Cogrowth series for free products of finite groups

Abstract: Given a finitely generated group with generating set [Formula: see text], we study the cogrowth sequence, which is the number of words of length [Formula: see text] over the alphabet [Formula: see text] that are equal to the identity in the group. This is related to the probability of return for walks on the corresponding Cayley graph. Muller and Schupp proved the generating function of the sequence is algebraic when [Formula: see text] has a finite-index-free subgroup (using a result of Dunwoody). In this wor… Show more