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Relative entropy and catalytic relative majorization

Soorya Rethinasamy, Mark M. Wilde

2020Physical Review Research25 citationsDOIOpen Access PDF

Abstract

Given two pairs of quantum states, a fundamental question in the resource theory of asymmetric distinguishability is whether there exists a quantum channel converting one pair to the other. In this work, we reframe this question in such a way that a catalyst can be used to help perform the transformation, with the only constraint on the catalyst being that its reduced state is returned unchanged, so that it can be used again to assist a future transformation. What we find here, for the special case in which the states in a given pair are commuting, and thus quasiclassical, is that this catalytic transformation can be performed if and only if the relative entropy of one pair of states is larger than that of the other pair. This result endows the relative entropy with a fundamental operational meaning that goes beyond its traditional interpretation in the setting of independent and identical resources. Our finding thus has an immediate application and interpretation in the resource theory of asymmetric distinguishability, and we expect it to find application in other domains.

Topics & Concepts

Kullback–Leibler divergenceEntropy (arrow of time)MathematicsQuantumInterpretation (philosophy)MajorizationQuantum relative entropyStatistical physicsCognitive reframingExistential quantificationTheoretical physicsQuantum stateRelative phaseDecision theoryGeneralized relative entropyJoint quantum entropyQuantum mechanicsQuantum discordQuantum entanglementPhysicsState (computer science)Constraint (computer-aided design)Discrete mathematicsMathematical economicsComputer scienceQuantum mutual informationQuantum Mechanics and ApplicationsQuantum Information and CryptographyStatistical Mechanics and Entropy
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