Alexander Blokh, Lex Oversteegen, Vladlen Timorin
Published 2021-02-20Version 1
A cubic polynomial $P$ with a non-repelling fixed point $b$ is said to be \emph{immediately renormalizable} if there exists a (connected) quadratic-like invariant filled Julia set $K^*$ such that $b\in K^*$. In that case exactly one critical point of $P$ does not belong to $K^*$. We show that if, in addition, the Julia set of $P$ has no (pre)periodic cutpoints then this critical point is recurrent.
Comments: 34 pages, 2 figures
Immediate renormalization of cubic complex polynomials with empty rational lamination
Markov extensions and lifting measures for complex polynomials
Singular values and bounded Siegel disks
![QR code for arXiv:2102.10325 [math.DS]](http://oss.arxitics.com/images/favicon.svg)