ai-content-maker/.venv/Lib/site-packages/sympy/matrices/expressions/kronecker.py

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2024-05-03 04:18:51 +03:00
"""Implementation of the Kronecker product"""
from functools import reduce
from math import prod
from sympy.core import Mul, sympify
from sympy.functions import adjoint
from sympy.matrices.common import ShapeError
from sympy.matrices.expressions.matexpr import MatrixExpr
from sympy.matrices.expressions.transpose import transpose
from sympy.matrices.expressions.special import Identity
from sympy.matrices.matrices import MatrixBase
from sympy.strategies import (
canon, condition, distribute, do_one, exhaust, flatten, typed, unpack)
from sympy.strategies.traverse import bottom_up
from sympy.utilities import sift
from .matadd import MatAdd
from .matmul import MatMul
from .matpow import MatPow
def kronecker_product(*matrices):
"""
The Kronecker product of two or more arguments.
This computes the explicit Kronecker product for subclasses of
``MatrixBase`` i.e. explicit matrices. Otherwise, a symbolic
``KroneckerProduct`` object is returned.
Examples
========
For ``MatrixSymbol`` arguments a ``KroneckerProduct`` object is returned.
Elements of this matrix can be obtained by indexing, or for MatrixSymbols
with known dimension the explicit matrix can be obtained with
``.as_explicit()``
>>> from sympy import kronecker_product, MatrixSymbol
>>> A = MatrixSymbol('A', 2, 2)
>>> B = MatrixSymbol('B', 2, 2)
>>> kronecker_product(A)
A
>>> kronecker_product(A, B)
KroneckerProduct(A, B)
>>> kronecker_product(A, B)[0, 1]
A[0, 0]*B[0, 1]
>>> kronecker_product(A, B).as_explicit()
Matrix([
[A[0, 0]*B[0, 0], A[0, 0]*B[0, 1], A[0, 1]*B[0, 0], A[0, 1]*B[0, 1]],
[A[0, 0]*B[1, 0], A[0, 0]*B[1, 1], A[0, 1]*B[1, 0], A[0, 1]*B[1, 1]],
[A[1, 0]*B[0, 0], A[1, 0]*B[0, 1], A[1, 1]*B[0, 0], A[1, 1]*B[0, 1]],
[A[1, 0]*B[1, 0], A[1, 0]*B[1, 1], A[1, 1]*B[1, 0], A[1, 1]*B[1, 1]]])
For explicit matrices the Kronecker product is returned as a Matrix
>>> from sympy import Matrix, kronecker_product
>>> sigma_x = Matrix([
... [0, 1],
... [1, 0]])
...
>>> Isigma_y = Matrix([
... [0, 1],
... [-1, 0]])
...
>>> kronecker_product(sigma_x, Isigma_y)
Matrix([
[ 0, 0, 0, 1],
[ 0, 0, -1, 0],
[ 0, 1, 0, 0],
[-1, 0, 0, 0]])
See Also
========
KroneckerProduct
"""
if not matrices:
raise TypeError("Empty Kronecker product is undefined")
if len(matrices) == 1:
return matrices[0]
else:
return KroneckerProduct(*matrices).doit()
class KroneckerProduct(MatrixExpr):
"""
The Kronecker product of two or more arguments.
The Kronecker product is a non-commutative product of matrices.
Given two matrices of dimension (m, n) and (s, t) it produces a matrix
of dimension (m s, n t).
This is a symbolic object that simply stores its argument without
evaluating it. To actually compute the product, use the function
``kronecker_product()`` or call the ``.doit()`` or ``.as_explicit()``
methods.
>>> from sympy import KroneckerProduct, MatrixSymbol
>>> A = MatrixSymbol('A', 5, 5)
>>> B = MatrixSymbol('B', 5, 5)
>>> isinstance(KroneckerProduct(A, B), KroneckerProduct)
True
"""
is_KroneckerProduct = True
def __new__(cls, *args, check=True):
args = list(map(sympify, args))
if all(a.is_Identity for a in args):
ret = Identity(prod(a.rows for a in args))
if all(isinstance(a, MatrixBase) for a in args):
return ret.as_explicit()
else:
return ret
if check:
validate(*args)
return super().__new__(cls, *args)
@property
def shape(self):
rows, cols = self.args[0].shape
for mat in self.args[1:]:
rows *= mat.rows
cols *= mat.cols
return (rows, cols)
def _entry(self, i, j, **kwargs):
result = 1
for mat in reversed(self.args):
i, m = divmod(i, mat.rows)
j, n = divmod(j, mat.cols)
result *= mat[m, n]
return result
def _eval_adjoint(self):
return KroneckerProduct(*list(map(adjoint, self.args))).doit()
def _eval_conjugate(self):
return KroneckerProduct(*[a.conjugate() for a in self.args]).doit()
def _eval_transpose(self):
return KroneckerProduct(*list(map(transpose, self.args))).doit()
def _eval_trace(self):
from .trace import trace
return Mul(*[trace(a) for a in self.args])
def _eval_determinant(self):
from .determinant import det, Determinant
if not all(a.is_square for a in self.args):
return Determinant(self)
m = self.rows
return Mul(*[det(a)**(m/a.rows) for a in self.args])
def _eval_inverse(self):
try:
return KroneckerProduct(*[a.inverse() for a in self.args])
except ShapeError:
from sympy.matrices.expressions.inverse import Inverse
return Inverse(self)
def structurally_equal(self, other):
'''Determine whether two matrices have the same Kronecker product structure
Examples
========
>>> from sympy import KroneckerProduct, MatrixSymbol, symbols
>>> m, n = symbols(r'm, n', integer=True)
>>> A = MatrixSymbol('A', m, m)
>>> B = MatrixSymbol('B', n, n)
>>> C = MatrixSymbol('C', m, m)
>>> D = MatrixSymbol('D', n, n)
>>> KroneckerProduct(A, B).structurally_equal(KroneckerProduct(C, D))
True
>>> KroneckerProduct(A, B).structurally_equal(KroneckerProduct(D, C))
False
>>> KroneckerProduct(A, B).structurally_equal(C)
False
'''
# Inspired by BlockMatrix
return (isinstance(other, KroneckerProduct)
and self.shape == other.shape
and len(self.args) == len(other.args)
and all(a.shape == b.shape for (a, b) in zip(self.args, other.args)))
def has_matching_shape(self, other):
'''Determine whether two matrices have the appropriate structure to bring matrix
multiplication inside the KroneckerProdut
Examples
========
>>> from sympy import KroneckerProduct, MatrixSymbol, symbols
>>> m, n = symbols(r'm, n', integer=True)
>>> A = MatrixSymbol('A', m, n)
>>> B = MatrixSymbol('B', n, m)
>>> KroneckerProduct(A, B).has_matching_shape(KroneckerProduct(B, A))
True
>>> KroneckerProduct(A, B).has_matching_shape(KroneckerProduct(A, B))
False
>>> KroneckerProduct(A, B).has_matching_shape(A)
False
'''
return (isinstance(other, KroneckerProduct)
and self.cols == other.rows
and len(self.args) == len(other.args)
and all(a.cols == b.rows for (a, b) in zip(self.args, other.args)))
def _eval_expand_kroneckerproduct(self, **hints):
return flatten(canon(typed({KroneckerProduct: distribute(KroneckerProduct, MatAdd)}))(self))
def _kronecker_add(self, other):
if self.structurally_equal(other):
return self.__class__(*[a + b for (a, b) in zip(self.args, other.args)])
else:
return self + other
def _kronecker_mul(self, other):
if self.has_matching_shape(other):
return self.__class__(*[a*b for (a, b) in zip(self.args, other.args)])
else:
return self * other
def doit(self, **hints):
deep = hints.get('deep', True)
if deep:
args = [arg.doit(**hints) for arg in self.args]
else:
args = self.args
return canonicalize(KroneckerProduct(*args))
def validate(*args):
if not all(arg.is_Matrix for arg in args):
raise TypeError("Mix of Matrix and Scalar symbols")
# rules
def extract_commutative(kron):
c_part = []
nc_part = []
for arg in kron.args:
c, nc = arg.args_cnc()
c_part.extend(c)
nc_part.append(Mul._from_args(nc))
c_part = Mul(*c_part)
if c_part != 1:
return c_part*KroneckerProduct(*nc_part)
return kron
def matrix_kronecker_product(*matrices):
"""Compute the Kronecker product of a sequence of SymPy Matrices.
This is the standard Kronecker product of matrices [1].
Parameters
==========
matrices : tuple of MatrixBase instances
The matrices to take the Kronecker product of.
Returns
=======
matrix : MatrixBase
The Kronecker product matrix.
Examples
========
>>> from sympy import Matrix
>>> from sympy.matrices.expressions.kronecker import (
... matrix_kronecker_product)
>>> m1 = Matrix([[1,2],[3,4]])
>>> m2 = Matrix([[1,0],[0,1]])
>>> matrix_kronecker_product(m1, m2)
Matrix([
[1, 0, 2, 0],
[0, 1, 0, 2],
[3, 0, 4, 0],
[0, 3, 0, 4]])
>>> matrix_kronecker_product(m2, m1)
Matrix([
[1, 2, 0, 0],
[3, 4, 0, 0],
[0, 0, 1, 2],
[0, 0, 3, 4]])
References
==========
.. [1] https://en.wikipedia.org/wiki/Kronecker_product
"""
# Make sure we have a sequence of Matrices
if not all(isinstance(m, MatrixBase) for m in matrices):
raise TypeError(
'Sequence of Matrices expected, got: %s' % repr(matrices)
)
# Pull out the first element in the product.
matrix_expansion = matrices[-1]
# Do the kronecker product working from right to left.
for mat in reversed(matrices[:-1]):
rows = mat.rows
cols = mat.cols
# Go through each row appending kronecker product to.
# running matrix_expansion.
for i in range(rows):
start = matrix_expansion*mat[i*cols]
# Go through each column joining each item
for j in range(cols - 1):
start = start.row_join(
matrix_expansion*mat[i*cols + j + 1]
)
# If this is the first element, make it the start of the
# new row.
if i == 0:
next = start
else:
next = next.col_join(start)
matrix_expansion = next
MatrixClass = max(matrices, key=lambda M: M._class_priority).__class__
if isinstance(matrix_expansion, MatrixClass):
return matrix_expansion
else:
return MatrixClass(matrix_expansion)
def explicit_kronecker_product(kron):
# Make sure we have a sequence of Matrices
if not all(isinstance(m, MatrixBase) for m in kron.args):
return kron
return matrix_kronecker_product(*kron.args)
rules = (unpack,
explicit_kronecker_product,
flatten,
extract_commutative)
canonicalize = exhaust(condition(lambda x: isinstance(x, KroneckerProduct),
do_one(*rules)))
def _kronecker_dims_key(expr):
if isinstance(expr, KroneckerProduct):
return tuple(a.shape for a in expr.args)
else:
return (0,)
def kronecker_mat_add(expr):
args = sift(expr.args, _kronecker_dims_key)
nonkrons = args.pop((0,), None)
if not args:
return expr
krons = [reduce(lambda x, y: x._kronecker_add(y), group)
for group in args.values()]
if not nonkrons:
return MatAdd(*krons)
else:
return MatAdd(*krons) + nonkrons
def kronecker_mat_mul(expr):
# modified from block matrix code
factor, matrices = expr.as_coeff_matrices()
i = 0
while i < len(matrices) - 1:
A, B = matrices[i:i+2]
if isinstance(A, KroneckerProduct) and isinstance(B, KroneckerProduct):
matrices[i] = A._kronecker_mul(B)
matrices.pop(i+1)
else:
i += 1
return factor*MatMul(*matrices)
def kronecker_mat_pow(expr):
if isinstance(expr.base, KroneckerProduct) and all(a.is_square for a in expr.base.args):
return KroneckerProduct(*[MatPow(a, expr.exp) for a in expr.base.args])
else:
return expr
def combine_kronecker(expr):
"""Combine KronekeckerProduct with expression.
If possible write operations on KroneckerProducts of compatible shapes
as a single KroneckerProduct.
Examples
========
>>> from sympy.matrices.expressions import combine_kronecker
>>> from sympy import MatrixSymbol, KroneckerProduct, symbols
>>> m, n = symbols(r'm, n', integer=True)
>>> A = MatrixSymbol('A', m, n)
>>> B = MatrixSymbol('B', n, m)
>>> combine_kronecker(KroneckerProduct(A, B)*KroneckerProduct(B, A))
KroneckerProduct(A*B, B*A)
>>> combine_kronecker(KroneckerProduct(A, B)+KroneckerProduct(B.T, A.T))
KroneckerProduct(A + B.T, B + A.T)
>>> C = MatrixSymbol('C', n, n)
>>> D = MatrixSymbol('D', m, m)
>>> combine_kronecker(KroneckerProduct(C, D)**m)
KroneckerProduct(C**m, D**m)
"""
def haskron(expr):
return isinstance(expr, MatrixExpr) and expr.has(KroneckerProduct)
rule = exhaust(
bottom_up(exhaust(condition(haskron, typed(
{MatAdd: kronecker_mat_add,
MatMul: kronecker_mat_mul,
MatPow: kronecker_mat_pow})))))
result = rule(expr)
doit = getattr(result, 'doit', None)
if doit is not None:
return doit()
else:
return result