刻画Borel完全展开的存在性

IF 0.5 3区数学 Q3 MATHEMATICS

Fundamenta Mathematicae Pub Date : 2021-09-14 DOI:10.4064/fm278-4-2023

M. Laskowski, Douglas Ulrich

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引用次数: 2

摘要

我们开发了通用机制，将不定式句子$\Phi$的潜在规范Scott句子类投射为相关语言中的一类结构。由此，我们证明了$\Phi$具有Borel完全展开，当且仅当$S\infty$对一些可数模型$M\models\Phi$除$Aut（M）$。利用这一点，我们证明了对于断言$\{E_n\}$是具有$h（n）$类的横切等价关系的可数族的理论$T_h$，如果$h（n）$是一致有界的，则$T_h$不是Borel完备的，从而提供了与\ cite｛LU｝的定理~2.1的逆。

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Characterizing the existence of a Borel complete expansion

We develop general machinery to cast the class of potential canonical Scott sentences of an infinitary sentence $\Phi$ as a class of structures in a related language. From this, we show that $\Phi$ has a Borel complete expansion if and only if $S_\infty$ divides $Aut(M)$ for some countable model $M\models \Phi$. Using this, we prove that for theories $T_h$ asserting that $\{E_n\}$ is a countable family of cross cutting equivalence relations with $h(n)$ classes, if $h(n)$ is uniformly bounded then $T_h$ is not Borel complete, providing a converse to Theorem~2.1 of \cite{LU}.

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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.