Singular elliptic equations having a gradient term with natural growth

Abstract

We study a class of Dirichlet boundary value problems whose prototype is equation1.2abs \arrayll -p u =h(u)|∇ u|p+uq-1+f(x)\, &in \ \,,\\ u 0\,,&in \ \\ u = 0\,&on ∂ \,,array. equation where an open bounded subset of RN, 0<q<1, 1<p<N, h is a continuous function and f belongs to a suitable Lebesgue space. The main features of this problem are the presence of a singular term and a first order term with natural growth in the gradient. A priori estimates and existence results are proved depending on the summability of the datum f.