A class of II1 factors with a unique McDuff decomposition

Abstract

We provide a fairly large class of II1 factors N such that M=NR has a unique McDuff decomposition, up to isomorphism, where R denotes the hyperfinite II1 factor. This class includes all II1 factors N=L∞(X) associated to free ergodic probability measure preserving (p.m.p.) actions (X,μ) such that either (a) is a free group, Fn, for some n≥ 2, or (b) is a non-inner amenable group and the orbit equivalence relation of the action (X,μ) satisfies a property introduced in JS85. On the other hand, settling a problem posed by Jones and Schmidt in 1985, we give the first examples of countable ergodic p.m.p. equivalence relations which do not satisfy the property of JS85. We also prove that if R is a countable strongly ergodic p.m.p. equivalence relation and T is a hyperfinite ergodic p.m.p. equivalence relation, then R× T has a unique stable decomposition, up to isomorphism. Finally, we provide new characterisations of property Gamma for II1 factors and of strong ergodicity for countable p.m.p. equivalence relations.