On the diameter of permutation groups
Abstract
Given a finite group and a set of generators, the diameter diam of the Cayley graph is the smallest such that every element of can be expressed as a word of length at most in . We are concerned with bounding diam(G):= diam. It has long been conjectured that the diameter of the symmetric group of degree is polynomially bounded in , but the best previously known upper bound was exponential in . We give a quasipolynomial upper bound, namely, for G = Sym(n) or G = \Alt(n), where the implied constants are absolute. This addresses a key open case of Babai's conjecture on diameters of simple groups. By standard results, our bound also implies a quasipolynomial upper bound on the diameter of all transitive permutation groups of degree .
Cite
@article{arxiv.1109.3550,
title = {On the diameter of permutation groups},
author = {Harald A. Helfgott and Akos Seress},
journal= {arXiv preprint arXiv:1109.3550},
year = {2014}
}
Comments
42 pages. Minimal additions. Last version, to appear in Ann. of Math