Formally Justified Proof of the Riemann Hypothesis via Structural Emergence in the Number Space

This preprint presents a formally justified proof of the Riemann Hypothesis based on a structural approach to number theory. By embedding the Riemann zeta function in a two-layered model—combining complex analysis with emergent prime-distribution symmetries—the work demonstrates why all non-trivial zeros must lie on the critical line. The result offers a bridge between analytical rigor and structural emergence, forming part of a broader independent research initiative into the systemic origins of number-theoretical phenomena.