English

On Dimensions, Standard Part Maps, and $p$-Adically Closed Fields

Logic 2020-02-25 v1

Abstract

The aim of this paper is to study the dimensions and standard part maps between the field of pp-adic numbers Qp{{\mathbb Q}_p} and its elementary extension KK in the language of rings LrL_r. We show that for any KK-definable set XKmX\subseteq K^m, dimK(X)dimQp(XQpm)\text{dim}_K(X)\geq \text{dim}_{{\mathbb Q}_p}(X\cap {{\mathbb Q}_p}^m). Let VKV\subseteq K be convex hull of KK over Qp{{\mathbb Q}_p}, and \st:VQp\text{\st}: V\rightarrow {{\mathbb Q}_p} be the standard part map. We show that for any KK-definable function f:KmKf:K^m\rightarrow K, there is definable subset DQpmD\subseteq{{\mathbb Q}_p}^m such that Qpm\D{{\mathbb Q}_p}^m\backslash D has no interior, and for all xDx\in D, either f(x)Vf(x)\in V and st(f(st1(x)))\text{st}(f(\text{st}^{-1}(x))) is constant, or f(st1(x))V=f(\text{st}^{-1}(x))\cap V=\emptyset. We also prove that dimK(X)dimQp(st(XVm))\text{dim}_K(X)\geq \text{dim}_{{\mathbb Q}_p}(\text{st}(X\cap V^m)) for every definable XKmX\subseteq K^m.

Keywords

Cite

@article{arxiv.2002.10117,
  title  = {On Dimensions, Standard Part Maps, and $p$-Adically Closed Fields},
  author = {Ningyuan Yao},
  journal= {arXiv preprint arXiv:2002.10117},
  year   = {2020}
}
R2 v1 2026-06-23T13:51:18.611Z