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SCATTERING OF PLANE ELASTIC WAVES BY THREE-DIMENSIONAL DIFFRACTION GRATINGS

JOHANNES ELSCHNER

Weierstrass Institute, Mohrenstr. 39, Berlin 10117, Germany

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and

GUANGHUI HU

Weierstrass Institute, Mohrenstr. 39, Berlin 10117, Germany

Corresponding author.

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https://doi.org/10.1142/S0218202511500199Cited by:19 (Source: Crossref)

Abstract

The reflection and transmission of a time-harmonic plane wave in an isotropic elastic medium by a three-dimensional diffraction grating is investigated. If the diffractive structure involves an impenetrable surface, we study the first, second, third and fourth kind boundary value problems for the Navier equation in an unbounded domain by the variational approach. A radiation condition based on the Rayleigh expansion of the quasi-periodic solutions is presented. Existence of solutions in Sobolev spaces is established if the grating profile is a two-dimensional Lipschitz surface, while uniqueness is proved only for small frequencies or for all frequencies excluding a discrete set. Similar solvability results are obtained for multilayered transmission gratings in the case of an incident pressure wave. Moreover, by a periodic Rellich identity, uniqueness of the solution to the first kind (Dirichlet) boundary value problem is established for all frequencies under the assumption that the impenetrable surface is given by the graph of a Lipschitz function.

Keywords:

AMSC: 74J20, 74B05, 35J55, 35B27

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