AbstractHeinig and Tewodors [18] give a set of components whose existence provides a necessary and sufficient condition for a mosaic Hankel matrix to be nonsingular. When this is the case, they also give a formula for the inverse in terms of these components. By converting these components into a matrix polynomial form, we show that the invertibility conditions can be described in terms of matrix rational approximants for a matrix power series determined from the entries of the mosaic matrix. In special cases these matrix rational approximations are closely related to Padé and various well-known matrix-type Padé approximants. We also show that the inversion components can be described in terms of unimodular matrix polynomials. These are sho...
(eng) We present an inversion algorithm for nonsingular n x n matrices whose entries are degree d po...
AbstractWe give a simple criterion for the invertibility of a class of banded matrices that arise in...
AbstractWe derive a closed inversion formula for an np × np square block Hankel matrix Hn − 1 = (Wi ...
Heinig and Tewodros [18] give a set of components whose existence provides a necessary and sufficien...
AbstractHeinig and Tewodors [18] give a set of components whose existence provides a necessary and s...
The inversion problem for square matrices having the structure of a block Hankel-like matrix is stud...
AbstractThe inversion problem for square matrices having the structure of a block Hankel-like matrix...
AbstractThe paper continues the investigation into the links between algebraic system theory, more s...
The paper continues the investigation into the links between algebraic system theory, more specifica...
AbstractIn this note we explicitly evaluate the determinants and inverses of certain matrices that g...
AbstractBased on the approach introduced by B.D.O. Anderson and E.I. Jury in 1976, the definition of...
AbstractHankel and Toeplitz mosaic matrices are block matrices with Hankel or Toeplitz blocks, respe...
In [P90] we proposed to employ Vandermonde and Hankel multipliers to transform into each other the m...
AbstractFinite Hankel matrices [si+j] are considered, for which si are the Markov parameters of a gi...
AbstractFormulas for the inverse of layered or striped Toeplitz matrices in terms of solutions of st...
(eng) We present an inversion algorithm for nonsingular n x n matrices whose entries are degree d po...
AbstractWe give a simple criterion for the invertibility of a class of banded matrices that arise in...
AbstractWe derive a closed inversion formula for an np × np square block Hankel matrix Hn − 1 = (Wi ...
Heinig and Tewodros [18] give a set of components whose existence provides a necessary and sufficien...
AbstractHeinig and Tewodors [18] give a set of components whose existence provides a necessary and s...
The inversion problem for square matrices having the structure of a block Hankel-like matrix is stud...
AbstractThe inversion problem for square matrices having the structure of a block Hankel-like matrix...
AbstractThe paper continues the investigation into the links between algebraic system theory, more s...
The paper continues the investigation into the links between algebraic system theory, more specifica...
AbstractIn this note we explicitly evaluate the determinants and inverses of certain matrices that g...
AbstractBased on the approach introduced by B.D.O. Anderson and E.I. Jury in 1976, the definition of...
AbstractHankel and Toeplitz mosaic matrices are block matrices with Hankel or Toeplitz blocks, respe...
In [P90] we proposed to employ Vandermonde and Hankel multipliers to transform into each other the m...
AbstractFinite Hankel matrices [si+j] are considered, for which si are the Markov parameters of a gi...
AbstractFormulas for the inverse of layered or striped Toeplitz matrices in terms of solutions of st...
(eng) We present an inversion algorithm for nonsingular n x n matrices whose entries are degree d po...
AbstractWe give a simple criterion for the invertibility of a class of banded matrices that arise in...
AbstractWe derive a closed inversion formula for an np × np square block Hankel matrix Hn − 1 = (Wi ...