Related papers: Intrinsic Geometry of Operational Contexts: A Riemannian-Style Framework for Quantum Channels

Intrinsic Geometry of Operational Contexts: A Riemannian-Style Framework for Quantum Channels

URL: http://arxiv.org/abs/2512.12944v1
Date: Mon, 15 Dec 2025 03:11:44 GMT
Title: Intrinsic Geometry of Operational Contexts: A Riemannian-Style Framework for Quantum Channels
Authors: Kazuyuki Yoshida,
Abstract summary: We propose an intrinsic geometric framework on the space of operational contexts, specified by channels, stationary states, and self-preservation functionals.<n>The Hessian of this functional yields an intrinsic metric on charge space, while non-commutative questioning loops dN -> dPhi -> d rhocirc define a notion of curvature.
Score: 0.0
License: http://creativecommons.org/licenses/by/4.0/
Abstract: We propose an intrinsic geometric framework on the space of operational contexts, specified by channels, stationary states, and self-preservation functionals. Each context C carries a pointer algebra, internal charges, and a self-consistent configuration minimizing a self-preservation functional. The Hessian of this functional yields an intrinsic metric on charge space, while non-commutative questioning loops dN -> dPhi -> d rho^circ define a notion of curvature. In suitable regimes, this N-Q-S geometry reduces to familiar Fisher-type information metrics and admits charts that resemble Riemannian or Lorentzian space-times. We outline how gauge symmetries and gravitational dynamics can be interpreted as holonomies and consistency conditions in this context geometry.

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