The spread of a finite group

TL;DR

This paper proves that finite groups with all proper quotients cyclic are 2-spread, characterizes those with low uniform spread, and reduces the problem to almost simple groups, completing the classification for exceptional Lie type cases.

Contribution

It establishes the equivalence between 3/2-generation and all proper quotients being cyclic for finite groups, and characterizes groups with low uniform spread, advancing the understanding of group generation properties.

Findings

Finite groups with cyclic proper quotients are 2-spread.

Complete characterization of finite groups with u(G)=0 or 1.

Reduction to almost simple groups, including exceptional Lie type groups.

Abstract

A group $G$ is said to be $\frac{3}{2}$-generated if every nontrivial element belongs to a generating pair. It is easy to see that if $G$ has this property then every proper quotient of $G$ is cyclic. In this paper we prove that the converse is true for finite groups, which settles a conjecture of Breuer, Guralnick and Kantor from 2008. In fact, we prove a much stronger result, which solves a problem posed by Brenner and Wiegold in 1975. Namely, if $G$ is a finite group and every proper quotient of $G$ is cyclic, then for any pair of nontrivial elements $x_1,x_2 \in G$, there exists $y \in G$ such that $G = \langle x_1, y \rangle = \langle x_2, y \rangle$. In other words, $s(G) \geqslant 2$, where $s(G)$ is the spread of $G$. Moreover, if $u(G)$ denotes the more restrictive uniform spread of $G$, then we can completely characterise the finite groups $G$ with $u(G) = 0$ and $u(G)=1$. To prove these results, we first establish a reduction to almost simple groups. For simple groups, the result was proved by Guralnick and Kantor in 2000 using probabilistic methods and since then the almost simple groups have been the subject of several papers. By combining our reduction theorem and this earlier work, it remains to handle the groups whose socles are exceptional groups of Lie type and this is the case we treat in this paper.