Abstract
We give a geometric criterion for Dirichlet L-functions associated to cyclic characters over the rational function field 𝔽q(t) to vanish at the central point s=12. The idea is based on the observation that vanishing at the central point can be interpreted as the existence of a map from the projective curve associated to the character to some abelian variety over 𝔽q. Using this geometric criterion, we obtain a lower bound on the number of cubic characters over 𝔽q(t) whose L-functions vanish at the central point where q=p4n for any rational prime p≡2 mod3. We also use recent results about the existence of supersingular superelliptic curves to deduce consequences for the L-functions of Dirichlet characters of other orders.
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