Abstract
We investigate the mixed second moment involving the second derivative at the central point of a family of quadratic Dirichlet L-functions over 𝔽q(t), associated to the hyperelliptic curves of genus g. We compute the full degree five polynomial in the asymptotic expansion of the mixed second moment when the cardinality q of the finite field is fixed and the genus g tends to infinity. This is a partial analogue of classical Ingham’s result about the Riemann zeta function.
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