Add to ORKGAbstract. We prove that the fibered power conjecture of Caporaso et al. (Conjecture H, [CHM], §6) together with Lang’s conjecture implies the uniformity of rational points on varieties of general type, as predicted in [CHM]; a few applications on the arithmetic and geometry of curves are stated. In an opposite direction, we give counterexamples to some analogous results in positive characteristic. We show that curves that change genus can have arbitrarily many rational points; and that curves over Fp(t) can have arbitrarily many Frobenius orbits of non-constant points
In this note, we give an alternative proof of uniform boundedness of the number of integral points o...
Abstract. Let X be an algebraic variety over the algebraically closed field K and Ξ ⊆ X(K) a set of ...
International audienceWe give a formula for the number of rational points of projective algebraic cu...
. We prove that the fibered power conjecture of Caporaso et al. (Conjecture H, [CHM], x6) together w...
We construct families of curves which provide counterexamples for a uniform boundedness question. ...
We exhibit a genus{2 curve C de ned over Q(T ) which admits two independent morphisms to a rank{1 ...
AbstractWe exhibit a genus-2 curve C defined over Q(T) which admits two independent morphisms to a r...
Minor revisionsFor a given genus $g \geq 1$, we give lower bounds for the maximal number of rational...
Thesis: Ph. D., Massachusetts Institute of Technology, Department of Mathematics, 2014.Cataloged fro...
RésuméOn donne, pour les familles algébriques de courbes de genre au moins 2, une version uniforme d...
We prove that the dynatomic curves associated with iteration of $z^d+c$ in any fixed characteristic ...
Abstract. Let Nq(g) denote the maximal number of Fq-rational points on any curve of genus g over Fq....
Abstract. We resolve a 1983 question of Serre by constructing curves with many points of every genus...
We prove that the dynatomic curves associated with iteration of $z^d+c$ in any fixed characteristic ...
In this thesis we consider the problem of computing the zeta function and the number of rational poi...
In this note, we give an alternative proof of uniform boundedness of the number of integral points o...
Abstract. Let X be an algebraic variety over the algebraically closed field K and Ξ ⊆ X(K) a set of ...
International audienceWe give a formula for the number of rational points of projective algebraic cu...
. We prove that the fibered power conjecture of Caporaso et al. (Conjecture H, [CHM], x6) together w...
We construct families of curves which provide counterexamples for a uniform boundedness question. ...
We exhibit a genus{2 curve C de ned over Q(T ) which admits two independent morphisms to a rank{1 ...
AbstractWe exhibit a genus-2 curve C defined over Q(T) which admits two independent morphisms to a r...
Minor revisionsFor a given genus $g \geq 1$, we give lower bounds for the maximal number of rational...
Thesis: Ph. D., Massachusetts Institute of Technology, Department of Mathematics, 2014.Cataloged fro...
RésuméOn donne, pour les familles algébriques de courbes de genre au moins 2, une version uniforme d...
We prove that the dynatomic curves associated with iteration of $z^d+c$ in any fixed characteristic ...
Abstract. Let Nq(g) denote the maximal number of Fq-rational points on any curve of genus g over Fq....
Abstract. We resolve a 1983 question of Serre by constructing curves with many points of every genus...
We prove that the dynatomic curves associated with iteration of $z^d+c$ in any fixed characteristic ...
In this thesis we consider the problem of computing the zeta function and the number of rational poi...
In this note, we give an alternative proof of uniform boundedness of the number of integral points o...
Abstract. Let X be an algebraic variety over the algebraically closed field K and Ξ ⊆ X(K) a set of ...
International audienceWe give a formula for the number of rational points of projective algebraic cu...