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Local absorbing boundary conditions on fixed domains give order-one errors for high-frequency waves

Jeffrey Galkowski, David Lafontaine, Euan A. Spence

2023IMA Journal of Numerical Analysis17 citationsDOIOpen Access PDF

Abstract

Abstract We consider approximating the solution of the Helmholtz exterior Dirichlet problem for a nontrapping obstacle, with boundary data coming from plane-wave incidence, by the solution of the corresponding boundary value problem where the exterior domain is truncated and a local absorbing boundary condition coming from a Padé approximation (of arbitrary order) of the Dirichlet-to-Neumann map is imposed on the artificial boundary (recall that the simplest such boundary condition is the impedance boundary condition). We prove upper- and lower-bounds on the relative error incurred by this approximation, both in the whole domain and in a fixed neighbourhood of the obstacle (i.e., away from the artificial boundary). Our bounds are valid for arbitrarily-high frequency, with the artificial boundary fixed, and show that the relative error is bounded away from zero, independent of the frequency, and regardless of the geometry of the artificial boundary.

Topics & Concepts

MathematicsMathematical analysisNeumann boundary conditionMixed boundary conditionBoundary value problemBoundary (topology)Helmholtz equationBounded functionRobin boundary conditionDirichlet boundary conditionCauchy boundary conditionBoundary conditions in CFDObstacle problemElectromagnetic Scattering and AnalysisElectromagnetic Simulation and Numerical MethodsNumerical methods in engineering
Local absorbing boundary conditions on fixed domains give order-one errors for high-frequency waves | Litcius