Overdetermined problems for the rotationally invariant Poisson equation in model manifolds

Abstract

We present rigidity results for overdetermined problems associated to the rotationally invariant Poisson equation -gM u = f(r) in a model manifold M = [0,S) ×h SN-1 with warping function h. The variable r ranges in the interval [0,S), whose endpoint S is positive and possibly infinite. The first part of the paper deals with the problem \[ arrayll -gM u=f(r) &in , u=(r) &on ∂ , ∂ u∂ = (r) &on ∂ , array \] where ⊂ M is a bounded domain containing the point O ∈ M corresponding to r = 0, is the exterior unit normal vector on ∂ , and f, , are three prescribed functions. In the second part of the paper, we consider a similar overdetermined problem for the exterior Bernoulli problem in a domain BR0(O), where BR0(O) denotes the geodesic ball centered at O with radius R0, within the class of functions that vanish on ∂ BR0(O). In both cases, we give conditions on f, and implying that the solution u is radial and is a geodesic ball centered at O. Our results apply in particular to the three space forms RN, HN and SN.