Bounded gaps between primes in short intervals

Abstract

Baker, Harman, and Pintz showed that a weak form of the Prime Number Theorem holds in intervals of the form [x-x0.525,x] for large x. In this paper, we extend a result of Maynard and Tao concerning small gaps between primes to intervals of this length. More precisely, we prove that for any δ∈ [0.525,1] there exist positive integers k,d such that for sufficiently large x, the interval [x-xδ,x] contains k xδ( x)k pairs of consecutive primes differing by at most d. This confirms a speculation of Maynard that results on small gaps between primes can be refined to the setting of short intervals of this length.