Sharp upper bounds for the capacity in the hyperbolic and Euclidean spaces

Abstract

We derive various sharp upper bounds for the p-capacity of a smooth compact set K in the hyperbolic space Hn and the Euclidean space Rn. Firstly, using the inverse mean curvature flow, for the mean convex and star-shaped set K in Hn, we obtain sharp upper bounds for the p-capacity Capp(K) in three cases: (1) n≥ 2 and p=2, (2) n=2 and p≥ 3, (3) n=3 and 1<p≤ 3; Using the unit-speed normal flow, we prove a sharp upper bound for Capp(K) of a convex set K in Hn for n≥ 2 and p>1. Secondly, for the compact set K in R3, using the weak inverse mean curvature flow, we get a sharp upper bound for the p-capacity (1<p<3) of the set K with connected boundary; Using the inverse anisotropic mean curvature flow, we deduce a sharp upper bound for the anisotropic p-capacity (1<p<3) of an F-mean convex and star-shaped set K in R3.