Current File : //lib/python3/dist-packages/sympy/tensor/array/expressions/array_expressions.py
import operator
from functools import reduce
import itertools
from itertools import accumulate
from typing import Optional, List, Dict
from sympy import Expr, ImmutableDenseNDimArray, S, Symbol, Integer, ZeroMatrix, Basic, tensorproduct, Add, permutedims, \
Tuple, tensordiagonal, Lambda, Dummy, Function, MatrixExpr, NDimArray, Indexed, IndexedBase, default_sort_key, \
tensorcontraction, diagonalize_vector, Mul
from sympy.matrices.expressions.matexpr import MatrixElement
from sympy.tensor.array.expressions.utils import _apply_recursively_over_nested_lists, _sort_contraction_indices, \
_get_mapping_from_subranks, _build_push_indices_up_func_transformation, _get_contraction_links, \
_build_push_indices_down_func_transformation
from sympy.combinatorics import Permutation
from sympy.combinatorics.permutations import _af_invert
from sympy.core.sympify import _sympify
class _ArrayExpr(Expr):
pass
class ArraySymbol(_ArrayExpr):
"""
Symbol representing an array expression
"""
def __new__(cls, symbol, *shape):
if isinstance(symbol, str):
symbol = Symbol(symbol)
# symbol = _sympify(symbol)
shape = map(_sympify, shape)
obj = Expr.__new__(cls, symbol, *shape)
return obj
@property
def name(self):
return self._args[0]
@property
def shape(self):
return self._args[1:]
def __getitem__(self, item):
return ArrayElement(self, item)
def as_explicit(self):
if any(not isinstance(i, (int, Integer)) for i in self.shape):
raise ValueError("cannot express explicit array with symbolic shape")
data = [self[i] for i in itertools.product(*[range(j) for j in self.shape])]
return ImmutableDenseNDimArray(data).reshape(*self.shape)
class ArrayElement(_ArrayExpr):
"""
An element of an array.
"""
def __new__(cls, name, indices):
if isinstance(name, str):
name = Symbol(name)
name = _sympify(name)
indices = _sympify(indices)
if hasattr(name, "shape"):
if any([(i >= s) == True for i, s in zip(indices, name.shape)]):
raise ValueError("shape is out of bounds")
if any([(i < 0) == True for i in indices]):
raise ValueError("shape contains negative values")
obj = Expr.__new__(cls, name, indices)
return obj
@property
def name(self):
return self._args[0]
@property
def indices(self):
return self._args[1]
class ZeroArray(_ArrayExpr):
"""
Symbolic array of zeros. Equivalent to ``ZeroMatrix`` for matrices.
"""
def __new__(cls, *shape):
if len(shape) == 0:
return S.Zero
shape = map(_sympify, shape)
obj = Expr.__new__(cls, *shape)
return obj
@property
def shape(self):
return self._args
def as_explicit(self):
if any(not i.is_Integer for i in self.shape):
raise ValueError("Cannot return explicit form for symbolic shape.")
return ImmutableDenseNDimArray.zeros(*self.shape)
class OneArray(_ArrayExpr):
"""
Symbolic array of ones.
"""
def __new__(cls, *shape):
if len(shape) == 0:
return S.One
shape = map(_sympify, shape)
obj = Expr.__new__(cls, *shape)
return obj
@property
def shape(self):
return self._args
def as_explicit(self):
if any(not i.is_Integer for i in self.shape):
raise ValueError("Cannot return explicit form for symbolic shape.")
return ImmutableDenseNDimArray([S.One for i in range(reduce(operator.mul, self.shape))]).reshape(*self.shape)
class _CodegenArrayAbstract(Basic):
@property
def subranks(self):
"""
Returns the ranks of the objects in the uppermost tensor product inside
the current object. In case no tensor products are contained, return
the atomic ranks.
Examples
========
>>> from sympy.tensor.array.expressions.array_expressions import ArrayTensorProduct, ArrayContraction
>>> from sympy import MatrixSymbol
>>> M = MatrixSymbol("M", 3, 3)
>>> N = MatrixSymbol("N", 3, 3)
>>> P = MatrixSymbol("P", 3, 3)
Important: do not confuse the rank of the matrix with the rank of an array.
>>> tp = ArrayTensorProduct(M, N, P)
>>> tp.subranks
[2, 2, 2]
>>> co = ArrayContraction(tp, (1, 2), (3, 4))
>>> co.subranks
[2, 2, 2]
"""
return self._subranks[:]
def subrank(self):
"""
The sum of ``subranks``.
"""
return sum(self.subranks)
@property
def shape(self):
return self._shape
class ArrayTensorProduct(_CodegenArrayAbstract):
r"""
Class to represent the tensor product of array-like objects.
"""
def __new__(cls, *args):
args = [_sympify(arg) for arg in args]
args = cls._flatten(args)
ranks = [get_rank(arg) for arg in args]
# Check if there are nested permutation and lift them up:
permutation_cycles = []
for i, arg in enumerate(args):
if not isinstance(arg, PermuteDims):
continue
permutation_cycles.extend([[k + sum(ranks[:i]) for k in j] for j in arg.permutation.cyclic_form])
args[i] = arg.expr
if permutation_cycles:
return PermuteDims(ArrayTensorProduct(*args), Permutation(sum(ranks)-1)*Permutation(permutation_cycles))
if len(args) == 1:
return args[0]
# If any object is a ZeroArray, return a ZeroArray:
if any(isinstance(arg, (ZeroArray, ZeroMatrix)) for arg in args):
shapes = reduce(operator.add, [get_shape(i) for i in args], ())
return ZeroArray(*shapes)
# If there are contraction objects inside, transform the whole
# expression into `ArrayContraction`:
contractions = {i: arg for i, arg in enumerate(args) if isinstance(arg, ArrayContraction)}
if contractions:
ranks = [_get_subrank(arg) if isinstance(arg, ArrayContraction) else get_rank(arg) for arg in args]
cumulative_ranks = list(accumulate([0] + ranks))[:-1]
tp = cls(*[arg.expr if isinstance(arg, ArrayContraction) else arg for arg in args])
contraction_indices = [tuple(cumulative_ranks[i] + k for k in j) for i, arg in contractions.items() for j in arg.contraction_indices]
return ArrayContraction(tp, *contraction_indices)
diagonals = {i: arg for i, arg in enumerate(args) if isinstance(arg, ArrayDiagonal)}
if diagonals:
permutation = []
last_perm = []
ranks = [get_rank(arg) for arg in args]
cumulative_ranks = list(accumulate([0] + ranks))[:-1]
for i, arg in enumerate(args):
if isinstance(arg, ArrayDiagonal):
i1 = get_rank(arg) - len(arg.diagonal_indices)
i2 = len(arg.diagonal_indices)
permutation.extend([cumulative_ranks[i] + j for j in range(i1)])
last_perm.extend([cumulative_ranks[i] + j for j in range(i1, i1 + i2)])
else:
permutation.extend([cumulative_ranks[i] + j for j in range(get_rank(arg))])
permutation.extend(last_perm)
tp = cls(*[arg.expr if isinstance(arg, ArrayDiagonal) else arg for arg in args])
ranks2 = [_get_subrank(arg) if isinstance(arg, ArrayDiagonal) else get_rank(arg) for arg in args]
cumulative_ranks2 = list(accumulate([0] + ranks2))[:-1]
diagonal_indices = [tuple(cumulative_ranks2[i] + k for k in j) for i, arg in diagonals.items() for j in arg.diagonal_indices]
return PermuteDims(ArrayDiagonal(tp, *diagonal_indices), permutation)
obj = Basic.__new__(cls, *args)
obj._subranks = ranks
shapes = [get_shape(i) for i in args]
if any(i is None for i in shapes):
obj._shape = None
else:
obj._shape = tuple(j for i in shapes for j in i)
return obj
@classmethod
def _flatten(cls, args):
args = [i for arg in args for i in (arg.args if isinstance(arg, cls) else [arg])]
return args
def as_explicit(self):
return tensorproduct(*[arg.as_explicit() if hasattr(arg, "as_explicit") else arg for arg in self.args])
class ArrayAdd(_CodegenArrayAbstract):
r"""
Class for elementwise array additions.
"""
def __new__(cls, *args):
args = [_sympify(arg) for arg in args]
ranks = [get_rank(arg) for arg in args]
ranks = list(set(ranks))
if len(ranks) != 1:
raise ValueError("summing arrays of different ranks")
shapes = [arg.shape for arg in args]
if len({i for i in shapes if i is not None}) > 1:
raise ValueError("mismatching shapes in addition")
# Flatten:
args = cls._flatten_args(args)
args = [arg for arg in args if not isinstance(arg, (ZeroArray, ZeroMatrix))]
if len(args) == 0:
if any(i for i in shapes if i is None):
raise NotImplementedError("cannot handle addition of ZeroMatrix/ZeroArray and undefined shape object")
return ZeroArray(*shapes[0])
elif len(args) == 1:
return args[0]
obj = Basic.__new__(cls, *args)
obj._subranks = ranks
if any(i is None for i in shapes):
obj._shape = None
else:
obj._shape = shapes[0]
return obj
@classmethod
def _flatten_args(cls, args):
new_args = []
for arg in args:
if isinstance(arg, ArrayAdd):
new_args.extend(arg.args)
else:
new_args.append(arg)
return new_args
def as_explicit(self):
return Add.fromiter([arg.as_explicit() for arg in self.args])
class PermuteDims(_CodegenArrayAbstract):
r"""
Class to represent permutation of axes of arrays.
Examples
========
>>> from sympy.tensor.array.expressions.array_expressions import PermuteDims
>>> from sympy import MatrixSymbol
>>> M = MatrixSymbol("M", 3, 3)
>>> cg = PermuteDims(M, [1, 0])
The object ``cg`` represents the transposition of ``M``, as the permutation
``[1, 0]`` will act on its indices by switching them:
`M_{ij} \Rightarrow M_{ji}`
This is evident when transforming back to matrix form:
>>> from sympy.tensor.array.expressions.conv_array_to_matrix import convert_array_to_matrix
>>> convert_array_to_matrix(cg)
M.T
>>> N = MatrixSymbol("N", 3, 2)
>>> cg = PermuteDims(N, [1, 0])
>>> cg.shape
(2, 3)
Permutations of tensor products are simplified in order to achieve a
standard form:
>>> from sympy.tensor.array.expressions.array_expressions import ArrayTensorProduct
>>> M = MatrixSymbol("M", 4, 5)
>>> tp = ArrayTensorProduct(M, N)
>>> tp.shape
(4, 5, 3, 2)
>>> perm1 = PermuteDims(tp, [2, 3, 1, 0])
The args ``(M, N)`` have been sorted and the permutation has been
simplified, the expression is equivalent:
>>> perm1.expr.args
(N, M)
>>> perm1.shape
(3, 2, 5, 4)
>>> perm1.permutation
(2 3)
The permutation in its array form has been simplified from
``[2, 3, 1, 0]`` to ``[0, 1, 3, 2]``, as the arguments of the tensor
product `M` and `N` have been switched:
>>> perm1.permutation.array_form
[0, 1, 3, 2]
We can nest a second permutation:
>>> perm2 = PermuteDims(perm1, [1, 0, 2, 3])
>>> perm2.shape
(2, 3, 5, 4)
>>> perm2.permutation.array_form
[1, 0, 3, 2]
"""
def __new__(cls, expr, permutation, nest_permutation=True):
from sympy.combinatorics import Permutation
expr = _sympify(expr)
permutation = Permutation(permutation)
permutation_size = permutation.size
expr_rank = get_rank(expr)
if permutation_size != expr_rank:
raise ValueError("Permutation size must be the length of the shape of expr")
if isinstance(expr, PermuteDims):
subexpr = expr.expr
subperm = expr.permutation
permutation = permutation * subperm
expr = subexpr
if isinstance(expr, ArrayContraction):
expr, permutation = cls._handle_nested_contraction(expr, permutation)
if isinstance(expr, ArrayTensorProduct):
expr, permutation = cls._sort_components(expr, permutation)
if isinstance(expr, (ZeroArray, ZeroMatrix)):
return ZeroArray(*[expr.shape[i] for i in permutation.array_form])
plist = permutation.array_form
if plist == sorted(plist):
return expr
obj = Basic.__new__(cls, expr, permutation)
obj._subranks = [get_rank(expr)]
shape = expr.shape
if shape is None:
obj._shape = None
else:
obj._shape = tuple(shape[permutation(i)] for i in range(len(shape)))
return obj
@property
def expr(self):
return self.args[0]
@property
def permutation(self):
return self.args[1]
@classmethod
def _sort_components(cls, expr, permutation):
# Get the permutation in its image-form:
perm_image_form = _af_invert(permutation.array_form)
args = list(expr.args)
# Starting index global position for every arg:
cumul = list(accumulate([0] + expr.subranks))
# Split `perm_image_form` into a list of list corresponding to the indices
# of every argument:
perm_image_form_in_components = [perm_image_form[cumul[i]:cumul[i+1]] for i in range(len(args))]
# Create an index, target-position-key array:
ps = [(i, sorted(comp)) for i, comp in enumerate(perm_image_form_in_components)]
# Sort the array according to the target-position-key:
# In this way, we define a canonical way to sort the arguments according
# to the permutation.
ps.sort(key=lambda x: x[1])
# Read the inverse-permutation (i.e. image-form) of the args:
perm_args_image_form = [i[0] for i in ps]
# Apply the args-permutation to the `args`:
args_sorted = [args[i] for i in perm_args_image_form]
# Apply the args-permutation to the array-form of the permutation of the axes (of `expr`):
perm_image_form_sorted_args = [perm_image_form_in_components[i] for i in perm_args_image_form]
new_permutation = Permutation(_af_invert([j for i in perm_image_form_sorted_args for j in i]))
return ArrayTensorProduct(*args_sorted), new_permutation
@classmethod
def _handle_nested_contraction(cls, expr, permutation):
if not isinstance(expr, ArrayContraction):
return expr, permutation
if not isinstance(expr.expr, ArrayTensorProduct):
return expr, permutation
args = expr.expr.args
subranks = [get_rank(arg) for arg in expr.expr.args]
contraction_indices = expr.contraction_indices
contraction_indices_flat = [j for i in contraction_indices for j in i]
cumul = list(accumulate([0] + subranks))
# Spread the permutation in its array form across the args in the corresponding
# tensor-product arguments with free indices:
permutation_array_blocks_up = []
image_form = _af_invert(permutation.array_form)
counter = 0
for i, e in enumerate(subranks):
current = []
for j in range(cumul[i], cumul[i+1]):
if j in contraction_indices_flat:
continue
current.append(image_form[counter])
counter += 1
permutation_array_blocks_up.append(current)
# Get the map of axis repositioning for every argument of tensor-product:
index_blocks = [[j for j in range(cumul[i], cumul[i+1])] for i, e in enumerate(expr.subranks)]
index_blocks_up = expr._push_indices_up(expr.contraction_indices, index_blocks)
inverse_permutation = permutation**(-1)
index_blocks_up_permuted = [[inverse_permutation(j) for j in i if j is not None] for i in index_blocks_up]
# Sorting key is a list of tuple, first element is the index of `args`, second element of
# the tuple is the sorting key to sort `args` of the tensor product:
sorting_keys = list(enumerate(index_blocks_up_permuted))
sorting_keys.sort(key=lambda x: x[1])
# Now we can get the permutation acting on the args in its image-form:
new_perm_image_form = [i[0] for i in sorting_keys]
# Apply the args-level permutation to various elements:
new_index_blocks = [index_blocks[i] for i in new_perm_image_form]
new_index_perm_array_form = _af_invert([j for i in new_index_blocks for j in i])
new_args = [args[i] for i in new_perm_image_form]
new_contraction_indices = [tuple(new_index_perm_array_form[j] for j in i) for i in contraction_indices]
new_expr = ArrayContraction(ArrayTensorProduct(*new_args), *new_contraction_indices)
new_permutation = Permutation(_af_invert([j for i in [permutation_array_blocks_up[k] for k in new_perm_image_form] for j in i]))
return new_expr, new_permutation
@classmethod
def _check_permutation_mapping(cls, expr, permutation):
subranks = expr.subranks
index2arg = [i for i, arg in enumerate(expr.args) for j in range(expr.subranks[i])]
permuted_indices = [permutation(i) for i in range(expr.subrank())]
new_args = list(expr.args)
arg_candidate_index = index2arg[permuted_indices[0]]
current_indices = []
new_permutation = []
inserted_arg_cand_indices = set([])
for i, idx in enumerate(permuted_indices):
if index2arg[idx] != arg_candidate_index:
new_permutation.extend(current_indices)
current_indices = []
arg_candidate_index = index2arg[idx]
current_indices.append(idx)
arg_candidate_rank = subranks[arg_candidate_index]
if len(current_indices) == arg_candidate_rank:
new_permutation.extend(sorted(current_indices))
local_current_indices = [j - min(current_indices) for j in current_indices]
i1 = index2arg[i]
new_args[i1] = PermuteDims(new_args[i1], Permutation(local_current_indices))
inserted_arg_cand_indices.add(arg_candidate_index)
current_indices = []
new_permutation.extend(current_indices)
# TODO: swap args positions in order to simplify the expression:
# TODO: this should be in a function
args_positions = list(range(len(new_args)))
# Get possible shifts:
maps = {}
cumulative_subranks = [0] + list(accumulate(subranks))
for i in range(0, len(subranks)):
s = set([index2arg[new_permutation[j]] for j in range(cumulative_subranks[i], cumulative_subranks[i+1])])
if len(s) != 1:
continue
elem = next(iter(s))
if i != elem:
maps[i] = elem
# Find cycles in the map:
lines = []
current_line = []
while maps:
if len(current_line) == 0:
k, v = maps.popitem()
current_line.append(k)
else:
k = current_line[-1]
if k not in maps:
current_line = []
continue
v = maps.pop(k)
if v in current_line:
lines.append(current_line)
current_line = []
continue
current_line.append(v)
for line in lines:
for i, e in enumerate(line):
args_positions[line[(i + 1) % len(line)]] = e
# TODO: function in order to permute the args:
permutation_blocks = [[new_permutation[cumulative_subranks[i] + j] for j in range(e)] for i, e in enumerate(subranks)]
new_args = [new_args[i] for i in args_positions]
new_permutation_blocks = [permutation_blocks[i] for i in args_positions]
new_permutation2 = [j for i in new_permutation_blocks for j in i]
return ArrayTensorProduct(*new_args), Permutation(new_permutation2) # **(-1)
@classmethod
def _check_if_there_are_closed_cycles(cls, expr, permutation):
args = list(expr.args)
subranks = expr.subranks
cyclic_form = permutation.cyclic_form
cumulative_subranks = [0] + list(accumulate(subranks))
cyclic_min = [min(i) for i in cyclic_form]
cyclic_max = [max(i) for i in cyclic_form]
cyclic_keep = []
for i, cycle in enumerate(cyclic_form):
flag = True
for j in range(0, len(cumulative_subranks) - 1):
if cyclic_min[i] >= cumulative_subranks[j] and cyclic_max[i] < cumulative_subranks[j+1]:
# Found a sinkable cycle.
args[j] = PermuteDims(args[j], Permutation([[k - cumulative_subranks[j] for k in cyclic_form[i]]]))
flag = False
break
if flag:
cyclic_keep.append(cyclic_form[i])
return ArrayTensorProduct(*args), Permutation(cyclic_keep, size=permutation.size)
def nest_permutation(self):
r"""
DEPRECATED.
"""
ret = self._nest_permutation(self.expr, self.permutation)
if ret is None:
return self
return ret
@classmethod
def _nest_permutation(cls, expr, permutation):
if isinstance(expr, ArrayTensorProduct):
return PermuteDims(*cls._check_if_there_are_closed_cycles(expr, permutation))
elif isinstance(expr, ArrayContraction):
# Invert tree hierarchy: put the contraction above.
cycles = permutation.cyclic_form
newcycles = ArrayContraction._convert_outer_indices_to_inner_indices(expr, *cycles)
newpermutation = Permutation(newcycles)
new_contr_indices = [tuple(newpermutation(j) for j in i) for i in expr.contraction_indices]
return ArrayContraction(PermuteDims(expr.expr, newpermutation), *new_contr_indices)
elif isinstance(expr, ArrayAdd):
return ArrayAdd(*[PermuteDims(arg, permutation) for arg in expr.args])
return None
def as_explicit(self):
return permutedims(self.expr.as_explicit(), self.permutation)
class ArrayDiagonal(_CodegenArrayAbstract):
r"""
Class to represent the diagonal operator.
Explanation
===========
In a 2-dimensional array it returns the diagonal, this looks like the
operation:
`A_{ij} \rightarrow A_{ii}`
The diagonal over axes 1 and 2 (the second and third) of the tensor product
of two 2-dimensional arrays `A \otimes B` is
`\Big[ A_{ab} B_{cd} \Big]_{abcd} \rightarrow \Big[ A_{ai} B_{id} \Big]_{adi}`
In this last example the array expression has been reduced from
4-dimensional to 3-dimensional. Notice that no contraction has occurred,
rather there is a new index `i` for the diagonal, contraction would have
reduced the array to 2 dimensions.
Notice that the diagonalized out dimensions are added as new dimensions at
the end of the indices.
"""
def __new__(cls, expr, *diagonal_indices):
expr = _sympify(expr)
diagonal_indices = [Tuple(*sorted(i)) for i in diagonal_indices]
if isinstance(expr, ArrayAdd):
return ArrayAdd(*[ArrayDiagonal(arg, *diagonal_indices) for arg in expr.args])
if isinstance(expr, ArrayDiagonal):
return cls._flatten(expr, *diagonal_indices)
if isinstance(expr, PermuteDims):
return cls._handle_nested_permutedims_in_diag(expr, *diagonal_indices)
shape = get_shape(expr)
if shape is not None:
cls._validate(expr, *diagonal_indices)
# Get new shape:
positions, shape = cls._get_positions_shape(shape, diagonal_indices)
else:
positions = None
if len(diagonal_indices) == 0:
return expr
if isinstance(expr, (ZeroArray, ZeroMatrix)):
return ZeroArray(*shape)
obj = Basic.__new__(cls, expr, *diagonal_indices)
obj._positions = positions
obj._subranks = _get_subranks(expr)
obj._shape = shape
return obj
@staticmethod
def _validate(expr, *diagonal_indices):
# Check that no diagonalization happens on indices with mismatched
# dimensions:
shape = get_shape(expr)
for i in diagonal_indices:
if len({shape[j] for j in i}) != 1:
raise ValueError("diagonalizing indices of different dimensions")
if len(i) <= 1:
raise ValueError("need at least two axes to diagonalize")
@staticmethod
def _remove_trivial_dimensions(shape, *diagonal_indices):
return [tuple(j for j in i) for i in diagonal_indices if shape[i[0]] != 1]
@property
def expr(self):
return self.args[0]
@property
def diagonal_indices(self):
return self.args[1:]
@staticmethod
def _flatten(expr, *outer_diagonal_indices):
inner_diagonal_indices = expr.diagonal_indices
all_inner = [j for i in inner_diagonal_indices for j in i]
all_inner.sort()
# TODO: add API for total rank and cumulative rank:
total_rank = _get_subrank(expr)
inner_rank = len(all_inner)
outer_rank = total_rank - inner_rank
shifts = [0 for i in range(outer_rank)]
counter = 0
pointer = 0
for i in range(outer_rank):
while pointer < inner_rank and counter >= all_inner[pointer]:
counter += 1
pointer += 1
shifts[i] += pointer
counter += 1
outer_diagonal_indices = tuple(tuple(shifts[j] + j for j in i) for i in outer_diagonal_indices)
diagonal_indices = inner_diagonal_indices + outer_diagonal_indices
return ArrayDiagonal(expr.expr, *diagonal_indices)
@classmethod
def _handle_nested_permutedims_in_diag(cls, expr: PermuteDims, *diagonal_indices):
back_diagonal_indices = [[expr.permutation(j) for j in i] for i in diagonal_indices]
nondiag = [i for i in range(get_rank(expr)) if not any(i in j for j in diagonal_indices)]
back_nondiag = [expr.permutation(i) for i in nondiag]
remap = {e: i for i, e in enumerate(sorted(back_nondiag))}
new_permutation1 = [remap[i] for i in back_nondiag]
shift = len(new_permutation1)
diag_block_perm = [i + shift for i in range(len(back_diagonal_indices))]
new_permutation = new_permutation1 + diag_block_perm
return PermuteDims(
ArrayDiagonal(
expr.expr,
*back_diagonal_indices
),
new_permutation
)
def _push_indices_down_nonstatic(self, indices):
transform = lambda x: self._positions[x] if x < len(self._positions) else None
return _apply_recursively_over_nested_lists(transform, indices)
def _push_indices_up_nonstatic(self, indices):
def transform(x):
for i, e in enumerate(self._positions):
if (isinstance(e, int) and x == e) or (isinstance(e, tuple) and x in e):
return i
return _apply_recursively_over_nested_lists(transform, indices)
@classmethod
def _push_indices_down(cls, diagonal_indices, indices, rank):
positions, shape = cls._get_positions_shape(range(rank), diagonal_indices)
transform = lambda x: positions[x] if x < len(positions) else None
return _apply_recursively_over_nested_lists(transform, indices)
@classmethod
def _push_indices_up(cls, diagonal_indices, indices, rank):
positions, shape = cls._get_positions_shape(range(rank), diagonal_indices)
def transform(x):
for i, e in enumerate(positions):
if (isinstance(e, int) and x == e) or (isinstance(e, (tuple, Tuple)) and (x in e)):
return i
return _apply_recursively_over_nested_lists(transform, indices)
@classmethod
def _get_positions_shape(cls, shape, diagonal_indices):
data1 = tuple((i, shp) for i, shp in enumerate(shape) if not any(i in j for j in diagonal_indices))
pos1, shp1 = zip(*data1) if data1 else ((), ())
data2 = tuple((i, shape[i[0]]) for i in diagonal_indices)
pos2, shp2 = zip(*data2) if data2 else ((), ())
positions = pos1 + pos2
shape = shp1 + shp2
return positions, shape
def as_explicit(self):
return tensordiagonal(self.expr.as_explicit(), *self.diagonal_indices)
class ArrayElementwiseApplyFunc(_CodegenArrayAbstract):
def __new__(cls, function, element):
if not isinstance(function, Lambda):
d = Dummy('d')
function = Lambda(d, function(d))
obj = _CodegenArrayAbstract.__new__(cls, function, element)
obj._subranks = _get_subranks(element)
return obj
@property
def function(self):
return self.args[0]
@property
def expr(self):
return self.args[1]
@property
def shape(self):
return self.expr.shape
def _get_function_fdiff(self):
d = Dummy("d")
function = self.function(d)
fdiff = function.diff(d)
if isinstance(fdiff, Function):
fdiff = type(fdiff)
else:
fdiff = Lambda(d, fdiff)
return fdiff
class ArrayContraction(_CodegenArrayAbstract):
r"""
This class is meant to represent contractions of arrays in a form easily
processable by the code printers.
"""
def __new__(cls, expr, *contraction_indices, **kwargs):
contraction_indices = _sort_contraction_indices(contraction_indices)
expr = _sympify(expr)
if len(contraction_indices) == 0:
return expr
if isinstance(expr, ArrayContraction):
return cls._flatten(expr, *contraction_indices)
if isinstance(expr, (ZeroArray, ZeroMatrix)):
contraction_indices_flat = [j for i in contraction_indices for j in i]
shape = [e for i, e in enumerate(expr.shape) if i not in contraction_indices_flat]
return ZeroArray(*shape)
if isinstance(expr, PermuteDims):
return cls._handle_nested_permute_dims(expr, *contraction_indices)
if isinstance(expr, ArrayTensorProduct):
expr, contraction_indices = cls._sort_fully_contracted_args(expr, contraction_indices)
expr, contraction_indices = cls._lower_contraction_to_addends(expr, contraction_indices)
if len(contraction_indices) == 0:
return expr
if isinstance(expr, ArrayDiagonal):
return cls._handle_nested_diagonal(expr, *contraction_indices)
if isinstance(expr, ArrayAdd):
return ArrayAdd(*[ArrayContraction(i, *contraction_indices) for i in expr.args])
obj = Basic.__new__(cls, expr, *contraction_indices)
obj._subranks = _get_subranks(expr)
obj._mapping = _get_mapping_from_subranks(obj._subranks)
free_indices_to_position = {i: i for i in range(sum(obj._subranks)) if all([i not in cind for cind in contraction_indices])}
obj._free_indices_to_position = free_indices_to_position
shape = expr.shape
cls._validate(expr, *contraction_indices)
if shape:
shape = tuple(shp for i, shp in enumerate(shape) if not any(i in j for j in contraction_indices))
obj._shape = shape
return obj
def __mul__(self, other):
if other == 1:
return self
else:
raise NotImplementedError("Product of N-dim arrays is not uniquely defined. Use another method.")
def __rmul__(self, other):
if other == 1:
return self
else:
raise NotImplementedError("Product of N-dim arrays is not uniquely defined. Use another method.")
@staticmethod
def _validate(expr, *contraction_indices):
shape = expr.shape
if shape is None:
return
# Check that no contraction happens when the shape is mismatched:
for i in contraction_indices:
if len({shape[j] for j in i if shape[j] != -1}) != 1:
raise ValueError("contracting indices of different dimensions")
@classmethod
def _push_indices_down(cls, contraction_indices, indices):
flattened_contraction_indices = [j for i in contraction_indices for j in i]
flattened_contraction_indices.sort()
transform = _build_push_indices_down_func_transformation(flattened_contraction_indices)
return _apply_recursively_over_nested_lists(transform, indices)
@classmethod
def _push_indices_up(cls, contraction_indices, indices):
flattened_contraction_indices = [j for i in contraction_indices for j in i]
flattened_contraction_indices.sort()
transform = _build_push_indices_up_func_transformation(flattened_contraction_indices)
return _apply_recursively_over_nested_lists(transform, indices)
@classmethod
def _lower_contraction_to_addends(cls, expr, contraction_indices):
if isinstance(expr, ArrayAdd):
raise NotImplementedError()
if not isinstance(expr, ArrayTensorProduct):
return expr, contraction_indices
subranks = expr.subranks
cumranks = list(accumulate([0] + subranks))
contraction_indices_remaining = []
contraction_indices_args = [[] for i in expr.args]
backshift = set([])
for i, contraction_group in enumerate(contraction_indices):
for j in range(len(expr.args)):
if not isinstance(expr.args[j], ArrayAdd):
continue
if all(cumranks[j] <= k < cumranks[j+1] for k in contraction_group):
contraction_indices_args[j].append([k - cumranks[j] for k in contraction_group])
backshift.update(contraction_group)
break
else:
contraction_indices_remaining.append(contraction_group)
if len(contraction_indices_remaining) == len(contraction_indices):
return expr, contraction_indices
total_rank = get_rank(expr)
shifts = list(accumulate([1 if i in backshift else 0 for i in range(total_rank)]))
contraction_indices_remaining = [Tuple.fromiter(j - shifts[j] for j in i) for i in contraction_indices_remaining]
ret = ArrayTensorProduct(*[
ArrayContraction(arg, *contr) for arg, contr in zip(expr.args, contraction_indices_args)
])
return ret, contraction_indices_remaining
def split_multiple_contractions(self):
"""
Recognize multiple contractions and attempt at rewriting them as paired-contractions.
This allows some contractions involving more than two indices to be
rewritten as multiple contractions involving two indices, thus allowing
the expression to be rewritten as a matrix multiplication line.
Examples:
* `A_ij b_j0 C_jk` ===> `A*DiagMatrix(b)*C`
Care for:
- matrix being diagonalized (i.e. `A_ii`)
- vectors being diagonalized (i.e. `a_i0`)
Multiple contractions can be split into matrix multiplications if
not more than two arguments are non-diagonals or non-vectors.
Vectors get diagonalized while diagonal matrices remain diagonal.
The non-diagonal matrices can be at the beginning or at the end
of the final matrix multiplication line.
"""
from sympy import ask, Q
editor = _EditArrayContraction(self)
contraction_indices = self.contraction_indices
if isinstance(self.expr, ArrayTensorProduct):
args = list(self.expr.args)
else:
args = [self.expr]
# TODO: unify API, best location in ArrayTensorProduct
subranks = [get_rank(i) for i in args]
# TODO: unify API
mapping = _get_mapping_from_subranks(subranks)
reverse_mapping = {v: k for k, v in mapping.items()}
for indl, links in enumerate(contraction_indices):
if len(links) <= 2:
continue
positions = editor.get_mapping_for_index(indl)
# Also consider the case of diagonal matrices being contracted:
current_dimension = self.expr.shape[links[0]]
not_vectors: Tuple[_ArgE, int] = []
vectors: Tuple[_ArgE, int] = []
for arg_ind, rel_ind in positions:
mat = args[arg_ind]
other_arg_pos = 1-rel_ind
other_arg_abs = reverse_mapping[arg_ind, other_arg_pos]
arg = editor.args_with_ind[arg_ind]
if (((1 not in mat.shape) and (not ask(Q.diagonal(mat)))) or
((current_dimension == 1) is True and mat.shape != (1, 1)) or
any([other_arg_abs in l for li, l in enumerate(contraction_indices) if li != indl])
):
not_vectors.append((arg, rel_ind))
else:
vectors.append((arg, rel_ind))
if len(not_vectors) > 2:
# If more than two arguments in the multiple contraction are
# non-vectors and non-diagonal matrices, we cannot find a way
# to split this contraction into a matrix multiplication line:
continue
# Three cases to handle:
# - zero non-vectors
# - one non-vector
# - two non-vectors
for v, rel_ind in vectors:
v.element = diagonalize_vector(v.element)
vectors_to_loop = not_vectors[:1] + vectors + not_vectors[1:]
first_not_vector, rel_ind = vectors_to_loop[0]
new_index = first_not_vector.indices[rel_ind]
for v, rel_ind in vectors_to_loop[1:-1]:
v.indices[rel_ind] = new_index
new_index = editor.get_new_contraction_index()
assert v.indices.index(None) == 1 - rel_ind
v.indices[v.indices.index(None)] = new_index
last_vec, rel_ind = vectors_to_loop[-1]
last_vec.indices[rel_ind] = new_index
return editor.to_array_contraction()
def flatten_contraction_of_diagonal(self):
if not isinstance(self.expr, ArrayDiagonal):
return self
contraction_down = self.expr._push_indices_down(self.expr.diagonal_indices, self.contraction_indices)
new_contraction_indices = []
diagonal_indices = self.expr.diagonal_indices[:]
for i in contraction_down:
contraction_group = list(i)
for j in i:
diagonal_with = [k for k in diagonal_indices if j in k]
contraction_group.extend([l for k in diagonal_with for l in k])
diagonal_indices = [k for k in diagonal_indices if k not in diagonal_with]
new_contraction_indices.append(sorted(set(contraction_group)))
new_contraction_indices = ArrayDiagonal._push_indices_up(diagonal_indices, new_contraction_indices)
return ArrayContraction(
ArrayDiagonal(
self.expr.expr,
*diagonal_indices
),
*new_contraction_indices
)
@staticmethod
def _get_free_indices_to_position_map(free_indices, contraction_indices):
free_indices_to_position = {}
flattened_contraction_indices = [j for i in contraction_indices for j in i]
counter = 0
for ind in free_indices:
while counter in flattened_contraction_indices:
counter += 1
free_indices_to_position[ind] = counter
counter += 1
return free_indices_to_position
@staticmethod
def _get_index_shifts(expr):
"""
Get the mapping of indices at the positions before the contraction
occurs.
Examples
========
>>> from sympy.tensor.array.expressions.array_expressions import ArrayTensorProduct
>>> from sympy.tensor.array.expressions.array_expressions import ArrayContraction
>>> from sympy import MatrixSymbol
>>> M = MatrixSymbol("M", 3, 3)
>>> N = MatrixSymbol("N", 3, 3)
>>> cg = ArrayContraction(ArrayTensorProduct(M, N), [1, 2])
>>> cg._get_index_shifts(cg)
[0, 2]
Indeed, ``cg`` after the contraction has two dimensions, 0 and 1. They
need to be shifted by 0 and 2 to get the corresponding positions before
the contraction (that is, 0 and 3).
"""
inner_contraction_indices = expr.contraction_indices
all_inner = [j for i in inner_contraction_indices for j in i]
all_inner.sort()
# TODO: add API for total rank and cumulative rank:
total_rank = _get_subrank(expr)
inner_rank = len(all_inner)
outer_rank = total_rank - inner_rank
shifts = [0 for i in range(outer_rank)]
counter = 0
pointer = 0
for i in range(outer_rank):
while pointer < inner_rank and counter >= all_inner[pointer]:
counter += 1
pointer += 1
shifts[i] += pointer
counter += 1
return shifts
@staticmethod
def _convert_outer_indices_to_inner_indices(expr, *outer_contraction_indices):
shifts = ArrayContraction._get_index_shifts(expr)
outer_contraction_indices = tuple(tuple(shifts[j] + j for j in i) for i in outer_contraction_indices)
return outer_contraction_indices
@staticmethod
def _flatten(expr, *outer_contraction_indices):
inner_contraction_indices = expr.contraction_indices
outer_contraction_indices = ArrayContraction._convert_outer_indices_to_inner_indices(expr, *outer_contraction_indices)
contraction_indices = inner_contraction_indices + outer_contraction_indices
return ArrayContraction(expr.expr, *contraction_indices)
@classmethod
def _handle_nested_permute_dims(cls, expr, *contraction_indices):
permutation = expr.permutation
plist = permutation.array_form
new_contraction_indices = [tuple(permutation(j) for j in i) for i in contraction_indices]
new_plist = [i for i in plist if all(i not in j for j in new_contraction_indices)]
new_plist = cls._push_indices_up(new_contraction_indices, new_plist)
return PermuteDims(
ArrayContraction(expr.expr, *new_contraction_indices),
Permutation(new_plist)
)
@classmethod
def _handle_nested_diagonal(cls, expr: 'ArrayDiagonal', *contraction_indices):
diagonal_indices = list(expr.diagonal_indices)
down_contraction_indices = expr._push_indices_down(expr.diagonal_indices, contraction_indices, get_rank(expr.expr))
# Flatten diagonally contracted indices:
down_contraction_indices = [[k for j in i for k in (j if isinstance(j, (tuple, Tuple)) else [j])] for i in down_contraction_indices]
new_contraction_indices = []
for contr_indgrp in down_contraction_indices:
ind = contr_indgrp[:]
for j, diag_indgrp in enumerate(diagonal_indices):
if diag_indgrp is None:
continue
if any(i in diag_indgrp for i in contr_indgrp):
ind.extend(diag_indgrp)
diagonal_indices[j] = None
new_contraction_indices.append(sorted(set(ind)))
new_diagonal_indices_down = [i for i in diagonal_indices if i is not None]
new_diagonal_indices = ArrayContraction._push_indices_up(new_contraction_indices, new_diagonal_indices_down)
return ArrayDiagonal(
ArrayContraction(expr.expr, *new_contraction_indices),
*new_diagonal_indices
)
@classmethod
def _sort_fully_contracted_args(cls, expr, contraction_indices):
if expr.shape is None:
return expr, contraction_indices
cumul = list(accumulate([0] + expr.subranks))
index_blocks = [list(range(cumul[i], cumul[i+1])) for i in range(len(expr.args))]
contraction_indices_flat = {j for i in contraction_indices for j in i}
fully_contracted = [all(j in contraction_indices_flat for j in range(cumul[i], cumul[i+1])) for i, arg in enumerate(expr.args)]
new_pos = sorted(range(len(expr.args)), key=lambda x: (0, default_sort_key(expr.args[x])) if fully_contracted[x] else (1,))
new_args = [expr.args[i] for i in new_pos]
new_index_blocks_flat = [j for i in new_pos for j in index_blocks[i]]
index_permutation_array_form = _af_invert(new_index_blocks_flat)
new_contraction_indices = [tuple(index_permutation_array_form[j] for j in i) for i in contraction_indices]
new_contraction_indices = _sort_contraction_indices(new_contraction_indices)
return ArrayTensorProduct(*new_args), new_contraction_indices
def _get_contraction_tuples(self):
r"""
Return tuples containing the argument index and position within the
argument of the index position.
Examples
========
>>> from sympy.tensor.array.expressions.array_expressions import ArrayTensorProduct
>>> from sympy import MatrixSymbol
>>> from sympy.abc import N
>>> from sympy.tensor.array.expressions.array_expressions import ArrayContraction
>>> A = MatrixSymbol("A", N, N)
>>> B = MatrixSymbol("B", N, N)
>>> cg = ArrayContraction(ArrayTensorProduct(A, B), (1, 2))
>>> cg._get_contraction_tuples()
[[(0, 1), (1, 0)]]
Notes
=====
Here the contraction pair `(1, 2)` meaning that the 2nd and 3rd indices
of the tensor product `A\otimes B` are contracted, has been transformed
into `(0, 1)` and `(1, 0)`, identifying the same indices in a different
notation. `(0, 1)` is the second index (1) of the first argument (i.e.
0 or `A`). `(1, 0)` is the first index (i.e. 0) of the second
argument (i.e. 1 or `B`).
"""
mapping = self._mapping
return [[mapping[j] for j in i] for i in self.contraction_indices]
@staticmethod
def _contraction_tuples_to_contraction_indices(expr, contraction_tuples):
# TODO: check that `expr` has `.subranks`:
ranks = expr.subranks
cumulative_ranks = [0] + list(accumulate(ranks))
return [tuple(cumulative_ranks[j]+k for j, k in i) for i in contraction_tuples]
@property
def free_indices(self):
return self._free_indices[:]
@property
def free_indices_to_position(self):
return dict(self._free_indices_to_position)
@property
def expr(self):
return self.args[0]
@property
def contraction_indices(self):
return self.args[1:]
def _contraction_indices_to_components(self):
expr = self.expr
if not isinstance(expr, ArrayTensorProduct):
raise NotImplementedError("only for contractions of tensor products")
ranks = expr.subranks
mapping = {}
counter = 0
for i, rank in enumerate(ranks):
for j in range(rank):
mapping[counter] = (i, j)
counter += 1
return mapping
def sort_args_by_name(self):
"""
Sort arguments in the tensor product so that their order is lexicographical.
Examples
========
>>> from sympy.tensor.array.expressions.conv_matrix_to_array import convert_matrix_to_array
>>> from sympy import MatrixSymbol
>>> from sympy.abc import N
>>> A = MatrixSymbol("A", N, N)
>>> B = MatrixSymbol("B", N, N)
>>> C = MatrixSymbol("C", N, N)
>>> D = MatrixSymbol("D", N, N)
>>> cg = convert_matrix_to_array(C*D*A*B)
>>> cg
ArrayContraction(ArrayTensorProduct(A, D, C, B), (0, 3), (1, 6), (2, 5))
>>> cg.sort_args_by_name()
ArrayContraction(ArrayTensorProduct(A, D, B, C), (0, 3), (1, 4), (2, 7))
"""
expr = self.expr
if not isinstance(expr, ArrayTensorProduct):
return self
args = expr.args
sorted_data = sorted(enumerate(args), key=lambda x: default_sort_key(x[1]))
pos_sorted, args_sorted = zip(*sorted_data)
reordering_map = {i: pos_sorted.index(i) for i, arg in enumerate(args)}
contraction_tuples = self._get_contraction_tuples()
contraction_tuples = [[(reordering_map[j], k) for j, k in i] for i in contraction_tuples]
c_tp = ArrayTensorProduct(*args_sorted)
new_contr_indices = self._contraction_tuples_to_contraction_indices(
c_tp,
contraction_tuples
)
return ArrayContraction(c_tp, *new_contr_indices)
def _get_contraction_links(self):
r"""
Returns a dictionary of links between arguments in the tensor product
being contracted.
See the example for an explanation of the values.
Examples
========
>>> from sympy import MatrixSymbol
>>> from sympy.abc import N
>>> from sympy.tensor.array.expressions.conv_matrix_to_array import convert_matrix_to_array
>>> A = MatrixSymbol("A", N, N)
>>> B = MatrixSymbol("B", N, N)
>>> C = MatrixSymbol("C", N, N)
>>> D = MatrixSymbol("D", N, N)
Matrix multiplications are pairwise contractions between neighboring
matrices:
`A_{ij} B_{jk} C_{kl} D_{lm}`
>>> cg = convert_matrix_to_array(A*B*C*D)
>>> cg
ArrayContraction(ArrayTensorProduct(B, C, A, D), (0, 5), (1, 2), (3, 6))
>>> cg._get_contraction_links()
{0: {0: (2, 1), 1: (1, 0)}, 1: {0: (0, 1), 1: (3, 0)}, 2: {1: (0, 0)}, 3: {0: (1, 1)}}
This dictionary is interpreted as follows: argument in position 0 (i.e.
matrix `A`) has its second index (i.e. 1) contracted to `(1, 0)`, that
is argument in position 1 (matrix `B`) on the first index slot of `B`,
this is the contraction provided by the index `j` from `A`.
The argument in position 1 (that is, matrix `B`) has two contractions,
the ones provided by the indices `j` and `k`, respectively the first
and second indices (0 and 1 in the sub-dict). The link `(0, 1)` and
`(2, 0)` respectively. `(0, 1)` is the index slot 1 (the 2nd) of
argument in position 0 (that is, `A_{\ldot j}`), and so on.
"""
args, dlinks = _get_contraction_links([self], self.subranks, *self.contraction_indices)
return dlinks
def as_explicit(self):
return tensorcontraction(self.expr.as_explicit(), *self.contraction_indices)
class _ArgE:
"""
The ``_ArgE`` object contains references to the array expression
(``.element``) and a list containing the information about index
contractions (``.indices``).
Index contractions are numbered and contracted indices show the number of
the contraction. Uncontracted indices have ``None`` value.
For example:
``_ArgE(M, [None, 3])``
This object means that expression ``M`` is part of an array contraction
and has two indices, the first is not contracted (value ``None``),
the second index is contracted to the 4th (i.e. number ``3``) group of the
array contraction object.
"""
def __init__(self, element, indices: Optional[List[Optional[int]]] = None):
self.element = element
if indices is None:
self.indices: List[Optional[int]] = [None for i in range(get_rank(element))]
else:
self.indices: List[Optional[int]] = indices
def __str__(self):
return "_ArgE(%s, %s)" % (self.element, self.indices)
__repr__ = __str__
class _IndPos:
"""
Index position, requiring two integers in the constructor:
- arg: the position of the argument in the tensor product,
- rel: the relative position of the index inside the argument.
"""
def __init__(self, arg: int, rel: int):
self.arg = arg
self.rel = rel
def __str__(self):
return "_IndPos(%i, %i)" % (self.arg, self.rel)
__repr__ = __str__
def __iter__(self):
yield from [self.arg, self.rel]
class _EditArrayContraction:
"""
Utility class to help manipulate array contraction objects.
This class takes as input an ``ArrayContraction`` object and turns it into
an editable object.
The field ``args_with_ind`` of this class is a list of ``_ArgE`` objects
which can be used to easily edit the contraction structure of the
expression.
Once editing is finished, the ``ArrayContraction`` object may be recreated
by calling the ``.to_array_contraction()`` method.
"""
def __init__(self, array_contraction: Optional[ArrayContraction]):
if array_contraction is None:
self.args_with_ind: List[_ArgE] = []
self.number_of_contraction_indices: int = 0
self._track_permutation: Optional[List[int]] = None
return
expr = array_contraction.expr
if isinstance(expr, ArrayTensorProduct):
args = list(expr.args)
else:
args = [expr]
args_with_ind: List[_ArgE] = [_ArgE(arg) for arg in args]
mapping = _get_mapping_from_subranks(array_contraction.subranks)
for i, contraction_tuple in enumerate(array_contraction.contraction_indices):
for j in contraction_tuple:
arg_pos, rel_pos = mapping[j]
args_with_ind[arg_pos].indices[rel_pos] = i
self.args_with_ind: List[_ArgE] = args_with_ind
self.number_of_contraction_indices: int = len(array_contraction.contraction_indices)
self._track_permutation: Optional[List[int]] = None
def insert_after(self, arg: _ArgE, new_arg: _ArgE):
pos = self.args_with_ind.index(arg)
self.args_with_ind.insert(pos + 1, new_arg)
def get_new_contraction_index(self):
self.number_of_contraction_indices += 1
return self.number_of_contraction_indices - 1
def refresh_indices(self):
updates: Dict[int, int] = {}
for arg_with_ind in self.args_with_ind:
updates.update({i: -1 for i in arg_with_ind.indices if i is not None})
for i, e in enumerate(sorted(updates)):
updates[e] = i
self.number_of_contraction_indices: int = len(updates)
for arg_with_ind in self.args_with_ind:
arg_with_ind.indices = [updates.get(i, None) for i in arg_with_ind.indices]
def merge_scalars(self):
scalars = []
for arg_with_ind in self.args_with_ind:
if len(arg_with_ind.indices) == 0:
scalars.append(arg_with_ind)
for i in scalars:
self.args_with_ind.remove(i)
scalar = Mul.fromiter([i.element for i in scalars])
if len(self.args_with_ind) == 0:
self.args_with_ind.append(_ArgE(scalar))
else:
from sympy.tensor.array.expressions.conv_array_to_matrix import _a2m_tensor_product
self.args_with_ind[0].element = _a2m_tensor_product(scalar, self.args_with_ind[0].element)
def to_array_contraction(self):
self.merge_scalars()
self.refresh_indices()
args = [arg.element for arg in self.args_with_ind]
contraction_indices = self.get_contraction_indices()
expr = ArrayContraction(ArrayTensorProduct(*args), *contraction_indices)
if self._track_permutation is not None:
permutation = _af_invert([j for i in self._track_permutation for j in i])
expr = PermuteDims(expr, permutation)
return expr
def get_contraction_indices(self) -> List[List[int]]:
contraction_indices: List[List[int]] = [[] for i in range(self.number_of_contraction_indices)]
current_position: int = 0
for i, arg_with_ind in enumerate(self.args_with_ind):
for j in arg_with_ind.indices:
if j is not None:
contraction_indices[j].append(current_position)
current_position += 1
return contraction_indices
def get_mapping_for_index(self, ind) -> List[_IndPos]:
if ind >= self.number_of_contraction_indices:
raise ValueError("index value exceeding the index range")
positions: List[_IndPos] = []
for i, arg_with_ind in enumerate(self.args_with_ind):
for j, arg_ind in enumerate(arg_with_ind.indices):
if ind == arg_ind:
positions.append(_IndPos(i, j))
return positions
def get_contraction_indices_to_ind_rel_pos(self) -> List[List[_IndPos]]:
contraction_indices: List[List[_IndPos]] = [[] for i in range(self.number_of_contraction_indices)]
for i, arg_with_ind in enumerate(self.args_with_ind):
for j, ind in enumerate(arg_with_ind.indices):
if ind is not None:
contraction_indices[ind].append(_IndPos(i, j))
return contraction_indices
def count_args_with_index(self, index: int) -> int:
"""
Count the number of arguments that have the given index.
"""
counter: int = 0
for arg_with_ind in self.args_with_ind:
if index in arg_with_ind.indices:
counter += 1
return counter
def track_permutation_start(self):
self._track_permutation = []
counter: int = 0
for arg_with_ind in self.args_with_ind:
perm = []
for i in arg_with_ind.indices:
if i is not None:
continue
perm.append(counter)
counter += 1
self._track_permutation.append(perm)
def track_permutation_merge(self, destination: _ArgE, from_element: _ArgE):
index_destination = self.args_with_ind.index(destination)
index_element = self.args_with_ind.index(from_element)
self._track_permutation[index_destination].extend(self._track_permutation[index_element])
self._track_permutation.pop(index_element)
def get_rank(expr):
if isinstance(expr, (MatrixExpr, MatrixElement)):
return 2
if isinstance(expr, _CodegenArrayAbstract):
return len(expr.shape)
if isinstance(expr, NDimArray):
return expr.rank()
if isinstance(expr, Indexed):
return expr.rank
if isinstance(expr, IndexedBase):
shape = expr.shape
if shape is None:
return -1
else:
return len(shape)
if hasattr(expr, "shape"):
return len(expr.shape)
return 0
def _get_subrank(expr):
if isinstance(expr, _CodegenArrayAbstract):
return expr.subrank()
return get_rank(expr)
def _get_subranks(expr):
if isinstance(expr, _CodegenArrayAbstract):
return expr.subranks
else:
return [get_rank(expr)]
def get_shape(expr):
if hasattr(expr, "shape"):
return expr.shape
return ()
def nest_permutation(expr):
if isinstance(expr, PermuteDims):
return expr.nest_permutation()
else:
return expr
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