Connectivity of the branch locus of moduli space of rational maps

Abstract

Milnor proved that the moduli space Md of rational maps of degree d ≥ 2 has a complex orbifold structure of dimension 2(d-1). Let us denote by Sd the singular locus of Md and by Bd the branch locus, that is, the equivalence classes of rational maps with non-trivial holomorphic automorphisms. Milnor observed that we may identify M2 with C2 and, within that identification, that B2 is a cubic curve; so B2 is connected and S2=. If d ≥ 3, then Sd= Bd. We use simple arguments to prove the connectivity of it.