Moduli of lattice polarized K3 surfaces via relative canonical resolutions

Abstract

For a smooth canonically embedded curve C of genus 9 together with a pencil |L| of degree 6, we study the relative canonical resolution of C⊂ X⊂ P8, where X is the scroll swept out by the pencil |L|. We show that the second syzygy bundle in this resolution of C⊂ X is unbalanced. The proof reveals a new geometric connection between the universal Brill--Noether variety W19,6 and a moduli space Fh of lattice polarized K3 surfaces (for a certain rank 3 lattice h). As a by-product we prove the unirationality of Fh and show that W19,6 is birational to a projective bundle over a moduli space of lattice polarized K3 surfaces Fh' for a certain rank 4 lattice h' which contains h as a sublattice.