On the harmonic characterization of the spheres: a sharp stability inequality and some of its consequences

Abstract

Let D be a bounded open subset of Rn with |∂ D| < ∞ and let x0 be a point of D. We introduce a new parameter, that we call Kuran gap of ∂ D w.r.t. x0. Roughly speaking, this parameter, denoted by K(∂ D, x0), measures the gap between u(x0) and the average of u on ∂ D for a particular family of functions u harmonic in D, in terms of the Poisson kernel of the biggest ball B centered at x0 and contained in D. To do that, we need the domain D Lyapunov-Dini regular in at least one of the points of ∂ D nearest to x0. Our main stability result can be described as follows: K(∂ D, x0) is bounded from below by a kind of isoperimetric index, precisely the normalized difference beetween |∂ D| and |∂ B|. This extends a stability result by Preiss and Toro, and a more recent theorem by Agostiniani and Magnanini. Moreover, from our stability inequality we obtain a new sufficient condition for a harmonic pseudosphere to be a Euclidean sphere, a result which partially improves a rigidity theorem by Lewis and Vogel. Finally, we give a new solution of the surface version of a solid ``potato'' problem by Aharonov, Schiffer and Zalcman.