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The Riemann Hypothesis

EasyChair Preprint 3708, version 3

4 pagesDate: July 26, 2020

Abstract

In mathematics, the Riemann hypothesis is a conjecture that the Riemann zeta function has its zeros only at the negative even integers and complex numbers with real part $\frac{1}{2}$. Many consider it to be the most important unsolved problem in pure mathematics. It is one of the seven Millennium Prize Problems selected by the Clay Mathematics Institute to carry a US 1,000,000 prize for the first correct solution. The Robin's inequality is true for every natural number $n > 5040$ if and only if the Riemann hypothesis is true. We demonstrate the Robin's inequality is possibly to be true for every natural number $n > 5040$ which is not divisible by $2$, $3$ or $5$ under a computational evidence. Indeed, we have checked this for every number $10^{307} \geq  n > 5040$ which is not divisible by $2$, $3$ or $5$. In this way, if there is a counterexample for the Robin's inequality, then this should be for some natural number $n > 5040$ which is divisible by $2$, $3$ or $5$.

Keyphrases: Divisor, inequality, number theory

BibTeX entry
BibTeX does not have the right entry for preprints. This is a hack for producing the correct reference:
@booklet{EasyChair:3708,
  author    = {Frank Vega},
  title     = {The Riemann Hypothesis},
  howpublished = {EasyChair Preprint 3708},
  year      = {EasyChair, 2020}}
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