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Bibliographic Details
Main Author: Cobley, James N.
Format: Preprint
Published: 2025
Subjects:
Online Access:https://arxiv.org/abs/2508.20004
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author Cobley, James N.
author_facet Cobley, James N.
contents The fundamental laws governing proteoform dynamics have yet to be formulated. As a result, it is unclear how a specific proteoform, a distinct molecular variant of a protein, dynamically shapes its own future by evolving into new modes that exist only in potential until realised. Here, Modal Geometric Field (MGF) Theory couples real and abstract proteoform transitions through four axioms. Axioms 1 to 3 (invariant) dictate that only first-order transitions occur on the discrete, volume-invariant, non symplectic modal manifold. Axiom 4 (mutable) projects the occupancy and shape of a real, instantiated molecule into the modal manifold, generating occupancy-induced curvature. By coupling what is real to what is abstract, curvature, which is always conserved, governs proteoform dynamics by dictating the least-action modal transition. Because curvature distribution renders activation energy relative, barriers are mutable, and entropy emerges inevitably from curvature transport. This unification of energy, entropy, and curvature yields hysteresis, path dependence, fractal self similarity, and trajectories that oscillate between order and chaos. As a scale invariant and universal framework, MGF Theory reveals how modal geometry governs proteoform dynamics
format Preprint
id arxiv_https___arxiv_org_abs_2508_20004
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Modal Geometry Governs Proteoform Dynamics
Cobley, James N.
Biomolecules
The fundamental laws governing proteoform dynamics have yet to be formulated. As a result, it is unclear how a specific proteoform, a distinct molecular variant of a protein, dynamically shapes its own future by evolving into new modes that exist only in potential until realised. Here, Modal Geometric Field (MGF) Theory couples real and abstract proteoform transitions through four axioms. Axioms 1 to 3 (invariant) dictate that only first-order transitions occur on the discrete, volume-invariant, non symplectic modal manifold. Axiom 4 (mutable) projects the occupancy and shape of a real, instantiated molecule into the modal manifold, generating occupancy-induced curvature. By coupling what is real to what is abstract, curvature, which is always conserved, governs proteoform dynamics by dictating the least-action modal transition. Because curvature distribution renders activation energy relative, barriers are mutable, and entropy emerges inevitably from curvature transport. This unification of energy, entropy, and curvature yields hysteresis, path dependence, fractal self similarity, and trajectories that oscillate between order and chaos. As a scale invariant and universal framework, MGF Theory reveals how modal geometry governs proteoform dynamics
title Modal Geometry Governs Proteoform Dynamics
topic Biomolecules
url https://arxiv.org/abs/2508.20004