Perfect proofs at first order

IF 0.7 4区数学 Q3 COMPUTER SCIENCE, THEORY & METHODS

Journal of Logic and Computation Pub Date : 2024-08-08 DOI:10.1093/logcom/exae033

Neil Tennant

引用次数: 0

Abstract

In this note we extend a remarkable result of Brauer (2024, Journal of Logic and Computation) concerning propositional Classical Core Logic. We show that it holds also at first order. This affords a soundness and completeness result for Classical Core Logic. The $\mathbb{C}^{+}$-provable sequents are exactly those that are uniform substitution instances of perfectly valid sequents, i.e. sequents that are valid and that need every one of their sentences in order to be so. Brauer (2020, Review of Symbolic Logic, 13, 436–457) showed that the notion of perfect validity itself is unaxiomatizable. In the Appendix we use his method to show that our notion of relevant validity in Tennant (2024, Philosophia Mathematica) is likewise unaxiomatizable. It would appear that the taking of substitution instances is an essential ingredient in the construction of a semantical relation of consequence that will be axiomatizable—and indeed, by the rules of proof for Classical Core Logic.

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完美的一阶证明

在本注释中，我们扩展了 Brauer（2024 年，《逻辑与计算杂志》）关于命题古典核心逻辑的一个非凡结果。我们证明它在一阶也成立。这为经典核心逻辑提供了健全性和完备性结果。$\mathbb{C}^{+}$可证的序列恰恰是那些完全有效序列的统一替换实例，即序列是有效的，而且需要它们的每一个句子才能有效。布劳尔（Brauer，2020，《符号逻辑评论》，13，436-457）指出，完全有效概念本身是不可斧化的。在附录中，我们用他的方法来证明我们在 Tennant (2024, Philosophia Mathematica) 中的相关有效性概念同样是不可斧化的。由此看来，在构建可公理化的后果语义关系时，取替例是一个必不可少的要素--事实上，根据经典核心逻辑的证明规则，也是如此。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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来源期刊

Journal of Logic and Computation 工程技术-计算机：理论方法

CiteScore

1.90

自引率

14.30%

发文量

审稿时长

6-12 weeks

期刊介绍： Logic has found application in virtually all aspects of Information Technology, from software engineering and hardware to programming and artificial intelligence. Indeed, logic, artificial intelligence and theoretical computing are influencing each other to the extent that a new interdisciplinary area of Logic and Computation is emerging. The Journal of Logic and Computation aims to promote the growth of logic and computing, including, among others, the following areas of interest: Logical Systems, such as classical and non-classical logic, constructive logic, categorical logic, modal logic, type theory, feasible maths.... Logical issues in logic programming, knowledge-based systems and automated reasoning; logical issues in knowledge representation, such as non-monotonic reasoning and systems of knowledge and belief; logics and semantics of programming; specification and verification of programs and systems; applications of logic in hardware and VLSI, natural language, concurrent computation, planning, and databases. The bulk of the content is technical scientific papers, although letters, reviews, and discussions, as well as relevant conference reviews, are included.