Allu, V., & Pandey, A. (2024). Visible Quasihyperbolic Geodesics. arXiv preprint arXiv:2306.03815v3.
This paper investigates the conditions under which the identity map between a bounded domain equipped with the quasihyperbolic metric and the same domain with the Euclidean metric extends continuously or homeomorphically to the boundary. This exploration aims to address the broader question of when the Gromov boundary and the Euclidean boundary of a domain are equivalent.
The authors introduce the concept of QH-visibility domains, inspired by the notion of visibility in hyperbolic geometry. They analyze the behavior of quasihyperbolic geodesics in these domains, particularly how they "bend inside" when connecting points near the boundary. The authors then relate this geometric property to the Gromov hyperbolicity of the domain and the extension properties of the identity map between the quasihyperbolic and Euclidean metrics.
The introduction and characterization of QH-visibility domains provide a new perspective on the geometry of domains in relation to the quasihyperbolic metric. The equivalence between QH-visibility and the extension properties of the identity map offers a powerful tool for understanding the relationship between the Gromov boundary and the Euclidean boundary. The results presented contribute significantly to the study of Gromov hyperbolicity and the geometric function theory of domains.
This research significantly advances the understanding of the quasihyperbolic metric and its connection to the geometry of domains. The concept of QH-visibility provides a new tool for analyzing the behavior of quasihyperbolic geodesics and their influence on boundary behavior. The findings have implications for various areas of geometric function theory, including the study of quasiconformal mappings and the extension properties of mappings between metric spaces.
The paper primarily focuses on bounded domains. Further research could explore the concept of QH-visibility for unbounded domains and investigate its implications for the Gromov hyperbolicity and boundary behavior in a broader context. Additionally, exploring the connections between QH-visibility and other geometric properties of domains, such as convexity and various notions of uniformity, could lead to a deeper understanding of the interplay between metric geometry and geometric function theory.
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