Volume 11, pp. 1-24, 2000.
Neumann-Neumann methods for vector field problems
Andrea Toselli
Abstract
In this paper, we study some Schwarz methods of Neumann–Neumann type for some vector field problems, discretized with the lowest order Raviart and Nédélec finite elements. We consider a hybrid Schwarz preconditioner consisting of a coarse component, which involves the solution of the original problem on a coarse mesh, and local ones, which involve the solution of Neumann problems on the elements of the coarse triangulation, also called substructures. We show that the condition number of the corresponding method is independent of the number of substructures and grows logarithmically with the number of unknowns associated with an individual substructure. It is also independent of the jumps of both the coefficients of the original problem. The numerical results presented validate our theoretical bound.
Full Text (PDF) [290 KB], BibTeX
Key words
edge elements, Raviart–Thomas elements, domain decomposition, iterative substructuring, preconditioners, heterogeneous coefficients
AMS subject classifications
65F10, 65N22, 65N30, 65N55.
Links to the cited ETNA articles
[17] | Vol. 6 (1997), pp. 133-152 R. Hiptmair: Multigrid method for $H({\rm div})$ in three dimensions |
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