A limiting absorption principle for the Helmholtz equation with variable coefficients

Abstract

We prove a limiting absorption principle for a generalized Helmholtz equation on an exterior domain with Dirichlet boundary conditions equation* (L+λ)v=f, λ∈ R equation* under a Sommerfeld radiation condition at infinity. The operator L is a second order elliptic operator with variable coefficients, the principal part is a small, long range perturbation of -, while lower order terms can be singular and large. The main tool is a sharp uniform resolvent estimate, which has independent applications to the problem of embedded eigenvalues and to smoothing estimates for dispersive equations.