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 $\mathbb{H}n$ and the Euclidean space $\mathbb{R}n$. Firstly, using the inverse mean curvature flow, for the mean convex and star-shaped set $K$ in $\mathbb{H}n$, we obtain sharp upper bounds for the $p$-capacity $\mathrm{Cap}_p(K)$ in three cases: (1) $n\geq 2$ and $p=2$, (2) $n=2$ and $p\geq 3$, (3) $n=3$ and $1<p\leq 3$; Using the unit-speed normal flow, we prove a sharp upper bound for $\mathrm{Cap}_p(K)$ of a convex set $K$ in $\mathbb{H}^n$ for $n\geq 2$ and $p\>1$. Secondly, for the compact set $K$ in $\mathbb{R}3$, 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 $\mathbb{R}3$.
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