The Coble Quadric

Abstract

Given a smooth genus three curve C, the moduli space of rank two stable vector bundles on C with trivial determinant embeds in P8 as a hypersurface whose singular locus is the Kummer threefold of C; 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), 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). In fact, each point p ∈ C defines a natural embedding of SUC(2, O(p)) in 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)), and thus deserves to be coined the Coble quadric of the pointed curve (C, p).