English

Boundaries of capture hyperbolic components

Dynamical Systems 2022-06-16 v1

Abstract

In complex dynamics, the boundaries of higher dimensional hyperbolic components in holomorphic families of polynomials or rational maps are mysterious objects, whose topological and analytic properties are fundamental problems. In this paper, we show that in some typical families of polynomials (i.e. algebraic varieties defined by periodic critical relations), the boundary of a capture hyperbolic component H\mathcal H is homeomorphic to the sphere S2dimC(H)1S^{2\dim_\mathbb{C}(\mathcal{H})-1}. Furthermore, we establish an unexpected identity for the Hausdorff dimension of H\partial \mathcal H: H.dim(H)=2dimC(H)2+maxfHH.dim(AJ(f)),\operatorname{H{.}dim}(\partial\mathcal{H}) = 2 \dim_\mathbb{C}(\mathcal{H})-2+\max_{f\in\partial\mathcal{H}} \operatorname{H{.}dim}(\partial A^J(f)), where AJ(f)A^J(f) is the union of the bounded attracting Fatou components of ff associated with the free critical points in the Julia set J(f)J(f). In the proof, some new results with independent interests are discovered.

Keywords

Cite

@article{arxiv.2206.07462,
  title  = {Boundaries of capture hyperbolic components},
  author = {Jie Cao and Xiaoguang Wang and Yongcheng Yin},
  journal= {arXiv preprint arXiv:2206.07462},
  year   = {2022}
}

Comments

115 pages, 14 figures

R2 v1 2026-06-24T11:52:18.994Z