Standard mathematics is fundamentally constrained by an infinite continuum of irrational, non-repeating constants pi, sqrt 2, Golden Ratio, zeta(s) that introduce floating-point rounding decay and thermodynamic inefficiencies into both theoretical geometry and digital computing. Intra-Orthogonal Metric Geometry (IOMG), author Mindy Lee, completely replaces this infinite continuum with a fixed, deterministic system of five-digit terminal constants. By evaluating spatial geometry and number theory from the perspective of rigid, right-angled parent boundaries (squares) projecting inward, IOMG resolves the classical paradoxes of circle-squaring and ancient spatial text anomalies (e.g., 1 Kings 7:23). Crucially, when applied to number theory, IOMG uncovers an exact geometric mechanism that governs the distribution of prime numbers, yielding a direct, arithmetic Solution to the Riemann Hypothesis. Furthermore, by eliminating numerical truncation and bit-erasure, the IOMG algorithm enables a brand-new hardware paradigm: Zero-Dissipation, Resistance-Free Computing. These documents serve as the formal framework to establish strategic partnerships for the commercialization and publication of this unified solution.
Mindy Lee (Wed,) studied this question.