Paper
Metrics on completely positive maps via noncommutative geometry
Authors
Are Austad, Erik Bédos, Jonas Eidesen, Nadia S. Larsen, Tron Omland
Abstract
By considering an infinite-dimensional analogue of the Choi-Jamiolkowski isomorphism, we study how to induce metrics on a distinguished subset of the completely positive maps between tracial -algebras using seminorms from noncommutative geometry. Under suitable conditions on the these seminorms, we show that the induced metrics will satisfy the quantum information theoretic properties of stability and chaining. Lastly, we show how to generate such metrics from Kasparov exterior products of spectral triples.