This operator acts like a [batch] of permutations with shape[B1,...,Bb, N, N] for some b >= 0. The first b indices index a batch member. For every batch index (i1,...,ib), A[i1,...,ib, : :] is an N x N matrix. This matrix A is not materialized, but for purposes of broadcasting this shape will be relevant.
LinearOperatorPermutation is initialized with a (batch) vector.
A permutation, is defined by an integer vector v whose values are unique and are in the range [0, ... n]. Applying the permutation on an input matrix has the folllowing meaning: the value of v at index isays to move the v[i]-th row of the input matrix to the i-th row. Because all values are unique, this will result in a permutation of the rows the input matrix. Note, that the permutation vector v has the same semantics as tf.transpose.
# Create a 3 x 3 permutation matrix that swaps the last two columns.
vec = [0, 2, 1]
operator = LinearOperatorPermutation(vec)
operator.to_dense()
==> [[1., 0., 0.]
[0., 0., 1.]
[0., 1., 0.]]
operator.shape
==> [3, 3]
# This will be zero.
operator.log_abs_determinant()
==> scalar Tensor
x = ... Shape [3, 4] Tensor
operator.matmul(x)
==> Shape [3, 4] Tensor
Shape compatibility
This operator acts on [batch] matrix with compatible shape.x is a batch matrix with compatible shape for matmul and solve if
operator.shape = [B1,...,Bb] + [N, N], with b >= 0
x.shape = [C1,...,Cc] + [N, R],
and [C1,...,Cc] broadcasts with [B1,...,Bb] to [D1,...,Dd]
Matrix property hints
This LinearOperator is initialized with boolean flags of the form is_X, for X = non_singular, self_adjoint, positive_definite, square. These have the following meaning:
If is_X == True, callers should expect the operator to have the property X. This is a promise that should be fulfilled, but is not a runtime assert. For example, finite floating point precision may result in these promises being violated.
If is_X == False, callers should expect the operator to not have X.
If is_X == None (the default), callers should have no expectation either way.
Args
perm
Shape [B1,...,Bb, N] Integer Tensor with b >= 0 N >= 0. An integer vector that represents the permutation to apply. Note that this argument is same as tf.transpose. However, this permutation is applied on the rows, while the permutation intf.transpose is applied on the dimensions of the Tensor. permis required to have unique entries from {0, 1, ... N-1}.
dtype
The dtype of arguments to this operator. Default: float32. Allowed dtypes: float16, float32, float64, complex64,complex128.
is_non_singular
Expect that this operator is non-singular.
is_self_adjoint
Expect that this operator is equal to its hermitian transpose. This is autoset to true
Expect that this operator acts like square [batch] matrices. This is autoset to true.
name
A name for this LinearOperator.
Raises
ValueError
is_self_adjoint is not True, is_positive_definite is not False or is_square is not True.
Attributes
H
Returns the adjoint of the current LinearOperator.Given A representing this LinearOperator, return A*. Note that calling self.adjoint() and self.H are equivalent.
batch_shape
TensorShape of batch dimensions of this LinearOperator.If this operator acts like the batch matrix A withA.shape = [B1,...,Bb, M, N], then this returnsTensorShape([B1,...,Bb]), equivalent to A.shape[:-2]
domain_dimension
Dimension (in the sense of vector spaces) of the domain of this operator.If this operator acts like the batch matrix A withA.shape = [B1,...,Bb, M, N], then this returns N.
dtype
The DType of Tensors handled by this LinearOperator.
graph_parents
List of graph dependencies of this LinearOperator. (deprecated)
is_non_singular
is_positive_definite
is_self_adjoint
is_square
Return True/False depending on if this operator is square.
parameters
Dictionary of parameters used to instantiate this LinearOperator.
perm
range_dimension
Dimension (in the sense of vector spaces) of the range of this operator.If this operator acts like the batch matrix A withA.shape = [B1,...,Bb, M, N], then this returns M.
shape
TensorShape of this LinearOperator.If this operator acts like the batch matrix A withA.shape = [B1,...,Bb, M, N], then this returnsTensorShape([B1,...,Bb, M, N]), equivalent to A.shape.
tensor_rank
Rank (in the sense of tensors) of matrix corresponding to this operator.If this operator acts like the batch matrix A withA.shape = [B1,...,Bb, M, N], then this returns b + 2.
Returns an Op that asserts this operator is positive definite.
Here, positive definite means that the quadratic form x^H A x has positive real part for all nonzero x. Note that we do not require the operator to be self-adjoint to be positive definite.
Args
name
A name to give this Op.
Returns
An Assert Op, that, when run, will raise an InvalidArgumentError if the operator is not positive definite.
Efficiently get the [batch] diagonal part of this operator.
If this operator has shape [B1,...,Bb, M, N], this returns aTensordiagonal, of shape [B1,...,Bb, min(M, N)], wherediagonal[b1,...,bb, i] = self.to_dense()[b1,...,bb, i, i].
my_operator = LinearOperatorDiag([1., 2.])
# Efficiently get the diagonal
my_operator.diag_part()
==> [1., 2.]
# Equivalent, but inefficient method
tf.linalg.diag_part(my_operator.to_dense())
==> [1., 2.]
Transform [batch] matrix x with left multiplication: x --> Ax.
# Make an operator acting like batch matrix A. Assume A.shape = [..., M, N]
operator = LinearOperator(...)
operator.shape = [..., M, N]
X = ... # shape [..., N, R], batch matrix, R > 0.
Y = operator.matmul(X)
Y.shape
==> [..., M, R]
Y[..., :, r] = sum_j A[..., :, j] X[j, r]
Args
x
LinearOperator or Tensor with compatible shape and same dtype asself. See class docstring for definition of compatibility.
adjoint
Python bool. If True, left multiply by the adjoint: A^H x.
adjoint_arg
Python bool. If True, compute A x^H where x^H is the hermitian transpose (transposition and complex conjugation).
name
A name for this Op.
Returns
A LinearOperator or Tensor with shape [..., M, R] and same dtypeas self.
Transform [batch] vector x with left multiplication: x --> Ax.
# Make an operator acting like batch matrix A. Assume A.shape = [..., M, N]
operator = LinearOperator(...)
X = ... # shape [..., N], batch vector
Y = operator.matvec(X)
Y.shape
==> [..., M]
Y[..., :] = sum_j A[..., :, j] X[..., j]
Args
x
Tensor with compatible shape and same dtype as self.x is treated as a [batch] vector meaning for every set of leading dimensions, the last dimension defines a vector. See class docstring for definition of compatibility.
adjoint
Python bool. If True, left multiply by the adjoint: A^H x.
name
A name for this Op.
Returns
A Tensor with shape [..., M] and same dtype as self.
Shape of this LinearOperator, determined at runtime.
If this operator acts like the batch matrix A withA.shape = [B1,...,Bb, M, N], then this returns a Tensor holding[B1,...,Bb, M, N], equivalent to tf.shape(A).
Solve (exact or approx) R (batch) systems of equations: A X = rhs.
The returned Tensor will be close to an exact solution if A is well conditioned. Otherwise closeness will vary. See class docstring for details.
Examples:
# Make an operator acting like batch matrix A. Assume A.shape = [..., M, N]
operator = LinearOperator(...)
operator.shape = [..., M, N]
# Solve R > 0 linear systems for every member of the batch.
RHS = ... # shape [..., M, R]
X = operator.solve(RHS)
# X[..., :, r] is the solution to the r'th linear system
# sum_j A[..., :, j] X[..., j, r] = RHS[..., :, r]
operator.matmul(X)
==> RHS
Args
rhs
Tensor with same dtype as this operator and compatible shape.rhs is treated like a [batch] matrix meaning for every set of leading dimensions, the last two dimensions defines a matrix. See class docstring for definition of compatibility.
adjoint
Python bool. If True, solve the system involving the adjoint of this LinearOperator: A^H X = rhs.
adjoint_arg
Python bool. If True, solve A X = rhs^H where rhs^His the hermitian transpose (transposition and complex conjugation).
name
A name scope to use for ops added by this method.
Returns
Tensor with shape [...,N, R] and same dtype as rhs.
Solve single equation with best effort: A X = rhs.
The returned Tensor will be close to an exact solution if A is well conditioned. Otherwise closeness will vary. See class docstring for details.
Examples:
# Make an operator acting like batch matrix A. Assume A.shape = [..., M, N]
operator = LinearOperator(...)
operator.shape = [..., M, N]
# Solve one linear system for every member of the batch.
RHS = ... # shape [..., M]
X = operator.solvevec(RHS)
# X is the solution to the linear system
# sum_j A[..., :, j] X[..., j] = RHS[..., :]
operator.matvec(X)
==> RHS
Args
rhs
Tensor with same dtype as this operator.rhs is treated like a [batch] vector meaning for every set of leading dimensions, the last dimension defines a vector. See class docstring for definition of compatibility regarding batch dimensions.
adjoint
Python bool. If True, solve the system involving the adjoint of this LinearOperator: A^H X = rhs.