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2026
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| Online Access: | https://doi.org/10.5281/zenodo.18826570 |
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| _version_ | 1866901369847283712 |
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| author | Gogishvili, David |
| author_facet | Gogishvili, David |
| contents | <blockquote> <p dir="ltr">This monograph demonstrates that Einstein's field equations emerge uniquely from the requirement that the information-theoretic distance from the de Sitter vacuum, measured by relative entropy (S_{\mathrm{rel}}), serves as a potential on the space of metrics. The uniqueness follows from four fundamental axioms: monotonicity under quantum channels, additivity on tensor products, normalization, and compatibility with the first law of entanglement thermodynamics. By employing the Bogoliubov-Kubo-Mori (BKM) metric and Helmholtz integrability, we show that the Einstein-Lovelock structure is the only consistent local dynamics for such an information-theoretic potential. The cosmological constant \Lambda is identified as the curvature radius of the information manifold, while Newton's constant G_N measures the information cost of metric deformations.</p> </blockquote> |
| format | Recurso digital |
| id | zenodo_https___doi_org_10_5281_zenodo_18826570 |
| institution | Zenodo |
| language | |
| publishDate | 2026 |
| publisher | Zenodo |
| record_format | zenodo |
| spellingShingle | Geometry from Information: Uniqueness of Relative Entropy as the Gravitational Potential. Gogishvili, David <blockquote> <p dir="ltr">This monograph demonstrates that Einstein's field equations emerge uniquely from the requirement that the information-theoretic distance from the de Sitter vacuum, measured by relative entropy (S_{\mathrm{rel}}), serves as a potential on the space of metrics. The uniqueness follows from four fundamental axioms: monotonicity under quantum channels, additivity on tensor products, normalization, and compatibility with the first law of entanglement thermodynamics. By employing the Bogoliubov-Kubo-Mori (BKM) metric and Helmholtz integrability, we show that the Einstein-Lovelock structure is the only consistent local dynamics for such an information-theoretic potential. The cosmological constant \Lambda is identified as the curvature radius of the information manifold, while Newton's constant G_N measures the information cost of metric deformations.</p> </blockquote> |
| title | Geometry from Information: Uniqueness of Relative Entropy as the Gravitational Potential. |
| url | https://doi.org/10.5281/zenodo.18826570 |