A proof of the twin prime conjecture

Abstract

In this paper, we prove the twin prime conjecture showing that align Σ p≤ x\,p+2∈ P1≥ (1+o(1))x2C2 x align where C:=C(2)>0 fixed and P is the set of all prime numbers. In particular, it implies align Σ p,p+2∈ P1=∞ align when we take x ∞ on both sides of the inequality. We start by developing a general method for estimating correlations of the form align Σ n≤ xG(n)G(n+l) align for a fixed 1≤ l≤ x and where G:N R+.