English

Framed sheaves on projective stacks

Algebraic Geometry 2015-02-27 v4 High Energy Physics - Theory

Abstract

Given a normal projective irreducible stack X\mathscr X over an algebraically closed field of characteristic zero we consider framed sheaves on X\mathscr X, i.e., pairs (E,ϕE)(\mathcal E,\phi_{\mathcal E}), where E\mathcal E is a coherent sheaf on X\mathscr X and ϕE\phi_{\mathcal E} is a morphism from E\mathcal E to a fixed coherent sheaf F\mathcal F. After introducing a suitable notion of (semi)stability, we construct a projective scheme, which is a moduli space for semistable framed sheaves with fixed Hilbert polynomial, and an open subset of it, which is a fine moduli space for stable framed sheaves. If X\mathscr X is a projective irreducible orbifold of dimension two and F\mathcal F a locally free sheaf on a smooth divisor DX\mathscr D\subset \mathscr X satisfying certain conditions, we consider (D,F)(\mathscr{D}, \mathcal{F})-framed sheaves, i.e., framed sheaves (E,ϕE)(\mathcal E,\phi_{\mathcal E}) with E\mathcal E a torsion-free sheaf which is locally free in a neighborhood of D\mathscr D, and ϕED{\phi_{\mathcal{E}}}_{| \mathscr{D}} an isomorphism. These pairs are μ\mu-stable for a suitable choice of a parameter entering the (semi)stability condition, and of the polarization of X\mathscr X. This implies the existence of a fine moduli space parameterizing isomorphism classes of (D,F)(\mathscr{D}, \mathcal{F})-framed sheaves on X\mathscr{X} with fixed Hilbert polynomial, which is a quasi-projective scheme. In an appendix we develop the example of stacky Hirzebruch surfaces. This is the first paper of a project aimed to provide an algebro-geometric approach to the study of gauge theories on a wide class of 4-dimensional Riemannian manifolds by means of framed sheaves on "stacky" compactifications of them. In particular, in a subsequent paper we will use these results to study gauge theories on ALE spaces of type AkA_k.

Keywords

Cite

@article{arxiv.1311.2861,
  title  = {Framed sheaves on projective stacks},
  author = {Ugo Bruzzo and Francesco Sala},
  journal= {arXiv preprint arXiv:1311.2861},
  year   = {2015}
}

Comments

v1: 62 pages. Comments welcome. v2: 64 pages, typos corrected. Appendix D now contains a formula for the dimension of the moduli spaces of framed sheaves on stacky Hirzebruch surfaces. v3: references added. v4: Typos corrected, references added; minor, inconsequential mistakes in Appendix D corrected

R2 v1 2026-06-22T02:06:00.159Z