This paper establishes the logical spine of Intent Tensor Theory (ITT): a complete derivation chain from the most primitive possible mathematical foundation -- a single bounded selector operating on a field in a coordinate-free substrate -- to observable physics, biological life, and self-referential awareness. The chain proceeds in six steps, each deriving the unique mathematical consequence of the step before it. Step 0: the only primitive -- one field, two bounds, the selector S. Step 1: the first stable firing forces a phase angle and the imaginary anchor i0. Step 2: i0 in a real field forces exactly six independent relations, which force the Inverse Heisenberg Cartesian Tensor Box (ICHTB). Step 3: the six zones force the Master Equation term by term -- Allen-Cahn is its isotropic limit. Step 4: the Master Equation dynamics force Triple Closure (i (W) =0, Q>1, Sₛel>=1) as the necessary and sufficient condition for stable matter. Step 5: stable shells yield mass from curvature, charge from boundary, spin from phase topology. Step 6: persistent matter forces a count -- the count is time -- producing the full spectrum from noble gases through the SI second (Cesium-133) through diamond through life through mind. The paper distinguishes Definitions, Propositions, Conjectures, and Theorems throughout. The central theorem (Theorem 4. 1) -- Triple Closure is necessary and sufficient for stable matter -- is proven within the framework. Three conjectures remain open: complexification uniqueness (1. 1), three dimensions as minimum (2. 1), and sentience as deep recursion (6. 1). An addendum documents independent external validation: the acoustic levitation literature independently discovered the selector bounds, the complex field structure, the six-zone count, and Closure Condition A -- without knowledge of ITT. Computational simulations achieved 100% particle lock into void geometry, confirming the closure attractor. Source: https: //gitlab. com/intent-tensor-theory. com-group/Applied validation: DOI 10. 5281/zenodo. 19598420ORCID: https: //orcid. org/0009-0004-8153-8335
Armstrong Knight (Wed,) studied this question.