Eigenvalue problems in which just a few eigenvalues and -vectors of a large and sparse matrix have to be determined are typically solved by subspace methods. This requires the distinction between the computation of extreme eigenvalues and the computation of eigenvalues within the neighbourhood of a prescribed shift in the interior of the spectrum. Whereas for extreme eigenvalues a large number of fast converging methods can be found the computation of interior eigenvalues proves to be significantly more difficult and only a few suitable methods exist. In this thesis a new method for the computation of interior eigenvalues is developed consisting of a Jacobi-Davidson method and a technique based on the idea of residual minimization. For the ...
Abstract. This paper describes a parallel implementation of the Jacobi-Davidson method to compute ei...
In this paper we apply the recently proposed Jacobi-Davidson method for calculating extreme eigenval...
AbstractThe computation of eigenvalues and eigenvectors of a real symmetric matrix A with distinct e...
Eigenvalue problems in which just a few eigenvalues and -vectors of a large and sparre matrix have t...
This talk discusses the computation of a small set of exterior eigenvalues of a large sparse matrix ...
This thesis deals with the computation of a small set of exterior eigenvalues of a given large spar...
. In this paper a parallel algorithm for finding a group of extreme eigenvalues is presented. The al...
We discuss a new method for the iterative computation of a portion of the spectrum of a large sparse...
We discuss a new method for the iterative computation of a portion of the spectrum of a large spars...
. We discuss a new method for the iterative computation of a portion of the spectrum of a large spar...
Acoustic problems with damping may give rise to large quadratic eigenproblems. Efficient and paralle...
We present parallel preconditioned solvers to compute a few extreme eigenvalues and vectors of large...
This dissertation discusses parallel algorithms for the generalized eigenvalue problem Ax = λBx wher...
The Jacobi–Davidson method is an eigenvalue solver which uses an inner-outer scheme. In the outer it...
The paper proposes a parallel algorithm to compute the eigenvalues and eigenvectors of a real symmet...
Abstract. This paper describes a parallel implementation of the Jacobi-Davidson method to compute ei...
In this paper we apply the recently proposed Jacobi-Davidson method for calculating extreme eigenval...
AbstractThe computation of eigenvalues and eigenvectors of a real symmetric matrix A with distinct e...
Eigenvalue problems in which just a few eigenvalues and -vectors of a large and sparre matrix have t...
This talk discusses the computation of a small set of exterior eigenvalues of a large sparse matrix ...
This thesis deals with the computation of a small set of exterior eigenvalues of a given large spar...
. In this paper a parallel algorithm for finding a group of extreme eigenvalues is presented. The al...
We discuss a new method for the iterative computation of a portion of the spectrum of a large sparse...
We discuss a new method for the iterative computation of a portion of the spectrum of a large spars...
. We discuss a new method for the iterative computation of a portion of the spectrum of a large spar...
Acoustic problems with damping may give rise to large quadratic eigenproblems. Efficient and paralle...
We present parallel preconditioned solvers to compute a few extreme eigenvalues and vectors of large...
This dissertation discusses parallel algorithms for the generalized eigenvalue problem Ax = λBx wher...
The Jacobi–Davidson method is an eigenvalue solver which uses an inner-outer scheme. In the outer it...
The paper proposes a parallel algorithm to compute the eigenvalues and eigenvectors of a real symmet...
Abstract. This paper describes a parallel implementation of the Jacobi-Davidson method to compute ei...
In this paper we apply the recently proposed Jacobi-Davidson method for calculating extreme eigenval...
AbstractThe computation of eigenvalues and eigenvectors of a real symmetric matrix A with distinct e...