Local behaviour of the solutions of the Chipot-Weissler equation

Abstract

We study the local properties of positive solutions of the equation - u=up-m|∇ u|q in a punctured domain \0\ of RN or in a exterior domain RN Br0 in the range \p,q\>1 and m>0. We prove a series of a priori estimates depending p and q, and of the sign of q- 2pp+1 and q-p. Using various techniques we obtain removability results for singular sets and we give a precise description of behaviour of solutions near an isolated singularity or at infinity in RN.