## S. Borghini - G. Mascellani - L. Mazzieri

# Some Sphere Theorems in Linear Potential Theory

created by giovanni on 17 Nov 2017

modified on 18 Nov 2017

[

BibTeX]

*preprint*

**Inserted:** 17 nov 2017

**Last Updated:** 18 nov 2017

**Year:** 2017

**Abstract:**

In this paper we analyze the capacitary potential due to a charged body in
order to deduce sharp analytic and geometric inequalities, whose equality cases
are saturated by domains with spherical symmetry. In particular, for a regular
bounded domain $\Omega \subset \mathbb{R}^n$, $n\geq 3$, we prove that if the
mean curvature $H$ of the boundary obeys the condition $ - \bigg[
\frac{1}{\text{Cap}(\Omega)} \bigg]^{\frac{1}{n-2}} \leq \frac{H}{n-1} \leq
\bigg[ \frac{1}{\text{Cap}(\Omega)} \bigg]^{\frac{1}{n-2}} $, then $\Omega$
is a round ball.