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The boundary of a Busemann space
Abstract: Abstract. Let X be a proper Busemann space. Then there is a well defined boundary, ∂X, for X. Moreover, if X is (Gromov) hyperbolic (resp. nonpositively curved), then this boundary is homeomorphic to the hyperbolic (resp. non-positively curved) boundary. §0. IntroductionThe boundary of a (Gromov) hyperbolic space (and hence of a (Gromov) hyperbolic group) was introduced in Gromov's now famous article on hyperbolic groups [G1]. Since then, this notion has received much attention and provided many interesting re…
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Cited by 9 publications
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“…Previous papers were devoted to Alexandrov non-positively curved spaces. Here we deal with Busemann spaces defined in [4], see also [5]- [7]).…”
Section: Introductionmentioning
confidence: 99%
“…Previous papers were devoted to Alexandrov non-positively curved spaces. Here we deal with Busemann spaces defined in [4], see also [5]- [7]).…”
Section: Introductionmentioning
confidence: 99%
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