Z₂ Fiber Bundle over the φ-Torus: Spinor Architecture of Fundamental Constants — Overview
Z₂-расслоение над φ-тором: спинорная архитектура фундаментальных констант — обзор
The ODTOE toroidal model is augmented with a nontrivial Z₂ fiber bundle. The holonomy hol(γφ)=−1 along the φ-cycle is the single source of three factors of 2: i
Тороидальная модель ODTOE дополнена нетривиальным Z₂-расслоением. Голономия hol(γφ)=−1 вдоль φ-цикла является единственным источником трёх множителей 2: в числе
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The ODTOE toroidal model is augmented with a nontrivial Z₂ fiber bundle. The holonomy hol(γφ)=−1 along the φ-cycle is the single source of three factors of 2: in the number 6=3×2, in the correction 2(π−3)², and in the fermionic 4π traversal (spin-1/2). CPT symmetry (hol(CPT)=+1) and the Pauli exclusion principle (dimH⁰=1) are derived from bundle holonomy. A testable prediction is proposed: δtwist=π²(π−3)⁴/(μ·α⁻¹)≈1.58×10⁻⁸ becomes measurable at CODATA precision ±10⁻⁹.