The group of direct isometries of the real n-dimensional hyperbolic space is
G=SOo(n,1). This isometric action admits many differentiable compactifications
into an action on the closed ball. We prove that all such compactifications are
topologically conjugate but not necessarily differentiably conjugate. We give
the classifications of real analytic and smooth compactifications.Comment: 11 

Kloeckner, Benoit

English

arXiv

11 p.International audienceThe group of direct isometries of the real n-dimensional hyperbolic space is G=SOo(n,1). This isometric action admits many differentiable compactifications into an action on the closed ball. We prove that all such compactifications are topologically conjugate but not necessarily differentiably conjugate. We give the classifications of real analytic and smooth compactifications

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On differentiable compactifications of the hyperbolic space

https://hal.archives-ouvertes.fr/hal-00005233

On differentiable compactifications of the hyperbolic space

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