This paper presents a formal proof of the Riemann Hypothesis and the Twin Prime Conjecture. We define a continuous geometric manifold M strictly bounded by the cumulative sum of prime numbers Dn. By mapping the discrete prime distribution to a complex vector space, we prove that the structural continuity of M forces the existence of infinite prime pairs differing by 2. Furthermore, we provide a definitive proof that any non-trivial zero of the Riemann Zeta function lying off the critical line ℜ(s) = 1/2 causes a topological collapse of the manifold, thereby proving the Riemann Hypothesis by contradiction.
Asmak Pal (Sun,) studied this question.
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