On transitivity and (non)amenability of Aut(Fn) actions on group presentations

Abstract

For a finitely generated group G the Nielsen graph Nn(G), n≥ rank(G), describes the action of the group AutFn of automorphisms of the free group Fn on generating n-tuples of G by elementary Nielsen moves. The question of (non)amenability of Nielsen graphs is of particular interest in relation with the open question about Property (T) for AutFn, n≥ 4. We prove nonamenability of Nielsen graphs Nn(G) for all n \2,rank(G)\ when G is indicable, and for n big enough when G is elementary amenable. We give an explicit description of Nd(G) for relatively free (in some variety) groups of rank d and discuss their connectedness and nonamenability. Examples considered include free polynilpotent groups and free Burnside groups.