Mixed Finite Element Analysis of Eigenvalue Problems on Curved Domains

Anahí Dello Russo; Ana E. Alonso

doi:10.1515/cmam-2013-0014

Article

Mixed Finite Element Analysis of Eigenvalue Problems on Curved Domains

Anahí Dello Russo and Ana E. Alonso

Published/Copyright: July 16, 2013

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From the journal Computational Methods in Applied Mathematics Volume 14 Issue 1

Abstract.

In this paper we present a theoretical framework for the analysis of the numerical approximations of a particular class of eigenvalue problems by mixed/hybrid methods. More precisely, we are interested in eigenproblems which are defined over curved domains or have internal curved boundaries and which may be associated with non-compact inverse operators. To do this, we consider external domain approximations Ωh of the original domain Ω, i.e., Ωh¬⊂Ω. Sufficient conditions to ensure good convergence properties and optimal error bounds for the external approximations of the eigenfunction/eigenvalue pairs are established. Then, these results are applied to the study of the Stokes eigenvalue problem with slip boundary condition defined on a curved non-convex two-dimensional domain.

Keywords: Spectral Approximation Theory; Mixed or Hybrid Methods; Curved Domains; Stokes Eigenvalue Problem; Slip Boundary Conditions

MSC: 65N12; 65N25; 65N30

Published Online: 2013-07-16

Published in Print: 2014-01-01

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Articles in the same Issue

https://doi.org/10.1515/cmam-2013-0014

Keywords for this article

Spectral Approximation Theory; Mixed or Hybrid Methods; Curved Domains; Stokes Eigenvalue Problem; Slip Boundary Conditions