English

Word Measures on Symmetric Groups

Group Theory 2026-02-03 v5

Abstract

Fix a word ww in a free group FF on rr generators. A ww-random permutation in the symmetric group SNS_N is obtained by sampling rr independent uniformly random permutations σ1,,σrSN\sigma_{1},\ldots,\sigma_{r}\in S_{N} and evaluating w(σ1,,σr)w\left(\sigma_{1},\ldots,\sigma_{r}\right). In [arXiv:1104.3991, arXiv:1202.3269] it was shown that the average number of fixed points in a ww-random permutation is 1+θ(N1π(w))1+\theta\left(N^{1-\pi\left(w\right)}\right), where π(w)\pi\left(w\right) is the smallest rank of a subgroup HFH\le F containing ww as a non-primitive element. We show that π(w)\pi\left(w\right) plays a role in estimates of all stable characters of symmetric groups. In particular, we show that for all t2t\ge2, the average number of tt-cycles is 1t+O(Nπ(w))\frac{1}{t}+O\left(N^{-\pi\left(w\right)}\right). As an application, we prove that for every ss, every ε>0\varepsilon>0 and every large enough rr, Schreier graphs with rr random generators depicting the action of SNS_{N} on ss-tuples, have second eigenvalue at most 22r1+ε2\sqrt{2r-1}+\varepsilon asymptotically almost surely. An important ingredient in this work is a systematic study of not-necessarily connected Stallings core graphs.

Keywords

Cite

@article{arxiv.2009.00897,
  title  = {Word Measures on Symmetric Groups},
  author = {Liam Hanany and Doron Puder},
  journal= {arXiv preprint arXiv:2009.00897},
  year   = {2026}
}

Comments

53 pages, 3 figures. This version: fixed a minor gap in Appendix A

R2 v1 2026-06-23T18:15:40.611Z