Bounded Relative Distances of Symmetric Prime Pairs Around Even Integers
journal article

Bounded Relative Distances of Symmetric Prime Pairs Around Even Integers

Ifeyinwa Eunice Daniel, Olufemi Johnson Ogunsola

African Journal of Mathematics, Statistics and Computer Science · 2026 · Volume 1 · Issue 1 · DOI: 10.5281/zenodo.20748565

Abstract

This paper investigates the distribution of symmetric prime pairs around the midpoint of even integers. For a given even integer $2n$, prime pairs $(p_1,p_2)$ symmetrically positioned about $n$ are considered, satisfying $$ n-p_1 = p_2-n, $$ or equivalently, $$ p_1+p_2=2n. $$ Particular attention is given to the nearest symmetric prime pair associated with each even integer. Using the symmetric distance $$ d = |n-p_i|,\qquad i=1,2, $$ the relative distance ratio $$ R_n=\frac{d}{n} $$ is introduced as a normalized measure of how far the nearest symmetric prime pair lies from the midpoint. Computational experiments were carried out for selected even integers up to $10^6$. The resulting data exhibit bounded behavior within the tested range and suggest an empirical asymptotic decay of $R_n$ toward zero as $n$ increases, except in cases where the midpoint itself is prime, for which $R_n=0$. Within the computed data, the largest observed ratio occurs at $2n=44$, where $$ R_{22}=\frac{9}{22}=0.4090909\ldots. $$ The paper presents a ratio-based framework for studying local symmetric prime distributions and highlights open questions concerning upper bounds, asymptotic estimates, and the behavior of additional symmetric prime pairs located farther from the midpoint.

Keywords

symmetric prime pairs; prime distribution; Goldbach representations; relative distance ratio; asymptotic decay; computational number theory

Repository metadata

DOI10.5281/zenodo.20748565
ISSN
Pages1–12
LicenceCC BY 4.0
Metadata completeness91%