On an Internal Characterization of Horocyclically Convex Domains in the Unit Disk

Juan Arango, Hugo Arbeláez, Diego Mejía
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Abstract

A proper subdomain $G$ of the unit disk $\mathbb{D}$ is horocyclically convex (horo-convex) if, for every $\omega \in \mathbb{D}\cap \partial G$, there exists a horodisk $H$ such that $\omega \in \partial H$ and $G\cap H=\emptyset$. In this paper we give an internal characterization of these domains, namely, that $G$ is horo-convex if and only if any two points can be joined inside $G$ by a $C^1$ curve composed with finitely many Jordan arcs with hyperbolic curvature in $(-2,2)$. We also give a lower bound for the hyperbolic metric of horo-convex regions and some consequences.
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论单位盘中环状凸域的内部特征
如果对于每一个 $\omega \in \mathbb{D}\cap \partial G$,存在一个角盘 $H$,使得 $\omega \in \partial H$,并且 $G\capH=\emptyset$, 那么单位盘 $\mathbb{D}$ 的一个适当子域 $G$ 是角环凸(角凸)的。在本文中,我们给出了角域的内部特征,即当并且仅当任意两点可以在 $G$ 内通过一条由有限多条在 $(-2,2)$ 内具有双曲曲率的乔丹弧组成的 $C^1$ 曲线相接时,$G$ 是角凸的。我们还给出了角凸区域双曲度量的下限及一些结果。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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