A Dynamical Néron--Ogg--Shafarevich Criterion via Orbital Arboreal Representations

Abstract

Let K be a non-archimedean local field and φ: P1 P1 a rational endomorphism of degree d ≥ 2 over K. In the tame case (p d), we show that strict good reduction is equivalent to the existence of a nonempty Zariski open subset Uk ⊂ P1k PC(φ) over which the canonical residual morphism is finite étale of degree d. The criterion separates two complementary local invariants of a normalized integral lift: Res(F,G) controls residual degree drop, while the fiber discriminants Disc(Fn,x) control étaleness of the residual fibers once full residual degree is ensured. Consequently, for every finite x ∈ OK with x ∈ Uk, the extensions K(Xn(x))/K are unramified for all n ≥ 1. We introduce the orbital preimage tree TO+(x) = n X∞(φn(x)), the colimit in GK-sets along the forward orbit, and the orbital arboreal Galois image GO+(x) = Im(GK Aut(TO+(x))). On the forward-invariant safe locus Uksafe = m ≥ 0 φ-m(Uk), strict good reduction is captured by the bijectivity of the orbital reduction map Xn(xm) Xn(xm). This canonical orbit-invariant framework connects with arboreal Galois representations (Boston-Jones, Jones, and others) and yields pointwise and orbit-level reformulations. Explicit examples over Qp illustrate the criterion.