Moduli of G-covers of curves: geometry and singularities

Abstract

In a recent paper Chiodo and Farkas described the singular locus and the locus of non-canonical singularities of the moduli space of level curves. In this work we generalize their results to the moduli space Rg,G of curves with a G-cover for any finite group G. We show that non-canonical singularities are of two types: T-curves, that is singularities lifted from the moduli space Mg of stable curves, and J-curves, that is new singularities entirely characterized by the dual graph of the cover. Finally, we prove that in the case G=S3, the J-locus is empty, which is the first fundamental step in evaluating the Kodaira dimension of Rg,S3.