The pure extension property for discrete crossed products
Abstract
Let G be a discrete group acting on a unital C*-algebra A by *-automorphisms. In this note, we show that the inclusion A ⊂eq A r G has the pure extension property (so that every pure state on A extends uniquely to a pure state on A r G) if and only if G acts freely on A, the spectrum of A. The same characterization holds for the inclusion A ⊂eq A G. This generalizes what was already known for A abelian.
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