AbstractA classical result of structured numerical linear algebra states that the inverse of a nonsingular semiseparable matrix is a tridiagonal matrix. Such a property of a semiseparable matrix has been proved to be useful for devising linear complexity solvers, for establishing recurrence relations among its columns or rows and, moreover, for efficiently evaluating its characteristic polynomial. In this paper, we provide sparse structured representations of a semiseparable matrix A which hold independently of the fact that A is singular or not. These relations are found by pointing out the band structure of the inverse of the sum of A plus a certain sparse perturbation of minimal rank. Further, they can be used to determine in a computati...
AbstractWe study structured matrices which consist of a band part and quasiseparable parts below and...
Abstract. Recent work in the characterization of structured matrices in terms of the systems of poly...
The notion of standard triples for matrix polynomials, introduced and developed by Gohberg, Lancaste...
AbstractA classical result of structured numerical linear algebra states that the inverse of a nonsi...
Structural properties of the inverses of band matrices are discussed. The definition of semiseparabl...
AbstractMatrices represented as a sum of diagonal and semiseparable ones are considered here. These ...
AbstractStructural properties of the inverses of band matrices are discussed. The definition of semi...
The interplay between structured matrices and corresponding systems of polynomials is a classical to...
Currently there is a growing interest in semiseparable matrices and generalized semiseparable matric...
International audienceThe class of quasiseparable matrices is defined by a pair of bounds, called th...
AbstractThis paper presents explicit formulas and algorithms to compute the eigenvalues and eigenvec...
In this paper the definition of semiseparable matrices is investigated. Properties of the frequently...
Interplay between structured matrices and corresponding systems of polynomials is a classical topic,...
We introduce special sparse matrices. Their structure is inherited from the famous Sierpinski triang...
International audienceThe class of quasiseparable matrices is defined by the property that any subma...
AbstractWe study structured matrices which consist of a band part and quasiseparable parts below and...
Abstract. Recent work in the characterization of structured matrices in terms of the systems of poly...
The notion of standard triples for matrix polynomials, introduced and developed by Gohberg, Lancaste...
AbstractA classical result of structured numerical linear algebra states that the inverse of a nonsi...
Structural properties of the inverses of band matrices are discussed. The definition of semiseparabl...
AbstractMatrices represented as a sum of diagonal and semiseparable ones are considered here. These ...
AbstractStructural properties of the inverses of band matrices are discussed. The definition of semi...
The interplay between structured matrices and corresponding systems of polynomials is a classical to...
Currently there is a growing interest in semiseparable matrices and generalized semiseparable matric...
International audienceThe class of quasiseparable matrices is defined by a pair of bounds, called th...
AbstractThis paper presents explicit formulas and algorithms to compute the eigenvalues and eigenvec...
In this paper the definition of semiseparable matrices is investigated. Properties of the frequently...
Interplay between structured matrices and corresponding systems of polynomials is a classical topic,...
We introduce special sparse matrices. Their structure is inherited from the famous Sierpinski triang...
International audienceThe class of quasiseparable matrices is defined by the property that any subma...
AbstractWe study structured matrices which consist of a band part and quasiseparable parts below and...
Abstract. Recent work in the characterization of structured matrices in terms of the systems of poly...
The notion of standard triples for matrix polynomials, introduced and developed by Gohberg, Lancaste...