Monotonic multi-state quantum <i>f</i>-divergences

Furuya, Keiichiro; Lashkari, Nima; Ouseph, Shoy

doi:10.1063/5.0125505

Journal of Mathematical Physics

2023

DOI: 10.1063/5.0125505

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Monotonic multi-state quantum f-divergences

Keiichiro Furuya

Nima Lashkari

Shoy Ouseph

Abstract: We use the Tomita–Takesaki modular theory and the Kubo–Ando operator mean to write down a large class of multi-state quantum f-divergences and prove that they satisfy the data processing inequality. For two states, this class includes the ( α, z)-Rényi divergences, the f-divergences of Petz, and the Rényi Belavkin-Staszewski relative entropy as special cases. The method used is the interpolation theory of non-commutative [Formula: see text] spaces, and the result applies to general von Neumann algebras, includ… Show more

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Cited by 3 publications

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Local Poincaré algebra from quantum chaos

Ouseph,

Furuya,

Lashkari

et al. 2024

J. High Energ. Phys.

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The local two-dimensional Poincaré algebra near the horizon of an eternal AdS black hole, or in proximity to any bifurcate Killing horizon, is generated by the Killing flow and outward null translations on the horizon. In holography, this local Poincaré algebra is reflected as a pair of unitary flows in the boundary Hilbert space whose generators under modular flow grow and decay exponentially with a maximal Lyapunov exponent. This is a universal feature of many geometric vacua of quantum gravity. To explain this universality, we show that a two-dimensional Poincaré algebra emerges in any quantum system that has von Neumann subalgebras associated with half-infinite modular time intervals (modular future and past subalgebras) in a limit analogous to the near-horizon limit. In ergodic theory, quantum dynamical systems with future or past algebras are called quantum K-systems. The surprising statement is that modular K-systems are always maximally chaotic.Interacting quantum systems in the thermodynamic limit and large N theories above the Hawking-Page phase transition are examples of physical theories with future/past subalgebras. We prove that the existence of (modular) future/past von Neumann subalgebras also implies a second law of (modular) thermodynamics and the exponential decay of (modular) correlators. We generalize our results from the modular flow to any dynamical flow with a positive generator and interpret the positivity condition as quantum detailed balance.

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Local Poincaré algebra from quantum chaos

Ouseph,

Furuya,

Lashkari

et al. 2024

J. High Energ. Phys.

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Information loss, mixing and emergent type III1 factors

Furuya,

Lashkari,

Moosa

et al. 2023

J. High Energ. Phys.

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A manifestation of the black hole information loss problem is that the two-point function of probe operators in a large Anti-de Sitter black hole decays in time, whereas, on the boundary CFT, it is expected to be an almost periodic function of time. We point out that the decay of the two-point function (clustering in time) holds important clues to the nature of observable algebras, states, and dynamics in quantum gravity.We call operators that cluster in time “mixing” and explore the necessary and sufficient conditions for mixing. The information loss problem is a special case of the statement that in type I algebras, there exists no mixing operators. We prove that, in a thermofield double state (KMS state), if mixing operators form an algebra (close under multiplication), the resulting algebra must be a von Neumann type III1 factor. In other words, the physically intuitive requirement that all nonconserved operators should exponentially mix is so strong that it fixes the observable algebra to be an exotic algebra called a type III1 factor. More generally, for an arbitrary out-of-equilibrium state of a general quantum system (von Neumann algebra), we show that if the set of operators that mix under modular flow forms an algebra, it is a type III1 von Neumann factor.In a theory of Generalized Free Fields (GFF), we show that if the two-point function clusters in time, all operators are mixing, and the algebra is a type III1 factor. For example, in 𝒩 = 4 SYM, above the Hawking-Page phase transition, clustering of the single trace operators implies that the algebra is a type III1 factor, settling a recent conjecture of Leutheusser and Liu. We explicitly construct the C∗-algebra and von Neumann subalgebras of GFF associated with time bands and, more generally, open sets of the bulk spacetime using the HKLL reconstruction map.

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Proof of the Rényi quantum null energy condition for free fermions

Roy

2023

Phys. Rev. D

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Monotonic multi-state quantum f-divergences

Cited by 3 publications

References 44 publications

Local Poincaré algebra from quantum chaos

Local Poincaré algebra from quantum chaos

Information loss, mixing and emergent type III1 factors

Proof of the Rényi quantum null energy condition for free fermions

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