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| フォーマット: | Recurso digital |
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Zenodo
2026
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| 主題: | |
| オンライン・アクセス: | https://doi.org/10.5281/zenodo.18723148 |
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- <p><span>This document is part of the Informational Mechanics (IM) framework and is published in the IM-D (Core Physics) series within the IM v0.3 corpus.</span></p> <p><span>The paper provides a constructive existence result for an effective geometric phase of description within a tensorial entanglement regime. Building on the structural criteria developed in IM-D007 and the tensor minimality results of IM-B004, the analysis demonstrates that a tree tensor network (TTN) regime satisfying admissibility constraints admits a well-defined path-length metric derived from entanglement invariants.</span></p> <p><span>The result is regime-conditional and existence-based: it establishes that geometric description can emerge under specific structural conditions without asserting universality, gravitational dynamics, holographic duality, or spacetime ontology.</span></p> <p><span>No new axioms, dynamical models, or empirical fits are introduced. The contribution is structural and classificatory, clarifying when entanglement organization supports effective geometric language while preserving locality, operator-defined observability, and regime-bounded validity.</span></p>