Lower bound for the remainder in the prime-pair conjecture

Abstract

For any positive integer r, let pi2r(x) denote the number of prime pairs (p, p+2r) with p not exceeding (large) x. According to the prime-pair conjecture of Hardy and Littlewood, pi2r(x) should be asymptotic to 2C2rli2(x) with an explicit positive constant C2r. A heuristic argument indicates that the remainder e2r(x) in this approximation cannot be of lower order than xbeta, where beta is the supremum of the real parts of zeta's zeros. The argument also suggests an approximation for pi2r(x) similar to one of Riemann for pi(x).