Preperiodic portraits for unicritical polynomials

Doyle, John

doi:10.1090/proc/13075

Preperiodic portraits for unicritical polynomials
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by John R. Doyle PDF

Proc. Amer. Math. Soc. 144 (2016), 2885-2899 Request permission

Abstract:

Let $K$ be an algebraically closed field of characteristic zero, and for $c \in K$ and an integer $d \ge 2$, define $f_{d,c}(z) := z^d + c \in K[z]$. We consider the following question: If we fix $x \in K$ and integers $M \ge 0$, $N \ge 1$, and $d \ge 2$, does there exist $c \in K$ such that, under iteration by $f_{d,c}$, the point $x$ enters into an $N$-cycle after precisely $M$ steps? We conclude that the answer is generally affirmative, and we explicitly give all counterexamples. When $d = 2$, this answers a question posed by Ghioca, Nguyen, and Tucker.

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