English

Cyclotomic integral points for affine dynamics

Dynamical Systems 2026-01-21 v2 Algebraic Geometry Number Theory

Abstract

Let f:ANANf:\mathbb{A}^N\to\mathbb{A}^N be a regular endomorphism of algebraic degree d2d\geq2 (i.e., ff extends to an endomorphism on PN\mathbb{P}^N of algebraic degree dd) defined over a number field. We prove that if the set of cyclotomic ff-preperiodic points is Zariski-dense in AN\mathbb{A}^N, then some iterate flf^{\circ l} (l1l\geq1) is a quotient of a surjective algebraic group endomorphism g:GmNGmNg:\mathbb{G}_m^N\to\mathbb{G}_m^N, over Q\overline{\mathbb{Q}}. 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 ff on an affine variety XX defined over a number field, concerning "almost ff-invariant" Zariski-dense subsets of cyclotomic integral points. We apply our results to backward orbits of regular endomorphisms on AN\mathbb{A}^N of algebraic degree d2d\geq2, and to periodic points of automorphisms of H\'enon type on AN\mathbb{A}^N.

Keywords

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

R2 v1 2026-07-01T07:41:17.236Z