Measure equivalence rigidity of the handlebody groups
Abstract
Let V be a connected 3-dimensional handlebody of finite genus at least 3. We prove that the handlebody group Mod(V) is superrigid for measure equivalence, i.e. every countable group which is measure equivalent to Mod(V) is in fact virtually isomorphic to Mod(V). Applications include a rigidity theorem for lattice embeddings of Mod(V), an orbit equivalence rigidity theorem for free ergodic measure-preserving actions of Mod(V) on standard probability spaces, and a W*-rigidity theorem among weakly compact group actions.
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