Word Measures on Symmetric Groups

Abstract

Fix a word w in a free group F on r generators. A w-random permutation in the symmetric group SN is obtained by sampling r independent uniformly random permutations σ1,…,σr∈ SN and evaluating w(σ1,…,σr). In [arXiv:1104.3991, arXiv:1202.3269] it was shown that the average number of fixed points in a w-random permutation is 1+θ(N1-π(w)), where π(w) is the smallest rank of a subgroup H F containing w as a non-primitive element. We show that π(w) plays a role in estimates of all stable characters of symmetric groups. In particular, we show that for all t2, the average number of t-cycles is 1t+O(N-π(w)). As an application, we prove that for every s, every >0 and every large enough r, Schreier graphs with r random generators depicting the action of SN on s-tuples, have second eigenvalue at most 22r-1+ asymptotically almost surely. An important ingredient in this work is a systematic study of not-necessarily connected Stallings core graphs.