Iterations of rational functions: which hyperbolic components contain polynomials?
摘要
Let be the set of all rational maps of degree on the Riemann sphere which are expanding on Julia set. We prove that if and all or all but one critical points (or values) are in the immediate basin of attraction to an attracting fixed point then there exists a polynomial in the component of containing . If all critical points are in the immediate basin of attraction to an attracting fixed point or parabolic fixed point then restricted to Julia set is conjugate to the shift on the one-sided shift space of symbols. We give exotic examples of maps of an arbitrary degree with a non-simply connected, completely invariant basin of attraction and arbitrary number of critical points in the basin. For such a map with there is no polynomial in . Finally we describe a computer experiment joining an exotic example to a Newton's method (for a polynomial) rational function with a 1-parameter family of rational maps.
引用
@article{arxiv.math/9404237,
title = {Iterations of rational functions: which hyperbolic components contain polynomials?},
author = {Feliks Przytycki},
journal= {arXiv preprint arXiv:math/9404237},
year = {2016}
}