Mathematics – Algebraic Geometry
Scientific paper
2006-04-28
Mathematics
Algebraic Geometry
43 pages; some errors corrected. The section on Fourier--Mukai transforms is new
Scientific paper
The moduli space M_2 of rank four semistable symplectic vector bundles over a curve X of genus two is an irreducible projective variety of dimension ten. Its Picard group is generated by the determinantal line bundle \Xi. The base locus of the linear system |\Xi| consists of precisely those bundles without theta divisors, that is, admitting nonzero maps from every line bundle of degree -1 = 1-g over X. We show that this base locus consists of six distinct points, which are in canonical bijection with the Weierstrass points of the curve. We relate our construction of these bundles to another of Raynaud and Beauville using Fourier--Mukai transforms. As an application, we prove that the map sending a symplectic vector bundle to its theta divisor is a surjective map from M_2 to the space of even 4\Theta divisors on the Jacobian variety of the curve.
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