AbstractUsing the approach of Bozzo, Di Fiore, and Zellini, new matrix displacement decomposition formulas are introduced. It is shown how an arbitrary square matrix A can be expressed as sums of products of Hessenberg algebra matrices and high level (block) matrices whose submatrices are Hessenberg algebra matrices and have variable sizes. In most cases these block factors are block-diagonal matrices. Then these formulas are used in sequential and parallel solution of Toeplitz systems
AbstractUsing the concept of displacement rank, we suggest new formulas for the representation of a ...
A direct algorithm for the solution of linear systems having block band Toeplitz matrix in block He...
A class of spaces of matrices, called h-spaces, is considered, extending previous results in [R.Bevi...
Using the approach of Bozzo, Di Fiore, and Zellini, new matrix displacement decomposition formulas a...
AbstractUsing the approach of Bozzo, Di Fiore, and Zellini, new matrix displacement decomposition fo...
AbstractWe consider displacements which are linear operations mapping a near-Toeplitz matrix into a ...
AbstractAn r-Toeplitz (rT) matrix can be regarded as a block Toeplitz matrix of order mr from which ...
AbstractWe show how an arbitrary square matrix can be expressed as sums of products of circulant and...
Using the concept of displacement rank, we suggest new formulas for the representation ...
The authors extend some recent results of Di Fiore and Zellini [Linear Algebra Appl., to appear], ob...
The authors extend some recent results of Di Fiore and Zellini [Linear Algebra Appl., to appear], ob...
AbstractIt takes of the order of N3 operations to solve a set of N linear equations in N unknowns or...
Using the notion of displacement rank, we look for a unifying approach to representations of a matri...
AbstractUsing the notion of displacement rank, we look for a unifying approach to representations of...
AbstractWe introduce some generalized concepts of displacement structure for structured matrices obt...
AbstractUsing the concept of displacement rank, we suggest new formulas for the representation of a ...
A direct algorithm for the solution of linear systems having block band Toeplitz matrix in block He...
A class of spaces of matrices, called h-spaces, is considered, extending previous results in [R.Bevi...
Using the approach of Bozzo, Di Fiore, and Zellini, new matrix displacement decomposition formulas a...
AbstractUsing the approach of Bozzo, Di Fiore, and Zellini, new matrix displacement decomposition fo...
AbstractWe consider displacements which are linear operations mapping a near-Toeplitz matrix into a ...
AbstractAn r-Toeplitz (rT) matrix can be regarded as a block Toeplitz matrix of order mr from which ...
AbstractWe show how an arbitrary square matrix can be expressed as sums of products of circulant and...
Using the concept of displacement rank, we suggest new formulas for the representation ...
The authors extend some recent results of Di Fiore and Zellini [Linear Algebra Appl., to appear], ob...
The authors extend some recent results of Di Fiore and Zellini [Linear Algebra Appl., to appear], ob...
AbstractIt takes of the order of N3 operations to solve a set of N linear equations in N unknowns or...
Using the notion of displacement rank, we look for a unifying approach to representations of a matri...
AbstractUsing the notion of displacement rank, we look for a unifying approach to representations of...
AbstractWe introduce some generalized concepts of displacement structure for structured matrices obt...
AbstractUsing the concept of displacement rank, we suggest new formulas for the representation of a ...
A direct algorithm for the solution of linear systems having block band Toeplitz matrix in block He...
A class of spaces of matrices, called h-spaces, is considered, extending previous results in [R.Bevi...