Orbit equivalence rigidity for product actions
Abstract
Let 1,…,n be hyperbolic, property (T) groups, for some n 1. We prove that if a product 1×…×n X1×…× Xn of measure preserving actions is stably orbit equivalent to a measure preserving action Y, then Y is induced from an action 0 Y0 such that there exists a direct product decomposition 0=1×…×n into n infinite groups. Moreover, there exists a measure preserving action i Yi that is stably orbit equivalent to i Xi, for any 1≤ i≤ n, and the product action 1×…×n Y1×…× Yn is isomorphic to 0 Y0.
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