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arxiv: 1106.3156 · v3 · pith:GVHDWH6Mnew · submitted 2011-06-16 · 🧮 math.GT

Un lemme de Kazhdan-Margulis-Zassenhaus pour les g\'eom\'etries de Hilbert

classification 🧮 math.GT
keywords hilbertkazhdan-margulis-zassenhausvarepsilonautomorphismsconstantconvexdimensiondiscrete
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We prove a Kazhdan-Margulis-Zassenhaus lemma for Hilbert geometries. More precisely, in every dimension $n$ there exists a constant $\varepsilon_n > 0$ such that, for any properly open convex set $\O$ and any point $x \in \O$, any discrete group generated by a finite number of automorphisms of $\O$, which displace $x$ at a distance less than $\varepsilon_n$, is virtually nilpotent.

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