Ends of Schreier graphs and cut-points of limit spaces of self-similar groups

Abstract

Every self-similar group acts on the space Xω of infinite words over some alphabet X. We study the Schreier graphs w for w∈ Xω of the action of self-similar groups generated by bounded automata on the space Xω. Using sofic subshifts we determine the number of ends for every Schreier graph w. Almost all Schreier graphs w with respect to the uniform measure on Xω have one or two ends, and we characterize bounded automata whose Schreier graphs have two ends almost surely. The connection with (local) cut-points of limit spaces of self-similar groups is established.