Brad Rodgers, Kannan Soundararajan
Published 2016-10-21Version 1
We study the variance of sums of the $k$-fold divisor function $d_k(n)$ over sparse arithmetic progressions, with averaging over both residue classes and moduli. In a restricted range, we confirm an averaged version of a recent conjecture about the asymptotics of this variance. This result is closely related to moments of Dirichlet $L$-functions and our proof relies on the asymptotic large sieve.
The distribution of rationals in residue classes
Asymptotic evaluation of Euler-phi sums of various residue classes
Higher correlations of divisor sums related to primes III: k-correlations
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