Defect-Induced Non-Abelian Mixing and Dissipative Reduction

We propose a defect-mediated mechanism linking angular-velocity blow-up, holonomy preservation, and nonabelian structure formation in multi-layer Möbius phase-loop systems. We show that outer-layer divergence forces a singular compensating mode in the central layer, converting continuous angular divergence into a localized holonomy jump. This induces a structural reduction su(3) → su(2) and generates an effective mass from phase mismatch. The π/2 phase constraint enforces nonabelian curvature and vortex formation, while curvature-correlated dissipation drives an irreversible cascade toward a trivial holonomy state. This provides a dynamical selection mechanism for irreducible holonomy configurations.