A Direct Proof of the Riemann Hypothesis - Part 3: Prospecting for a Proof of the Riemann Hypothesi

A function υ(s) is derived that shares all the nontrivial zeros of Riemann’s zeta function ζ(s), and a novel representation of ζ(s) is presented that relates the two. From this the zeros of ζ(s) may be grouped according to two types: υ(s)=0 and υ(s)≠0. A direct algebraic proof of the Riemann hypothesis is obtained by setting both functions to zero and solving for two general solutions for all the nontrivial zeros. YOU CAN LINK TO THE PAPER PREPRINT HERE: https://www.researchgate.net/publication/344037263_A_Direct_Proof_of_the_Riemann_Hypothesis It was Michael Spivak who wrote that [the tangent half angle substitution] method was the "sneakiest substitution" in the world. https://en.wikipedia.org/wiki/Weierstrass_substitution PATREON: I have "unlaunched" / closed my Patreon account since these videos were uploaded.

Видео A Direct Proof of the Riemann Hypothesis - Part 3: Prospecting for a Proof of the Riemann Hypothesi автора Элементарные математические игры