Operator Product States on Tensor Powers of C-Algebras

Abstract

The program of matrix product states on tensor powers A Z of C-algebras, initiated in Comm. Math. Phys. 144, 443-490 (1992), is re-assessed in a context where A is a generic nuclear C-algebra. For any shift invariant state ω, we demonstrate the existence of an order kernel ideal Kω, whose quotient action reduces and factorizes the initial data ( A Z, ω) to the tuple ( A, Bω = A N×/ Kω, Eω : A Bω Bω, ω : Bω C), where Bω is an operator system and Eω and ω are unital and completely positive maps. Reciprocally, given a (input) tuple ( A, S, E,φ) that shares similar attributes, we supply an algorithm that produces a shift-invariant state on A Z. We give sufficient conditions in which the so constructed states are ergodic and they reduce back to their input data. As examples, we formulate the input data that produces AKLT-type states, this time in the context of infinite site algebras, such as the group algebra of discrete amenable groups.