This paper presents a claim-bounded numerical study of a deterministic VE55 lattice model with U131 Wilson phases. It records three finite outputs: a strongly attractive RG fixed-point reformulation of the self-consistent α-1 equation, a three-dimensional spectral window in the positive-mode heat-kernel diagnostic at the largest tested scale, and a GOE-to-GUE statistical transition after deterministic complexification followed by complex Hermitian perturbation. The paper is explicit that these are finite numerical results, not analytic proofs of an infinite-scale continuum limit, a perturbation-free deterministic GUE realization, or a theorem about the zeta zeros.
Takada et al. (Sun,) studied this question.