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Research Paper | Synapse

March 24, 2026Open Access

Distinction Observable Theory (DOT): Foundations and the Octahedral Machine (Part I)

Puntos clave

The research aims to define the Distinction Observable Theory (DOT) through mathematical and geometric frameworks.
Introduced the complete tripartite graph K(2,2,2) as a fundamental mathematical structure.
Examined the nilpotent boundary operator linked to the octahedron.
Analyzed geometric and topological constraints to derive logical distinctions.
Validated the significance of the tripartite graph in forming conceptual frameworks.
Demonstrated how geometric properties lead to logical and physical distinctions.

Resumen

This is Part I of the Distinction Observable Theory (DOT). It establishes the fundamental mathematical carrier of the theory — the complete tripartite graph K(2,2,2) (the octahedron) and its nilpotent boundary operator, demonstrating how geometric and topological constraints naturally give rise to logical and physical distinctions.

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Cite This Study

Igor M. Zhuk (Sun,) studied this question.

synapsesocial.com/papers/69c2295caeb5a845df0d3bc8 https://doi.org/https://doi.org/10.5281/zenodo.19161120

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