Winter 2022 TOWARDS COERCIVE BOUNDARY ELEMENT METHODS FOR THE WAVE EQUATION
Olaf Steinbach, Carolina Urzúa–Torres, Marco Zank
J. Integral Equations Applications 34(4): 501-515 (Winter 2022). DOI: 10.1216/jie.2022.34.501

Abstract

We discuss the ellipticity of the single layer boundary integral operator for the wave equation in one space dimension. This result not only generalizes the well-known ellipticity of the energetic boundary integral formulation in L2, but it also turns out to be a particular case of a recent result on the inf-sup stability of boundary integral operators for the wave equation. Instead of the time derivative in the energetic formulation, we use a modified Hilbert transformation, which allows us to stay in Sobolev spaces of the same order. This results in the applicability of standard boundary element error estimates, which are confirmed by numerical results.

Citation

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Olaf Steinbach. Carolina Urzúa–Torres. Marco Zank. "TOWARDS COERCIVE BOUNDARY ELEMENT METHODS FOR THE WAVE EQUATION." J. Integral Equations Applications 34 (4) 501 - 515, Winter 2022. https://doi.org/10.1216/jie.2022.34.501

Information

Received: 2 June 2021; Revised: 5 April 2022; Accepted: 8 April 2022; Published: Winter 2022
First available in Project Euclid: 10 January 2023

zbMATH: 1512.35398
MathSciNet: MR4531470
Digital Object Identifier: 10.1216/jie.2022.34.501

Subjects:
Primary: 35L05 , ‎45P05‎ , 65M38

Keywords: ellipticity , modified Hilbert transformation , single layer boundary integral operator , wave equation

Rights: Copyright © 2022 Rocky Mountain Mathematics Consortium

Vol.34 • No. 4 • Winter 2022
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