Simultaneous linearization and centralizers of parabolic self-maps I: zero hyperbolic step
Abstract
Let be a parabolic self-map of the unit disc having zero hyperbolic step. We study holomorphic self-maps of commuting with . In particular, we answer a question from Gentili and Vlacci (1994) by proving that commutes with if and only if the two self-maps have the same Denjoy-Wolff point and is a pseudo-iterate of in the sense of Cowen. Moreover, we show that the centralizer of , i.e. the semigroup is commutative. We also prove that if is univalent, then all elements of are univalent as well, and if is not univalent, then the identity map is an isolated point of . The main tool is the machinery of simultaneous linearization, which we develop using holomorphic models for iteration of non-elliptic self-maps originating in works of Cowen and Pommerenke.
Cite
@article{arxiv.2508.02809,
title = {Simultaneous linearization and centralizers of parabolic self-maps I: zero hyperbolic step},
author = {Manuel D. Contreras and Santiago Díaz-Madrigal and Pavel Gumenyuk},
journal= {arXiv preprint arXiv:2508.02809},
year = {2025}
}