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Composantes de dimension maximale d'un analogue du lieu de Noether-Lefschetz (Components of Maximal Dimension of an Analogue of the Noether-Lefschetz Locus)

Published online by Cambridge University Press:  04 December 2007

Anna Otwinowska
Affiliation:
Mathematics Institute, University of Warwick, Coventry CV4 7AL, United Kingdom. E-mail: [email protected]
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Abstract

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Let X$\mathbb P$4$\mathbb _C$ be a smooth hypersurface of degree d [ges ] 5, and let SX be a smooth hyperplane section. Assume that there exists a non trivial cycle Z ∈ Pic(X) of degree 0, whose image in CH1(X) is in the kernel of the Abel–Jacobi map. The family of couples (X, S) containing such Z is a countable union of analytic varieties. We show that it has a unique component of maximal dimension, which is exaclty the locus of couples (X, S) satisfying the following condition: There exists a line Δ ⊂ S and a plane P$\mathbb P$4$_{\mathbb C}$ such that PX = Δ, and Z = Δ − dh, where h is the class of the hyperplane section in CH1(S). The image of Z in CH1(X) is thus 0. This construction provides evidence for a conjecture by Nori which predicts that the Abel–Jacobi map for 1–cycles on X is injective.

Type
Research Article
Copyright
© 2002 Kluwer Academic Publishers