On C*-algebras associated to product systems

Abstract

Let P be a unital subsemigroup of a group G. We propose an approach to C*-algebras associated to product systems over P. We call the C*-algebra of a given product system E its covariance algebra and denote it by A×EP, where A is the coefficient C*-algebra. We prove that our construction does not depend on the embedding P G and that a representation of A×EP is faithful on the fixed-point algebra for the canonical coaction of G if and only if it is faithful on A. We compare this with other constructions in the setting of irreversible dynamical systems, such as Cuntz--Nica--Pimsner algebras, Fowler's Cuntz--Pimsner algebra, semigroup C*-algebras of Xin Li and Exel's crossed products by interaction groups.