English

Dynamics inside Parabolic Basins

Dynamical Systems 2022-10-03 v2

Abstract

In this paper, we investigate the behavior of orbits inside parabolic basins. Let f(z)=z+azm+1+(higher terms),m1,a0.f(z)=z+az^{m+1}+(\text{higher terms}), m\geq1, a\neq0. We choose an arbitrary constant C>0C>0 and a point qvjPjq\in{\bf v_j}\cap\mathcal{P}_j. Then there exists a point z0Pjz_0\in \mathcal{P}_j so that for any q~Q:=l=0fl(fk(q))(l,k\tilde{q}\in Q:= \cup_{l=0}^{\infty}f^{-l}(f^k(q)) (l, k are non-negative integers), the Kobayashi distance dPj(z0,q~)>Cd_{\mathcal {P}_j}(z_0, \tilde{q})> C, where dPjd_{\mathcal{P}_j} is the Kobayashi metric. In a previous paper [4], we showed that this result is not valid for attracting basins.

Cite

@article{arxiv.2208.03756,
  title  = {Dynamics inside Parabolic Basins},
  author = {Mi Hu},
  journal= {arXiv preprint arXiv:2208.03756},
  year   = {2022}
}
R2 v1 2026-06-25T01:32:57.873Z