Add to ORKGWith an eye or two towards applications to Pell's equation and to Davenport's work on integration of algebraic functions, Umberto Zannier and I have recently characterised torsion points on a fixed algebraic curve in a fixed abelian scheme of dimension bigger than one (when all is defined over the algebraic numbers): there are at most finitely many points provided the natural obstacles are absent. I sketch the proof as well as the applications
In a recent paper we proved that there are at most finitely many complex numbers λ ≠ 0,1 such that t...
In this paper we extend to arbitrary complex coefficients certain finiteness results on unlikely int...
Let $K$ be an algebraically closed field of characteristic different from 2, $g$ a positive integer,...
The main results of this paper involve general algebraic differentials ω on a general pencil of alge...
The main results of this paper involve general algebraic differentials $\omega$ on a general pencil...
In recent papers we proved a special case of a variant of Pink's Conjecture for a variety inside a s...
In recent papers we proved a special case of a variant of Pink’s Conjecture for a variety inside a s...
The present paper arises from the extensions of the Manin-Mumford conjecture, where we shall focus o...
We show that Ribet sections are the only obstruction to the validity of the relative Manin–Mumford c...
We answer a question raised by Hindry and Ratazzi concerning the intersection between cyclotomic ext...
In this thesis we approach two independent problems in the field of arithmetic geometry, one regardi...
Abstract. We present a new proof of the Manin-Mumford conjecture about torsion points on algebraic s...
In this paper we extend to arbitrary complex coefficients certain finiteness results on Unlikely int...
In recent papers we proved a special case of a variant of Pink's Conjecture for a variety inside a s...
Dans cette thèse nous étudions deux problèmes dans le domaine de la géométrie arithmétique, concerna...
In a recent paper we proved that there are at most finitely many complex numbers λ ≠ 0,1 such that t...
In this paper we extend to arbitrary complex coefficients certain finiteness results on unlikely int...
Let $K$ be an algebraically closed field of characteristic different from 2, $g$ a positive integer,...
The main results of this paper involve general algebraic differentials ω on a general pencil of alge...
The main results of this paper involve general algebraic differentials $\omega$ on a general pencil...
In recent papers we proved a special case of a variant of Pink's Conjecture for a variety inside a s...
In recent papers we proved a special case of a variant of Pink’s Conjecture for a variety inside a s...
The present paper arises from the extensions of the Manin-Mumford conjecture, where we shall focus o...
We show that Ribet sections are the only obstruction to the validity of the relative Manin–Mumford c...
We answer a question raised by Hindry and Ratazzi concerning the intersection between cyclotomic ext...
In this thesis we approach two independent problems in the field of arithmetic geometry, one regardi...
Abstract. We present a new proof of the Manin-Mumford conjecture about torsion points on algebraic s...
In this paper we extend to arbitrary complex coefficients certain finiteness results on Unlikely int...
In recent papers we proved a special case of a variant of Pink's Conjecture for a variety inside a s...
Dans cette thèse nous étudions deux problèmes dans le domaine de la géométrie arithmétique, concerna...
In a recent paper we proved that there are at most finitely many complex numbers λ ≠ 0,1 such that t...
In this paper we extend to arbitrary complex coefficients certain finiteness results on unlikely int...
Let $K$ be an algebraically closed field of characteristic different from 2, $g$ a positive integer,...
