International audienceThese is a survey on the theory of height zeta functions, written on the occasion of a French-Japanese winter school, held in Miura (Kanagawa, Japan) in Jan. 2008. It does not presuppose much knowledge in algebraic geometry. The last chapter of the survey explains recent results obtained in collaboration with Yuri Tschinkel concerning asymptotics of volumes of height balls in analytic geometry over local fields, or in adelic spaces
Many examples of zeta functions in number theory and combinatorics are special cases of a constructi...
Jury:Antoine CHAMBERT-LOIR (Université de Rennes I), Rapporteur et Président; Michel BRION (CNRS, Un...
This Summer School on the Theory of Motives and the Theory of Numbers, at the crossroad of several L...
The present paper is an exposition on heights and their importance in the modern study of algebraic ...
Abstract. We consider a motivic analogue of the height zeta function for integral points of equivari...
AbstractIn this brief note, we will investigate the number of points of bounded height in a projecti...
The main purpose of this work is to prove the Andr\'e-Oort conjecture in full generality.Comment: Ma...
This doctoral dissertation concerns two problems in number theory. First, we examine a family of dis...
In this snapshot we give a glimpse of the interplay of special values of zeta functions and volumes ...
This Summer School on the Theory of Motives and the Theory of Numbers, at the crossroad of several L...
This Summer School on the Theory of Motives and the Theory of Numbers, at the crossroad of several L...
"Zeta functions in algebra and geometry", Contemp. Math., 566, Amer. Math. Soc., Providence, RI, 201...
We discuss a number of inter-related topics, usually ideas from hyperbolic dynamics applied to geome...
AbstractWe give asymptotic estimates for the number of subspaces of height m in affine n-space defin...
textThis dissertation contains a number of results on properties of infinite algebraic extensions of...
Many examples of zeta functions in number theory and combinatorics are special cases of a constructi...
Jury:Antoine CHAMBERT-LOIR (Université de Rennes I), Rapporteur et Président; Michel BRION (CNRS, Un...
This Summer School on the Theory of Motives and the Theory of Numbers, at the crossroad of several L...
The present paper is an exposition on heights and their importance in the modern study of algebraic ...
Abstract. We consider a motivic analogue of the height zeta function for integral points of equivari...
AbstractIn this brief note, we will investigate the number of points of bounded height in a projecti...
The main purpose of this work is to prove the Andr\'e-Oort conjecture in full generality.Comment: Ma...
This doctoral dissertation concerns two problems in number theory. First, we examine a family of dis...
In this snapshot we give a glimpse of the interplay of special values of zeta functions and volumes ...
This Summer School on the Theory of Motives and the Theory of Numbers, at the crossroad of several L...
This Summer School on the Theory of Motives and the Theory of Numbers, at the crossroad of several L...
"Zeta functions in algebra and geometry", Contemp. Math., 566, Amer. Math. Soc., Providence, RI, 201...
We discuss a number of inter-related topics, usually ideas from hyperbolic dynamics applied to geome...
AbstractWe give asymptotic estimates for the number of subspaces of height m in affine n-space defin...
textThis dissertation contains a number of results on properties of infinite algebraic extensions of...
Many examples of zeta functions in number theory and combinatorics are special cases of a constructi...
Jury:Antoine CHAMBERT-LOIR (Université de Rennes I), Rapporteur et Président; Michel BRION (CNRS, Un...
This Summer School on the Theory of Motives and the Theory of Numbers, at the crossroad of several L...