English

Relations de d\'ependance et intersections exceptionnelles (Dependence relations and exceptional intersections)

Number Theory 2011-06-14 v2 Algebraic Geometry

Abstract

This text is devoted to the following result, stemming out works of Bombieri, Masser, Zannier, and Maurin: Let XX be an complex algebraic (projective, connected) curve and let us consider nn rational functions f1,...,fnf_1,...,f_n on XX which are multiplicatively independent. The points xx of XX where their values f1(x),...,fn(x)f_1(x),...,f_n(x) satisfy at least two independent multiplicative dependence relations form a finite set. We discuss the conjectural generalizations of this theorem (Bombieri, Masser, Zannier; Zilber; Pink) concerning the finiteness of points of a dd-dimensional subvariety XX of a semiabelian variety GG which belong to an algebraic subgroup of codimension >d>d of GG, their relations with theorems of Mordell-Lang or Manin-Mumford type, and, in the arithmetic case, recent results in this direction (Habegger; R\'emond; Viada). ----- Ce texte est consacr\'e au r\'esultat suivant, issus des travaux de Bombieri, Masser, Zannier et Maurin: Soit XX une courbe alg\'ebrique (projective, connexe) complexe et consid\'erons nn fonctions rationnelles f1,...,fnf_1,...,f_n multiplicativement ind\'ependantes sur XX. Les points xx de XX o\`u leurs valeurs f1(x),...,fn(x)f_1(x),...,f_n(x) v\'erifient au moins deux relations de d\'ependance multiplicative ind\'ependantes forment un ensemble fini. Nous discutons les g\'en\'eralisations conjecturales de ce th\'eor\`eme (Bombieri, Masser, Zannier; Zilber; Pink) concernant la finitude des points d'une sous-vari\'et\'e XX de dimension dd d'une vari\'et\'e semi-ab\'elienne GG qui appartiennent \`a un sous-groupe alg\'ebrique de codimension >d>d dans GG, leurs relations avec les th\'eor\`emes de type Mordell-Lang ou Manin-Mumford et, dans le cas arithm\'etique, les r\'esultats r\'ecents dans cette direction (Habegger; R\'emond; Viada).

Cite

@article{arxiv.1101.4738,
  title  = {Relations de d\'ependance et intersections exceptionnelles (Dependence relations and exceptional intersections)},
  author = {Antoine Chambert-Loir},
  journal= {arXiv preprint arXiv:1101.4738},
  year   = {2011}
}

Comments

S\'eminaire Bourbaki, 63e ann\'ee, 2010-11, Expos\'e n{\deg} 1032. In French

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