Correlations of the von Mangoldt and higher divisor functions II. Divisor correlations in short ranges

Abstract

We study the problem of obtaining asymptotic formulas for the sums ΣX < n ≤ 2X dk(n) dl(n+h) and ΣX < n ≤ 2X (n) dk(n+h), where is the von Mangoldt function, dk is the kth divisor function, X is large and k ≥ l ≥ 2 are real numbers. We show that for almost all h ∈ [-H, H] with H = ( X)10000 k k, the expected asymptotic estimate holds. In our previous paper we were able to deal also with the case of (n) (n + h) and we obtained better estimates for the error terms at the price of having to take H = X8/33 + .