Volume forms on moduli spaces of d-differentials

Abstract

Given d∈ N, g∈ N \0\, and an integral vector =(k1,…,kn) such that ki>-d and k1+…+kn=d(2g-2), let dMg,n() denote the moduli space of meromorphic d-differentials on Riemann surfaces of genus g whose zeros and poles have orders prescribed by . We show that dMg,n() carries a canonical volume form that is parallel with respect to its affine complex manifold structure, and that the total volume of PdMg,n()=dMg,n/C* with respect to the measure induced by this volume form is finite.