A relationship between twisted conjugacy classes and the geometric invariants n

Abstract

A group G is said to have the property R∞ if every automorphism φ ∈ Aut(G) has an infinite number of φ-twisted conjugacy classes. Recent work of Goncalves and Kochloukova uses the n (Bieri-Neumann-Strebel-Renz) invariants to show the R∞ property for a certain class of groups, including the generalized Thompson's groups Fn,0. In this paper, we make use of the n invariants, analogous to n, to show R∞ for certain finitely generated groups. In particular, we give an alternate and simpler proof of the R∞ property for BS(1,n). Moreover, we give examples for which the n invariants can be used to determine the R∞ property while the n invariants techniques cannot.