On a generating function of Niebur-Poincar\'e series
Abstract
Let ⊂ PSL2(R) be a Fuchsian group of the first kind which has a cusp i∞ of width one. In this paper, we first consider a generating function formed with the Niebur--Poincar\'e series \Fm,s(τ)\m 1 associated to i∞. We prove a relation between the continuation of this generating function to s=1 with the resolvent kernel associated to the hyperbolic Laplacian and the non-holomorphic Eisenstein series associated to i∞, also at s=1. Secondly, we show that, for any s∈ N, the generating function equals Poincar\'e type series involving polylogarithms. We also consider a generating function formed with derivatives in s of the Niebur--Poincar\'e series and prove that the continuation of the generating function at s=1 can be expressed in terms of -periodization of a point-pair invariant involving the Rogers dilogarithm and the Kronecker limit function associated to the non-holomorphic Eisenstein series.
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