Multiscale analysis of the acoustic scattering by many scatterers of impedance type

Abstract

We are concerned with the acoustic scattering problem, at a frequency , by many small obstacles of arbitrary shapes with impedance boundary condition. These scatterers are assumed to be included in a bounded domain in R3 which is embedded in an acoustic background characterized by an eventually locally varying index of refraction. The collection of the scatterers Dm, \; m=1,...,M is modeled by four parameters: their number M, their maximum radius a, their minimum distance d and the surface impedances λm, \; m=1,...,M. We consider the parameters M, d and λm's having the following scaling properties: M:=M(a)=O(a-s), d:=d(a)≈ at and λm:=λm(a)=λm,0a-β, as a → 0, with non negative constants s, t and β and complex numbers λm, 0's with eventually negative imaginary parts. We derive the asymptotic expansion of the farfields with explicit error estimate in terms of a, as a→ 0. The dominant term is the Foldy-Lax field corresponding to the scattering by the point-like scatterers located at the centers zm's of the scatterers Dm's with λm ∂ Dm as the related scattering coefficients.