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A Lefschetz (1,1) Theorem for normal projective complex varieties

代数几何 2007-05-23 v1

摘要

We prove an analogue of the Lefschetz (1,1) Theorem characterizing cohomology classes of Cartier divisors (or equivalently first Chern classes of line bundles) in the second integral cohomology. Let XX be a normal complex projective variety. We show that the classes of Cartier divisors in H2(X,Z)H^2(X,Z) are precisely the classes xx such that (i) the image of xx in H2(X,C)H^2(X,C) (cohomology with complex coefficients) lies in F1H2(X,C)F^1 H^2(X,C) (first level of the Hodge filtration for Deligne's mixed Hodge structure), and (ii) xx is Zariski-locally trivial, i.e., there is a covering of XX by Zariski open sets UU such that xx has zero image in H2(U,Z)H^2(U,Z). For normal quasi-projective varieties, this positively answers a question of Barbieri-Viale and Srinivas (J. Reine Ang. Math. 450 (1994)), where examples are given to show that divisor classes are not characterized by either one of the above conditions (i), (ii), taken by itself, unlike in the case of non-singular varieties. The present paper also contains an example of a non-normal projective variety for which (i) and (ii) do not suffice to characterize divisor classes.

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引用

@article{arxiv.math/9904086,
  title  = {A Lefschetz (1,1) Theorem for normal projective complex varieties},
  author = {J. Biswas and V. Srinivas},
  journal= {arXiv preprint arXiv:math/9904086},
  year   = {2007}
}

备注

AMSLaTeX, 29 pages