Two Types of Gravity, Magnetic Genesis, and Black Hole Classification from the Trit Master Tensor

The Trit master tensor X_{μν} = S_{μν} + A_{μν} [1] is the generator of all physics. Its characteristic polynomial yields three invariants I₁, I₂, I₃. We prove three theorems. Theorem 1: the operator O = S_{μν}[A^{μα}A^{ν}_{α} − (1/3)η^{μν}Tr(A²)] is the unique parity-even dimension-6 scalar mixing S and A — proved by exhaustive operator classification. Theorem 2: the static limit of the resulting equation of motion holds to corrections of order (p/M_Trit)² ≤ 6×10⁻⁴³ for all astrophysical systems. Theorem 3: the threshold W_A = Λ_c separating Type 1 and Type 2 gravity is the Wilsonian perturbativity bound of the S-A coupling, not a free parameter. From these three theorems, two physically distinct gravitational regimes follow. Type 1 (W_A ≪ Λ_c): frozen winding, GR exact. Type 2 (W_A ≥ Λ_c): active magnetic crystallisation of S_{μν} by the antisymmetric sector — sourced by the nuclear saturation density Λ_c = (3/4π)m_p Λ³_{QCD} = 2.36×10¹⁴ g/cm³ (+2.6%). A third regime, Type 3 (det X → 0), is the black hole singularity resolved as tensor degeneracy rather than density divergence. Magnetic genesis — B primary over E because ∇·B = 0 requires no source on S² — gives jet orthogonality as a geometric theorem from l=1 on S². GR is recovered exactly in all tested regimes (W_A/Λ_c < 10⁻²⁵). Five falsifiable predictions follow, four confirmed against existing data with no free parameters.