Non-Archimedean Whitney stratifications
Abstract
We define "t-stratifications", a strong notion of stratifications for Henselian valued fields of equi-characteristic 0, and prove that they exist. In contrast to classical stratifications in Archimedean fields, t-stratifications also contain non-local information about the stratified sets. For example, they do not only see the singularities in the valued field, but also those in the residue field. Like Whitney stratifications, t-stratifications exist for different classes of subsets of , e.g. algebraic subvarieties or certain classes of analytic subsets. The general framework are definable sets (in the sense of model theory) in a language that satisfies certain hypotheses. We give two applications. First, we show that t-stratifications in suitable valued fields induce classical Whitney stratifications in or ; in particular, the existence of t-stratifications implies the existence of Whitney stratifications. This uses methods of non-standard analysis. Second, we show how, using t-stratifications, one can determine the ultra-metric isometry type of definable subsets of for sufficiently big. For those , this proves a conjecture stated in a previous article. In particular, this yields a new, geometric proof of the rationality of Poincar\'e series.
Keywords
Cite
@article{arxiv.1109.5886,
title = {Non-Archimedean Whitney stratifications},
author = {Immanuel Halupczok},
journal= {arXiv preprint arXiv:1109.5886},
year = {2014}
}
Comments
Fixed typos; enhanced the presentation