Geometry of Random Cayley Graphs of Abelian Groups

Abstract

Consider the random Cayley graph of a finite Abelian group G with respect to k generators chosen uniformly at random, with 1 k |G|. Draw a vertex U Unif(G). We show that the graph distance dist(id,U) from the identity to U concentrates at a particular value M, which is the minimal radius of a ball in Zk of cardinality at least |G|, under mild conditions. In other words, the distance from the identity for all but o(|G|) of the elements of G lies in the interval [M - o(M), M + o(M)]. In the regime k |G|, we show that the diameter of the graph is also asymptotically M. In the spirit of a conjecture of Aldous and Diaconis (1985), this M depends only on k and |G|, not on the algebraic structure of G. Write d(G) for the minimal size of a generating subset of G. We prove that the order of the spectral gap is |G|-2/k when k - d(G) k and |G| lies in a density-1 subset of N or when k - 2 d(G) k. This extends, for Abelian groups, a celebrated result of Alon and Roichman (1994). The aforementioned results all hold with high probability over the random Cayley graph.