Inverted orbits of exclusion processes, diffuse-extensive-amenability and (non-?)amenability of the interval exchanges

Abstract

The recent breakthrough works [6,8,9] which established the amenability for new classes of groups, lead to the following question: is the action W(Zd) Zd extensively amenable? (Where W(Zd) is the wobbling group of permutations σ:Zd Zd with bounded range). This is equivalent to asking whether the action (Z/2\ Z)(Zd) W(Zd) (Z/2Z)(Zd) is amenable. The d=1 and d=2 and have been settled respectively in [6,8]. By [9], a positive answer to this question would imply the amenability of the IET group. In this work, we give a partial answer to this question by introducing a natural strengthening of the notion of extensive-amenability which we call diffuse-extensive-amenability. Our main result is that for any bounded degree graph X, the action W(X) X is diffuse-extensively amenable if and only if X is recurrent. Our proof is based on the construction of suitable stochastic processes (τt)t≥ 0 on W(X)\, <\, S(X) whose inverted orbits Ot(x0) = \x∈ X, ∃ s≤ t,\, τs(x)=x0\ = 0≤ s ≤ t τs-1(\x0\) are exponentially unlikely to be sub-linear when X is transient. This result leads us to conjecture that the action W(Zd) Zd is not extensively amenable when d≥ 3 and that a different route towards the (non-?)amenability of the IET group may be needed.