Cutoff for random Cayley graphs of nilpotent groups

Abstract

We consider the random Cayley graphs of a sequence of finite nilpotent groups of diverging sizes G=G(n), whose ranks and nilpotency classes are uniformly bounded. For some k=k(n) such that 1 k |G|, we pick a random set of generators S=S(n) by sampling k elements Z1,…,Zk from G uniformly at random with replacement, and set S:=\Zj 1:1 j k \. We show that the simple random walk on Cay(G,S) exhibits cutoff with high probability. Some of our results apply to a general set of generators. Namely, we show that there is a constant c>0, depending only on the rank and the nilpotency class of G, such that for all symmetric sets of generators S of size at most c |G| |G|, the spectral gap and the -mixing time of the simple random walk X=(Xt)t≥ 0 on Cay(G,S) are asymptotically the same as those of the projection of X to the abelianization of G, given by [G,G]Xt. In particular, X exhibits cutoff if and only if its projection does.