Sur le rang des Jacobiennes sur un corps de fonctions
Abstract
On the rank of Jacobians over function fields. Let f:X C be a projective surface fibered over a curve and defined over a number field k. We give an interpretation of the rank of the Mordell-Weil group over k(C) of the jacobian of the generic fibre (modulo the constant part) in terms of average of the traces of Frobenius on the fibers of f. The results also give a reinterpretation of the Tate conjecture for the surface X and generalizes results of Nagao, Rosen-Silverman and Wazir.
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