Mukai's program for non-primitive curves on K3 surfaces

Abstract

Mukai's program seeks to recover a K3 surface X from any curve C on it by exhibiting it as a Fourier-Mukai partner to a Brill-Noether locus of vector bundles on the curve. In the case X has Picard number one and the curve C∈ |H| is primitive, this was confirmed by Feyzbakhsh for g≥ 11 and g≠ 12. More recently, Feyzbakhsh has shown that certain moduli spaces of stable bundles on X are isomorphic to the Brill-Noether locus of curves in |H| if g is sufficiently large. In this paper, we work with irreducible curves in a non-primitive ample linear system |mH| and prove that Mukai's program is valid for any irreducible curve when g≠ 2, mg≥ 11 and mg≠ 12. Furthermore, we introduce the destabilising regions to improve Feyzbakhsh's analysis. We show that there are hyper-K\"ahler varieties as Brill-Noether loci of curves in every dimension.