Existence of ground state solutions of Nehari-Pankov type to Schr\"odinger systems

Abstract

This paper is dedicated to studying the following elliptic system of Hamiltonian type: \ arrayll -2 u+u+V(x)v=Q(x)Fv(u, v), \ \ \ \ x∈ RN,\\ -2 v+v+V(x)u=Q(x)Fu(u, v), \ \ \ \ x∈ RN,\\ |u(x)|+|v(x)| → 0, \ \ as \ |x|→ ∞, array. where N 3, V, Q∈ C(RN, R), V(x) is allowed to be sign-changing and ∈f Q > 0, and F∈ C1(R2, R) is superquadratic at both 0 and infinity but subcritical. Instead of the reduction approach used in [Calc Var PDE, 2014, 51: 725-760], we develop a more direct approach -- non-Nehari manifold approach to obtain stronger conclusions but under weaker assumptions than these in [Calc Var PDE, 2014, 51: 725-760]. We can find an 0>0 which is determined by terms of N, V, Q and F, then we prove the existence of a ground state solution of Nehari-Pankov type to the coupled system for all ∈ (0, 0].