Finite Groups with Submultiplicative Spectra
Group Theory
2011-10-19 v2
Abstract
We study abstract finite groups with the property, called property , that all of their subrepresentations have submultiplicative spectra. Such groups are necessarily nilpotent and we focus on -groups. -groups with property are regular. Hence, a 2-group has property if and only if it is commutative. For an odd prime , all -abelian groups have property , in particular all groups of exponent have it. We show that a 3-group or a metabelian -group () has property if and only if it is V-regular.
Keywords
Cite
@article{arxiv.1109.1916,
title = {Finite Groups with Submultiplicative Spectra},
author = {L. Grunenfelder and T. Košir and M. Omladič and H. Radjavi},
journal= {arXiv preprint arXiv:1109.1916},
year = {2011}
}