A positive characterization of rational maps
Dylan P. Thurston
Abstract
When is a topological branched self-cover of the sphere equivalent to a post-critically finite rational map on $\mathbb{C}\mathbb{P}^1$? William Thurston gave one answer in 1982, giving a negative criterion (an obstruction to a map being rational). We give a complementary, positive criterion: the branched self-cover is equivalent to a rational map if and only if there is an elastic graph spine for the complement of the post-critical set that gets ``looser" under backwards iteration.
Topics & Concepts
MathematicsComplement (music)Characterization (materials science)GraphTopological conjugacyFinite setSet (abstract data type)CombinatoricsRational numberPure mathematicsDiscrete mathematicsOpen setRational functionExistential quantificationFinite graphRational surfaceGeometric Analysis and Curvature FlowsGeometric and Algebraic TopologyNonlinear Partial Differential Equations