Maximally nodal sextic surfaces and linear determinantal representations

Abstract

We prove that every maximally nodal sextic surface\,(with 65 nodes) X ⊂ PC3 contains a symmetric half-even set of nodes of cardinality 35. It follows that the associated half-quadratic sheaf is the cokernel of a symmetric 6 × 6 matrix of linear forms, yielding a linear determinantal representation of X. In particular, after a suitable Serre twist, the half-quadratic sheaf is an Ulrich sheaf of rank 1. As an example, we exhibit an explicit 6 × 6 matrix of linear forms whose determinant defines the Barth sextic surface.