类型的序列近似和Keisler测度

IF 0.5 3区数学 Q3 MATHEMATICS

Fundamenta Mathematicae Pub Date : 2021-03-17 DOI:10.4064/fm133-12-2021

K. Gannon

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引用次数: 7

摘要

这篇论文是作者博士论文的修改章节。引入了顺序近似型和顺序近似Keisler测度的概念。顾名思义，这些类型可以通过一系列实现类型和度量来近似，这些类型可以通过在实现类型元组上的一系列“平均度量”来近似。我们证明了一般稳定型(在任意理论中)和有限可满足于可数模型(在NIP理论中)的Keisler测度都是顺序逼近的。我们还引入了平滑序列的概念，并通过这个定义给出了一般稳定测度(在NIP理论中)的等价表征。在最后一节中，我们借此机会概括[8]的主要结果。

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Sequential approximations for types and Keisler measures

This paper is a modified chapter of the author’s Ph.D. thesis. We introduce the notions of sequentially approximated types and sequentially approximated Keisler measures. As the names imply, these are types which can be approximated by a sequence of realized types and measures which can be approximated by a sequence of “averaging measures” on tuples of realized types. We show that both generically stable types (in arbitrary theories) and Keisler measures which are finitely satisfiable over a countable model (in NIP theories) are sequentially approximated. We also introduce the notion of a smooth sequence in a measure over a model and give an equivalent characterization of generically stable measures (in NIP theories) via this definition. In the last section, we take the opportunity to generalize the main result of [8].

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来源期刊

Fundamenta Mathematicae 数学-数学

CiteScore

1.00

自引率

0.00%

发文量

审稿时长

6-12 weeks

期刊介绍： FUNDAMENTA MATHEMATICAE concentrates on papers devoted to Set Theory, Mathematical Logic and Foundations of Mathematics, Topology and its Interactions with Algebra, Dynamical Systems.