Stable twisted curves and their r-spin structures

The object of this paper is the notion of r-spin structure: a line bundle whose rth power is isomorphic to the canonical bundle. Over the moduli functor Mg of smooth genus-g curves, r-spin structures form a finite torsor under the group of r-torsion line bundles. Over the moduli functor Mg of stable curves, r-spin structures form an étale stack, but the finiteness and the torsor structure are lost. In the present work, we show how this bad picture can be definitely improved simply by placing the problem in the category of Abramovich and Vistoli’s twisted curves. First, we find that within such category there exist several different compactifications of Mg; each one corresponds to a different multiindex ~l = (l0, l1, . . . ) identifying a notion of stability: ~l-stability. Then, we determine the suitable choices of ~l for which r-spin structures form a finite torsor over the moduli of ~l-stable curves.