In the last few years many numerical techniques for computing eigenvalues of structured rank matrices have been proposed. Most of them are based on QR iterations since, in the symmetric case, the rank structure is preserved and high accuracy is guaranteed. In the unsymmetric case, however, the QR algorithm destroys the rank structure, which is instead preserved if LR iterations are used. We consider a wide class of quasiseparable matrices which can be represented in terms of the same parameters involved in their Neville factorization. This class, if assumptions are made to prevent possible breakdowns, is closed under LR steps. Moreover, we propose an implicit shifted LR method with a linear cost per step, which resembles the qd method for ...
AbstractIn this paper it is shown that Neville elimination is suited to exploit the rank structure o...
In this paper we focus on the solution of shifted quasiseparable systems and of more general paramet...
The paper discusses the following topics: attractions of the real tridiagonal case, relative eigenva...
In the last few years many numerical techniques for computing eigenvalues of structured rank matrice...
AbstractThe QR iteration method for tridiagonal matrices is in the heart of one classical method to ...
AbstractEigenvalue computations for structured rank matrices are the subject of many investigations ...
Abstract. This paper proposes a new type of iteration for computing eigenvalues of semiseparable (pl...
AbstractIn this paper we design a fast new algorithm for reducing an N×N quasiseparable matrix to up...
International audienceWe propose an efficient algorithm for the solution of shifted quasiseparable s...
The QR algorithm is one of the classical methods to compute the eigendecomposition of a matrix. If ...
AbstractWe present a new, fast, and practical parallel algorithm for computing a few eigenvalues of ...
We present a novel algorithm to perform the Hessenberg reduction of an $n imes n$ matrix $A$ of the...
International audienceIn this paper we focus on the solution of shifted quasiseparable systems and o...
The QR algorithm is one of the classical methods to compute the eigendecomposition of a matrix. If i...
Eigenvalue computations for structured rank matrices are the subject of many investigations nowadays...
AbstractIn this paper it is shown that Neville elimination is suited to exploit the rank structure o...
In this paper we focus on the solution of shifted quasiseparable systems and of more general paramet...
The paper discusses the following topics: attractions of the real tridiagonal case, relative eigenva...
In the last few years many numerical techniques for computing eigenvalues of structured rank matrice...
AbstractThe QR iteration method for tridiagonal matrices is in the heart of one classical method to ...
AbstractEigenvalue computations for structured rank matrices are the subject of many investigations ...
Abstract. This paper proposes a new type of iteration for computing eigenvalues of semiseparable (pl...
AbstractIn this paper we design a fast new algorithm for reducing an N×N quasiseparable matrix to up...
International audienceWe propose an efficient algorithm for the solution of shifted quasiseparable s...
The QR algorithm is one of the classical methods to compute the eigendecomposition of a matrix. If ...
AbstractWe present a new, fast, and practical parallel algorithm for computing a few eigenvalues of ...
We present a novel algorithm to perform the Hessenberg reduction of an $n imes n$ matrix $A$ of the...
International audienceIn this paper we focus on the solution of shifted quasiseparable systems and o...
The QR algorithm is one of the classical methods to compute the eigendecomposition of a matrix. If i...
Eigenvalue computations for structured rank matrices are the subject of many investigations nowadays...
AbstractIn this paper it is shown that Neville elimination is suited to exploit the rank structure o...
In this paper we focus on the solution of shifted quasiseparable systems and of more general paramet...
The paper discusses the following topics: attractions of the real tridiagonal case, relative eigenva...