Generalizations of an Ancient Greek Inequality about the Sequence of   Primes

Shaohua Zhang

arXiv:0909.2064·math.GM·September 14, 2009·1 cites

Generalizations of an Ancient Greek Inequality about the Sequence of Primes

Shaohua Zhang

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TL;DR

This paper extends an ancient Greek inequality on prime sequences to arithmetic progressions and polynomial cases, refines related conjectures, and offers insights on ongoing conjectures in prime number theory.

Contribution

It generalizes a classical prime inequality to broader polynomial and progression contexts and refines existing conjectures in prime distribution.

Findings

01

Generalized prime inequalities to arithmetic progressions and multivariable polynomials

02

Refined Bouniakowsky's conjecture and related conjectures

03

Provided remarks on conjectures in recent prime number research

Abstract

In this note, we generalize an ancient Greek inequality about the sequence of primes to the cases of arithmetic progressions even multivariable polynomials with integral coefficients. We also refine Bouniakowsky's conjecture [16] and Conjecture 2 in [22]. Moreover, we give two remarks on conjectures in [22]

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Taxonomy

TopicsAnalytic Number Theory Research · History and Theory of Mathematics · Mathematics and Applications