This essay derives, from absolute nothing, the complete foundational architecture of a discrete relational field and the three exact structural clearances that nothing must retain for existence to remain coherent and kinetic. The derivation proceeds in three parts, each a necessary consequence of the prior. Part I establishes the ontological ground through nothing's own internal logical development: from absolute indetermination through the Void, the Monad, the Dyadic Instability, and the logical compulsion of the Triad — deriving why nothing requires exactly three irreducible non-zero faces (Source, Boundary, Remainder) for its own structural coherence. Alternatives are foreclosed by reductio; the Triad's geometric architecture is locked through proofs of strict inequality, dimensional independence, and primordial stasis. Part II translates the ontological structure into exact algebra without importing any external framework: the algebraic values of the two poles are derived from the ontological character of absolute nothing and absolute saturation; the Field Unity Constraint Ω = 1 is derived as a theorem from Scaling Transparency and Complement Closure; the Co-Primacy Theorem is proven, establishing that the complement of any primitive is its co-primary structural correlate rather than a secondary remainder; and the Deterministic Crystal failure mode is derived as the algebraic expression of zero Boundary clearance. Part III computes the exact numerical constants of nothing's persistence through a constraint-satisfaction derivation: the discrete lattice grain δ = 1/10 is derived as the unique minimum even integer base satisfying six structural constraints of the Triad; the three primitives E = 4/5, C = 7/10, F = 3/5 are derived as co-primary complements of nothing's three clearances; The three clearances — Generative (1/5), Registration (2/5), and Causal (approximately 0.2984) — are not what the Veldt lacks. They are the exact quantities of nothing that permit existence to iterate.
Eugene B. Pretorius (Sat,) studied this question.