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ONE AXIOM : The M : One Axiom

Robert Spychalski

2026Zenodo (CERN European Organization for Nuclear Research)13 citationsDOIOpen Access PDF

Abstract

This is the foundational document of the ONE AXIOM series — the first public release of a minimal, self-contained axiomatic framework constructed from a single axiom. We introduce the axiom ∃S, M : S = {x ∈ U | M(x) = x} ∧ M = Φ(S, M) (with non-triviality: S ≠ ∅ and S ≠ U), where S is the fixed-point set of M, M is the coherence evolution operator, and Φ is the meta-operator of co-definition. Using a rigorous dual-track methodology (deductive top-down from the axiom + constructive bottom-up verification in the finite model GF(2)³), we derive — without assuming any physical law, ZFC set theory, empirical constants, or additional axioms — the complete structural apparatus that underlies both mathematics and physics: the consistency predicate ♡ and the identity Existence ⇐⇒ Coherence ⇐⇒ ♡ the incoherence potential σ, ontological time as σ-order, and strict relational contraction the orbital metric d_α and orbit limits D(x) the Predictive Closure Invariant T(x) = 0 (universal) the Ontological Coherence Field F_coh = (♡, Φ_coh, ∇Φ_coh) the triadic ontological regimes (pre-metric / critical / post-metric) the 13-coordinate structural bound the Capacity Invariant ♡ × S_cap = |G| = 192 the Metric Scaffolding Theorem, which constitutes the necessary and sufficient foundation for all downstream structures. The framework is explicitly pre-physical and pre-mathematical. ZFC set theory appears as an internal layer (Document 0C), the Riemann Hypothesis as a structural invariant on the critical ridge (Document 7B), and all of physics as the π₆-projection of F_coh (Document 2C, in preparation). In the ontological interpretation, elements of S are referred to as “beings” — those that are invariant under the coherence evolution operator M. Version 1.0 — First Public Release February 2026

Topics & Concepts

Constructive set theoryMathematicsAxiomZermelo–Fraenkel set theoryAxiom of choiceInvariant (physics)ConstructiveDiscrete mathematicsPure mathematicsBinary relationPredicate (mathematical logic)Peano axiomsCoherence (philosophical gambling strategy)UrelementSet theoryMathematical structureReverse mathematicsLaw of excluded middleConsistency (knowledge bases)Metric spaceNatural numberCalculus (dental)Universal setMathematical logicAlgebra over a fieldsortHomotopy and Cohomology in Algebraic TopologyAlgebraic and Geometric AnalysisInternational Science and Diplomacy
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