Linear correlations of the divisor function

Abstract

Motivated by arithmetic applications on the number of points in a bihomogeneous variety and on moments of Dirichlet L-functions, we provide analytic continuation for the series Aa(s):=Σn1,…,nk≥1d(n1)·s d(nk)(n1·s nk)s with the sum restricted to solutions of a non-trivial linear equation a1n1+·s+aknk=0. The series Aa(s) converges absolutely for (s)>1-1k and we show it can be meromorphically continued to (s)>1- 2k+1 with poles at s=1-1k-j only, for 1≤ j< (k-1)/2. As an application, we obtain an asymptotic formula with power saving error term for the number of points in the variety a1x1y1+·s+akxkyk=0 in Pk-1( Q)× Pk-1( Q).