Existence of solution for a class of quasilinear problem in Orlicz-Sobolev space without 2-condition

Abstract

In this paper we study existence of solution for a class of problem of the type \ arrayll -u=f(u), in u=0, on ∂ , array . where ⊂ RN, N ≥ 2, is a smooth bounded domain, f:R R is a continuous function verifying some conditions, and :R R is a N-function which is not assumed to satisfy the well known 2-condition, then the Orlicz-Sobolev space W1,0() can be non reflexive. As main model we have the function (t)=(et2-1)/2. Here, we study some situations where it is possible to work with global minimization, local minimization and mountain pass theorem, however some estimates are not standard for this type of problem.