Existence and regularity results for some Fully Non Linear singular or degenerate equation

Abstract

In this article we prove existence, uniqueness and regularity for the singular equation eqnarray* cases |∇ u|α(F(D2u)+h(x)·∇ u)+c(x)|u|αu+p(x)u-γ=0 \ in \ \\ u>0 \ in \ , \ u=0 \ on \ ∂ cases eqnarray* when p is some continuous and positive function, c and h are continuous, α > -1 and F is Fully non linear elliptic. Some conditions on the first eigenvalue for the operator |∇ u|α(F(D2u)+h(x)·∇ u)+c(x)|u|αu are required. The results generalizes the well known results of Lazer and Mac Kenna.