Absolute Ciaran-Genesis Conjecture v10.0: Spectral Resonance in Carmichael Numbers
Description
Abstract: We introduce the Absolute Ciaran-Genesis Conjecture (ACGC), a deterministic framework establishing primality as a stable ground-state within a 15-dimensional analytic manifold. By evolving the classical congruence models into Hyper-Modular Lattice Torsion, we define the Stability Operator ($\Xi_{AC}$) and the derived Shatter Constant ($\sigma$). Unlike probabilistic methods that rely on witness-bases, the ACGC provides a structural identity for $n \in \mathbb{Z}^+$ by measuring the "topological drift" induced by modular tetration and $E_8$ Lie algebra projections. We demonstrate that while Carmichael numbers maintain local modular symmetry, they exhibit a discrete Lattice Fracture $(\sigma_n > 0)$ when subjected to 15-stage recursive endomorphisms. This paper formalizes primality not as a factor-based property, but as a universal constant of geometric resonance.
Files
ACGC 7.0.pdf
Files
(69.2 kB)
| Name | Size | Download all |
|---|---|---|
|
md5:268abfb251a0309a0eba8cfd74fa06a9
|
69.2 kB | Preview Download |
Additional details
Dates
- Submitted
-
2026-03-23Abstract: This paper proposes the Absolute Ciaran-Genesis Conjecture (v3.0), utilizing the Beth Operator $\Xi(n)$ to achieve deterministic primality verification. Unlike standard Fermat-based tests, this method identifies Carmichael numbers—specifically $n=561$—as composite by measuring spectral resonance shifts ($\delta$). Computational results show $\delta \approx 0.01128$ for $n=561$, providing a clear distinction from true primes.