On primes in arithmetic progressions and bounded gaps between many primes

Abstract

We prove that the primes below x are, on average, equidistributed in arithmetic progressions to smooth moduli of size up to x1/2+1/40-ε. The exponent of distribution 12 + 140 improves on a result of Polymath, who had previously obtained the exponent 12 + 7300. As a consequence, we improve results on intervals of bounded length which contain many primes, showing that n → ∞ (pn+m-pn) = O((3.8075 m)). The main new ingredient of our proof is a modification of the q-van der Corput process. It allows us to exploit additional averaging for the exponential sums which appear in the Type I estimates of Polymath.