mrpro.operators.ZeroPadOp

class mrpro.operators.ZeroPadOp(dim: Sequence[int], original_shape: Sequence[int], padded_shape: Sequence[int])[source]

Bases: LinearOperator

Zero Pad operator class.

__init__(dim: Sequence[int], original_shape: Sequence[int], padded_shape: Sequence[int]) → None[source]

Zero Pad Operator class.

The operator carries out zero-padding if the padded_shape is larger than orig_shape and cropping if the padded_shape is smaller.

Parameters:

dim – dimensions along which padding should be applied
original_shape – shape of original data along dim, same length as dim
padded_shape – shape of padded data along dim, same length as dim

adjoint(x: Tensor) → tuple[Tensor][source]

Crop or pad data.

Parameters:: x – data with shape padded_shape
Return type:: data with shape orig_shape

forward(x: Tensor) → tuple[Tensor][source]

Pad or crop data.

Parameters:: x – data with shape orig_shape
Return type:: data with shape padded_shape

operator_norm(initial_value: Tensor, dim: Sequence[int] | None, max_iterations: int = 20, relative_tolerance: float = 0.0001, absolute_tolerance: float = 1e-05, callback: Callable[[Tensor], None] | None = None) → Tensor

Power iteration for computing the operator norm of the linear operator.

Parameters:

initial_value – initial value to start the iteration; if the initial value contains a zero-vector for one of the considered problems, the function throws an value error.
dim – the dimensions of the tensors on which the operator operates. For example, for a matrix-vector multiplication example, a batched matrix tensor with shape (4,30,80,160), input tensors of shape (4,30,160) to be multiplied, and dim = None, it is understood that the matrix representation of the operator corresponds to a block diagonal operator (with 4*30 matrices) and thus the algorithm returns a tensor of shape (1,1,1) containing one single value. In contrast, if for example, dim=(-1,), the algorithm computes a batched operator norm and returns a tensor of shape (4,30,1) corresponding to the operator norms of the respective matrices in the diagonal of the block-diagonal operator (if considered in matrix representation). In any case, the output of the algorithm has the same number of dimensions as the elements of the domain of the considered operator (whose dimensionality is implicitly defined by choosing dim), such that the pointwise multiplication of the operator norm and elements of the domain (to be for example used in a Landweber iteration) is well-defined.
max_iterations – maximum number of iterations
relative_tolerance – absolute tolerance for the change of the operator-norm at each iteration; if set to zero, the maximal number of iterations is the only stopping criterion used to stop the power iteration
absolute_tolerance – absolute tolerance for the change of the operator-norm at each iteration; if set to zero, the maximal number of iterations is the only stopping criterion used to stop the power iteration
callback – user-provided function to be called at each iteration

Return type:

an estimaton of the operator norm

property H: LinearOperator: Adjoint operator.

property gram: LinearOperator

Gram operator.

For a LinearOperator \(A\), the self-adjoint Gram operator is defined as \(A^H A\).

Note: This is a default implementation that can be overwritten by subclasses for more efficient implementations.