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Relative entropy for von Neumann subalgebras

Li Gao, Marius Junge, Nicholas LaRacuente

2020International Journal of Mathematics18 citationsDOIOpen Access PDF

Abstract

We revisit the connection between index and relative entropy for an inclusion of finite von Neumann algebras. We observe that the Pimsner–Popa index connects to sandwiched [Formula: see text]-Rényi relative entropy for all [Formula: see text], including Umegaki’s relative entropy at [Formula: see text]. Based on that, we introduce a new notation of relative entropy to a subalgebra which generalizes subfactors index. This relative entropy has application in estimating decoherence time of quantum Markov semigroups.

Topics & Concepts

MathematicsQuantum relative entropyVon Neumann entropyGeneralized relative entropyVon Neumann architectureJoint quantum entropyConditional quantum entropyKullback–Leibler divergenceEntropy (arrow of time)Min entropyPure mathematicsQuantumQuantum entanglementPrinciple of maximum entropyQuantum discordEntropy rateMaximum entropy thermodynamicsStatisticsQuantum mechanicsPhysicsQuantum many-body systemsNeural dynamics and brain functionAdvanced Thermodynamics and Statistical Mechanics