This paper presents the ontological derivation on which the GRADIENT-1 pre-registration program depends. From the Primordial Axiom of Relationality, a minimum closed relational system — the Triad — is derived, producing three primitives fixed by the triadic noise floor condition: Systematization (E = 0. 8), Constraint (C = 0. 7), and Registration Frequency (F = 0. 6) at lattice grain δ = 0. 1. The derivation of these values is executed through a strict Diophantine closure analysis, proving that E = 0. 8, C = 0. 7, F = 0. 6 is the unique suite satisfying all four internal constraints simultaneously. These map directly to the empirical primitives of the GRADIENT-1 protocol: Drive (D), Limit (L), and Registration (R). The Tension Integral TI = E×C×F = 0. 336, the 3D Ising order parameter m = TIβ = 0. 7016, and the Kinetostatic Margin Φ = 0. 002 follow by derivational necessity. The universality class exponent β = 0. 325 is established not by analogy but by the structural necessity of the Triad's three-way mutual definition under the Renormalization Group fixed-point for d = 3, n = 1 systems, with the off-lattice value 0. 3333 forced by the discrete lattice to snap to the nearest stable decimal: β = 13/40 = 0. 325. Three mandatory empirical consequences are derived — excess kurtosis, super-white variance scaling, and geometry-dependent Allan deviation sign — together with two discriminators: the Fiber Falsification test and the N-GM grain-size bound. All five consequences were tested against the ROCIT 2022 optical clock network (N = 1, 398, 868 valid seconds across three geometric baselines) using the GRADIENT-1 v5 pipeline. The Jonckheere-Terpstra trend test yields Z = 14. 84, p Flat 9. 00% > Co-located 3. 05%). Allan slope signs are confirmed negative for both inter-site links and positive for the co-located control. The Fiber Falsification bootstrap 3σ lower bound (3. 28×) exceeds the fiber length ratio (1. 47×) by a 2. 24× margin. The Triadic model is not falsified by any metric in ROCIT 2022.
Eugene B. Pretorius (Mon,) studied this question.