Property T of reduced C*-crossed products by discrete groups
Abstract
We generalize the main result of Kamalov and show that if G is an amenable discrete group with an action α on a finite nuclear unital C*-algebra A such that the reduced crossed product Aα,r G has property T, then G is finite and A is finite dimensional. As an application, an infinite discrete group H is non-amenable if and only if the uniform Roe algebra C*u(H) has property T.
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