On quotients of Mg,n by certain subgroups of Sn

Abstract

We show that certain quotients of the compactified moduli space of n- pointed genus g curves, MG:= Mg,n / G, are of general type, for a fairly broad class of subgroups G of the symmetric group Sn which act by permuting the n marked points. The values of (g,n) which we specify in our theorems are near optimal in the sense that, at least in he cases that G is the full symmetric group Sn or a product Sn1× … × Snm, there is a relatively narrow transitional zone in which MG changes its behaviour from being of general type to its opposite, e.g. being uniruled or even unirational. As an application we consider the universal difference variety Mg,2n /Sn × Sn.