Ground states of nonlinear Schr\"odinger equations with sum of periodic and inverse-square potentials

Abstract

We study the existence of solutions of the following nonlinear Schr\"odinger equation equation* - u + (V(x)-μ|x|2) u = f(x,u) for x∈RN\0\, equation* where V:RN and f:RN×R are periodic in x∈R. We assume that 0 does not lie in the spectrum of -+V and μ<(N-2)24, N≥ 3. The superlinear and subcritical term f satisfies a weak monotonicity condition. For sufficiently small μ≥ 0 we find a ground state solution as a minimizer of the energy functional on a natural constraint. If μ<0 and 0 lies below the spectrum of -+V, then ground state solutions do not exist.