A nonsmooth variational approach to semipositone quasilinear problems in RN

Abstract

This paper concerns the existence of a solution for the following class of semipositone quasilinear problems equation* \ arrayrclcl -p u = h(x)(f(u)-a),\ & u > 0 & in & RN, array . equation* where 1<p<N, a>0, f:[0,+∞) [0,+∞) is a function with subcritical growth and f(0)=0, while h:RN (0,+∞) is a continuous function that satisfies some technical conditions. We prove via nonsmooth critical points theory and comparison principle, that a solution exists for a small enough. We also provide a version of Hopf's Lemma and a Liouville-type result for the p-Laplacian in the whole RN.