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Condenser capacity and hyperbolic diameter
Published 12 Nov 2020 in math.MG | (2011.06293v2)
Abstract: Given a compact connected set $E$ in the unit disk $\mathbb{B}{2}$, we give a new upper bound for the conformal capacity of the condenser $(\mathbb{B}{2}, E)$ in terms of the hyperbolic diameter $t$ of $E$. Moreover, for $t>0$, we construct a set of hyperbolic diameter $t$ and apply novel numerical methods to show that it has larger capacity than a hyperbolic disk with the same diameter. The set we construct is called a Reuleaux triangle in hyperbolic geometry and it has constant hyperbolic width equal to $t$.
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