English

Symmetric Cubic Laminations

Dynamical Systems 2022-01-28 v1

Abstract

To investigate the degree dd connectedness locus, Thur\-ston studied \emph{σd\sigma_d-invariant laminations}, where σd\sigma_d is the dd-tupling map on the unit circle, and built a topological model for the space of quadratic polynomials f(z)=z2+cf(z) = z^2 +c. In the spirit of Thurston's work, we consider the space of all \emph{cubic symmetric polynomials} fλ(z)=z3+λ2zf_\lambda(z)=z^3+\lambda^2 z in a series of three articles. In the present paper, the first in the series, we construct a lamination CsCLC_sCL together with the induced factor space S/CsCL{\mathbb{S}}/C_sCL of the unit circle S{\mathbb{S}}. As will be verified in the third paper of the series, S/CsCL{\mathbb{S}}/C_sCL is a monotone model of the \emph{cubic symmetric connected locus}, i.e. the space of all cubic symmetric polynomials with connected Julia sets.

Keywords

Cite

@article{arxiv.2201.11434,
  title  = {Symmetric Cubic Laminations},
  author = {Alexander Blokh and Lex Oversteegen and Nikita Selinger and Vladlen Timorin and Sandeep Chowdary Vejandla},
  journal= {arXiv preprint arXiv:2201.11434},
  year   = {2022}
}

Comments

37 pages, 4 figures

R2 v1 2026-06-24T09:05:13.740Z