Weakly tracially approximately representable actions
Abstract
We describe a weak tracial analog of approximate representability under the name "weak tracial approximate representability" for finite group actions. Let G be a finite abelian group, let A be an infinite-dimensional simple unital C*-algebra, and let α G Aut (A) be an action of G on A which is pointwise outer. Then α has the weak tracial Rokhlin property if and only if the dual action α of the Pontryagin dual G on the crossed product C*(G, A, α) is weakly tracially approximately representable, and α is weakly tracially approximately representable if and only if the dual action α has the weak tracial Rokhlin property. This generalizes the results of Izumi in 2004 and Phillips in 2011 on the dual actions of finite abelian groups on unital simple C*-algebras.
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