Primes $p \equiv 1 \bmod{d}$ and $a^{(p-1)/d} \equiv 1 \bmod{p}$}

Peng Gao; Liangyi Zhao

arXiv:1807.09410·math.NT·June 10, 2019

Primes $p \equiv 1 \bmod{d}$ and $a^{(p-1)/d} \equiv 1 \bmod{p}$}

Peng Gao, Liangyi Zhao

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TL;DR

This paper investigates the distribution of primes congruent to 1 modulo d that satisfy a specific exponential congruence, analyzing their average behavior for certain fixed parameters.

Contribution

It provides a study of the mean value of primes satisfying particular congruences and exponential conditions, extending understanding of their distribution.

Findings

01

Analysis of the mean number of such primes up to x

02

Identification of asymptotic behavior for the mean value

03

Extension of classical prime distribution results

Abstract

Suppose that $d \in {2, 3, 4, 6}$ and $a \in Z$ with $a \neq = - 1$ and $a$ is not square. Let $P_{(a, d)}$ be the number of primes $p$ not exceeding $x$ such that $p \equiv 1 (mod d)$ and $a^{(p - 1) / d} \equiv 1 (mod p)$ . In this paper, we study the mean value of $P_{(a, d)}$ .

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Taxonomy

TopicsAnalytic Number Theory Research · Algebraic Geometry and Number Theory · History and Theory of Mathematics