Compactification of the space of branched coverings of the two-dimensional sphere

Abstract

For a closed oriented surface we define its degenerations into singular surfaces that are locally homeomorphic to wedges of disks. Let X,n be the set of isomorphism classes of orientation preserving n-fold branched coverings → S2 of the two-dimensional sphere. We complete X,n with the isomorphism classes of mappings that cover the sphere by the degenerations of . In case =S2, the topology that we define on the obtained completion X,n coincides on XS2,n with the topology induced by the space of coefficients of rational functions P/Q , where P,Q are homogeneous polynomials of degree n on CP1 S2. We prove that X,n coincides with the Diaz-Edidin-Natanzon-Turaev compactification of the Hurwitz space H(,n)⊂ X,n consisting of isomorphism classes of branched coverings with all critical values being simple.