A quasilinear problem in two parameters depending on the gradient
Abstract
The existence of positive solutions is considered for the Dirichlet problem \left\{ \begin{array} [c]{rcll}% -\Delta_{p}u & = & \lambda\omega_{1}(x)\left\vert u\right\vert ^{q-2}% u+\beta\omega_{2}(x)\left\vert u\right\vert ^{a-1}u|\nabla u|^{b} & \text{in }\Omega\\ u & = & 0 & \text{on }\partial\Omega, \end{array} \right. where and are positive parameters, and are positive constants satisfying , and are nonnegative weights and . The homogeneous case is handled by making in the sublinear case which is based on the sub- and super-solution method. The core of the proof of this problem is then generalized to the Dirichlet problem in , where is a nonnegative, continuous function satisfying simple, geometrical hypotheses. This approach might be considered as a unification of arguments dispersed in various papers, with the advantage of handling also nonlinearities that depend on the gradient, even in the -growth case. It is then applied to the problem with Dirichlet boundary conditions in the domain .
Cite
@article{arxiv.1011.3169,
title = {A quasilinear problem in two parameters depending on the gradient},
author = {Hamilton Bueno and Grey Ercole},
journal= {arXiv preprint arXiv:1011.3169},
year = {2010}
}