We propose an axiomatic framework for fundamental physics in which information is the sole primitive substance. Space, time, matter, and forces emerge as derived structures from an arithmetic informational substrate. The informational space is structured by eight prime numbers 2, 3, 5, 7, 11, 13, 17, 19 as fundamental modes, with phases modulated by the golden ratio φ = (1+√5) /2. All observable physics derives from a single generating function: 𝒵 = Σₚ Σₖ p^ (-k) exp (i·2πk·ln (p) ·φ), where factorizability F = |𝒵|/ΣW yields correlation density Φ = 1-F. The irreducible structural incoherence in 𝒵 is identified with Planck's constant ℏ = Φₛtruct; quantum mechanics emerges from this arithmetic impossibility. The theory rests on 13 axioms organized in three groups (structure, manifestation constraints, dynamics) and proves 26 structural theorems, including: uniqueness of φ as phase modulator, derivation of d=3 spatial dimensions by elimination, Born rule as projective quadratic density, spectral cutoff kₘax=2 with configuration (8, 2), Standard Model gauge structure U (1) ×SU (2) L×SU (3) c, Weinberg angle sin²θW = 3/13 (0. 19% accuracy), tree-level fine-structure constant α₀ = 1/ (2π²Nₑff), and uniqueness of the action functional. No spacetime, Hilbert space, Lagrangian, or physical constant is presupposed. No free parameter is adjusted to match experiment. This paper serves as the axiomatic reference for all companion papers deriving specific physical observables.
Frederic Requiere (Thu,) studied this question.