Coxeter group in Hilbert geometry

Abstract

A theorem of Tits - Vinberg allows to build an action of a Coxeter group on a properly convex open set of the real projective space, thanks to the data P of a polytope and reflection across its facets. We give sufficient conditions for such action to be of finite covolume, convex-cocompact or geometrically finite. We describe an hypothesis that make those conditions necessary. Under this hypothesis, we describe the Zariski closure of , find the maximal -invariant convex, when there is a unique -invariant convex, when the convex is strictly convex, when we can find a -invariant convex ' which is strictly convex.