Measurable splittings and the measured group theoretic structure of wreath products

Abstract

Let be a countable group that admits an essential measurable splitting (for instance, any group measure equivalent to a free product of nontrivial groups). We show: (1) for any two nontrivial countable groups B and C that are measure equivalent, the wreath product groups B and C are measure equivalent (in fact, orbit equivalent) -- this is interesting even in the case when the groups B and C are finite; and (2) the groups B and (B×Z) are measure equivalent (in fact, orbit equivalent) for every nontrivial countable group B. On the other hand, we show that certain wreath product actions are not even stably orbit equivalent if is instead assumed to be a sofic icc group that is Bernoulli superrigid, and B and C have different cardinalities.

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