Add to ORKGAbstract. We investigate the behavior of the Lanczos process when it is used to find all the eigenvalues of large sparse symmetric matri-ces. We study the convergence of classical Lanczos (i.e., without re-orthogonalization) to the point where there is a cluster of Ritz values around each eigenvalue of the input matrix A. At that point, convergence to all the eigenvalues can be ascertained if A has no multiple eigenvalues. To eliminate multiple eigenvalues, we disperse them by adding to A a random matrix with a small norm; using high-precision arithmetic, we can perturb the eigenvalues and still produce accurate double-precision results. Our experiments indicate that the speed with which Ritz clusters form depends on the local density of ei...
We study the Lanczos method for computing extreme eigenvalues of a symmetric or Hermitian matrix. It...
This thesis presents new hybrid restarted Lanczos methods for computing eigenpairs and singular trip...
In many applications it is important to have reliable approximations for the extreme eigenvalues of ...
Abstract. We investigate the long-term behavior of the classical Lanczos process in an attempt to pa...
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 ...
Includes bibliographical references (p. 70-74)We are interested in computing eigenvalues and eigenve...
A new stable and efficient implementation of the Lanczos algorithm is presented. The algorithm is a ...
AbstractFirst we identify five options which can be used to distinguish one Lanczos eigenelement pro...
The Lanczos algorithm is a well known technique for approximating a few eigenvalues and correspondin...
Abstract. We study the Lanczos method for computing extreme eigenvalues of a symmetric or Hermitian ...
Abstract. We study the Lanczos method for computing extreme eigenvalues of a symmetric or Hermitian ...
We study the Lanczos method for computing extreme eigenvalues of a symmetric or Hermitian matrix. It...
The Lanczos algorithm has proven itself to be a valuable matrix eigensolver for problems with large ...
We study the Lanczos method for computing extreme eigenvalues of a symmetric or Hermitian matrix. It...
We study the Lanczos method for computing extreme eigenvalues of a symmetric or Hermitian matrix. It...
This thesis presents new hybrid restarted Lanczos methods for computing eigenpairs and singular trip...
In many applications it is important to have reliable approximations for the extreme eigenvalues of ...
Abstract. We investigate the long-term behavior of the classical Lanczos process in an attempt to pa...
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 ...
Includes bibliographical references (p. 70-74)We are interested in computing eigenvalues and eigenve...
A new stable and efficient implementation of the Lanczos algorithm is presented. The algorithm is a ...
AbstractFirst we identify five options which can be used to distinguish one Lanczos eigenelement pro...
The Lanczos algorithm is a well known technique for approximating a few eigenvalues and correspondin...
Abstract. We study the Lanczos method for computing extreme eigenvalues of a symmetric or Hermitian ...
Abstract. We study the Lanczos method for computing extreme eigenvalues of a symmetric or Hermitian ...
We study the Lanczos method for computing extreme eigenvalues of a symmetric or Hermitian matrix. It...
The Lanczos algorithm has proven itself to be a valuable matrix eigensolver for problems with large ...
We study the Lanczos method for computing extreme eigenvalues of a symmetric or Hermitian matrix. It...
We study the Lanczos method for computing extreme eigenvalues of a symmetric or Hermitian matrix. It...
This thesis presents new hybrid restarted Lanczos methods for computing eigenpairs and singular trip...
In many applications it is important to have reliable approximations for the extreme eigenvalues of ...