English

Mixing Times for the Commuting Chain on CA Groups

Probability 2020-10-19 v2

Abstract

Let GG be a finite group. The commuting chain on GG moves from an element xx to yy by selecting yy uniformly amongst those which commute with xx. The tt step transition probabilities of this chain converge to a distribution uniform on the conjugacy classes of GG. We provide upper and lower bounds for the mixing time of this chain on a CA group (groups with a "nice" commuting structure) and show that cutoff does not occur for many of these chains. We also provide a formula for the characteristic polynomial of the transition matrix of this chain. We apply our general results to explicitly study the chain on several sequences of groups, such as general linear groups, Heisenberg groups, and dihedral groups. The commuting chain is a specific case of a more general family of chains known as Burnside processes. Few instances of the Burnside processes have permitted careful analysis of mixing. We present some of the first results on mixing for the Burnside process where the state space is not fully specified (i.e not for a particular group). Our upper bound shows our chain is rapidly mixing, a topic of interest for Burnside processes.

Keywords

Cite

@article{arxiv.2003.04432,
  title  = {Mixing Times for the Commuting Chain on CA Groups},
  author = {John Rahmani},
  journal= {arXiv preprint arXiv:2003.04432},
  year   = {2020}
}

Comments

V2: minor revisions, major corrections to main upper bound proof. To appear in Journal of Theoretical Probability

R2 v1 2026-06-23T14:09:28.377Z