The Furstenberg Poisson Boundary and CAT(0) Cube Complexes

Abstract

We show under weak hypotheses that ∂ X, the Roller boundary of a finite dimensional CAT(0) cube complex X is the Furstenberg-Poisson boundary of a sufficiently nice random walk on an acting group . In particular, we show that if admits a nonelementary proper action on X, and μ is a generating probability measure of finite entropy and finite first logarithmic moment, then there is a μ-stationary measure on ∂ X making it the Furstenberg-Poisson boundary for the μ-random walk on . We also show that the support is contained in the closure of the regular points. Regular points exhibit strong contracting properties.