An asymptotic property on a reciprocity law for the Bettin--Conrey cotangent sum

Abstract

In 2013 Bettin and Conrey have introduced a cotangent sum c Q>0 R, which can be regarded as a variant of the Dedekind sum. They have discovered that the cotangent sum satisfies a kind of reciprocity laws. Roughly speaking, the reciprocity law for c(x) means that there is a relation between c(x) and c(1/x) modulo holomorphic functions. Furthermore they have investigated Taylor coefficients gn of the implicit holomorphic function, which appears in the reciprocity law for c(x), at x=1. As a result, they have obtained an asymptotic formula for gn as n∞. In this paper we improve it to an asymptotic series expansion. This resolves a conjecture by Zagier. A new ingredient of this paper is to use the confluent hypergeometric function of the second kind.