The Incidence Variety Compactification of strata of d-differentials in genus 0

Abstract

Given d∈ Z≥ 2, for every =(k1,…,kn) ∈ Zn such that ki≥ 1-d and k1+…+kn=-2d, denote by dM0,n() and PdM0,n() the corresponding stratum of d-differentials in genus 0 and its projectivization respectively. We specify an ideal sheaf of the structure sheaf of M0,n and show that the incidence variety compactification PdM0,n() of PdM0,n() is isomorphic to the blow-up of M0,n along this sheaf of ideals. We also obtain an explicit divisor representative of the tautological line bundle on the incidence variety. In an accompanying work [29], the construction of PdM0,n() in this paper will be used to prove a recursive formula computing the volumes of the spaces of flat metric with fixed conical angles on the sphere.