Multigrid Methods: Managing Massive Meshes

Multigrid Methods: Managing Massive Meshes

In our last homework assignment, we investigated iterative methods for solving large, sparse, linear systems of equations. we saw that the Gauss-Seidel (GS) method was intolerably slow, but various forms of preconditioned conjugate gradient (CG) algorithms gave us reasonable results. The test proble...

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Veröffentlicht in:Computing in science & engineering 2006-09, Vol.8 (5), p.96-103
1. Verfasser: O'Leary, D.P.
Format: Artikel
Sprache:eng
Schlagworte:
Algorithms
Discretization
Engineering management
Equations
finite difference
finite element
Gaussian approximation
Gold
Home computing
Ingredients
Iterative methods
Linear systems
Mathematical analysis
multigrid
Multigrid methods
Partial differential equations
Roentgenium
Surface acoustic waves
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Zusammenfassung:In our last homework assignment, we investigated iterative methods for solving large, sparse, linear systems of equations. we saw that the Gauss-Seidel (GS) method was intolerably slow, but various forms of preconditioned conjugate gradient (CG) algorithms gave us reasonable results. The test problems we used were discretizations of elliptic partial differential equations, but for these problems, we can use a faster class of methods called multigrid algorithms. Surprisingly, the GS method (or some variant) is one of the two main ingredients in these algorithms!
ISSN:1521-9615
1558-366X
DOI:10.1109/MCSE.2006.94