Issue |
ESAIM: M2AN
Volume 58, Number 2, March-April 2024
|
|
---|---|---|
Page(s) | 793 - 831 | |
DOI | https://doi.org/10.1051/m2an/2023105 | |
Published online | 24 April 2024 |
Quasi-local and frequency-robust preconditioners for the Helmholtz first-kind integral equations on the disk
1
Département Mathématiques, Centre Borelli, ENS Paris-Saclay, 91190 Gif-sur-Yvette, France
2
Laboratoire Angevin de Recherche en Mathématiques, Université d’Angers, 2 Bd Lavoisier, 49000 Angers, France
* Corresponding author: martin.averseng@univ-angers.fr
Received:
18
July
2022
Accepted:
19
December
2023
We propose preconditioners for the Helmholtz scattering problems by a planar, disk-shaped screen in ℝ3. Those preconditioners are approximations of the square-roots of some partial differential operators acting on the screen. Their matrix-vector products involve only a few sparse system resolu- tions and can thus be evaluated cheaply in the context of iterative methods. For the Laplace equation (i.e. for the wavenumber k = 0) with Dirichlet condition on the disk and on regular meshes, we prove that the preconditioned linear system has a bounded condition number uniformly in the mesh size. We further provide numerical evidence indicating that the preconditioners also perform well for large values of k and on locally refined meshes.
Mathematics Subject Classification: 65N38 / 65F08 / 35A21
Key words: Boundary element methods / preconditioning / singularities in PDEs
© The authors. Published by EDP Sciences, SMAI 2024
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