Using the notion of displacement rank, we look for a unifying approach to representations of a matrix A as sums of products of matrices belonging to commutative matrix algebras. These representations are then considered in case A is the inverse of a Toeplitz or a Toeplitz plus Hankel matrix. Some well-known decomposition formulas for A (Gohberg-Semencul or Kailath et al., Gader, Bini-Pan, and Gohberg-Olshevsky) turn out to be special cases of the above representations. New formulas for A in terms of algebras of symmetric matrices are studied, and their computational aspects are discussed
We characterize a wide class of maximal algebras of Toeplitz plus Hankel matrices by exploiting pr...
AbstractWe introduce some generalized concepts of displacement structure for structured matrices obt...
There are various ways to prove that, under suitable conditions, the inverse of a Toeplitz matrix c...
AbstractUsing the notion of displacement rank, we look for a unifying approach to representations of...
AbstractUsing the concept of displacement rank, we suggest new formulas for the representation of a ...
Using the concept of displacement rank, we suggest new formulas for the representation ...
AbstractUsing the approach of Bozzo, Di Fiore, and Zellini, new matrix displacement decomposition fo...
AbstractWe characterize a wide class of maximal algebras of Toeplitz plus Hankel matrices by exploit...
AbstractWe consider displacements which are linear operations mapping a near-Toeplitz matrix into a ...
Using the approach of Bozzo, Di Fiore, and Zellini, new matrix displacement decomposition formulas a...
The authors extend some recent results of Di Fiore and Zellini [Linear Algebra Appl., to appear], ob...
A class xi of algebras of symmetric nxn matrices, related to Toeplitz-plus-Hankel structures and inc...
The authors extend some recent results of Di Fiore and Zellini [Linear Algebra Appl., to appear], ob...
A class of spaces of matrices, called h-spaces, is considered, extending previous results in [R.Bevi...
AbstractAn r-Toeplitz (rT) matrix can be regarded as a block Toeplitz matrix of order mr from which ...
We characterize a wide class of maximal algebras of Toeplitz plus Hankel matrices by exploiting pr...
AbstractWe introduce some generalized concepts of displacement structure for structured matrices obt...
There are various ways to prove that, under suitable conditions, the inverse of a Toeplitz matrix c...
AbstractUsing the notion of displacement rank, we look for a unifying approach to representations of...
AbstractUsing the concept of displacement rank, we suggest new formulas for the representation of a ...
Using the concept of displacement rank, we suggest new formulas for the representation ...
AbstractUsing the approach of Bozzo, Di Fiore, and Zellini, new matrix displacement decomposition fo...
AbstractWe characterize a wide class of maximal algebras of Toeplitz plus Hankel matrices by exploit...
AbstractWe consider displacements which are linear operations mapping a near-Toeplitz matrix into a ...
Using the approach of Bozzo, Di Fiore, and Zellini, new matrix displacement decomposition formulas a...
The authors extend some recent results of Di Fiore and Zellini [Linear Algebra Appl., to appear], ob...
A class xi of algebras of symmetric nxn matrices, related to Toeplitz-plus-Hankel structures and inc...
The authors extend some recent results of Di Fiore and Zellini [Linear Algebra Appl., to appear], ob...
A class of spaces of matrices, called h-spaces, is considered, extending previous results in [R.Bevi...
AbstractAn r-Toeplitz (rT) matrix can be regarded as a block Toeplitz matrix of order mr from which ...
We characterize a wide class of maximal algebras of Toeplitz plus Hankel matrices by exploiting pr...
AbstractWe introduce some generalized concepts of displacement structure for structured matrices obt...
There are various ways to prove that, under suitable conditions, the inverse of a Toeplitz matrix c...