Nuclearity for partial crossed products by exact discrete groups

Abstract

We study partial actions of exact discrete groups on C*-algebras. We show that the partial crossed product of a commutative C*-algebra by an exact discrete group is nuclear whenever the full and reduced partial crossed products coincide. This generalises a result by Matsumura in the context of global actions. In general, we prove that a partial action of an exact discrete group on a C*-algebra A has Exel's approximation property if and only if the full and reduced partial crossed products associated to the diagonal partial action on A Aop coincide. We apply our results to show that the reduced semigroup C*-algebra C*λ(P) of a submonoid of an exact discrete group is nuclear if the left regular representation on 2(P) is an isomorphism between the full and reduced C*-algebras. We also show that nuclearity is equivalent to the weak containment property in the case of C*-algebras associated to separated graphs.