English

Cosection localization and the Quot scheme $\mathrm{Quot}^{l}_{S}(\mathcal{E})$

Algebraic Geometry 2023-01-02 v4

Abstract

Let E\mathcal{E} be a locally free sheaf of rank rr on a smooth projective surface SS. The Quot scheme QuotSl(E)\mathrm{Quot}^{l}_{S}(\mathcal{E}) of length ll coherent sheaf quotients of E\mathcal{E} is a natural higher rank generalization of the Hilbert scheme of ll points of SS. We study the virtual intersection theory of this scheme. If CSC\subset S is a smooth canonical curve, we use cosection localization to show that the virtual fundamental class of QuotSl(E)\mathrm{Quot}^{l}_{S}(\mathcal{E}) is (1)l(-1)^{l} times the fundamental class of the smooth subscheme QuotCl(EC)QuotSl(E)\mathrm{Quot}^{l}_{C}(\mathcal{E}\vert_{C})\subset\mathrm{Quot}^{l}_{S}(\mathcal{E}). We then prove a structure theorem for virtual tautological integrals over QuotSl(E)\mathrm{Quot}^{l}_{S}(\mathcal{E}). From this we deduce, among other things, the equality of virtual Euler characteristics χvir(QuotSl(E))=χvir(QuotSl(Or))\chi^{\mathrm{vir}}(\mathrm{Quot}^{l}_{S}(\mathcal{E}))=\chi^{\mathrm{vir}}(\mathrm{Quot}^{l}_{S}(\mathcal{O}^{\oplus r})).

Cite

@article{arxiv.2107.08025,
  title  = {Cosection localization and the Quot scheme $\mathrm{Quot}^{l}_{S}(\mathcal{E})$},
  author = {Samuel Stark},
  journal= {arXiv preprint arXiv:2107.08025},
  year   = {2023}
}

Comments

Final version

R2 v1 2026-06-24T04:16:19.601Z