On the distribution of the of Frobenius elements on elliptic curves over function fields

Abstract

Let C be a smooth projective curve over Fq with function field K, E/K a nonconstant elliptic curve and φ:E C its minimal regular model. For each P∈ C such that E has good reduction at P, i.e., the fiber EP=φ-1(P) is smooth, the eigenvalues of the zeta-function of EP over the residue field P of P are of the form qP1/2eiθP,qPe-iθP, where qP=q(P) and 0θPπ. The goal of this note is to determine given an integer B 1, α,β∈[0,π] the number of P∈ C where the reduction of E is good and such that (P) B and αθPβ.

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