An averaged form of Chowla's conjecture

Abstract

Let λ denote the Liouville function. A well known conjecture of Chowla asserts that for any distinct natural numbers h1,…,hk, one has Σ1 ≤ n ≤ X λ(n+h1) …m λ(n+hk) = o(X) as X ∞. This conjecture remains unproven for any h1,…,hk with k ≥ 2. In this paper, using the recent results of the first two authors on mean values of multiplicative functions in short intervals, combined with an argument of Katai and Bourgain-Sarnak-Ziegler, we establish an averaged version of this conjecture, namely Σh1,…,hk ≤ H |Σ1 ≤ n ≤ X λ(n+h1) …m λ(n+hk)| = o(HkX) as X ∞ whenever H = H(X) ≤ X goes to infinity as X ∞, and k is fixed. Related to this, we give the exponential sum estimate ∫0X |Σx ≤ n ≤ x+H λ(n) e(α n)| dx = o( HX ) as X ∞ uniformly for all α ∈ R, with H as before. Our arguments in fact give quantitative bounds on the decay rate (roughly on the order of H H), and extend to more general bounded multiplicative functions than the Liouville function, yielding an averaged form of a (corrected) conjecture of Elliott.