On a Bernoulli-type overdetermined free boundary problem

Abstract

In this article we study a Bernoulli-type free boundary problem and generalize a work of Henrot and Shahgholian in HS1 to A-harmonic PDEs. These are quasi-linear elliptic PDEs whose structure is modeled on the p-Laplace equation for a fixed 1<p<∞. In particular, we show that if K is a bounded convex set satisfying the interior ball condition and c>0 is a given constant, then there exists a unique convex domain with K⊂ and a function u which is A-harmonic in K, has continuous boundary values 1 on ∂ K and 0 on ∂, such that |∇ u|=c on ∂ . Moreover, ∂ is C1,γ for some γ>0, and it is smooth provided A is smooth in Rn \0\. We also show that the super level sets \u>t\ are convex for t∈ (0,1).