English

Sur le morphisme de Barth

Algebraic Geometry 2007-05-23 v1

Abstract

Let F{\rm F} be a rank-2 semi-stable sheaf on the projective plane, with Chern classes c1=0,c2=nc_{1}=0,c_{2}=n. The curve βF\beta_{\rm F} of jumping lines of F{\rm F}, in the dual projective plane, has degree nn. Let Mn{\rm M}_{n} be the moduli space of equivalence classes of semi-stables sheaves of rank 2 and Chern classes (0,n)(0,n) on the projective plane and Cn{\cal C}_{n} be the projective space of curves of degree nn in the dual projective plane. The Barth morphism β:MnCn\beta: {\rm M}_{n}\longrightarrow{\cal C}_{n} associates the point βF\beta_{\rm F} to the class of the sheaf F{\rm F}. We prove that this morphism is generically injective for n4.n\geq 4. The image of β\beta is a closed subvariety of dimension 4n34n-3 of Cn{\cal C}_{n}; as a consequence of our result, the degree of this image is given by the Donaldson number of index 4n34n-3 of the projective plane.

Keywords

Cite

@article{arxiv.math/0003016,
  title  = {Sur le morphisme de Barth},
  author = {Joseph Le Potier and Alexander Tikhomirov},
  journal= {arXiv preprint arXiv:math/0003016},
  year   = {2007}
}

Comments

Plain.tex, 54 pages. Uses diagrams.tex