H\"older stability for Serrin's overdetermined problem

Abstract

In a bounded domain , we consider a positive solution of the problem u+f(u)=0 in , u=0 on ∂, where f:R is a locally Lipschitz continuous function. Under sufficient conditions on (for instance, if is convex), we show that ∂ is contained in a spherical annulus of radii ri<re, where re-ri≤ C\,[u]∂α for some constants C>0 and α∈ (0,1]. Here, [u]∂ is the Lipschitz seminorm on ∂ of the normal derivative of u. This result improves to H\"older stability the logarithmic estimate obtained in [1] for Serrin's overdetermined problem. It also extends to a large class of semilinear equations the H\"older estimate obtained in [6] for the case of torsional rigidity (f 1) by means of integral identities. The proof hinges on ideas contained in [1] and uses Carleson-type estimates and improved Harnack inequalities in cones.