Chains of large gaps between primes

Abstract

Let pn denote the n-th prime, and for any k ≥ 1 and sufficiently large X, define the quantity Gk(X) := pn+k ≤ X ( pn+1-pn, …, pn+k-pn+k-1 ), which measures the occurrence of chains of k consecutive large gaps of primes. Recently, with Green and Konyagin, the authors showed that \[ G1(X) X X X X\] for sufficiently large X. In this note, we combine the arguments in that paper with the Maier matrix method to show that \[ Gk(X) 1k2 X X X X\] for any fixed k and sufficiently large X. The implied constant is effective and independent of k.