We exploit an optimization method, called DACG, which sequentially computes the smallest eigenpairs of a symmetric, positive definite, generalized eigenproblem, by CG minimizations of the Rayleigh quotient over subspaces of decreasing size. In this paper we analyze the effectiveness of the approximate inverse preconditioners, AINV and FSAI as DACG preconditioners for the solution of Finite Element and Finite Difference eigenproblems. Numerical tests on a Cray T3E Supercomputer were performed, showing the high degree of parallelism attainable by the code. We found that AINV and FSAI are both effective preconditioners for our DACG algorithm.
Preconditioning of sequential and parallel Jacobi-Davidson method
BERGAMASCHI, LUCA;PINI, GIORGIO;
2002
Abstract
We exploit an optimization method, called DACG, which sequentially computes the smallest eigenpairs of a symmetric, positive definite, generalized eigenproblem, by CG minimizations of the Rayleigh quotient over subspaces of decreasing size. In this paper we analyze the effectiveness of the approximate inverse preconditioners, AINV and FSAI as DACG preconditioners for the solution of Finite Element and Finite Difference eigenproblems. Numerical tests on a Cray T3E Supercomputer were performed, showing the high degree of parallelism attainable by the code. We found that AINV and FSAI are both effective preconditioners for our DACG algorithm.
Pubblicazioni consigliate
I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.
