Zero-Admits Analytic Infrastructure
Zero-Admits Analytic Infrastructure
An Unconditional Bound for the Weighted Explicit Formula
Earlier work. Part of the foundational research phase that preceded the Auburn Governance Stack.
Certified analytic framework for the Riemann Hypothesis adhering to Zero-Admits verification standards. Unconditional bound for the prime-weighted sum using the classical de la Vallée Poussin error term. Deterministic Noise Floor for prime distribution variance. All constants explicitly bounded and registered.
Files
| File | Description |
|---|---|
| paper.pdf | Full manuscript |
Citation
DOI: 10.6084/m9.figshare.31268653
License
CC BY-NC-ND 4.0