Coherent Mathematics (coMath) Meta-Axiom System Version 1.1

We present a formal axiom system for Coherent Mathematics (coMath), a framework in which mathematical structures emerge from physical measurement networks rather than abstract logical primitives. The system consists of eight meta-axioms derived from Fractal Uncertainty Theory (FUT), establishing mathematics as the high-coherence limit of view-vector networks governed by Rotation (R) and Recursion (F). We derive the fundamental constants 0, 1, i, π, φ, e and the structure of primes, natural numbers, and complex numbers from coherence principles, and outline the research program for deriving all classical mathematics as emergent high-coherenceprojections.