We present a unified manuscript of the five-module TEBAC Hilbert-Pólya program, formulating in one place the main conclusion of the project: all nontrivial zeros of the Riemann zeta function lie on the critical line. The methodology treats the completed Riemann xi-function (s) as the natural target, utilizing the quadratic parameter = (s-12) ^2 governed by the functional-equation symmetry. The proof is structured so a referee can check the argument module by module: the canonical determinant package (HP-E2N), the GL (1) end-normal-form and compact-resolvent package (HP-II), the trace prime conversion module (HP-III), the complex-time wedge and rigidity closure (HP-IV), and the final Hilbert-Pólya spectral bridge (HP-V). Ultimately, the spectral step identifies the HP heat side with the canonical determinant side, converting the completed determinant into a genuine spectral determinant.
Tosho Lazarov Karadzhov (Thu,) studied this question.
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