English

Primitive tuning for non-hyperbolic polynomials

Dynamical Systems 2021-03-04 v3

Abstract

Let f0f_0 be a polynomial of degree d1+d2d_1+d_2 with a periodic critical point 00 of multiplicity d11d_1-1 and a Julia critical point of multiplicity d2d_2. We show that if f0f_0 is primitive, free of neutral periodic points and non-renormalizable at the Julia critical point, then the straightening map χf0:C(λf0)Cd1\chi_{f_0}:\mathcal C(\lambda_{f_0}) \to \mathcal C_{d_1} is a bijection. More precisely, fm0f^{m_0} has a polynomial-like restriction which is hybrid equivalent to some polynomial in Cd1\mathcal C_{d_1} for each map fC(λf0)f \in \mathcal C(\lambda_{f_0}), where m0m_0 is the period of 00 under f0f_0. On the other hand, f0f_0 can be tuned with any polynomial gCd1g\in \mathcal C_{d_1}. As a consequence, we conclude that the straightening map χf0\chi_{f_0} is a homeomorphism from C(λf0)\mathcal C(\lambda_{f_0}) onto the Mandelbrot set when d1=2d_1=2. This together with the main result in [SW] solve the problem for primitive tuning for cubic polynomials with connected Julia sets thoroughly.

Cite

@article{arxiv.2103.00732,
  title  = {Primitive tuning for non-hyperbolic polynomials},
  author = {Yimin Wang},
  journal= {arXiv preprint arXiv:2103.00732},
  year   = {2021}
}

Comments

26 pages

R2 v1 2026-06-23T23:36:03.138Z