Awesome
LinearMapsAA.jl
https://github.com/JeffFessler/LinearMapsAA.jl
This package is an overlay for the package
LinearMaps.jl
that allows one to represent linear operations
(like the FFT)
as a object that appears to the user like a matrix
but internally uses user-defined fast computations
for operations, especially multiplication.
With this package,
you can write and debug code
(especially for iterative algorithms)
using a small matrix A
,
and then later replace it with a LinearMapAX
object.
The extra AA
in the package name here has two meanings.
-
LinearMapAM
is a subtype ofAbstractArray{T,2}
, i.e., conforms to (some of) the requirements of anAbstractMatrix
type. -
The package was developed in Ann Arbor, Michigan :)
As of v0.6
,
the package produces objects of two types:
LinearMapAM
(think "Matrix") that is a subtype ofAbstractMatrix
.LinearMapAO
(think "Operator") that is not a subtype ofAbstractMatrix
.- The general type
LinearMapAX
is aUnion
of both. - To convert a
LinearMapAM
to aLinearMapAO
, useredim
orLinearMapAO(A)
- To convert a
LinearMapAO
to aLinearMapAM
, useundim
.
Examples
N = 6
L = LinearMap(cumsum, y -> reverse(cumsum(reverse(y))), N)
A = LinearMapAA(L) # version with no properties
A = LinearMapAA(L, (name="cumsum",))) # version with a NamedTuple of properties
Matrix(L), Matrix(A) # both the same 6 x 6 lower triangular matrix
A.name # returns "cumsum" here
Here is a more interesting example for signal processing.
using LinearMapsAA
using FFTW: fft, bfft
N = 8
A = LinearMapAA(fft, bfft, (N, N), (name="fft",), T=ComplexF32)
@show A[:,2]
For more details see the examples in the documentation.
Features shared with LinearMap
objects
Object combinations
A LinearMapAX
object supports all of the features of a LinearMap
.
In particular, if A
and B
are both LinearMapAX
objects
of appropriate sizes,
then the following each make new LinearMapAX
objects:
-
Multiplication:
A * B
-
Linear combination:
A + B
,A - B
,3A - 7B
-
Kronecker products:
kron(A, B)
-
Concatenation:
[A B]
[A; B]
[I A I]
[A B; 2A 3I]
etc.
Caution: currently some shorthand concatenations are unsupported,
like [I I A]
, though one can accomplish that one using
lmaa_hcat(I, I, A)
Conversions
Conversion to other data types
(may require lots of memory if A
is big):
- Convert to sparse:
sparse(A)
- Convert to dense matrix:
Matrix(A)
.
Avoiding memory allocations
Like LinearMap
objects,
both types of LinearMapAX
objects support mul!
for storing the results in a previously allocated output array,
to avoid new memory allocations.
The basic syntax is to replace
y = A * x
with
mul!(y, A, x)
.
To make the code look more like the math,
use the InplaceOps
package:
using InplaceOps
@! y = A * x # shorthand for mul!(y, A, x)
Features unique to LinearMapsAA
A bonus feature provided by LinearMapsAA
is that a user can include a NamedTuple
of properties
with it, and then retrieve those later
using the A.key
syntax like one would do with a struct (composite type).
The nice folks over at LinearMaps.jl
helped get me started
with this feature.
Often linear operators are associated
with some properties,
e.g.,
a wavelet transform arises
from some mother wavelet,
and it can be convenient
to carry those properties with the object itself.
Currently
the properties are lost when one combines
two or more LinearMapAA
objects by adding, multiplying, concatenating, etc.
The following features are provided
by a LinearMapAX
object
due to its getindex
support:
- Columns or rows slicing:
A[:,5]
,A[end,:]
etc. return a 1D vector - Elements:
A[4,5]
(returns a scalar) - Portions:
A[4:6,5:8]
(returns a dense matrix) - Linear indexing:
A[2:9]
(returns a 1D vector) - Convert to matrix:
A[:,:]
(if memory permits) - Convert to vector:
A[:]
(if memory permits).
Operator support
A LinearMapAO
object
represents a linear mapping
from some input array size
into some output array size
specified by the idim
and odim
options.
Here is a (simplified) example for 2D MRI,
where the operator maps a 2D input array
into a 1D output vector:
using FFTW: fft, bfft
using LinearMapsAA
embed = (v, samp) -> setindex!(fill(zero(eltype(v)),size(samp)), v, samp)
N = (128,64) # image size
samp = rand(N...) .< 0.8 # random sampling pattern
K = sum(samp) # number of k-space samples
A = LinearMapAA(x -> fft(x)[samp], y -> bfft(embed(y,samp)),
(K, prod(N)) ; prop = (name="fft",), T=ComplexF32, idim=N, odim=(K,))
x = rand(N...)
z = A' * (A * x) # result is a 2D array!
typeof(A) # LinearMapAO{ComplexF32, 1, 2}
For more details see FFT example in the documentation.
The adjoint of this LinearMapAO
object
maps a 1D vector of k-space samples
into a 2D image array.
Multiplying a M × N
matrix times a N × K
matrix
can be thought of as multiplying the matrix
by each of the K
columns,
yielding a M × K
result.
Generalizing this to higher dimensional arrays,
if A::LinearMapAO
has "input dimensions" idim=(2,3)
and "output dimensions" odim=(4,5,6)
and you do A*X
where X::AbstractArray
has dimension (2,3,7,8)
,
then the output will be an Array
of dimension (4,5,6,7,8)
.
In other words, it works block-wise.
(If you really want a new LinearMapAO
, rather than an Array
,
then you must first wrap X
in a LinearMapAO
.)
This behavior deliberately departs from the non-Matrix
like behavior
in LinearMaps
where A*X
produces a new LinearMap
.
Here is a corresponding example (not useful; just for illustration).
using LinearMapsAA
idim = (2,3)
odim = (4,5,6)
forward = x -> repeat(reshape(x, (idim[1],1,idim[2])) ; outer=(2,5,2))
A = LinearMapAA(forward,
(prod(odim), prod(idim)) ; prop = (name="test",), idim, odim)
x = rand(idim..., 7, 8)
y = A * x
In the spirit of such generality,
this package overloads *
for LinearAlgebra.I
(and for UniformScaling
objects more generally)
such that
I * X == X
even when X
is an array of more than two dimensions.
(The original LinearAlgebra.I
can only multiply
vectors and matrices,
which suffices for matrix algebra,
but not for general linear algebra.)
Caution:
The LinearMapAM
type should be quite stable now,
whereas LinearMapAO
is new in v0.6
.
The conversions redim
and undim
are probably not thoroughly tested.
The safe bet is to use all
LinearMapAM
objects
or all
LinearMapAO
objects
rather than trying to mix and match.
Historical note about getindex
An AbstractArray
must support a getindex
operation.
The maintainers of the LinearMaps.jl
package
originally did not wish to add getindex
there,
so this package added that feature
(while avoiding "type piracy").
Eventually,
partial getindex
support,
specifically slicing,
was added in
v3.7
there.
As of v0.11,
this package uses that getindex
implementation
and also supports only slicing.
This is a breaking change that could be easily reverted,
so please submit an issue if you have a use case
for more general use of getindex
.
Historical note about setindex!
The
Julia manual section on the AbstractArray
interface
implies that an AbstractArray
should support a setindex!
operation.
Versions of this package prior to v0.8.0
provided that capability,
mainly for completeness
and as a proof of principle,
solely for the LinearMapAM
type.
However,
the reality is that many sub-types of AbstractArray
in the Julia ecosystem,
such as LinearAlgebra.Diagonal
,
understandably do not support setindex!
,
and it there seems to be no use
for it here either.
Supporting setindex!
seems impossible with a concrete type
for a function map,
so it is no longer supported.
The key code is relegated to the archive
directory.
Related packages
LinearOperators.jl
also provides getindex
-like features,
but slicing there always returns another operator,
unlike with a matrix.
In contrast,
a LinearMapAM
object is designed to behave
akin to a matrix,
except for operations like svd
and pinv
that are unsuitable for large-scale problems.
However, one can try
Arpack.svds(A)
to compute a few SVD components.
LazyArrays.jl
and
BlockArrays.jl
also have some related features,
but only for arrays,
not linear operators defined by functions,
so LinearMaps
is more comprehensive.
LazyAlgebra.jl
also has many related features, and supports nonlinear mappings.
SciML/SciMLOperators.jl
seems to be designed for "matrix-free" operators
that are functions of some possibly changing parameters.
This package provides similar functionality
as the Fatrix
/ fatrix
object in the
Matlab version of MIRT.
In particular,
the odim
and idim
features of those objects
are similar to those here.
FunctionOperators.jl
supports inDims
and outDims
features.
Being a sub-type of AbstractArray
can be useful
for other purposes,
such as using the nice
Kronecker.jl
package.
Will this list keep growing,
or will the community settle
on some common AbstractLinearMap
base?
Inter-operability
To promote inter-operability of different linear mapping packages,
this package provides methods
for wrapping other operator types into LinearMapAX
types.
The syntax is simply
LinearMapAA(L; kwargs...)
where L
can be any of the following types currently:
AbstractMatrix
(includingMatrix
,SparseMatrixCSC
,Diagonal
, among many others)LinearMap
fromLinearMaps.jl
LinearOperator
fromLinearOperators.jl
.
Submit an issue or make a PR if there are other operator types
that one would like to have supported.
To minimize package dependencies,
the wrapping code for a LinearOperator
uses
package extensions.
Multiplication properties
It can help developers and users to know how multiplication operations should behave.
Type | Shorthand |
---|---|
LinearMapAO | O |
LinearMapAM | M |
LinearMap | L |
AbstractVector | v |
AbstractMatrix | X |
AbstractArray | A |
LinearAlgebra.I | I |
For left * right
multiplication the results are as follows.
Left | Right | Result |
---|---|---|
M | v | v |
v' | M | v' |
M | X | X |
X | M | X |
M | M | M |
M | L | M |
L | M | M |
O | A | A |
A | O | A |
O | O | O |
I | A | A |
The following subset of the above operations also work
for the in-place version mul!(result, left, right)
:
Left | Right | Result |
---|---|---|
M | v | v |
v' | M | v' |
M | X | X |
X | M | X |
O | A | A |
A | O | A |
There is one more special multiplication property.
If O
is a LinearMapAO
and xv
is Vector
of AbstractArrays
,
then O * xv
is equivalent to [O * x for x in xv]
.
This is useful, for example,
in dynamic imaging
where one might store a video sequence
as a vector of 2D images,
rather than as a 3D array.
There is also a corresponding
5-argument mul!
.
Each array in the Vector
xv
must be compatible with multiplication on the left by O
.
Credits
This software was developed at the
University of Michigan
by
Jeff Fessler
and his
group,
with substantial inspiration drawn
from the LinearMaps
package.
Compatibility
- Version 0.2.0 tested with Julia 1.1 and 1.2
- Version 0.3.0 requires Julia 1.3
- Version 0.6.0 assumes Julia 1.4
- Version 0.7.0 assumes Julia 1.6
- Version 0.11.0 assumes Julia 1.9
Getting started
This package is registered in the
General
registry,
so you can install it at the REPL with ] add LinearMapAA
.
Here are detailed installation instructions.
This package is included in the
Michigan Image Reconstruction Toolbox
MIRT.jl
and is exported there
so that MIRT users can use it
without "separate" installation.