Reduced $C^{*}$-algebras of product systems: An $E_{0}$-semigroup and a groupoid perspective

Md Amir Hossain; Sundar Shanmugasundaram

doi:10.4171/jncg/675

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Reduced $C^{*}$ -algebras of product systems: An $E_{0}$ -semigroup and a groupoid perspective

Md Amir Hossain
Indian Statistical Institute, Delhi Centre, New Delhi, India
Sundar Shanmugasundaram
The Institute of Mathematical Sciences (HBNI), Chennai, India

$Reduced $C^{*}$-algebras of product systems: An $E_{0}$-semigroup and a groupoid perspective cover$

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Abstract

For Ore semigroups $P$ with an order unit, we prove that there is a bijection between $E_{0}$ -semigroups over $P$ and product systems of $C^{*}$ -correspondences over $P^{op}$ . 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 $E_{0}$ -semigroup. We appeal to the groupoid picture of the reduced crossed product of a semigroup dynamical system derived in Sundar [Doc. Math. 23 (2018), 1995–2025] 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.

Cite this article

Md Amir Hossain, Sundar Shanmugasundaram, Reduced $C^{*}$ -algebras of product systems: An $E_{0}$ -semigroup and a groupoid perspective. J. Noncommut. Geom. (2026), published online first

DOI 10.4171/JNCG/675