Improve Bounds of some Arithmetical Functions
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Published:
Apr 1, 2019
Keywords:
Analytic Number Theory, especially, The Riemann-Zeta function, Banach space and the norm function.
Main Article Content
Abstract
We show in this article the use of the norm function to get a new lower bound of Riemann-Zeta function where. This subject has been studied deeply by Hilberdink [HIL, 12]). Getting a bound for the Riemann-Zeta function in the critical strip is more challenging for many reasons related to the behavior of the Riemann-Zeta function in that strip. In the other words, the aim of this article is to prove that has a strict lower bound when the real part is very closed to the line 1. We state this in the main theorem of this paper.
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How to Cite
[1]
“Improve Bounds of some Arithmetical Functions”, JUBPAS, vol. 26, no. 2, pp. 326–331, Apr. 2019, Accessed: Apr. 19, 2025. [Online]. Available: https://journalofbabylon.com/index.php/JUBPAS/article/view/2229
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How to Cite
[1]
“Improve Bounds of some Arithmetical Functions”, JUBPAS, vol. 26, no. 2, pp. 326–331, Apr. 2019, Accessed: Apr. 19, 2025. [Online]. Available: https://journalofbabylon.com/index.php/JUBPAS/article/view/2229