An annulus multiplier and applications to the Limiting absorption principle for Helmholtz equations with a step potential

Abstract

We consider the Helmholtz equation - u+V \, u - λ \, u = f on Rn where the potential V:Rn is constant on each of the half-spaces Rn-1× (-∞,0) and Rn-1× (0,∞). We prove an Lp-Lq-Limiting Absorption Principle for frequencies λ> \, V with the aid of Fourier Restriction Theory and derive the existence of nontrivial solutions of linear and nonlinear Helmholtz equations.