English

Simultaneous linearization and centralizers of parabolic self-maps I: zero hyperbolic step

Complex Variables 2025-12-11 v1 Dynamical Systems

Abstract

Let φ:DD\varphi:\mathbb D \to \mathbb D be a parabolic self-map of the unit disc D\mathbb D having zero hyperbolic step. We study holomorphic self-maps of D\mathbb D commuting with φ\varphi. In particular, we answer a question from Gentili and Vlacci (1994) by proving that ψHol(D,D)\psi\in\mathsf{Hol(\mathbb D,\mathbb D)} commutes with φ\varphi if and only if the two self-maps have the same Denjoy-Wolff point and ψ\psi is a pseudo-iterate of φ\varphi in the sense of Cowen. Moreover, we show that the centralizer of φ\varphi, i.e. the semigroup Z(φ):={ψ:ψφ=φψ}\mathcal Z_\forall(\varphi):=\{\psi:\psi\circ\varphi=\varphi\circ\psi\} is commutative. We also prove that if φ\varphi is univalent, then all elements of Z(φ)\mathcal Z_\forall(\varphi) are univalent as well, and if φ\varphi is not univalent, then the identity map is an isolated point of Z(φ)\mathcal Z_\forall(\varphi). 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}
}
R2 v1 2026-07-01T04:34:03.394Z