On the vanishing of twisted L-functions of elliptic curves over rational function fields

Abstract

We investigate in this paper the vanishing at s=1 of the twisted L-functions of elliptic curves E defined over the rational function field Fq(t) (where Fq is a finite field of q elements and characteristic ≥ 5) for twists by Dirichlet characters of prime order ≥ 3, from both a theoretical and numerical point of view. In the case of number fields, it is predicted that such vanishing is a very rare event, and our numerical data seems to indicate that this is also the case over function fields for non-constant curves. For constant curves, we adapt the techniques of Li and Donepudi--Li who proved vanishing at s=1/2 for infinitely many Dirichlet L-functions over Fq(t) based on the existence of one, and we can prove that if there is one 0 such that L(E, 0, 1)=0, then there are infinitely many. Finally, we provide some examples which show that twisted L-functions of constant elliptic curves over Fq(t) behave differently than the general ones.

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