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Relative Entropy in de Sitter is a Noether Charge

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arxiv 2310.12185 v2 pith:SSMTFNU4 submitted 2023-10-18 gr-qc hep-thmath-phmath.MP

Relative Entropy in de Sitter is a Noether Charge

classification gr-qc hep-thmath-phmath.MP
keywords entropymodularrelativesitteralongchargeflowminkowski
verification ladder T0 review T1 audit T2 compute T3 formal T4 reserved
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We compute the relative entropy between the vacuum and a coherent state for a massive scalar field in de Sitter spacetime, using Tomita-Takesaki modular theory and the Araki-Uhlmann formula for the relative entropy. Embedding de Sitter spacetime as a hyperboloid in the ambient Minkowski space, we can restrict the Minkowski wedge and the corresponding modular operator to de Sitter, and we verify that this construction gives the correct modular flow. We check that the relative entropy is positive and jointly convex, relate it to the Noether charge of translations along the trajectories of the modular flow, and determine the local temperature as seen by an observer that moves along these trajectories.

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  1. Relative entropy for $\lambda \phi^4$ in the Rindler wedge

    hep-th 2026-07 accept novelty 6.5

    Relative entropy of vacuum vs coherent state for λφ⁴ in the Rindler wedge equals the classical interacting boost charge to O(λ) and obeys the Bekenstein bound.