Cohomological and quasi-isometric diversity of groups with property R∞

Abstract

How rich is the collection of groups with a given prominent property? In this work we approach this question for property~R∞, which says that every automorphism of a given group has infinitely many orbits under the -twisted conjugation action (g,x) gx(g)-1. Generalising the soluble groups of Herbert Abels to a large family over many integral domains, we prove that most such groups have property~R∞ drawing from a classical result of Levchuk and a swift observation by Jabara. Within the broad programme of cataloguing finitely generated groups up to quasi-isometry, our groups can then be separated by finiteness properties and cohomological dimension whilst having~R∞. Abandoning finite presentability, we establish that property~R∞ is very abundant in a strong sense: there are uncountably many finitely generated groups (which can all be chosen to be amenable or non-amenable) that have~R∞ and are pairwise not quasi-isometric. The proofs vary in flavour. On the amenable side we use carefully constructed quotients of Abels' groups and a general strategy for quasi-isometric diversity established by Minasyan, Osin, and Witzel. For the non-amenable constructions we rely on modifications of Leary's type FP groups, further cohomological arguments, and recent powerful criteria for~R∞ due to Iveson, Martino, Sgobbi, Wong, and Fournier-Facio.