Improving the stability and robustness of incomplete symmetric indefinite factorization preconditioners
- ID: 2754, RIV: 10331042
- ISSN: 1070-5325, ISBN: not specified
- source: Numerical Linear Algebra with Applications
- keywords: incomplete factorizations; indefinite symmetric systems; iterative solvers; pivoting; preconditioning; sparse linear systems; sparse matrices
- authors: Jennifer Scott, Miroslav Tůma
- authors from KNM: Tůma Miroslav
Abstract
Sparse symmetric indefinite linear systems of equations arise in numerous practical applications. In many situations, an iterative method is the method of choice but a preconditioner is normally required for it to be effective. In this paper, the focus is on a class of incomplete factorization algorithms that can be used to compute preconditioners for symmetric indefinite systems. A limited memory approach is employed that incorporates a number of new ideas with the goal of improving the stability, robustness, and efficiency of the preconditioner. These include the monitoring of stability as the factorization proceeds and the incorporation of pivot modifications when potential instability is observed. Numerical experiments involving test problems arising from a range of real-world applications demonstrate the effectiveness of our approach.