English

Stable reflexive sheaves and localization

Algebraic Geometry 2017-03-23 v3 High Energy Physics - Theory

Abstract

We study moduli spaces N\mathcal{N} of rank 2 stable reflexive sheaves on P3\mathbb{P}^3. Fixing Chern classes c1c_1, c2c_2, and summing over c3c_3, we consider the generating function Zrefl(q)\mathsf{Z}^{\mathrm{refl}}(q) of Euler characteristics of such moduli spaces. The action of the torus TT on P3\mathbb{P}^3 lifts to N\mathcal{N} and we classify all sheaves in NT\mathcal{N}^T. This leads to an explicit expression for Zrefl(q)\mathsf{Z}^{\mathrm{refl}}(q). Since c3c_3 is bounded below and above, Zrefl(q)\mathsf{Z}^{\mathrm{refl}}(q) is a polynomial. We find a simple formula for its leading term when c1=1c_1=-1. Next, we study moduli spaces of rank 2 stable torsion free sheaves on P3\mathbb{P}^3 and consider the generating function of Euler characteristics of such moduli spaces. We give an expression for this generating function in terms of Zrefl(q)\mathsf{Z}^{\mathrm{refl}}(q) and Euler characteristics of Quot schemes of certain TT-equivariant reflexive sheaves, which are studied elsewhere. Many techniques of this paper apply to any toric 3-fold. In general, Zrefl(q)\mathsf{Z}^{\mathrm{refl}}(q) depends on the choice of polarization which leads to wall-crossing phenomena. We briefly illustrate this in the case of P2×P1\mathbb{P}^2 \times \mathbb{P}^1.

Keywords

Cite

@article{arxiv.1308.3688,
  title  = {Stable reflexive sheaves and localization},
  author = {Amin Gholampour and Martijn Kool},
  journal= {arXiv preprint arXiv:1308.3688},
  year   = {2017}
}

Comments

27 pages. Published version. Typo's corrected

R2 v1 2026-06-22T01:10:35.545Z