b, or_real=True)
if ca and cb and (ca[1] or cb[1]):
return all(comp(i, j) for i, j in zip(ca, cb))
tol = 10**prec_to_dps(min(a._prec, getattr(b, '_prec', a._prec)))
return int(abs(a - b)*tol) <= 5
diff = abs(z1 - z2)
az1 = abs(z1)
if z2 and az1 > 1:
return diff/az1 <= tol
else:
return diff <= tol
def mpf_norm(mpf, prec):
"""Return the mpf tuple normalized appropriately for the indicated
precision after doing a check to see if zero should be returned or
not when the mantissa is 0. ``mpf_normlize`` always assumes that this
is zero, but it may not be since the mantissa for mpf's values "+inf",
"-inf" and "nan" have a mantissa of zero, too.
Note: this is not intended to validate a given mpf tuple, so sending
mpf tuples that were not created by mpmath may produce bad results. This
is only a wrapper to ``mpf_normalize`` which provides the check for non-
zero mpfs that have a 0 for the mantissa.
"""
sign, man, expt, bc = mpf
if not man:
# hack for mpf_normalize which does not do this;
# it assumes that if man is zero the result is 0
# (see issue 6639)
if not bc:
return fzero
else:
# don't change anything; this should already
# be a well formed mpf tuple
return mpf
# Necessary if mpmath is using the gmpy backend
from mpmath.libmp.backend import MPZ
rv = mpf_normalize(sign, MPZ(man), expt, bc, prec, rnd)
return rv
# TODO: we should use the warnings module
_errdict = {"divide": False}
def seterr(divide=False):
"""
Should sympy raise an exception on 0/0 or return a nan?
divide == True .... raise an exception
divide == False ... return nan
"""
if _errdict["divide"] != divide:
clear_cache()
_errdict["divide"] = divide
def _as_integer_ratio(p):
neg_pow, man, expt, bc = getattr(p, '_mpf_', mpmath.mpf(p)._mpf_)
p = [1, -1][neg_pow % 2]*man
if expt < 0:
q = 2**-expt
else:
q = 1
p *= 2**expt
return int(p), int(q)
def _decimal_to_Rational_prec(dec):
"""Convert an ordinary decimal instance to a Rational."""
if not dec.is_finite():
raise TypeError("dec must be finite, got %s." % dec)
s, d, e = dec.as_tuple()
prec = len(d)
if e >= 0: # it's an integer
rv = Integer(int(dec))
else:
s = (-1)**s
d = sum([di*10**i for i, di in enumerate(reversed(d))])
rv = Rational(s*d, 10**-e)
return rv, prec
_floatpat = regex.compile(r"[-+]?((\d*\.\d+)|(\d+\.?))")
def _literal_float(f):
"""Return True if n starts like a floating point number."""
return bool(_floatpat.match(f))
# (a,b) -> gcd(a,b)
# TODO caching with decorator, but not to degrade performance
@lru_cache(1024)
def igcd(*args):
"""Computes nonnegative integer greatest common divisor.
The algorithm is based on the well known Euclid's algorithm. To
improve speed, igcd() has its own caching mechanism implemented.
Examples
========
>>> from sympy.core.numbers import igcd
>>> igcd(2, 4)
2
>>> igcd(5, 10, 15)
5
"""
if len(args) < 2:
raise TypeError(
'igcd() takes at least 2 arguments (%s given)' % len(args))
args_temp = [abs(as_int(i)) for i in args]
if 1 in args_temp:
return 1
a = args_temp.pop()
if HAS_GMPY: # Using gmpy if present to speed up.
for b in args_temp:
a = gmpy.gcd(a, b) if b else a
return as_int(a)
for b in args_temp:
a = igcd2(a, b) if b else a
return a
def _igcd2_python(a, b):
"""Compute gcd of two Python integers a and b."""
if (a.bit_length() > BIGBITS and
b.bit_length() > BIGBITS):
return igcd_lehmer(a, b)
a, b = abs(a), abs(b)
while b:
a, b = b, a % b
return a
try:
from math import gcd as igcd2
except ImportError:
igcd2 = _igcd2_python
# Use Lehmer's algorithm only for very large numbers.
# The limit could be different on Python 2.7 and 3.x.
# If so, then this could be defined in compatibility.py.
BIGBITS = 5000
def igcd_lehmer(a, b):
"""Computes greatest common divisor of two integers.
Euclid's algorithm for the computation of the greatest
common divisor gcd(a, b) of two (positive) integers
a and b is based on the division identity
a = q*b + r,
where the quotient q and the remainder r are integers
and 0 <= r < b. Then each common divisor of a and b
divides r, and it follows that gcd(a, b) == gcd(b, r).
The algorithm works by constructing the sequence
r0, r1, r2, ..., where r0 = a, r1 = b, and each rn
is the remainder from the division of the two preceding
elements.
In Python, q = a // b and r = a % b are obtained by the
floor division and the remainder operations, respectively.
These are the most expensive arithmetic operations, especially
for large a and b.
Lehmer's algorithm is based on the observation that the quotients
qn = r(n-1) // rn are in general small integers even
when a and b are very large. Hence the quotients can be
usually determined from a relatively small number of most
significant bits.
The efficiency of the algorithm is further enhanced by not
computing each long remainder in Euclid's sequence. The remainders
are linear combinations of a and b with integer coefficients
derived from the quotients. The coefficients can be computed
as far as the quotients can be determined from the chosen
most significant parts of a and b. Only then a new pair of
consecutive remainders is computed and the algorithm starts
anew with this pair.
References
==========
.. [1] https://en.wikipedia.org/wiki/Lehmer%27s_GCD_algorithm
"""
a, b = abs(as_int(a)), abs(as_int(b))
if a < b:
a, b = b, a
# The algorithm works by using one or two digit division
# whenever possible. The outer loop will replace the
# pair (a, b) with a pair of shorter consecutive elements
# of the Euclidean gcd sequence until a and b
# fit into two Python (long) int digits.
nbits = 2*int_info.bits_per_digit
while a.bit_length() > nbits and b != 0:
# Quotients are mostly small integers that can
# be determined from most significant bits.
n = a.bit_length() - nbits
x, y = int(a >> n), int(b >> n) # most significant bits
# Elements of the Euclidean gcd sequence are linear
# combinations of a and b with integer coefficients.
# Compute the coefficients of consecutive pairs
# a' = A*a + B*b, b' = C*a + D*b
# using small integer arithmetic as far as possible.
A, B, C, D = 1, 0, 0, 1 # initial values
while True:
# The coefficients alternate in sign while looping.
# The inner loop combines two steps to keep track
# of the signs.
# At this point we have
# A > 0, B <= 0, C <= 0, D > 0,
# x' = x + B <= x < x" = x + A,
# y' = y + C <= y < y" = y + D,
# and
# x'*N <= a' < x"*N, y'*N <= b' < y"*N,
# where N = 2**n.
# Now, if y' > 0, and x"//y' and x'//y" agree,
# then their common value is equal to q = a'//b'.
# In addition,
# x'%y" = x' - q*y" < x" - q*y' = x"%y',
# and
# (x'%y")*N < a'%b' < (x"%y')*N.
# On the other hand, we also have x//y == q,
# and therefore
# x'%y" = x + B - q*(y + D) = x%y + B',
# x"%y' = x + A - q*(y + C) = x%y + A',
# where
# B' = B - q*D < 0, A' = A - q*C > 0.
if y + C <= 0:
break
q = (x + A) // (y + C)
# Now x'//y" <= q, and equality holds if
# x' - q*y" = (x - q*y) + (B - q*D) >= 0.
# This is a minor optimization to avoid division.
x_qy, B_qD = x - q*y, B - q*D
if x_qy + B_qD < 0:
break
# Next step in the Euclidean sequence.
x, y = y, x_qy
A, B, C, D = C, D, A - q*C, B_qD
# At this point the signs of the coefficients
# change and their roles are interchanged.
# A <= 0, B > 0, C > 0, D < 0,
# x' = x + A <= x < x" = x + B,
# y' = y + D < y < y" = y + C.
if y + D <= 0:
break
q = (x + B) // (y + D)
x_qy, A_qC = x - q*y, A - q*C
if x_qy + A_qC < 0:
break
x, y = y, x_qy
A, B, C, D = C, D, A_qC, B - q*D
# Now the conditions on top of the loop
# are again satisfied.
# A > 0, B < 0, C < 0, D > 0.
if B == 0:
# This can only happen when y == 0 in the beginning
# and the inner loop does nothing.
# Long division is forced.
a, b = b, a % b
continue
# Compute new long arguments using the coefficients.
a, b = A*a + B*b, C*a + D*b
# Small divisors. Finish with the standard algorithm.
while b:
a, b = b, a % b
return a
def ilcm(*args):
"""Computes integer least common multiple.
Examples
========
>>> from sympy.core.numbers import ilcm
>>> ilcm(5, 10)
10
>>> ilcm(7, 3)
21
>>> ilcm(5, 10, 15)
30
"""
if len(args) < 2:
raise TypeError(
'ilcm() takes at least 2 arguments (%s given)' % len(args))
if 0 in args:
return 0
a = args[0]
for b in args[1:]:
a = a // igcd(a, b) * b # since gcd(a,b) | a
return a
def igcdex(a, b):
"""Returns x, y, g such that g = x*a + y*b = gcd(a, b).
>>> from sympy.core.numbers import igcdex
>>> igcdex(2, 3)
(-1, 1, 1)
>>> igcdex(10, 12)
(-1, 1, 2)
>>> x, y, g = igcdex(100, 2004)
>>> x, y, g
(-20, 1, 4)
>>> x*100 + y*2004
4
"""
if (not a) and (not b):
return (0, 1, 0)
if not a:
return (0, b//abs(b), abs(b))
if not b:
return (a//abs(a), 0, abs(a))
if a < 0:
a, x_sign = -a, -1
else:
x_sign = 1
if b < 0:
b, y_sign = -b, -1
else:
y_sign = 1
x, y, r, s = 1, 0, 0, 1
while b:
(c, q) = (a % b, a // b)
(a, b, r, s, x, y) = (b, c, x - q*r, y - q*s, r, s)
return (x*x_sign, y*y_sign, a)
def mod_inverse(a, m):
"""
Return the number c such that, (a * c) = 1 (mod m)
where c has the same sign as m. If no such value exists,
a ValueError is raised.
Examples
========
>>> from sympy import S
>>> from sympy.core.numbers import mod_inverse
Suppose we wish to find multiplicative inverse x of
3 modulo 11. This is the same as finding x such
that 3 * x = 1 (mod 11). One value of x that satisfies
this congruence is 4. Because 3 * 4 = 12 and 12 = 1 (mod 11).
This is the value returned by mod_inverse:
>>> mod_inverse(3, 11)
4
>>> mod_inverse(-3, 11)
7
When there is a common factor between the numerators of
``a`` and ``m`` the inverse does not exist:
>>> mod_inverse(2, 4)
Traceback (most recent call last):
...
ValueError: inverse of 2 mod 4 does not exist
>>> mod_inverse(S(2)/7, S(5)/2)
7/2
References
==========
- https://en.wikipedia.org/wiki/Modular_multiplicative_inverse
- https://en.wikipedia.org/wiki/Extended_Euclidean_algorithm
"""
c = None
try:
a, m = as_int(a), as_int(m)
if m != 1 and m != -1:
x, y, g = igcdex(a, m)
if g == 1:
c = x % m
except ValueError:
a, m = sympify(a), sympify(m)
if not (a.is_number and m.is_number):
raise TypeError(filldedent('''
Expected numbers for arguments; symbolic `mod_inverse`
is not implemented
but symbolic expressions can be handled with the
similar function,
sympy.polys.polytools.invert'''))
big = (m > 1)
if not (big is S.true or big is S.false):
raise ValueError('m > 1 did not evaluate; try to simplify %s' % m)
elif big:
c = 1/a
if c is None:
raise ValueError('inverse of %s (mod %s) does not exist' % (a, m))
return c
class Number(AtomicExpr):
"""Represents atomic numbers in SymPy.
Floating point numbers are represented by the Float class.
Rational numbers (of any size) are represented by the Rational class.
Integer numbers (of any size) are represented by the Integer class.
Float and Rational are subclasses of Number; Integer is a subclass
of Rational.
For example, ``2/3`` is represented as ``Rational(2, 3)`` which is
a different object from the floating point number obtained with
Python division ``2/3``. Even for numbers that are exactly
represented in binary, there is a difference between how two forms,
such as ``Rational(1, 2)`` and ``Float(0.5)``, are used in SymPy.
The rational form is to be preferred in symbolic computations.
Other kinds of numbers, such as algebraic numbers ``sqrt(2)`` or
complex numbers ``3 + 4*I``, are not instances of Number class as
they are not atomic.
See Also
========
Float, Integer, Rational
"""
is_commutative = True
is_number = True
is_Number = True
__slots__ = ()
# Used to make max(x._prec, y._prec) return x._prec when only x is a float
_prec = -1
def __new__(cls, *obj):
if len(obj) == 1:
obj = obj[0]
if isinstance(obj, Number):
return obj
if isinstance(obj, SYMPY_INTS):
return Integer(obj)
if isinstance(obj, tuple) and len(obj) == 2:
return Rational(*obj)
if isinstance(obj, (float, mpmath.mpf, decimal.Decimal)):
return Float(obj)
if isinstance(obj, str):
_obj = obj.lower() # float('INF') == float('inf')
if _obj == 'nan':
return S.NaN
elif _obj == 'inf':
return S.Infinity
elif _obj == '+inf':
return S.Infinity
elif _obj == '-inf':
return S.NegativeInfinity
val = sympify(obj)
if isinstance(val, Number):
return val
else:
raise ValueError('String "%s" does not denote a Number' % obj)
msg = "expected str|int|long|float|Decimal|Number object but got %r"
raise TypeError(msg % type(obj).__name__)
def invert(self, other, *gens, **args):
from sympy.polys.polytools import invert
if getattr(other, 'is_number', True):
return mod_inverse(self, other)
return invert(self, other, *gens, **args)
def __divmod__(self, other):
from .containers import Tuple
from sympy.functions.elementary.complexes import sign
try:
other = Number(other)
if self.is_infinite or S.NaN in (self, other):
return (S.NaN, S.NaN)
except TypeError:
return NotImplemented
if not other:
raise ZeroDivisionError('modulo by zero')
if self.is_Integer and other.is_Integer:
return Tuple(*divmod(self.p, other.p))
elif isinstance(other, Float):
rat = self/Rational(other)
else:
rat = self/other
if other.is_finite:
w = int(rat) if rat > 0 else int(rat) - 1
r = self - other*w
else:
w = 0 if not self or (sign(self) == sign(other)) else -1
r = other if w else self
return Tuple(w, r)
def __rdivmod__(self, other):
try:
other = Number(other)
except TypeError:
return NotImplemented
return divmod(other, self)
def _as_mpf_val(self, prec):
"""Evaluation of mpf tuple accurate to at least prec bits."""
raise NotImplementedError('%s needs ._as_mpf_val() method' %
(self.__class__.__name__))
def _eval_evalf(self, prec):
return Float._new(self._as_mpf_val(prec), prec)
def _as_mpf_op(self, prec):
prec = max(prec, self._prec)
return self._as_mpf_val(prec), prec
def __float__(self):
return mlib.to_float(self._as_mpf_val(53))
def floor(self):
raise NotImplementedError('%s needs .floor() method' %
(self.__class__.__name__))
def ceiling(self):
raise NotImplementedError('%s needs .ceiling() method' %
(self.__class__.__name__))
def __floor__(self):
return self.floor()
def __ceil__(self):
return self.ceiling()
def _eval_conjugate(self):
return self
def _eval_order(self, *symbols):
from sympy import Order
# Order(5, x, y) -> Order(1,x,y)
return Order(S.One, *symbols)
def _eval_subs(self, old, new):
if old == -self:
return -new
return self # there is no other possibility
def _eval_is_finite(self):
return True
@classmethod
def class_key(cls):
return 1, 0, 'Number'
@cacheit
def sort_key(self, order=None):
return self.class_key(), (0, ()), (), self
@_sympifyit('other', NotImplemented)
def __add__(self, other):
if isinstance(other, Number) and global_parameters.evaluate:
if other is S.NaN:
return S.NaN
elif other is S.Infinity:
return S.Infinity
elif other is S.NegativeInfinity:
return S.NegativeInfinity
return AtomicExpr.__add__(self, other)
@_sympifyit('other', NotImplemented)
def __sub__(self, other):
if isinstance(other, Number) and global_parameters.evaluate:
if other is S.NaN:
return S.NaN
elif other is S.Infinity:
return S.NegativeInfinity
elif other is S.NegativeInfinity:
return S.Infinity
return AtomicExpr.__sub__(self, other)
@_sympifyit('other', NotImplemented)
def __mul__(self, other):
if isinstance(other, Number) and global_parameters.evaluate:
if other is S.NaN:
return S.NaN
elif other is S.Infinity:
if self.is_zero:
return S.NaN
elif self.is_positive:
return S.Infinity
else:
return S.NegativeInfinity
elif other is S.NegativeInfinity:
if self.is_zero:
return S.NaN
elif self.is_positive:
return S.NegativeInfinity
else:
return S.Infinity
elif isinstance(other, Tuple):
return NotImplemented
return AtomicExpr.__mul__(self, other)
@_sympifyit('other', NotImplemented)
def __div__(self, other):
if isinstance(other, Number) and global_parameters.evaluate:
if other is S.NaN:
return S.NaN
elif other is S.Infinity or other is S.NegativeInfinity:
return S.Zero
return AtomicExpr.__div__(self, other)
__truediv__ = __div__
def __eq__(self, other):
raise NotImplementedError('%s needs .__eq__() method' %
(self.__class__.__name__))
def __ne__(self, other):
raise NotImplementedError('%s needs .__ne__() method' %
(self.__class__.__name__))
def __lt__(self, other):
try:
other = _sympify(other)
except SympifyError:
raise TypeError("Invalid comparison %s < %s" % (self, other))
raise NotImplementedError('%s needs .__lt__() method' %
(self.__class__.__name__))
def __le__(self, other):
try:
other = _sympify(other)
except SympifyError:
raise TypeError("Invalid comparison %s <= %s" % (self, other))
raise NotImplementedError('%s needs .__le__() method' %
(self.__class__.__name__))
def __gt__(self, other):
try:
other = _sympify(other)
except SympifyError:
raise TypeError("Invalid comparison %s > %s" % (self, other))
return _sympify(other).__lt__(self)
def __ge__(self, other):
try:
other = _sympify(other)
except SympifyError:
raise TypeError("Invalid comparison %s >= %s" % (self, other))
return _sympify(other).__le__(self)
def __hash__(self):
return super(Number, self).__hash__()
def is_constant(self, *wrt, **flags):
return True
def as_coeff_mul(self, *deps, **kwargs):
# a -> c*t
if self.is_Rational or not kwargs.pop('rational', True):
return self, tuple()
elif self.is_negative:
return S.NegativeOne, (-self,)
return S.One, (self,)
def as_coeff_add(self, *deps):
# a -> c + t
if self.is_Rational:
return self, tuple()
return S.Zero, (self,)
def as_coeff_Mul(self, rational=False):
"""Efficiently extract the coefficient of a product. """
if rational and not self.is_Rational:
return S.One, self
return (self, S.One) if self else (S.One, self)
def as_coeff_Add(self, rational=False):
"""Efficiently extract the coefficient of a summation. """
if not rational:
return self, S.Zero
return S.Zero, self
def gcd(self, other):
"""Compute GCD of `self` and `other`. """
from sympy.polys import gcd
return gcd(self, other)
def lcm(self, other):
"""Compute LCM of `self` and `other`. """
from sympy.polys import lcm
return lcm(self, other)
def cofactors(self, other):
"""Compute GCD and cofactors of `self` and `other`. """
from sympy.polys import cofactors
return cofactors(self, other)
class Float(Number):
"""Represent a floating-point number of arbitrary precision.
Examples
========
>>> from sympy import Float
>>> Float(3.5)
3.50000000000000
>>> Float(3)
3.00000000000000
Creating Floats from strings (and Python ``int`` and ``long``
types) will give a minimum precision of 15 digits, but the
precision will automatically increase to capture all digits
entered.
>>> Float(1)
1.00000000000000
>>> Float(10**20)
100000000000000000000.
>>> Float('1e20')
100000000000000000000.
However, *floating-point* numbers (Python ``float`` types) retain
only 15 digits of precision:
>>> Float(1e20)
1.00000000000000e+20
>>> Float(1.23456789123456789)
1.23456789123457
It may be preferable to enter high-precision decimal numbers
as strings:
Float('1.23456789123456789')
1.23456789123456789
The desired number of digits can also be specified:
>>> Float('1e-3', 3)
0.00100
>>> Float(100, 4)
100.0
Float can automatically count significant figures if a null string
is sent for the precision; spaces or underscores are also allowed. (Auto-
counting is only allowed for strings, ints and longs).
>>> Float('123 456 789.123_456', '')
123456789.123456
>>> Float('12e-3', '')
0.012
>>> Float(3, '')
3.
If a number is written in scientific notation, only the digits before the
exponent are considered significant if a decimal appears, otherwise the
"e" signifies only how to move the decimal:
>>> Float('60.e2', '') # 2 digits significant
6.0e+3
>>> Float('60e2', '') # 4 digits significant
6000.
>>> Float('600e-2', '') # 3 digits significant
6.00
Notes
=====
Floats are inexact by their nature unless their value is a binary-exact
value.
>>> approx, exact = Float(.1, 1), Float(.125, 1)
For calculation purposes, evalf needs to be able to change the precision
but this will not increase the accuracy of the inexact value. The
following is the most accurate 5-digit approximation of a value of 0.1
that had only 1 digit of precision:
>>> approx.evalf(5)
0.099609
By contrast, 0.125 is exact in binary (as it is in base 10) and so it
can be passed to Float or evalf to obtain an arbitrary precision with
matching accuracy:
>>> Float(exact, 5)
0.12500
>>> exact.evalf(20)
0.12500000000000000000
Trying to make a high-precision Float from a float is not disallowed,
but one must keep in mind that the *underlying float* (not the apparent
decimal value) is being obtained with high precision. For example, 0.3
does not have a finite binary representation. The closest rational is
the fraction 5404319552844595/2**54. So if you try to obtain a Float of
0.3 to 20 digits of precision you will not see the same thing as 0.3
followed by 19 zeros:
>>> Float(0.3, 20)
0.29999999999999998890
If you want a 20-digit value of the decimal 0.3 (not the floating point
approximation of 0.3) you should send the 0.3 as a string. The underlying
representation is still binary but a higher precision than Python's float
is used:
>>> Float('0.3', 20)
0.30000000000000000000
Although you can increase the precision of an existing Float using Float
it will not increase the accuracy -- the underlying value is not changed:
>>> def show(f): # binary rep of Float
... from sympy import Mul, Pow
... s, m, e, b = f._mpf_
... v = Mul(int(m), Pow(2, int(e), evaluate=False), evaluate=False)
... print('%s at prec=%s' % (v, f._prec))
...
>>> t = Float('0.3', 3)
>>> show(t)
4915/2**14 at prec=13
>>> show(Float(t, 20)) # higher prec, not higher accuracy
4915/2**14 at prec=70
>>> show(Float(t, 2)) # lower prec
307/2**10 at prec=10
The same thing happens when evalf is used on a Float:
>>> show(t.evalf(20))
4915/2**14 at prec=70
>>> show(t.evalf(2))
307/2**10 at prec=10
Finally, Floats can be instantiated with an mpf tuple (n, c, p) to
produce the number (-1)**n*c*2**p:
>>> n, c, p = 1, 5, 0
>>> (-1)**n*c*2**p
-5
>>> Float((1, 5, 0))
-5.00000000000000
An actual mpf tuple also contains the number of bits in c as the last
element of the tuple:
>>> _._mpf_
(1, 5, 0, 3)
This is not needed for instantiation and is not the same thing as the
precision. The mpf tuple and the precision are two separate quantities
that Float tracks.
In SymPy, a Float is a number that can be computed with arbitrary
precision. Although floating point 'inf' and 'nan' are not such
numbers, Float can create these numbers:
>>> Float('-inf')
-oo
>>> _.is_Float
False
"""
__slots__ = ('_mpf_', '_prec')
# A Float represents many real numbers,
# both rational and irrational.
is_rational = None
is_irrational = None
is_number = True
is_real = True
is_extended_real = True
is_Float = True
def __new__(cls, num, dps=None, prec=None, precision=None):
if prec is not None:
SymPyDeprecationWarning(
feature="Using 'prec=XX' to denote decimal precision",
useinstead="'dps=XX' for decimal precision and 'precision=XX' "\
"for binary precision",
issue=12820,
deprecated_since_version="1.1").warn()
dps = prec
del prec # avoid using this deprecated kwarg
if dps is not None and precision is not None:
raise ValueError('Both decimal and binary precision supplied. '
'Supply only one. ')
if isinstance(num, str):
# Float accepts spaces as digit separators
num = num.replace(' ', '').lower()
# in Py 3.6
# underscores are allowed. In anticipation of that, we ignore
# legally placed underscores
if '_' in num:
parts = num.split('_')
if not (all(parts) and
all(parts[i][-1].isdigit()
for i in range(0, len(parts), 2)) and
all(parts[i][0].isdigit()
for i in range(1, len(parts), 2))):
# copy Py 3.6 error
raise ValueError("could not convert string to float: '%s'" % num)
num = ''.join(parts)
if num.startswith('.') and len(num) > 1:
num = '0' + num
elif num.startswith('-.') and len(num) > 2:
num = '-0.' + num[2:]
elif num in ('inf', '+inf'):
return S.Infinity
elif num == '-inf':
return S.NegativeInfinity
elif isinstance(num, float) and num == 0:
num = '0'
elif isinstance(num, float) and num == float('inf'):
return S.Infinity
elif isinstance(num, float) and num == float('-inf'):
return S.NegativeInfinity
elif isinstance(num, float) and num == float('nan'):
return S.NaN
elif isinstance(num, (SYMPY_INTS, Integer)):
num = str(num)
elif num is S.Infinity:
return num
elif num is S.NegativeInfinity:
return num
elif num is S.NaN:
return num
elif type(num).__module__ == 'numpy': # support for numpy datatypes
num = _convert_numpy_types(num)
elif isinstance(num, mpmath.mpf):
if precision is None:
if dps is None:
precision = num.context.prec
num = num._mpf_
if dps is None and precision is None:
dps = 15
if isinstance(num, Float):
return num
if isinstance(num, str) and _literal_float(num):
try:
Num = decimal.Decimal(num)
except decimal.InvalidOperation:
pass
else:
isint = '.' not in num
num, dps = _decimal_to_Rational_prec(Num)
if num.is_Integer and isint:
dps = max(dps, len(str(num).lstrip('-')))
dps = max(15, dps)
precision = mlib.libmpf.dps_to_prec(dps)
elif precision == '' and dps is None or precision is None and dps == '':
if not isinstance(num, str):
raise ValueError('The null string can only be used when '
'the number to Float is passed as a string or an integer.')
ok = None
if _literal_float(num):
try:
Num = decimal.Decimal(num)
except decimal.InvalidOperation:
pass
else:
isint = '.' not in num
num, dps = _decimal_to_Rational_prec(Num)
if num.is_Integer and isint:
dps = max(dps, len(str(num).lstrip('-')))
precision = mlib.libmpf.dps_to_prec(dps)
ok = True
if ok is None:
raise ValueError('string-float not recognized: %s' % num)
# decimal precision(dps) is set and maybe binary precision(precision)
# as well.From here on binary precision is used to compute the Float.
# Hence, if supplied use binary precision else translate from decimal
# precision.
if precision is None or precision == '':
precision = mlib.libmpf.dps_to_prec(dps)
precision = int(precision)
if isinstance(num, float):
_mpf_ = mlib.from_float(num, precision, rnd)
elif isinstance(num, str):
_mpf_ = mlib.from_str(num, precision, rnd)
elif isinstance(num, decimal.Decimal):
if num.is_finite():
_mpf_ = mlib.from_str(str(num), precision, rnd)
elif num.is_nan():
return S.NaN
elif num.is_infinite():
if num > 0:
return S.Infinity
return S.NegativeInfinity
else:
raise ValueError("unexpected decimal value %s" % str(num))
elif isinstance(num, tuple) and len(num) in (3, 4):
if type(num[1]) is str:
# it's a hexadecimal (coming from a pickled object)
# assume that it is in standard form
num = list(num)
# If we're loading an object pickled in Python 2 into
# Python 3, we may need to strip a tailing 'L' because
# of a shim for int on Python 3, see issue #13470.
if num[1].endswith('L'):
num[1] = num[1][:-1]
num[1] = MPZ(num[1], 16)
_mpf_ = tuple(num)
else:
if len(num) == 4:
# handle normalization hack
return Float._new(num, precision)
else:
if not all((
num[0] in (0, 1),
num[1] >= 0,
all(type(i) in (int, int) for i in num)
)):
raise ValueError('malformed mpf: %s' % (num,))
# don't compute number or else it may
# over/underflow
return Float._new(
(num[0], num[1], num[2], bitcount(num[1])),
precision)
else:
try:
_mpf_ = num._as_mpf_val(precision)
except (NotImplementedError, AttributeError):
_mpf_ = mpmath.mpf(num, prec=precision)._mpf_
return cls._new(_mpf_, precision, zero=False)
@classmethod
def _new(cls, _mpf_, _prec, zero=True):
# special cases
if zero and _mpf_ == fzero:
return S.Zero # Float(0) -> 0.0; Float._new((0,0,0,0)) -> 0
elif _mpf_ == _mpf_nan:
return S.NaN
elif _mpf_ == _mpf_inf:
return S.Infinity
elif _mpf_ == _mpf_ninf:
return S.NegativeInfinity
obj = Expr.__new__(cls)
obj._mpf_ = mpf_norm(_mpf_, _prec)
obj._prec = _prec
return obj
# mpz can't be pickled
def __getnewargs__(self):
return (mlib.to_pickable(self._mpf_),)
def __getstate__(self):
return {'_prec': self._prec}
def _hashable_content(self):
return (self._mpf_, self._prec)
def floor(self):
return Integer(int(mlib.to_int(
mlib.mpf_floor(self._mpf_, self._prec))))
def ceiling(self):
return Integer(int(mlib.to_int(
mlib.mpf_ceil(self._mpf_, self._prec))))
def __floor__(self):
return self.floor()
def __ceil__(self):
return self.ceiling()
@property
def num(self):
return mpmath.mpf(self._mpf_)
def _as_mpf_val(self, prec):
rv = mpf_norm(self._mpf_, prec)
if rv != self._mpf_ and self._prec == prec:
debug(self._mpf_, rv)
return rv
def _as_mpf_op(self, prec):
return self._mpf_, max(prec, self._prec)
def _eval_is_finite(self):
if self._mpf_ in (_mpf_inf, _mpf_ninf):
return False
return True
def _eval_is_infinite(self):
if self._mpf_ in (_mpf_inf, _mpf_ninf):
return True
return False
def _eval_is_integer(self):
return self._mpf_ == fzero
def _eval_is_negative(self):
if self._mpf_ == _mpf_ninf or self._mpf_ == _mpf_inf:
return False
return self.num < 0
def _eval_is_positive(self):
if self._mpf_ == _mpf_ninf or self._mpf_ == _mpf_inf:
return False
return self.num > 0
def _eval_is_extended_negative(self):
if self._mpf_ == _mpf_ninf:
return True
if self._mpf_ == _mpf_inf:
return False
return self.num < 0
def _eval_is_extended_positive(self):
if self._mpf_ == _mpf_inf:
return True
if self._mpf_ == _mpf_ninf:
return False
return self.num > 0
def _eval_is_zero(self):
return self._mpf_ == fzero
def __nonzero__(self):
return self._mpf_ != fzero
__bool__ = __nonzero__
def __neg__(self):
return Float._new(mlib.mpf_neg(self._mpf_), self._prec)
@_sympifyit('other', NotImplemented)
def __add__(self, other):
if isinstance(other, Number) and global_parameters.evaluate:
rhs, prec = other._as_mpf_op(self._prec)
return Float._new(mlib.mpf_add(self._mpf_, rhs, prec, rnd), prec)
return Number.__add__(self, other)
@_sympifyit('other', NotImplemented)
def __sub__(self, other):
if isinstance(other, Number) and global_parameters.evaluate:
rhs, prec = other._as_mpf_op(self._prec)
return Float._new(mlib.mpf_sub(self._mpf_, rhs, prec, rnd), prec)
return Number.__sub__(self, other)
@_sympifyit('other', NotImplemented)
def __mul__(self, other):
if isinstance(other, Number) and global_parameters.evaluate:
rhs, prec = other._as_mpf_op(self._prec)
return Float._new(mlib.mpf_mul(self._mpf_, rhs, prec, rnd), prec)
return Number.__mul__(self, other)
@_sympifyit('other', NotImplemented)
def __div__(self, other):
if isinstance(other, Number) and other != 0 and global_parameters.evaluate:
rhs, prec = other._as_mpf_op(self._prec)
return Float._new(mlib.mpf_div(self._mpf_, rhs, prec, rnd), prec)
return Number.__div__(self, other)
__truediv__ = __div__
@_sympifyit('other', NotImplemented)
def __mod__(self, other):
if isinstance(other, Rational) and other.q != 1 and global_parameters.evaluate:
# calculate mod with Rationals, *then* round the result
return Float(Rational.__mod__(Rational(self), other),
precision=self._prec)
if isinstance(other, Float) and global_parameters.evaluate:
r = self/other
if r == int(r):
return Float(0, precision=max(self._prec, other._prec))
if isinstance(other, Number) and global_parameters.evaluate:
rhs, prec = other._as_mpf_op(self._prec)
return Float._new(mlib.mpf_mod(self._mpf_, rhs, prec, rnd), prec)
return Number.__mod__(self, other)
@_sympifyit('other', NotImplemented)
def __rmod__(self, other):
if isinstance(other, Float) and global_parameters.evaluate:
return other.__mod__(self)
if isinstance(other, Number) and global_parameters.evaluate:
rhs, prec = other._as_mpf_op(self._prec)
return Float._new(mlib.mpf_mod(rhs, self._mpf_, prec, rnd), prec)
return Number.__rmod__(self, other)
def _eval_power(self, expt):
"""
expt is symbolic object but not equal to 0, 1
(-p)**r -> exp(r*log(-p)) -> exp(r*(log(p) + I*Pi)) ->
-> p**r*(sin(Pi*r) + cos(Pi*r)*I)
"""
if self == 0:
if expt.is_positive:
return S.Zero
if expt.is_negative:
return S.Infinity
if isinstance(expt, Number):
if isinstance(expt, Integer):
prec = self._prec
return Float._new(
mlib.mpf_pow_int(self._mpf_, expt.p, prec, rnd), prec)
elif isinstance(expt, Rational) and \
expt.p == 1 and expt.q % 2 and self.is_negative:
return Pow(S.NegativeOne, expt, evaluate=False)*(
-self)._eval_power(expt)
expt, prec = expt._as_mpf_op(self._prec)
mpfself = self._mpf_
try:
y = mpf_pow(mpfself, expt, prec, rnd)
return Float._new(y, prec)
except mlib.ComplexResult:
re, im = mlib.mpc_pow(
(mpfself, fzero), (expt, fzero), prec, rnd)
return Float._new(re, prec) + \
Float._new(im, prec)*S.ImaginaryUnit
def __abs__(self):
return Float._new(mlib.mpf_abs(self._mpf_), self._prec)
def __int__(self):
if self._mpf_ == fzero:
return 0
return int(mlib.to_int(self._mpf_)) # uses round_fast = round_down
__long__ = __int__
def __eq__(self, other):
try:
other = _sympify(other)
except SympifyError:
return NotImplemented
if not self:
return not other
if other.is_NumberSymbol:
if other.is_irrational:
return False
return other.__eq__(self)
if other.is_Float:
# comparison is exact
# so Float(.1, 3) != Float(.1, 33)
return self._mpf_ == other._mpf_
if other.is_Rational:
return other.__eq__(self)
if other.is_Number:
# numbers should compare at the same precision;
# all _as_mpf_val routines should be sure to abide
# by the request to change the prec if necessary; if
# they don't, the equality test will fail since it compares
# the mpf tuples
ompf = other._as_mpf_val(self._prec)
return bool(mlib.mpf_eq(self._mpf_, ompf))
return False # Float != non-Number
def __ne__(self, other):
return not self == other
def _Frel(self, other, op):
from sympy.core.numbers import prec_to_dps
try:
other = _sympify(other)
except SympifyError:
return NotImplemented
if other.is_Rational:
# test self*other.q <?> other.p without losing precision
'''
>>> f = Float(.1,2)
>>> i = 1234567890
>>> (f*i)._mpf_
(0, 471, 18, 9)
>>> mlib.mpf_mul(f._mpf_, mlib.from_int(i))
(0, 505555550955, -12, 39)
'''
smpf = mlib.mpf_mul(self._mpf_, mlib.from_int(other.q))
ompf = mlib.from_int(other.p)
return _sympify(bool(op(smpf, ompf)))
elif other.is_Float:
return _sympify(bool(
op(self._mpf_, other._mpf_)))
elif other.is_comparable and other not in (
S.Infinity, S.NegativeInfinity):
other = other.evalf(prec_to_dps(self._prec))
if other._prec > 1:
if other.is_Number:
return _sympify(bool(
op(self._mpf_, other._as_mpf_val(self._prec))))
def __gt__(self, other):
if isinstance(other, NumberSymbol):
return other.__lt__(self)
rv = self._Frel(other, mlib.mpf_gt)
if rv is None:
return Expr.__gt__(self, other)
return rv
def __ge__(self, other):
if isinstance(other, NumberSymbol):
return other.__le__(self)
rv = self._Frel(other, mlib.mpf_ge)
if rv is None:
return Expr.__ge__(self, other)
return rv
def __lt__(self, other):
if isinstance(other, NumberSymbol):
return other.__gt__(self)
rv = self._Frel(other, mlib.mpf_lt)
if rv is None:
return Expr.__lt__(self, other)
return rv
def __le__(self, other):
if isinstance(other, NumberSymbol):
return other.__ge__(self)
rv = self._Frel(other, mlib.mpf_le)
if rv is None:
return Expr.__le__(self, other)
return rv
def __hash__(self):
return super(Float, self).__hash__()
def epsilon_eq(self, other, epsilon="1e-15"):
return abs(self - other) < Float(epsilon)
def _sage_(self):
import sage.all as sage
return sage.RealNumber(str(self))
def __format__(self, format_spec):
return format(decimal.Decimal(str(self)), format_spec)
# Add sympify converters
converter[float] = converter[decimal.Decimal] = Float
# this is here to work nicely in Sage
RealNumber = Float
class Rational(Number):
"""Represents rational numbers (p/q) of any size.
Examples
========
>>> from sympy import Rational, nsimplify, S, pi
>>> Rational(1, 2)
1/2
Rational is unprejudiced in accepting input. If a float is passed, the
underlying value of the binary representation will be returned:
>>> Rational(.5)
1/2
>>> Rational(.2)
3602879701896397/18014398509481984
If the simpler representation of the float is desired then consider
limiting the denominator to the desired value or convert the float to
a string (which is roughly equivalent to limiting the denominator to
10**12):
>>> Rational(str(.2))
1/5
>>> Rational(.2).limit_denominator(10**12)
1/5
An arbitrarily precise Rational is obtained when a string literal is
passed:
>>> Rational("1.23")
123/100
>>> Rational('1e-2')
1/100
>>> Rational(".1")
1/10
>>> Rational('1e-2/3.2')
1/320
The conversion of other types of strings can be handled by
the sympify() function, and conversion of floats to expressions
or simple fractions can be handled with nsimplify:
>>> S('.[3]') # repeating digits in brackets
1/3
>>> S('3**2/10') # general expressions
9/10
>>> nsimplify(.3) # numbers that have a simple form
3/10
But if the input does not reduce to a literal Rational, an error will
be raised:
>>> Rational(pi)
Traceback (most recent call last):
...
TypeError: invalid input: pi
Low-level
---------
Access numerator and denominator as .p and .q:
>>> r = Rational(3, 4)
>>> r
3/4
>>> r.p
3
>>> r.q
4
Note that p and q return integers (not SymPy Integers) so some care
is needed when using them in expressions:
>>> r.p/r.q
0.75
See Also
========
sympy.core.sympify.sympify, sympy.simplify.simplify.nsimplify
"""
is_real = True
is_integer = False
is_rational = True
is_number = True
__slots__ = ('p', 'q')
is_Rational = True
@cacheit
def __new__(cls, p, q=None, gcd=None):
if q is None:
if isinstance(p, Rational):
return p
if isinstance(p, SYMPY_INTS):
pass
else:
if isinstance(p, (float, Float)):
return Rational(*_as_integer_ratio(p))
if not isinstance(p, str):
try:
p = sympify(p)
except (SympifyError, SyntaxError):
pass # error will raise below
else:
if p.count('/') > 1:
raise TypeError('invalid input: %s' % p)
p = p.replace(' ', '')
pq = p.rsplit('/', 1)
if len(pq) == 2:
p, q = pq
fp = fractions.Fraction(p)
fq = fractions.Fraction(q)
p = fp/fq
try:
p = fractions.Fraction(p)
except ValueError:
pass # error will raise below
else:
return Rational(p.numerator, p.denominator, 1)
if not isinstance(p, Rational):
raise TypeError('invalid input: %s' % p)
q = 1
gcd = 1
else:
p = Rational(p)
q = Rational(q)
if isinstance(q, Rational):
p *= q.q
q = q.p
if isinstance(p, Rational):
q *= p.q
p = p.p
# p and q are now integers
if q == 0:
if p == 0:
if _errdict["divide"]:
raise ValueError("Indeterminate 0/0")
else:
return S.NaN
return S.ComplexInfinity
if q < 0:
q = -q
p = -p
if not gcd:
gcd = igcd(abs(p), q)
if gcd > 1:
p //= gcd
q //= gcd
if q == 1:
return Integer(p)
if p == 1 and q == 2:
return S.Half
obj = Expr.__new__(cls)
obj.p = p
obj.q = q
return obj
def limit_denominator(self, max_denominator=1000000):
"""Closest Rational to self with denominator at most max_denominator.
>>> from sympy import Rational
>>> Rational('3.141592653589793').limit_denominator(10)
22/7
>>> Rational('3.141592653589793').limit_denominator(100)
311/99
"""
f = fractions.Fraction(self.p, self.q)
return Rational(f.limit_denominator(fractions.Fraction(int(max_denominator))))
def __getnewargs__(self):
return (self.p, self.q)
def _hashable_content(self):
return (self.p, self.q)
def _eval_is_positive(self):
return self.p > 0
def _eval_is_zero(self):
return self.p == 0
def __neg__(self):
return Rational(-self.p, self.q)
@_sympifyit('other', NotImplemented)
def __add__(self, other):
if global_parameters.evaluate:
if isinstance(other, Integer):
return Rational(self.p + self.q*other.p, self.q, 1)
elif isinstance(other, Rational):
#TODO: this can probably be optimized more
return Rational(self.p*other.q + self.q*other.p, self.q*other.q)
elif isinstance(other, Float):
return other + self
else:
return Number.__add__(self, other)
return Number.__add__(self, other)
__radd__ = __add__
@_sympifyit('other', NotImplemented)
def __sub__(self, other):
if global_parameters.evaluate:
if isinstance(other, Integer):
return Rational(self.p - self.q*other.p, self.q, 1)
elif isinstance(other, Rational):
return Rational(self.p*other.q - self.q*other.p, self.q*other.q)
elif isinstance(other, Float):
return -other + self
else:
return Number.__sub__(self, other)
return Number.__sub__(self, other)
@_sympifyit('other', NotImplemented)
def __rsub__(self, other):
if global_parameters.evaluate:
if isinstance(other, Integer):
return Rational(self.q*other.p - self.p, self.q, 1)
elif isinstance(other, Rational):
return Rational(self.q*other.p - self.p*other.q, self.q*other.q)
elif isinstance(other, Float):
return -self + other
else:
return Number.__rsub__(self, other)
return Number.__rsub__(self, other)
@_sympifyit('other', NotImplemented)
def __mul__(self, other):
if global_parameters.evaluate:
if isinstance(other, Integer):
return Rational(self.p*other.p, self.q, igcd(other.p, self.q))
elif isinstance(other, Rational):
return Rational(self.p*other.p, self.q*other.q, igcd(self.p, other.q)*igcd(self.q, other.p))
elif isinstance(other, Float):
return other*self
else:
return Number.__mul__(self, other)
return Number.__mul__(self, other)
__rmul__ = __mul__
@_sympifyit('other', NotImplemented)
def __div__(self, other):
if global_parameters.evaluate:
if isinstance(other, Integer):
if self.p and other.p == S.Zero:
return S.ComplexInfinity
else:
return Rational(self.p, self.q*other.p, igcd(self.p, other.p))
elif isinstance(other, Rational):
return Rational(self.p*other.q, self.q*other.p, igcd(self.p, other.p)*igcd(self.q, other.q))
elif isinstance(other, Float):
return self*(1/other)
else:
return Number.__div__(self, other)
return Number.__div__(self, other)
@_sympifyit('other', NotImplemented)
def __rdiv__(self, other):
if global_parameters.evaluate:
if isinstance(other, Integer):
return Rational(other.p*self.q, self.p, igcd(self.p, other.p))
elif isinstance(other, Rational):
return Rational(other.p*self.q, other.q*self.p, igcd(self.p, other.p)*igcd(self.q, other.q))
elif isinstance(other, Float):
return other*(1/self)
else:
return Number.__rdiv__(self, other)
return Number.__rdiv__(self, other)
__truediv__ = __div__
@_sympifyit('other', NotImplemented)
def __mod__(self, other):
if global_parameters.evaluate:
if isinstance(other, Rational):
n = (self.p*other.q) // (other.p*self.q)
return Rational(self.p*other.q - n*other.p*self.q, self.q*other.q)
if isinstance(other, Float):
# calculate mod with Rationals, *then* round the answer
return Float(self.__mod__(Rational(other)),
precision=other._prec)
return Number.__mod__(self, other)
return Number.__mod__(self, other)
@_sympifyit('other', NotImplemented)
def __rmod__(self, other):
if isinstance(other, Rational):
return Rational.__mod__(other, self)
return Number.__rmod__(self, other)
def _eval_power(self, expt):
if isinstance(expt, Number):
if isinstance(expt, Float):
return self._eval_evalf(expt._prec)**expt
if expt.is_extended_negative:
# (3/4)**-2 -> (4/3)**2
ne = -expt
if (ne is S.One):
return Rational(self.q, self.p)
if self.is_negative:
return S.NegativeOne**expt*Rational(self.q, -self.p)**ne
else:
return Rational(self.q, self.p)**ne
if expt is S.Infinity: # -oo already caught by test for negative
if self.p > self.q:
# (3/2)**oo -> oo
return S.Infinity
if self.p < -self.q:
# (-3/2)**oo -> oo + I*oo
return S.Infinity + S.Infinity*S.ImaginaryUnit
return S.Zero
if isinstance(expt, Integer):
# (4/3)**2 -> 4**2 / 3**2
return Rational(self.p**expt.p, self.q**expt.p, 1)
if isinstance(expt, Rational):
if self.p != 1:
# (4/3)**(5/6) -> 4**(5/6)*3**(-5/6)
return Integer(self.p)**expt*Integer(self.q)**(-expt)
# as the above caught negative self.p, now self is positive
return Integer(self.q)**Rational(
expt.p*(expt.q - 1), expt.q) / \
Integer(self.q)**Integer(expt.p)
if self.is_extended_negative and expt.is_even:
return (-self)**expt
return
def _as_mpf_val(self, prec):
return mlib.from_rational(self.p, self.q, prec, rnd)
def _mpmath_(self, prec, rnd):
return mpmath.make_mpf(mlib.from_rational(self.p, self.q, prec, rnd))
def __abs__(self):
return Rational(abs(self.p), self.q)
def __int__(self):
p, q = self.p, self.q
if p < 0:
return -int(-p//q)
return int(p//q)
__long__ = __int__
def floor(self):
return Integer(self.p // self.q)
def ceiling(self):
return -Integer(-self.p // self.q)
def __floor__(self):
return self.floor()
def __ceil__(self):
return self.ceiling()
def __eq__(self, other):
from sympy.core.power import integer_log
try:
other = _sympify(other)
except SympifyError:
return NotImplemented
if not isinstance(other, Number):
# S(0) == S.false is False
# S(0) == False is True
return False
if not self:
return not other
if other.is_NumberSymbol:
if other.is_irrational:
return False
return other.__eq__(self)
if other.is_Rational:
# a Rational is always in reduced form so will never be 2/4
# so we can just check equivalence of args
return self.p == other.p and self.q == other.q
if other.is_Float:
# all Floats have a denominator that is a power of 2
# so if self doesn't, it can't be equal to other
if self.q & (self.q - 1):
return False
s, m, t = other._mpf_[:3]
if s:
m = -m
if not t:
# other is an odd integer
if not self.is_Integer or self.is_even:
return False
return m == self.p
if t > 0:
# other is an even integer
if not self.is_Integer:
return False
# does m*2**t == self.p
return self.p and not self.p % m and \
integer_log(self.p//m, 2) == (t, True)
# does non-integer s*m/2**-t = p/q?
if self.is_Integer:
return False
return m == self.p and integer_log(self.q, 2) == (-t, True)
return False
def __ne__(self, other):
return not self == other
def _Rrel(self, other, attr):
# if you want self < other, pass self, other, __gt__
try:
other = _sympify(other)
except SympifyError:
return NotImplemented
if other.is_Number:
op = None
s, o = self, other
if other.is_NumberSymbol:
op = getattr(o, attr)
elif other.is_Float:
op = getattr(o, attr)
elif other.is_Rational:
s, o = Integer(s.p*o.q), Integer(s.q*o.p)
op = getattr(o, attr)
if op:
return op(s)
if o.is_number and o.is_extended_real:
return Integer(s.p), s.q*o
def __gt__(self, other):
rv = self._Rrel(other, '__lt__')
if rv is None:
rv = self, other
elif not type(rv) is tuple:
return rv
return Expr.__gt__(*rv)
def __ge__(self, other):
rv = self._Rrel(other, '__le__')
if rv is None:
rv = self, other
elif not type(rv) is tuple:
return rv
return Expr.__ge__(*rv)
def __lt__(self, other):
rv = self._Rrel(other, '__gt__')
if rv is None:
rv = self, other
elif not type(rv) is tuple:
return rv
return Expr.__lt__(*rv)
def __le__(self, other):
rv = self._Rrel(other, '__ge__')
if rv is None:
rv = self, other
elif not type(rv) is tuple:
return rv
return Expr.__le__(*rv)
def __hash__(self):
return super(Rational, self).__hash__()
def factors(self, limit=None, use_trial=True, use_rho=False,
use_pm1=False, verbose=False, visual=False):
"""A wrapper to factorint which return factors of self that are
smaller than limit (or cheap to compute). Special methods of
factoring are disabled by default so that only trial division is used.
"""
from sympy.ntheory import factorrat
return factorrat(self, limit=limit, use_trial=use_trial,
use_rho=use_rho, use_pm1=use_pm1,
verbose=verbose).copy()
def numerator(self):
return self.p
def denominator(self):
return self.q
@_sympifyit('other', NotImplemented)
def gcd(self, other):
if isinstance(other, Rational):
if other == S.Zero:
return other
return Rational(
Integer(igcd(self.p, other.p)),
Integer(ilcm(self.q, other.q)))
return Number.gcd(self, other)
@_sympifyit('other', NotImplemented)
def lcm(self, other):
if isinstance(other, Rational):
return Rational(
self.p // igcd(self.p, other.p) * other.p,
igcd(self.q, other.q))
return Number.lcm(self, other)
def as_numer_denom(self):
return Integer(self.p), Integer(self.q)
def _sage_(self):
import sage.all as sage
return sage.Integer(self.p)/sage.Integer(self.q)
def as_content_primitive(self, radical=False, clear=True):
"""Return the tuple (R, self/R) where R is the positive Rational
extracted from self.
Examples
========
>>> from sympy import S
>>> (S(-3)/2).as_content_primitive()
(3/2, -1)
See docstring of Expr.as_content_primitive for more examples.
"""
if self:
if self.is_positive:
return self, S.One
return -self, S.NegativeOne
return S.One, self
def as_coeff_Mul(self, rational=False):
"""Efficiently extract the coefficient of a product. """
return self, S.One
def as_coeff_Add(self, rational=False):
"""Efficiently extract the coefficient of a summation. """
return self, S.Zero
class Integer(Rational):
"""Represents integer numbers of any size.
Examples
========
>>> from sympy import Integer
>>> Integer(3)
3
If a float or a rational is passed to Integer, the fractional part
will be discarded; the effect is of rounding toward zero.
>>> Integer(3.8)
3
>>> Integer(-3.8)
-3
A string is acceptable input if it can be parsed as an integer:
>>> Integer("9" * 20)
99999999999999999999
It is rarely needed to explicitly instantiate an Integer, because
Python integers are automatically converted to Integer when they
are used in SymPy expressions.
"""
q = 1
is_integer = True
is_number = True
is_Integer = True
__slots__ = ('p',)
def _as_mpf_val(self, prec):
return mlib.from_int(self.p, prec, rnd)
def _mpmath_(self, prec, rnd):
return mpmath.make_mpf(self._as_mpf_val(prec))
@cacheit
def __new__(cls, i):
if isinstance(i, str):
i = i.replace(' ', '')
# whereas we cannot, in general, make a Rational from an
# arbitrary expression, we can make an Integer unambiguously
# (except when a non-integer expression happens to round to
# an integer). So we proceed by taking int() of the input and
# let the int routines determine whether the expression can
# be made into an int or whether an error should be raised.
try:
ival = int(i)
except TypeError:
raise TypeError(
"Argument of Integer should be of numeric type, got %s." % i)
# We only work with well-behaved integer types. This converts, for
# example, numpy.int32 instances.
if ival == 1:
return S.One
if ival == -1:
return S.NegativeOne
if ival == 0:
return S.Zero
obj = Expr.__new__(cls)
obj.p = ival
return obj
def __getnewargs__(self):
return (self.p,)
# Arithmetic operations are here for efficiency
def __int__(self):
return self.p
__long__ = __int__
def floor(self):
return Integer(self.p)
def ceiling(self):
return Integer(self.p)
def __floor__(self):
return self.floor()
def __ceil__(self):
return self.ceiling()
def __neg__(self):
return Integer(-self.p)
def __abs__(self):
if self.p >= 0:
return self
else:
return Integer(-self.p)
def __divmod__(self, other):
from .containers import Tuple
if isinstance(other, Integer) and global_parameters.evaluate:
return Tuple(*(divmod(self.p, other.p)))
else:
return Number.__divmod__(self, other)
def __rdivmod__(self, other):
from .containers import Tuple
if isinstance(other, int) and global_parameters.evaluate:
return Tuple(*(divmod(other, self.p)))
else:
try:
other = Number(other)
except TypeError:
msg = "unsupported operand type(s) for divmod(): '%s' and '%s'"
oname = type(other).__name__
sname = type(self).__name__
raise TypeError(msg % (oname, sname))
return Number.__divmod__(other, self)
# TODO make it decorator + bytecodehacks?
def __add__(self, other):
if global_parameters.evaluate:
if isinstance(other, int):
return Integer(self.p + other)
elif isinstance(other, Integer):
return Integer(self.p + other.p)
elif isinstance(other, Rational):
return Rational(self.p*other.q + other.p, other.q, 1)
return Rational.__add__(self, other)
else:
return Add(self, other)
def __radd__(self, other):
if global_parameters.evaluate:
if isinstance(other, int):
return Integer(other + self.p)
elif isinstance(other, Rational):
return Rational(other.p + self.p*other.q, other.q, 1)
return Rational.__radd__(self, other)
return Rational.__radd__(self, other)
def __sub__(self, other):
if global_parameters.evaluate:
if isinstance(other, int):
return Integer(self.p - other)
elif isinstance(other, Integer):
return Integer(self.p - other.p)
elif isinstance(other, Rational):
return Rational(self.p*other.q - other.p, other.q, 1)
return Rational.__sub__(self, other)
return Rational.__sub__(self, other)
def __rsub__(self, other):
if global_parameters.evaluate:
if isinstance(other, int):
return Integer(other - self.p)
elif isinstance(other, Rational):
return Rational(other.p - self.p*other.q, other.q, 1)
return Rational.__rsub__(self, other)
return Rational.__rsub__(self, other)
def __mul__(self, other):
if global_parameters.evaluate:
if isinstance(other, int):
return Integer(self.p*other)
elif isinstance(other, Integer):
return Integer(self.p*other.p)
elif isinstance(other, Rational):
return Rational(self.p*other.p, other.q, igcd(self.p, other.q))
return Rational.__mul__(self, other)
return Rational.__mul__(self, other)
def __rmul__(self, other):
if global_parameters.evaluate:
if isinstance(other, int):
return Integer(other*self.p)
elif isinstance(other, Rational):
return Rational(other.p*self.p, other.q, igcd(self.p, other.q))
return Rational.__rmul__(self, other)
return Rational.__rmul__(self, other)
def __mod__(self, other):
if global_parameters.evaluate:
if isinstance(other, int):
return Integer(self.p % other)
elif isinstance(other, Integer):
return Integer(self.p % other.p)
return Rational.__mod__(self, other)
return Rational.__mod__(self, other)
def __rmod__(self, other):
if global_parameters.evaluate:
if isinstance(other, int):
return Integer(other % self.p)
elif isinstance(other, Integer):
return Integer(other.p % self.p)
return Rational.__rmod__(self, other)
return Rational.__rmod__(self, other)
def __eq__(self, other):
if isinstance(other, int):
return (self.p == other)
elif isinstance(other, Integer):
return (self.p == other.p)
return Rational.__eq__(self, other)
def __ne__(self, other):
return not self == other
def __gt__(self, other):
try:
other = _sympify(other)
except SympifyError:
return NotImplemented
if other.is_Integer:
return _sympify(self.p > other.p)
return Rational.__gt__(self, other)
def __lt__(self, other):
try:
other = _sympify(other)
except SympifyError:
return NotImplemented
if other.is_Integer:
return _sympify(self.p < other.p)
return Rational.__lt__(self, other)
def __ge__(self, other):
try:
other = _sympify(other)
except SympifyError:
return NotImplemented
if other.is_Integer:
return _sympify(self.p >= other.p)
return Rational.__ge__(self, other)
def __le__(self, other):
try:
other = _sympify(other)
except SympifyError:
return NotImplemented
if other.is_Integer:
return _sympify(self.p <= other.p)
return Rational.__le__(self, other)
def __hash__(self):
return hash(self.p)
def __index__(self):
return self.p
########################################
def _eval_is_odd(self):
return bool(self.p % 2)
def _eval_power(self, expt):
"""
Tries to do some simplifications on self**expt
Returns None if no further simplifications can be done
When exponent is a fraction (so we have for example a square root),
we try to find a simpler representation by factoring the argument
up to factors of 2**15, e.g.
- sqrt(4) becomes 2
- sqrt(-4) becomes 2*I
- (2**(3+7)*3**(6+7))**Rational(1,7) becomes 6*18**(3/7)
Further simplification would require a special call to factorint on
the argument which is not done here for sake of speed.
"""
from sympy.ntheory.factor_ import perfect_power
if expt is S.Infinity:
if self.p > S.One:
return S.Infinity
# cases -1, 0, 1 are done in their respective classes
return S.Infinity + S.ImaginaryUnit*S.Infinity
if expt is S.NegativeInfinity:
return Rational(1, self)**S.Infinity
if not isinstance(expt, Number):
# simplify when expt is even
# (-2)**k --> 2**k
if self.is_negative and expt.is_even:
return (-self)**expt
if isinstance(expt, Float):
# Rational knows how to exponentiate by a Float
return super(Integer, self)._eval_power(expt)
if not isinstance(expt, Rational):
return
if expt is S.Half and self.is_negative:
# we extract I for this special case since everyone is doing so
return S.ImaginaryUnit*Pow(-self, expt)
if expt.is_negative:
# invert base and change sign on exponent
ne = -expt
if self.is_negative:
return S.NegativeOne**expt*Rational(1, -self)**ne
else:
return Rational(1, self.p)**ne
# see if base is a perfect root, sqrt(4) --> 2
x, xexact = integer_nthroot(abs(self.p), expt.q)
if xexact:
# if it's a perfect root we've finished
result = Integer(x**abs(expt.p))
if self.is_negative:
result *= S.NegativeOne**expt
return result
# The following is an algorithm where we collect perfect roots
# from the factors of base.
# if it's not an nth root, it still might be a perfect power
b_pos = int(abs(self.p))
p = perfect_power(b_pos)
if p is not False:
dict = {p[0]: p[1]}
else:
dict = Integer(b_pos).factors(limit=2**15)
# now process the dict of factors
out_int = 1 # integer part
out_rad = 1 # extracted radicals
sqr_int = 1
sqr_gcd = 0
sqr_dict = {}
for prime, exponent in dict.items():
exponent *= expt.p
# remove multiples of expt.q: (2**12)**(1/10) -> 2*(2**2)**(1/10)
div_e, div_m = divmod(exponent, expt.q)
if div_e > 0:
out_int *= prime**div_e
if div_m > 0:
# see if the reduced exponent shares a gcd with e.q
# (2**2)**(1/10) -> 2**(1/5)
g = igcd(div_m, expt.q)
if g != 1:
out_rad *= Pow(prime, Rational(div_m//g, expt.q//g))
else:
sqr_dict[prime] = div_m
# identify gcd of remaining powers
for p, ex in sqr_dict.items():
if sqr_gcd == 0:
sqr_gcd = ex
else:
sqr_gcd = igcd(sqr_gcd, ex)
if sqr_gcd == 1:
break
for k, v in sqr_dict.items():
sqr_int *= k**(v//sqr_gcd)
if sqr_int == b_pos and out_int == 1 and out_rad == 1:
result = None
else:
result = out_int*out_rad*Pow(sqr_int, Rational(sqr_gcd, expt.q))
if self.is_negative:
result *= Pow(S.NegativeOne, expt)
return result
def _eval_is_prime(self):
from sympy.ntheory import isprime
return isprime(self)
def _eval_is_composite(self):
if self > 1:
return fuzzy_not(self.is_prime)
else:
return False
def as_numer_denom(self):
return self, S.One
@_sympifyit('other', NotImplemented)
def __floordiv__(self, other):
if not isinstance(other, Expr):
return NotImplemented
if isinstance(other, Integer):
return Integer(self.p // other)
return Integer(divmod(self, other)[0])
def __rfloordiv__(self, other):
return Integer(Integer(other).p // self.p)
# Add sympify converters
converter[int] = Integer
class AlgebraicNumber(Expr):
"""Class for representing algebraic numbers in SymPy. """
__slots__ = ('rep', 'root', 'alias', 'minpoly')
is_AlgebraicNumber = True
is_algebraic = True
is_number = True
def __new__(cls, expr, coeffs=None, alias=None, **args):
"""Construct a new algebraic number. """
from sympy import Poly
from sympy.polys.polyclasses import ANP, DMP
from sympy.polys.numberfields import minimal_polynomial
from sympy.core.symbol import Symbol
expr = sympify(expr)
if isinstance(expr, (tuple, Tuple)):
minpoly, root = expr
if not minpoly.is_Poly:
minpoly = Poly(minpoly)
elif expr.is_AlgebraicNumber:
minpoly, root = expr.minpoly, expr.root
else:
minpoly, root = minimal_polynomial(
expr, args.get('gen'), polys=True), expr
dom = minpoly.get_domain()
if coeffs is not None:
if not isinstance(coeffs, ANP):
rep = DMP.from_sympy_list(sympify(coeffs), 0, dom)
scoeffs = Tuple(*coeffs)
else:
rep = DMP.from_list(coeffs.to_list(), 0, dom)
scoeffs = Tuple(*coeffs.to_list())
if rep.degree() >= minpoly.degree():
rep = rep.rem(minpoly.rep)
else:
rep = DMP.from_list([1, 0], 0, dom)
scoeffs = Tuple(1, 0)
sargs = (root, scoeffs)
if alias is not None:
if not isinstance(alias, Symbol):
alias = Symbol(alias)
sargs = sargs + (alias,)
obj = Expr.__new__(cls, *sargs)
obj.rep = rep
obj.root = root
obj.alias = alias
obj.minpoly = minpoly
return obj
def __hash__(self):
return super(AlgebraicNumber, self).__hash__()
def _eval_evalf(self, prec):
return self.as_expr()._evalf(prec)
@property
def is_aliased(self):
"""Returns ``True`` if ``alias`` was set. """
return self.alias is not None
def as_poly(self, x=None):
"""Create a Poly instance from ``self``. """
from sympy import Dummy, Poly, PurePoly
if x is not None:
return Poly.new(self.rep, x)
else:
if self.alias is not None:
return Poly.new(self.rep, self.alias)
else:
return PurePoly.new(self.rep, Dummy('x'))
def as_expr(self, x=None):
"""Create a Basic expression from ``self``. """
return self.as_poly(x or self.root).as_expr().expand()
def coeffs(self):
"""Returns all SymPy coefficients of an algebraic number. """
return [ self.rep.dom.to_sympy(c) for c in self.rep.all_coeffs() ]
def native_coeffs(self):
"""Returns all native coefficients of an algebraic number. """
return self.rep.all_coeffs()
def to_algebraic_integer(self):
"""Convert ``self`` to an algebraic integer. """
from sympy import Poly
f = self.minpoly
if f.LC() == 1:
return self
coeff = f.LC()**(f.degree() - 1)
poly = f.compose(Poly(f.gen/f.LC()))
minpoly = poly*coeff
root = f.LC()*self.root
return AlgebraicNumber((minpoly, root), self.coeffs())
def _eval_simplify(self, **kwargs):
from sympy.polys import CRootOf, minpoly
measure, ratio = kwargs['measure'], kwargs['ratio']
for r in [r for r in self.minpoly.all_roots() if r.func != CRootOf]:
if minpoly(self.root - r).is_Symbol:
# use the matching root if it's simpler
if measure(r) < ratio*measure(self.root):
return AlgebraicNumber(r)
return self
class RationalConstant(Rational):
"""
Abstract base class for rationals with specific behaviors
Derived classes must define class attributes p and q and should probably all
be singletons.
"""
__slots__ = ()
def __new__(cls):
return AtomicExpr.__new__(cls)
class IntegerConstant(Integer):
__slots__ = ()
def __new__(cls):
return AtomicExpr.__new__(cls)
class Zero(IntegerConstant, metaclass=Singleton):
"""The number zero.
Zero is a singleton, and can be accessed by ``S.Zero``
Examples
========
>>> from sympy import S, Integer, zoo
>>> Integer(0) is S.Zero
True
>>> 1/S.Zero
zoo
References
==========
.. [1] https://en.wikipedia.org/wiki/Zero
"""
p = 0
q = 1
is_positive = False
is_negative = False
is_zero = True
is_number = True
is_comparable = True
__slots__ = ()
@staticmethod
def __abs__():
return S.Zero
@staticmethod
def __neg__():
return S.Zero
def _eval_power(self, expt):
if expt.is_positive:
return self
if expt.is_negative:
return S.ComplexInfinity
if expt.is_extended_real is False:
return S.NaN
# infinities are already handled with pos and neg
# tests above; now throw away leading numbers on Mul
# exponent
coeff, terms = expt.as_coeff_Mul()
if coeff.is_negative:
return S.ComplexInfinity**terms
if coeff is not S.One: # there is a Number to discard
return self**terms
def _eval_order(self, *symbols):
# Order(0,x) -> 0
return self
def __nonzero__(self):
return False
__bool__ = __nonzero__
def as_coeff_Mul(self, rational=False): # XXX this routine should be deleted
"""Efficiently extract the coefficient of a summation. """
return S.One, self
class One(IntegerConstant, metaclass=Singleton):
"""The number one.
One is a singleton, and can be accessed by ``S.One``.
Examples
========
>>> from sympy import S, Integer
>>> Integer(1) is S.One
True
References
==========
.. [1] https://en.wikipedia.org/wiki/1_%28number%29
"""
is_number = True
p = 1
q = 1
__slots__ = ()
@staticmethod
def __abs__():
return S.One
@staticmethod
def __neg__():
return S.NegativeOne
def _eval_power(self, expt):
return self
def _eval_order(self, *symbols):
return
@staticmethod
def factors(limit=None, use_trial=True, use_rho=False, use_pm1=False,
verbose=False, visual=False):
if visual:
return S.One
else:
return {}
class NegativeOne(IntegerConstant, metaclass=Singleton):
"""The number negative one.
NegativeOne is a singleton, and can be accessed by ``S.NegativeOne``.
Examples
========
>>> from sympy import S, Integer
>>> Integer(-1) is S.NegativeOne
True
See Also
========
One
References
==========
.. [1] https://en.wikipedia.org/wiki/%E2%88%921_%28number%29
"""
is_number = True
p = -1
q = 1
__slots__ = ()
@staticmethod
def __abs__():
return S.One
@staticmethod
def __neg__():
return S.One
def _eval_power(self, expt):
if expt.is_odd:
return S.NegativeOne
if expt.is_even:
return S.One
if isinstance(expt, Number):
if isinstance(expt, Float):
return Float(-1.0)**expt
if expt is S.NaN:
return S.NaN
if expt is S.Infinity or expt is S.NegativeInfinity:
return S.NaN
if expt is S.Half:
return S.ImaginaryUnit
if isinstance(expt, Rational):
if expt.q == 2:
return S.ImaginaryUnit**Integer(expt.p)
i, r = divmod(expt.p, expt.q)
if i:
return self**i*self**Rational(r, expt.q)
return
class Half(RationalConstant, metaclass=Singleton):
"""The rational number 1/2.
Half is a singleton, and can be accessed by ``S.Half``.
Examples
========
>>> from sympy import S, Rational
>>> Rational(1, 2) is S.Half
True
References
==========
.. [1] https://en.wikipedia.org/wiki/One_half
"""
is_number = True
p = 1
q = 2
__slots__ = ()
@staticmethod
def __abs__():
return S.Half
class Infinity(Number, metaclass=Singleton):
r"""Positive infinite quantity.
In real analysis the symbol `\infty` denotes an unbounded
limit: `x\to\infty` means that `x` grows without bound.
Infinity is often used not only to define a limit but as a value
in the affinely extended real number system. Points labeled `+\infty`
and `-\infty` can be added to the topological space of the real numbers,
producing the two-point compactification of the real numbers. Adding
algebraic properties to this gives us the extended real numbers.
Infinity is a singleton, and can be accessed by ``S.Infinity``,
or can be imported as ``oo``.
Examples
========
>>> from sympy import oo, exp, limit, Symbol
>>> 1 + oo
oo
>>> 42/oo
0
>>> x = Symbol('x')
>>> limit(exp(x), x, oo)
oo
See Also
========
NegativeInfinity, NaN
References
==========
.. [1] https://en.wikipedia.org/wiki/Infinity
"""
is_commutative = True
is_number = True
is_complex = False
is_extended_real = True
is_infinite = True
is_comparable = True
is_extended_positive = True
is_prime = False
__slots__ = ()
def __new__(cls):
return AtomicExpr.__new__(cls)
def _latex(self, printer):
return r"\infty"
def _eval_subs(self, old, new):
if self == old:
return new
def _eval_evalf(self, prec=None):
return Float('inf')
def evalf(self, prec=None, **options):
return self._eval_evalf(prec)
@_sympifyit('other', NotImplemented)
def __add__(self, other):
if isinstance(other, Number) and global_parameters.evaluate:
if other is S.NegativeInfinity or other is S.NaN:
return S.NaN
return self
return Number.__add__(self, other)
__radd__ = __add__
@_sympifyit('other', NotImplemented)
def __sub__(self, other):
if isinstance(other, Number) and global_parameters.evaluate:
if other is S.Infinity or other is S.NaN:
return S.NaN
return self
return Number.__sub__(self, other)
@_sympifyit('other', NotImplemented)
def __rsub__(self, other):
return (-self).__add__(other)
@_sympifyit('other', NotImplemented)
def __mul__(self, other):
if isinstance(other, Number) and global_parameters.evaluate:
if other.is_zero or other is S.NaN:
return S.NaN
if other.is_extended_positive:
return self
return S.NegativeInfinity
return Number.__mul__(self, other)
__rmul__ = __mul__
@_sympifyit('other', NotImplemented)
def __div__(self, other):
if isinstance(other, Number) and global_parameters.evaluate:
if other is S.Infinity or \
other is S.NegativeInfinity or \
other is S.NaN:
return S.NaN
if other.is_extended_nonnegative:
return self
return S.NegativeInfinity
return Number.__div__(self, other)
__truediv__ = __div__
def __abs__(self):
return S.Infinity
def __neg__(self):
return S.NegativeInfinity
def _eval_power(self, expt):
"""
``expt`` is symbolic object but not equal to 0 or 1.
================ ======= ==============================
Expression Result Notes
================ ======= ==============================
``oo ** nan`` ``nan``
``oo ** -p`` ``0`` ``p`` is number, ``oo``
================ ======= ==============================
See Also
========
Pow
NaN
NegativeInfinity
"""
from sympy.functions import re
if expt.is_extended_positive:
return S.Infinity
if expt.is_extended_negative:
return S.Zero
if expt is S.NaN:
return S.NaN
if expt is S.ComplexInfinity:
return S.NaN
if expt.is_extended_real is False and expt.is_number:
expt_real = re(expt)
if expt_real.is_positive:
return S.ComplexInfinity
if expt_real.is_negative:
return S.Zero
if expt_real.is_zero:
return S.NaN
return self**expt.evalf()
def _as_mpf_val(self, prec):
return mlib.finf
def _sage_(self):
import sage.all as sage
return sage.oo
def __hash__(self):
return super(Infinity, self).__hash__()
def __eq__(self, other):
return other is S.Infinity or other == float('inf')
def __ne__(self, other):
return other is not S.Infinity and other != float('inf')
__gt__ = Expr.__gt__
__ge__ = Expr.__ge__
__lt__ = Expr.__lt__
__le__ = Expr.__le__
@_sympifyit('other', NotImplemented)
def __mod__(self, other):
if not isinstance(other, Expr):
return NotImplemented
return S.NaN
__rmod__ = __mod__
def floor(self):
return self
def ceiling(self):
return self
oo = S.Infinity
class NegativeInfinity(Number, metaclass=Singleton):
"""Negative infinite quantity.
NegativeInfinity is a singleton, and can be accessed
by ``S.NegativeInfinity``.
See Also
========
Infinity
"""
is_extended_real = True
is_complex = False
is_commutative = True
is_infinite = True
is_comparable = True
is_extended_negative = True
is_number = True
is_prime = False
__slots__ = ()
def __new__(cls):
return AtomicExpr.__new__(cls)
def _latex(self, printer):
return r"-\infty"
def _eval_subs(self, old, new):
if self == old:
return new
def _eval_evalf(self, prec=None):
return Float('-inf')
def evalf(self, prec=None, **options):
return self._eval_evalf(prec)
@_sympifyit('other', NotImplemented)
def __add__(self, other):
if isinstance(other, Number) and global_parameters.evaluate:
if other is S.Infinity or other is S.NaN:
return S.NaN
return self
return Number.__add__(self, other)
__radd__ = __add__
@_sympifyit('other', NotImplemented)
def __sub__(self, other):
if isinstance(other, Number) and global_parameters.evaluate:
if other is S.NegativeInfinity or other is S.NaN:
return S.NaN
return self
return Number.__sub__(self, other)
@_sympifyit('other', NotImplemented)
def __rsub__(self, other):
return (-self).__add__(other)
@_sympifyit('other', NotImplemented)
def __mul__(self, other):
if isinstance(other, Number) and global_parameters.evaluate:
if other.is_zero or other is S.NaN:
return S.NaN
if other.is_extended_positive:
return self
return S.Infinity
return Number.__mul__(self, other)
__rmul__ = __mul__
@_sympifyit('other', NotImplemented)
def __div__(self, other):
if isinstance(other, Number) and global_parameters.evaluate:
if other is S.Infinity or \
other is S.NegativeInfinity or \
other is S.NaN:
return S.NaN
if other.is_extended_nonnegative:
return self
return S.Infinity
return Number.__div__(self, other)
__truediv__ = __div__
def __abs__(self):
return S.Infinity
def __neg__(self):
return S.Infinity
def _eval_power(self, expt):
"""
``expt`` is symbolic object but not equal to 0 or 1.
================ ======= ==============================
Expression Result Notes
================ ======= ==============================
``(-oo) ** nan`` ``nan``
``(-oo) ** oo`` ``nan``
``(-oo) ** -oo`` ``nan``
``(-oo) ** e`` ``oo`` ``e`` is positive even integer
``(-oo) ** o`` ``-oo`` ``o`` is positive odd integer
================ ======= ==============================
See Also
========
Infinity
Pow
NaN
"""
if expt.is_number:
if expt is S.NaN or \
expt is S.Infinity or \
expt is S.NegativeInfinity:
return S.NaN
if isinstance(expt, Integer) and expt.is_extended_positive:
if expt.is_odd:
return S.NegativeInfinity
else:
return S.Infinity
return S.NegativeOne**expt*S.Infinity**expt
def _as_mpf_val(self, prec):
return mlib.fninf
def _sage_(self):
import sage.all as sage
return -(sage.oo)
def __hash__(self):
return super(NegativeInfinity, self).__hash__()
def __eq__(self, other):
return other is S.NegativeInfinity or other == float('-inf')
def __ne__(self, other):
return other is not S.NegativeInfinity and other != float('-inf')
__gt__ = Expr.__gt__
__ge__ = Expr.__ge__
__lt__ = Expr.__lt__
__le__ = Expr.__le__
@_sympifyit('other', NotImplemented)
def __mod__(self, other):
if not isinstance(other, Expr):
return NotImplemented
return S.NaN
__rmod__ = __mod__
def floor(self):
return self
def ceiling(self):
return self
def as_powers_dict(self):
return {S.NegativeOne: 1, S.Infinity: 1}
class NaN(Number, metaclass=Singleton):
"""
Not a Number.
This serves as a place holder for numeric values that are indeterminate.
Most operations on NaN, produce another NaN. Most indeterminate forms,
such as ``0/0`` or ``oo - oo` produce NaN. Two exceptions are ``0**0``
and ``oo**0``, which all produce ``1`` (this is consistent with Python's
float).
NaN is loosely related to floating point nan, which is defined in the
IEEE 754 floating point standard, and corresponds to the Python
``float('nan')``. Differences are noted below.
NaN is mathematically not equal to anything else, even NaN itself. This
explains the initially counter-intuitive results with ``Eq`` and ``==`` in
the examples below.
NaN is not comparable so inequalities raise a TypeError. This is in
contrast with floating point nan where all inequalities are false.
NaN is a singleton, and can be accessed by ``S.NaN``, or can be imported
as ``nan``.
Examples
========
>>> from sympy import nan, S, oo, Eq
>>> nan is S.NaN
True
>>> oo - oo
nan
>>> nan + 1
nan
>>> Eq(nan, nan) # mathematical equality
False
>>> nan == nan # structural equality
True
References
==========
.. [1] https://en.wikipedia.org/wiki/NaN
"""
is_commutative = True
is_extended_real = None
is_real = None
is_rational = None
is_algebraic = None
is_transcendental = None
is_integer = None
is_comparable = False
is_finite = None
is_zero = None
is_prime = None
is_positive = None
is_negative = None
is_number = True
__slots__ = ()
def __new__(cls):
return AtomicExpr.__new__(cls)
def _latex(self, printer):
return r"\text{NaN}"
def __neg__(self):
return self
@_sympifyit('other', NotImplemented)
def __add__(self, other):
return self
@_sympifyit('other', NotImplemented)
def __sub__(self, other):
return self
@_sympifyit('other', NotImplemented)
def __mul__(self, other):
return self
@_sympifyit('other', NotImplemented)
def __div__(self, other):
return self
__truediv__ = __div__
def floor(self):
return self
def ceiling(self):
return self
def _as_mpf_val(self, prec):
return _mpf_nan
def _sage_(self):
import sage.all as sage
return sage.NaN
def __hash__(self):
return super(NaN, self).__hash__()
def __eq__(self, other):
# NaN is structurally equal to another NaN
return other is S.NaN
def __ne__(self, other):
return other is not S.NaN
def _eval_Eq(self, other):
# NaN is not mathematically equal to anything, even NaN
return S.false
# Expr will _sympify and raise TypeError
__gt__ = Expr.__gt__
__ge__ = Expr.__ge__
__lt__ = Expr.__lt__
__le__ = Expr.__le__
nan = S.NaN
class ComplexInfinity(AtomicExpr, metaclass=Singleton):
r"""Complex infinity.
In complex analysis the symbol `\tilde\infty`, called "complex
infinity", represents a quantity with infinite magnitude, but
undetermined complex phase.
ComplexInfinity is a singleton, and can be accessed by
``S.ComplexInfinity``, or can be imported as ``zoo``.
Examples
========
>>> from sympy import zoo, oo
>>> zoo + 42
zoo
>>> 42/zoo
0
>>> zoo + zoo
nan
>>> zoo*zoo
zoo
See Also
========
Infinity
"""
is_commutative = True
is_infinite = True
is_number = True
is_prime = False
is_complex = False
is_extended_real = False
__slots__ = ()
def __new__(cls):
return AtomicExpr.__new__(cls)
def _latex(self, printer):
return r"\tilde{\infty}"
@staticmethod
def __abs__():
return S.Infinity
def floor(self):
return self
def ceiling(self):
return self
@staticmethod
def __neg__():
return S.ComplexInfinity
def _eval_power(self, expt):
if expt is S.ComplexInfinity:
return S.NaN
if isinstance(expt, Number):
if expt.is_zero:
return S.NaN
else:
if expt.is_positive:
return S.ComplexInfinity
else:
return S.Zero
def _sage_(self):
import sage.all as sage
return sage.UnsignedInfinityRing.gen()
zoo = S.ComplexInfinity
class NumberSymbol(AtomicExpr):
is_commutative = True
is_finite = True
is_number = True
__slots__ = ()
is_NumberSymbol = True
def __new__(cls):
return AtomicExpr.__new__(cls)
def approximation(self, number_cls):
""" Return an interval with number_cls endpoints
that contains the value of NumberSymbol.
If not implemented, then return None.
"""
def _eval_evalf(self, prec):
return Float._new(self._as_mpf_val(prec), prec)
def __eq__(self, other):
try:
other = _sympify(other)
except SympifyError:
return NotImplemented
if self is other:
return True
if other.is_Number and self.is_irrational:
return False
return False # NumberSymbol != non-(Number|self)
def __ne__(self, other):
return not self == other
def __le__(self, other):
if self is other:
return S.true
return Expr.__le__(self, other)
def __ge__(self, other):
if self is other:
return S.true
return Expr.__ge__(self, other)
def __int__(self):
# subclass with appropriate return value
raise NotImplementedError
def __long__(self):
return self.__int__()
def __hash__(self):
return super(NumberSymbol, self).__hash__()
class Exp1(NumberSymbol, metaclass=Singleton):
r"""The `e` constant.
The transcendental number `e = 2.718281828\ldots` is the base of the
natural logarithm and of the exponential function, `e = \exp(1)`.
Sometimes called Euler's number or Napier's constant.
Exp1 is a singleton, and can be accessed by ``S.Exp1``,
or can be imported as ``E``.
Examples
========
>>> from sympy import exp, log, E
>>> E is exp(1)
True
>>> log(E)
1
References
==========
.. [1] https://en.wikipedia.org/wiki/E_%28mathematical_constant%29
"""
is_real = True
is_positive = True
is_negative = False # XXX Forces is_negative/is_nonnegative
is_irrational = True
is_number = True
is_algebraic = False
is_transcendental = True
__slots__ = ()
def _latex(self, printer):
return r"e"
@staticmethod
def __abs__():
return S.Exp1
def __int__(self):
return 2
def _as_mpf_val(self, prec):
return mpf_e(prec)
def approximation_interval(self, number_cls):
if issubclass(number_cls, Integer):
return (Integer(2), Integer(3))
elif issubclass(number_cls, Rational):
pass
def _eval_power(self, expt):
from sympy import exp
return exp(expt)
def _eval_rewrite_as_sin(self, **kwargs):
from sympy import sin
I = S.ImaginaryUnit
return sin(I + S.Pi/2) - I*sin(I)
def _eval_rewrite_as_cos(self, **kwargs):
from sympy import cos
I = S.ImaginaryUnit
return cos(I) + I*cos(I + S.Pi/2)
def _sage_(self):
import sage.all as sage
return sage.e
E = S.Exp1
class Pi(NumberSymbol, metaclass=Singleton):
r"""The `\pi` constant.
The transcendental number `\pi = 3.141592654\ldots` represents the ratio
of a circle's circumference to its diameter, the area of the unit circle,
the half-period of trigonometric functions, and many other things
in mathematics.
Pi is a singleton, and can be accessed by ``S.Pi``, or can
be imported as ``pi``.
Examples
========
>>> from sympy import S, pi, oo, sin, exp, integrate, Symbol
>>> S.Pi
pi
>>> pi > 3
True
>>> pi.is_irrational
True
>>> x = Symbol('x')
>>> sin(x + 2*pi)
sin(x)
>>> integrate(exp(-x**2), (x, -oo, oo))
sqrt(pi)
References
==========
.. [1] https://en.wikipedia.org/wiki/Pi
"""
is_real = True
is_positive = True
is_negative = False
is_irrational = True
is_number = True
is_algebraic = False
is_transcendental = True
__slots__ = ()
def _latex(self, printer):
return r"\pi"
@staticmethod
def __abs__():
return S.Pi
def __int__(self):
return 3
def _as_mpf_val(self, prec):
return mpf_pi(prec)
def approximation_interval(self, number_cls):
if issubclass(number_cls, Integer):
return (Integer(3), Integer(4))
elif issubclass(number_cls, Rational):
return (Rational(223, 71), Rational(22, 7))
def _sage_(self):
import sage.all as sage
return sage.pi
pi = S.Pi
class GoldenRatio(NumberSymbol, metaclass=Singleton):
r"""The golden ratio, `\phi`.
`\phi = \frac{1 + \sqrt{5}}{2}` is algebraic number. Two quantities
are in the golden ratio if their ratio is the same as the ratio of
their sum to the larger of the two quantities, i.e. their maximum.
GoldenRatio is a singleton, and can be accessed by ``S.GoldenRatio``.
Examples
========
>>> from sympy import S
>>> S.GoldenRatio > 1
True
>>> S.GoldenRatio.expand(func=True)
1/2 + sqrt(5)/2
>>> S.GoldenRatio.is_irrational
True
References
==========
.. [1] https://en.wikipedia.org/wiki/Golden_ratio
"""
is_real = True
is_positive = True
is_negative = False
is_irrational = True
is_number = True
is_algebraic = True
is_transcendental = False
__slots__ = ()
def _latex(self, printer):
return r"\phi"
def __int__(self):
return 1
def _as_mpf_val(self, prec):
# XXX track down why this has to be increased
rv = mlib.from_man_exp(phi_fixed(prec + 10), -prec - 10)
return mpf_norm(rv, prec)
def _eval_expand_func(self, **hints):
from sympy import sqrt
return S.Half + S.Half*sqrt(5)
def approximation_interval(self, number_cls):
if issubclass(number_cls, Integer):
return (S.One, Rational(2))
elif issubclass(number_cls, Rational):
pass
def _sage_(self):
import sage.all as sage
return sage.golden_ratio
_eval_rewrite_as_sqrt = _eval_expand_func
class TribonacciConstant(NumberSymbol, metaclass=Singleton):
r"""The tribonacci constant.
The tribonacci numbers are like the Fibonacci numbers, but instead
of starting with two predetermined terms, the sequence starts with
three predetermined terms and each term afterwards is the sum of the
preceding three terms.
The tribonacci constant is the ratio toward which adjacent tribonacci
numbers tend. It is a root of the polynomial `x^3 - x^2 - x - 1 = 0`,
and also satisfies the equation `x + x^{-3} = 2`.
TribonacciConstant is a singleton, and can be accessed
by ``S.TribonacciConstant``.
Examples
========
>>> from sympy import S
>>> S.TribonacciConstant > 1
True
>>> S.TribonacciConstant.expand(func=True)
1/3 + (19 - 3*sqrt(33))**(1/3)/3 + (3*sqrt(33) + 19)**(1/3)/3
>>> S.TribonacciConstant.is_irrational
True
>>> S.TribonacciConstant.n(20)
1.8392867552141611326
References
==========
.. [1] https://en.wikipedia.org/wiki/Generalizations_of_Fibonacci_numbers#Tribonacci_numbers
"""
is_real = True
is_positive = True
is_negative = False
is_irrational = True
is_number = True
is_algebraic = True
is_transcendental = False
__slots__ = ()
def _latex(self, printer):
return r"\text{TribonacciConstant}"
def __int__(self):
return 2
def _eval_evalf(self, prec):
rv = self._eval_expand_func(function=True)._eval_evalf(prec + 4)
return Float(rv, precision=prec)
def _eval_expand_func(self, **hints):
from sympy import sqrt, cbrt
return (1 + cbrt(19 - 3*sqrt(33)) + cbrt(19 + 3*sqrt(33))) / 3
def approximation_interval(self, number_cls):
if issubclass(number_cls, Integer):
return (S.One, Rational(2))
elif issubclass(number_cls, Rational):
pass
_eval_rewrite_as_sqrt = _eval_expand_func
class EulerGamma(NumberSymbol, metaclass=Singleton):
r"""The Euler-Mascheroni constant.
`\gamma = 0.5772157\ldots` (also called Euler's constant) is a mathematical
constant recurring in analysis and number theory. It is defined as the
limiting difference between the harmonic series and the
natural logarithm:
.. math:: \gamma = \lim\limits_{n\to\infty}
\left(\sum\limits_{k=1}^n\frac{1}{k} - \ln n\right)
EulerGamma is a singleton, and can be accessed by ``S.EulerGamma``.
Examples
========
>>> from sympy import S
>>> S.EulerGamma.is_irrational
>>> S.EulerGamma > 0
True
>>> S.EulerGamma > 1
False
References
==========
.. [1] https://en.wikipedia.org/wiki/Euler%E2%80%93Mascheroni_constant
"""
is_real = True
is_positive = True
is_negative = False
is_irrational = None
is_number = True
__slots__ = ()
def _latex(self, printer):
return r"\gamma"
def __int__(self):
return 0
def _as_mpf_val(self, prec):
# XXX track down why this has to be increased
v = mlib.libhyper.euler_fixed(prec + 10)
rv = mlib.from_man_exp(v, -prec - 10)
return mpf_norm(rv, prec)
def approximation_interval(self, number_cls):
if issubclass(number_cls, Integer):
return (S.Zero, S.One)
elif issubclass(number_cls, Rational):
return (S.Half, Rational(3, 5))
def _sage_(self):
import sage.all as sage
return sage.euler_gamma
class Catalan(NumberSymbol, metaclass=Singleton):
r"""Catalan's constant.
`K = 0.91596559\ldots` is given by the infinite series
.. math:: K = \sum_{k=0}^{\infty} \frac{(-1)^k}{(2k+1)^2}
Catalan is a singleton, and can be accessed by ``S.Catalan``.
Examples
========
>>> from sympy import S
>>> S.Catalan.is_irrational
>>> S.Catalan > 0
True
>>> S.Catalan > 1
False
References
==========
.. [1] https://en.wikipedia.org/wiki/Catalan%27s_constant
"""
is_real = True
is_positive = True
is_negative = False
is_irrational = None
is_number = True
__slots__ = ()
def __int__(self):
return 0
def _as_mpf_val(self, prec):
# XXX track down why this has to be increased
v = mlib.catalan_fixed(prec + 10)
rv = mlib.from_man_exp(v, -prec - 10)
return mpf_norm(rv, prec)
def approximation_interval(self, number_cls):
if issubclass(number_cls, Integer):
return (S.Zero, S.One)
elif issubclass(number_cls, Rational):
return (Rational(9, 10), S.One)
def _eval_rewrite_as_Sum(self, k_sym=None, symbols=None):
from sympy import Sum, Dummy
if (k_sym is not None) or (symbols is not None):
return self
k = Dummy('k', integer=True, nonnegative=True)
return Sum((-1)**k / (2*k+1)**2, (k, 0, S.Infinity))
def _sage_(self):
import sage.all as sage
return sage.catalan
class ImaginaryUnit(AtomicExpr, metaclass=Singleton):
r"""The imaginary unit, `i = \sqrt{-1}`.
I is a singleton, and can be accessed by ``S.I``, or can be
imported as ``I``.
Examples
========
>>> from sympy import I, sqrt
>>> sqrt(-1)
I
>>> I*I
-1
>>> 1/I
-I
References
==========
.. [1] https://en.wikipedia.org/wiki/Imaginary_unit
"""
is_commutative = True
is_imaginary = True
is_finite = True
is_number = True
is_algebraic = True
is_transcendental = False
__slots__ = ()
def _latex(self, printer):
return printer._settings['imaginary_unit_latex']
@staticmethod
def __abs__():
return S.One
def _eval_evalf(self, prec):
return self
def _eval_conjugate(self):
return -S.ImaginaryUnit
def _eval_power(self, expt):
"""
b is I = sqrt(-1)
e is symbolic object but not equal to 0, 1
I**r -> (-1)**(r/2) -> exp(r/2*Pi*I) -> sin(Pi*r/2) + cos(Pi*r/2)*I, r is decimal
I**0 mod 4 -> 1
I**1 mod 4 -> I
I**2 mod 4 -> -1
I**3 mod 4 -> -I
"""
if isinstance(expt, Number):
if isinstance(expt, Integer):
expt = expt.p % 4
if expt == 0:
return S.One
if expt == 1:
return S.ImaginaryUnit
if expt == 2:
return -S.One
return -S.ImaginaryUnit
return
def as_base_exp(self):
return S.NegativeOne, S.Half
def _sage_(self):
import sage.all as sage
return sage.I
@property
def _mpc_(self):
return (Float(0)._mpf_, Float(1)._mpf_)
I = S.ImaginaryUnit
def sympify_fractions(f):
return Rational(f.numerator, f.denominator, 1)
converter[fractions.Fraction] = sympify_fractions
if HAS_GMPY:
def sympify_mpz(x):
return Integer(int(x))
# XXX: The sympify_mpq function here was never used because it is
# overridden by the other sympify_mpq function below. Maybe it should just
# be removed or maybe it should be used for something...
def sympify_mpq(x):
return Rational(int(x.numerator), int(x.denominator))
converter[type(gmpy.mpz(1))] = sympify_mpz
converter[type(gmpy.mpq(1, 2))] = sympify_mpq
def sympify_mpmath_mpq(x):
p, q = x._mpq_
return Rational(p, q, 1)
converter[type(mpmath.rational.mpq(1, 2))] = sympify_mpmath_mpq
def sympify_mpmath(x):
return Expr._from_mpmath(x, x.context.prec)
converter[mpnumeric] = sympify_mpmath
def sympify_complex(a):
real, imag = list(map(sympify, (a.real, a.imag)))
return real + S.ImaginaryUnit*imag
converter[complex] = sympify_complex
from .power import Pow, integer_nthroot
from .mul import Mul
Mul.identity = One()
from .add import Add
Add.identity = Zero()
def _register_classes():
numbers.Number.register(Number)
numbers.Real.register(Float)
numbers.Rational.register(Rational)
numbers.Rational.register(Integer)
_register_classes()
|
3a7302622fc8d871a5129df7793bf8674f27c70d00af32e9ee2cfce5e564147f | from __future__ import print_function, division
from typing import Tuple
from sympy.core.sympify import _sympify, sympify
from sympy.core.basic import Basic
from sympy.core.cache import cacheit
from sympy.core.compatibility import ordered
from sympy.core.logic import fuzzy_and
from sympy.core.parameters import global_parameters
from sympy.utilities.iterables import sift
class AssocOp(Basic):
""" Associative operations, can separate noncommutative and
commutative parts.
(a op b) op c == a op (b op c) == a op b op c.
Base class for Add and Mul.
This is an abstract base class, concrete derived classes must define
the attribute `identity`.
"""
# for performance reason, we don't let is_commutative go to assumptions,
# and keep it right here
__slots__ = ('is_commutative',) # type: Tuple[str, ...]
@cacheit
def __new__(cls, *args, **options):
from sympy import Order
args = list(map(_sympify, args))
args = [a for a in args if a is not cls.identity]
# XXX: Maybe only Expr should be allowed here...
from sympy.core.relational import Relational
if any(isinstance(arg, Relational) for arg in args):
raise TypeError("Relational can not be used in %s" % cls.__name__)
evaluate = options.get('evaluate')
if evaluate is None:
evaluate = global_parameters.evaluate
if not evaluate:
obj = cls._from_args(args)
obj = cls._exec_constructor_postprocessors(obj)
return obj
if len(args) == 0:
return cls.identity
if len(args) == 1:
return args[0]
c_part, nc_part, order_symbols = cls.flatten(args)
is_commutative = not nc_part
obj = cls._from_args(c_part + nc_part, is_commutative)
obj = cls._exec_constructor_postprocessors(obj)
if order_symbols is not None:
return Order(obj, *order_symbols)
return obj
@classmethod
def _from_args(cls, args, is_commutative=None):
"""Create new instance with already-processed args.
If the args are not in canonical order, then a non-canonical
result will be returned, so use with caution. The order of
args may change if the sign of the args is changed."""
if len(args) == 0:
return cls.identity
elif len(args) == 1:
return args[0]
obj = super(AssocOp, cls).__new__(cls, *args)
if is_commutative is None:
is_commutative = fuzzy_and(a.is_commutative for a in args)
obj.is_commutative = is_commutative
return obj
def _new_rawargs(self, *args, **kwargs):
"""Create new instance of own class with args exactly as provided by
caller but returning the self class identity if args is empty.
This is handy when we want to optimize things, e.g.
>>> from sympy import Mul, S
>>> from sympy.abc import x, y
>>> e = Mul(3, x, y)
>>> e.args
(3, x, y)
>>> Mul(*e.args[1:])
x*y
>>> e._new_rawargs(*e.args[1:]) # the same as above, but faster
x*y
Note: use this with caution. There is no checking of arguments at
all. This is best used when you are rebuilding an Add or Mul after
simply removing one or more args. If, for example, modifications,
result in extra 1s being inserted (as when collecting an
expression's numerators and denominators) they will not show up in
the result but a Mul will be returned nonetheless:
>>> m = (x*y)._new_rawargs(S.One, x); m
x
>>> m == x
False
>>> m.is_Mul
True
Another issue to be aware of is that the commutativity of the result
is based on the commutativity of self. If you are rebuilding the
terms that came from a commutative object then there will be no
problem, but if self was non-commutative then what you are
rebuilding may now be commutative.
Although this routine tries to do as little as possible with the
input, getting the commutativity right is important, so this level
of safety is enforced: commutativity will always be recomputed if
self is non-commutative and kwarg `reeval=False` has not been
passed.
"""
if kwargs.pop('reeval', True) and self.is_commutative is False:
is_commutative = None
else:
is_commutative = self.is_commutative
return self._from_args(args, is_commutative)
@classmethod
def flatten(cls, seq):
"""Return seq so that none of the elements are of type `cls`. This is
the vanilla routine that will be used if a class derived from AssocOp
does not define its own flatten routine."""
# apply associativity, no commutativity property is used
new_seq = []
while seq:
o = seq.pop()
if o.__class__ is cls: # classes must match exactly
seq.extend(o.args)
else:
new_seq.append(o)
new_seq.reverse()
# c_part, nc_part, order_symbols
return [], new_seq, None
def _matches_commutative(self, expr, repl_dict={}, old=False):
"""
Matches Add/Mul "pattern" to an expression "expr".
repl_dict ... a dictionary of (wild: expression) pairs, that get
returned with the results
This function is the main workhorse for Add/Mul.
For instance:
>>> from sympy import symbols, Wild, sin
>>> a = Wild("a")
>>> b = Wild("b")
>>> c = Wild("c")
>>> x, y, z = symbols("x y z")
>>> (a+sin(b)*c)._matches_commutative(x+sin(y)*z)
{a_: x, b_: y, c_: z}
In the example above, "a+sin(b)*c" is the pattern, and "x+sin(y)*z" is
the expression.
The repl_dict contains parts that were already matched. For example
here:
>>> (x+sin(b)*c)._matches_commutative(x+sin(y)*z, repl_dict={a: x})
{a_: x, b_: y, c_: z}
the only function of the repl_dict is to return it in the
result, e.g. if you omit it:
>>> (x+sin(b)*c)._matches_commutative(x+sin(y)*z)
{b_: y, c_: z}
the "a: x" is not returned in the result, but otherwise it is
equivalent.
"""
# make sure expr is Expr if pattern is Expr
from .expr import Add, Expr
from sympy import Mul
if isinstance(self, Expr) and not isinstance(expr, Expr):
return None
# handle simple patterns
if self == expr:
return repl_dict
d = self._matches_simple(expr, repl_dict)
if d is not None:
return d
# eliminate exact part from pattern: (2+a+w1+w2).matches(expr) -> (w1+w2).matches(expr-a-2)
from .function import WildFunction
from .symbol import Wild
wild_part, exact_part = sift(self.args, lambda p:
p.has(Wild, WildFunction) and not expr.has(p),
binary=True)
if not exact_part:
wild_part = list(ordered(wild_part))
else:
exact = self._new_rawargs(*exact_part)
free = expr.free_symbols
if free and (exact.free_symbols - free):
# there are symbols in the exact part that are not
# in the expr; but if there are no free symbols, let
# the matching continue
return None
newexpr = self._combine_inverse(expr, exact)
if not old and (expr.is_Add or expr.is_Mul):
if newexpr.count_ops() > expr.count_ops():
return None
newpattern = self._new_rawargs(*wild_part)
return newpattern.matches(newexpr, repl_dict)
# now to real work ;)
i = 0
saw = set()
while expr not in saw:
saw.add(expr)
expr_list = (self.identity,) + tuple(ordered(self.make_args(expr)))
for last_op in reversed(expr_list):
for w in reversed(wild_part):
d1 = w.matches(last_op, repl_dict)
if d1 is not None:
d2 = self.xreplace(d1).matches(expr, d1)
if d2 is not None:
return d2
if i == 0:
if self.is_Mul:
# make e**i look like Mul
if expr.is_Pow and expr.exp.is_Integer:
if expr.exp > 0:
expr = Mul(*[expr.base, expr.base**(expr.exp - 1)], evaluate=False)
else:
expr = Mul(*[1/expr.base, expr.base**(expr.exp + 1)], evaluate=False)
i += 1
continue
elif self.is_Add:
# make i*e look like Add
c, e = expr.as_coeff_Mul()
if abs(c) > 1:
if c > 0:
expr = Add(*[e, (c - 1)*e], evaluate=False)
else:
expr = Add(*[-e, (c + 1)*e], evaluate=False)
i += 1
continue
# try collection on non-Wild symbols
from sympy.simplify.radsimp import collect
was = expr
did = set()
for w in reversed(wild_part):
c, w = w.as_coeff_mul(Wild)
free = c.free_symbols - did
if free:
did.update(free)
expr = collect(expr, free)
if expr != was:
i += 0
continue
break # if we didn't continue, there is nothing more to do
return
def _has_matcher(self):
"""Helper for .has()"""
def _ncsplit(expr):
# this is not the same as args_cnc because here
# we don't assume expr is a Mul -- hence deal with args --
# and always return a set.
cpart, ncpart = sift(expr.args,
lambda arg: arg.is_commutative is True, binary=True)
return set(cpart), ncpart
c, nc = _ncsplit(self)
cls = self.__class__
def is_in(expr):
if expr == self:
return True
elif not isinstance(expr, Basic):
return False
elif isinstance(expr, cls):
_c, _nc = _ncsplit(expr)
if (c & _c) == c:
if not nc:
return True
elif len(nc) <= len(_nc):
for i in range(len(_nc) - len(nc) + 1):
if _nc[i:i + len(nc)] == nc:
return True
return False
return is_in
def _eval_evalf(self, prec):
"""
Evaluate the parts of self that are numbers; if the whole thing
was a number with no functions it would have been evaluated, but
it wasn't so we must judiciously extract the numbers and reconstruct
the object. This is *not* simply replacing numbers with evaluated
numbers. Numbers should be handled in the largest pure-number
expression as possible. So the code below separates ``self`` into
number and non-number parts and evaluates the number parts and
walks the args of the non-number part recursively (doing the same
thing).
"""
from .add import Add
from .mul import Mul
from .symbol import Symbol
from .function import AppliedUndef
if isinstance(self, (Mul, Add)):
x, tail = self.as_independent(Symbol, AppliedUndef)
# if x is an AssocOp Function then the _evalf below will
# call _eval_evalf (here) so we must break the recursion
if not (tail is self.identity or
isinstance(x, AssocOp) and x.is_Function or
x is self.identity and isinstance(tail, AssocOp)):
# here, we have a number so we just call to _evalf with prec;
# prec is not the same as n, it is the binary precision so
# that's why we don't call to evalf.
x = x._evalf(prec) if x is not self.identity else self.identity
args = []
tail_args = tuple(self.func.make_args(tail))
for a in tail_args:
# here we call to _eval_evalf since we don't know what we
# are dealing with and all other _eval_evalf routines should
# be doing the same thing (i.e. taking binary prec and
# finding the evalf-able args)
newa = a._eval_evalf(prec)
if newa is None:
args.append(a)
else:
args.append(newa)
return self.func(x, *args)
# this is the same as above, but there were no pure-number args to
# deal with
args = []
for a in self.args:
newa = a._eval_evalf(prec)
if newa is None:
args.append(a)
else:
args.append(newa)
return self.func(*args)
@classmethod
def make_args(cls, expr):
"""
Return a sequence of elements `args` such that cls(*args) == expr
>>> from sympy import Symbol, Mul, Add
>>> x, y = map(Symbol, 'xy')
>>> Mul.make_args(x*y)
(x, y)
>>> Add.make_args(x*y)
(x*y,)
>>> set(Add.make_args(x*y + y)) == set([y, x*y])
True
"""
if isinstance(expr, cls):
return expr.args
else:
return (sympify(expr),)
class ShortCircuit(Exception):
pass
class LatticeOp(AssocOp):
"""
Join/meet operations of an algebraic lattice[1].
These binary operations are associative (op(op(a, b), c) = op(a, op(b, c))),
commutative (op(a, b) = op(b, a)) and idempotent (op(a, a) = op(a) = a).
Common examples are AND, OR, Union, Intersection, max or min. They have an
identity element (op(identity, a) = a) and an absorbing element
conventionally called zero (op(zero, a) = zero).
This is an abstract base class, concrete derived classes must declare
attributes zero and identity. All defining properties are then respected.
>>> from sympy import Integer
>>> from sympy.core.operations import LatticeOp
>>> class my_join(LatticeOp):
... zero = Integer(0)
... identity = Integer(1)
>>> my_join(2, 3) == my_join(3, 2)
True
>>> my_join(2, my_join(3, 4)) == my_join(2, 3, 4)
True
>>> my_join(0, 1, 4, 2, 3, 4)
0
>>> my_join(1, 2)
2
References:
[1] - https://en.wikipedia.org/wiki/Lattice_%28order%29
"""
is_commutative = True
def __new__(cls, *args, **options):
args = (_sympify(arg) for arg in args)
try:
# /!\ args is a generator and _new_args_filter
# must be careful to handle as such; this
# is done so short-circuiting can be done
# without having to sympify all values
_args = frozenset(cls._new_args_filter(args))
except ShortCircuit:
return sympify(cls.zero)
if not _args:
return sympify(cls.identity)
elif len(_args) == 1:
return set(_args).pop()
else:
# XXX in almost every other case for __new__, *_args is
# passed along, but the expectation here is for _args
obj = super(AssocOp, cls).__new__(cls, _args)
obj._argset = _args
return obj
@classmethod
def _new_args_filter(cls, arg_sequence, call_cls=None):
"""Generator filtering args"""
ncls = call_cls or cls
for arg in arg_sequence:
if arg == ncls.zero:
raise ShortCircuit(arg)
elif arg == ncls.identity:
continue
elif arg.func == ncls:
for x in arg.args:
yield x
else:
yield arg
@classmethod
def make_args(cls, expr):
"""
Return a set of args such that cls(*arg_set) == expr.
"""
if isinstance(expr, cls):
return expr._argset
else:
return frozenset([sympify(expr)])
# XXX: This should be cached on the object rather than using cacheit
# Maybe _argset can just be sorted in the constructor?
@property # type: ignore
@cacheit
def args(self):
return tuple(ordered(self._argset))
@staticmethod
def _compare_pretty(a, b):
return (str(a) > str(b)) - (str(a) < str(b))
|
12ed45f0afecb6d9f64c89d3dfad6c48981e5addc1afd0379caf6457930d4481 | from __future__ import print_function, division
from sympy.core.numbers import nan
from .function import Function
class Mod(Function):
"""Represents a modulo operation on symbolic expressions.
Receives two arguments, dividend p and divisor q.
The convention used is the same as Python's: the remainder always has the
same sign as the divisor.
Examples
========
>>> from sympy.abc import x, y
>>> x**2 % y
Mod(x**2, y)
>>> _.subs({x: 5, y: 6})
1
"""
@classmethod
def eval(cls, p, q):
from sympy.core.add import Add
from sympy.core.mul import Mul
from sympy.core.singleton import S
from sympy.core.exprtools import gcd_terms
from sympy.polys.polytools import gcd
def doit(p, q):
"""Try to return p % q if both are numbers or +/-p is known
to be less than or equal q.
"""
if q.is_zero:
raise ZeroDivisionError("Modulo by zero")
if p.is_infinite or q.is_infinite or p is nan or q is nan:
return nan
if p is S.Zero or p == q or p == -q or (p.is_integer and q == 1):
return S.Zero
if q.is_Number:
if p.is_Number:
return p%q
if q == 2:
if p.is_even:
return S.Zero
elif p.is_odd:
return S.One
if hasattr(p, '_eval_Mod'):
rv = getattr(p, '_eval_Mod')(q)
if rv is not None:
return rv
# by ratio
r = p/q
try:
d = int(r)
except TypeError:
pass
else:
if isinstance(d, int):
rv = p - d*q
if (rv*q < 0) == True:
rv += q
return rv
# by difference
# -2|q| < p < 2|q|
d = abs(p)
for _ in range(2):
d -= abs(q)
if d.is_negative:
if q.is_positive:
if p.is_positive:
return d + q
elif p.is_negative:
return -d
elif q.is_negative:
if p.is_positive:
return d
elif p.is_negative:
return -d + q
break
rv = doit(p, q)
if rv is not None:
return rv
# denest
if isinstance(p, cls):
qinner = p.args[1]
if qinner % q == 0:
return cls(p.args[0], q)
elif (qinner*(q - qinner)).is_nonnegative:
# |qinner| < |q| and have same sign
return p
elif isinstance(-p, cls):
qinner = (-p).args[1]
if qinner % q == 0:
return cls(-(-p).args[0], q)
elif (qinner*(q + qinner)).is_nonpositive:
# |qinner| < |q| and have different sign
return p
elif isinstance(p, Add):
# separating into modulus and non modulus
both_l = non_mod_l, mod_l = [], []
for arg in p.args:
both_l[isinstance(arg, cls)].append(arg)
# if q same for all
if mod_l and all(inner.args[1] == q for inner in mod_l):
net = Add(*non_mod_l) + Add(*[i.args[0] for i in mod_l])
return cls(net, q)
elif isinstance(p, Mul):
# separating into modulus and non modulus
both_l = non_mod_l, mod_l = [], []
for arg in p.args:
both_l[isinstance(arg, cls)].append(arg)
if mod_l and all(inner.args[1] == q for inner in mod_l):
# finding distributive term
non_mod_l = [cls(x, q) for x in non_mod_l]
mod = []
non_mod = []
for j in non_mod_l:
if isinstance(j, cls):
mod.append(j.args[0])
else:
non_mod.append(j)
prod_mod = Mul(*mod)
prod_non_mod = Mul(*non_mod)
prod_mod1 = Mul(*[i.args[0] for i in mod_l])
net = prod_mod1*prod_mod
return prod_non_mod*cls(net, q)
if q.is_Integer and q is not S.One:
_ = []
for i in non_mod_l:
if i.is_Integer and (i % q is not S.Zero):
_.append(i%q)
else:
_.append(i)
non_mod_l = _
p = Mul(*(non_mod_l + mod_l))
# XXX other possibilities?
# extract gcd; any further simplification should be done by the user
G = gcd(p, q)
if G != 1:
p, q = [
gcd_terms(i/G, clear=False, fraction=False) for i in (p, q)]
pwas, qwas = p, q
# simplify terms
# (x + y + 2) % x -> Mod(y + 2, x)
if p.is_Add:
args = []
for i in p.args:
a = cls(i, q)
if a.count(cls) > i.count(cls):
args.append(i)
else:
args.append(a)
if args != list(p.args):
p = Add(*args)
else:
# handle coefficients if they are not Rational
# since those are not handled by factor_terms
# e.g. Mod(.6*x, .3*y) -> 0.3*Mod(2*x, y)
cp, p = p.as_coeff_Mul()
cq, q = q.as_coeff_Mul()
ok = False
if not cp.is_Rational or not cq.is_Rational:
r = cp % cq
if r == 0:
G *= cq
p *= int(cp/cq)
ok = True
if not ok:
p = cp*p
q = cq*q
# simple -1 extraction
if p.could_extract_minus_sign() and q.could_extract_minus_sign():
G, p, q = [-i for i in (G, p, q)]
# check again to see if p and q can now be handled as numbers
rv = doit(p, q)
if rv is not None:
return rv*G
# put 1.0 from G on inside
if G.is_Float and G == 1:
p *= G
return cls(p, q, evaluate=False)
elif G.is_Mul and G.args[0].is_Float and G.args[0] == 1:
p = G.args[0]*p
G = Mul._from_args(G.args[1:])
return G*cls(p, q, evaluate=(p, q) != (pwas, qwas))
def _eval_is_integer(self):
from sympy.core.logic import fuzzy_and, fuzzy_not
p, q = self.args
if fuzzy_and([p.is_integer, q.is_integer, fuzzy_not(q.is_zero)]):
return True
def _eval_is_nonnegative(self):
if self.args[1].is_positive:
return True
def _eval_is_nonpositive(self):
if self.args[1].is_negative:
return True
def _eval_rewrite_as_floor(self, a, b, **kwargs):
from sympy.functions.elementary.integers import floor
return a - b*floor(a/b)
|
2fe3681fdb20e738ffd8592b3d73072d34315afabad205b9332e2e1dacc38309 | from __future__ import print_function, division
from sympy.core.assumptions import StdFactKB, _assume_defined
from sympy.core.compatibility import is_sequence, ordered
from .basic import Basic
from .sympify import sympify
from .singleton import S
from .expr import Expr, AtomicExpr
from .cache import cacheit
from .function import FunctionClass
from sympy.core.logic import fuzzy_bool
from sympy.logic.boolalg import Boolean
from sympy.utilities.iterables import cartes, sift
from sympy.core.containers import Tuple
import string
import re as _re
import random
def _filter_assumptions(kwargs):
"""Split the given dict into assumptions and non-assumptions.
Keys are taken as assumptions if they correspond to an
entry in ``_assume_defined``.
"""
assumptions, nonassumptions = map(dict, sift(kwargs.items(),
lambda i: i[0] in _assume_defined,
binary=True))
Symbol._sanitize(assumptions)
return assumptions, nonassumptions
def _symbol(s, matching_symbol=None, **assumptions):
"""Return s if s is a Symbol, else if s is a string, return either
the matching_symbol if the names are the same or else a new symbol
with the same assumptions as the matching symbol (or the
assumptions as provided).
Examples
========
>>> from sympy import Symbol, Dummy
>>> from sympy.core.symbol import _symbol
>>> _symbol('y')
y
>>> _.is_real is None
True
>>> _symbol('y', real=True).is_real
True
>>> x = Symbol('x')
>>> _symbol(x, real=True)
x
>>> _.is_real is None # ignore attribute if s is a Symbol
True
Below, the variable sym has the name 'foo':
>>> sym = Symbol('foo', real=True)
Since 'x' is not the same as sym's name, a new symbol is created:
>>> _symbol('x', sym).name
'x'
It will acquire any assumptions give:
>>> _symbol('x', sym, real=False).is_real
False
Since 'foo' is the same as sym's name, sym is returned
>>> _symbol('foo', sym)
foo
Any assumptions given are ignored:
>>> _symbol('foo', sym, real=False).is_real
True
NB: the symbol here may not be the same as a symbol with the same
name defined elsewhere as a result of different assumptions.
See Also
========
sympy.core.symbol.Symbol
"""
if isinstance(s, str):
if matching_symbol and matching_symbol.name == s:
return matching_symbol
return Symbol(s, **assumptions)
elif isinstance(s, Symbol):
return s
else:
raise ValueError('symbol must be string for symbol name or Symbol')
def _uniquely_named_symbol(xname, exprs=(), compare=str, modify=None, **assumptions):
"""Return a symbol which, when printed, will have a name unique
from any other already in the expressions given. The name is made
unique by prepending underscores (default) but this can be
customized with the keyword 'modify'.
Parameters
==========
xname : a string or a Symbol (when symbol xname <- str(xname))
compare : a single arg function that takes a symbol and returns
a string to be compared with xname (the default is the str
function which indicates how the name will look when it
is printed, e.g. this includes underscores that appear on
Dummy symbols)
modify : a single arg function that changes its string argument
in some way (the default is to prepend underscores)
Examples
========
>>> from sympy.core.symbol import _uniquely_named_symbol as usym, Dummy
>>> from sympy.abc import x
>>> usym('x', x)
_x
"""
default = None
if is_sequence(xname):
xname, default = xname
x = str(xname)
if not exprs:
return _symbol(x, default, **assumptions)
if not is_sequence(exprs):
exprs = [exprs]
syms = set().union(*[e.free_symbols for e in exprs])
if modify is None:
modify = lambda s: '_' + s
while any(x == compare(s) for s in syms):
x = modify(x)
return _symbol(x, default, **assumptions)
class Symbol(AtomicExpr, Boolean):
"""
Assumptions:
commutative = True
You can override the default assumptions in the constructor:
>>> from sympy import symbols
>>> A,B = symbols('A,B', commutative = False)
>>> bool(A*B != B*A)
True
>>> bool(A*B*2 == 2*A*B) == True # multiplication by scalars is commutative
True
"""
is_comparable = False
__slots__ = ('name',)
is_Symbol = True
is_symbol = True
@property
def _diff_wrt(self):
"""Allow derivatives wrt Symbols.
Examples
========
>>> from sympy import Symbol
>>> x = Symbol('x')
>>> x._diff_wrt
True
"""
return True
@staticmethod
def _sanitize(assumptions, obj=None):
"""Remove None, covert values to bool, check commutativity *in place*.
"""
# be strict about commutativity: cannot be None
is_commutative = fuzzy_bool(assumptions.get('commutative', True))
if is_commutative is None:
whose = '%s ' % obj.__name__ if obj else ''
raise ValueError(
'%scommutativity must be True or False.' % whose)
# sanitize other assumptions so 1 -> True and 0 -> False
for key in list(assumptions.keys()):
v = assumptions[key]
if v is None:
assumptions.pop(key)
continue
assumptions[key] = bool(v)
def _merge(self, assumptions):
base = self.assumptions0
for k in set(assumptions) & set(base):
if assumptions[k] != base[k]:
from sympy.utilities.misc import filldedent
raise ValueError(filldedent('''
non-matching assumptions for %s: existing value
is %s and new value is %s''' % (
k, base[k], assumptions[k])))
base.update(assumptions)
return base
def __new__(cls, name, **assumptions):
"""Symbols are identified by name and assumptions::
>>> from sympy import Symbol
>>> Symbol("x") == Symbol("x")
True
>>> Symbol("x", real=True) == Symbol("x", real=False)
False
"""
cls._sanitize(assumptions, cls)
return Symbol.__xnew_cached_(cls, name, **assumptions)
def __new_stage2__(cls, name, **assumptions):
if not isinstance(name, str):
raise TypeError("name should be a string, not %s" % repr(type(name)))
obj = Expr.__new__(cls)
obj.name = name
# TODO: Issue #8873: Forcing the commutative assumption here means
# later code such as ``srepr()`` cannot tell whether the user
# specified ``commutative=True`` or omitted it. To workaround this,
# we keep a copy of the assumptions dict, then create the StdFactKB,
# and finally overwrite its ``._generator`` with the dict copy. This
# is a bit of a hack because we assume StdFactKB merely copies the
# given dict as ``._generator``, but future modification might, e.g.,
# compute a minimal equivalent assumption set.
tmp_asm_copy = assumptions.copy()
# be strict about commutativity
is_commutative = fuzzy_bool(assumptions.get('commutative', True))
assumptions['commutative'] = is_commutative
obj._assumptions = StdFactKB(assumptions)
obj._assumptions._generator = tmp_asm_copy # Issue #8873
return obj
__xnew__ = staticmethod(
__new_stage2__) # never cached (e.g. dummy)
__xnew_cached_ = staticmethod(
cacheit(__new_stage2__)) # symbols are always cached
def __getnewargs__(self):
return (self.name,)
def __getstate__(self):
return {'_assumptions': self._assumptions}
def _hashable_content(self):
# Note: user-specified assumptions not hashed, just derived ones
return (self.name,) + tuple(sorted(self.assumptions0.items()))
def _eval_subs(self, old, new):
from sympy.core.power import Pow
if old.is_Pow:
return Pow(self, S.One, evaluate=False)._eval_subs(old, new)
@property
def assumptions0(self):
return dict((key, value) for key, value
in self._assumptions.items() if value is not None)
@cacheit
def sort_key(self, order=None):
return self.class_key(), (1, (str(self),)), S.One.sort_key(), S.One
def as_dummy(self):
return Dummy(self.name)
def as_real_imag(self, deep=True, **hints):
from sympy import im, re
if hints.get('ignore') == self:
return None
else:
return (re(self), im(self))
def _sage_(self):
import sage.all as sage
return sage.var(self.name)
def is_constant(self, *wrt, **flags):
if not wrt:
return False
return not self in wrt
@property
def free_symbols(self):
return {self}
binary_symbols = free_symbols # in this case, not always
def as_set(self):
return S.UniversalSet
class Dummy(Symbol):
"""Dummy symbols are each unique, even if they have the same name:
>>> from sympy import Dummy
>>> Dummy("x") == Dummy("x")
False
If a name is not supplied then a string value of an internal count will be
used. This is useful when a temporary variable is needed and the name
of the variable used in the expression is not important.
>>> Dummy() #doctest: +SKIP
_Dummy_10
"""
# In the rare event that a Dummy object needs to be recreated, both the
# `name` and `dummy_index` should be passed. This is used by `srepr` for
# example:
# >>> d1 = Dummy()
# >>> d2 = eval(srepr(d1))
# >>> d2 == d1
# True
#
# If a new session is started between `srepr` and `eval`, there is a very
# small chance that `d2` will be equal to a previously-created Dummy.
_count = 0
_prng = random.Random()
_base_dummy_index = _prng.randint(10**6, 9*10**6)
__slots__ = ('dummy_index',)
is_Dummy = True
def __new__(cls, name=None, dummy_index=None, **assumptions):
if dummy_index is not None:
assert name is not None, "If you specify a dummy_index, you must also provide a name"
if name is None:
name = "Dummy_" + str(Dummy._count)
if dummy_index is None:
dummy_index = Dummy._base_dummy_index + Dummy._count
Dummy._count += 1
cls._sanitize(assumptions, cls)
obj = Symbol.__xnew__(cls, name, **assumptions)
obj.dummy_index = dummy_index
return obj
def __getstate__(self):
return {'_assumptions': self._assumptions, 'dummy_index': self.dummy_index}
@cacheit
def sort_key(self, order=None):
return self.class_key(), (
2, (str(self), self.dummy_index)), S.One.sort_key(), S.One
def _hashable_content(self):
return Symbol._hashable_content(self) + (self.dummy_index,)
class Wild(Symbol):
"""
A Wild symbol matches anything, or anything
without whatever is explicitly excluded.
Parameters
==========
name : str
Name of the Wild instance.
exclude : iterable, optional
Instances in ``exclude`` will not be matched.
properties : iterable of functions, optional
Functions, each taking an expressions as input
and returns a ``bool``. All functions in ``properties``
need to return ``True`` in order for the Wild instance
to match the expression.
Examples
========
>>> from sympy import Wild, WildFunction, cos, pi
>>> from sympy.abc import x, y, z
>>> a = Wild('a')
>>> x.match(a)
{a_: x}
>>> pi.match(a)
{a_: pi}
>>> (3*x**2).match(a*x)
{a_: 3*x}
>>> cos(x).match(a)
{a_: cos(x)}
>>> b = Wild('b', exclude=[x])
>>> (3*x**2).match(b*x)
>>> b.match(a)
{a_: b_}
>>> A = WildFunction('A')
>>> A.match(a)
{a_: A_}
Tips
====
When using Wild, be sure to use the exclude
keyword to make the pattern more precise.
Without the exclude pattern, you may get matches
that are technically correct, but not what you
wanted. For example, using the above without
exclude:
>>> from sympy import symbols
>>> a, b = symbols('a b', cls=Wild)
>>> (2 + 3*y).match(a*x + b*y)
{a_: 2/x, b_: 3}
This is technically correct, because
(2/x)*x + 3*y == 2 + 3*y, but you probably
wanted it to not match at all. The issue is that
you really didn't want a and b to include x and y,
and the exclude parameter lets you specify exactly
this. With the exclude parameter, the pattern will
not match.
>>> a = Wild('a', exclude=[x, y])
>>> b = Wild('b', exclude=[x, y])
>>> (2 + 3*y).match(a*x + b*y)
Exclude also helps remove ambiguity from matches.
>>> E = 2*x**3*y*z
>>> a, b = symbols('a b', cls=Wild)
>>> E.match(a*b)
{a_: 2*y*z, b_: x**3}
>>> a = Wild('a', exclude=[x, y])
>>> E.match(a*b)
{a_: z, b_: 2*x**3*y}
>>> a = Wild('a', exclude=[x, y, z])
>>> E.match(a*b)
{a_: 2, b_: x**3*y*z}
Wild also accepts a ``properties`` parameter:
>>> a = Wild('a', properties=[lambda k: k.is_Integer])
>>> E.match(a*b)
{a_: 2, b_: x**3*y*z}
"""
is_Wild = True
__slots__ = ('exclude', 'properties')
def __new__(cls, name, exclude=(), properties=(), **assumptions):
exclude = tuple([sympify(x) for x in exclude])
properties = tuple(properties)
cls._sanitize(assumptions, cls)
return Wild.__xnew__(cls, name, exclude, properties, **assumptions)
def __getnewargs__(self):
return (self.name, self.exclude, self.properties)
@staticmethod
@cacheit
def __xnew__(cls, name, exclude, properties, **assumptions):
obj = Symbol.__xnew__(cls, name, **assumptions)
obj.exclude = exclude
obj.properties = properties
return obj
def _hashable_content(self):
return super(Wild, self)._hashable_content() + (self.exclude, self.properties)
# TODO add check against another Wild
def matches(self, expr, repl_dict={}, old=False):
if any(expr.has(x) for x in self.exclude):
return None
if any(not f(expr) for f in self.properties):
return None
repl_dict = repl_dict.copy()
repl_dict[self] = expr
return repl_dict
_range = _re.compile('([0-9]*:[0-9]+|[a-zA-Z]?:[a-zA-Z])')
def symbols(names, **args):
r"""
Transform strings into instances of :class:`Symbol` class.
:func:`symbols` function returns a sequence of symbols with names taken
from ``names`` argument, which can be a comma or whitespace delimited
string, or a sequence of strings::
>>> from sympy import symbols, Function
>>> x, y, z = symbols('x,y,z')
>>> a, b, c = symbols('a b c')
The type of output is dependent on the properties of input arguments::
>>> symbols('x')
x
>>> symbols('x,')
(x,)
>>> symbols('x,y')
(x, y)
>>> symbols(('a', 'b', 'c'))
(a, b, c)
>>> symbols(['a', 'b', 'c'])
[a, b, c]
>>> symbols({'a', 'b', 'c'})
{a, b, c}
If an iterable container is needed for a single symbol, set the ``seq``
argument to ``True`` or terminate the symbol name with a comma::
>>> symbols('x', seq=True)
(x,)
To reduce typing, range syntax is supported to create indexed symbols.
Ranges are indicated by a colon and the type of range is determined by
the character to the right of the colon. If the character is a digit
then all contiguous digits to the left are taken as the nonnegative
starting value (or 0 if there is no digit left of the colon) and all
contiguous digits to the right are taken as 1 greater than the ending
value::
>>> symbols('x:10')
(x0, x1, x2, x3, x4, x5, x6, x7, x8, x9)
>>> symbols('x5:10')
(x5, x6, x7, x8, x9)
>>> symbols('x5(:2)')
(x50, x51)
>>> symbols('x5:10,y:5')
(x5, x6, x7, x8, x9, y0, y1, y2, y3, y4)
>>> symbols(('x5:10', 'y:5'))
((x5, x6, x7, x8, x9), (y0, y1, y2, y3, y4))
If the character to the right of the colon is a letter, then the single
letter to the left (or 'a' if there is none) is taken as the start
and all characters in the lexicographic range *through* the letter to
the right are used as the range::
>>> symbols('x:z')
(x, y, z)
>>> symbols('x:c') # null range
()
>>> symbols('x(:c)')
(xa, xb, xc)
>>> symbols(':c')
(a, b, c)
>>> symbols('a:d, x:z')
(a, b, c, d, x, y, z)
>>> symbols(('a:d', 'x:z'))
((a, b, c, d), (x, y, z))
Multiple ranges are supported; contiguous numerical ranges should be
separated by parentheses to disambiguate the ending number of one
range from the starting number of the next::
>>> symbols('x:2(1:3)')
(x01, x02, x11, x12)
>>> symbols(':3:2') # parsing is from left to right
(00, 01, 10, 11, 20, 21)
Only one pair of parentheses surrounding ranges are removed, so to
include parentheses around ranges, double them. And to include spaces,
commas, or colons, escape them with a backslash::
>>> symbols('x((a:b))')
(x(a), x(b))
>>> symbols(r'x(:1\,:2)') # or r'x((:1)\,(:2))'
(x(0,0), x(0,1))
All newly created symbols have assumptions set according to ``args``::
>>> a = symbols('a', integer=True)
>>> a.is_integer
True
>>> x, y, z = symbols('x,y,z', real=True)
>>> x.is_real and y.is_real and z.is_real
True
Despite its name, :func:`symbols` can create symbol-like objects like
instances of Function or Wild classes. To achieve this, set ``cls``
keyword argument to the desired type::
>>> symbols('f,g,h', cls=Function)
(f, g, h)
>>> type(_[0])
<class 'sympy.core.function.UndefinedFunction'>
"""
result = []
if isinstance(names, str):
marker = 0
literals = [r'\,', r'\:', r'\ ']
for i in range(len(literals)):
lit = literals.pop(0)
if lit in names:
while chr(marker) in names:
marker += 1
lit_char = chr(marker)
marker += 1
names = names.replace(lit, lit_char)
literals.append((lit_char, lit[1:]))
def literal(s):
if literals:
for c, l in literals:
s = s.replace(c, l)
return s
names = names.strip()
as_seq = names.endswith(',')
if as_seq:
names = names[:-1].rstrip()
if not names:
raise ValueError('no symbols given')
# split on commas
names = [n.strip() for n in names.split(',')]
if not all(n for n in names):
raise ValueError('missing symbol between commas')
# split on spaces
for i in range(len(names) - 1, -1, -1):
names[i: i + 1] = names[i].split()
cls = args.pop('cls', Symbol)
seq = args.pop('seq', as_seq)
for name in names:
if not name:
raise ValueError('missing symbol')
if ':' not in name:
symbol = cls(literal(name), **args)
result.append(symbol)
continue
split = _range.split(name)
# remove 1 layer of bounding parentheses around ranges
for i in range(len(split) - 1):
if i and ':' in split[i] and split[i] != ':' and \
split[i - 1].endswith('(') and \
split[i + 1].startswith(')'):
split[i - 1] = split[i - 1][:-1]
split[i + 1] = split[i + 1][1:]
for i, s in enumerate(split):
if ':' in s:
if s[-1].endswith(':'):
raise ValueError('missing end range')
a, b = s.split(':')
if b[-1] in string.digits:
a = 0 if not a else int(a)
b = int(b)
split[i] = [str(c) for c in range(a, b)]
else:
a = a or 'a'
split[i] = [string.ascii_letters[c] for c in range(
string.ascii_letters.index(a),
string.ascii_letters.index(b) + 1)] # inclusive
if not split[i]:
break
else:
split[i] = [s]
else:
seq = True
if len(split) == 1:
names = split[0]
else:
names = [''.join(s) for s in cartes(*split)]
if literals:
result.extend([cls(literal(s), **args) for s in names])
else:
result.extend([cls(s, **args) for s in names])
if not seq and len(result) <= 1:
if not result:
return ()
return result[0]
return tuple(result)
else:
for name in names:
result.append(symbols(name, **args))
return type(names)(result)
def var(names, **args):
"""
Create symbols and inject them into the global namespace.
This calls :func:`symbols` with the same arguments and puts the results
into the *global* namespace. It's recommended not to use :func:`var` in
library code, where :func:`symbols` has to be used::
Examples
========
>>> from sympy import var
>>> var('x')
x
>>> x
x
>>> var('a,ab,abc')
(a, ab, abc)
>>> abc
abc
>>> var('x,y', real=True)
(x, y)
>>> x.is_real and y.is_real
True
See :func:`symbols` documentation for more details on what kinds of
arguments can be passed to :func:`var`.
"""
def traverse(symbols, frame):
"""Recursively inject symbols to the global namespace. """
for symbol in symbols:
if isinstance(symbol, Basic):
frame.f_globals[symbol.name] = symbol
elif isinstance(symbol, FunctionClass):
frame.f_globals[symbol.__name__] = symbol
else:
traverse(symbol, frame)
from inspect import currentframe
frame = currentframe().f_back
try:
syms = symbols(names, **args)
if syms is not None:
if isinstance(syms, Basic):
frame.f_globals[syms.name] = syms
elif isinstance(syms, FunctionClass):
frame.f_globals[syms.__name__] = syms
else:
traverse(syms, frame)
finally:
del frame # break cyclic dependencies as stated in inspect docs
return syms
def disambiguate(*iter):
"""
Return a Tuple containing the passed expressions with symbols
that appear the same when printed replaced with numerically
subscripted symbols, and all Dummy symbols replaced with Symbols.
Parameters
==========
iter: list of symbols or expressions.
Examples
========
>>> from sympy.core.symbol import disambiguate
>>> from sympy import Dummy, Symbol, Tuple
>>> from sympy.abc import y
>>> tup = Symbol('_x'), Dummy('x'), Dummy('x')
>>> disambiguate(*tup)
(x_2, x, x_1)
>>> eqs = Tuple(Symbol('x')/y, Dummy('x')/y)
>>> disambiguate(*eqs)
(x_1/y, x/y)
>>> ix = Symbol('x', integer=True)
>>> vx = Symbol('x')
>>> disambiguate(vx + ix)
(x + x_1,)
To make your own mapping of symbols to use, pass only the free symbols
of the expressions and create a dictionary:
>>> free = eqs.free_symbols
>>> mapping = dict(zip(free, disambiguate(*free)))
>>> eqs.xreplace(mapping)
(x_1/y, x/y)
"""
new_iter = Tuple(*iter)
key = lambda x:tuple(sorted(x.assumptions0.items()))
syms = ordered(new_iter.free_symbols, keys=key)
mapping = {}
for s in syms:
mapping.setdefault(str(s).lstrip('_'), []).append(s)
reps = {}
for k in mapping:
# the first or only symbol doesn't get subscripted but make
# sure that it's a Symbol, not a Dummy
mapk0 = Symbol("%s" % (k), **mapping[k][0].assumptions0)
if mapping[k][0] != mapk0:
reps[mapping[k][0]] = mapk0
# the others get subscripts (and are made into Symbols)
skip = 0
for i in range(1, len(mapping[k])):
while True:
name = "%s_%i" % (k, i + skip)
if name not in mapping:
break
skip += 1
ki = mapping[k][i]
reps[ki] = Symbol(name, **ki.assumptions0)
return new_iter.xreplace(reps)
|
9311fa6a684b08a43566fdb441103e2bd083d1ae3b5154c7ac8f9b9aa95a7c33 | """
Reimplementations of constructs introduced in later versions of Python than
we support. Also some functions that are needed SymPy-wide and are located
here for easy import.
"""
from __future__ import print_function, division
from typing import Tuple, Type
import operator
from collections import defaultdict
from sympy.external import import_module
"""
Python 2 and Python 3 compatible imports
String and Unicode compatible changes:
* `unicode()` removed in Python 3, import `unicode` for Python 2/3
compatible function
* Use `u()` for escaped unicode sequences (e.g. u'\u2020' -> u('\u2020'))
* Use `u_decode()` to decode utf-8 formatted unicode strings
Renamed function attributes:
* Python 2 `.func_code`, Python 3 `.__func__`, access with
`get_function_code()`
* Python 2 `.func_globals`, Python 3 `.__globals__`, access with
`get_function_globals()`
* Python 2 `.func_name`, Python 3 `.__name__`, access with
`get_function_name()`
Moved modules:
* `reduce()`
* `StringIO()`
* `cStringIO()` (same as `StingIO()` in Python 3)
* Python 2 `__builtin__`, access with Python 3 name, `builtins`
exec:
* Use `exec_()`, with parameters `exec_(code, globs=None, locs=None)`
Metaclasses:
* Use `with_metaclass()`, examples below
* Define class `Foo` with metaclass `Meta`, and no parent:
class Foo(with_metaclass(Meta)):
pass
* Define class `Foo` with metaclass `Meta` and parent class `Bar`:
class Foo(with_metaclass(Meta, Bar)):
pass
"""
__all__ = [
'PY3', 'int_info', 'SYMPY_INTS', 'lru_cache', 'clock',
'unicode', 'u_decode', 'get_function_code', 'gmpy',
'get_function_globals', 'get_function_name', 'builtins', 'reduce',
'StringIO', 'cStringIO', 'exec_', 'Mapping', 'Callable',
'MutableMapping', 'MutableSet', 'Iterable', 'Hashable', 'unwrap',
'accumulate', 'with_metaclass', 'NotIterable', 'iterable', 'is_sequence',
'as_int', 'default_sort_key', 'ordered', 'GROUND_TYPES', 'HAS_GMPY',
]
import sys
PY3 = sys.version_info[0] > 2
if PY3:
int_info = sys.int_info
# String / unicode compatibility
unicode = str
def u_decode(x):
return x
# Moved definitions
get_function_code = operator.attrgetter("__code__")
get_function_globals = operator.attrgetter("__globals__")
get_function_name = operator.attrgetter("__name__")
import builtins
from functools import reduce
from io import StringIO
cStringIO = StringIO
exec_ = getattr(builtins, "exec")
from collections.abc import (Mapping, Callable, MutableMapping,
MutableSet, Iterable, Hashable)
from inspect import unwrap
from itertools import accumulate
else:
int_info = sys.long_info
# String / unicode compatibility
unicode = unicode
def u_decode(x):
return x.decode('utf-8')
# Moved definitions
get_function_code = operator.attrgetter("func_code")
get_function_globals = operator.attrgetter("func_globals")
get_function_name = operator.attrgetter("func_name")
import __builtin__ as builtins
reduce = reduce
from StringIO import StringIO
from cStringIO import StringIO as cStringIO
def exec_(_code_, _globs_=None, _locs_=None):
"""Execute code in a namespace."""
if _globs_ is None:
frame = sys._getframe(1)
_globs_ = frame.f_globals
if _locs_ is None:
_locs_ = frame.f_locals
del frame
elif _locs_ is None:
_locs_ = _globs_
exec("exec _code_ in _globs_, _locs_")
from collections import (Mapping, Callable, MutableMapping,
MutableSet, Iterable, Hashable)
def unwrap(func, stop=None):
"""Get the object wrapped by *func*.
Follows the chain of :attr:`__wrapped__` attributes returning the last
object in the chain.
*stop* is an optional callback accepting an object in the wrapper chain
as its sole argument that allows the unwrapping to be terminated early if
the callback returns a true value. If the callback never returns a true
value, the last object in the chain is returned as usual. For example,
:func:`signature` uses this to stop unwrapping if any object in the
chain has a ``__signature__`` attribute defined.
:exc:`ValueError` is raised if a cycle is encountered.
"""
if stop is None:
def _is_wrapper(f):
return hasattr(f, '__wrapped__')
else:
def _is_wrapper(f):
return hasattr(f, '__wrapped__') and not stop(f)
f = func # remember the original func for error reporting
memo = {id(f)} # Memoise by id to tolerate non-hashable objects
while _is_wrapper(func):
func = func.__wrapped__
id_func = id(func)
if id_func in memo:
raise ValueError('wrapper loop when unwrapping {!r}'.format(f))
memo.add(id_func)
return func
def accumulate(iterable, func=operator.add):
state = iterable[0]
yield state
for i in iterable[1:]:
state = func(state, i)
yield state
def with_metaclass(meta, *bases):
"""
Create a base class with a metaclass.
For example, if you have the metaclass
>>> class Meta(type):
... pass
Use this as the metaclass by doing
>>> from sympy.core.compatibility import with_metaclass
>>> class MyClass(with_metaclass(Meta, object)):
... pass
This is equivalent to the Python 2::
class MyClass(object):
__metaclass__ = Meta
or Python 3::
class MyClass(object, metaclass=Meta):
pass
That is, the first argument is the metaclass, and the remaining arguments
are the base classes. Note that if the base class is just ``object``, you
may omit it.
>>> MyClass.__mro__
(<class '...MyClass'>, <... 'object'>)
>>> type(MyClass)
<class '...Meta'>
"""
# This requires a bit of explanation: the basic idea is to make a dummy
# metaclass for one level of class instantiation that replaces itself with
# the actual metaclass.
# Code copied from the 'six' library.
class metaclass(meta):
def __new__(cls, name, this_bases, d):
return meta(name, bases, d)
return type.__new__(metaclass, "NewBase", (), {})
# These are in here because telling if something is an iterable just by calling
# hasattr(obj, "__iter__") behaves differently in Python 2 and Python 3. In
# particular, hasattr(str, "__iter__") is False in Python 2 and True in Python 3.
# I think putting them here also makes it easier to use them in the core.
class NotIterable:
"""
Use this as mixin when creating a class which is not supposed to
return true when iterable() is called on its instances because
calling list() on the instance, for example, would result in
an infinite loop.
"""
pass
def iterable(i, exclude=(str, dict, NotIterable)):
"""
Return a boolean indicating whether ``i`` is SymPy iterable.
True also indicates that the iterator is finite, e.g. you can
call list(...) on the instance.
When SymPy is working with iterables, it is almost always assuming
that the iterable is not a string or a mapping, so those are excluded
by default. If you want a pure Python definition, make exclude=None. To
exclude multiple items, pass them as a tuple.
You can also set the _iterable attribute to True or False on your class,
which will override the checks here, including the exclude test.
As a rule of thumb, some SymPy functions use this to check if they should
recursively map over an object. If an object is technically iterable in
the Python sense but does not desire this behavior (e.g., because its
iteration is not finite, or because iteration might induce an unwanted
computation), it should disable it by setting the _iterable attribute to False.
See also: is_sequence
Examples
========
>>> from sympy.utilities.iterables import iterable
>>> from sympy import Tuple
>>> things = [[1], (1,), set([1]), Tuple(1), (j for j in [1, 2]), {1:2}, '1', 1]
>>> for i in things:
... print('%s %s' % (iterable(i), type(i)))
True <... 'list'>
True <... 'tuple'>
True <... 'set'>
True <class 'sympy.core.containers.Tuple'>
True <... 'generator'>
False <... 'dict'>
False <... 'str'>
False <... 'int'>
>>> iterable({}, exclude=None)
True
>>> iterable({}, exclude=str)
True
>>> iterable("no", exclude=str)
False
"""
if hasattr(i, '_iterable'):
return i._iterable
try:
iter(i)
except TypeError:
return False
if exclude:
return not isinstance(i, exclude)
return True
def is_sequence(i, include=None):
"""
Return a boolean indicating whether ``i`` is a sequence in the SymPy
sense. If anything that fails the test below should be included as
being a sequence for your application, set 'include' to that object's
type; multiple types should be passed as a tuple of types.
Note: although generators can generate a sequence, they often need special
handling to make sure their elements are captured before the generator is
exhausted, so these are not included by default in the definition of a
sequence.
See also: iterable
Examples
========
>>> from sympy.utilities.iterables import is_sequence
>>> from types import GeneratorType
>>> is_sequence([])
True
>>> is_sequence(set())
False
>>> is_sequence('abc')
False
>>> is_sequence('abc', include=str)
True
>>> generator = (c for c in 'abc')
>>> is_sequence(generator)
False
>>> is_sequence(generator, include=(str, GeneratorType))
True
"""
return (hasattr(i, '__getitem__') and
iterable(i) or
bool(include) and
isinstance(i, include))
def as_int(n, strict=True):
"""
Convert the argument to a builtin integer.
The return value is guaranteed to be equal to the input. ValueError is
raised if the input has a non-integral value. When ``strict`` is True, this
uses `__index__ <https://docs.python.org/3/reference/datamodel.html#object.__index__>`_
and when it is False it uses ``int``.
Examples
========
>>> from sympy.core.compatibility import as_int
>>> from sympy import sqrt, S
The function is primarily concerned with sanitizing input for
functions that need to work with builtin integers, so anything that
is unambiguously an integer should be returned as an int:
>>> as_int(S(3))
3
Floats, being of limited precision, are not assumed to be exact and
will raise an error unless the ``strict`` flag is False. This
precision issue becomes apparent for large floating point numbers:
>>> big = 1e23
>>> type(big) is float
True
>>> big == int(big)
True
>>> as_int(big)
Traceback (most recent call last):
...
ValueError: ... is not an integer
>>> as_int(big, strict=False)
99999999999999991611392
Input that might be a complex representation of an integer value is
also rejected by default:
>>> one = sqrt(3 + 2*sqrt(2)) - sqrt(2)
>>> int(one) == 1
True
>>> as_int(one)
Traceback (most recent call last):
...
ValueError: ... is not an integer
"""
if strict:
try:
return operator.index(n)
except TypeError:
raise ValueError('%s is not an integer' % (n,))
else:
try:
result = int(n)
except TypeError:
raise ValueError('%s is not an integer' % (n,))
if n != result:
raise ValueError('%s is not an integer' % (n,))
return result
def default_sort_key(item, order=None):
"""Return a key that can be used for sorting.
The key has the structure:
(class_key, (len(args), args), exponent.sort_key(), coefficient)
This key is supplied by the sort_key routine of Basic objects when
``item`` is a Basic object or an object (other than a string) that
sympifies to a Basic object. Otherwise, this function produces the
key.
The ``order`` argument is passed along to the sort_key routine and is
used to determine how the terms *within* an expression are ordered.
(See examples below) ``order`` options are: 'lex', 'grlex', 'grevlex',
and reversed values of the same (e.g. 'rev-lex'). The default order
value is None (which translates to 'lex').
Examples
========
>>> from sympy import S, I, default_sort_key, sin, cos, sqrt
>>> from sympy.core.function import UndefinedFunction
>>> from sympy.abc import x
The following are equivalent ways of getting the key for an object:
>>> x.sort_key() == default_sort_key(x)
True
Here are some examples of the key that is produced:
>>> default_sort_key(UndefinedFunction('f'))
((0, 0, 'UndefinedFunction'), (1, ('f',)), ((1, 0, 'Number'),
(0, ()), (), 1), 1)
>>> default_sort_key('1')
((0, 0, 'str'), (1, ('1',)), ((1, 0, 'Number'), (0, ()), (), 1), 1)
>>> default_sort_key(S.One)
((1, 0, 'Number'), (0, ()), (), 1)
>>> default_sort_key(2)
((1, 0, 'Number'), (0, ()), (), 2)
While sort_key is a method only defined for SymPy objects,
default_sort_key will accept anything as an argument so it is
more robust as a sorting key. For the following, using key=
lambda i: i.sort_key() would fail because 2 doesn't have a sort_key
method; that's why default_sort_key is used. Note, that it also
handles sympification of non-string items likes ints:
>>> a = [2, I, -I]
>>> sorted(a, key=default_sort_key)
[2, -I, I]
The returned key can be used anywhere that a key can be specified for
a function, e.g. sort, min, max, etc...:
>>> a.sort(key=default_sort_key); a[0]
2
>>> min(a, key=default_sort_key)
2
Note
----
The key returned is useful for getting items into a canonical order
that will be the same across platforms. It is not directly useful for
sorting lists of expressions:
>>> a, b = x, 1/x
Since ``a`` has only 1 term, its value of sort_key is unaffected by
``order``:
>>> a.sort_key() == a.sort_key('rev-lex')
True
If ``a`` and ``b`` are combined then the key will differ because there
are terms that can be ordered:
>>> eq = a + b
>>> eq.sort_key() == eq.sort_key('rev-lex')
False
>>> eq.as_ordered_terms()
[x, 1/x]
>>> eq.as_ordered_terms('rev-lex')
[1/x, x]
But since the keys for each of these terms are independent of ``order``'s
value, they don't sort differently when they appear separately in a list:
>>> sorted(eq.args, key=default_sort_key)
[1/x, x]
>>> sorted(eq.args, key=lambda i: default_sort_key(i, order='rev-lex'))
[1/x, x]
The order of terms obtained when using these keys is the order that would
be obtained if those terms were *factors* in a product.
Although it is useful for quickly putting expressions in canonical order,
it does not sort expressions based on their complexity defined by the
number of operations, power of variables and others:
>>> sorted([sin(x)*cos(x), sin(x)], key=default_sort_key)
[sin(x)*cos(x), sin(x)]
>>> sorted([x, x**2, sqrt(x), x**3], key=default_sort_key)
[sqrt(x), x, x**2, x**3]
See Also
========
ordered, sympy.core.expr.as_ordered_factors, sympy.core.expr.as_ordered_terms
"""
from .singleton import S
from .basic import Basic
from .sympify import sympify, SympifyError
from .compatibility import iterable
if isinstance(item, Basic):
return item.sort_key(order=order)
if iterable(item, exclude=str):
if isinstance(item, dict):
args = item.items()
unordered = True
elif isinstance(item, set):
args = item
unordered = True
else:
# e.g. tuple, list
args = list(item)
unordered = False
args = [default_sort_key(arg, order=order) for arg in args]
if unordered:
# e.g. dict, set
args = sorted(args)
cls_index, args = 10, (len(args), tuple(args))
else:
if not isinstance(item, str):
try:
item = sympify(item)
except SympifyError:
# e.g. lambda x: x
pass
else:
if isinstance(item, Basic):
# e.g int -> Integer
return default_sort_key(item)
# e.g. UndefinedFunction
# e.g. str
cls_index, args = 0, (1, (str(item),))
return (cls_index, 0, item.__class__.__name__
), args, S.One.sort_key(), S.One
def _nodes(e):
"""
A helper for ordered() which returns the node count of ``e`` which
for Basic objects is the number of Basic nodes in the expression tree
but for other objects is 1 (unless the object is an iterable or dict
for which the sum of nodes is returned).
"""
from .basic import Basic
if isinstance(e, Basic):
return e.count(Basic)
elif iterable(e):
return 1 + sum(_nodes(ei) for ei in e)
elif isinstance(e, dict):
return 1 + sum(_nodes(k) + _nodes(v) for k, v in e.items())
else:
return 1
def ordered(seq, keys=None, default=True, warn=False):
"""Return an iterator of the seq where keys are used to break ties in
a conservative fashion: if, after applying a key, there are no ties
then no other keys will be computed.
Two default keys will be applied if 1) keys are not provided or 2) the
given keys don't resolve all ties (but only if ``default`` is True). The
two keys are ``_nodes`` (which places smaller expressions before large) and
``default_sort_key`` which (if the ``sort_key`` for an object is defined
properly) should resolve any ties.
If ``warn`` is True then an error will be raised if there were no
keys remaining to break ties. This can be used if it was expected that
there should be no ties between items that are not identical.
Examples
========
>>> from sympy.utilities.iterables import ordered
>>> from sympy import count_ops
>>> from sympy.abc import x, y
The count_ops is not sufficient to break ties in this list and the first
two items appear in their original order (i.e. the sorting is stable):
>>> list(ordered([y + 2, x + 2, x**2 + y + 3],
... count_ops, default=False, warn=False))
...
[y + 2, x + 2, x**2 + y + 3]
The default_sort_key allows the tie to be broken:
>>> list(ordered([y + 2, x + 2, x**2 + y + 3]))
...
[x + 2, y + 2, x**2 + y + 3]
Here, sequences are sorted by length, then sum:
>>> seq, keys = [[[1, 2, 1], [0, 3, 1], [1, 1, 3], [2], [1]], [
... lambda x: len(x),
... lambda x: sum(x)]]
...
>>> list(ordered(seq, keys, default=False, warn=False))
[[1], [2], [1, 2, 1], [0, 3, 1], [1, 1, 3]]
If ``warn`` is True, an error will be raised if there were not
enough keys to break ties:
>>> list(ordered(seq, keys, default=False, warn=True))
Traceback (most recent call last):
...
ValueError: not enough keys to break ties
Notes
=====
The decorated sort is one of the fastest ways to sort a sequence for
which special item comparison is desired: the sequence is decorated,
sorted on the basis of the decoration (e.g. making all letters lower
case) and then undecorated. If one wants to break ties for items that
have the same decorated value, a second key can be used. But if the
second key is expensive to compute then it is inefficient to decorate
all items with both keys: only those items having identical first key
values need to be decorated. This function applies keys successively
only when needed to break ties. By yielding an iterator, use of the
tie-breaker is delayed as long as possible.
This function is best used in cases when use of the first key is
expected to be a good hashing function; if there are no unique hashes
from application of a key, then that key should not have been used. The
exception, however, is that even if there are many collisions, if the
first group is small and one does not need to process all items in the
list then time will not be wasted sorting what one was not interested
in. For example, if one were looking for the minimum in a list and
there were several criteria used to define the sort order, then this
function would be good at returning that quickly if the first group
of candidates is small relative to the number of items being processed.
"""
d = defaultdict(list)
if keys:
if not isinstance(keys, (list, tuple)):
keys = [keys]
keys = list(keys)
f = keys.pop(0)
for a in seq:
d[f(a)].append(a)
else:
if not default:
raise ValueError('if default=False then keys must be provided')
d[None].extend(seq)
for k in sorted(d.keys()):
if len(d[k]) > 1:
if keys:
d[k] = ordered(d[k], keys, default, warn)
elif default:
d[k] = ordered(d[k], (_nodes, default_sort_key,),
default=False, warn=warn)
elif warn:
from sympy.utilities.iterables import uniq
u = list(uniq(d[k]))
if len(u) > 1:
raise ValueError(
'not enough keys to break ties: %s' % u)
for v in d[k]:
yield v
d.pop(k)
# If HAS_GMPY is 0, no supported version of gmpy is available. Otherwise,
# HAS_GMPY contains the major version number of gmpy; i.e. 1 for gmpy, and
# 2 for gmpy2.
# Versions of gmpy prior to 1.03 do not work correctly with int(largempz)
# For example, int(gmpy.mpz(2**256)) would raise OverflowError.
# See issue 4980.
# Minimum version of gmpy changed to 1.13 to allow a single code base to also
# work with gmpy2.
def _getenv(key, default=None):
from os import getenv
return getenv(key, default)
GROUND_TYPES = _getenv('SYMPY_GROUND_TYPES', 'auto').lower()
HAS_GMPY = 0
if GROUND_TYPES != 'python':
# Don't try to import gmpy2 if ground types is set to gmpy1. This is
# primarily intended for testing.
if GROUND_TYPES != 'gmpy1':
gmpy = import_module('gmpy2', min_module_version='2.0.0',
module_version_attr='version', module_version_attr_call_args=())
if gmpy:
HAS_GMPY = 2
else:
GROUND_TYPES = 'gmpy'
if not HAS_GMPY:
gmpy = import_module('gmpy', min_module_version='1.13',
module_version_attr='version', module_version_attr_call_args=())
if gmpy:
HAS_GMPY = 1
else:
gmpy = None
if GROUND_TYPES == 'auto':
if HAS_GMPY:
GROUND_TYPES = 'gmpy'
else:
GROUND_TYPES = 'python'
if GROUND_TYPES == 'gmpy' and not HAS_GMPY:
from warnings import warn
warn("gmpy library is not installed, switching to 'python' ground types")
GROUND_TYPES = 'python'
# SYMPY_INTS is a tuple containing the base types for valid integer types.
SYMPY_INTS = (int, ) # type: Tuple[Type, ...]
if GROUND_TYPES == 'gmpy':
SYMPY_INTS += (type(gmpy.mpz(0)),)
# lru_cache compatible with py2.7 copied directly from
# https://code.activestate.com/
# recipes/578078-py26-and-py30-backport-of-python-33s-lru-cache/
from collections import namedtuple
from functools import update_wrapper
from threading import RLock
_CacheInfo = namedtuple("CacheInfo", ["hits", "misses", "maxsize", "currsize"])
class _HashedSeq(list):
__slots__ = ('hashvalue',)
def __init__(self, tup, hash=hash):
self[:] = tup
self.hashvalue = hash(tup)
def __hash__(self):
return self.hashvalue
def _make_key(args, kwds, typed,
kwd_mark = (object(),),
fasttypes = set((int, str, frozenset, type(None))),
sorted=sorted, tuple=tuple, type=type, len=len):
'Make a cache key from optionally typed positional and keyword arguments'
key = args
if kwds:
sorted_items = sorted(kwds.items())
key += kwd_mark
for item in sorted_items:
key += item
if typed:
key += tuple(type(v) for v in args)
if kwds:
key += tuple(type(v) for k, v in sorted_items)
elif len(key) == 1 and type(key[0]) in fasttypes:
return key[0]
return _HashedSeq(key)
if sys.version_info[:2] >= (3, 3):
# 3.2 has an lru_cache with an incompatible API
from functools import lru_cache
else:
def lru_cache(maxsize=100, typed=False):
"""Least-recently-used cache decorator.
If *maxsize* is set to None, the LRU features are disabled and the cache
can grow without bound.
If *typed* is True, arguments of different types will be cached separately.
For example, f(3.0) and f(3) will be treated as distinct calls with
distinct results.
Arguments to the cached function must be hashable.
View the cache statistics named tuple (hits, misses, maxsize, currsize) with
f.cache_info(). Clear the cache and statistics with f.cache_clear().
Access the underlying function with f.__wrapped__.
See: https://en.wikipedia.org/wiki/Cache_algorithms#Least_Recently_Used
"""
# Users should only access the lru_cache through its public API:
# cache_info, cache_clear, and f.__wrapped__
# The internals of the lru_cache are encapsulated for thread safety and
# to allow the implementation to change (including a possible C version).
def decorating_function(user_function):
cache = dict()
stats = [0, 0] # make statistics updateable non-locally
HITS, MISSES = 0, 1 # names for the stats fields
make_key = _make_key
cache_get = cache.get # bound method to lookup key or return None
_len = len # localize the global len() function
lock = RLock() # because linkedlist updates aren't threadsafe
root = [] # root of the circular doubly linked list
root[:] = [root, root, None, None] # initialize by pointing to self
nonlocal_root = [root] # make updateable non-locally
PREV, NEXT, KEY, RESULT = 0, 1, 2, 3 # names for the link fields
if maxsize == 0:
def wrapper(*args, **kwds):
# no caching, just do a statistics update after a successful call
result = user_function(*args, **kwds)
stats[MISSES] += 1
return result
elif maxsize is None:
def wrapper(*args, **kwds):
# simple caching without ordering or size limit
key = make_key(args, kwds, typed)
result = cache_get(key, root) # root used here as a unique not-found sentinel
if result is not root:
stats[HITS] += 1
return result
result = user_function(*args, **kwds)
cache[key] = result
stats[MISSES] += 1
return result
else:
def wrapper(*args, **kwds):
# size limited caching that tracks accesses by recency
try:
key = make_key(args, kwds, typed) if kwds or typed else args
except TypeError:
stats[MISSES] += 1
return user_function(*args, **kwds)
with lock:
link = cache_get(key)
if link is not None:
# record recent use of the key by moving it to the front of the list
root, = nonlocal_root
link_prev, link_next, key, result = link
link_prev[NEXT] = link_next
link_next[PREV] = link_prev
last = root[PREV]
last[NEXT] = root[PREV] = link
link[PREV] = last
link[NEXT] = root
stats[HITS] += 1
return result
result = user_function(*args, **kwds)
with lock:
root, = nonlocal_root
if key in cache:
# getting here means that this same key was added to the
# cache while the lock was released. since the link
# update is already done, we need only return the
# computed result and update the count of misses.
pass
elif _len(cache) >= maxsize:
# use the old root to store the new key and result
oldroot = root
oldroot[KEY] = key
oldroot[RESULT] = result
# empty the oldest link and make it the new root
root = nonlocal_root[0] = oldroot[NEXT]
oldkey = root[KEY]
root[KEY] = root[RESULT] = None
# now update the cache dictionary for the new links
del cache[oldkey]
cache[key] = oldroot
else:
# put result in a new link at the front of the list
last = root[PREV]
link = [last, root, key, result]
last[NEXT] = root[PREV] = cache[key] = link
stats[MISSES] += 1
return result
def cache_info():
"""Report cache statistics"""
with lock:
return _CacheInfo(stats[HITS], stats[MISSES], maxsize, len(cache))
def cache_clear():
"""Clear the cache and cache statistics"""
with lock:
cache.clear()
root = nonlocal_root[0]
root[:] = [root, root, None, None]
stats[:] = [0, 0]
wrapper.__wrapped__ = user_function
wrapper.cache_info = cache_info
wrapper.cache_clear = cache_clear
return update_wrapper(wrapper, user_function)
return decorating_function
### End of backported lru_cache
from time import perf_counter as clock
|
ea97439d2acba389127ea51a86e1bfe08f4e64985fa29cfc4de67184fa7e7b05 | """sympify -- convert objects SymPy internal format"""
from __future__ import print_function, division
from typing import Dict, Type, Callable, Any
from inspect import getmro
from .compatibility import iterable
from .parameters import global_parameters
class SympifyError(ValueError):
def __init__(self, expr, base_exc=None):
self.expr = expr
self.base_exc = base_exc
def __str__(self):
if self.base_exc is None:
return "SympifyError: %r" % (self.expr,)
return ("Sympify of expression '%s' failed, because of exception being "
"raised:\n%s: %s" % (self.expr, self.base_exc.__class__.__name__,
str(self.base_exc)))
# See sympify docstring.
converter = {} # type: Dict[Type[Any], Callable[[Any], Basic]]
class CantSympify(object):
"""
Mix in this trait to a class to disallow sympification of its instances.
Examples
========
>>> from sympy.core.sympify import sympify, CantSympify
>>> class Something(dict):
... pass
...
>>> sympify(Something())
{}
>>> class Something(dict, CantSympify):
... pass
...
>>> sympify(Something())
Traceback (most recent call last):
...
SympifyError: SympifyError: {}
"""
pass
def _convert_numpy_types(a, **sympify_args):
"""
Converts a numpy datatype input to an appropriate SymPy type.
"""
import numpy as np
if not isinstance(a, np.floating):
if np.iscomplex(a):
return converter[complex](a.item())
else:
return sympify(a.item(), **sympify_args)
else:
try:
from sympy.core.numbers import Float
prec = np.finfo(a).nmant + 1
# E.g. double precision means prec=53 but nmant=52
# Leading bit of mantissa is always 1, so is not stored
a = str(list(np.reshape(np.asarray(a),
(1, np.size(a)))[0]))[1:-1]
return Float(a, precision=prec)
except NotImplementedError:
raise SympifyError('Translation for numpy float : %s '
'is not implemented' % a)
def sympify(a, locals=None, convert_xor=True, strict=False, rational=False,
evaluate=None):
"""Converts an arbitrary expression to a type that can be used inside SymPy.
For example, it will convert Python ints into instances of sympy.Integer,
floats into instances of sympy.Float, etc. It is also able to coerce symbolic
expressions which inherit from Basic. This can be useful in cooperation
with SAGE.
It currently accepts as arguments:
- any object defined in SymPy
- standard numeric python types: int, long, float, Decimal
- strings (like "0.09" or "2e-19")
- booleans, including ``None`` (will leave ``None`` unchanged)
- dict, lists, sets or tuples containing any of the above
.. warning::
Note that this function uses ``eval``, and thus shouldn't be used on
unsanitized input.
If the argument is already a type that SymPy understands, it will do
nothing but return that value. This can be used at the beginning of a
function to ensure you are working with the correct type.
>>> from sympy import sympify
>>> sympify(2).is_integer
True
>>> sympify(2).is_real
True
>>> sympify(2.0).is_real
True
>>> sympify("2.0").is_real
True
>>> sympify("2e-45").is_real
True
If the expression could not be converted, a SympifyError is raised.
>>> sympify("x***2")
Traceback (most recent call last):
...
SympifyError: SympifyError: "could not parse u'x***2'"
Locals
------
The sympification happens with access to everything that is loaded
by ``from sympy import *``; anything used in a string that is not
defined by that import will be converted to a symbol. In the following,
the ``bitcount`` function is treated as a symbol and the ``O`` is
interpreted as the Order object (used with series) and it raises
an error when used improperly:
>>> s = 'bitcount(42)'
>>> sympify(s)
bitcount(42)
>>> sympify("O(x)")
O(x)
>>> sympify("O + 1")
Traceback (most recent call last):
...
TypeError: unbound method...
In order to have ``bitcount`` be recognized it can be imported into a
namespace dictionary and passed as locals:
>>> from sympy.core.compatibility import exec_
>>> ns = {}
>>> exec_('from sympy.core.evalf import bitcount', ns)
>>> sympify(s, locals=ns)
6
In order to have the ``O`` interpreted as a Symbol, identify it as such
in the namespace dictionary. This can be done in a variety of ways; all
three of the following are possibilities:
>>> from sympy import Symbol
>>> ns["O"] = Symbol("O") # method 1
>>> exec_('from sympy.abc import O', ns) # method 2
>>> ns.update(dict(O=Symbol("O"))) # method 3
>>> sympify("O + 1", locals=ns)
O + 1
If you want *all* single-letter and Greek-letter variables to be symbols
then you can use the clashing-symbols dictionaries that have been defined
there as private variables: _clash1 (single-letter variables), _clash2
(the multi-letter Greek names) or _clash (both single and multi-letter
names that are defined in abc).
>>> from sympy.abc import _clash1
>>> _clash1
{'C': C, 'E': E, 'I': I, 'N': N, 'O': O, 'Q': Q, 'S': S}
>>> sympify('I & Q', _clash1)
I & Q
Strict
------
If the option ``strict`` is set to ``True``, only the types for which an
explicit conversion has been defined are converted. In the other
cases, a SympifyError is raised.
>>> print(sympify(None))
None
>>> sympify(None, strict=True)
Traceback (most recent call last):
...
SympifyError: SympifyError: None
Evaluation
----------
If the option ``evaluate`` is set to ``False``, then arithmetic and
operators will be converted into their SymPy equivalents and the
``evaluate=False`` option will be added. Nested ``Add`` or ``Mul`` will
be denested first. This is done via an AST transformation that replaces
operators with their SymPy equivalents, so if an operand redefines any
of those operations, the redefined operators will not be used.
>>> sympify('2**2 / 3 + 5')
19/3
>>> sympify('2**2 / 3 + 5', evaluate=False)
2**2/3 + 5
Extending
---------
To extend ``sympify`` to convert custom objects (not derived from ``Basic``),
just define a ``_sympy_`` method to your class. You can do that even to
classes that you do not own by subclassing or adding the method at runtime.
>>> from sympy import Matrix
>>> class MyList1(object):
... def __iter__(self):
... yield 1
... yield 2
... return
... def __getitem__(self, i): return list(self)[i]
... def _sympy_(self): return Matrix(self)
>>> sympify(MyList1())
Matrix([
[1],
[2]])
If you do not have control over the class definition you could also use the
``converter`` global dictionary. The key is the class and the value is a
function that takes a single argument and returns the desired SymPy
object, e.g. ``converter[MyList] = lambda x: Matrix(x)``.
>>> class MyList2(object): # XXX Do not do this if you control the class!
... def __iter__(self): # Use _sympy_!
... yield 1
... yield 2
... return
... def __getitem__(self, i): return list(self)[i]
>>> from sympy.core.sympify import converter
>>> converter[MyList2] = lambda x: Matrix(x)
>>> sympify(MyList2())
Matrix([
[1],
[2]])
Notes
=====
The keywords ``rational`` and ``convert_xor`` are only used
when the input is a string.
Sometimes autosimplification during sympification results in expressions
that are very different in structure than what was entered. Until such
autosimplification is no longer done, the ``kernS`` function might be of
some use. In the example below you can see how an expression reduces to
-1 by autosimplification, but does not do so when ``kernS`` is used.
>>> from sympy.core.sympify import kernS
>>> from sympy.abc import x
>>> -2*(-(-x + 1/x)/(x*(x - 1/x)**2) - 1/(x*(x - 1/x))) - 1
-1
>>> s = '-2*(-(-x + 1/x)/(x*(x - 1/x)**2) - 1/(x*(x - 1/x))) - 1'
>>> sympify(s)
-1
>>> kernS(s)
-2*(-(-x + 1/x)/(x*(x - 1/x)**2) - 1/(x*(x - 1/x))) - 1
"""
is_sympy = getattr(a, '__sympy__', None)
if is_sympy is not None:
return a
if isinstance(a, CantSympify):
raise SympifyError(a)
cls = getattr(a, "__class__", None)
if cls is None:
cls = type(a) # Probably an old-style class
conv = converter.get(cls, None)
if conv is not None:
return conv(a)
for superclass in getmro(cls):
try:
return converter[superclass](a)
except KeyError:
continue
if cls is type(None):
if strict:
raise SympifyError(a)
else:
return a
if evaluate is None:
evaluate = global_parameters.evaluate
# Support for basic numpy datatypes
# Note that this check exists to avoid importing NumPy when not necessary
if type(a).__module__ == 'numpy':
import numpy as np
if np.isscalar(a):
return _convert_numpy_types(a, locals=locals,
convert_xor=convert_xor, strict=strict, rational=rational,
evaluate=evaluate)
_sympy_ = getattr(a, "_sympy_", None)
if _sympy_ is not None:
try:
return a._sympy_()
# XXX: Catches AttributeError: 'SympyConverter' object has no
# attribute 'tuple'
# This is probably a bug somewhere but for now we catch it here.
except AttributeError:
pass
if not strict:
# Put numpy array conversion _before_ float/int, see
# <https://github.com/sympy/sympy/issues/13924>.
flat = getattr(a, "flat", None)
if flat is not None:
shape = getattr(a, "shape", None)
if shape is not None:
from ..tensor.array import Array
return Array(a.flat, a.shape) # works with e.g. NumPy arrays
if not isinstance(a, str):
for coerce in (float, int):
try:
coerced = coerce(a)
except (TypeError, ValueError):
continue
try:
return sympify(coerced)
except SympifyError:
continue
if strict:
raise SympifyError(a)
if iterable(a):
try:
return type(a)([sympify(x, locals=locals, convert_xor=convert_xor,
rational=rational) for x in a])
except TypeError:
# Not all iterables are rebuildable with their type.
pass
if isinstance(a, dict):
try:
return type(a)([sympify(x, locals=locals, convert_xor=convert_xor,
rational=rational) for x in a.items()])
except TypeError:
# Not all iterables are rebuildable with their type.
pass
# At this point we were given an arbitrary expression
# which does not inherit from Basic and doesn't implement
# _sympy_ (which is a canonical and robust way to convert
# anything to SymPy expression).
#
# As a last chance, we try to take "a"'s normal form via unicode()
# and try to parse it. If it fails, then we have no luck and
# return an exception
try:
from .compatibility import unicode
a = unicode(a)
except Exception as exc:
raise SympifyError(a, exc)
from sympy.parsing.sympy_parser import (parse_expr, TokenError,
standard_transformations)
from sympy.parsing.sympy_parser import convert_xor as t_convert_xor
from sympy.parsing.sympy_parser import rationalize as t_rationalize
transformations = standard_transformations
if rational:
transformations += (t_rationalize,)
if convert_xor:
transformations += (t_convert_xor,)
try:
a = a.replace('\n', '')
expr = parse_expr(a, local_dict=locals, transformations=transformations, evaluate=evaluate)
except (TokenError, SyntaxError) as exc:
raise SympifyError('could not parse %r' % a, exc)
return expr
def _sympify(a):
"""
Short version of sympify for internal usage for __add__ and __eq__ methods
where it is ok to allow some things (like Python integers and floats) in
the expression. This excludes things (like strings) that are unwise to
allow into such an expression.
>>> from sympy import Integer
>>> Integer(1) == 1
True
>>> Integer(1) == '1'
False
>>> from sympy.abc import x
>>> x + 1
x + 1
>>> x + '1'
Traceback (most recent call last):
...
TypeError: unsupported operand type(s) for +: 'Symbol' and 'str'
see: sympify
"""
return sympify(a, strict=True)
def kernS(s):
"""Use a hack to try keep autosimplification from distributing a
a number into an Add; this modification doesn't
prevent the 2-arg Mul from becoming an Add, however.
Examples
========
>>> from sympy.core.sympify import kernS
>>> from sympy.abc import x, y, z
The 2-arg Mul distributes a number (or minus sign) across the terms
of an expression, but kernS will prevent that:
>>> 2*(x + y), -(x + 1)
(2*x + 2*y, -x - 1)
>>> kernS('2*(x + y)')
2*(x + y)
>>> kernS('-(x + 1)')
-(x + 1)
If use of the hack fails, the un-hacked string will be passed to sympify...
and you get what you get.
XXX This hack should not be necessary once issue 4596 has been resolved.
"""
import string
from random import choice
from sympy.core.symbol import Symbol
hit = False
quoted = '"' in s or "'" in s
if '(' in s and not quoted:
if s.count('(') != s.count(")"):
raise SympifyError('unmatched left parenthesis')
# strip all space from s
s = ''.join(s.split())
olds = s
# now use space to represent a symbol that
# will
# step 1. turn potential 2-arg Muls into 3-arg versions
# 1a. *( -> * *(
s = s.replace('*(', '* *(')
# 1b. close up exponentials
s = s.replace('** *', '**')
# 2. handle the implied multiplication of a negated
# parenthesized expression in two steps
# 2a: -(...) --> -( *(...)
target = '-( *('
s = s.replace('-(', target)
# 2b: double the matching closing parenthesis
# -( *(...) --> -( *(...))
i = nest = 0
assert target.endswith('(') # assumption below
while True:
j = s.find(target, i)
if j == -1:
break
j += len(target) - 1
for j in range(j, len(s)):
if s[j] == "(":
nest += 1
elif s[j] == ")":
nest -= 1
if nest == 0:
break
s = s[:j] + ")" + s[j:]
i = j + 2 # the first char after 2nd )
if ' ' in s:
# get a unique kern
kern = '_'
while kern in s:
kern += choice(string.ascii_letters + string.digits)
s = s.replace(' ', kern)
hit = kern in s
for i in range(2):
try:
expr = sympify(s)
break
except TypeError: # the kern might cause unknown errors...
if hit:
s = olds # maybe it didn't like the kern; use un-kerned s
hit = False
continue
expr = sympify(s) # let original error raise
if not hit:
return expr
rep = {Symbol(kern): 1}
def _clear(expr):
if isinstance(expr, (list, tuple, set)):
return type(expr)([_clear(e) for e in expr])
if hasattr(expr, 'subs'):
return expr.subs(rep, hack2=True)
return expr
expr = _clear(expr)
# hope that kern is not there anymore
return expr
# Avoid circular import
from .basic import Basic
|
1a7925b55e2c8059cc3828916549705a6a3bb398aa7be6ebb9520b9e441c8cb6 | from __future__ import print_function, division
from sympy import Expr, Add, Mul, Pow, sympify, Matrix, Tuple
from sympy.utilities import default_sort_key
def _is_scalar(e):
""" Helper method used in Tr"""
# sympify to set proper attributes
e = sympify(e)
if isinstance(e, Expr):
if (e.is_Integer or e.is_Float or
e.is_Rational or e.is_Number or
(e.is_Symbol and e.is_commutative)
):
return True
return False
def _cycle_permute(l):
""" Cyclic permutations based on canonical ordering
This method does the sort based ascii values while
a better approach would be to used lexicographic sort.
TODO: Handle condition such as symbols have subscripts/superscripts
in case of lexicographic sort
"""
if len(l) == 1:
return l
min_item = min(l, key=default_sort_key)
indices = [i for i, x in enumerate(l) if x == min_item]
le = list(l)
le.extend(l) # duplicate and extend string for easy processing
# adding the first min_item index back for easier looping
indices.append(len(l) + indices[0])
# create sublist of items with first item as min_item and last_item
# in each of the sublist is item just before the next occurrence of
# minitem in the cycle formed.
sublist = [[le[indices[i]:indices[i + 1]]] for i in
range(len(indices) - 1)]
# we do comparison of strings by comparing elements
# in each sublist
idx = sublist.index(min(sublist))
ordered_l = le[indices[idx]:indices[idx] + len(l)]
return ordered_l
def _rearrange_args(l):
""" this just moves the last arg to first position
to enable expansion of args
A,B,A ==> A**2,B
"""
if len(l) == 1:
return l
x = list(l[-1:])
x.extend(l[0:-1])
return Mul(*x).args
class Tr(Expr):
""" Generic Trace operation than can trace over:
a) sympy matrix
b) operators
c) outer products
Parameters
==========
o : operator, matrix, expr
i : tuple/list indices (optional)
Examples
========
# TODO: Need to handle printing
a) Trace(A+B) = Tr(A) + Tr(B)
b) Trace(scalar*Operator) = scalar*Trace(Operator)
>>> from sympy.core.trace import Tr
>>> from sympy import symbols, Matrix
>>> a, b = symbols('a b', commutative=True)
>>> A, B = symbols('A B', commutative=False)
>>> Tr(a*A,[2])
a*Tr(A)
>>> m = Matrix([[1,2],[1,1]])
>>> Tr(m)
2
"""
def __new__(cls, *args):
""" Construct a Trace object.
Parameters
==========
args = sympy expression
indices = tuple/list if indices, optional
"""
# expect no indices,int or a tuple/list/Tuple
if (len(args) == 2):
if not isinstance(args[1], (list, Tuple, tuple)):
indices = Tuple(args[1])
else:
indices = Tuple(*args[1])
expr = args[0]
elif (len(args) == 1):
indices = Tuple()
expr = args[0]
else:
raise ValueError("Arguments to Tr should be of form "
"(expr[, [indices]])")
if isinstance(expr, Matrix):
return expr.trace()
elif hasattr(expr, 'trace') and callable(expr.trace):
#for any objects that have trace() defined e.g numpy
return expr.trace()
elif isinstance(expr, Add):
return Add(*[Tr(arg, indices) for arg in expr.args])
elif isinstance(expr, Mul):
c_part, nc_part = expr.args_cnc()
if len(nc_part) == 0:
return Mul(*c_part)
else:
obj = Expr.__new__(cls, Mul(*nc_part), indices )
#this check is needed to prevent cached instances
#being returned even if len(c_part)==0
return Mul(*c_part)*obj if len(c_part) > 0 else obj
elif isinstance(expr, Pow):
if (_is_scalar(expr.args[0]) and
_is_scalar(expr.args[1])):
return expr
else:
return Expr.__new__(cls, expr, indices)
else:
if (_is_scalar(expr)):
return expr
return Expr.__new__(cls, expr, indices)
def doit(self, **kwargs):
""" Perform the trace operation.
#TODO: Current version ignores the indices set for partial trace.
>>> from sympy.core.trace import Tr
>>> from sympy.physics.quantum.operator import OuterProduct
>>> from sympy.physics.quantum.spin import JzKet, JzBra
>>> t = Tr(OuterProduct(JzKet(1,1), JzBra(1,1)))
>>> t.doit()
1
"""
if hasattr(self.args[0], '_eval_trace'):
return self.args[0]._eval_trace(indices=self.args[1])
return self
@property
def is_number(self):
# TODO : improve this implementation
return True
#TODO: Review if the permute method is needed
# and if it needs to return a new instance
def permute(self, pos):
""" Permute the arguments cyclically.
Parameters
==========
pos : integer, if positive, shift-right, else shift-left
Examples
========
>>> from sympy.core.trace import Tr
>>> from sympy import symbols
>>> A, B, C, D = symbols('A B C D', commutative=False)
>>> t = Tr(A*B*C*D)
>>> t.permute(2)
Tr(C*D*A*B)
>>> t.permute(-2)
Tr(C*D*A*B)
"""
if pos > 0:
pos = pos % len(self.args[0].args)
else:
pos = -(abs(pos) % len(self.args[0].args))
args = list(self.args[0].args[-pos:] + self.args[0].args[0:-pos])
return Tr(Mul(*(args)))
def _hashable_content(self):
if isinstance(self.args[0], Mul):
args = _cycle_permute(_rearrange_args(self.args[0].args))
else:
args = [self.args[0]]
return tuple(args) + (self.args[1], )
|
4adb55e1e2a94b6e23e0645ec2dacf5b4a4c422869906ff01937bfcf1b8e56da | """
Adaptive numerical evaluation of SymPy expressions, using mpmath
for mathematical functions.
"""
from __future__ import print_function, division
from typing import Tuple
import math
import mpmath.libmp as libmp
from mpmath import (
make_mpc, make_mpf, mp, mpc, mpf, nsum, quadts, quadosc, workprec)
from mpmath import inf as mpmath_inf
from mpmath.libmp import (from_int, from_man_exp, from_rational, fhalf,
fnan, fnone, fone, fzero, mpf_abs, mpf_add,
mpf_atan, mpf_atan2, mpf_cmp, mpf_cos, mpf_e, mpf_exp, mpf_log, mpf_lt,
mpf_mul, mpf_neg, mpf_pi, mpf_pow, mpf_pow_int, mpf_shift, mpf_sin,
mpf_sqrt, normalize, round_nearest, to_int, to_str)
from mpmath.libmp import bitcount as mpmath_bitcount
from mpmath.libmp.backend import MPZ
from mpmath.libmp.libmpc import _infs_nan
from mpmath.libmp.libmpf import dps_to_prec, prec_to_dps
from mpmath.libmp.gammazeta import mpf_bernoulli
from .compatibility import SYMPY_INTS
from .sympify import sympify
from .singleton import S
from sympy.utilities.iterables import is_sequence
LG10 = math.log(10, 2)
rnd = round_nearest
def bitcount(n):
"""Return smallest integer, b, such that |n|/2**b < 1.
"""
return mpmath_bitcount(abs(int(n)))
# Used in a few places as placeholder values to denote exponents and
# precision levels, e.g. of exact numbers. Must be careful to avoid
# passing these to mpmath functions or returning them in final results.
INF = float(mpmath_inf)
MINUS_INF = float(-mpmath_inf)
# ~= 100 digits. Real men set this to INF.
DEFAULT_MAXPREC = 333
class PrecisionExhausted(ArithmeticError):
pass
#----------------------------------------------------------------------------#
# #
# Helper functions for arithmetic and complex parts #
# #
#----------------------------------------------------------------------------#
"""
An mpf value tuple is a tuple of integers (sign, man, exp, bc)
representing a floating-point number: [1, -1][sign]*man*2**exp where
sign is 0 or 1 and bc should correspond to the number of bits used to
represent the mantissa (man) in binary notation, e.g.
>>> from sympy.core.evalf import bitcount
>>> sign, man, exp, bc = 0, 5, 1, 3
>>> n = [1, -1][sign]*man*2**exp
>>> n, bitcount(man)
(10, 3)
A temporary result is a tuple (re, im, re_acc, im_acc) where
re and im are nonzero mpf value tuples representing approximate
numbers, or None to denote exact zeros.
re_acc, im_acc are integers denoting log2(e) where e is the estimated
relative accuracy of the respective complex part, but may be anything
if the corresponding complex part is None.
"""
def fastlog(x):
"""Fast approximation of log2(x) for an mpf value tuple x.
Notes: Calculated as exponent + width of mantissa. This is an
approximation for two reasons: 1) it gives the ceil(log2(abs(x)))
value and 2) it is too high by 1 in the case that x is an exact
power of 2. Although this is easy to remedy by testing to see if
the odd mpf mantissa is 1 (indicating that one was dealing with
an exact power of 2) that would decrease the speed and is not
necessary as this is only being used as an approximation for the
number of bits in x. The correct return value could be written as
"x[2] + (x[3] if x[1] != 1 else 0)".
Since mpf tuples always have an odd mantissa, no check is done
to see if the mantissa is a multiple of 2 (in which case the
result would be too large by 1).
Examples
========
>>> from sympy import log
>>> from sympy.core.evalf import fastlog, bitcount
>>> s, m, e = 0, 5, 1
>>> bc = bitcount(m)
>>> n = [1, -1][s]*m*2**e
>>> n, (log(n)/log(2)).evalf(2), fastlog((s, m, e, bc))
(10, 3.3, 4)
"""
if not x or x == fzero:
return MINUS_INF
return x[2] + x[3]
def pure_complex(v, or_real=False):
"""Return a and b if v matches a + I*b where b is not zero and
a and b are Numbers, else None. If `or_real` is True then 0 will
be returned for `b` if `v` is a real number.
>>> from sympy.core.evalf import pure_complex
>>> from sympy import sqrt, I, S
>>> a, b, surd = S(2), S(3), sqrt(2)
>>> pure_complex(a)
>>> pure_complex(a, or_real=True)
(2, 0)
>>> pure_complex(surd)
>>> pure_complex(a + b*I)
(2, 3)
>>> pure_complex(I)
(0, 1)
"""
h, t = v.as_coeff_Add()
if not t:
if or_real:
return h, t
return
c, i = t.as_coeff_Mul()
if i is S.ImaginaryUnit:
return h, c
def scaled_zero(mag, sign=1):
"""Return an mpf representing a power of two with magnitude ``mag``
and -1 for precision. Or, if ``mag`` is a scaled_zero tuple, then just
remove the sign from within the list that it was initially wrapped
in.
Examples
========
>>> from sympy.core.evalf import scaled_zero
>>> from sympy import Float
>>> z, p = scaled_zero(100)
>>> z, p
(([0], 1, 100, 1), -1)
>>> ok = scaled_zero(z)
>>> ok
(0, 1, 100, 1)
>>> Float(ok)
1.26765060022823e+30
>>> Float(ok, p)
0.e+30
>>> ok, p = scaled_zero(100, -1)
>>> Float(scaled_zero(ok), p)
-0.e+30
"""
if type(mag) is tuple and len(mag) == 4 and iszero(mag, scaled=True):
return (mag[0][0],) + mag[1:]
elif isinstance(mag, SYMPY_INTS):
if sign not in [-1, 1]:
raise ValueError('sign must be +/-1')
rv, p = mpf_shift(fone, mag), -1
s = 0 if sign == 1 else 1
rv = ([s],) + rv[1:]
return rv, p
else:
raise ValueError('scaled zero expects int or scaled_zero tuple.')
def iszero(mpf, scaled=False):
if not scaled:
return not mpf or not mpf[1] and not mpf[-1]
return mpf and type(mpf[0]) is list and mpf[1] == mpf[-1] == 1
def complex_accuracy(result):
"""
Returns relative accuracy of a complex number with given accuracies
for the real and imaginary parts. The relative accuracy is defined
in the complex norm sense as ||z|+|error|| / |z| where error
is equal to (real absolute error) + (imag absolute error)*i.
The full expression for the (logarithmic) error can be approximated
easily by using the max norm to approximate the complex norm.
In the worst case (re and im equal), this is wrong by a factor
sqrt(2), or by log2(sqrt(2)) = 0.5 bit.
"""
re, im, re_acc, im_acc = result
if not im:
if not re:
return INF
return re_acc
if not re:
return im_acc
re_size = fastlog(re)
im_size = fastlog(im)
absolute_error = max(re_size - re_acc, im_size - im_acc)
relative_error = absolute_error - max(re_size, im_size)
return -relative_error
def get_abs(expr, prec, options):
re, im, re_acc, im_acc = evalf(expr, prec + 2, options)
if not re:
re, re_acc, im, im_acc = im, im_acc, re, re_acc
if im:
if expr.is_number:
abs_expr, _, acc, _ = evalf(abs(N(expr, prec + 2)),
prec + 2, options)
return abs_expr, None, acc, None
else:
if 'subs' in options:
return libmp.mpc_abs((re, im), prec), None, re_acc, None
return abs(expr), None, prec, None
elif re:
return mpf_abs(re), None, re_acc, None
else:
return None, None, None, None
def get_complex_part(expr, no, prec, options):
"""no = 0 for real part, no = 1 for imaginary part"""
workprec = prec
i = 0
while 1:
res = evalf(expr, workprec, options)
value, accuracy = res[no::2]
# XXX is the last one correct? Consider re((1+I)**2).n()
if (not value) or accuracy >= prec or -value[2] > prec:
return value, None, accuracy, None
workprec += max(30, 2**i)
i += 1
def evalf_abs(expr, prec, options):
return get_abs(expr.args[0], prec, options)
def evalf_re(expr, prec, options):
return get_complex_part(expr.args[0], 0, prec, options)
def evalf_im(expr, prec, options):
return get_complex_part(expr.args[0], 1, prec, options)
def finalize_complex(re, im, prec):
if re == fzero and im == fzero:
raise ValueError("got complex zero with unknown accuracy")
elif re == fzero:
return None, im, None, prec
elif im == fzero:
return re, None, prec, None
size_re = fastlog(re)
size_im = fastlog(im)
if size_re > size_im:
re_acc = prec
im_acc = prec + min(-(size_re - size_im), 0)
else:
im_acc = prec
re_acc = prec + min(-(size_im - size_re), 0)
return re, im, re_acc, im_acc
def chop_parts(value, prec):
"""
Chop off tiny real or complex parts.
"""
re, im, re_acc, im_acc = value
# Method 1: chop based on absolute value
if re and re not in _infs_nan and (fastlog(re) < -prec + 4):
re, re_acc = None, None
if im and im not in _infs_nan and (fastlog(im) < -prec + 4):
im, im_acc = None, None
# Method 2: chop if inaccurate and relatively small
if re and im:
delta = fastlog(re) - fastlog(im)
if re_acc < 2 and (delta - re_acc <= -prec + 4):
re, re_acc = None, None
if im_acc < 2 and (delta - im_acc >= prec - 4):
im, im_acc = None, None
return re, im, re_acc, im_acc
def check_target(expr, result, prec):
a = complex_accuracy(result)
if a < prec:
raise PrecisionExhausted("Failed to distinguish the expression: \n\n%s\n\n"
"from zero. Try simplifying the input, using chop=True, or providing "
"a higher maxn for evalf" % (expr))
def get_integer_part(expr, no, options, return_ints=False):
"""
With no = 1, computes ceiling(expr)
With no = -1, computes floor(expr)
Note: this function either gives the exact result or signals failure.
"""
from sympy.functions.elementary.complexes import re, im
# The expression is likely less than 2^30 or so
assumed_size = 30
ire, iim, ire_acc, iim_acc = evalf(expr, assumed_size, options)
# We now know the size, so we can calculate how much extra precision
# (if any) is needed to get within the nearest integer
if ire and iim:
gap = max(fastlog(ire) - ire_acc, fastlog(iim) - iim_acc)
elif ire:
gap = fastlog(ire) - ire_acc
elif iim:
gap = fastlog(iim) - iim_acc
else:
# ... or maybe the expression was exactly zero
if return_ints:
return 0, 0
else:
return None, None, None, None
margin = 10
if gap >= -margin:
prec = margin + assumed_size + gap
ire, iim, ire_acc, iim_acc = evalf(
expr, prec, options)
else:
prec = assumed_size
# We can now easily find the nearest integer, but to find floor/ceil, we
# must also calculate whether the difference to the nearest integer is
# positive or negative (which may fail if very close).
def calc_part(re_im, nexpr):
from sympy.core.add import Add
n, c, p, b = nexpr
is_int = (p == 0)
nint = int(to_int(nexpr, rnd))
if is_int:
# make sure that we had enough precision to distinguish
# between nint and the re or im part (re_im) of expr that
# was passed to calc_part
ire, iim, ire_acc, iim_acc = evalf(
re_im - nint, 10, options) # don't need much precision
assert not iim
size = -fastlog(ire) + 2 # -ve b/c ire is less than 1
if size > prec:
ire, iim, ire_acc, iim_acc = evalf(
re_im, size, options)
assert not iim
nexpr = ire
n, c, p, b = nexpr
is_int = (p == 0)
nint = int(to_int(nexpr, rnd))
if not is_int:
# if there are subs and they all contain integer re/im parts
# then we can (hopefully) safely substitute them into the
# expression
s = options.get('subs', False)
if s:
doit = True
from sympy.core.compatibility import as_int
# use strict=False with as_int because we take
# 2.0 == 2
for v in s.values():
try:
as_int(v, strict=False)
except ValueError:
try:
[as_int(i, strict=False) for i in v.as_real_imag()]
continue
except (ValueError, AttributeError):
doit = False
break
if doit:
re_im = re_im.subs(s)
re_im = Add(re_im, -nint, evaluate=False)
x, _, x_acc, _ = evalf(re_im, 10, options)
try:
check_target(re_im, (x, None, x_acc, None), 3)
except PrecisionExhausted:
if not re_im.equals(0):
raise PrecisionExhausted
x = fzero
nint += int(no*(mpf_cmp(x or fzero, fzero) == no))
nint = from_int(nint)
return nint, INF
re_, im_, re_acc, im_acc = None, None, None, None
if ire:
re_, re_acc = calc_part(re(expr, evaluate=False), ire)
if iim:
im_, im_acc = calc_part(im(expr, evaluate=False), iim)
if return_ints:
return int(to_int(re_ or fzero)), int(to_int(im_ or fzero))
return re_, im_, re_acc, im_acc
def evalf_ceiling(expr, prec, options):
return get_integer_part(expr.args[0], 1, options)
def evalf_floor(expr, prec, options):
return get_integer_part(expr.args[0], -1, options)
#----------------------------------------------------------------------------#
# #
# Arithmetic operations #
# #
#----------------------------------------------------------------------------#
def add_terms(terms, prec, target_prec):
"""
Helper for evalf_add. Adds a list of (mpfval, accuracy) terms.
Returns
-------
- None, None if there are no non-zero terms;
- terms[0] if there is only 1 term;
- scaled_zero if the sum of the terms produces a zero by cancellation
e.g. mpfs representing 1 and -1 would produce a scaled zero which need
special handling since they are not actually zero and they are purposely
malformed to ensure that they can't be used in anything but accuracy
calculations;
- a tuple that is scaled to target_prec that corresponds to the
sum of the terms.
The returned mpf tuple will be normalized to target_prec; the input
prec is used to define the working precision.
XXX explain why this is needed and why one can't just loop using mpf_add
"""
terms = [t for t in terms if not iszero(t[0])]
if not terms:
return None, None
elif len(terms) == 1:
return terms[0]
# see if any argument is NaN or oo and thus warrants a special return
special = []
from sympy.core.numbers import Float
for t in terms:
arg = Float._new(t[0], 1)
if arg is S.NaN or arg.is_infinite:
special.append(arg)
if special:
from sympy.core.add import Add
rv = evalf(Add(*special), prec + 4, {})
return rv[0], rv[2]
working_prec = 2*prec
sum_man, sum_exp, absolute_error = 0, 0, MINUS_INF
for x, accuracy in terms:
sign, man, exp, bc = x
if sign:
man = -man
absolute_error = max(absolute_error, bc + exp - accuracy)
delta = exp - sum_exp
if exp >= sum_exp:
# x much larger than existing sum?
# first: quick test
if ((delta > working_prec) and
((not sum_man) or
delta - bitcount(abs(sum_man)) > working_prec)):
sum_man = man
sum_exp = exp
else:
sum_man += (man << delta)
else:
delta = -delta
# x much smaller than existing sum?
if delta - bc > working_prec:
if not sum_man:
sum_man, sum_exp = man, exp
else:
sum_man = (sum_man << delta) + man
sum_exp = exp
if not sum_man:
return scaled_zero(absolute_error)
if sum_man < 0:
sum_sign = 1
sum_man = -sum_man
else:
sum_sign = 0
sum_bc = bitcount(sum_man)
sum_accuracy = sum_exp + sum_bc - absolute_error
r = normalize(sum_sign, sum_man, sum_exp, sum_bc, target_prec,
rnd), sum_accuracy
return r
def evalf_add(v, prec, options):
res = pure_complex(v)
if res:
h, c = res
re, _, re_acc, _ = evalf(h, prec, options)
im, _, im_acc, _ = evalf(c, prec, options)
return re, im, re_acc, im_acc
oldmaxprec = options.get('maxprec', DEFAULT_MAXPREC)
i = 0
target_prec = prec
while 1:
options['maxprec'] = min(oldmaxprec, 2*prec)
terms = [evalf(arg, prec + 10, options) for arg in v.args]
re, re_acc = add_terms(
[a[0::2] for a in terms if a[0]], prec, target_prec)
im, im_acc = add_terms(
[a[1::2] for a in terms if a[1]], prec, target_prec)
acc = complex_accuracy((re, im, re_acc, im_acc))
if acc >= target_prec:
if options.get('verbose'):
print("ADD: wanted", target_prec, "accurate bits, got", re_acc, im_acc)
break
else:
if (prec - target_prec) > options['maxprec']:
break
prec = prec + max(10 + 2**i, target_prec - acc)
i += 1
if options.get('verbose'):
print("ADD: restarting with prec", prec)
options['maxprec'] = oldmaxprec
if iszero(re, scaled=True):
re = scaled_zero(re)
if iszero(im, scaled=True):
im = scaled_zero(im)
return re, im, re_acc, im_acc
def evalf_mul(v, prec, options):
res = pure_complex(v)
if res:
# the only pure complex that is a mul is h*I
_, h = res
im, _, im_acc, _ = evalf(h, prec, options)
return None, im, None, im_acc
args = list(v.args)
# see if any argument is NaN or oo and thus warrants a special return
special = []
from sympy.core.numbers import Float
for arg in args:
arg = evalf(arg, prec, options)
if arg[0] is None:
continue
arg = Float._new(arg[0], 1)
if arg is S.NaN or arg.is_infinite:
special.append(arg)
if special:
from sympy.core.mul import Mul
special = Mul(*special)
return evalf(special, prec + 4, {})
# With guard digits, multiplication in the real case does not destroy
# accuracy. This is also true in the complex case when considering the
# total accuracy; however accuracy for the real or imaginary parts
# separately may be lower.
acc = prec
# XXX: big overestimate
working_prec = prec + len(args) + 5
# Empty product is 1
start = man, exp, bc = MPZ(1), 0, 1
# First, we multiply all pure real or pure imaginary numbers.
# direction tells us that the result should be multiplied by
# I**direction; all other numbers get put into complex_factors
# to be multiplied out after the first phase.
last = len(args)
direction = 0
args.append(S.One)
complex_factors = []
for i, arg in enumerate(args):
if i != last and pure_complex(arg):
args[-1] = (args[-1]*arg).expand()
continue
elif i == last and arg is S.One:
continue
re, im, re_acc, im_acc = evalf(arg, working_prec, options)
if re and im:
complex_factors.append((re, im, re_acc, im_acc))
continue
elif re:
(s, m, e, b), w_acc = re, re_acc
elif im:
(s, m, e, b), w_acc = im, im_acc
direction += 1
else:
return None, None, None, None
direction += 2*s
man *= m
exp += e
bc += b
if bc > 3*working_prec:
man >>= working_prec
exp += working_prec
acc = min(acc, w_acc)
sign = (direction & 2) >> 1
if not complex_factors:
v = normalize(sign, man, exp, bitcount(man), prec, rnd)
# multiply by i
if direction & 1:
return None, v, None, acc
else:
return v, None, acc, None
else:
# initialize with the first term
if (man, exp, bc) != start:
# there was a real part; give it an imaginary part
re, im = (sign, man, exp, bitcount(man)), (0, MPZ(0), 0, 0)
i0 = 0
else:
# there is no real part to start (other than the starting 1)
wre, wim, wre_acc, wim_acc = complex_factors[0]
acc = min(acc,
complex_accuracy((wre, wim, wre_acc, wim_acc)))
re = wre
im = wim
i0 = 1
for wre, wim, wre_acc, wim_acc in complex_factors[i0:]:
# acc is the overall accuracy of the product; we aren't
# computing exact accuracies of the product.
acc = min(acc,
complex_accuracy((wre, wim, wre_acc, wim_acc)))
use_prec = working_prec
A = mpf_mul(re, wre, use_prec)
B = mpf_mul(mpf_neg(im), wim, use_prec)
C = mpf_mul(re, wim, use_prec)
D = mpf_mul(im, wre, use_prec)
re = mpf_add(A, B, use_prec)
im = mpf_add(C, D, use_prec)
if options.get('verbose'):
print("MUL: wanted", prec, "accurate bits, got", acc)
# multiply by I
if direction & 1:
re, im = mpf_neg(im), re
return re, im, acc, acc
def evalf_pow(v, prec, options):
target_prec = prec
base, exp = v.args
# We handle x**n separately. This has two purposes: 1) it is much
# faster, because we avoid calling evalf on the exponent, and 2) it
# allows better handling of real/imaginary parts that are exactly zero
if exp.is_Integer:
p = exp.p
# Exact
if not p:
return fone, None, prec, None
# Exponentiation by p magnifies relative error by |p|, so the
# base must be evaluated with increased precision if p is large
prec += int(math.log(abs(p), 2))
re, im, re_acc, im_acc = evalf(base, prec + 5, options)
# Real to integer power
if re and not im:
return mpf_pow_int(re, p, target_prec), None, target_prec, None
# (x*I)**n = I**n * x**n
if im and not re:
z = mpf_pow_int(im, p, target_prec)
case = p % 4
if case == 0:
return z, None, target_prec, None
if case == 1:
return None, z, None, target_prec
if case == 2:
return mpf_neg(z), None, target_prec, None
if case == 3:
return None, mpf_neg(z), None, target_prec
# Zero raised to an integer power
if not re:
return None, None, None, None
# General complex number to arbitrary integer power
re, im = libmp.mpc_pow_int((re, im), p, prec)
# Assumes full accuracy in input
return finalize_complex(re, im, target_prec)
# Pure square root
if exp is S.Half:
xre, xim, _, _ = evalf(base, prec + 5, options)
# General complex square root
if xim:
re, im = libmp.mpc_sqrt((xre or fzero, xim), prec)
return finalize_complex(re, im, prec)
if not xre:
return None, None, None, None
# Square root of a negative real number
if mpf_lt(xre, fzero):
return None, mpf_sqrt(mpf_neg(xre), prec), None, prec
# Positive square root
return mpf_sqrt(xre, prec), None, prec, None
# We first evaluate the exponent to find its magnitude
# This determines the working precision that must be used
prec += 10
yre, yim, _, _ = evalf(exp, prec, options)
# Special cases: x**0
if not (yre or yim):
return fone, None, prec, None
ysize = fastlog(yre)
# Restart if too big
# XXX: prec + ysize might exceed maxprec
if ysize > 5:
prec += ysize
yre, yim, _, _ = evalf(exp, prec, options)
# Pure exponential function; no need to evalf the base
if base is S.Exp1:
if yim:
re, im = libmp.mpc_exp((yre or fzero, yim), prec)
return finalize_complex(re, im, target_prec)
return mpf_exp(yre, target_prec), None, target_prec, None
xre, xim, _, _ = evalf(base, prec + 5, options)
# 0**y
if not (xre or xim):
return None, None, None, None
# (real ** complex) or (complex ** complex)
if yim:
re, im = libmp.mpc_pow(
(xre or fzero, xim or fzero), (yre or fzero, yim),
target_prec)
return finalize_complex(re, im, target_prec)
# complex ** real
if xim:
re, im = libmp.mpc_pow_mpf((xre or fzero, xim), yre, target_prec)
return finalize_complex(re, im, target_prec)
# negative ** real
elif mpf_lt(xre, fzero):
re, im = libmp.mpc_pow_mpf((xre, fzero), yre, target_prec)
return finalize_complex(re, im, target_prec)
# positive ** real
else:
return mpf_pow(xre, yre, target_prec), None, target_prec, None
#----------------------------------------------------------------------------#
# #
# Special functions #
# #
#----------------------------------------------------------------------------#
def evalf_trig(v, prec, options):
"""
This function handles sin and cos of complex arguments.
TODO: should also handle tan of complex arguments.
"""
from sympy import cos, sin
if isinstance(v, cos):
func = mpf_cos
elif isinstance(v, sin):
func = mpf_sin
else:
raise NotImplementedError
arg = v.args[0]
# 20 extra bits is possibly overkill. It does make the need
# to restart very unlikely
xprec = prec + 20
re, im, re_acc, im_acc = evalf(arg, xprec, options)
if im:
if 'subs' in options:
v = v.subs(options['subs'])
return evalf(v._eval_evalf(prec), prec, options)
if not re:
if isinstance(v, cos):
return fone, None, prec, None
elif isinstance(v, sin):
return None, None, None, None
else:
raise NotImplementedError
# For trigonometric functions, we are interested in the
# fixed-point (absolute) accuracy of the argument.
xsize = fastlog(re)
# Magnitude <= 1.0. OK to compute directly, because there is no
# danger of hitting the first root of cos (with sin, magnitude
# <= 2.0 would actually be ok)
if xsize < 1:
return func(re, prec, rnd), None, prec, None
# Very large
if xsize >= 10:
xprec = prec + xsize
re, im, re_acc, im_acc = evalf(arg, xprec, options)
# Need to repeat in case the argument is very close to a
# multiple of pi (or pi/2), hitting close to a root
while 1:
y = func(re, prec, rnd)
ysize = fastlog(y)
gap = -ysize
accuracy = (xprec - xsize) - gap
if accuracy < prec:
if options.get('verbose'):
print("SIN/COS", accuracy, "wanted", prec, "gap", gap)
print(to_str(y, 10))
if xprec > options.get('maxprec', DEFAULT_MAXPREC):
return y, None, accuracy, None
xprec += gap
re, im, re_acc, im_acc = evalf(arg, xprec, options)
continue
else:
return y, None, prec, None
def evalf_log(expr, prec, options):
from sympy import Abs, Add, log
if len(expr.args)>1:
expr = expr.doit()
return evalf(expr, prec, options)
arg = expr.args[0]
workprec = prec + 10
xre, xim, xacc, _ = evalf(arg, workprec, options)
if xim:
# XXX: use get_abs etc instead
re = evalf_log(
log(Abs(arg, evaluate=False), evaluate=False), prec, options)
im = mpf_atan2(xim, xre or fzero, prec)
return re[0], im, re[2], prec
imaginary_term = (mpf_cmp(xre, fzero) < 0)
re = mpf_log(mpf_abs(xre), prec, rnd)
size = fastlog(re)
if prec - size > workprec and re != fzero:
# We actually need to compute 1+x accurately, not x
arg = Add(S.NegativeOne, arg, evaluate=False)
xre, xim, _, _ = evalf_add(arg, prec, options)
prec2 = workprec - fastlog(xre)
# xre is now x - 1 so we add 1 back here to calculate x
re = mpf_log(mpf_abs(mpf_add(xre, fone, prec2)), prec, rnd)
re_acc = prec
if imaginary_term:
return re, mpf_pi(prec), re_acc, prec
else:
return re, None, re_acc, None
def evalf_atan(v, prec, options):
arg = v.args[0]
xre, xim, reacc, imacc = evalf(arg, prec + 5, options)
if xre is xim is None:
return (None,)*4
if xim:
raise NotImplementedError
return mpf_atan(xre, prec, rnd), None, prec, None
def evalf_subs(prec, subs):
""" Change all Float entries in `subs` to have precision prec. """
newsubs = {}
for a, b in subs.items():
b = S(b)
if b.is_Float:
b = b._eval_evalf(prec)
newsubs[a] = b
return newsubs
def evalf_piecewise(expr, prec, options):
from sympy import Float, Integer
if 'subs' in options:
expr = expr.subs(evalf_subs(prec, options['subs']))
newopts = options.copy()
del newopts['subs']
if hasattr(expr, 'func'):
return evalf(expr, prec, newopts)
if type(expr) == float:
return evalf(Float(expr), prec, newopts)
if type(expr) == int:
return evalf(Integer(expr), prec, newopts)
# We still have undefined symbols
raise NotImplementedError
def evalf_bernoulli(expr, prec, options):
arg = expr.args[0]
if not arg.is_Integer:
raise ValueError("Bernoulli number index must be an integer")
n = int(arg)
b = mpf_bernoulli(n, prec, rnd)
if b == fzero:
return None, None, None, None
return b, None, prec, None
#----------------------------------------------------------------------------#
# #
# High-level operations #
# #
#----------------------------------------------------------------------------#
def as_mpmath(x, prec, options):
from sympy.core.numbers import Infinity, NegativeInfinity, Zero
x = sympify(x)
if isinstance(x, Zero) or x == 0:
return mpf(0)
if isinstance(x, Infinity):
return mpf('inf')
if isinstance(x, NegativeInfinity):
return mpf('-inf')
# XXX
re, im, _, _ = evalf(x, prec, options)
if im:
return mpc(re or fzero, im)
return mpf(re)
def do_integral(expr, prec, options):
func = expr.args[0]
x, xlow, xhigh = expr.args[1]
if xlow == xhigh:
xlow = xhigh = 0
elif x not in func.free_symbols:
# only the difference in limits matters in this case
# so if there is a symbol in common that will cancel
# out when taking the difference, then use that
# difference
if xhigh.free_symbols & xlow.free_symbols:
diff = xhigh - xlow
if diff.is_number:
xlow, xhigh = 0, diff
oldmaxprec = options.get('maxprec', DEFAULT_MAXPREC)
options['maxprec'] = min(oldmaxprec, 2*prec)
with workprec(prec + 5):
xlow = as_mpmath(xlow, prec + 15, options)
xhigh = as_mpmath(xhigh, prec + 15, options)
# Integration is like summation, and we can phone home from
# the integrand function to update accuracy summation style
# Note that this accuracy is inaccurate, since it fails
# to account for the variable quadrature weights,
# but it is better than nothing
from sympy import cos, sin, Wild
have_part = [False, False]
max_real_term = [MINUS_INF]
max_imag_term = [MINUS_INF]
def f(t):
re, im, re_acc, im_acc = evalf(func, mp.prec, {'subs': {x: t}})
have_part[0] = re or have_part[0]
have_part[1] = im or have_part[1]
max_real_term[0] = max(max_real_term[0], fastlog(re))
max_imag_term[0] = max(max_imag_term[0], fastlog(im))
if im:
return mpc(re or fzero, im)
return mpf(re or fzero)
if options.get('quad') == 'osc':
A = Wild('A', exclude=[x])
B = Wild('B', exclude=[x])
D = Wild('D')
m = func.match(cos(A*x + B)*D)
if not m:
m = func.match(sin(A*x + B)*D)
if not m:
raise ValueError("An integrand of the form sin(A*x+B)*f(x) "
"or cos(A*x+B)*f(x) is required for oscillatory quadrature")
period = as_mpmath(2*S.Pi/m[A], prec + 15, options)
result = quadosc(f, [xlow, xhigh], period=period)
# XXX: quadosc does not do error detection yet
quadrature_error = MINUS_INF
else:
result, quadrature_error = quadts(f, [xlow, xhigh], error=1)
quadrature_error = fastlog(quadrature_error._mpf_)
options['maxprec'] = oldmaxprec
if have_part[0]:
re = result.real._mpf_
if re == fzero:
re, re_acc = scaled_zero(
min(-prec, -max_real_term[0], -quadrature_error))
re = scaled_zero(re) # handled ok in evalf_integral
else:
re_acc = -max(max_real_term[0] - fastlog(re) -
prec, quadrature_error)
else:
re, re_acc = None, None
if have_part[1]:
im = result.imag._mpf_
if im == fzero:
im, im_acc = scaled_zero(
min(-prec, -max_imag_term[0], -quadrature_error))
im = scaled_zero(im) # handled ok in evalf_integral
else:
im_acc = -max(max_imag_term[0] - fastlog(im) -
prec, quadrature_error)
else:
im, im_acc = None, None
result = re, im, re_acc, im_acc
return result
def evalf_integral(expr, prec, options):
limits = expr.limits
if len(limits) != 1 or len(limits[0]) != 3:
raise NotImplementedError
workprec = prec
i = 0
maxprec = options.get('maxprec', INF)
while 1:
result = do_integral(expr, workprec, options)
accuracy = complex_accuracy(result)
if accuracy >= prec: # achieved desired precision
break
if workprec >= maxprec: # can't increase accuracy any more
break
if accuracy == -1:
# maybe the answer really is zero and maybe we just haven't increased
# the precision enough. So increase by doubling to not take too long
# to get to maxprec.
workprec *= 2
else:
workprec += max(prec, 2**i)
workprec = min(workprec, maxprec)
i += 1
return result
def check_convergence(numer, denom, n):
"""
Returns (h, g, p) where
-- h is:
> 0 for convergence of rate 1/factorial(n)**h
< 0 for divergence of rate factorial(n)**(-h)
= 0 for geometric or polynomial convergence or divergence
-- abs(g) is:
> 1 for geometric convergence of rate 1/h**n
< 1 for geometric divergence of rate h**n
= 1 for polynomial convergence or divergence
(g < 0 indicates an alternating series)
-- p is:
> 1 for polynomial convergence of rate 1/n**h
<= 1 for polynomial divergence of rate n**(-h)
"""
from sympy import Poly
npol = Poly(numer, n)
dpol = Poly(denom, n)
p = npol.degree()
q = dpol.degree()
rate = q - p
if rate:
return rate, None, None
constant = dpol.LC() / npol.LC()
if abs(constant) != 1:
return rate, constant, None
if npol.degree() == dpol.degree() == 0:
return rate, constant, 0
pc = npol.all_coeffs()[1]
qc = dpol.all_coeffs()[1]
return rate, constant, (qc - pc)/dpol.LC()
def hypsum(expr, n, start, prec):
"""
Sum a rapidly convergent infinite hypergeometric series with
given general term, e.g. e = hypsum(1/factorial(n), n). The
quotient between successive terms must be a quotient of integer
polynomials.
"""
from sympy import Float, hypersimp, lambdify
if prec == float('inf'):
raise NotImplementedError('does not support inf prec')
if start:
expr = expr.subs(n, n + start)
hs = hypersimp(expr, n)
if hs is None:
raise NotImplementedError("a hypergeometric series is required")
num, den = hs.as_numer_denom()
func1 = lambdify(n, num)
func2 = lambdify(n, den)
h, g, p = check_convergence(num, den, n)
if h < 0:
raise ValueError("Sum diverges like (n!)^%i" % (-h))
term = expr.subs(n, 0)
if not term.is_Rational:
raise NotImplementedError("Non rational term functionality is not implemented.")
# Direct summation if geometric or faster
if h > 0 or (h == 0 and abs(g) > 1):
term = (MPZ(term.p) << prec) // term.q
s = term
k = 1
while abs(term) > 5:
term *= MPZ(func1(k - 1))
term //= MPZ(func2(k - 1))
s += term
k += 1
return from_man_exp(s, -prec)
else:
alt = g < 0
if abs(g) < 1:
raise ValueError("Sum diverges like (%i)^n" % abs(1/g))
if p < 1 or (p == 1 and not alt):
raise ValueError("Sum diverges like n^%i" % (-p))
# We have polynomial convergence: use Richardson extrapolation
vold = None
ndig = prec_to_dps(prec)
while True:
# Need to use at least quad precision because a lot of cancellation
# might occur in the extrapolation process; we check the answer to
# make sure that the desired precision has been reached, too.
prec2 = 4*prec
term0 = (MPZ(term.p) << prec2) // term.q
def summand(k, _term=[term0]):
if k:
k = int(k)
_term[0] *= MPZ(func1(k - 1))
_term[0] //= MPZ(func2(k - 1))
return make_mpf(from_man_exp(_term[0], -prec2))
with workprec(prec):
v = nsum(summand, [0, mpmath_inf], method='richardson')
vf = Float(v, ndig)
if vold is not None and vold == vf:
break
prec += prec # double precision each time
vold = vf
return v._mpf_
def evalf_prod(expr, prec, options):
from sympy import Sum
if all((l[1] - l[2]).is_Integer for l in expr.limits):
re, im, re_acc, im_acc = evalf(expr.doit(), prec=prec, options=options)
else:
re, im, re_acc, im_acc = evalf(expr.rewrite(Sum), prec=prec, options=options)
return re, im, re_acc, im_acc
def evalf_sum(expr, prec, options):
from sympy import Float
if 'subs' in options:
expr = expr.subs(options['subs'])
func = expr.function
limits = expr.limits
if len(limits) != 1 or len(limits[0]) != 3:
raise NotImplementedError
if func.is_zero:
return None, None, prec, None
prec2 = prec + 10
try:
n, a, b = limits[0]
if b != S.Infinity or a != int(a):
raise NotImplementedError
# Use fast hypergeometric summation if possible
v = hypsum(func, n, int(a), prec2)
delta = prec - fastlog(v)
if fastlog(v) < -10:
v = hypsum(func, n, int(a), delta)
return v, None, min(prec, delta), None
except NotImplementedError:
# Euler-Maclaurin summation for general series
eps = Float(2.0)**(-prec)
for i in range(1, 5):
m = n = 2**i * prec
s, err = expr.euler_maclaurin(m=m, n=n, eps=eps,
eval_integral=False)
err = err.evalf()
if err <= eps:
break
err = fastlog(evalf(abs(err), 20, options)[0])
re, im, re_acc, im_acc = evalf(s, prec2, options)
if re_acc is None:
re_acc = -err
if im_acc is None:
im_acc = -err
return re, im, re_acc, im_acc
#----------------------------------------------------------------------------#
# #
# Symbolic interface #
# #
#----------------------------------------------------------------------------#
def evalf_symbol(x, prec, options):
val = options['subs'][x]
if isinstance(val, mpf):
if not val:
return None, None, None, None
return val._mpf_, None, prec, None
else:
if not '_cache' in options:
options['_cache'] = {}
cache = options['_cache']
cached, cached_prec = cache.get(x, (None, MINUS_INF))
if cached_prec >= prec:
return cached
v = evalf(sympify(val), prec, options)
cache[x] = (v, prec)
return v
evalf_table = None
def _create_evalf_table():
global evalf_table
from sympy.functions.combinatorial.numbers import bernoulli
from sympy.concrete.products import Product
from sympy.concrete.summations import Sum
from sympy.core.add import Add
from sympy.core.mul import Mul
from sympy.core.numbers import Exp1, Float, Half, ImaginaryUnit, Integer, NaN, NegativeOne, One, Pi, Rational, Zero
from sympy.core.power import Pow
from sympy.core.symbol import Dummy, Symbol
from sympy.functions.elementary.complexes import Abs, im, re
from sympy.functions.elementary.exponential import exp, log
from sympy.functions.elementary.integers import ceiling, floor
from sympy.functions.elementary.piecewise import Piecewise
from sympy.functions.elementary.trigonometric import atan, cos, sin
from sympy.integrals.integrals import Integral
evalf_table = {
Symbol: evalf_symbol,
Dummy: evalf_symbol,
Float: lambda x, prec, options: (x._mpf_, None, prec, None),
Rational: lambda x, prec, options: (from_rational(x.p, x.q, prec), None, prec, None),
Integer: lambda x, prec, options: (from_int(x.p, prec), None, prec, None),
Zero: lambda x, prec, options: (None, None, prec, None),
One: lambda x, prec, options: (fone, None, prec, None),
Half: lambda x, prec, options: (fhalf, None, prec, None),
Pi: lambda x, prec, options: (mpf_pi(prec), None, prec, None),
Exp1: lambda x, prec, options: (mpf_e(prec), None, prec, None),
ImaginaryUnit: lambda x, prec, options: (None, fone, None, prec),
NegativeOne: lambda x, prec, options: (fnone, None, prec, None),
NaN: lambda x, prec, options: (fnan, None, prec, None),
exp: lambda x, prec, options: evalf_pow(
Pow(S.Exp1, x.args[0], evaluate=False), prec, options),
cos: evalf_trig,
sin: evalf_trig,
Add: evalf_add,
Mul: evalf_mul,
Pow: evalf_pow,
log: evalf_log,
atan: evalf_atan,
Abs: evalf_abs,
re: evalf_re,
im: evalf_im,
floor: evalf_floor,
ceiling: evalf_ceiling,
Integral: evalf_integral,
Sum: evalf_sum,
Product: evalf_prod,
Piecewise: evalf_piecewise,
bernoulli: evalf_bernoulli,
}
def evalf(x, prec, options):
from sympy import re as re_, im as im_
try:
rf = evalf_table[x.func]
r = rf(x, prec, options)
except KeyError:
# Fall back to ordinary evalf if possible
if 'subs' in options:
x = x.subs(evalf_subs(prec, options['subs']))
xe = x._eval_evalf(prec)
if xe is None:
raise NotImplementedError
as_real_imag = getattr(xe, "as_real_imag", None)
if as_real_imag is None:
raise NotImplementedError # e.g. FiniteSet(-1.0, 1.0).evalf()
re, im = as_real_imag()
if re.has(re_) or im.has(im_):
raise NotImplementedError
if re == 0:
re = None
reprec = None
elif re.is_number:
re = re._to_mpmath(prec, allow_ints=False)._mpf_
reprec = prec
else:
raise NotImplementedError
if im == 0:
im = None
imprec = None
elif im.is_number:
im = im._to_mpmath(prec, allow_ints=False)._mpf_
imprec = prec
else:
raise NotImplementedError
r = re, im, reprec, imprec
if options.get("verbose"):
print("### input", x)
print("### output", to_str(r[0] or fzero, 50))
print("### raw", r) # r[0], r[2]
print()
chop = options.get('chop', False)
if chop:
if chop is True:
chop_prec = prec
else:
# convert (approximately) from given tolerance;
# the formula here will will make 1e-i rounds to 0 for
# i in the range +/-27 while 2e-i will not be chopped
chop_prec = int(round(-3.321*math.log10(chop) + 2.5))
if chop_prec == 3:
chop_prec -= 1
r = chop_parts(r, chop_prec)
if options.get("strict"):
check_target(x, r, prec)
return r
class EvalfMixin(object):
"""Mixin class adding evalf capabililty."""
__slots__ = () # type: Tuple[str, ...]
def evalf(self, n=15, subs=None, maxn=100, chop=False, strict=False, quad=None, verbose=False):
"""
Evaluate the given formula to an accuracy of n digits.
Optional keyword arguments:
subs=<dict>
Substitute numerical values for symbols, e.g.
subs={x:3, y:1+pi}. The substitutions must be given as a
dictionary.
maxn=<integer>
Allow a maximum temporary working precision of maxn digits
(default=100)
chop=<bool>
Replace tiny real or imaginary parts in subresults
by exact zeros (default=False)
strict=<bool>
Raise PrecisionExhausted if any subresult fails to evaluate
to full accuracy, given the available maxprec
(default=False)
quad=<str>
Choose algorithm for numerical quadrature. By default,
tanh-sinh quadrature is used. For oscillatory
integrals on an infinite interval, try quad='osc'.
verbose=<bool>
Print debug information (default=False)
Notes
=====
When Floats are naively substituted into an expression, precision errors
may adversely affect the result. For example, adding 1e16 (a Float) to 1
will truncate to 1e16; if 1e16 is then subtracted, the result will be 0.
That is exactly what happens in the following:
>>> from sympy.abc import x, y, z
>>> values = {x: 1e16, y: 1, z: 1e16}
>>> (x + y - z).subs(values)
0
Using the subs argument for evalf is the accurate way to evaluate such an
expression:
>>> (x + y - z).evalf(subs=values)
1.00000000000000
"""
from sympy import Float, Number
n = n if n is not None else 15
if subs and is_sequence(subs):
raise TypeError('subs must be given as a dictionary')
# for sake of sage that doesn't like evalf(1)
if n == 1 and isinstance(self, Number):
from sympy.core.expr import _mag
rv = self.evalf(2, subs, maxn, chop, strict, quad, verbose)
m = _mag(rv)
rv = rv.round(1 - m)
return rv
if not evalf_table:
_create_evalf_table()
prec = dps_to_prec(n)
options = {'maxprec': max(prec, int(maxn*LG10)), 'chop': chop,
'strict': strict, 'verbose': verbose}
if subs is not None:
options['subs'] = subs
if quad is not None:
options['quad'] = quad
try:
result = evalf(self, prec + 4, options)
except NotImplementedError:
# Fall back to the ordinary evalf
v = self._eval_evalf(prec)
if v is None:
return self
elif not v.is_number:
return v
try:
# If the result is numerical, normalize it
result = evalf(v, prec, options)
except NotImplementedError:
# Probably contains symbols or unknown functions
return v
re, im, re_acc, im_acc = result
if re:
p = max(min(prec, re_acc), 1)
re = Float._new(re, p)
else:
re = S.Zero
if im:
p = max(min(prec, im_acc), 1)
im = Float._new(im, p)
return re + im*S.ImaginaryUnit
else:
return re
n = evalf
def _evalf(self, prec):
"""Helper for evalf. Does the same thing but takes binary precision"""
r = self._eval_evalf(prec)
if r is None:
r = self
return r
def _eval_evalf(self, prec):
return
def _to_mpmath(self, prec, allow_ints=True):
# mpmath functions accept ints as input
errmsg = "cannot convert to mpmath number"
if allow_ints and self.is_Integer:
return self.p
if hasattr(self, '_as_mpf_val'):
return make_mpf(self._as_mpf_val(prec))
try:
re, im, _, _ = evalf(self, prec, {})
if im:
if not re:
re = fzero
return make_mpc((re, im))
elif re:
return make_mpf(re)
else:
return make_mpf(fzero)
except NotImplementedError:
v = self._eval_evalf(prec)
if v is None:
raise ValueError(errmsg)
if v.is_Float:
return make_mpf(v._mpf_)
# Number + Number*I is also fine
re, im = v.as_real_imag()
if allow_ints and re.is_Integer:
re = from_int(re.p)
elif re.is_Float:
re = re._mpf_
else:
raise ValueError(errmsg)
if allow_ints and im.is_Integer:
im = from_int(im.p)
elif im.is_Float:
im = im._mpf_
else:
raise ValueError(errmsg)
return make_mpc((re, im))
def N(x, n=15, **options):
r"""
Calls x.evalf(n, \*\*options).
Both .n() and N() are equivalent to .evalf(); use the one that you like better.
See also the docstring of .evalf() for information on the options.
Examples
========
>>> from sympy import Sum, oo, N
>>> from sympy.abc import k
>>> Sum(1/k**k, (k, 1, oo))
Sum(k**(-k), (k, 1, oo))
>>> N(_, 4)
1.291
"""
# by using rational=True, any evaluation of a string
# will be done using exact values for the Floats
return sympify(x, rational=True).evalf(n, **options)
|
2cb88194b3c952b64e98218b8becec3bb48581e75cdfdcc168639f796226d675 | r"""This is rule-based deduction system for SymPy
The whole thing is split into two parts
- rules compilation and preparation of tables
- runtime inference
For rule-based inference engines, the classical work is RETE algorithm [1],
[2] Although we are not implementing it in full (or even significantly)
it's still still worth a read to understand the underlying ideas.
In short, every rule in a system of rules is one of two forms:
- atom -> ... (alpha rule)
- And(atom1, atom2, ...) -> ... (beta rule)
The major complexity is in efficient beta-rules processing and usually for an
expert system a lot of effort goes into code that operates on beta-rules.
Here we take minimalistic approach to get something usable first.
- (preparation) of alpha- and beta- networks, everything except
- (runtime) FactRules.deduce_all_facts
_____________________________________
( Kirr: I've never thought that doing )
( logic stuff is that difficult... )
-------------------------------------
o ^__^
o (oo)\_______
(__)\ )\/\
||----w |
|| ||
Some references on the topic
----------------------------
[1] https://en.wikipedia.org/wiki/Rete_algorithm
[2] http://reports-archive.adm.cs.cmu.edu/anon/1995/CMU-CS-95-113.pdf
https://en.wikipedia.org/wiki/Propositional_formula
https://en.wikipedia.org/wiki/Inference_rule
https://en.wikipedia.org/wiki/List_of_rules_of_inference
"""
from __future__ import print_function, division
from collections import defaultdict
from .logic import Logic, And, Or, Not
def _base_fact(atom):
"""Return the literal fact of an atom.
Effectively, this merely strips the Not around a fact.
"""
if isinstance(atom, Not):
return atom.arg
else:
return atom
def _as_pair(atom):
if isinstance(atom, Not):
return (atom.arg, False)
else:
return (atom, True)
# XXX this prepares forward-chaining rules for alpha-network
def transitive_closure(implications):
"""
Computes the transitive closure of a list of implications
Uses Warshall's algorithm, as described at
http://www.cs.hope.edu/~cusack/Notes/Notes/DiscreteMath/Warshall.pdf.
"""
full_implications = set(implications)
literals = set().union(*map(set, full_implications))
for k in literals:
for i in literals:
if (i, k) in full_implications:
for j in literals:
if (k, j) in full_implications:
full_implications.add((i, j))
return full_implications
def deduce_alpha_implications(implications):
"""deduce all implications
Description by example
----------------------
given set of logic rules:
a -> b
b -> c
we deduce all possible rules:
a -> b, c
b -> c
implications: [] of (a,b)
return: {} of a -> set([b, c, ...])
"""
implications = implications + [(Not(j), Not(i)) for (i, j) in implications]
res = defaultdict(set)
full_implications = transitive_closure(implications)
for a, b in full_implications:
if a == b:
continue # skip a->a cyclic input
res[a].add(b)
# Clean up tautologies and check consistency
for a, impl in res.items():
impl.discard(a)
na = Not(a)
if na in impl:
raise ValueError(
'implications are inconsistent: %s -> %s %s' % (a, na, impl))
return res
def apply_beta_to_alpha_route(alpha_implications, beta_rules):
"""apply additional beta-rules (And conditions) to already-built
alpha implication tables
TODO: write about
- static extension of alpha-chains
- attaching refs to beta-nodes to alpha chains
e.g.
alpha_implications:
a -> [b, !c, d]
b -> [d]
...
beta_rules:
&(b,d) -> e
then we'll extend a's rule to the following
a -> [b, !c, d, e]
"""
x_impl = {}
for x in alpha_implications.keys():
x_impl[x] = (set(alpha_implications[x]), [])
for bcond, bimpl in beta_rules:
for bk in bcond.args:
if bk in x_impl:
continue
x_impl[bk] = (set(), [])
# static extensions to alpha rules:
# A: x -> a,b B: &(a,b) -> c ==> A: x -> a,b,c
seen_static_extension = True
while seen_static_extension:
seen_static_extension = False
for bcond, bimpl in beta_rules:
if not isinstance(bcond, And):
raise TypeError("Cond is not And")
bargs = set(bcond.args)
for x, (ximpls, bb) in x_impl.items():
x_all = ximpls | {x}
# A: ... -> a B: &(...) -> a is non-informative
if bimpl not in x_all and bargs.issubset(x_all):
ximpls.add(bimpl)
# we introduced new implication - now we have to restore
# completeness of the whole set.
bimpl_impl = x_impl.get(bimpl)
if bimpl_impl is not None:
ximpls |= bimpl_impl[0]
seen_static_extension = True
# attach beta-nodes which can be possibly triggered by an alpha-chain
for bidx, (bcond, bimpl) in enumerate(beta_rules):
bargs = set(bcond.args)
for x, (ximpls, bb) in x_impl.items():
x_all = ximpls | {x}
# A: ... -> a B: &(...) -> a (non-informative)
if bimpl in x_all:
continue
# A: x -> a... B: &(!a,...) -> ... (will never trigger)
# A: x -> a... B: &(...) -> !a (will never trigger)
if any(Not(xi) in bargs or Not(xi) == bimpl for xi in x_all):
continue
if bargs & x_all:
bb.append(bidx)
return x_impl
def rules_2prereq(rules):
"""build prerequisites table from rules
Description by example
----------------------
given set of logic rules:
a -> b, c
b -> c
we build prerequisites (from what points something can be deduced):
b <- a
c <- a, b
rules: {} of a -> [b, c, ...]
return: {} of c <- [a, b, ...]
Note however, that this prerequisites may be *not* enough to prove a
fact. An example is 'a -> b' rule, where prereq(a) is b, and prereq(b)
is a. That's because a=T -> b=T, and b=F -> a=F, but a=F -> b=?
"""
prereq = defaultdict(set)
for (a, _), impl in rules.items():
if isinstance(a, Not):
a = a.args[0]
for (i, _) in impl:
if isinstance(i, Not):
i = i.args[0]
prereq[i].add(a)
return prereq
################
# RULES PROVER #
################
class TautologyDetected(Exception):
"""(internal) Prover uses it for reporting detected tautology"""
pass
class Prover(object):
"""ai - prover of logic rules
given a set of initial rules, Prover tries to prove all possible rules
which follow from given premises.
As a result proved_rules are always either in one of two forms: alpha or
beta:
Alpha rules
-----------
This are rules of the form::
a -> b & c & d & ...
Beta rules
----------
This are rules of the form::
&(a,b,...) -> c & d & ...
i.e. beta rules are join conditions that say that something follows when
*several* facts are true at the same time.
"""
def __init__(self):
self.proved_rules = []
self._rules_seen = set()
def split_alpha_beta(self):
"""split proved rules into alpha and beta chains"""
rules_alpha = [] # a -> b
rules_beta = [] # &(...) -> b
for a, b in self.proved_rules:
if isinstance(a, And):
rules_beta.append((a, b))
else:
rules_alpha.append((a, b))
return rules_alpha, rules_beta
@property
def rules_alpha(self):
return self.split_alpha_beta()[0]
@property
def rules_beta(self):
return self.split_alpha_beta()[1]
def process_rule(self, a, b):
"""process a -> b rule""" # TODO write more?
if (not a) or isinstance(b, bool):
return
if isinstance(a, bool):
return
if (a, b) in self._rules_seen:
return
else:
self._rules_seen.add((a, b))
# this is the core of processing
try:
self._process_rule(a, b)
except TautologyDetected:
pass
def _process_rule(self, a, b):
# right part first
# a -> b & c --> a -> b ; a -> c
# (?) FIXME this is only correct when b & c != null !
if isinstance(b, And):
for barg in b.args:
self.process_rule(a, barg)
# a -> b | c --> !b & !c -> !a
# --> a & !b -> c
# --> a & !c -> b
elif isinstance(b, Or):
# detect tautology first
if not isinstance(a, Logic): # Atom
# tautology: a -> a|c|...
if a in b.args:
raise TautologyDetected(a, b, 'a -> a|c|...')
self.process_rule(And(*[Not(barg) for barg in b.args]), Not(a))
for bidx in range(len(b.args)):
barg = b.args[bidx]
brest = b.args[:bidx] + b.args[bidx + 1:]
self.process_rule(And(a, Not(barg)), Or(*brest))
# left part
# a & b -> c --> IRREDUCIBLE CASE -- WE STORE IT AS IS
# (this will be the basis of beta-network)
elif isinstance(a, And):
if b in a.args:
raise TautologyDetected(a, b, 'a & b -> a')
self.proved_rules.append((a, b))
# XXX NOTE at present we ignore !c -> !a | !b
elif isinstance(a, Or):
if b in a.args:
raise TautologyDetected(a, b, 'a | b -> a')
for aarg in a.args:
self.process_rule(aarg, b)
else:
# both `a` and `b` are atoms
self.proved_rules.append((a, b)) # a -> b
self.proved_rules.append((Not(b), Not(a))) # !b -> !a
########################################
class FactRules(object):
"""Rules that describe how to deduce facts in logic space
When defined, these rules allow implications to quickly be determined
for a set of facts. For this precomputed deduction tables are used.
see `deduce_all_facts` (forward-chaining)
Also it is possible to gather prerequisites for a fact, which is tried
to be proven. (backward-chaining)
Definition Syntax
-----------------
a -> b -- a=T -> b=T (and automatically b=F -> a=F)
a -> !b -- a=T -> b=F
a == b -- a -> b & b -> a
a -> b & c -- a=T -> b=T & c=T
# TODO b | c
Internals
---------
.full_implications[k, v]: all the implications of fact k=v
.beta_triggers[k, v]: beta rules that might be triggered when k=v
.prereq -- {} k <- [] of k's prerequisites
.defined_facts -- set of defined fact names
"""
def __init__(self, rules):
"""Compile rules into internal lookup tables"""
if isinstance(rules, str):
rules = rules.splitlines()
# --- parse and process rules ---
P = Prover()
for rule in rules:
# XXX `a` is hardcoded to be always atom
a, op, b = rule.split(None, 2)
a = Logic.fromstring(a)
b = Logic.fromstring(b)
if op == '->':
P.process_rule(a, b)
elif op == '==':
P.process_rule(a, b)
P.process_rule(b, a)
else:
raise ValueError('unknown op %r' % op)
# --- build deduction networks ---
self.beta_rules = []
for bcond, bimpl in P.rules_beta:
self.beta_rules.append(
(set(_as_pair(a) for a in bcond.args), _as_pair(bimpl)))
# deduce alpha implications
impl_a = deduce_alpha_implications(P.rules_alpha)
# now:
# - apply beta rules to alpha chains (static extension), and
# - further associate beta rules to alpha chain (for inference
# at runtime)
impl_ab = apply_beta_to_alpha_route(impl_a, P.rules_beta)
# extract defined fact names
self.defined_facts = set(_base_fact(k) for k in impl_ab.keys())
# build rels (forward chains)
full_implications = defaultdict(set)
beta_triggers = defaultdict(set)
for k, (impl, betaidxs) in impl_ab.items():
full_implications[_as_pair(k)] = set(_as_pair(i) for i in impl)
beta_triggers[_as_pair(k)] = betaidxs
self.full_implications = full_implications
self.beta_triggers = beta_triggers
# build prereq (backward chains)
prereq = defaultdict(set)
rel_prereq = rules_2prereq(full_implications)
for k, pitems in rel_prereq.items():
prereq[k] |= pitems
self.prereq = prereq
class InconsistentAssumptions(ValueError):
def __str__(self):
kb, fact, value = self.args
return "%s, %s=%s" % (kb, fact, value)
class FactKB(dict):
"""
A simple propositional knowledge base relying on compiled inference rules.
"""
def __str__(self):
return '{\n%s}' % ',\n'.join(
["\t%s: %s" % i for i in sorted(self.items())])
def __init__(self, rules):
self.rules = rules
def _tell(self, k, v):
"""Add fact k=v to the knowledge base.
Returns True if the KB has actually been updated, False otherwise.
"""
if k in self and self[k] is not None:
if self[k] == v:
return False
else:
raise InconsistentAssumptions(self, k, v)
else:
self[k] = v
return True
# *********************************************
# * This is the workhorse, so keep it *fast*. *
# *********************************************
def deduce_all_facts(self, facts):
"""
Update the KB with all the implications of a list of facts.
Facts can be specified as a dictionary or as a list of (key, value)
pairs.
"""
# keep frequently used attributes locally, so we'll avoid extra
# attribute access overhead
full_implications = self.rules.full_implications
beta_triggers = self.rules.beta_triggers
beta_rules = self.rules.beta_rules
if isinstance(facts, dict):
facts = facts.items()
while facts:
beta_maytrigger = set()
# --- alpha chains ---
for k, v in facts:
if not self._tell(k, v) or v is None:
continue
# lookup routing tables
for key, value in full_implications[k, v]:
self._tell(key, value)
beta_maytrigger.update(beta_triggers[k, v])
# --- beta chains ---
facts = []
for bidx in beta_maytrigger:
bcond, bimpl = beta_rules[bidx]
if all(self.get(k) is v for k, v in bcond):
facts.append(bimpl)
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