A new solvability criterion for finite groups
Abstract
In 1968, John Thompson proved that a finite group G is solvable if and only if every 2-generator subgroup of G is solvable. In this paper, we prove that solvability of a finite group G is guaranteed by a seemingly weaker condition: G is solvable if, for all conjugacy classes C and D of G consisting of elements of prime power order, there exist x in C and y in D with x and y generating a solvable group. We also prove the following property of finite nonabelian simple groups, which is the key tool for our proof of the solvability criterion: if G is a finite nonabelian simple group, then there exist two prime divisors a and b of |G| such that, for all elements x, y in G with |x|=a and |y|=b, the subgroup generated by x and y is not solvable. Further, using a recent result of Guralnick and Malle, we obtain a similar membership criterion for any family of finite groups closed under forming subgroups, quotients and extensions.
Cite
@article{arxiv.1105.0475,
title = {A new solvability criterion for finite groups},
author = {Silvio Dolfi and Robert Guralnick and Marcel Herzog and Cheryl Praeger},
journal= {arXiv preprint arXiv:1105.0475},
year = {2014}
}
Comments
The results here are an improved version of the paper of the same name posted as arXiv:1007.5394 by the first, third and fourth authors