Ramanujan Series for Epstein Zeta Functions
Abstract
In the spirit of Ramanujan, we derive exponentially fast convergent series for Epstein zeta functions E0(N)(z,s) on the Hecke congruence groups 0(N),N∈ Z>0, where z is an arbitrary point in the upper half-plane H, and s∈ Z>1. These Ramanujan series can be reformulated as integrations of modular forms, in the framework of Eichler integrals. Particular cases of these Eichler integrals recover part of the recent results reported by Wan and Zucker (arXiv:1410.7081v1).
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