Quantum correlations on quantum spaces

Abstract

For given quantum (non-commutative) spaces P and O we study the quantum space of maps MP,O from P to O. In case of finite quantum spaces these objects turn out to be behind a large class of maps which generalize the classical qc-correlations known from quantum information theory to the setting of quantum input and output sets. We prove a number of important functorial properties of the mapping (P,O)P,O and use them to study various operator algebraic properties of the C*-algebras C(MP,O) such as the lifting property and residual finite dimensionality. Inside C(MP,O) we construct a universal operator system SP,O related to P and O and show, among other things, that the embedding SP,O⊂C(MP,O) is hyperrigid, C(MP,O) is the C*-envelope of SP,O and that a large class of non-signalling correlations on the quantum sets P and O arise from states on C(MP,O)maxC(MP,O) as well as states on the commuting tensor product SP,OcSP,O. Finally we introduce and study the notion of a synchronous correlation with quantum input and output sets, prove several characterizations of such correlations and their relation to traces on C(MP,O).