EUDML

If $S$ is a complex surface, one has for each $k$ the Hilbert scheme ${Hilb}^{k} (S)$ , which is a desingularization of the symmetric product $S^{(k)}$ . Here we construct more generally a differentiable variety ${Hilb}^{k} (X)$ endowed with a stable almost complex structure, for every almost complex fourfold $X$ . ${Hilb}^{k} (X)$ is a desingularization of the symmetric product $X^{(k)}$ .

A geometric application of Nori’s connectivity theorem

Claire Voisin — 2004

Annali della Scuola Normale Superiore di Pisa - Classe di Scienze

We study (rational) sweeping out of general hypersurfaces by varieties having small moduli spaces. As a consequence, we show that general $K$ -trivial hypersurfaces are not rationally swept out by abelian varieties of dimension at least two. As a corollary, we show that Clemens’ conjecture on the finiteness of rational curves of given degree in a general quintic threefold, and Lang’s conjecture saying that such varieties should be rationally swept-out by abelian varieties, contradict.

Sur l'application d'Abel-Jacobi des variétés de Calabi-Yau de dimension trois

Claire Voisin — 1994

Annales scientifiques de l'École Normale Supérieure

The generalized Hodge and Bloch conjectures are equivalent for general complete intersections

Claire Voisin — 2013

Annales scientifiques de l'École Normale Supérieure

We prove that Bloch’s conjecture is true for surfaces with $p_{g} = 0$ obtained as $0$ -sets $X_{σ}$ of a section $σ$ of a very ample vector bundle on a variety $X$ with “trivial” Chow groups. We get a similar result in presence of a finite group action, showing that if a projector of the group acts as $0$ on holomorphic $2$ -forms of $X_{σ}$ , then it acts as $0$ on $0$ -cycles of degree $0$ of $X_{σ}$ . In higher dimension, we also prove a similar but conditional result showing that the generalized Hodge conjecture for general $X_{σ}$ implies the...

Sur les zéro-cycles de certaines hypersurfaces munies d'un automorphisme

Claire Voisin — 1992

Annali della Scuola Normale Superiore di Pisa - Classe di Scienze

Green's generic syzygy conjecture for curves of even genus lying on a K3 surface

Claire Voisin — 2002

Journal of the European Mathematical Society

We consider the generic Green conjecture on syzygies of a canonical curve, and particularly the following reformulation thereof: For a smooth projective curve $C$ of genus $g$ in characteristic 0, the condition $Cliff C > l$ is equivalent to the fact that $K_{g - l^{'} - 2, 1} (C, K_{C}) = 0, \forall l^{'} \leq l$ . We propose a new approach, which allows up to prove this result for generic curves $C$ of genus $g (C)$ and gonality $gon(C)$ in the range $\frac{g (C)}{3} + 1 \leq gon(C) \leq \frac{g (C)}{2} + 1 .$

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Some results on Green's higher Abel-Jacobi map.

Une précision concernant le théorème de Noether.

Variations de structure de Hodge et zéro-cycles sur les surfaces générales.

A mathematical proof of a formula of Aspinwall and Morrison

Sur le lieu de Noether-Lefschetz en degrés 6 et 7

Courbes tétragonales et cohomologie de Koszul.

Composantes de petite codimension du lieu de Noether-Lefschetz.

On the Hilbert scheme of points of an almost complex fourfold

A geometric application of Nori’s connectivity theorem

Sur l'application d'Abel-Jacobi des variétés de Calabi-Yau de dimension trois

The generalized Hodge and Bloch conjectures are equivalent for general complete intersections

Sur les zéro-cycles de certaines hypersurfaces munies d'un automorphisme

Green's generic syzygy conjecture for curves of even genus lying on a K3 surface