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Spectral Proof of the Riemann Hypothesis

Author: Lawrence Ip

DOI (Zenodo Preprint): 10.5281/zenodo.15334802


Date of Preprint Release: May 4, 2025
Download Metrics (as of May 9): 123 verified downloads in 120 hours


🧠 Overview

The RH proof presents a complete resolution of the Riemann Hypothesis (RH) based on a spectral-theoretic construction. The core idea is the realization of a self-adjoint operator whose spectrum coincides exactly with the non-trivial zeros of the Riemann zeta function.

The proof is deductive and rigorous—free from heuristics, probabilistic arguments, or circular dependencies. It treats RH not as a conjecture, but as a spectral theorem.


📌 Quick Start

  1. Read RH_Proof_L_Ip.pdf — the main document outlining the proof.
  2. Review RH_Proof_Rebuttal_L_Ip.txt — anticipated objections and clarifications.
  3. Explore Supplementary Material.txt — trace formula derivation and numerical validation.
  4. Consult Fourier_Riemann_Unity_Theorem.pdf — a complementary philosophical and operator-theoretic framing.

🔬 Core Claim

The proof constructs a mathematically natural operator whose spectral properties necessarily enforce the truth of the Riemann Hypothesis. The framework ensures that all non-trivial zeros of the zeta function are accounted for, with no possibility of off-critical or extraneous values.

This establishes RH as a consequence of operator theory and spectral completeness.


📄 Included Documents

  • RH_Proof_L_Ip.pdf — Full proof
  • RH_Proof_Rebuttal_L_Ip.txt — Responses to theoretical objections
  • Supplementary Material.txt — Numerical verification and trace analysis
  • Reviewer Reference Document.txt — Preemptive peer-review clarifications
  • Fourier_Riemann_Unity_Theorem.pdf — Broader conceptual framework

📐 Technical Themes

  • Spectral theory and self-adjoint operators
  • Functional analysis and operator domains
  • Trace formulas and spectral density
  • Numerical consistency with known zeta zero distributions
  • Philosophical implications via Spectral Ontology

📜 License

This repository and its contents are licensed under the
Creative Commons Attribution 4.0 International License (CC BY 4.0).
You are free to share and adapt the material for any purpose, even commercially, provided that appropriate credit is given.

License: CC BY 4.0


🧩 Repository Structure

.
├── RH_Proof_L_Ip.pdf
├── RH_Proof_Rebuttal_L_Ip.txt
├── Supplementary Material - Numerical Verification and Annotated Trace Formula Derivation.txt
├── Reviewer Reference Document - Spectral Justification and Trace Formula Validity.txt
└── The_Fourier_Riemann_Unity_Theorem_Spectral_Identity_and_the_Ontological_Closure_of_Arithmetic_L_Ip.pdf

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Proof of the Riemann Hypothesis via a Self-Adjoint Operator

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