逻辑性和模型类

J. Kennedy, Jouko Vaananen
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引用次数: 5

摘要

我们问,什么时候模型的属性是逻辑属性?根据所谓的塔斯基-谢尔准则,这是由同构保持性质的情况。我们将此与抽象逻辑的模型理论特征联系起来,其中模型类是可定义的。这导致了Sagi术语中逻辑性的分级概念[46]。我们研究了逻辑的哪些特征,如Löwenheim-Skolem定理的变体、完备性定理和绝对性,从逻辑性的角度来看是相关的,继续了Bonnay、Feferman和Sagi的早期工作。我们认为,一个逻辑越接近一阶逻辑,它就越合乎逻辑。我们还提供了McGee结果的细化,即模型的逻辑属性可以在$L_{\infty \infty }$中表示,如果表达式被允许依赖于模型的基数,基于将$L_{\infty \infty }$替换为“更驯服”的逻辑。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
LOGICALITY AND MODEL CLASSES
Abstract We ask, when is a property of a model a logical property? According to the so-called Tarski–Sher criterion this is the case when the property is preserved by isomorphisms. We relate this to model-theoretic characteristics of abstract logics in which the model class is definable. This results in a graded concept of logicality in the terminology of Sagi [46]. We investigate which characteristics of logics, such as variants of the Löwenheim–Skolem theorem, Completeness theorem, and absoluteness, are relevant from the logicality point of view, continuing earlier work by Bonnay, Feferman, and Sagi. We suggest that a logic is the more logical the closer it is to first order logic. We also offer a refinement of the result of McGee that logical properties of models can be expressed in $L_{\infty \infty }$ if the expression is allowed to depend on the cardinality of the model, based on replacing $L_{\infty \infty }$ by a “tamer” logic.
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