Reduced C*-algebras of Product Systems -- an E0-semigroup and a Groupoid perspective

Abstract

For Ore semigroups P with an order unit, we prove that there is a bijection between E0-semigroups over P and product systems of C*-correspondences over Pop. We exploit this bijection and show that the reduced C*-algebra of a proper product system is Morita equivalent to the reduced crossed product of the associated semigroup dynamical system given by the corresponding E0-semigroup. We appeal to the groupoid picture of the reduced crossed product of a semigroup dynamical system derived in [47] to prove that, under good conditions, the reduced C*-algebra of a proper product system is nuclear/exact if and only if the coefficient algebra is nuclear/exact. We also discuss the invariance of K-theory under homotopy of product systems.