Julio Andrade, Hwanyup Jung
Published 2019-06-25Version 1
In this series, we investigate the calculation of mean values of derivatives of Dirichlet $L$-functions in function fields using the analogue of the approximate functional equation and the Riemann Hypothesis for curves over finite fields. The present paper generalizes the results obtained in the first paper. For $\mu\geq1$ an integer, we compute the mean value of the $\mu$-th derivative of quadratic Dirichlet $L$-functions over the rational function field. We obtain the full polynomial in the asymptotic formulae for these mean values where we can see the arithmetic dependence of the lower order terms that appears in the asymptotic expansion.
The Mean Value of $L(\tfrac{1}{2},χ)$ in the Hyperelliptic Ensemble
A note on the mean values of the derivatives of $ζ'/ζ$
Lower order terms for the moments of symplectic and orthogonal families of $L$-functions
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