Twisted conjugacy classes in Lie groups

Abstract

We consider twisted conjugacy classes of continuous automorphisms of a Lie group G. We obtain a necessary and sufficient condition on for its Reidemeister number, the number of twisted conjugacy classes, to be infinite when G is connected and solvable or compactly generated and nilpotent. We also show for a general connected Lie group G that the number of conjugacy classes is infinite. We prove that for a connected non-nilpotent Lie group G, there exists n∈ N such that Reidemeister number of n is infinite for every . We say that G has topological R∞-property if the Reidemeister number of every is infinite. We obtain conditions on a connected solvable Lie group under which it has topological R∞-property; which, in particular, enables us to prove that the group of invertible n× n upper triangular real matrices and its quotient group modulo its center have topological R∞-property for every n≥ 2. We also prove that the Walnut group also has this property. We show that SL(2,R) and GL(2,R) have topological R∞-property, and construct many examples of Lie groups with this property.