Boundary of the action of Thompson group F on dyadic numbers
Abstract
We prove that the Poisson boundary of a simple random walk on the Schreier graph of action of F on D, where D is the set of dyadic numbers in [0, 1], is non-trivial. This gives a new proof of the result of Kaimanovich: Thompson's group F doesn't have Liouville property. In addition, we compute growth function of the Schreier graph of the action of F on D.
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