Non-Nehari manifold method for asymptotically periodic Schr\"odinger equation

Abstract

We consider the semilinear Schr\"odinger equation \ arrayll - u+V(x)u=f(x, u), \ \ \ \ x∈ N, u∈ H1(N), array . where f is a superlinear, subcritical nonlinearity. We mainly study the case where V(x)=V0(x)+V1(x), V0∈ C(RN), V0(x) is 1-periodic in each of x1, x2, …, xN and [σ(- +V0) (-∞, 0)]<0<∈f[σ(- +V0) (0, ∞)], V1∈ C(RN) and |x|∞V1(x)=0. Inspired by previous work of Li et al. LWZ, Pankov Pa and Szulkin and Weth Sz, we develop a more direct approach to generalize the main result in Sz by removing the "strictly increasing" condition in the Nehari type assumption on f(x, t)/|t|. Unlike the Nahari manifold method, the main idea of our approach lies on finding a minimizing Cerami sequence for the energy functional outside the Nehari-Pankov manifold N0 by using the diagonal method.