Twisted Conjugacy Classes in Abelian Extensions of Certain Linear Groups

Abstract

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