Un lemme de Kazhdan-Margulis-Zassenhaus pour les g\'eom\'etries de Hilbert
Abstract
We prove a Kazhdan-Margulis-Zassenhaus lemma for Hilbert geometries. More precisely, in every dimension n there exists a constant n > 0 such that, for any properly open convex set and any point x ∈ , any discrete group generated by a finite number of automorphisms of , which displace x at a distance less than n, is virtually nilpotent.
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