Within the categorical framework of "truth as a nested function of recursors, " this paper systematically demonstrates that the validity of the Riemann hypothesis is a necessary projection of the recursor structure, and reveals its profound isomorphism with Perelman's proof of the Poincaré conjecture. We first reconstruct the core paradigm of Perelman's proof—the holistic evolution of Ricci flow and singularity surgery—and elucidate its methodological revolution beyond reductionism. Subsequently, we construct the Riemann zeta function as an object in the cognitive category \ (\), and using the recursive equation, hierarchical metric, and self-isomorphism structure of the nested function of recursors, we prove that all its non-trivial zeros must lie on the critical line \ (Re (s) =1/2\). Finally, by comparing the two proof paths, we reveal the shared meta-methodology: embedding the problem into a larger self-consistent framework and allowing the answer to manifest itself. This work demonstrates that the structure of truth is truth itself, and the Riemann hypothesis is merely the necessary appearance of the nested function of recursors in the field of number theory.
Jianbing Zhu (Sat,) studied this question.