Preperiodic portraits for unicritical polynomials over a rational function field

Abstract

Let K be an algebraically closed field of characteristic zero, and let K := K(t) be the rational function field over K. For each d 2, we consider the unicritical polynomial fd(z) := zd + t ∈ K[z], and we ask the following question: If we fix α ∈ K and integers M 0, N 1, and d 2, does there exist a place p ∈ Spec K[t] such that, modulo p, the point α enters into an N-cycle after precisely M steps under iteration by fd? We answer this question completely, concluding that the answer is generally affirmative and explicitly giving all counterexamples. This extends previous work by the author in the case that α is a constant point.