English

The Coble Quadric

Algebraic Geometry 2024-05-22 v1

Abstract

Given a smooth genus three curve CC, the moduli space of rank two stable vector bundles on C with trivial determinant embeds in P8\mathbb{P}^8 as a hypersurface whose singular locus is the Kummer threefold of CC; this hypersurface is the Coble quartic. Gruson, Sam and Weyman realized that this quartic could be constructed from a general skew-symmetric fourform in eight variables. Using the lines contained in the quartic, we prove that a similar construction allows to recover SUC(2,L)_C(2, L), the moduli space of rank two stable vector bundles on C with fixed determinant of odd degree L, as a subvariety of G(2,8)G(2, 8). In fact, each point pCp \in C defines a natural embedding of SUC(2,O(p))_C(2, \mathcal{O}(p)) in G(2,8)G(2, 8). We show that, for the generic such embedding, there exists a unique quadratic section of the Grassmannian which is singular exactly along the image of SUC(2,O(p))_C(2, \mathcal{O}(p)), and thus deserves to be coined the Coble quadric of the pointed curve (C,p)(C, p).

Keywords

Cite

@article{arxiv.2307.05993,
  title  = {The Coble Quadric},
  author = {Vladimiro Benedetti and Daniele Faenzi and Michele Bolognesi and L Manivel},
  journal= {arXiv preprint arXiv:2307.05993},
  year   = {2024}
}
R2 v1 2026-06-28T11:28:14.432Z