Gromov hyperbolicity through decomposition of metrics spaces II

Gromov hyperbolicity through decomposition of metrics spaces II

In this article we study the hyperbolicity in the Gromov sense of metric spaces. We deduce the hyperbolicity of a space from the hyperbolicity of its “building block components,” which can be joined following an arbitrary scheme. These results are especially valuable since they simplify notably the...

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Veröffentlicht in:The Journal of geometric analysis 2004-01, Vol.14 (1), p.123-149
Hauptverfasser: Portilla, Ana, Rodríguez, José M, Tourís Eva
Format: Artikel
Sprache:eng
Schlagworte:
Funnels
Geometry
Metric space
Riemann surfaces
Topology
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Zusammenfassung:In this article we study the hyperbolicity in the Gromov sense of metric spaces. We deduce the hyperbolicity of a space from the hyperbolicity of its “building block components,” which can be joined following an arbitrary scheme. These results are especially valuable since they simplify notably the topology and allow to obtain global results from local information. Some interesting theorems about the role of punctures and funnels on the hyperbolicity of Riemann surfaces can be deduced from the conclusions of this article.
ISSN:1050-6926
1559-002X
DOI:10.1007/BF02921869