English

Ewens sampling and invariable generation

Probability 2016-10-18 v2 Combinatorics Group Theory

Abstract

We study the number of random permutations needed to invariably generate the symmetric group, SnS_n, when the distribution of cycle counts has the strong α\alpha-logarithmic property. The canonical example is the Ewens sampling formula, for which the number of kk-cycles relates to a conditioned Poisson random variable with mean α/k\alpha/k. The special case α=1\alpha =1 corresponds to uniformly random permutations, for which it was recently shown that exactly four are needed. For strong α\alpha-logarithmic measures, and almost every α\alpha, we show that precisely (1αlog2)1\left\lceil ( 1- \alpha \log 2 )^{-1} \right\rceil permutations are needed to invariably generate SnS_n. A corollary is that for many other probability measures on SnS_n no bounded number of permutations will invariably generate SnS_n with positive probability. Along the way we generalize classic theorems of Erd\H{o}s, Tehran, Pyber, Luczak and Bovey to permutations obtained from the Ewens sampling formula.

Keywords

Cite

@article{arxiv.1610.04212,
  title  = {Ewens sampling and invariable generation},
  author = {Gerandy Brito and Christopher Fowler and Matthew Junge and Avi Levy},
  journal= {arXiv preprint arXiv:1610.04212},
  year   = {2016}
}

Comments

34 pages, 1 figure

R2 v1 2026-06-22T16:20:08.784Z