We present a holonomy-based framework in which continuous perturbations are reduced to integer winding numbers through a fundamental complex differential identity dW/W=dx+idχdW/W = dx + i d/W=dx+idχ. Using contour integration and topological invariance, we show that the phase integral is quantised as ∮dχ=2πn d = 2 n∮dχ=2πn, independent of local perturbations. A layered cancellation mechanism ensures that global holonomy is determined solely by defect cores, while a torus decomposition yields a path-dependent locking condition. The resulting structure separates radial and angular dynamics and provides a unified description of defect formation, winding conservation, and holonomy locking.
Jeong Min Yeon (Sun,) studied this question.
Synapse has enriched 5 closely related papers on similar clinical questions. Consider them for comparative context: