English

Riccati equations and polynomial dynamics over function fields

Number Theory 2017-10-13 v1

Abstract

Given a function field KK and ϕK[x]\phi \in K[x], we study two finiteness questions related to iteration of ϕ\phi: whether all but finitely many terms of an orbit of ϕ\phi must possess a primitive prime divisor, and whether the Galois groups of iterates of ϕ\phi must have finite index in their natural overgroup Aut(Td)\text{Aut}(T_d), where TdT_d is the infinite tree of iterated preimages of 00 under ϕ\phi. We focus particularly on the case where KK has characteristic pp, 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)\mathbb{Q}(t) have iterates whose Galois group is all of Aut(Td)\text{Aut}(T_d).

Keywords

Cite

@article{arxiv.1710.04332,
  title  = {Riccati equations and polynomial dynamics over function fields},
  author = {Wade Hindes and Rafe Jones},
  journal= {arXiv preprint arXiv:1710.04332},
  year   = {2017}
}
R2 v1 2026-06-22T22:10:55.484Z