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Twisted Conjugacy Classes in Abelian Extensions of Certain Linear Groups

Published online by Cambridge University Press:  20 November 2018

T. Mubeena  and
P. Sankaran
T. Mubeena
Affiliation:
The Institute of Mathematical Sciences, CIT Campus, Taramani, Chennai 600113, India e-mail: mubeena@imsc.res.insankaran@imsc.res.in
P. Sankaran
Affiliation:
The Institute of Mathematical Sciences, CIT Campus, Taramani, Chennai 600113, India e-mail: mubeena@imsc.res.insankaran@imsc.res.in
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Abstract

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Given a group automorphism $\phi :\,\Gamma \,\to \,\Gamma $, one has an action of $\Gamma $ on itself by $\phi $-twisted conjugacy, namely, $g.x\,=\,gx\phi ({{g}^{-1}})$. The orbits of this action are called $\phi $-twisted conjugacy classes. One says that $\Gamma $ has the ${{R}_{\infty }}$-property if there are infinitely many $\phi $-twisted conjugacy classes for every automorphism $\phi $ of $\Gamma $. In this paper we show that $\text{SL(}n\text{,}\mathbb{Z}\text{)}$ and its congruence subgroups have the ${{R}_{\infty }}$-property. Further we show that any (countable) abelian extension of $\Gamma $ has the ${{R}_{\infty }}$-property where $\Gamma $ is a torsion free non-elementary hyperbolic group, or $\text{SL(}n\text{,}\mathbb{Z}\text{)},\text{Sp(2}n\text{,}\mathbb{Z}\text{)}$ or a principal congruence subgroup of $\text{SL(}n\text{,}\mathbb{Z}\text{)}$ or the fundamental group of a complete Riemannian manifold of constant negative curvature.

Keywords

20E45twisted conjugacy classeshyperbolic groupslattices in Lie groups
Type
Research Article
Information
Canadian Mathematical Bulletin , Volume 57 , Issue 1 , 14 March 2014 , pp. 132 - 140
Copyright
Copyright © Canadian Mathematical Society 2014

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