On Dynamical Cancellation

TL;DR

This paper investigates the stabilization of preimages under dominant endomorphisms of projective varieties over number fields, proving stabilization results for étale maps and establishing a general cancellation theorem for polynomial maps on projective lines.

Contribution

It proves the stabilization of preimage towers for étale endomorphisms and introduces a general cancellation theorem for polynomial maps on projective lines.

Findings

Preimage towers stabilize for étale endomorphisms.

Existence of a uniform integer s_0 for preimage coincidence.

A general cancellation theorem for polynomial maps on P^1.

Abstract

Let $X$ be a projective variety and let $f$ be a dominant endomorphism of $X$, both of which are defined over a number field $K$. We consider a question of the second author, Meng, Shibata, and Zhang, which asks whether the tower of $K$-points $Y(K)\subseteq (f^{-1}(Y))(K)\subseteq (f^{-2}(Y))(K)\subseteq \cdots$ eventually stabilizes, where $Y\subset X$ is a subvariety invariant under $f$. We show this question has an affirmative answer when the map $f$ is \'etale. We also look at a related problem of showing that there is some integer $s_0$, depending only on $X$ and $K$, such that whenever $x, y \in X(K)$ have the property that $f^{s}(x) = f^{s}(y)$ for some $s \geq 0$, we necessarily have $f^{s_{0}}(x) = f^{s_{0}}(y)$. We prove this holds for \'etale morphisms of projective varieties, as well as self-morphisms of smooth projective curves. We also prove a more general cancellation theorem for polynomial maps on $\mathbb{P}^1$ where we allow for composition by multiple different maps $f_1,\dots,f_r$.