D\'ecompte dans une conjecture de Lang sur les corps de fonctions : cas des courbes
Abstract
Let X be a genus d curve with d≥ 2 defined over a global function field K of characteristic p>0 with p>2d+1. Suppose X non-isotrivial. Let be a sub-group of J(Ks), where J is the jacobian of X and Ks is a separable closure of K, verifying /p finite. Then one shows that X has finite cardinal and one provides an explicit upper bound. This generalizes a result of Buium and Voloch.
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