Existence of solution for a class of elliptic equation with discontinuous nonlinearity and asymptotically linear

Abstract

This paper concerns the existence of a nontrivial solution for the following problem equation \aligned - u + V(x)u & ∈ ∂u F(x,u)\;\;a.e. in\;\;RN, u ∈ H1(RN), aligned .≤no(P) equation where F(x,t)=∫0tf(x,s)\,ds, f is a discontinuous function and asymptotically linear at infinity, λ=0 is in a spectral gap of -+V, and ∂t F denotes the generalized gradient of F with respect to variable t. Here, by employing Variational Methods for Locally Lipschitz Functionals, we establish the existence of solution when f is periodic and non periodic