Ewens sampling and invariable generation

Abstract

We study the number of random permutations needed to invariably generate the symmetric group, Sn, when the distribution of cycle counts has the strong α-logarithmic property. The canonical example is the Ewens sampling formula, for which the number of k-cycles relates to a conditioned Poisson random variable with mean α/k. The special case α =1 corresponds to uniformly random permutations, for which it was recently shown that exactly four are needed. For strong α-logarithmic measures, and almost every α, we show that precisely ( 1- α 2 )-1 permutations are needed to invariably generate Sn. A corollary is that for many other probability measures on Sn no bounded number of permutations will invariably generate Sn with positive probability. Along the way we generalize classic theorems of Erdos, Tehran, Pyber, Luczak and Bovey to permutations obtained from the Ewens sampling formula.