Uniqueness of a Furstenberg system

Abstract

Given a countable amenable group G, a F lner sequence (FN) ⊂eq G, and a set E ⊂eq G with d(FN)(E)=N ∞ |E FN||FN|>0, Furstenberg's correspondence principle associates with the pair (E,(FN)) a measure preserving system (X,B,μ,(Tg)g ∈ G) and a set A ∈ B with μ(A)=d(FN)(E), in such a way that for all r ∈ N and all g1,…,gr ∈ G one has d(FN)(g1-1E … gr-1E)≥μ((Tg1)-1A … (Tgr)-1A). We show that under some natural assumptions, the system (X,B,μ,(Tg)g ∈ G) is unique up to a measurable isomorphism. We also establish variants of this uniqueness result for non-countable discrete amenable semigroups as well as for a generalized correspondence principle which deals with a finite family of bounded functions f1,…,f: G → C.