English

Sur le codage du flot g\'{e}od\'{e}sique dans un arbre

Dynamical Systems 2016-08-16 v1 Group Theory

Abstract

Given a tree TT and a group \Ga\Ga of automorphisms of TT, we study the markovian properties of the geodesic flow on the quotient by \Ga\Ga of the space of geodesics of TT. For instance, when TT is the Bruhat-Tits tree of a semi-simple connected algebraic group G\underline{G} of rank one over a non archimedian local field \whK\wh K, and \Ga\Ga is a (possibly non uniform) lattice in G(\whK)\underline{G}(\wh K), we prove that the type preserving geodesic flow is Bernoulli with finite entropy. Under some mild assumptions, we prove that if the quotient geodesic flow is mixing for a probability Patterson-Sullivan-Bowen-Margulis measure, then it is loosely Bernoulli.

Keywords

Cite

@article{arxiv.math/0511465,
  title  = {Sur le codage du flot g\'{e}od\'{e}sique dans un arbre},
  author = {Anne Broise and Frédéric Paulin},
  journal= {arXiv preprint arXiv:math/0511465},
  year   = {2016}
}

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41 pages