C*-subproduct and product systems

Abstract

We introduce and study two-parameter subproduct and product systems of C*-algebras as the operator-algebraic analogues of, and in relation to, Tsirelson's two-parameter product systems of Hilbert spaces. Using several inductive limit techniques, we show that (i) any C*-subproduct system can be dilated to a C*-product system; and (ii) any C*-subproduct system that admis a unit, i.e., a co-multiplicative family of projections, can be assembled into a C*-algebra, which comes equipped with a one-parameter family of comultiplication-like homomorphisms. We also introduce and discuss co-units of C*-subproduct systems, consisting of co-multiplicative families of states, and show that they correspond to idempotent states of the associated C*-algebras. We then use the GNS construction to obtain Tsirelson subproduct systems of Hilbert spaces from co-units, and describe the relationship between the dilation of a C*-suproduct system and the dilation of the Tsirelson subproduct system of Hilbert spaces associated with a co-unit. All these results are illustrated concretely at the level of C*-subproduct systems of commutative C*-algebras.