The R∞ property for nilpotent quotients of generalized solvable Baumslag-Solitar groups

Abstract

We say a group G has property R∞ if the number R() of twisted conjugacy classes is infinite for every automorphism of G. For such groups, the R∞-nilpotency degree is the least integer c such that G/γc+1(G) has property R∞. In this work, we compute the R∞-nilpotency degree of all Generalized Solvable Baumslag-Solitar groups n. Moreover, we compute the lower central series of n, write the nilpotent quotients n,c=n/γc+1(n) as semidirect products of finitely generated abelian groups and classify which integer invertible matrices can be extended to automorphisms of n,c.