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

Abstract

A proper subdomain G of the unit disk D is horocyclically convex (horo-convex) if, for every ω ∈ D ∂ G, there exists a horodisk H such that ω ∈ ∂ H and G H=. 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 C1 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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