Boundaries of Zn-free groups

Abstract

In this paper we study random walks on a finitely generated group G which has a free action on a Zn-tree. We show that if G is non-abelian and acts minimally, freely and without inversions on a locally finite Zn-tree with the set of open ends Ends(), then for every non-degenerate probability measure μ on G there exists a unique μ-stationary probability measure μ on Ends(), and the space ( Ends(), μ) is a μ-boundary. Moreover, if μ has finite first moment with respect to the word metric on G (induced by a finite generating set), then the measure space ( Ends(), μ) is isomorphic to the Poisson--Furstenberg boundary of (G, μ).