Groupoid actions and Koopman representations
Abstract
We study the C*-algebra C*() generated by the Koopman representation =μ of a locally compact groupoid G acting on a measure space (X,μ), where μ is quasi-invariant for the action. We interpret as an induced representation and we prove that if the groupoid G X is amenable, then is weakly contained in the regular representation =μ associated to μ, so we have a surjective homomorphism C*r(G) C*(). We consider the particular case of Renault-Deaconu groupoids G= G(X,T) acting on their unit space X and show that in some cases C*() C*(G).
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