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On monotone iteration and Schwarz methods for nonlinear parabolic PDEs
The Schwarz Alternating Method can be used to solve elliptic boundary value problems on domains which consist of two or more overlapping subdomains. The solution is approximated by an infinite sequence of functions which results from solving a sequence of elliptic boundary value problems in each of...
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Published in: | Journal of computational and applied mathematics 2003-12, Vol.161 (2), p.449-468 |
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Main Author: | |
Format: | Article |
Language: | English |
Subjects: | |
Citations: | Items that this one cites Items that cite this one |
Online Access: | Get full text |
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Summary: | The Schwarz Alternating Method can be used to solve elliptic boundary value problems on domains which consist of two or more overlapping subdomains. The solution is approximated by an infinite sequence of functions which results from solving a sequence of elliptic boundary value problems in each of the subdomains.
In this paper, proofs of convergence of some Schwarz Alternating Methods for nonlinear parabolic problems which are known to have solutions by the monotone method (also known as the method of subsolutions and supersolutions) are given. In particular, an additive Schwarz method for scalar as well some coupled nonlinear PDEs are shown to converge to the solution on finitely many subdomains. In the coupled system case, each subdomain PDE is linear, decoupled and can be solved concurrently with other subdomain PDEs. These results are applicable to several models in population biology. The convergence behavior is illustrated by two numerical examples. |
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ISSN: | 0377-0427 1879-1778 |
DOI: | 10.1016/j.cam.2003.06.001 |