Twists of Mukai bundles and the geometry of the level 3 modular variety over M8

Abstract

For a curve C of genus 6 or 8 and a torsion bundle η of order we study the vanishing of the space of global sections of the twist EC η of the rank two Mukai bundle EC of C. The bundle EC was used in a well-known construction of Mukai which exhibits general canonical curves of low genus as sections of Grassmannians in the Pl\"ucker embedding. Globalizing the vanishing condition, we obtain divisors on the moduli spaces R6, and R8, of pairs [C, η]. First we characterize these divisors by different conditions on linear series on the level curves, afterwards we calculate the divisor classes. As an application, we are able to prove that R8,3 is of general type.