Some remarks on Reduced C*-algebras of semigroup dynamical systems and product systems

Abstract

We study the exactness of the reduced crossed product of a semigroup dynamical system and the reduced C*-algebra of a product system. We show that for a semigroup dynamical system (A, P,α), under reasonable hypotheses (e.g., P is abelian and finitely generated), the reduced crossed product A red P is exact if and only if A is exact. This strengthens our earlier result (AmirSundar-product-system), where it was assumed that the action of P on A is by injective endomorphisms. We also compare the groupoid crossed product described in AmirSundar-product-system and the Fell bundle constructed in RennieSims for a product system, and show that they are equivalent as Fell bundles.