Random generators of the symmetric group: diameter, mixing time and spectral gap

Abstract

Let g, h be a random pair of generators of G=Sym(n) or G=Alt(n). We show that, with probability tending to 1 as n ∞, (a) the diameter of G with respect to S = \g,h,g-1,h-1\ is at most O(n2 ( n)c), and (b) the mixing time of G with respect to S is at most O(n3 ( n)c). (Both c and the implied constants are absolute.) These bounds are far lower than the strongest worst-case bounds known (in Helfgott--Seress, 2013); they roughly match the worst known examples. We also give an improved, though still non-constant, bound on the spectral gap. Our results rest on a combination of the algorithm in (Babai--Beals--Seress, 2004) and the fact that the action of a pair of random permutations is almost certain to act as an expander on -tuples, where is an arbitrary constant (Friedman et al., 1998).