Cyclotomic integral points for affine dynamics
Abstract
Let be a regular endomorphism of algebraic degree (i.e., extends to an endomorphism on of algebraic degree ) defined over a number field. We prove that if the set of cyclotomic -preperiodic points is Zariski-dense in , then some iterate () is a quotient of a surjective algebraic group endomorphism , over . This result generalizes a theorem of Dvornicich and Zannier on cyclotomic preperiodic points of one-variable polynomials to higher dimensions. In fact, we prove a much more general rigidity result for dominant endomorphisms on an affine variety defined over a number field, concerning "almost -invariant" Zariski-dense subsets of cyclotomic integral points. We apply our results to backward orbits of regular endomorphisms on of algebraic degree , and to periodic points of automorphisms of H\'enon type on .
Cite
@article{arxiv.2511.13443,
title = {Cyclotomic integral points for affine dynamics},
author = {Zhuchao Ji and Junyi Xie and Geng-Rui Zhang},
journal= {arXiv preprint arXiv:2511.13443},
year = {2026}
}
Comments
22 pages, minorly revised