Paper Info
Title
Existence, Uniqueness, and Variational Methods for Scattering by Unbounded Rough Surfaces
Abstract
In this paper we study, via variational methods, the problem of scattering of time harmonic acoustic waves by an unbounded sound soft surface. The boundary partial derivative D is assumed to lie within a finite distance of a flat plane and the incident wave is that arising from an inhomogeneous term in the Helmholtz equation whose support lies within some finite distance of the boundary partial derivative D. Via analysis of an equivalent variational formulation, we provide the first proof of existence of a unique solution to a three-dimensional rough surface scattering problem for an arbitrary wave number. Our method of analysis does not require any smoothness of the boundary which can, for example, be the graph of an arbitrary bounded continuous function. An attractive feature is that all constants in a priori bounds, for example the inf-sup constant of the sesquilinear form, are bounded by explicit functions of the wave number and the maximum surface elevation.
Year
DOI
Venue
2005
10.1137/040615523
SIAM JOURNAL ON MATHEMATICAL ANALYSIS
Keywords
DocType
Volume
nonsmooth boundary,radiation condition,a priori estimate,inf-sup constant,Helmholtz equation
Journal
37
Issue
ISSN
Citations 
2
0036-1410
21
PageRank 
References 
Authors
2.25
2
2
Name
Order
Citations
PageRank
Simon N. Chandler-Wilde111616.79
Peter Monk223072.81