@inbook{10.2307/j.ctt7zv8rh.7,
ISBN = {9780691002583},
URL = {http://www.jstor.org/stable/j.ctt7zv8rh.7},
abstract = {The main objective of this section is to present a proof of Theorem 1.3. So we assume that unimodal polynomialsfand$\hat{f}$are real, topologically conjugate, the critical orbits omit the fixed points, and haveoddperiodic orbits on the real line. These are topological assumptions and iffsatisfies them than its both fixed points are repelling,fhas orbits with infinitely many different periods (Sharkovski’s theorem) and the first return time to the restrictive interval is greater than 2.In the proof Theorem 1.3 a major issue is the choice of domains of analytic continuations of branches},
bookauthor = {Jacek Graczyk and Grzegorz Świątek},
booktitle = {The Real Fatou Conjecture. (AM-144)},
pages = {109--142},
publisher = {Princeton University Press},
title = {Quasiconformal Techniques},
year = {1998}
}