皮亚诺算术模型的cp -泛型展开

Pub Date : 2022-02-11 DOI:10.1002/malq.202100051
Athar Abdul-Quader, James H. Schmerl
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引用次数: 0

摘要

我们研究PA $\mathsf {PA}$模型中的泛型概念,灵感来自于Chatzidakis和Pillay发起的研究路线,并由Dolich, Miller和Steinhorn在一般模型理论背景下继续研究。本文研究了在一类结构中加入一个“随机”谓词所得到的理论。Chatzidakis和Pillay将以这种方式获得的理论公理化。在本文中,我们研究PA $\mathsf {PA}$模型的子集,它们满足Chatzidakis和Pillay给出的公理化;我们将PA $\mathsf {PA}$模型中的这些子集称为cp泛型。我们研究了一个更自然的性质,称为强cp泛性,这意味着cp泛性。我们使用Cohen强迫的算术版本来构造具有各种属性的(强)cp泛型,包括在展开中模型的每个元素都是可定义的泛型,以及在另一个极端,可定义闭包关系不变的泛型。
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CP-generic expansions of models of Peano Arithmetic

We study notions of genericity in models of PA $\mathsf {PA}$ , inspired by lines of inquiry initiated by Chatzidakis and Pillay and continued by Dolich, Miller and Steinhorn in general model-theoretic contexts. These papers studied the theories obtained by adding a “random” predicate to a class of structures. Chatzidakis and Pillay axiomatized the theories obtained in this way. In this article, we look at the subsets of models of PA $\mathsf {PA}$ which satisfy the axiomatization given by Chatzidakis and Pillay; we refer to these subsets in models of PA $\mathsf {PA}$ as CP-generics. We study a more natural property, called strong CP-genericity, which implies CP-genericity. We use an arithmetic version of Cohen forcing to construct (strong) CP-generics with various properties, including ones in which every element of the model is definable in the expansion, and, on the other extreme, ones in which the definable closure relation is unchanged.

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