Sigma theory and twisted conjugacy-II: Houghton groups and pure symmetric automorphism groups

Abstract

We say that x,y∈ are in the same φ-twisted conjugacy class and write xφ y if there exists an element γ∈ such that y=γ xφ(γ-1). This is an equivalence relation on called the φ-twisted conjugacy. Let R(φ) denote the number of φ-twisted conjugacy classes in . If R(φ) is infinite for all φ∈ Aut(), we say that has the R∞-property. The purpose of this note is to show that the symmetric group S∞, the Houghton groups and the pure symmetric automorphism groups have the R∞-property. We show, also, that the Richard Thompson group T has the R∞-property. We obtain a general result establishing the R∞-property of finite direct product of finitely generated groups.