Regularity of complex geodesics and (non)-Gromov hyperbolicity of convex tube domains

TL;DR

This paper investigates the geometric properties of convex tube domains, providing criteria for non-Gromov hyperbolicity, exploring the connection with Hilbert metrics, and analyzing the boundary behavior of complex geodesics.

Contribution

It introduces a criterion for non-Gromov hyperbolicity of convex tube domains and explores the relationship between their geometry and the Hilbert metric, along with boundary properties of geodesics.

Findings

Examples of non-Gromov hyperbolic tube domains with convex bases.

A criterion for non-Gromov hyperbolicity of non-smooth domains.

Continuity properties of complex geodesics up to the boundary.

Abstract

We deliver examples of non-Gromov hyperbolic tube domains with convex bases (equipped with the Kobayashi distance). This is shown by providing a criterion on non-Gromov hyperbolicity of (non-smooth) domains.The results show the similarity of geometry of the bases of non-Gromov hyperbolic tube domains with the geometry of non-Gromov hyperbolic convex domains. A connection between the Hilbert metric of a convex domain $\Omega$ in $\mathbb R^n$ with the Kobayashi distance of the tube domain over the domain $\Omega$ is also shown. Moreover, continuity properties up to the boundary of complex geodesics in tube domains with a smooth convex bounded base are also studied in detail.