AbstractIn this brief note, we will investigate the number of points of bounded height in a projective variety defined over a function field, where the function field comes from a projective variety of dimension greater than or equal to 2. A first step in this investigation is to understand the p-adic analytic properties of the height zeta function. In particular, we will show that for a large class of projective varieties this function is p-adic meromorphic
AbstractTextLet K be a number field, Q¯, or the field of rational functions on a smooth projective c...
A field is said to have the Bogomolov property relative to a height function h’ if and only if h’ is...
Let $f: \mathbb{P}^1\to \mathbb{P}^1$ be a map of degree $>1$ defined over a function field $k = K(X...
AbstractGiven a projective variety X defined over a finite field, the zeta function of divisors atte...
AbstractIn this paper, we continue the investigation of the zeta function of divisors, as introduced...
"Zeta functions in algebra and geometry", Contemp. Math., 566, Amer. Math. Soc., Providence, RI, 201...
International audienceThese is a survey on the theory of height zeta functions, written on the occas...
Moment zeta functions provide a diophantineformulation for the distribution of rational points on af...
We give a new construction of $p$-adic heights on varieties over number fields using $p$-adic Arakel...
AbstractThis article is all about two theorems on equations over finite fields which have been prove...
AbstractWe give asymptotic estimates for the number of subspaces of height m in affine n-space defin...
Partial zeta functions of algebraic varieties over finite fields generalize the classical zeta funct...
Let B be a simple CM abelian variety over a CM field E, p a rational prime. Suppose that B has poten...
We prove that the N\'eron-Tate height of subvarieties are always rational numbers. We use the induct...
in french ; largely revised and corrected ; in particular we no longer claim that the known conjectu...
AbstractTextLet K be a number field, Q¯, or the field of rational functions on a smooth projective c...
A field is said to have the Bogomolov property relative to a height function h’ if and only if h’ is...
Let $f: \mathbb{P}^1\to \mathbb{P}^1$ be a map of degree $>1$ defined over a function field $k = K(X...
AbstractGiven a projective variety X defined over a finite field, the zeta function of divisors atte...
AbstractIn this paper, we continue the investigation of the zeta function of divisors, as introduced...
"Zeta functions in algebra and geometry", Contemp. Math., 566, Amer. Math. Soc., Providence, RI, 201...
International audienceThese is a survey on the theory of height zeta functions, written on the occas...
Moment zeta functions provide a diophantineformulation for the distribution of rational points on af...
We give a new construction of $p$-adic heights on varieties over number fields using $p$-adic Arakel...
AbstractThis article is all about two theorems on equations over finite fields which have been prove...
AbstractWe give asymptotic estimates for the number of subspaces of height m in affine n-space defin...
Partial zeta functions of algebraic varieties over finite fields generalize the classical zeta funct...
Let B be a simple CM abelian variety over a CM field E, p a rational prime. Suppose that B has poten...
We prove that the N\'eron-Tate height of subvarieties are always rational numbers. We use the induct...
in french ; largely revised and corrected ; in particular we no longer claim that the known conjectu...
AbstractTextLet K be a number field, Q¯, or the field of rational functions on a smooth projective c...
A field is said to have the Bogomolov property relative to a height function h’ if and only if h’ is...
Let $f: \mathbb{P}^1\to \mathbb{P}^1$ be a map of degree $>1$ defined over a function field $k = K(X...