Growth of Schreier graphs of automaton groups

Abstract

Every automaton group naturally acts on the space Xω of infinite sequences over some alphabet X. For every w∈ Xω we consider the Schreier graph w of the action of the group on the orbit of w. We prove that for a large class of automaton groups all Schreier graphs w have subexponential growth bounded above by n( n)m with some constant m. In particular, this holds for all groups generated by automata with polynomial activity growth (in terms of S.Sidki), confirming a conjecture of V.Nekrashevych. We present applications to omega-periodic graphs and Hanoi graphs.