Towards Stable Second-Kind Boundary Integral Equations for Transient Wave Problems

Abstract

In this paper, we discuss the stable discretisation of the double layer boundary integral operator for the wave equation in 1d. For this, we show that the boundary integral formulation is L2-elliptic and also inf-sup stable in standard energy spaces. This turns out to be a particular case of a recent result on the inf-sup stability of boundary integral operators for the wave equation and contributes to its further understanding. Moreover, we present the first BEM discretisations of second-kind operators for the wave equation for which stability is guaranteed and a complete numerical analysis is offered. We validate our theoretical findings with numerical experiments.

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