论文信息 - A Note on the Efficiency of Domain Decomposed Incomplete Factorizations

A Note on the Efficiency of Domain Decomposed Incomplete Factorizations

In the past several years, domain decomposition has been a very popular topic, motivated by the ease of parallelization. However, the question of whether it is better than parallelizing some standard sequential methods has seldom been directly addressed.In this paper it is shown, with some numerical examples, that the answer is affirmative in the case of iterative solutions of elliptic problems by preconditioned conjugate gradient iteration. Specifically shown is how to construct effective incomplete factorization preconditioners based on the domain decomposition principle. In addition to having all the advantages of domain decomposition, this also results in better convergence rates than the analogous preconditioners on the whole domain.

Tony F. Chan | Danny Goovaerts | T. Chan | D. Goovaerts

[1] R. P. Kendall,et al. An Approximate Factorization Procedure for Solving Self-Adjoint Elliptic Difference Equations , 1968 .

[2] Christoph Börgers,et al. The Neumann-Dirichlet domain decomposition method with inexact solvers on the subdomains , 1989 .

[3] Jack J. Dongarra,et al. A fully parallel algorithm for the symmetric eigenvalue problem , 1985, PPSC.

[4] J. Meijerink,et al. An iterative solution method for linear systems of which the coefficient matrix is a symmetric -matrix , 1977 .

[5] T. Chan,et al. The eigenvalue spectrum of domain decomposed preconditioners , 1991 .

[6] G. Meurant,et al. Domain decomposition preconditioners for the conjugate gradient method , 1988 .

[7] Gene H. Golub,et al. The use of pre-conditioning over irregular regions , 1983 .

[8] Maksymilian Dryja,et al. A capacitance matrix method for Dirichlet problem on polygon region , 1982 .

[9] T. Chan. Analysis of preconditioners for domain decomposition , 1987 .