A priori estimates and application to the symmetry of solutions for critical p-Laplace equations

Abstract

We establish pointwise a priori estimates for solutions in D1,p(Rn) of equations of type -pu=f(x,u), where p∈(1,n), p:=div(|∇ u|p-2∇ u) is the p-Laplace operator, and f is a Caratheodory function with critical Sobolev growth. In the case of positive solutions, our estimates allow us to extend previous radial symmetry results. In particular, by combining our results and a result of Damascelli-Ramaswamy, we are able to extend a recent result of Damascelli-Merch\'an-Montoro-Sciunzi on the symmetry of positive solutions in D1,p(Rn) of the equation -pu=up*-1, where p*:=np/(n-p).