Consecutive primes and Legendre symbols

Abstract

Let m be any positive integer and let δ1,δ2∈\1,-1\. We show that for some constanst Cm>0 there are infinitely many integers n>1 with pn+m-pn Cm such that (pn+ipn+j)=δ1\ \ (pn+jpn+i)=δ2 for all 0 i<j m, where pk denotes the k-th prime, and ( ·p) denotes the Legendre symbol for any odd prime p. We also prove that under the Generalized Riemann Hypothesis there are infinitely many positive integers n such that pn+i is a primitive root modulo pn+j for any distinct i and j among 0,1,…,m.