Rough numbers between consecutive primes

Abstract

Using a sieve-theoretic argument, we show that almost all gaps (pn, pn+1) between consecutive primes pn, pn+1 contain a natural number m whose least prime factor p(m) is at least the length pn+1 - pn of the gap, confirming a prediction of Erdos. In fact the number N(X) of exceptional gaps with pn ∈ [X,2X] is shown to be at most O(X/2 X). Assuming a form of the Hardy--Littlewood prime tuples conjecture, we establish a more precise asymptotic N(X) c X / 2 X for an explicit constant c>0, which we believe to be between 2.7 and 2.8. To obtain our results in their full strength we rely on the asymptotics for singular series developed by Montgomery and Soundararajan.