Resolvent, spectrum and resonances for the acoustic operator with piecewise constant coefficients

Abstract

We study the acoustic operator Av, :=v2∇\!·-1∇ with transmission conditions at the boundary of =1…n, where the 's are connected disjoint open bounded Lipschitz domains, the positive functions v and are constant on each connected component of and v==1 on R3. Through a formula for the resolvents difference (-Av, +z)-1-(-+z)-1, we provide a Limiting Absorption Principle, determine the spectrum, which turns out to be purely absolutely continuous, and, in the case the connected components of are of class C1,α, characterize the resonance set. The second part of the paper is devoted to the case where =() is connected with a small size and the -analytic functions v=v() and/or =() converge to 0+ inside () as 0; there, we provide the analytic -expansions of the resonances of Av, according to different choices of the rate of convergence towards zero of the material parameters.