Out(Fn)-invariant probability measures on the space of n-generated marked groups

Abstract

Let Gn denote the space of n-generated marked groups. We prove that, for every n 2, there exist 20 non-atomic, Out(Fn)-invariant, mixing probability measures on Gn. On the other hand, there are non-empty closed subsets of Gn that admit no Out(Fn)-invariant probability measure. Acylindrical hyperbolicity of the group Aut(Fn) plays a crucial role in the proof of both results. We also discuss model theoretic implications of the existence of Out(Fn)-invariant, ergodic probability measures on Gn.

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