A note on primes in certain residue classes

Abstract

Given positive integers a1,…,ak, we prove that the set of primes p such that p 1 ai for i=1,…,k admits asymptotic density relative to the set of all primes which is at least Πi=1k (1-1(ai)), where is the Euler's totient function. This result is similar to the one of Heilbronn and Rohrbach, which says that the set of positive integer n such that n 0 ai for i=1,…,k admits asymptotic density which is at least Πi=1k (1-1ai).