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Algebraic analysis of aggregation-based multigrid

✍ Scribed by Artem Napov; Yvan Notay

Book ID
102547399
Publisher
John Wiley and Sons
Year
2010
Tongue
English
Weight
347 KB
Volume
18
Category
Article
ISSN
1070-5325

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✦ Synopsis

A convergence analysis of two-grid methods based on coarsening by (unsmoothed) aggregation is presented. For diagonally dominant symmetric (M-)matrices, it is shown that the analysis can be conducted locally; that is, the convergence factor can be bounded above by computing separately for each aggregate a parameter, which in some sense measures its quality. The procedure is purely algebraic and can be used to control a posteriori the quality of automatic coarsening algorithms. Assuming the aggregation pattern is sufficiently regular, it is further shown that the resulting bound is asymptotically sharp for a large class of elliptic boundary value problems, including problems with variable and discontinuous coefficients. In particular, the analysis of typical examples shows that the convergence rate is insensitive to discontinuities under some reasonable assumptions on the aggregation scheme.

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