In this thesis, we will focus on points of small height in both multiplicative group and on an elliptic curve.Firstly, in the multiplicative group case, we will study fields whose points of small height are eNSUITE? roots of the unity.In a second time, we will localise the points of small height on a field generated by some groups of finite rank, according to a conjecture of Rémond. To this end, we will study ramification groups concerning radiciel extensions.There also exists an analogue of this conjecture of Rémond on the abelian varieties case and it would seem that we can expand it by including split semi-abelian varieties. This new conjecture allows us to connect some theorems already present in the literature.However, these results on...
We consider the problem of lower bounds for the canonical height on elliptic curves, aiming for the ...
In this thesis, we tackle several questions about Néron models of abelian varieties on a discrete va...
51 pagesIn this article we give a lower bound for the Néron-Tate height of points on Abelian varieti...
In this thesis, we will focus on points of small height in both multiplicative group and on an ellip...
Dans cette thèse, on s'intéressera aux points de petite hauteur dans le groupe multiplicatif et sur ...
Let E be an elliptic curve defined over Q without complex multiplication. The field F generated over...
This thesis is dedicated to the problems of lower bound for the normalised height of points and subv...
This thesis concentrates on a conjecture made by Lang and Silverman which gives a uniform lower boun...
The starting point of this thesis is the study of Lehmer's problem in dimension greater than two. It...
Let d be an integer and let K be a number field of degree d over Q. By the Mordell- Weil theorem we ...
This thesis considers theories of expansions of the natural algebraic struc- ture on the multiplicat...
Let E be an elliptic curve defined over a number field K with fixed non-archimedean absolute value v...
We introduce the notion of height for the points on an elliptic curve, an abelian variety of genus 1...
Barry Mazur famously classified the finitely many groups that can occur as a torsion subgroup of an ...
Let F be an algebraic extension of the rational numbers and E an elliptic curve defined over some nu...
We consider the problem of lower bounds for the canonical height on elliptic curves, aiming for the ...
In this thesis, we tackle several questions about Néron models of abelian varieties on a discrete va...
51 pagesIn this article we give a lower bound for the Néron-Tate height of points on Abelian varieti...
In this thesis, we will focus on points of small height in both multiplicative group and on an ellip...
Dans cette thèse, on s'intéressera aux points de petite hauteur dans le groupe multiplicatif et sur ...
Let E be an elliptic curve defined over Q without complex multiplication. The field F generated over...
This thesis is dedicated to the problems of lower bound for the normalised height of points and subv...
This thesis concentrates on a conjecture made by Lang and Silverman which gives a uniform lower boun...
The starting point of this thesis is the study of Lehmer's problem in dimension greater than two. It...
Let d be an integer and let K be a number field of degree d over Q. By the Mordell- Weil theorem we ...
This thesis considers theories of expansions of the natural algebraic struc- ture on the multiplicat...
Let E be an elliptic curve defined over a number field K with fixed non-archimedean absolute value v...
We introduce the notion of height for the points on an elliptic curve, an abelian variety of genus 1...
Barry Mazur famously classified the finitely many groups that can occur as a torsion subgroup of an ...
Let F be an algebraic extension of the rational numbers and E an elliptic curve defined over some nu...
We consider the problem of lower bounds for the canonical height on elliptic curves, aiming for the ...
In this thesis, we tackle several questions about Néron models of abelian varieties on a discrete va...
51 pagesIn this article we give a lower bound for the Néron-Tate height of points on Abelian varieti...