Spectrum-Zero Functor Φ: A Constructive Mapping from the Spectrum of the 64-Dimensional Torus Self-Referential Operator to the Riemann ζ Zeros

Within the framework of YuanXian Theory (YXT), under the YD-T64 model and the True Circle Self-Consistency (TCSC) axiom system, we construct an explicit and computable covariant functor Φ. This functor establishes a rigorous structural bridge between geometric analysis on the 64-dimensional torus and the non-trivial zeros of the Riemann ζ function. We define the covariant functorΦ: Spec (T⁶⁴, D) ⟶ Zeros (ζ) which maps the spectrum of the self-referential differential operator D on T⁶⁴ = (S¹) ⁶⁴ to the non-trivial zeros of the Riemann zeta function via Φ (λ) = 1/2 + i·Im (λ). Key contributions include: • Categorical proof that the TCSC axiom forces the real part of all eigenvalues to vanish (Re (λ) = 0) ;• Matrix realization of D as a Block Circulant with Circulant Blocks (BCCB) operator in the Fourier basis;• Efficient numerical algorithm based on Arnoldi iteration accelerated by FFT;• High-precision numerical verification: the first 50 non-trivial zeros match Odlyzko’s tables to an accuracy of 10^-7 under collective mode approximation. This work establishes the “Arithmetic-Physical Correspondence” principle in YuanXian Theory and provides a constructive, computable approach toward the Riemann Hypothesis based on 64-dimensional self-referential dynamics.