ONE AXIOM : The M : One Axiom
Robert Spychalski
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