Asymptotic identities for additive convolutions of sums of divisors

Abstract

In a 1916 paper, Ramanujan studied the additive convolution Sa, b(n) of sum-of-divisors functions σa(n) and σb(n), and proved an asymptotic formula for it when a and b are positive odd integers. He also conjectured that his asymptotic formula should hold for all positive real a and b. Ramanujan's conjecture was subsequently proved by Ingham, and then by Halberstam with a power saving error term. In this paper, we give a new proof of Ramanujan's conjecture that obtains lower order terms in the asymptotics for most ranges of the parameters. We also describe a connection to a counting problem in geometric topology that was studied in the second author's thesis and which served as our initial motivation in studying this sum.