Probabilistic Tits alternative for circle diffeomorphisms
Abstract
Let μ1, μ2 be probability measures on Diff1+(S1) satisfying a suitable moment condition and such that their supports genererate discrete groups acting proximally on S1. Let (fnω)n ∈ N, (fnω')n ∈ N be two independent realizations of the random walk driven by μ1, μ2 respectively. We show that almost surely there is an N ∈ N such that for all n ≥ N the elements fnω, fnω' generate a nonabelian free group. The proof is inspired by the strategy by R. Aoun for linear groups and uses work of A. Gorodetski, V. Kleptsyn and G. Monakov, and of P. Barrientos and D. Malicet. A weaker (and easier) statement holds for measures supported on Homeo+(S1) with no moment conditions.
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