Convergence analysis for finite element discretizations of the Helmholtz equation with Dirichlet-to-Neumann boundary conditions

Melenk, J.; Sauter, S.

doi:10.1090/S0025-5718-10-02362-8

Convergence analysis for finite element discretizations of the Helmholtz equation with Dirichlet-to-Neumann boundary conditions
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by J. M. Melenk and S. Sauter PDF

Math. Comp. 79 (2010), 1871-1914 Request permission

Abstract:

A rigorous convergence theory for Galerkin methods for a model Helmholtz problem in ${\mathbb {R}}^{d}$, $d \in \{1,2,3\}$ is presented. General conditions on the approximation properties of the approximation space are stated that ensure quasi-optimality of the method. As an application of the general theory, a full error analysis of the classical $hp$-version of the finite element method ($hp$-FEM) is presented for the model problem where the dependence on the mesh width $h$, the approximation order $p$, and the wave number $k$ is given explicitly. In particular, it is shown that quasi-optimality is obtained under the conditions that $kh/p$ is sufficiently small and the polynomial degree $p$ is at least $O(\log k)$.

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