English

Dynamical systems for arithmetic schemes

Dynamical Systems 2024-02-08 v4 Algebraic Geometry

Abstract

Motivated by work of Kucharczyk and Scholze, we use sheafified rational Witt vectors to attach a new ringed space Wrat(X)W_{\mathrm{rat}} (X) to every scheme XX. We also define RR-valued points Wrat(X)(R)W_{\mathrm{rat}} (X) (R) of Wrat(X)W_{\mathrm{rat}} (X) for every commutative ring RR. For normal schemes XX of finite type over spec Z\mathbb{Z}, using Wrat(X)(C)W_{\mathrm{rat}} (X) (\mathbb{C}) we construct infinite dimensional R\mathbb{R}-dynamical systems whose periodic orbits are related to the closed points of XX. Various aspects of these topological dynamical systems are studied. We also explain how certain pp-adic points of Wrat(X)W_{\mathrm{rat}} (X) for XX the spectrum of a pp-adic local number ring are related to the points of the Fargues-Fontaine curve. The new intrinsic construction of the dynamical systems generalizes and clarifies the original extrinsic construction in v.1 and v.2. Many further results have been added.

Keywords

Cite

@article{arxiv.1807.06400,
  title  = {Dynamical systems for arithmetic schemes},
  author = {Christopher Deninger},
  journal= {arXiv preprint arXiv:1807.06400},
  year   = {2024}
}
R2 v1 2026-06-23T03:04:14.193Z