Mathematics – Number Theory
Scientific paper
2005-02-09
Mathematics
Number Theory
41 pages, titre modifi\'e ; accept\'e pour publication aux Annales de l'Institut Fourier
Scientific paper
We prove a special case of the following conjecture of Zilber-Pink generalising the Manin-Mumford conjecture : let $X$ be a curve inside an Abelian variety $A$ over $\bar{\Q}$, provided $X$ is not contained in a torsion subvariety, the intersection of $X$ with the union of all subgroup schemes of codimension at least 2 is finite ; we settle the case where $A$ is a power of a simple Abelian variety of C.M. type. This generalises the previous known result, due to Viada and R\'emond-Viada (who was able to prove the conjecture for power of an elliptic curve with complex multiplication). The proof is based on the strategy of R\'emond (following Bombieri, Masser and Zannier) with two new ingredients, one of them, being at the heart of this article : it is a lower bound for the N\'eron-Tate height of points on Abelian varieties $A/K$ of C.M. type in the spirit of Lehmer's problem. This lower bound is an analog of the similar result of Amoroso and David \cite{ad2003} on $\G_m^n$ and is a generalisation of the theorem of David and Hindry \cite{davidhindry} on the abelian Lehmer's problem. The proof is an adaptation of \cite{davidhindry} using in our abelian case the new ideas introduced in \cite{ad2003}. Furthermore, as in \cite{ad2003} and adapting in the abelian case their proof, we give another application of our result : a lower bound for the absolute minimum of a subvariety $V$ of $A$. Although lower bounds for this minimum were already known (decreasing multi-exponential function of the degree for Bombieri-Zannier), our methods enable us to prove, up to an $\epsilon$ the optimal result that can be conjectured.
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