The irreducibility of the moduli space of stable vector bundles of rank 2 on a quintic in 3
Abstract
In this paper I consider a quintic surface in 3, general in the sense of Noether-Lefschetz theory. The vector bundles of rank 2 on this surface which are μ-stable with respect to the hyperplane section and have c1 = K, the canonical class of the surface and fixed c2, are parametrized by a moduli space. This space is known to be irreducible for large c2 (work of K.G. O'Grady). I give an explicit bound, namely c2 ≥ 16.
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