The Effect of the Density of Square-Free ωp-numbers on the Bounds of Beurling Counting Function

Sarah Al-Ebrahimy; Eman  F. Mohommed

doi:10.21271/zjpas.37.1.3

Zanco Journal of Pure and Applied Sciences (Feb 2025)

The Effect of the Density of Square-Free ωp-numbers on the Bounds of Beurling Counting Function

Sarah Al-Ebrahimy,
Eman F. Mohommed

Affiliations

Sarah Al-Ebrahimy: Department of mathematic, College of Education of Al Mustansiriyah, Baghdad, Iraq
Eman F. Mohommed: Department of mathematic, College of Education of Al Mustansiriyah, Baghdad, Iraq

DOI: https://doi.org/10.21271/zjpas.37.1.3
Journal volume & issue: Vol. 37, no. 1

Abstract

Read online

Primitive weird numbers are weird numbers which are not a multiple of any smaller weird numbers. The goal of this work is to use a square-free primitive weird number x=ab where b be an increasing sequence of prime numbers such that q1 is greater than ∏_(j=1)^r▒〖(q ̅_j+1)〗 and a=∏_(j=1)^r▒q ̅_j and a is deficient number with n greater than 1, to enhancing the classic bounds of Beurling counting function on Riemann Hypothesis.

Beurling's prime system, Square-free, Abundant numbers, Deficient numbers and ωp-numbers.

Published in Zanco Journal of Pure and Applied Sciences

ISSN: 2218-0230 (Print); 2412-3986 (Online)
Publisher: Salahaddin University-Erbil
Country of publisher: Iraq
LCC subjects: Technology; Science
Website: https://zancojournal.su.edu.krd/index.php/JPAS/about

About the journal

Abstract

Keywords