Iterating additive polynomials over finite fields
Abstract
Let q be a power of a prime p, let Fq be the finite field with q elements and, for each nonconstant polynomial F∈ Fq[X] and each integer n 1, let sF(n) be the degree of the splitting field (over Fq) of the iterated polynomial F(n)(X). In 1999, Odoni proved that sA(n) grows linearly with respect to n if A∈ Fq[X] is an additive polynomial not of the form aXph; moreover, if q=p and B(X)=Xp-X, he obtained the formula sB(n)=p p n. In this paper we note that sF(n) grows at least linearly unless F∈ Fq[X] has an exceptional form and we obtain a stronger form of Odoni's result, extending it to affine polynomials. In particular, we prove that if A is additive, then sA(n) resembles the step function p p n and we indeed have the identity sA(n)=α p p β n for some α, β∈ Q, unless A presents a special irregularity of dynamical flavour. As applications of our main result, we obtain statistics for periodic points of linear maps over Fqi as i +∞ and for the factorization of iterates of affine polynomials over finite fields.
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