Iterates of polynomials over q(t) and their Galois groups

Abstract

A conjecture of Odoni stated over Hilbertian fields K of characteristic zero asserts that for every positive integer d, there exists a polynomial f∈ K[x] of degree d such that for every positive integer n, each iterate f n of f is irreducible and the Galois group of the splitting field of f n is isomorphic to [Sd]n, the n folded iterated wreath product of the symmetric group Sd. We prove an analogue this conjecture over q(t), the field of rational functions in t over a finite field q of characteristic p>0. We present some examples and see that most polynomials in q[t][x] satisfy these conditions.