Riccati equations and polynomial dynamics over function fields

Abstract

Given a function field K and φ ∈ K[x], we study two finiteness questions related to iteration of φ: whether all but finitely many terms of an orbit of φ must possess a primitive prime divisor, and whether the Galois groups of iterates of φ must have finite index in their natural overgroup Aut(Td), where Td is the infinite tree of iterated preimages of 0 under φ. We focus particularly on the case where K has characteristic p, where far less is known. We resolve the first question in the affirmative under relatively weak hypotheses; interestingly, the main step in our proof is to rule out "Riccati differential equations" in backwards orbits. We then apply our result on primitive prime divisors and adapt a method of Looper to produce a family of polynomials for which the second question has an affirmative answer; these are the first non-isotrivial examples of such polynomials. We also prove that almost all quadratic polynomials over Q(t) have iterates whose Galois group is all of Aut(Td).