Elliptic Apostol sums and their reciprocity laws

Fukuhara, Shinji; Yui, Noriko

doi:10.1090/S0002-9947-04-03481-6

Elliptic Apostol sums and their reciprocity laws
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by Shinji Fukuhara and Noriko Yui PDF

Trans. Amer. Math. Soc. 356 (2004), 4237-4254 Request permission

Abstract:

We introduce an elliptic analogue of the Apostol sums, which we call elliptic Apostol sums. These sums are defined by means of certain elliptic functions with a complex parameter $\tau$ having positive imaginary part. When $\tau \to i\infty$, these elliptic Apostol sums represent the well-known Apostol generalized Dedekind sums. Also these elliptic Apostol sums are modular forms in the variable $\tau$. We obtain a reciprocity law for these sums, which gives rise to new relations between certain modular forms (of one variable).

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