Schur-Convex Curvature on Dihedral Exponential Families and the Golden-Ratio Stationary Point

Abstract

We investigate the Schur-complement curvature of DN-equivariant folded exponential families on the simplex. Our main structural results are: (i) the curvature kappaSchur(theta) is convex in the log-parameter theta = ln(q); (ii) it admits a unique stationary point at the golden ratio value q* = phi-2 (in particular for N = 12); and (iii) it obeys a quadratic folded law kappaSchur = A(N, mrho2) I12 + B(N, mrho2) (I2 - I12), with coefficients A, B determined explicitly by the projector metric of radius mrho2. Taken together, these results show that convexity and symmetry alone enforce both the location and the functional form of the "golden lock-in." Beyond their intrinsic interest, these findings identify D12 as the minimal dihedral lattice where parity (mod 2) and three-cycle (mod 3) constraints coexist, producing a structurally stable equilibrium at the golden ratio. This places the golden ratio not as an accident of parameterization but as a necessary consequence of convex geometry under dihedral symmetry. Possible applications include harmonic analysis on group orbits, invariant convex optimization, and the structure of tilings or quasicrystal-like systems.

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