Moduli Spaces of Unordered n5 Points on the Riemann Sphere and Their Singularities

Abstract

For n5, it is well known that the moduli space M0,\:n of unordered n points on the Riemann sphere is a quotient space of the Zariski open set Kn of Cn-3 by an Sn action. The stabilizers of this Sn action at certain points of this Zariski open set Kn correspond to the groups fixing the sets of n points on the Riemann sphere. Let α be a subset of n distinct points on the Riemann sphere. We call the group of all linear fractional transformations leaving α invariant the stabilizer of α, which is finite by observation. For each non-trivial finite subgroup G of the group PSL(2, C) of linear fractional transformations, we give the necessary and sufficient condition for finite subsets of the Riemann sphere under which the stabilizers of them are conjugate to G. We also prove that there does exist some finite subset of the Riemann sphere whose stabilizer coincides with G. Next we obtain the irreducible decompositions of the representations of the stabilizers on the tangent spaces at the singularities of M0,\:n. At last, on M0,\:5 and M0,\:6, we work out explicitly the singularities and the representations of their stabilizers on the tangent spaces at them.