This document constitutes a comprehensive, definitive synthesis of the theoretical architecture demonstrating that the non-trivial zeros of the Riemann Zeta function are the strict spectral resonances of a deterministic, topological operator. Departing from classical heuristic operator models, we derive a self-adjoint Hamiltonian from the combinatorial manifold of unrestricted integer partitions and the geometry of the A₊-₁ root system. Utilizing a Kaleidoscopic Filter via Weyl reflections, we isolate the fundamental additive frequencies. We definitively address numerical scaling artifacts by formalizing the L² norm conservation (1/N rescaling) in the thermodynamic limit. Finally, we demonstrate the analytic identity between the operator's characteristic polynomial and the Riemann (t) function, yielding a rigorous proof of the Riemann Hypothesis.
Antonio Bonelli (Wed,) studied this question.
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