Hensel极小性

IF 2.8 1区数学 Q1 MATHEMATICS

Forum of Mathematics Pi Pub Date : 2019-09-30 DOI:10.1017/fmp.2022.6

R. Cluckers, Immanuel Halupczok, Silvain Rideau-Kikuchi

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引用次数: 21

摘要

摘要本文提出了亨塞尔值域上驯服几何的一个框架，我们称之为亨塞尔极小性。在o-minimality的精神下，这是真实几何和几个丢芬图应用的关键，我们开发了Hensel最小结构的几何结果和应用，这些结构以前只在更强的，不太公理的假设下才知道。我们在Hensel最小结构和Taylor近似结果中证明了t-分层的存在，这是非阿基米德版本的Pila-Wilkie点计数、Yomdin的参数化结果和动机积分的关键。在第一篇论文中，我们在等特征零点下工作;在后续论文中，我们开发了混合特征情况和丢番图应用。

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Hensel minimality I

Abstract We present a framework for tame geometry on Henselian valued fields, which we call Hensel minimality. In the spirit of o-minimality, which is key to real geometry and several diophantine applications, we develop geometric results and applications for Hensel minimal structures that were previously known only under stronger, less axiomatic assumptions. We show the existence of t-stratifications in Hensel minimal structures and Taylor approximation results that are key to non-Archimedean versions of Pila–Wilkie point counting, Yomdin’s parameterization results and motivic integration. In this first paper, we work in equi-characteristic zero; in the sequel paper, we develop the mixed characteristic case and a diophantine application.

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来源期刊

Forum of Mathematics Pi Mathematics-Statistics and Probability

CiteScore

3.50

自引率

0.00%

发文量

审稿时长

19 weeks

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