Cutoff for Random Walks on Upper Triangular Matrices

Abstract

Consider the random Cayley graph of a finite group G with respect to k generators chosen uniformly at random, with 1 k |G| (ie 1 k = |G|o(1)). A conjecture of Aldous and Diaconis (1985) asserts, for k|G|, that the random walk on this graph exhibits cutoff. When k |G| (ie k = ( |G|) O(1)), the only example of a non-Abelian group for which cutoff has been established is the dihedral group. We establish cutoff (as p infty) for the group of d × d unit upper triangular matrices with integer entries modulo p (prime), which we denote Up,d, for fixed d or d diverging sufficiently slowly. We allow 1 k |Up,d| as well as k|Up,d|. The cutoff time is \k |Up,d|, \: s0 k\, where s0 is the time at which the entropy of the random walk on Z reaches ( |Up,dab|)/k, where Up,dab Zpd-1 is the Abelianisation of Up,d. When 1 k |Up,dab| and d 1, we find the limit profile. We also prove highly related results for the d-dimensional Heisenberg group over Zp. The Aldous--Diaconis conjecture also asserts, for k gg |G|, that the cutoff time should depend only on k and |G|. This was verified for all Abelian groups. Our result shows that this is not the case for Up,d: the cutoff time depends on k, |Up,d| = pd(d-1)/2 and |Up,dab|=pd-1. We also show that all but o(|Up,d|) of the elements of Up,d lie at graph distance M o(M) from the identity, where M is the minimal radius of a ball in Zk of cardinality |Up,dab| = pd-1. Finally, we show that the diameter is also asymptotically M when k |Up,dab| and d1.