Twisted conjugacy and commensurability invariance

Abstract

A group G is said to have property R∞ if for every automorphism ∈ Aut(G), the cardinality of the set of -twisted conjugacy classes is infinite. Many classes of groups are known to have such property. However, very few examples are known for which R∞ is geometric, i.e., if G has property R∞ then any group quasi-isometric to G also has property R∞. In this paper, we give examples of groups and conditions under which R∞ is preserved under commensurability. The main tool is to employ the Bieri-Neumann-Strebel invariant.