A quasilinear problem with fast growing gradient

Abstract

In this paper we consider the following Dirichlet problem for the p-Laplacian in the positive parameters λ and β: [array [c]rcll% -pu & = & λ h(x,u)+β f(x,u,∇ u) & in u & = & 0 & on∂, array. ] where h,f are continuous nonlinearities satisfying 0≤ω1(x)uq-1≤ h(x,u)≤ω2(x)uq-1 with 1<q<p and 0≤ f(x,u,v)≤ω3(x)ua|v|b, with a,b>0, and is a bounded domain of RN, N≥3. The functions ωi, 1≤ i≤3, are nonnegative, continuous weights in . We prove that there exists a region D in the λβ-plane where the Dirichlet problem has at least one positive solution. The novelty in this paper is that our result is valid for nonlinearities with growth higher than p in the gradient variable.