On the general additive divisor problem
Abstract
We obtain a new upper bound for Σh Hk(N,h) for 1 H N, k∈ , k3, where k(N,h) is the (expected) error term in the asymptotic formula for ΣN < n2Ndk(n)dk(n+h), and dk(n) is the divisor function generated by ζ(s)k. When k=3 the result improves, for H N1/2, the bound given in the recent work [1] of Baier, Browning, Marasingha and Zhao, who dealt with the case k=3.
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