Blaschke-type models for multimodal circle maps

Abstract

For each integer m ≥ 1, we construct a finite-dimensional family of rational maps, given by Blaschke-type products, whose restriction to the unit circle consists of 2m-multimodal maps. We show that every post-critically finite 2m-multimodal circle map satisfying natural dynamical conditions is topologically conjugate to a map in this family. Moreover, we prove that this realization is unique up to rotation: two maps in the family that are topologically conjugate on the circle differ by a rigid rotation. In particular, the family provides a canonical model realizing all post-critically finite combinatorics in this class. The proofs combine a detailed description of the critical geometry of these Blaschke-type maps with a Thurston-type fixed point argument for a pull-back operator on the parameter space.