Decomposition of tracial positive maps and applications in quantum information

Abstract

Every positive multilinear map between C*-algebras is separately weak*-continuous. We show that the joint weak*-continuity is equivalent to the joint weak*-continuity of the multiplications of C*-algebras under consideration. We study the behavior of general tracial positive maps on properly infinite von Neumann algebras and by applying the Aron--Berner extension of multilinear maps, we establish that under some mild conditions every tracial positive multilinear map between general C*-algebras enjoys a decomposition =2 1, in which 1 is a tracial positive linear map with the commutative range and 2 is a tracial completely positive map with the commutative domain. As an immediate consequence, tracial positive multilinear maps are completely positive. Furthermore, we prove that if the domain of a general tracial completely positive map between C*-algebra is a von Neumann algebra, then has a similar decomposition. As an application, we investigate the generalized variance and covariance in quantum mechanics via arbitrary positive maps. Among others, an uncertainty relation inequality for commuting observables in a composite physical system is presented.