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Autor principal: Shinya, Hisanobu
Format: Preprint
Publicat: 2007
Matèries:
General Mathematics
11M26
Accés en línia:https://arxiv.org/abs/0706.0357
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author Shinya, Hisanobu
author_facet Shinya, Hisanobu
contents Suppose that the Riemann hypothesis is false and $ρ_{*} = 1/2 + η_{*} + i γ_{*}$, $η_{*} > 0$, is a nontrivial zero of the Riemann $ζ$-function off the critical line. Under the negation of the Riemann hypothesis for the Riemann $ζ$-function, we establish an asymptotic relation (as $γ_{*} \to \infty$) which relates the residues of the series $\sum_{n \geq 1} Λ(n) e^{- 2πi p n } n^{-s}$ at $s =$ corresponding nontrivial zeros of some Dirichlet $L$-functions to some function, valid for any rational number $p = a/b < 1$ with $b \ll \log γ_{*}$. This related function is continuous in $p$ and we mention its implication to the Riemann hypothesis.
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publishDate 2007
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spellingShingle On a new approach to the Riemann hypothesis
Shinya, Hisanobu
General Mathematics
11M26
Suppose that the Riemann hypothesis is false and $ρ_{*} = 1/2 + η_{*} + i γ_{*}$, $η_{*} > 0$, is a nontrivial zero of the Riemann $ζ$-function off the critical line. Under the negation of the Riemann hypothesis for the Riemann $ζ$-function, we establish an asymptotic relation (as $γ_{*} \to \infty$) which relates the residues of the series $\sum_{n \geq 1} Λ(n) e^{- 2πi p n } n^{-s}$ at $s =$ corresponding nontrivial zeros of some Dirichlet $L$-functions to some function, valid for any rational number $p = a/b < 1$ with $b \ll \log γ_{*}$. This related function is continuous in $p$ and we mention its implication to the Riemann hypothesis.
title On a new approach to the Riemann hypothesis
topic General Mathematics
11M26
url https://arxiv.org/abs/0706.0357

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