A proof of Riemann Hypothesis
Abstract
Let (t) be a function relating to the Riemann zeta function ζ (s) with s = 1 2 + it. In this paper, we construct a function v containing t and (t), and prove that v satisfies a nonadjoint boundary value problem to a nonsingular differential equation if t is any nontrivial zero of (t). Inspecting properties of v and using known results of nontrivial zeros of ζ (s), we derive that nontrivial zeros of ζ (s) all have real part equal to 1 2, which concludes that Riemann Hypothesis is true.
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