Charged-Lepton Koide Geometry from a Green-Dressed Compact Family Cycle

Abstract

Koide's charged-lepton relation suggests that (me,mμ,mτ) is the natural family vector. We construct an effective compact-cycle model in which this vector is sampled from one real amplitude Z(φ) on an internal circle, while the masses are quadratic overlaps, ma |Z(2π a/3)|2. The amplitude is built from the two lowest antiperiodic modes on the circle; their symmetric square is periodic and gives the minimal three-harmonic family space eiφ,1,e-iφ. A reality condition together with the requirement that the amplitude comes from the square of one two-component spinor fixes the relative weights required by Koide's 45 geometry. The remaining orientation angle is fixed by matching one C3 family shift to transport on the full circle: integrating out the higher Fourier harmonics gives the Berry dressing that enters the determinant term and selects θ=-2/9. Using me and mμ as inputs, the model predicts mτ=1776.97\,MeV.