Integrals of groups
Abstract
An of a group is a group whose derived group (commutator subgroup) is isomorphic to . This paper discusses integrals of groups, and in particular questions about which groups have integrals and how big or small those integrals can be. Our main results are: (1) If a finite group has an integral, then it has a finite integral. (2) A precise characterization of the set of natural numbers for which every group of order is integrable: these are the cubefree numbers which do not have prime divisors and with . (3) An abelian group of order has an integral of order at most , but may fail to have an integral of order bounded by for constant . (4) A finite group can be integrated times (in the class of finite groups) if and only if it is the central product of an abelian group and a perfect group. There are many other results on such topics as centreless groups, groups with composition length , and infinite groups. We also include a number of open problems.
Cite
@article{arxiv.1803.10179,
title = {Integrals of groups},
author = {João Araújo and Peter J. Cameron and Carlo Casolo and Francesco Matucci},
journal= {arXiv preprint arXiv:1803.10179},
year = {2018}
}
Comments
31 pages, no figures; new co-author and new title; the previous posting has been split in half, with the second part to be expanded and resubmitted separately