AbstractComputing eigenvalues from the interior of the spectrum of a large matrix is a difficult problem. The Rayleigh-Ritz procedure is a standard way of reducing it to a smaller problem, but it is not optimal for interior eigenvalues. Here a method is given that does a better job. In contrast with standard Rayleigh-Ritz, a priori bounds can be given for the accuracy of interior eigenvalue and eigenvector approximations. When applied to the Lanczos algorithm, this method yields better approximations at early stages. Applied to preconditioning methods, the convergence rate is improved
AbstractThe harmonic block Arnoldi method can be used to find interior eigenpairs of large matrices....
The simple Lanczos process is very effective for finding a few extreme eigenvalues of a large symmet...
This is the second part of a paper that deals with error estimates for the Rayleigh-Ritz approximati...
Computing eigenvalues from the interior of the spectrum of a large matrix is a difficult problem. Th...
AbstractComputing eigenvalues from the interior of the spectrum of a large matrix is a difficult pro...
The problem in this paper is to construct accurate approximations from a subspace to eigenpairs for ...
Eigenvalue problems in which just a few eigenvalues and -vectors of a large and sparre matrix have t...
Large scale eigenvalue computation is about approximating certain invariant sub-spaces associated wi...
The harmonic Arnoldi method can be used to find interior eigenpairs of large matrices. However, it h...
Generalized Rayleigh quotients for calculating eigenvalues and eigenvectors of large matrice
This work was also published as a Rice University thesis/dissertation: http://hdl.handle.net/1911/17...
In this paper we propose a variant of the Rayleigh quotient method to compute an eigenvalue and corr...
When modeling natural phenomena with linear partial differential equations, the discretized system o...
Arnoldi's method is often used to compute a few eigenvalues and eigenvectors of large, sparse matric...
Includes bibliographical references (p. 70-74)We are interested in computing eigenvalues and eigenve...
AbstractThe harmonic block Arnoldi method can be used to find interior eigenpairs of large matrices....
The simple Lanczos process is very effective for finding a few extreme eigenvalues of a large symmet...
This is the second part of a paper that deals with error estimates for the Rayleigh-Ritz approximati...
Computing eigenvalues from the interior of the spectrum of a large matrix is a difficult problem. Th...
AbstractComputing eigenvalues from the interior of the spectrum of a large matrix is a difficult pro...
The problem in this paper is to construct accurate approximations from a subspace to eigenpairs for ...
Eigenvalue problems in which just a few eigenvalues and -vectors of a large and sparre matrix have t...
Large scale eigenvalue computation is about approximating certain invariant sub-spaces associated wi...
The harmonic Arnoldi method can be used to find interior eigenpairs of large matrices. However, it h...
Generalized Rayleigh quotients for calculating eigenvalues and eigenvectors of large matrice
This work was also published as a Rice University thesis/dissertation: http://hdl.handle.net/1911/17...
In this paper we propose a variant of the Rayleigh quotient method to compute an eigenvalue and corr...
When modeling natural phenomena with linear partial differential equations, the discretized system o...
Arnoldi's method is often used to compute a few eigenvalues and eigenvectors of large, sparse matric...
Includes bibliographical references (p. 70-74)We are interested in computing eigenvalues and eigenve...
AbstractThe harmonic block Arnoldi method can be used to find interior eigenpairs of large matrices....
The simple Lanczos process is very effective for finding a few extreme eigenvalues of a large symmet...
This is the second part of a paper that deals with error estimates for the Rayleigh-Ritz approximati...