Positive Solutions for the p-Laplacian with Dependence on the Gradient

Abstract

We prove a result of existence of positive solutions of the Dirichlet problem for -p u=w(x)f(u,∇ u) in a bounded domain ⊂RN, where p is the p-Laplacian and w is a weight function. As in previous results by the authors, and in contrast with the hypotheses usually made, no asymptotic behavior is assumed on f, but simple geometric assumptions on a neighborhood of the first eigenvalue of the p-Laplacian operator. We start by solving the problem in a radial domain by applying the Schauder Fixed Point Theorem and this result is used to construct an ordered pair of sub- and super-solution, also valid for nonlinearities which are super-linear both at the origin and at +∞. We apply our method to the Dirichlet problem -pu = λ u(x)q-1(1+|∇ u(x)|p) in and give examples of super-linear nonlinearities which are also handled by our method.