Automorphism loci for the moduli space of rational maps

Abstract

Let k be an algebraically closed field of characteristic 0 and Md the moduli space of rational maps on P1 of degree d over k. This paper describes the automorphism loci A⊂ Ratd and A⊂ Md and the singular locus S⊂Md. In particular, we determine which groups occur as subgroups of the automorphism group of some [φ]∈Md for a given d and calculate the dimension of the locus. Next, we prove an analogous theorem to the Rauch-Popp-Oort characterization of singular points on the moduli scheme for curves. The results concerning these distinguished loci are used to compute the Picard and class groups of Md, Msd, and Mssd.