Elliptic Eisenstein series associated to ideals in real quadratic number fields
Abstract
In this paper, we compute for odd fundamental discriminants D>1 the Fourier expansion of non-holomorphic elliptic Eisenstein series for 0(D) with quadratic nebentypus character D satisfying a certain plus space condition. For each genus of Q(D), we obtain an associated plus space condition and corresponding Eisenstein series in all positive even weights. In weight k=2, the Fourier coefficients are associated to the geometry of Hirzebruch--Zagier divisors on Hilbert modular surfaces.
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