The exact column texture: tree-level Yukawa universality in heterotic Z3 × Z3 orbifolds

Abstract

On T6/(Z3 × Z3) heterotic orbifolds where three quark generations arise from Z3 fixed-point triplication, we prove that the leading-order tree-level Yukawa amplitude -- the three-point coupling among massless string states -- has an exact column texture: Y lead(i,j) = c\,qR[j], with the O(1) coefficient c universal across all left-handed generations i. Five independent lines of evidence are given: (1) the worldsheet instanton geometry on the SU(3) root lattice gives identical areas for all non-degenerate triangles, making the geometric O(1) coefficient exactly 1; (2) the generation direction necessarily has trivial Wilson line, rendering all three generations gauge-identical, as verified across all 77 MSSM-like models in the Mini-Landscape classification; (3) an extension to two-Wilson-line models, verified on the complete Parr-Vaudrevange-Wimmer classification of 3,337 Z3 × Z3 MSSM models, confirms that no Wilson line configuration can break gauge blindness; (4) the K\"ahler metric is generation-universal by (54) representation theory; (5) the full Froggatt-Nielsen chain computation with 534 trilinear superpotential couplings and vacuum-aligned singlet VEVs produces left-circulant Yukawa matrices whose eigenstructure is generation-universal. The Froggatt-Nielsen column texture is therefore not an approximation but an exact property of the leading-order string amplitude. Non-trivial O(1) coefficients, which are required for CKM mixing angles beyond the Wolfenstein hierarchy, must originate from beyond-leading-order contributions: integrated-out heavy messenger propagators (tree-level in the low-energy effective theory), vacuum-alignment effects, multi-instanton corrections, or loop corrections.