On Serrin's overdetermined problem and a conjecture of Berestycki, Caffarelli and Nirenberg

Abstract

This paper concerns rigidity results to Serrin's overdetermined problem in an epigraph \aligned & u+ f(u)=0,\ \ \ in\ =\(x,xn): xn> (x)\,\\ &u>0,\ \ \ in\ ,\\ &u=0,\ \ \ on\ ∂,\\ &|∇ u|=const. on ∂. aligned. We prove that up to isometry the epigraph must be an half space and that the solution u must be one-dimensional, provided that one of the following assumptions are satisfied: either n=2; or is globally Lipschitz, or n ≤ 8 and ∂ u∂ xn >0 in . In view of the counterexample constructed in DPW in dimensions n≥ 9 this result is optimal. This partially answers a conjecture of Berestycki, Caffarelli and Nirenberg BCN.