Published June 6, 2026 | Version v1

The Hyper-Matrix Critical Line Conjecture: A Geometric-Spectral Model of Prime Resonance and Stability Invariants

Description

This document formalizes the Hyper-Matrix framework as a research program investigating the distri-
bution of prime numbers as spectral signatures of a π-centered periodic manifold [0, 2π]. We establish
the Invariant System Radius (rbase) from transcendental growth convergence and propose a candidate
spectral operator derived from the n-th Order Radical Engine (Rn). We derive the stability of the
critical line ℜ(s) = 0.5 as the mandatory geometric solution for Asymptotic Boundary Alignment re-
quired to prevent structural divergence at the manifold’s topological singularities (π/2, 3π/2). Finally,
we define the Reverse Intercept Law as a falsifiable numerical law for zeta-zero locations.

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