Abstract
AbstractIn standard model-theoretic semantics, the meaning of logical terms is said to be fixed in the system while that of nonlogical terms remains variable. Much effort has been devoted to characterizing logical terms, those terms that should be fixed, but little has been said on their role in logical systems: on what fixing their meaning precisely amounts to. My proposal is that when a term is considered logical in model theory, what gets fixed is its intension rather than its extension. I provide a rigorous way of spelling out this idea, and show that it leads to a graded account of logicality: the less structure a term requires in order for its intension to be fixed, the more logical it is. Finally, I focus on the class of terms that are invariant under isomorphisms, as they render themselves more easily to mathematical treatment. I propose a mathematical measure for the logicality of such terms based on their associated Löwenheim numbers.
Publisher
Cambridge University Press (CUP)
Subject
Logic,Philosophy,Mathematics (miscellaneous)
Cited by
8 articles.
订阅此论文施引文献
订阅此论文施引文献,注册后可以免费订阅5篇论文的施引文献,订阅后可以查看论文全部施引文献
1. THE VARIETY OF INVARIANCE IN FORMAL AND REGIONAL ONTOLOGIES;HORIZON / Fenomenologicheskie issledovanija/ STUDIEN ZUR PHÄNOMENOLOGIE / STUDIES IN PHENOMENOLOGY / ÉTUDES PHÉNOMÉNOLOGIQUES;2024
2. Quantification in the interpretational theory of validity;Synthese;2023-08-29
3. Logical Constants and Arithmetical Forms;Logic and Logical Philosophy;2023-06-23
4. From possible worlds to paraconsistency: on the inevitability of paraconsistent entailment;Asian Journal of Philosophy;2022-06-18
5. Invariance Criteria as Meta-Constraints;The Bulletin of Symbolic Logic;2021-12-02