Hyperk\"ahler varieties as Brill-Noether loci on curves
Abstract
Consider the moduli space MC(r; KC) of stable rank r vector bundles on a curve C with canonical determinant, and let h be the maximum number of linearly independent global sections of these bundles. If C embeds in a K3 surface X as a generator of Pic(X) and the genus g of C is sufficiently high, we show the Brill-Noether locus BNC ⊂ MC(r; KC) of bundles with h global sections is a smooth projective Hyperk\"ahler manifold of dimension 2g -2r gr, isomorphic to a moduli space of stable vector bundles on X.
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