Complete Positivity for Mixed Unitary Categories

Abstract

Coecke and Heunen described completely positive maps in dagger monoidal categories and the CP-infinity construction on these categories in order to construct a category of arbitrary dimensional quantum processes. This article generalizes the CP-infinity construction of dagger monoidal categories to mixed unitary categories. Mixed unitary categories, on the one hand, generalize the (compact) dagger monoidal categories, and on the other hand, accommodate arbitrary dimensional quantum processes, both without sacrificing the notion of dual objects. This means that the CP-infinity construction for mixed unitary categories provides a suitable semantics for higher-order quantum programming languages which employ arbitrary dimensional structures. The existing results for the CP-infinity construction are shown to generalize to the new setting. In particular, the notion of environment structures generalizes to mixed unitary categories and it is shown that the CP-infinity construction for mixed unitary categories is characterized by this generalized environment structure.