Asymptotic expansion of Fourier coefficients of reciprocals of Eisenstein series
Abstract
In this paper we give a classification of the asymptotic expansion of the q-expansion of reciprocals of Eisenstein series Ek of weight k for the modular group SL2(Z). For k ≥ 12 even, this extends results of Hardy and Ramanujan, and Berndt, Bialek and Yee, utilizing the Circle Method on the one hand, and results of Petersson, and Bringmann and Kane, developing a theory of meromorphic Poincar\'e series on the other. We follow a uniform approach, based on the zeros of the Eisenstein series with the largest imaginary part. These special zeros provide information on the singularities of the Fourier expansion of 1/Ek(z) with respect to q = e2 π i z.
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