We show that the zero locus of a normal function on a smooth complex algebraic variety S is algebraic provided that the normal function extends to an admissible normal function on a smooth compactification such that the divisor at infinity is also smooth. This result, which has also been obtained recently by M. Saito using a different method [22], generalizes a previous result proved by the authors for admissible normal functions on curves [4]. © 2009
If / is a meromorphic function in D = {z | \z \ < 1}, then / is said to be normal if the set of f...
AbstractFor one-dimensional noetherian local rings we introduce the notion of normal arithmetic gene...
Abstract. This paper continues our investigation of conditions involving val-ues shared by a functio...
We show that the zero locus of a normal function on a smooth complex algebraic variety S is algebrai...
We prove that the zero locus of an admissible normal function over an algebraic parameter space S is...
We show that the zero locus of an admissible normal function on a smooth complex algebraic variety i...
Achter JD, Casalaina-Martin S, Vial C. NORMAL FUNCTIONS FOR ALGEBRAICALLY TRIVIAL CYCLES ARE ALGEBRA...
We prove, using p-adic Hodge theory for open algebraic varieties, that for a smooth projective varie...
30 p., séminaire Bourbaki, 65éme année, 2012-2013, exp. 1063. Comments welcomeInternational audience...
In this paper, we investigate questions of an arithmetic nature related to the Abel–Jacobi map. We g...
In a recent paper, M. Green and P. Griffiths used R. Thomas' work on nodal hypersurfaces to sketch a...
ABSTRACT. Deligne’s regularity criterion for an integrable connection r on a smooth complex algebrai...
The work of this thesis is to motivate the following: Statement: The Hodge conjecture holds for pro...
We review the notion of regular singular point of a linear differential equation with meromorphic co...
This version contains some inaccuracies about centrality issues. A new version will appear soon.We d...
If / is a meromorphic function in D = {z | \z \ < 1}, then / is said to be normal if the set of f...
AbstractFor one-dimensional noetherian local rings we introduce the notion of normal arithmetic gene...
Abstract. This paper continues our investigation of conditions involving val-ues shared by a functio...
We show that the zero locus of a normal function on a smooth complex algebraic variety S is algebrai...
We prove that the zero locus of an admissible normal function over an algebraic parameter space S is...
We show that the zero locus of an admissible normal function on a smooth complex algebraic variety i...
Achter JD, Casalaina-Martin S, Vial C. NORMAL FUNCTIONS FOR ALGEBRAICALLY TRIVIAL CYCLES ARE ALGEBRA...
We prove, using p-adic Hodge theory for open algebraic varieties, that for a smooth projective varie...
30 p., séminaire Bourbaki, 65éme année, 2012-2013, exp. 1063. Comments welcomeInternational audience...
In this paper, we investigate questions of an arithmetic nature related to the Abel–Jacobi map. We g...
In a recent paper, M. Green and P. Griffiths used R. Thomas' work on nodal hypersurfaces to sketch a...
ABSTRACT. Deligne’s regularity criterion for an integrable connection r on a smooth complex algebrai...
The work of this thesis is to motivate the following: Statement: The Hodge conjecture holds for pro...
We review the notion of regular singular point of a linear differential equation with meromorphic co...
This version contains some inaccuracies about centrality issues. A new version will appear soon.We d...
If / is a meromorphic function in D = {z | \z \ < 1}, then / is said to be normal if the set of f...
AbstractFor one-dimensional noetherian local rings we introduce the notion of normal arithmetic gene...
Abstract. This paper continues our investigation of conditions involving val-ues shared by a functio...