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December 2022 Gromov Boundaries of Non-proper Hyperbolic Geodesic Spaces
Yo HASEGAWA
Tokyo J. Math. 45(2): 319-331 (December 2022). DOI: 10.3836/tjm/1502179357

Abstract

In a proper hyperbolic geodesic space, it is well known that the sequential boundary can be identified as topological spaces with the geodesic boundary. We show that in a (not necessarily proper) hyperbolic geodesic space, the sequential boundary can be identified as topological spaces with the quasi-geodesic boundary.

Citation

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Yo HASEGAWA. "Gromov Boundaries of Non-proper Hyperbolic Geodesic Spaces." Tokyo J. Math. 45 (2) 319 - 331, December 2022. https://doi.org/10.3836/tjm/1502179357

Information

Received: 11 September 2020; Revised: 7 May 2021; Published: December 2022
First available in Project Euclid: 9 January 2023

MathSciNet: MR4530606
zbMATH: 07653738
Digital Object Identifier: 10.3836/tjm/1502179357

Subjects:
Primary: 54E35

Keywords: (Gromov) hyperbolic spaces , geodesic boundariese , quasi-geodesic boundaries , sequential boundaries

Rights: Copyright © 2022 Publication Committee for the Tokyo Journal of Mathematics

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Vol.45 • No. 2 • December 2022
Publication Committee for the Tokyo Journal of Mathematics
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