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Open Data, Tools, and Resources for the Omnifield Axiom

Everything needed to understand, reproduce, or challenge Φ-Theory is made publicly available. Below you’ll find downloadable papers, CSV datasets, simulation tools, and visual interfaces based on the theory’s predictions and derivations.

Wherever possible, external links point to versioned academic repositories or trusted public platforms (e.g. Zenodo, GitHub, arXiv).

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1. Primary Papers

Φ-Theory: The Omnifield Axiom — full scientific draft

Structure: Abstract → Axiom → Formula → Derivations → Predictions → Conflict → Implications

Download PDF
Atoms Not Yet Seen — periodic table harmonic extension via Φ-octave recursion

Download PDF
Planetary Orbits via Recursive Harmonics — modeling orbital systems using Φ growth law

Download PDF

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2. Raw Datasets and CSV Exports

Periodic Table Mapping: Stable Z values vs Φ recursion harmonic zones

Download CSV
Orbital Distances: Planetary radii computed via:

$r_n = r_0 \cdot \phi^n + \delta_n$

Download CSV

Predictions Tracker: Experimental thresholds and falsification limits
Download CSV

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3. Visual and Computational Simulators

Golden Ratio Planetary Orbital Explorer

Real-time orbit generation based on:

$r_n = r_0 \cdot \phi^n$

→ Launch Simulator
Built with Streamlit / Plotly. Source code available upon request.

Φ-Field Soliton Explorer (beta)
Interactive model of radial solitons in a potential:

$\Phi(r) = \epsilon \, e^{- \beta r^2} \, e^{i\omega t}$

→ Launch Field Simulator

Casimir Anomaly Estimator (based on recursive boundary pressure curve)
→ Launch Tool

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4. Visual Gallery and Illustrations

Φ-Theory Overview (Diagram): A one-page scientific infographic

Download PNG
Metric Emergence Visual: From field gradients to Einstein tensors

Download SVG
Orbital Shells Visual: Φ-octave rings superimposed on solar system

Download PNG

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5. Citation and Acknowledgment

To cite Φ-Theory or the Omnifield Axiom in academic work, use:

Dritëro. (2025). Φ-Theory: The Omnifield Axiom. phitheory.org

DOIs and arXiv uploads are being prepared for submission. Peer-reviewed publication is planned but not a precondition for transparency or criticism.

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6. Participate or Contribute

If you are a researcher, theorist, student, or critic and would like to participate:

Propose a simulation
Request mathematical extensions (e.g., QFT, curvature manifolds, discrete lattice models)
Attempt to falsify predictions
Submit peer reviews

Contact: email@phitheory.org

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Final Note

This theory is open because it must be. There is no institution, branding, or authority behind it. Only logic, recursion, and an invitation to engage.

Every formula can be traced to one line:

$\Phi(x^\mu) = \epsilon \, e^{\frac{i}{\hbar} S(x^\mu)}$

The rest is what emerges from it — or doesn’t.