A new Heterogeneous Multiscale Method for the Helmholtz equation with high contrast

Ohlberger M, Verfürth B

Research article (journal) | Peer reviewed

Abstract

In this paper, we suggest a new heterogeneous multiscale method (HMM) for the Helmholtz equation with high contrast. The method is constructed for a setting as in Bouchitte and Felbacq [C. R. Math. Acad. Sci. Paris, 339 (2004), pp. 377-382], where the high contrast in the parameter leads to unusual effective parameters in the homogenized equation. We revisit existing homogenization approaches for this special setting and analyze the stability of the two-scale solution with respect to the wavenumber and the data. This includes a new stability result for solutions to the Helmholtz equation with discontinuous diffusion matrix. The HMM is defined as direct discretization of the two-scale limit equation. With this approach we are able to show quasi-optimality and an a priori error estimate under a resolution condition that inherits its dependence on the wavenumber from the stability constant for the analytical problem. Numerical experiments confirm our theoretical convergence results and examine the resolution condition. Moreover, the numerical simulation gives a good insight and explanation of the physical phenomenon of frequency band gaps.Read More:http://epubs.siam.org/doi/10.1137/16M1108820

Details about the publication

JournalMultiscale Modeling and Simulation: A SIAM Interdisciplinary Journal (Multiscale Model. Simul.)
Volume16
Issue1
Page range385-411
StatusPublished
Release year2018
Language in which the publication is writtenEnglish
DOI10.1137/16M1108820

Authors from the University of Münster

Ohlberger, Mario
Professorship of Applied Mathematics, especially Numerics (Prof. Ohlberger)
Center for Nonlinear Science
Center for Multiscale Theory and Computation
Verfürth, Barbara
Professorship of Applied Mathematics, especially Numerics (Prof. Ohlberger)