Syzygies of torsion bundles and the geometry of the level l modular variety over Mg

Abstract

We formulate, and in some cases prove, three statements concerning the purity or, more generally the naturality of the resolution of various rings one can attach to a generic curve of genus g and a torsion point of order l in its Jacobian. These statements can be viewed an analogues of Green's Conjecture and we verify them computationally for bounded genus. We then compute the cohomology class of the corresponding non-vanishing locus in the moduli space Rg,l of twisted level l curves of genus g and use this to derive results about the birational geometry of Rg, l. For instance, we prove that Rg,3 is a variety of general type when g>11 and the Kodaira dimension of R11,3 is greater than or equal to 19. In the last section we explain probabilistically the unexpected failure of the Prym-Green conjecture in genus 8 and level 2.