Dual variational methods and nonvanishing for the nonlinear Helmholtz equation

Abstract

We set up a dual variational framework to detect real standing wave solutions of the nonlinear Helmholtz equation - u-k2 u =Q(x)|u|p-2u, u ∈ W2,p(RN) with N≥ 3, 2(N+1)(N-1)< p<2NN-2 and nonnegative Q ∈ L∞(RN). We prove the existence of nontrivial solutions for periodic Q as well as in the case where Q(x) 0 as |x|∞. In the periodic case, a key ingredient of the approach is a new nonvanishing theorem related to an associated integral equation. The solutions we study are superpositions of outgoing and incoming waves and are characterized by a nonlinear far field relation.