English

Silverman's conjecture for additive polynomial mappings

Number Theory 2015-11-13 v1

Abstract

Let F:EndFp(Ga/Kd)F : \mathrm{End}_{\mathbb{F_p}}(\mathbb{G}_{a/K}^d) be an additive polynomial mapping over a global function field K/FqK/\mathbb{F}_q, and let PGad(K)P \in \mathbb{G}_a^d(K). Following Silverman, consider δ:=limnN(degFn)1/n\delta := \lim_{n \in \mathbb{N}} (\deg{F^{n}})^{1/n} the dynamic degree of FF and α(P):=lim supnNhK(FnP)1/n\alpha(P) := \limsup_{n \in \mathbb{N}} h_K(F^{n}P)^{1/n} the arithmetic degree of FF at PP. We have α(P)δ\alpha(P) \leq \delta, and extending a conjecture of Silverman from the number field case, it is expected that equality holds if the orbit of PP is Zariski-dense. We prove a weaker form of this conjecture: if δ>1\delta > 1 and the orbit of PP is Zariski-dense, then also α(P)>1\alpha(P) > 1. We obtain furthermore a more precise result concerning the growth along the orbit of PP of the heights of the individual coordinates, and formulate a few related open problems motivated by our results, including a generalization "with moving targets" of Faltings's theorem back in the number field case.

Keywords

Cite

@article{arxiv.1511.04061,
  title  = {Silverman's conjecture for additive polynomial mappings},
  author = {Vesselin Dimitrov},
  journal= {arXiv preprint arXiv:1511.04061},
  year   = {2015}
}
R2 v1 2026-06-22T11:43:59.059Z