Singular perturbation of reduced wave equation and scattering from an embedded obstacle

Abstract

We consider time-harmonic wave scattering from an inhomogeneous isotropic medium supported in a bounded domain ⊂RN (N≥ 2). In a subregion D, the medium is supposed to be lossy and have a large mass density. We study the asymptotic development of the wave field as the mass density → +∞ and show that the wave field inside D will decay exponentially while the wave filed outside the medium will converge to the one corresponding to a sound-hard obstacle D buried in the medium supported in D. Moreover, the normal velocity of the wave field on ∂ D from outside D is shown to be vanishing as → +∞. We derive very accurate estimates for the wave field inside and outside D and on ∂ D in terms of , and show that the asymptotic estimates are sharp. The implication of the obtained results is given for an inverse scattering problem of reconstructing a complex scatterer.