An "industrial strength" algorithm for solving sparse symmetric generalized eigenproblems is described. The algorithm has its foundations in known techniques in solving sparse symmetric eigenproblems, notably the spectral transformation of Ericsson and Ruhe and the block Lanczos algorithm. However, the combination of these two techniques is not trivial; there are many pitfalls awaiting the unwary implementor. The focus of this paper is on identifying those pitfalls and avoiding them, leading to a "bomb-proof" algorithm that can live as a black box eigensolver inside a large applications code. The code that results comprises a robust shift selection strategy and a block Lanczos algorithm that is a novel combination of new...
Abstract. We investigate the behavior of the Lanczos process when it is used to find all the eigenva...
The Lanczos algorithm is a well known technique for approximating a few eigenvalues and correspondin...
The generalized eigenvalue problem, Kx = {lambda}Mx, is of significant practical importance, for exa...
In this dissertation, we consider the symmetric eigenvalue problem and the buckling eigenvalue prob...
In the context of symmetric-definite generalized eigenvalue problems, it is often required to comput...
In the present paper, we analyse the computational performance of the Lanczos method and a recent op...
AbstractEigenvalues and eigenvectors of a large sparse symmetric matrix A can be found accurately an...
Eigenvalue problems for very large sparse matrices based on the Lanczos' minimized iteration method ...
SIGLELD:9091.9F(CSS--83) / BLDSC - British Library Document Supply CentreGBUnited Kingdo
We present an implementation of the generalized minimal residual (gmr) algorithm for finding an eige...
The purpose of this work is to analyse the efficiency of some techniques to solve the generalized ei...
This dissertation studies a restricted form of the fundamental algebraic eigenvalue prob lem. From ...
AbstractFirst we identify five options which can be used to distinguish one Lanczos eigenelement pro...
The central importance of large-scale eigenvalue problems in scientific computation necessitates the...
AbstractThe Lanczos algorithm is used to compute some eigenvalues of a given symmetric matrix of lar...
Abstract. We investigate the behavior of the Lanczos process when it is used to find all the eigenva...
The Lanczos algorithm is a well known technique for approximating a few eigenvalues and correspondin...
The generalized eigenvalue problem, Kx = {lambda}Mx, is of significant practical importance, for exa...
In this dissertation, we consider the symmetric eigenvalue problem and the buckling eigenvalue prob...
In the context of symmetric-definite generalized eigenvalue problems, it is often required to comput...
In the present paper, we analyse the computational performance of the Lanczos method and a recent op...
AbstractEigenvalues and eigenvectors of a large sparse symmetric matrix A can be found accurately an...
Eigenvalue problems for very large sparse matrices based on the Lanczos' minimized iteration method ...
SIGLELD:9091.9F(CSS--83) / BLDSC - British Library Document Supply CentreGBUnited Kingdo
We present an implementation of the generalized minimal residual (gmr) algorithm for finding an eige...
The purpose of this work is to analyse the efficiency of some techniques to solve the generalized ei...
This dissertation studies a restricted form of the fundamental algebraic eigenvalue prob lem. From ...
AbstractFirst we identify five options which can be used to distinguish one Lanczos eigenelement pro...
The central importance of large-scale eigenvalue problems in scientific computation necessitates the...
AbstractThe Lanczos algorithm is used to compute some eigenvalues of a given symmetric matrix of lar...
Abstract. We investigate the behavior of the Lanczos process when it is used to find all the eigenva...
The Lanczos algorithm is a well known technique for approximating a few eigenvalues and correspondin...
The generalized eigenvalue problem, Kx = {lambda}Mx, is of significant practical importance, for exa...