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Superbalance of holographic entropy inequalities

Temple He, Veronika E. Hubeny, Mukund Rangamani

2020Journal of High Energy Physics25 citationsDOIOpen Access PDF

Abstract

A bstract The domain of allowed von Neumann entropies of a holographic field theory carves out a polyhedral cone — the holographic entropy cone — in entropy space. Such polyhedral cones are characterized by their extreme rays. For an arbitrary number of parties, it is known that the so-called perfect tensors are extreme rays. In this work, we constrain the form of the remaining extreme rays by showing that they correspond to geometries with vanishing mutual information between any two parties, ensuring the absence of Bell pair type entanglement between them. This is tantamount to proving that besides subadditivity, all non-redundant holographic entropy inequalities are superbalanced, i.e. not only do UV divergences cancel in the inequality itself (assuming smooth entangling surfaces), but also in the purification thereof.

Topics & Concepts

PhysicsQuantum entanglementHolographyEntropy (arrow of time)Light coneVon Neumann entropyTheoretical physicsMathematical physicsInformation theoryQuantum relative entropyJoint quantum entropyQuantum mechanicsMutual informationDomain (mathematical analysis)Conformal mapBlack hole (networking)Generalized relative entropyHolographic principleConformal field theoryBlack hole thermodynamicsStatistical physicsWell-definedCone (formal languages)Von Neumann architectureKullback–Leibler divergencePure mathematicsBlack Holes and Theoretical PhysicsQuantum Mechanics and Non-Hermitian PhysicsQuasicrystal Structures and Properties
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