Automorphisms of Higher Rank Lamplighter Groups

Abstract

Let d(q) denote the group whose Cayley graph with respect to a particular generating set is the Diestel-Leader graph DLd(q), as described by Bartholdi, Neuhauser and Woess. We compute both Aut(d(q)) and Out(d(q)) for d ≥ 2, and apply our results to count twisted conjugacy classes in these groups when d ≥ 3. Specifically, we show that when d ≥ 3, the groups d(q) have property R∞, that is, every automorphism has an infinite number of twisted conjugacy classes. In contrast, when d=2 the lamplighter groups 2(q)=Lq = Zq Z have property R∞ if and only if (q,6) ≠ 1.