/ToeplitzMatrices.jl

Fast matrix multiplication and division for Toeplitz matrices in Julia

Primary LanguageJuliaMIT LicenseMIT

ToeplitzMatrices.jl

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Fast matrix multiplication and division for Toeplitz and Hankel matrices in Julia

ToeplitzMatrix

A Toeplitz matrix has constant diagonals. It can be constructed using

Toeplitz(vc,vr)

where vc are the entries in the first column and vr are the entries in the first row, where vc[1] must equal vr[1]. For example.

Toeplitz([1.,2.,3.],[1.,4.,5.])

is a sparse representation of the matrix

[ 1.0  4.0  5.0
  2.0  1.0  4.0
  3.0  2.0  1.0 ]

TriangularToeplitz

A triangular Toeplitz matrix can be constructed using

TriangularToeplitz(ve,uplo)

where uplo is either :L or :U and ve are the rows or columns, respectively. For example,

 TriangularToeplitz([1.,2.,3.],:L)

is a sparse representation of the matrix

[ 1.0  0.0  0.0
  2.0  1.0  0.0
  3.0  2.0  1.0 ]

Hankel

A Hankel matrix has constant anti-diagonals. It can be constructed using

Hankel(vc,vr)

where vc are the entries in the first column and vr are the entries in the last row, where vc[end] must equal vr[1]. For example.

Hankel([1.,2.,3.],[3.,4.,5.])

is a sparse representation of the matrix

[  1.0  2.0  3.0
   2.0  3.0  4.0
   3.0  4.0  5.0 ]