English

{\L}S condition for filled Julia sets in $\mathbb{C}$

Complex Variables 2018-11-14 v1

Abstract

In this article, we derive an inequality of {\L}ojasiewicz-Siciak type for certain sets arising in the context of the complex dynamics in dimension 1. More precisely, if we denote by distdist the euclidian distance in C\mathbb{C}, we show that the Green function GKG_K of the filled Julia set KK of a polynomial such that K˚\mathring{K}\neq \emptyset satisfies the so-called {\L}S condition GAcdist(,K)c\displaystyle G_A\geq c\cdot dist(\cdot, K)^{c'} in a neighborhood of KK, for some constants c,c>0c,c'>0. Relatively few examples of compact sets satisfying the {\L}S condition are known. Our result highlights an interesting class of compact sets fulfilling this condition. The fact that filled Julia sets satisfy the {\L}S condition may seem surprising, since they are in general very irregular. In order to prove our main result, we define and study the set of obstruction points to the {\L}S condition. We also prove, in dimension n1n\geq 1, that for a polynomially convex and L-regular compact set of non empty interior, these obstruction points are rare, in a sense which will be specified.

Cite

@article{arxiv.1707.07359,
  title  = {{\L}S condition for filled Julia sets in $\mathbb{C}$},
  author = {Frédéric Protin},
  journal= {arXiv preprint arXiv:1707.07359},
  year   = {2018}
}
R2 v1 2026-06-22T20:55:13.415Z