Singularities of moduli of curves with a universal root

Abstract

In a series of recent papers, Chiodo, Farkas and Ludwig carry out a deep analysis of the singular locus of the moduli space of stable (twisted) curves with an -torsion line bundle. They show that for ≤ 6 and ≠ 5 pluricanonical forms extend over any desingularization. This allows to compute the Kodaira dimension without desingularizing, as done by Farkas and Ludwig for =2, and by Chiodo, Eisenbud, Farkas and Schreyer for =3. Here we treat roots of line bundles on the universal curve systematically: we consider the moduli space of curves C with a line bundle L such that LωC k. New loci of canonical and non-canonical singularities appear for any k∈ and >2, we provide a set of combinatorial tools allowing us to completely describe the singular locus in terms of dual graph. We characterize the locus of non-canonical singularities, and for small values of we give an explicit description.