Minoration effective de la hauteur des points d'une courbe de G\m2 d\'efinie sur Q
Abstract
We are concerned here with Lehmer's problem in dimension 2 ; we give a lower bound for the height of a non-torsion point of G\m2 on a non-torsion curve defined over Q, depending on the degree of the curve only. We have first been inspired by Am-Da3; we develop a new approach, inherent in the dimension two (or more precisely the codimension two), and then obtain a better result where the error's term is improved significantly, moreover we give an explicit expression for the constant.
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