On the connectivity of the branch and real locus of M0,[n+1]

Abstract

If n ≥ 3, then moduli space M0,[n+1], of isomorphisms classes of (n+1)-marked spheres, is a complex orbifold of dimension n-2. Its branch locus B0,[n+1] consists of the isomorphism classes of those (n+1)-marked spheres with non-trivial group of conformal automorphisms. We prove that B0,[n+1] is connected if either n ≥ 4 is even or if n ≥ 6 is divisible by 3, and that it has exactly two connected components otherwise. The orbifold M0,[n+1] also admits a natural real structure, this being induced by the complex conjugation on the Riemann sphere. The locus M0,[n+1]( R) of its fixed points, the real points, consists of the isomorphism classes of those marked spheres admitting an anticonformal automorphism. Inside this locus is the real locus M0,[n+1] R, consisting of those classes of marked spheres admitting an anticonformal involution. We prove that M0,[n+1] R is connected for n ≥ 5 odd, and that it is disconnected for n=2r with r ≥ 5 is odd.