Multivalued Elliptic Equation with exponential critical growth in R2

Abstract

In this work we study the existence of nontrivial solution for the following class of multivalued elliptic problems - u+V(x)u-ε h(x)∈ ∂t F(x,u) in R2, (P) where ε>0, V is a continuous function verifying some conditions, h ∈ (H1(R2))* and ∂t F(x,u) is a generalized gradient of F(x,t) with respect to t and F(x,t)=∫0tf(x,s)\,ds. Assuming that f has an exponential critical growth and a discontinuity point, we have applied Variational Methods for locally Lipschitz functional to get two solutions for (P) when ε is small enough.