On strongly autinertial groups

Authors

CANSU BETİN ONUR

DOI

10.3906/mat-1706-42

Abstract

A subgroup $ X $ of $ G $ is said to be inert under automorphisms (autinert) if $ X : X^\alpha \cap X $ is finite for all $ \alpha \in Aut(G)$ and it is called strongly autinert if $ :X $ is finite for all $ \alpha \in Aut(G).$ A group is called strongly autinertial if all subgroups are strongly autinert. In this article, the strongly autinertial groups are studied. We characterize such groups for a finitely generated case. Namely, we prove that a finitely generated group $ G $ is strongly autinertial if and only if one of the following hold:\vs{-2mm} \begin{itemize} \item[i)] $ G $ is finite;\vs{-2mm} \item[ii)] $ G= \langle a \rangle \ltimes F $ where $ F $ is a finite subgroup of $ G $ and $ \langle a \rangle $ is a torsion-free subgroup of $ G. $ \end{itemize}\vs{-2mm} Moreover, in the preliminary part, we give basic results on strongly autinert subgroups.

Keywords

Autinert subgroups, inertial groups, FC groups, VTA groups, virtually cyclic groups

First Page

1361

Last Page

1365

Recommended Citation

ONUR, CANSU BETİN (2018) "On strongly autinertial groups," Turkish Journal of Mathematics: Vol. 42: No. 3, Article 49. https://doi.org/10.3906/mat-1706-42
Available at: https://journals.tubitak.gov.tr/math/vol42/iss3/49