The Cosmic Egg Theory is a geometric proof. Beginning from a single crossing — two pyramids base-to-base at θ = π/8 — it derives the fundamental constants of the observable universe with zero free parameters. The fine structure constant, the observer's position, the structure of space itself: all forced by the geometry, none assumed.

Aureole is what that proof opens into.

Every field of human knowledge — history, philosophy, language, consciousness, biology, the arts — looks different once the geometry is seen. Not because the proof is being forced onto those fields, but because the structure it describes is genuinely present in them. The pattern keeps showing up. This is a library for what the pattern illuminates.

How this library works

Most reference works are organized by discipline. You enter through physics, or philosophy, or history, and those categories define what you can find. Aureole is organized differently: by what the geometry reveals, wherever it shows up.

Pages are the primary unit. Each page is a standalone article — readable on its own, linked to what it touches. A page can appear in multiple section indexes. Hilma af Klint appears under both History and MusicArts. The Eros page under Philosophy links back to the geometric proof on CET. The structure is a web, not a tree.

The library grows indefinitely. Every genuine discovery — a figure restored, a pattern named, a connection made — earns a page. There is no endpoint to what the geometry illuminates. There is only more clarity.

Where to begin

If you have not read the geometric proof, start with cosmiceggtheory.com. The proof is the foundation. Everything here is downstream of it.

If you are already familiar with the framework, the natural entry points are:

  • Restoration of Women — the paper that began the historical thread. Four thousand years of bilateral erasure, read carefully.
  • Eros — the oldest philosophical account of what Cosmic Egg Theory calls zero. Diotima saw it in Athens. The geometry named it two and a half millennia later.
  • Papers — the full publication record of the Aureole Foundation.

Epistemic position

The proof makes no room for free parameters. The library asks for the same precision. Where a connection is formal — derivable, necessary — it is stated as such. Where it is a resonance — illuminating but not proven — it is labeled as such. The two categories are kept distinct throughout.

Resonances illuminate. They do not prove. The geometry does the proving.