A closedness theorem and applications in geometry of rational points over Henselian valued fields

IF 0.4 Q4 MATHEMATICS Journal of Singularities Pub Date : 2017-06-05 DOI:10.5427/jsing.2020.21m
K. Nowak
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引用次数: 11

Abstract

We develop geometry of algebraic subvarieties of $K^{n}$ over arbitrary Henselian valued fields $K$. This is a continuation of our previous article concerned with algebraic geometry over rank one valued fields. At the center of our approach is again the closedness theorem that the projections $K^{n} \times \mathbb{P}^{m}(K) \to K^{n}$ are definably closed maps. It enables application of resolution of singularities in much the same way as over locally compact ground fields. As before, the proof of that theorem uses i.a. the local behavior of definable functions of one variable and fiber shrinking, being a relaxed version of curve selection. But now, to achieve the former result, we first examine functions given by algebraic power series. All our previous results will be established here in the general settings: several versions of curve selection (via resolution of singularities) and of the Łojasiewicz inequality (via two instances of quantifier elimination indicated below), extending continuous hereditarily rational functions as well as the theory of regulous functions, sets and sheaves, including Nullstellensatz and Cartan's theorems A and B. Two basic tools applied in this paper are quantifier elimination for Henselian valued fields due to Pas and relative quantifier elimination for ordered abelian groups (in a many-sorted language with imaginary auxiliary sorts) due to Cluckers--Halupczok. Other, new applications of the closedness theorem are piecewise continuity of definable functions, Holder continuity of definable functions on closed bounded subsets of $K^{n}$, the existence of definable retractions onto closed definable subsets of $K^{n}$, and a definable, non-Archimedean version of the Tietze--Urysohn extension theorem. In a recent preprint, we established a version of the closedness theorem over Henselian valued fields with analytic structure along with some applications.
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Henselian值域上有理点的闭性定理及其在几何中的应用
我们发展了任意Henselian值域K上K^{n}$的代数子变量的几何性质。这是我们上一篇关于秩一值域上的代数几何的文章的延续。我们方法的核心是封闭性定理,即投影$K^{n}乘以$ mathbb{P}^{m}(K) \到K^{n}$是可定义的闭映射。它使奇点分辨率的应用与局部紧致地面场的分辨率大致相同。如前所述,该定理的证明使用了单变量可定义函数的局部行为和纤维收缩,这是曲线选择的一个宽松版本。但是现在,为了得到前一种结果,我们首先考察由代数幂级数给出的函数。我们之前的所有结果将在这里的一般设置中建立:若干版本的曲线选择(通过奇点的解析)和Łojasiewicz不等式(通过下面所示的两个量词消除实例),扩展连续的遗传有理函数以及正则函数、集和束的理论,包括Nullstellensatz和Cartan定理A和b。本文应用的两个基本工具是由于Pas的Henselian值域的量词消除和由于Cluckers—Halupczok的有序阿贝群(在具有虚辅助排序的多排序语言中)的相对量词消除。另外,闭性定理的新应用是可定义函数的分段连续性,K^{n}$闭有界子集上可定义函数的Holder连续性,K^{n}$闭可定义子集上可定义伸缩的存在性,以及Tietze—Urysohn扩展定理的一个可定义的非阿基米德版本。在最近的一篇预印本中,我们建立了具有解析结构的Henselian值域上的闭性定理的一个版本,并给出了一些应用。
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CiteScore
0.90
自引率
0.00%
发文量
28
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