We study the solution of generalized eigenproblems generated by a model which is used for stability investigation of tokamak plasmas. The eigenvalue problems are of the form $A x = lambda B x$, in which the complex matrices $A$ and $B$ are block tridiagonal, and $B$ is Hermitian positive definite. The Jacobi-Davidson method appears to be an excellent method for parallel computation of a few selected eigenvalues, because the basic ingredients are matrix-vector products, vector updates and inner products. The method is based on solving projected eigenproblems of order typically less than 30. The computation of an approximate solution of a large system of linear equations is usually the most expensive step in the algorithm. By using a suitable...
Most computational work in Jacobi-Davidson [9], an iterative method for large scale eigenvalue probl...
AbstractThe Jacobi–Davidson (JD) algorithm is very well suited for the computation of a few eigen-pa...
The JacobiDavidson method is suitable for computing solutions of large ndimensional eigen value...
We study the solution of generalized eigenproblems generated by a model which is used for stability ...
A Jacobi-Davidson algorithm for computing selected eigenvalues and associated eigenvectors of the ge...
A Jacobi-Davidson algorithm for computing selected eigenvalues and associated eigenvectors of the ge...
this paper the emphasis is put on the case where one of the matrices, say the B-matrix, is Hermitian...
In this paper we apply the recently proposed Jacobi-Davidson method for calculating extreme eigenval...
For the solution of the generalized complex non-Hermitian eigenvalue problems $Ax=\lambda Bx$ occurr...
For the solution of the generalized complex non-Hermitian eigenvalue problems Ax = lambda Bx occurri...
We study the Jacobi-Davidson method for the solution of large generalized eigenproblems as they aris...
In this paper we apply the recently proposed Jacobi-Davidson method for calculating extreme eigenval...
Abstract. We report on a parallel implementation of the Jacobi–Davidson (JD) to compute a few eigenp...
Abstract. This paper describes a parallel implementation of the Jacobi-Davidson method to compute ei...
textabstractThe Jacobi-Davidson method is suitable for computing solutions of large $n$-dimensional ...
Most computational work in Jacobi-Davidson [9], an iterative method for large scale eigenvalue probl...
AbstractThe Jacobi–Davidson (JD) algorithm is very well suited for the computation of a few eigen-pa...
The JacobiDavidson method is suitable for computing solutions of large ndimensional eigen value...
We study the solution of generalized eigenproblems generated by a model which is used for stability ...
A Jacobi-Davidson algorithm for computing selected eigenvalues and associated eigenvectors of the ge...
A Jacobi-Davidson algorithm for computing selected eigenvalues and associated eigenvectors of the ge...
this paper the emphasis is put on the case where one of the matrices, say the B-matrix, is Hermitian...
In this paper we apply the recently proposed Jacobi-Davidson method for calculating extreme eigenval...
For the solution of the generalized complex non-Hermitian eigenvalue problems $Ax=\lambda Bx$ occurr...
For the solution of the generalized complex non-Hermitian eigenvalue problems Ax = lambda Bx occurri...
We study the Jacobi-Davidson method for the solution of large generalized eigenproblems as they aris...
In this paper we apply the recently proposed Jacobi-Davidson method for calculating extreme eigenval...
Abstract. We report on a parallel implementation of the Jacobi–Davidson (JD) to compute a few eigenp...
Abstract. This paper describes a parallel implementation of the Jacobi-Davidson method to compute ei...
textabstractThe Jacobi-Davidson method is suitable for computing solutions of large $n$-dimensional ...
Most computational work in Jacobi-Davidson [9], an iterative method for large scale eigenvalue probl...
AbstractThe Jacobi–Davidson (JD) algorithm is very well suited for the computation of a few eigen-pa...
The JacobiDavidson method is suitable for computing solutions of large ndimensional eigen value...