A Rigorous Geodynamic Model for the Riemann Zeta Zeros: Topological Defect Constant, Inverse Metric Derivation, and Exact Prime-Frequency Correspondence

This paper provides fully rigorous definitions, analytic derivations, and closed-form irrational constructions for all nonstandard terms. We define the topological defect constant epsilon_infinity via inverse metric calculation on a high-dimensional logarithmic spiral manifold, derive its exact irrational value. We rigorously define the frequency acceleration operator omega as a metric-induced functional operator rather than a numerical constant, and verify the exact matching with the first non-trivial Riemann zero without any fitted parameters. Number theory and physical interpretation are strictly separated for peer review.