Harmonic Maass forms and periods
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math.AG
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periodscoefficientsformsharmonicmaassweightaccordingalgebraic
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According to Waldspurger's theorem, the coefficients of half-integral weight eigenforms are given by central critical values of twisted Hecke L-functions, and therefore by periods. Here we prove that the coefficients of weight 1/2 harmonic Maass forms are determined by periods of algebraic differentials of the third kind on modular and elliptic curves.
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