Correlations of the von Mangoldt and higher divisor functions I. Long shift ranges

TL;DR

This paper proves that certain correlations of the von Mangoldt and divisor functions follow their expected asymptotics for almost all shifts within a broad range, using advanced analytic number theory techniques.

Contribution

It extends previous results by establishing asymptotic formulas for sums involving these functions over a wider range of shifts, employing the circle method and mean-value estimates.

Findings

Asymptotic formulas hold for almost all shifts in a larger range than before.

Uses circle method and oscillatory integral estimates to analyze sums.

Controls sums via mean value theorems and exponential sum estimates.

Abstract

We show that the expected asymptotic for the sums $\sum_{X < n \leq 2X} \Lambda(n) \Lambda(n+h)$, $\sum_{X < n \leq 2X} d_k(n) d_l(n+h)$, and $\sum_{X < n \leq 2X} \Lambda(n) d_k(n+h)$ hold for almost all $h \in [-H,H]$, provided that $X^{8/33+\varepsilon} \leq H \leq X^{1-\varepsilon}$, with an error term saving on average an arbitrary power of the logarithm over the trivial bound. Previous work of Mikawa, Perelli-Pintz and Baier-Browning-Marasingha-Zhao covered the range $H \geq X^{1/3+\varepsilon}$. We also obtain an analogous result for $\sum_n \Lambda(n) \Lambda(N-n)$. Our proof uses the circle method and some oscillatory integral estimates (following a paper of Zhan) to reduce matters to establishing some mean-value estimates for certain Dirichlet polynomials associated to "Type $d_3$" and "Type $d_4$" sums (as well as some other sums that are easier to treat). After applying H\"older's inequality to the Type $d_3$ sum, one is left with two expressions, one of which we can control using a short interval mean value theorem of Jutila, and the other we can control using exponential sum estimates of Robert and Sargos. The Type $d_4$ sum is treated similarly using the classical $L^2$ mean value theorem and the classical van der Corput exponential sum estimates.