The average value of a certain number-theoretic function over the primes

Louis Rubin
Notes on Number Theory and Discrete Mathematics
Print ISSN 1310–5132, Online ISSN 2367–8275
Volume 29, 2023, Number 3, Pages 564–570
DOI: 10.7546/nntdm.2023.29.3.564-570
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Louis Rubin
Department of Mathematics, Florida State University
Tallahassee, Florida, United States

Abstract

We consider functions $F:\mathbb{Z}_{\geq 0}\rightarrow\mathbb{Z}_{\geq 0}$ for which there exists a positive integer $n$ such that two conditions hold: $F(p)$ divides $n$ for every prime $p$ , and for each divisor $d$ of $n$ and every prime $p$ , we have that $d$ divides $F(p)$ iff $d$ divides $F(p\textnormal{ mod }d).$ Following an approach of Khrennikov and Nilsson, we employ the prime number theorem for arithmetic progressions to derive an expression for the average value of such an $F$ over all primes $p,$ recovering a theorem of these authors as a special case. As an application, we compute the average number of $r$ -periodic points of a multivariate power map defined on a product $Z_{f_1(p)}\times\cdots\times Z_{f_m(p)}$ of cyclic groups, where $f_i(t)$ is a polynomial.

Keywords

Average value
Prime number
Periodic points
Cyclic groups

2020 Mathematics Subject Classification

37C25
11N37

References

Khrennikov, A., & Nilsson, M. (2001). On the number of cycles of p-adic dynamical systems. Journal of Number Theory, 90, 255–264.
Oleschko, K., Khrennikov, A., Oleshko, B., & Parrot, J. (2017). The primes are everywhere, but nowhere… New Trends and Advanced Methods in Interdisciplinary Mathematical Sciences, Springer, 155–167.

Manuscript history

Received: 18 April 2023
Revised: 21 July 2023
Accepted: 26 July 2023
Online First: 2 August 2023

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Ⓒ 2023 by the Author.
This is an Open Access paper distributed under the terms and conditions of the Creative Commons Attribution 4.0 International License (CC BY 4.0).

Cite this paper

Rubin, L. (2023). The average value of a certain number-theoretic function over the primes. Notes on Number Theory and Discrete Mathematics, 29(3), 564-570, DOI: 10.7546/nntdm.2023.29.3.564-570.

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Abstract

Keywords

2020 Mathematics Subject Classification

References

Manuscript history

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