概述
本文以11章的篇幅,对电弧螺旋流形进行了公理化推导,建立了一个严谨的运动学演化几何框架。本文摒弃了传统的固有质量和电荷假设,将这些物理可观测量表述为涌现的几何和拓扑不变量。具体而言,它们被数学地描述为模配分函数内拓扑鞍点的全息投影和相位诱导,并受到空间边界条件的约束。索取全文
Geometric Construction and Equations of Motion for the Electric Arc-Helix Manifold
Overview:
This paper presents an 11-chapter axiomatic derivation of the Electric Arc-Helix manifold, establishing a rigorous geometric framework for kinematic evolution. By departing from the conventional assumption of intrinsic mass and charge, this work formulates these physical observables as emergent geometric and topological invariants. Specifically, they are mathematically described as the holographic projections and phase inductions of Topological Saddles within a Modular Partition Function, subjected to constrained spatial boundary conditions. Full articleh
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发表于 2026-3-3 00:30
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