Curve attractors for marked rational maps

Abstract

A Thurston map f (S2, A) (S2, A) with marking set A induces a pullback relation on isotopy classes of Jordan curves in (S2, A). If every curve lands in a finite list of possible curve classes after iterating this pullback relation, then the pair (f,A) is said to have a finite global curve attractor. It is conjectured by Pilgrim that all rational Thurston maps that are not flexible Latt\`es maps have a finite global curve attractor. We present partial progress on this problem. Specifically, we prove that if A has four points and the postcritical set (which is a subset of A) has two or three points, then (f,A) has a finite global curve attractor. We also discuss extensions of the main result to certain special cases where f has four postcritical points and A=Pf. Additionally, we speculate on how some of these ideas might be used in the more general case.