We present an ab initio method for generating the nontrivial zeros of the Riemann zeta function using only universal geometric constants. The Omega-Zeta equation combines the Weyl semiclassical phase, Kepler sphere packing density (π/18/18 π/18), Lucas-Bronze stabilization ( (3+13) /2 (3+13) /2 (3+13) /2), and prime harmonic corrections modulated by the destructive interference of metallic ratios (∣Φ2−ϕBr2∣|² - ₁ₑ²| ∣Φ2−ϕBr2∣). Testing against 1000 Odlyzko zeros yields 98. 7% accuracy within Δt<0. 02 t < 0. 02 Δt<0. 02, with mean error 0. 006. The model requires no empirical parameters—only π π, algebraic roots (5, 13, 185, 13, 18 5, 13, 18), and self-generated primes. Marchenko-Pastur random matrix analysis confirms the synthesized zeros exhibit identical quantum chaos signatures (Mass Gap ≈−0. 015 -0. 015 ≈−0. 015) as true Riemann zeros, with null tests ruling out finite-size artifacts. The framework extends to Yang-Mills mass gap (Δ=11/Lr≈2. 986 = 11/Lᵣ 2. 986 Δ=11/Lr≈2. 986) and strong coupling constant (αs=1/62=0. 1179ₛ = 1/62 = 0. 1179 αs=1/62=0. 1179), suggesting a unified geometric origin for number-theoretic and gauge-theoretic phenomena.
Kaan Bozanlı (Thu,) studied this question.