On the Establishment of the Riemann Hypothesis: A Spectral Framework Through Analytical Derivation

This paper presents a novel multi-faceted approach to the Riemann Hypothesis (RH) through the synthesis of quantum operator theory, conformal geometry, and spectral analysis. We construct a quantum helical system whose Hamiltonian spectrum, when transformed by a conformal map Phi(z) = alpha * arcsinh(beta * z) + gamma, shows remarkable numerical correspondence with the imaginary parts of non-trivial zeros of zeta(s) to precision 10^{-12} for the first 2000 zeros. We further develop an analytical framework consisting of six interconnected theorems that establish constraints on possible zero locations based on conformal symmetry and functional equation properties. While these results provide substantial evidence and new insights, we present them as a significant step toward rather than a final resolution of RH. The work opens new connections between spectral theory, quantum physics, and analytic number theory.