Multiplicity and concentration of dual solutions for a Helmholtz system

Abstract

In this paper, we are concerned with the nonlinear Helmholtz system of Hamiltonian type equation* \arrayl - u-k2 u=P(x)|v|p-2v, in\ RN, \\ - v-k2v=Q(x)|u|q-2u, in\ RN, array . equation* where N≥3, P,Q: RN→ R are two positive continuous functions, the exponents p,q>2 satisfy 1p+1q>N-2N. First, we obtained the existence of a ground state solution via a dual variational method. Moreover, the concentration behavior of such dual ground state solutions is established as k→∞, where a rescaling technique and the generalized Birman-Schwinger operator are involved. In addition, we also investigated the relation between the number of solutions and the topology of the set of the global maxima of the functions P and Q.