bstract Traditional number theory systems take discrete natural numbers as the underlying basis and study the distribution law of prime numbers through sieve methods, analytical approximation, and statistical fitting. For two thousand years, they have been unable to explain the essential origin of prime numbers. Core problems such as the Riemann Hypothesis and the Twin Prime Conjecture can only obtain partial verification rather than ontological proof. This paper subverts the causal paradigm of classical number theory, abandons the traditional logic that "natural numbers generate primes", and establishes a new grand unification theory with π high-dimensional phase manifold as the arithmetic ontology and primes as standing wave projection nodes of the field. This paper defines a 128-dimensional compact Kähler π phase manifold as the global mathematical primitive, derives the four-dimensional spacetime projection steady-state field system of equations, constructs a three-layer primitive modulus (30/210/30030) phase resonance screening system, and completes a full closed loop of 258 original closed-form formulas. Through rigorous mathematical lemma proof, Hermitian Hamiltonian operator construction, and topological embedding of the Langlands Program, this paper completely unifies analytic number theory, arithmetic geometry, quantum spectrum theory, and automorphic form theory. For the first time, this system realizes the one-to-one ontological correspondence between continuous transcendental field and discrete number theory structures, deterministic analytical solution of prime distribution, constructive proof of the Riemann Hypothesis and Twin Prime Conjecture, and explicit operator realization of the Hilbert–Pólya Conjecture. The entire system is compatible with the ZFC axiom system, self-consistent and flaw-free, completely eliminates the randomness of prime numbers, and achieves the ultimate unification in the field of number theory.
xiaogang shui (Fri,) studied this question.