Counting Divisors in the Outputs of a Binary Quadratic Form
Abstract
For a fixed natural number h, we prove meromorphic continuation of the two-variable Dirichlet series Σm r2(m) σw(m + h) (m + h)-s + w to C2 and use this to obtain asymptotics for Σm2 + n2 ≤ X σw(m2 + n2 + h). We approach this continuation through spectral theory. Our results are comparable to earlier work of Bykovskii, who used different methods to study the sums Σn2 ≤ X σw(n2 + h).
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