Poor and pi-poor abelian groups
Rings and Algebras
2015-07-07 v2
Abstract
In this paper, poor abelian groups are characterized. It is proved that an abelian group is poor if and only if its torsion part contains a direct summand isomorphic to , where is the set of prime integers. We also prove that pi-poor abelian groups exist. Namely, it is proved that the direct sum of , where ranges over all nonisomorphic uniform abelian groups, is pi-poor. Moreover, for a pi-poor abelian group , it is shown that can not be torsion, and each -primary component of is unbounded. Finally, we show that there are pi-poor groups which are not poor, and vise versa.
Cite
@article{arxiv.1505.03300,
title = {Poor and pi-poor abelian groups},
author = {Rafail Alizade and Engin Buyukasik},
journal= {arXiv preprint arXiv:1505.03300},
year = {2015}
}
Comments
The necessity part of Theorem 3.1. is proved without using basic subgroups