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Block-diagonal and indefinite symmetric preconditioners for mixed finite element formulations

✍ Scribed by I. Perugia; V. Simoncini

Publisher
John Wiley and Sons
Year
2000
Tongue
English
Weight
223 KB
Volume
7
Category
Article
ISSN
1070-5325

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✦ Synopsis

We are interested in the numerical solution of large structured indefinite symmetric linear systems arising in mixed finite element approximations of the magnetostatic problem; in particular, we analyse definite block-diagonal and indefinite symmetric preconditioners. Relating the algebraic characteristics of the resulting preconditioned matrix to the properties of the continuous problem and of its finite element discretization, we show that the preconditioning strategies considered make the Krylov subspace solver used insensitive to the mesh refinement parameter, in terms of the number of iterations. In order to achieve computational efficiency, we also analyse algebraic approximations to the optimal preconditioners, and discuss their performance on real two-and threedimensional application problems.

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We present reliable finite element discretizations based on displacement/pressure interpolations for the analysis of acoustic fluid-structure interaction problems. The finite element interpolations are selected using the inf-sup condition, and emphasis is given to the fact that the boundary conditio