Lagrangian subspaces of the moduli space of simple sheaves on K3 surfaces

Abstract

Let X be a K3 surface and let Spl(r;c1,c2) be the moduli space of simple sheaves on X of fixed rank r and Chern classes c1 and c2. Under suitable assumptions, to a pair (F,W) (respectively, (F,V)) where F∈ Spl(r;c1,c2) and W⊂ H0(F) (resp.~V*⊂ H1(F*)) is a vector subspace, we associate a simple syzygy bundle (resp.~extension bundle) on X. We show that both syzygy bundles and extension bundles can be constructed in families and that the induced morphism to a different component of the moduli of simple sheaves is a locally closed embedding. We show that this construction associates to every Lagrangian (resp.~isotropic) algebraic subspace of Spl(r;c1,c2) an induced Lagrangian (resp.~isotropic) algebraic subspace of a different component of the moduli of simple sheaves.