The Leray-Lions existence theorem under general growth conditions

Abstract

We prove an existence result of weak solutions u∈ W01,p( ) Wloc1,q( ) , to a Dirichlet problem for a second order elliptic equation in divergence form, under general and p,q-growth conditions of the differential operator. This is a first attempt to extend to general growth the well known Leray-Lions existence theorem, which holds under the so-called natural growth conditions with q=p. We found a way to treat the general context with explicit dependence on ( x,u) , other than on the gradient variable =Du; these aspects require particular attention due to the p,q-context, with some differences and new difficulties compared to the standard case p=q.