Direct Universal Compression Theory (DUCT) II: A Geometric Reinterpretation of the Elements via Universal Φ-Parity

This dataset presents a novel reinterpretation of the Periodic Table of Elements through the lens of Direct Universal Compression Theory (DUCT). Unlike traditional quantum mechanical models that focus on electron modeling. DUCT views the scalar compression of the field, via η Compression Coefficient (eta), as mathematical denominator of elemental mapping, this Excel-based model treats the periodic elements as levels of compressed electromagnetic radiation within a universal scalar field.

The model establishes a mathematical parity between atomic identity and field dispersion, predicated on the fundamental equation:

(Scallar Shell+ √(V_Rem))/η≈Φ≈1(+√5)/2

Scallar shell: Interpreted as the "Point Phase" of light, representing filling of scalar shells. Φ

Valence Remaining (V_Rem): A "Dispersion" metric representing the steps required to complete a stable octet (shells 4-8), acting as the dispersion factor for the field.

Compression Coefficient (η): The derived balancing denominator that represents the division of light into a phase-state form.

Phase State- The emental state of phase. Decompression being an η < phi, Stable Compression Being a phi<η<phi^2, and saturation being a compression >phi^2.