Finite groups with large Chebotarev invariant

Abstract

A subset \g1, … , gd\ of a finite group G is said to invariably generate G if the set \g1x1, …, gdxd\ generates G for every choice of xi ∈ G. The Chebotarev invariant C(G) of G is the expected value of the random variable n that is minimal subject to the requirement that n randomly chosen elements of G invariably generate G. The authors recently showed that for each ε>0, there exists a constant cε such that C(G) (1+ε)|G|+cε. This bound is asymptotically best possible. In this paper we prove a partial converse: namely, for each α>0 there exists an absolute constant δα such that if G is a finite group and C(G)>α|G|, then G has a section X/Y such that |X/Y|≥ δα|G|, and X/Y Fq H for some prime power q, with H Fq×.