903 lines
30 KiB
Python
903 lines
30 KiB
Python
|
from types import FunctionType
|
||
|
|
||
|
from sympy.core.numbers import Float, Integer
|
||
|
from sympy.core.singleton import S
|
||
|
from sympy.core.symbol import uniquely_named_symbol
|
||
|
from sympy.core.mul import Mul
|
||
|
from sympy.polys import PurePoly, cancel
|
||
|
from sympy.simplify.simplify import (simplify as _simplify,
|
||
|
dotprodsimp as _dotprodsimp)
|
||
|
from sympy import sympify
|
||
|
from sympy.functions.combinatorial.numbers import nC
|
||
|
from sympy.polys.matrices.domainmatrix import DomainMatrix
|
||
|
|
||
|
from .common import NonSquareMatrixError
|
||
|
from .utilities import (
|
||
|
_get_intermediate_simp, _get_intermediate_simp_bool,
|
||
|
_iszero, _is_zero_after_expand_mul)
|
||
|
|
||
|
|
||
|
def _find_reasonable_pivot(col, iszerofunc=_iszero, simpfunc=_simplify):
|
||
|
""" Find the lowest index of an item in ``col`` that is
|
||
|
suitable for a pivot. If ``col`` consists only of
|
||
|
Floats, the pivot with the largest norm is returned.
|
||
|
Otherwise, the first element where ``iszerofunc`` returns
|
||
|
False is used. If ``iszerofunc`` doesn't return false,
|
||
|
items are simplified and retested until a suitable
|
||
|
pivot is found.
|
||
|
|
||
|
Returns a 4-tuple
|
||
|
(pivot_offset, pivot_val, assumed_nonzero, newly_determined)
|
||
|
where pivot_offset is the index of the pivot, pivot_val is
|
||
|
the (possibly simplified) value of the pivot, assumed_nonzero
|
||
|
is True if an assumption that the pivot was non-zero
|
||
|
was made without being proved, and newly_determined are
|
||
|
elements that were simplified during the process of pivot
|
||
|
finding."""
|
||
|
|
||
|
newly_determined = []
|
||
|
col = list(col)
|
||
|
# a column that contains a mix of floats and integers
|
||
|
# but at least one float is considered a numerical
|
||
|
# column, and so we do partial pivoting
|
||
|
if all(isinstance(x, (Float, Integer)) for x in col) and any(
|
||
|
isinstance(x, Float) for x in col):
|
||
|
col_abs = [abs(x) for x in col]
|
||
|
max_value = max(col_abs)
|
||
|
if iszerofunc(max_value):
|
||
|
# just because iszerofunc returned True, doesn't
|
||
|
# mean the value is numerically zero. Make sure
|
||
|
# to replace all entries with numerical zeros
|
||
|
if max_value != 0:
|
||
|
newly_determined = [(i, 0) for i, x in enumerate(col) if x != 0]
|
||
|
return (None, None, False, newly_determined)
|
||
|
index = col_abs.index(max_value)
|
||
|
return (index, col[index], False, newly_determined)
|
||
|
|
||
|
# PASS 1 (iszerofunc directly)
|
||
|
possible_zeros = []
|
||
|
for i, x in enumerate(col):
|
||
|
is_zero = iszerofunc(x)
|
||
|
# is someone wrote a custom iszerofunc, it may return
|
||
|
# BooleanFalse or BooleanTrue instead of True or False,
|
||
|
# so use == for comparison instead of `is`
|
||
|
if is_zero == False:
|
||
|
# we found something that is definitely not zero
|
||
|
return (i, x, False, newly_determined)
|
||
|
possible_zeros.append(is_zero)
|
||
|
|
||
|
# by this point, we've found no certain non-zeros
|
||
|
if all(possible_zeros):
|
||
|
# if everything is definitely zero, we have
|
||
|
# no pivot
|
||
|
return (None, None, False, newly_determined)
|
||
|
|
||
|
# PASS 2 (iszerofunc after simplify)
|
||
|
# we haven't found any for-sure non-zeros, so
|
||
|
# go through the elements iszerofunc couldn't
|
||
|
# make a determination about and opportunistically
|
||
|
# simplify to see if we find something
|
||
|
for i, x in enumerate(col):
|
||
|
if possible_zeros[i] is not None:
|
||
|
continue
|
||
|
simped = simpfunc(x)
|
||
|
is_zero = iszerofunc(simped)
|
||
|
if is_zero == True or is_zero == False:
|
||
|
newly_determined.append((i, simped))
|
||
|
if is_zero == False:
|
||
|
return (i, simped, False, newly_determined)
|
||
|
possible_zeros[i] = is_zero
|
||
|
|
||
|
# after simplifying, some things that were recognized
|
||
|
# as zeros might be zeros
|
||
|
if all(possible_zeros):
|
||
|
# if everything is definitely zero, we have
|
||
|
# no pivot
|
||
|
return (None, None, False, newly_determined)
|
||
|
|
||
|
# PASS 3 (.equals(0))
|
||
|
# some expressions fail to simplify to zero, but
|
||
|
# ``.equals(0)`` evaluates to True. As a last-ditch
|
||
|
# attempt, apply ``.equals`` to these expressions
|
||
|
for i, x in enumerate(col):
|
||
|
if possible_zeros[i] is not None:
|
||
|
continue
|
||
|
if x.equals(S.Zero):
|
||
|
# ``.iszero`` may return False with
|
||
|
# an implicit assumption (e.g., ``x.equals(0)``
|
||
|
# when ``x`` is a symbol), so only treat it
|
||
|
# as proved when ``.equals(0)`` returns True
|
||
|
possible_zeros[i] = True
|
||
|
newly_determined.append((i, S.Zero))
|
||
|
|
||
|
if all(possible_zeros):
|
||
|
return (None, None, False, newly_determined)
|
||
|
|
||
|
# at this point there is nothing that could definitely
|
||
|
# be a pivot. To maintain compatibility with existing
|
||
|
# behavior, we'll assume that an illdetermined thing is
|
||
|
# non-zero. We should probably raise a warning in this case
|
||
|
i = possible_zeros.index(None)
|
||
|
return (i, col[i], True, newly_determined)
|
||
|
|
||
|
|
||
|
def _find_reasonable_pivot_naive(col, iszerofunc=_iszero, simpfunc=None):
|
||
|
"""
|
||
|
Helper that computes the pivot value and location from a
|
||
|
sequence of contiguous matrix column elements. As a side effect
|
||
|
of the pivot search, this function may simplify some of the elements
|
||
|
of the input column. A list of these simplified entries and their
|
||
|
indices are also returned.
|
||
|
This function mimics the behavior of _find_reasonable_pivot(),
|
||
|
but does less work trying to determine if an indeterminate candidate
|
||
|
pivot simplifies to zero. This more naive approach can be much faster,
|
||
|
with the trade-off that it may erroneously return a pivot that is zero.
|
||
|
|
||
|
``col`` is a sequence of contiguous column entries to be searched for
|
||
|
a suitable pivot.
|
||
|
``iszerofunc`` is a callable that returns a Boolean that indicates
|
||
|
if its input is zero, or None if no such determination can be made.
|
||
|
``simpfunc`` is a callable that simplifies its input. It must return
|
||
|
its input if it does not simplify its input. Passing in
|
||
|
``simpfunc=None`` indicates that the pivot search should not attempt
|
||
|
to simplify any candidate pivots.
|
||
|
|
||
|
Returns a 4-tuple:
|
||
|
(pivot_offset, pivot_val, assumed_nonzero, newly_determined)
|
||
|
``pivot_offset`` is the sequence index of the pivot.
|
||
|
``pivot_val`` is the value of the pivot.
|
||
|
pivot_val and col[pivot_index] are equivalent, but will be different
|
||
|
when col[pivot_index] was simplified during the pivot search.
|
||
|
``assumed_nonzero`` is a boolean indicating if the pivot cannot be
|
||
|
guaranteed to be zero. If assumed_nonzero is true, then the pivot
|
||
|
may or may not be non-zero. If assumed_nonzero is false, then
|
||
|
the pivot is non-zero.
|
||
|
``newly_determined`` is a list of index-value pairs of pivot candidates
|
||
|
that were simplified during the pivot search.
|
||
|
"""
|
||
|
|
||
|
# indeterminates holds the index-value pairs of each pivot candidate
|
||
|
# that is neither zero or non-zero, as determined by iszerofunc().
|
||
|
# If iszerofunc() indicates that a candidate pivot is guaranteed
|
||
|
# non-zero, or that every candidate pivot is zero then the contents
|
||
|
# of indeterminates are unused.
|
||
|
# Otherwise, the only viable candidate pivots are symbolic.
|
||
|
# In this case, indeterminates will have at least one entry,
|
||
|
# and all but the first entry are ignored when simpfunc is None.
|
||
|
indeterminates = []
|
||
|
for i, col_val in enumerate(col):
|
||
|
col_val_is_zero = iszerofunc(col_val)
|
||
|
if col_val_is_zero == False:
|
||
|
# This pivot candidate is non-zero.
|
||
|
return i, col_val, False, []
|
||
|
elif col_val_is_zero is None:
|
||
|
# The candidate pivot's comparison with zero
|
||
|
# is indeterminate.
|
||
|
indeterminates.append((i, col_val))
|
||
|
|
||
|
if len(indeterminates) == 0:
|
||
|
# All candidate pivots are guaranteed to be zero, i.e. there is
|
||
|
# no pivot.
|
||
|
return None, None, False, []
|
||
|
|
||
|
if simpfunc is None:
|
||
|
# Caller did not pass in a simplification function that might
|
||
|
# determine if an indeterminate pivot candidate is guaranteed
|
||
|
# to be nonzero, so assume the first indeterminate candidate
|
||
|
# is non-zero.
|
||
|
return indeterminates[0][0], indeterminates[0][1], True, []
|
||
|
|
||
|
# newly_determined holds index-value pairs of candidate pivots
|
||
|
# that were simplified during the search for a non-zero pivot.
|
||
|
newly_determined = []
|
||
|
for i, col_val in indeterminates:
|
||
|
tmp_col_val = simpfunc(col_val)
|
||
|
if id(col_val) != id(tmp_col_val):
|
||
|
# simpfunc() simplified this candidate pivot.
|
||
|
newly_determined.append((i, tmp_col_val))
|
||
|
if iszerofunc(tmp_col_val) == False:
|
||
|
# Candidate pivot simplified to a guaranteed non-zero value.
|
||
|
return i, tmp_col_val, False, newly_determined
|
||
|
|
||
|
return indeterminates[0][0], indeterminates[0][1], True, newly_determined
|
||
|
|
||
|
|
||
|
# This functions is a candidate for caching if it gets implemented for matrices.
|
||
|
def _berkowitz_toeplitz_matrix(M):
|
||
|
"""Return (A,T) where T the Toeplitz matrix used in the Berkowitz algorithm
|
||
|
corresponding to ``M`` and A is the first principal submatrix.
|
||
|
"""
|
||
|
|
||
|
# the 0 x 0 case is trivial
|
||
|
if M.rows == 0 and M.cols == 0:
|
||
|
return M._new(1,1, [M.one])
|
||
|
|
||
|
#
|
||
|
# Partition M = [ a_11 R ]
|
||
|
# [ C A ]
|
||
|
#
|
||
|
|
||
|
a, R = M[0,0], M[0, 1:]
|
||
|
C, A = M[1:, 0], M[1:,1:]
|
||
|
|
||
|
#
|
||
|
# The Toeplitz matrix looks like
|
||
|
#
|
||
|
# [ 1 ]
|
||
|
# [ -a 1 ]
|
||
|
# [ -RC -a 1 ]
|
||
|
# [ -RAC -RC -a 1 ]
|
||
|
# [ -RA**2C -RAC -RC -a 1 ]
|
||
|
# etc.
|
||
|
|
||
|
# Compute the diagonal entries.
|
||
|
# Because multiplying matrix times vector is so much
|
||
|
# more efficient than matrix times matrix, recursively
|
||
|
# compute -R * A**n * C.
|
||
|
diags = [C]
|
||
|
for i in range(M.rows - 2):
|
||
|
diags.append(A.multiply(diags[i], dotprodsimp=None))
|
||
|
diags = [(-R).multiply(d, dotprodsimp=None)[0, 0] for d in diags]
|
||
|
diags = [M.one, -a] + diags
|
||
|
|
||
|
def entry(i,j):
|
||
|
if j > i:
|
||
|
return M.zero
|
||
|
return diags[i - j]
|
||
|
|
||
|
toeplitz = M._new(M.cols + 1, M.rows, entry)
|
||
|
return (A, toeplitz)
|
||
|
|
||
|
|
||
|
# This functions is a candidate for caching if it gets implemented for matrices.
|
||
|
def _berkowitz_vector(M):
|
||
|
""" Run the Berkowitz algorithm and return a vector whose entries
|
||
|
are the coefficients of the characteristic polynomial of ``M``.
|
||
|
|
||
|
Given N x N matrix, efficiently compute
|
||
|
coefficients of characteristic polynomials of ``M``
|
||
|
without division in the ground domain.
|
||
|
|
||
|
This method is particularly useful for computing determinant,
|
||
|
principal minors and characteristic polynomial when ``M``
|
||
|
has complicated coefficients e.g. polynomials. Semi-direct
|
||
|
usage of this algorithm is also important in computing
|
||
|
efficiently sub-resultant PRS.
|
||
|
|
||
|
Assuming that M is a square matrix of dimension N x N and
|
||
|
I is N x N identity matrix, then the Berkowitz vector is
|
||
|
an N x 1 vector whose entries are coefficients of the
|
||
|
polynomial
|
||
|
|
||
|
charpoly(M) = det(t*I - M)
|
||
|
|
||
|
As a consequence, all polynomials generated by Berkowitz
|
||
|
algorithm are monic.
|
||
|
|
||
|
For more information on the implemented algorithm refer to:
|
||
|
|
||
|
[1] S.J. Berkowitz, On computing the determinant in small
|
||
|
parallel time using a small number of processors, ACM,
|
||
|
Information Processing Letters 18, 1984, pp. 147-150
|
||
|
|
||
|
[2] M. Keber, Division-Free computation of sub-resultants
|
||
|
using Bezout matrices, Tech. Report MPI-I-2006-1-006,
|
||
|
Saarbrucken, 2006
|
||
|
"""
|
||
|
|
||
|
# handle the trivial cases
|
||
|
if M.rows == 0 and M.cols == 0:
|
||
|
return M._new(1, 1, [M.one])
|
||
|
elif M.rows == 1 and M.cols == 1:
|
||
|
return M._new(2, 1, [M.one, -M[0,0]])
|
||
|
|
||
|
submat, toeplitz = _berkowitz_toeplitz_matrix(M)
|
||
|
|
||
|
return toeplitz.multiply(_berkowitz_vector(submat), dotprodsimp=None)
|
||
|
|
||
|
|
||
|
def _adjugate(M, method="berkowitz"):
|
||
|
"""Returns the adjugate, or classical adjoint, of
|
||
|
a matrix. That is, the transpose of the matrix of cofactors.
|
||
|
|
||
|
https://en.wikipedia.org/wiki/Adjugate
|
||
|
|
||
|
Parameters
|
||
|
==========
|
||
|
|
||
|
method : string, optional
|
||
|
Method to use to find the cofactors, can be "bareiss", "berkowitz" or
|
||
|
"lu".
|
||
|
|
||
|
Examples
|
||
|
========
|
||
|
|
||
|
>>> from sympy import Matrix
|
||
|
>>> M = Matrix([[1, 2], [3, 4]])
|
||
|
>>> M.adjugate()
|
||
|
Matrix([
|
||
|
[ 4, -2],
|
||
|
[-3, 1]])
|
||
|
|
||
|
See Also
|
||
|
========
|
||
|
|
||
|
cofactor_matrix
|
||
|
sympy.matrices.common.MatrixCommon.transpose
|
||
|
"""
|
||
|
|
||
|
return M.cofactor_matrix(method=method).transpose()
|
||
|
|
||
|
|
||
|
# This functions is a candidate for caching if it gets implemented for matrices.
|
||
|
def _charpoly(M, x='lambda', simplify=_simplify):
|
||
|
"""Computes characteristic polynomial det(x*I - M) where I is
|
||
|
the identity matrix.
|
||
|
|
||
|
A PurePoly is returned, so using different variables for ``x`` does
|
||
|
not affect the comparison or the polynomials:
|
||
|
|
||
|
Parameters
|
||
|
==========
|
||
|
|
||
|
x : string, optional
|
||
|
Name for the "lambda" variable, defaults to "lambda".
|
||
|
|
||
|
simplify : function, optional
|
||
|
Simplification function to use on the characteristic polynomial
|
||
|
calculated. Defaults to ``simplify``.
|
||
|
|
||
|
Examples
|
||
|
========
|
||
|
|
||
|
>>> from sympy import Matrix
|
||
|
>>> from sympy.abc import x, y
|
||
|
>>> M = Matrix([[1, 3], [2, 0]])
|
||
|
>>> M.charpoly()
|
||
|
PurePoly(lambda**2 - lambda - 6, lambda, domain='ZZ')
|
||
|
>>> M.charpoly(x) == M.charpoly(y)
|
||
|
True
|
||
|
>>> M.charpoly(x) == M.charpoly(y)
|
||
|
True
|
||
|
|
||
|
Specifying ``x`` is optional; a symbol named ``lambda`` is used by
|
||
|
default (which looks good when pretty-printed in unicode):
|
||
|
|
||
|
>>> M.charpoly().as_expr()
|
||
|
lambda**2 - lambda - 6
|
||
|
|
||
|
And if ``x`` clashes with an existing symbol, underscores will
|
||
|
be prepended to the name to make it unique:
|
||
|
|
||
|
>>> M = Matrix([[1, 2], [x, 0]])
|
||
|
>>> M.charpoly(x).as_expr()
|
||
|
_x**2 - _x - 2*x
|
||
|
|
||
|
Whether you pass a symbol or not, the generator can be obtained
|
||
|
with the gen attribute since it may not be the same as the symbol
|
||
|
that was passed:
|
||
|
|
||
|
>>> M.charpoly(x).gen
|
||
|
_x
|
||
|
>>> M.charpoly(x).gen == x
|
||
|
False
|
||
|
|
||
|
Notes
|
||
|
=====
|
||
|
|
||
|
The Samuelson-Berkowitz algorithm is used to compute
|
||
|
the characteristic polynomial efficiently and without any
|
||
|
division operations. Thus the characteristic polynomial over any
|
||
|
commutative ring without zero divisors can be computed.
|
||
|
|
||
|
If the determinant det(x*I - M) can be found out easily as
|
||
|
in the case of an upper or a lower triangular matrix, then
|
||
|
instead of Samuelson-Berkowitz algorithm, eigenvalues are computed
|
||
|
and the characteristic polynomial with their help.
|
||
|
|
||
|
See Also
|
||
|
========
|
||
|
|
||
|
det
|
||
|
"""
|
||
|
|
||
|
if not M.is_square:
|
||
|
raise NonSquareMatrixError()
|
||
|
if M.is_lower or M.is_upper:
|
||
|
diagonal_elements = M.diagonal()
|
||
|
x = uniquely_named_symbol(x, diagonal_elements, modify=lambda s: '_' + s)
|
||
|
m = 1
|
||
|
for i in diagonal_elements:
|
||
|
m = m * (x - simplify(i))
|
||
|
return PurePoly(m, x)
|
||
|
|
||
|
berk_vector = _berkowitz_vector(M)
|
||
|
x = uniquely_named_symbol(x, berk_vector, modify=lambda s: '_' + s)
|
||
|
|
||
|
return PurePoly([simplify(a) for a in berk_vector], x)
|
||
|
|
||
|
|
||
|
def _cofactor(M, i, j, method="berkowitz"):
|
||
|
"""Calculate the cofactor of an element.
|
||
|
|
||
|
Parameters
|
||
|
==========
|
||
|
|
||
|
method : string, optional
|
||
|
Method to use to find the cofactors, can be "bareiss", "berkowitz" or
|
||
|
"lu".
|
||
|
|
||
|
Examples
|
||
|
========
|
||
|
|
||
|
>>> from sympy import Matrix
|
||
|
>>> M = Matrix([[1, 2], [3, 4]])
|
||
|
>>> M.cofactor(0, 1)
|
||
|
-3
|
||
|
|
||
|
See Also
|
||
|
========
|
||
|
|
||
|
cofactor_matrix
|
||
|
minor
|
||
|
minor_submatrix
|
||
|
"""
|
||
|
|
||
|
if not M.is_square or M.rows < 1:
|
||
|
raise NonSquareMatrixError()
|
||
|
|
||
|
return (-1)**((i + j) % 2) * M.minor(i, j, method)
|
||
|
|
||
|
|
||
|
def _cofactor_matrix(M, method="berkowitz"):
|
||
|
"""Return a matrix containing the cofactor of each element.
|
||
|
|
||
|
Parameters
|
||
|
==========
|
||
|
|
||
|
method : string, optional
|
||
|
Method to use to find the cofactors, can be "bareiss", "berkowitz" or
|
||
|
"lu".
|
||
|
|
||
|
Examples
|
||
|
========
|
||
|
|
||
|
>>> from sympy import Matrix
|
||
|
>>> M = Matrix([[1, 2], [3, 4]])
|
||
|
>>> M.cofactor_matrix()
|
||
|
Matrix([
|
||
|
[ 4, -3],
|
||
|
[-2, 1]])
|
||
|
|
||
|
See Also
|
||
|
========
|
||
|
|
||
|
cofactor
|
||
|
minor
|
||
|
minor_submatrix
|
||
|
"""
|
||
|
|
||
|
if not M.is_square or M.rows < 1:
|
||
|
raise NonSquareMatrixError()
|
||
|
|
||
|
return M._new(M.rows, M.cols,
|
||
|
lambda i, j: M.cofactor(i, j, method))
|
||
|
|
||
|
def _per(M):
|
||
|
"""Returns the permanent of a matrix. Unlike determinant,
|
||
|
permanent is defined for both square and non-square matrices.
|
||
|
|
||
|
For an m x n matrix, with m less than or equal to n,
|
||
|
it is given as the sum over the permutations s of size
|
||
|
less than or equal to m on [1, 2, . . . n] of the product
|
||
|
from i = 1 to m of M[i, s[i]]. Taking the transpose will
|
||
|
not affect the value of the permanent.
|
||
|
|
||
|
In the case of a square matrix, this is the same as the permutation
|
||
|
definition of the determinant, but it does not take the sign of the
|
||
|
permutation into account. Computing the permanent with this definition
|
||
|
is quite inefficient, so here the Ryser formula is used.
|
||
|
|
||
|
Examples
|
||
|
========
|
||
|
|
||
|
>>> from sympy import Matrix
|
||
|
>>> M = Matrix([[1, 2, 3], [4, 5, 6], [7, 8, 9]])
|
||
|
>>> M.per()
|
||
|
450
|
||
|
>>> M = Matrix([1, 5, 7])
|
||
|
>>> M.per()
|
||
|
13
|
||
|
|
||
|
References
|
||
|
==========
|
||
|
|
||
|
.. [1] Prof. Frank Ben's notes: https://math.berkeley.edu/~bernd/ban275.pdf
|
||
|
.. [2] Wikipedia article on Permanent: https://en.wikipedia.org/wiki/Permanent_(mathematics)
|
||
|
.. [3] https://reference.wolfram.com/language/ref/Permanent.html
|
||
|
.. [4] Permanent of a rectangular matrix : https://arxiv.org/pdf/0904.3251.pdf
|
||
|
"""
|
||
|
import itertools
|
||
|
|
||
|
m, n = M.shape
|
||
|
if m > n:
|
||
|
M = M.T
|
||
|
m, n = n, m
|
||
|
s = list(range(n))
|
||
|
|
||
|
subsets = []
|
||
|
for i in range(1, m + 1):
|
||
|
subsets += list(map(list, itertools.combinations(s, i)))
|
||
|
|
||
|
perm = 0
|
||
|
for subset in subsets:
|
||
|
prod = 1
|
||
|
sub_len = len(subset)
|
||
|
for i in range(m):
|
||
|
prod *= sum([M[i, j] for j in subset])
|
||
|
perm += prod * (-1)**sub_len * nC(n - sub_len, m - sub_len)
|
||
|
perm *= (-1)**m
|
||
|
perm = sympify(perm)
|
||
|
return perm.simplify()
|
||
|
|
||
|
def _det_DOM(M):
|
||
|
DOM = DomainMatrix.from_Matrix(M, field=True, extension=True)
|
||
|
K = DOM.domain
|
||
|
return K.to_sympy(DOM.det())
|
||
|
|
||
|
# This functions is a candidate for caching if it gets implemented for matrices.
|
||
|
def _det(M, method="bareiss", iszerofunc=None):
|
||
|
"""Computes the determinant of a matrix if ``M`` is a concrete matrix object
|
||
|
otherwise return an expressions ``Determinant(M)`` if ``M`` is a
|
||
|
``MatrixSymbol`` or other expression.
|
||
|
|
||
|
Parameters
|
||
|
==========
|
||
|
|
||
|
method : string, optional
|
||
|
Specifies the algorithm used for computing the matrix determinant.
|
||
|
|
||
|
If the matrix is at most 3x3, a hard-coded formula is used and the
|
||
|
specified method is ignored. Otherwise, it defaults to
|
||
|
``'bareiss'``.
|
||
|
|
||
|
Also, if the matrix is an upper or a lower triangular matrix, determinant
|
||
|
is computed by simple multiplication of diagonal elements, and the
|
||
|
specified method is ignored.
|
||
|
|
||
|
If it is set to ``'domain-ge'``, then Gaussian elimination method will
|
||
|
be used via using DomainMatrix.
|
||
|
|
||
|
If it is set to ``'bareiss'``, Bareiss' fraction-free algorithm will
|
||
|
be used.
|
||
|
|
||
|
If it is set to ``'berkowitz'``, Berkowitz' algorithm will be used.
|
||
|
|
||
|
Otherwise, if it is set to ``'lu'``, LU decomposition will be used.
|
||
|
|
||
|
.. note::
|
||
|
For backward compatibility, legacy keys like "bareis" and
|
||
|
"det_lu" can still be used to indicate the corresponding
|
||
|
methods.
|
||
|
And the keys are also case-insensitive for now. However, it is
|
||
|
suggested to use the precise keys for specifying the method.
|
||
|
|
||
|
iszerofunc : FunctionType or None, optional
|
||
|
If it is set to ``None``, it will be defaulted to ``_iszero`` if the
|
||
|
method is set to ``'bareiss'``, and ``_is_zero_after_expand_mul`` if
|
||
|
the method is set to ``'lu'``.
|
||
|
|
||
|
It can also accept any user-specified zero testing function, if it
|
||
|
is formatted as a function which accepts a single symbolic argument
|
||
|
and returns ``True`` if it is tested as zero and ``False`` if it
|
||
|
tested as non-zero, and also ``None`` if it is undecidable.
|
||
|
|
||
|
Returns
|
||
|
=======
|
||
|
|
||
|
det : Basic
|
||
|
Result of determinant.
|
||
|
|
||
|
Raises
|
||
|
======
|
||
|
|
||
|
ValueError
|
||
|
If unrecognized keys are given for ``method`` or ``iszerofunc``.
|
||
|
|
||
|
NonSquareMatrixError
|
||
|
If attempted to calculate determinant from a non-square matrix.
|
||
|
|
||
|
Examples
|
||
|
========
|
||
|
|
||
|
>>> from sympy import Matrix, eye, det
|
||
|
>>> I3 = eye(3)
|
||
|
>>> det(I3)
|
||
|
1
|
||
|
>>> M = Matrix([[1, 2], [3, 4]])
|
||
|
>>> det(M)
|
||
|
-2
|
||
|
>>> det(M) == M.det()
|
||
|
True
|
||
|
>>> M.det(method="domain-ge")
|
||
|
-2
|
||
|
"""
|
||
|
|
||
|
# sanitize `method`
|
||
|
method = method.lower()
|
||
|
|
||
|
if method == "bareis":
|
||
|
method = "bareiss"
|
||
|
elif method == "det_lu":
|
||
|
method = "lu"
|
||
|
|
||
|
if method not in ("bareiss", "berkowitz", "lu", "domain-ge"):
|
||
|
raise ValueError("Determinant method '%s' unrecognized" % method)
|
||
|
|
||
|
if iszerofunc is None:
|
||
|
if method == "bareiss":
|
||
|
iszerofunc = _is_zero_after_expand_mul
|
||
|
elif method == "lu":
|
||
|
iszerofunc = _iszero
|
||
|
|
||
|
elif not isinstance(iszerofunc, FunctionType):
|
||
|
raise ValueError("Zero testing method '%s' unrecognized" % iszerofunc)
|
||
|
|
||
|
n = M.rows
|
||
|
|
||
|
if n == M.cols: # square check is done in individual method functions
|
||
|
if n == 0:
|
||
|
return M.one
|
||
|
elif n == 1:
|
||
|
return M[0, 0]
|
||
|
elif n == 2:
|
||
|
m = M[0, 0] * M[1, 1] - M[0, 1] * M[1, 0]
|
||
|
return _get_intermediate_simp(_dotprodsimp)(m)
|
||
|
elif n == 3:
|
||
|
m = (M[0, 0] * M[1, 1] * M[2, 2]
|
||
|
+ M[0, 1] * M[1, 2] * M[2, 0]
|
||
|
+ M[0, 2] * M[1, 0] * M[2, 1]
|
||
|
- M[0, 2] * M[1, 1] * M[2, 0]
|
||
|
- M[0, 0] * M[1, 2] * M[2, 1]
|
||
|
- M[0, 1] * M[1, 0] * M[2, 2])
|
||
|
return _get_intermediate_simp(_dotprodsimp)(m)
|
||
|
|
||
|
dets = []
|
||
|
for b in M.strongly_connected_components():
|
||
|
if method == "domain-ge": # uses DomainMatrix to evalute determinant
|
||
|
det = _det_DOM(M[b, b])
|
||
|
elif method == "bareiss":
|
||
|
det = M[b, b]._eval_det_bareiss(iszerofunc=iszerofunc)
|
||
|
elif method == "berkowitz":
|
||
|
det = M[b, b]._eval_det_berkowitz()
|
||
|
elif method == "lu":
|
||
|
det = M[b, b]._eval_det_lu(iszerofunc=iszerofunc)
|
||
|
dets.append(det)
|
||
|
return Mul(*dets)
|
||
|
|
||
|
|
||
|
# This functions is a candidate for caching if it gets implemented for matrices.
|
||
|
def _det_bareiss(M, iszerofunc=_is_zero_after_expand_mul):
|
||
|
"""Compute matrix determinant using Bareiss' fraction-free
|
||
|
algorithm which is an extension of the well known Gaussian
|
||
|
elimination method. This approach is best suited for dense
|
||
|
symbolic matrices and will result in a determinant with
|
||
|
minimal number of fractions. It means that less term
|
||
|
rewriting is needed on resulting formulae.
|
||
|
|
||
|
Parameters
|
||
|
==========
|
||
|
|
||
|
iszerofunc : function, optional
|
||
|
The function to use to determine zeros when doing an LU decomposition.
|
||
|
Defaults to ``lambda x: x.is_zero``.
|
||
|
|
||
|
TODO: Implement algorithm for sparse matrices (SFF),
|
||
|
http://www.eecis.udel.edu/~saunders/papers/sffge/it5.ps.
|
||
|
"""
|
||
|
|
||
|
# Recursively implemented Bareiss' algorithm as per Deanna Richelle Leggett's
|
||
|
# thesis http://www.math.usm.edu/perry/Research/Thesis_DRL.pdf
|
||
|
def bareiss(mat, cumm=1):
|
||
|
if mat.rows == 0:
|
||
|
return mat.one
|
||
|
elif mat.rows == 1:
|
||
|
return mat[0, 0]
|
||
|
|
||
|
# find a pivot and extract the remaining matrix
|
||
|
# With the default iszerofunc, _find_reasonable_pivot slows down
|
||
|
# the computation by the factor of 2.5 in one test.
|
||
|
# Relevant issues: #10279 and #13877.
|
||
|
pivot_pos, pivot_val, _, _ = _find_reasonable_pivot(mat[:, 0], iszerofunc=iszerofunc)
|
||
|
if pivot_pos is None:
|
||
|
return mat.zero
|
||
|
|
||
|
# if we have a valid pivot, we'll do a "row swap", so keep the
|
||
|
# sign of the det
|
||
|
sign = (-1) ** (pivot_pos % 2)
|
||
|
|
||
|
# we want every row but the pivot row and every column
|
||
|
rows = list(i for i in range(mat.rows) if i != pivot_pos)
|
||
|
cols = list(range(mat.cols))
|
||
|
tmp_mat = mat.extract(rows, cols)
|
||
|
|
||
|
def entry(i, j):
|
||
|
ret = (pivot_val*tmp_mat[i, j + 1] - mat[pivot_pos, j + 1]*tmp_mat[i, 0]) / cumm
|
||
|
if _get_intermediate_simp_bool(True):
|
||
|
return _dotprodsimp(ret)
|
||
|
elif not ret.is_Atom:
|
||
|
return cancel(ret)
|
||
|
return ret
|
||
|
|
||
|
return sign*bareiss(M._new(mat.rows - 1, mat.cols - 1, entry), pivot_val)
|
||
|
|
||
|
if not M.is_square:
|
||
|
raise NonSquareMatrixError()
|
||
|
|
||
|
if M.rows == 0:
|
||
|
return M.one
|
||
|
# sympy/matrices/tests/test_matrices.py contains a test that
|
||
|
# suggests that the determinant of a 0 x 0 matrix is one, by
|
||
|
# convention.
|
||
|
|
||
|
return bareiss(M)
|
||
|
|
||
|
|
||
|
def _det_berkowitz(M):
|
||
|
""" Use the Berkowitz algorithm to compute the determinant."""
|
||
|
|
||
|
if not M.is_square:
|
||
|
raise NonSquareMatrixError()
|
||
|
|
||
|
if M.rows == 0:
|
||
|
return M.one
|
||
|
# sympy/matrices/tests/test_matrices.py contains a test that
|
||
|
# suggests that the determinant of a 0 x 0 matrix is one, by
|
||
|
# convention.
|
||
|
|
||
|
berk_vector = _berkowitz_vector(M)
|
||
|
return (-1)**(len(berk_vector) - 1) * berk_vector[-1]
|
||
|
|
||
|
|
||
|
# This functions is a candidate for caching if it gets implemented for matrices.
|
||
|
def _det_LU(M, iszerofunc=_iszero, simpfunc=None):
|
||
|
""" Computes the determinant of a matrix from its LU decomposition.
|
||
|
This function uses the LU decomposition computed by
|
||
|
LUDecomposition_Simple().
|
||
|
|
||
|
The keyword arguments iszerofunc and simpfunc are passed to
|
||
|
LUDecomposition_Simple().
|
||
|
iszerofunc is a callable that returns a boolean indicating if its
|
||
|
input is zero, or None if it cannot make the determination.
|
||
|
simpfunc is a callable that simplifies its input.
|
||
|
The default is simpfunc=None, which indicate that the pivot search
|
||
|
algorithm should not attempt to simplify any candidate pivots.
|
||
|
If simpfunc fails to simplify its input, then it must return its input
|
||
|
instead of a copy.
|
||
|
|
||
|
Parameters
|
||
|
==========
|
||
|
|
||
|
iszerofunc : function, optional
|
||
|
The function to use to determine zeros when doing an LU decomposition.
|
||
|
Defaults to ``lambda x: x.is_zero``.
|
||
|
|
||
|
simpfunc : function, optional
|
||
|
The simplification function to use when looking for zeros for pivots.
|
||
|
"""
|
||
|
|
||
|
if not M.is_square:
|
||
|
raise NonSquareMatrixError()
|
||
|
|
||
|
if M.rows == 0:
|
||
|
return M.one
|
||
|
# sympy/matrices/tests/test_matrices.py contains a test that
|
||
|
# suggests that the determinant of a 0 x 0 matrix is one, by
|
||
|
# convention.
|
||
|
|
||
|
lu, row_swaps = M.LUdecomposition_Simple(iszerofunc=iszerofunc,
|
||
|
simpfunc=simpfunc)
|
||
|
# P*A = L*U => det(A) = det(L)*det(U)/det(P) = det(P)*det(U).
|
||
|
# Lower triangular factor L encoded in lu has unit diagonal => det(L) = 1.
|
||
|
# P is a permutation matrix => det(P) in {-1, 1} => 1/det(P) = det(P).
|
||
|
# LUdecomposition_Simple() returns a list of row exchange index pairs, rather
|
||
|
# than a permutation matrix, but det(P) = (-1)**len(row_swaps).
|
||
|
|
||
|
# Avoid forming the potentially time consuming product of U's diagonal entries
|
||
|
# if the product is zero.
|
||
|
# Bottom right entry of U is 0 => det(A) = 0.
|
||
|
# It may be impossible to determine if this entry of U is zero when it is symbolic.
|
||
|
if iszerofunc(lu[lu.rows-1, lu.rows-1]):
|
||
|
return M.zero
|
||
|
|
||
|
# Compute det(P)
|
||
|
det = -M.one if len(row_swaps)%2 else M.one
|
||
|
|
||
|
# Compute det(U) by calculating the product of U's diagonal entries.
|
||
|
# The upper triangular portion of lu is the upper triangular portion of the
|
||
|
# U factor in the LU decomposition.
|
||
|
for k in range(lu.rows):
|
||
|
det *= lu[k, k]
|
||
|
|
||
|
# return det(P)*det(U)
|
||
|
return det
|
||
|
|
||
|
|
||
|
def _minor(M, i, j, method="berkowitz"):
|
||
|
"""Return the (i,j) minor of ``M``. That is,
|
||
|
return the determinant of the matrix obtained by deleting
|
||
|
the `i`th row and `j`th column from ``M``.
|
||
|
|
||
|
Parameters
|
||
|
==========
|
||
|
|
||
|
i, j : int
|
||
|
The row and column to exclude to obtain the submatrix.
|
||
|
|
||
|
method : string, optional
|
||
|
Method to use to find the determinant of the submatrix, can be
|
||
|
"bareiss", "berkowitz" or "lu".
|
||
|
|
||
|
Examples
|
||
|
========
|
||
|
|
||
|
>>> from sympy import Matrix
|
||
|
>>> M = Matrix([[1, 2, 3], [4, 5, 6], [7, 8, 9]])
|
||
|
>>> M.minor(1, 1)
|
||
|
-12
|
||
|
|
||
|
See Also
|
||
|
========
|
||
|
|
||
|
minor_submatrix
|
||
|
cofactor
|
||
|
det
|
||
|
"""
|
||
|
|
||
|
if not M.is_square:
|
||
|
raise NonSquareMatrixError()
|
||
|
|
||
|
return M.minor_submatrix(i, j).det(method=method)
|
||
|
|
||
|
|
||
|
def _minor_submatrix(M, i, j):
|
||
|
"""Return the submatrix obtained by removing the `i`th row
|
||
|
and `j`th column from ``M`` (works with Pythonic negative indices).
|
||
|
|
||
|
Parameters
|
||
|
==========
|
||
|
|
||
|
i, j : int
|
||
|
The row and column to exclude to obtain the submatrix.
|
||
|
|
||
|
Examples
|
||
|
========
|
||
|
|
||
|
>>> from sympy import Matrix
|
||
|
>>> M = Matrix([[1, 2, 3], [4, 5, 6], [7, 8, 9]])
|
||
|
>>> M.minor_submatrix(1, 1)
|
||
|
Matrix([
|
||
|
[1, 3],
|
||
|
[7, 9]])
|
||
|
|
||
|
See Also
|
||
|
========
|
||
|
|
||
|
minor
|
||
|
cofactor
|
||
|
"""
|
||
|
|
||
|
if i < 0:
|
||
|
i += M.rows
|
||
|
if j < 0:
|
||
|
j += M.cols
|
||
|
|
||
|
if not 0 <= i < M.rows or not 0 <= j < M.cols:
|
||
|
raise ValueError("`i` and `j` must satisfy 0 <= i < ``M.rows`` "
|
||
|
"(%d)" % M.rows + "and 0 <= j < ``M.cols`` (%d)." % M.cols)
|
||
|
|
||
|
rows = [a for a in range(M.rows) if a != i]
|
||
|
cols = [a for a in range(M.cols) if a != j]
|
||
|
|
||
|
return M.extract(rows, cols)
|