Structure and realizability for rational maps

Abstract

We establish a structure theorem for rational maps f:CC: the pullback metric f* ds02 of the standard metric ds02 admits a canonical decomposition into finitely many footballs -- Riemann spheres with two antipodal conical singularities of equal angle -- by cutting along a finite set of geodesics. This geometric decomposition provides a new framework for the Hurwitz existence problem. As an application, we prove that a collection D of k nontrivial partitions of a positive integer d satisfying the Riemann--Hurwitz condition is realizable as the branch datum of a rational map whenever k>l+1, where l is the minimum partition length. This unifies the classical results of Thom (l = 1), Pakovich (l = 2) and Barański (k≥ d), and confirms a conjecture of Zheng in an important special case.