English

Bound for preperiodic points for maps with good reduction

Number Theory 2017-04-20 v3 Dynamical Systems

Abstract

Let KK be a number field and let ϕ\phi in K(z)K(z) be a rational function of degree d2d\geq 2. Let SS be the places of bad reduction for ϕ\phi (including the archimedan places). Let Per(ϕ,K)Per(\phi,K), PrePer(ϕ,K)PrePer(\phi, K), and Tail(ϕ,K)Tail(\phi,K) be the set of KK-rational periodic, preperiodic, and purely preperiodic points of ϕ\phi, respectively. The present paper presents two main results. The first result gives a bound for PrePer(ϕ,K)|PrePer(\phi,K)| in terms of the number of places of bad reduction S|S| and the degree dd of the rational function ϕ\phi. This bound significantly improves a previous bound given by J. Canci and L. Paladino 2014. For the second result, assuming that Per(ϕ,K)4|Per(\phi,K)| \geq 4 (resp. Tail(ϕ,K)3|Tail(\phi,K)| \geq 3), we prove bounds for Tail(ϕ,K)|Tail(\phi,K)| (resp. Per(ϕ,K)|Per(\phi,K)|) that depend only on the number of places of bad reduction S|S| (and not on the degree dd). We show that the hypotheses of this result are sharp, giving counterexamples to any possible result of this form when Per(ϕ,K)<4|Per(\phi,K)| < 4 (resp. Tail(ϕ,K)<3|Tail(\phi,K)| < 3).

Keywords

Cite

@article{arxiv.1608.05849,
  title  = {Bound for preperiodic points for maps with good reduction},
  author = {Sebastian Troncoso},
  journal= {arXiv preprint arXiv:1608.05849},
  year   = {2017}
}
R2 v1 2026-06-22T15:25:14.861Z