Cutoff for Random Walks on Upper Triangular Matrices
Abstract
Consider the random Cayley graph of a finite group with respect to generators chosen uniformly at random, with (ie ). A conjecture of Aldous and Diaconis (1985) asserts, for , that the random walk on this graph exhibits cutoff. When (ie ), the only example of a non-Abelian group for which cutoff has been established is the dihedral group. We establish cutoff (as ) for the group of unit upper triangular matrices with integer entries modulo (prime), which we denote , for fixed or diverging sufficiently slowly. We allow as well as . The cutoff time is , where is the time at which the entropy of the random walk on reaches , where is the Abelianisation of . When and , we find the limit profile. We also prove highly related results for the -dimensional Heisenberg group over . The Aldous--Diaconis conjecture also asserts, for , that the cutoff time should depend only on and . This was verified for all Abelian groups. Our result shows that this is not the case for : the cutoff time depends on , and . We also show that all but of the elements of lie at graph distance from the identity, where is the minimal radius of a ball in of cardinality . Finally, we show that the diameter is also asymptotically when and .
Cite
@article{arxiv.1911.02974,
title = {Cutoff for Random Walks on Upper Triangular Matrices},
author = {Jonathan Hermon and Sam Olesker-Taylor},
journal= {arXiv preprint arXiv:1911.02974},
year = {2021}
}
Comments
This is part of a multi-paper project investigating properties of Cayley graphs with divergently many generators chosen uniformly at random. There is some textual overlap between the introductions of the different papers. This latest version also updates the second named author's name to his new surname, from "Thomas" to "Olesker-Taylor"