On the Hardy-Littlewood-Chowla conjecture on average

Abstract

There has been recent interest in a hybrid form of the celebrated conjectures of Hardy-Littlewood and of Chowla. We prove that for any k,1 and distinct integers h2,…,hk,a1,…,a, we have Σn≤ Xμ(n+h1)·s μ(n+hk)(n+a1)·s(n+a)=o(X) for all except o(H) values of h1≤ H, so long as H≥ ( X)+ε. This improves on the range H ( X)(X), (X)∞, obtained in previous work of the first author. Our results also generalize from the M\"obius function μ to arbitrary (non-pretentious) multiplicative functions.