Analog of the Skewes number for twin primes

Abstract

The results of the computer investigation of the sign changes of the difference between the number of twin primes π2(x) and the Hardy--Littlewood conjecture c22(x) are reported. It turns out that π2(x) - c22(x) changes the sign at unexpectedly low values of x and for x<242 there are over 90000 sign changes of this difference. It is conjectured that the number of sign changes of π2(x) - c22(x) for x∈ (1, T) is given by T/(T).