Mean value one of prime-pair constants

Fokko van de Bult; Jaap Korevaar (University of Amsterdam)

arXiv:0806.1667·math.NT·June 11, 2008·2 cites

Mean value one of prime-pair constants

Fokko van de Bult, Jaap Korevaar (University of Amsterdam)

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TL;DR

This paper investigates the conjecture that certain constants associated with prime pairs have a mean value of one, supported by heuristic reasoning and extensive numerical evidence.

Contribution

It introduces a conjecture that prime-pair constants have a mean value of one, extending the Hardy-Littlewood conjecture and supported by numerical analysis.

Findings

01

Heuristic arguments suggest the mean value of prime-pair constants is one.

02

Numerical evidence supports the conjecture.

03

The work extends understanding of prime pair distributions.

Abstract

For k greater than 1 and r different from 0, let pi^k_{2r}(x) denote the number of prime pairs (p,p^k+2r) with p not exceeding (large) x. By the Bateman-Horn conjecture, the function pi^k_{2r}(x) should be asymptotic to (2/k)C^k_{2r}li_2(x), with certain specific constants C^k_{2r}. Heuristic arguments lead to the conjecture that these constants have mean value one, just like the Hardy-Littlewood constants C_{2r} for prime pairs (p,p+2r). The conjecture is supported by extensive numerical work.

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Taxonomy

TopicsAnalytic Number Theory Research · Mathematics and Applications · Limits and Structures in Graph Theory