四值拟相关逻辑的等列演算:切消和插值

IF 0.9 3区 计算机科学 Q4 COMPUTER SCIENCE, ARTIFICIAL INTELLIGENCE
Andrzej Indrzejczak
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引用次数: 0

摘要

给出了一类准相关逻辑的统一句法刻画,该类逻辑是Meyer和Routley的基本相关逻辑B的四值扩展。所有这些逻辑都是通过在一阶蕴涵FDE的四值逻辑上添加合适的拟相关蕴涵而得到的。到目前为止,它们在公理和语义上有几种不同的特征,但没有得到特殊的证明理论处理。为了达到这个目的,应用了一种广义形式的序列演算,称为双序演算(BSC)。在BSC中,规则作用于普通序列的有序对。它可以被看作是广义序列演算富族中最弱的一类系统,其运算项是普通序列的一些集合,如超序列或嵌套序列。证明了所考虑的所有逻辑在BSC中都具有满足子公式性质并产生可判定性的无切刻画。如果这些逻辑的语言被附加否定所丰富,则插值定理也成立。
本文章由计算机程序翻译,如有差异,请以英文原文为准。

Bisequent Calculus for Four-Valued Quasi-Relevant Logics: Cut Elimination and Interpolation

Bisequent Calculus for Four-Valued Quasi-Relevant Logics: Cut Elimination and Interpolation

We present a uniform syntactical characterisation of the class of quasi-relevant logics which are four-valued extensions of the basic relevant logic B of Meyer and Routley. All these logics are obtained by the addition of suitable quasi-relevant implications to the four-valued logic of First Degree Entailment FDE. So far they were characterised axiomatically and semantically in several ways but did not obtain a special proof-theoretic treatment. To this aim a generalised form of sequent calculus called bisequent calculus (BSC) is applied. In BSC rules operate on the ordered pairs of ordinary sequents. It may be treated as the weakest kind of system in the rich family of generalised sequent calculi operating on items which are some collections of ordinary sequents, like hypersequents or nested sequents. It is shown that all logics under consideration have cut-free characterisation in BSC which satisfies the subformula property and yields decidability. It is also shown that the interpolation theorem holds for these logics if their language is enriched with additional negation.

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来源期刊
Journal of Automated Reasoning
Journal of Automated Reasoning 工程技术-计算机:人工智能
CiteScore
3.60
自引率
9.10%
发文量
31
审稿时长
>12 weeks
期刊介绍: The Journal of Automated Reasoning is an interdisciplinary journal that maintains a balance between theory, implementation and application. The spectrum of material published ranges from the presentation of a new inference rule with proof of its logical properties to a detailed account of a computer program designed to solve various problems in industry. The main fields covered are automated theorem proving, logic programming, expert systems, program synthesis and validation, artificial intelligence, computational logic, robotics, and various industrial applications. The papers share the common feature of focusing on several aspects of automated reasoning, a field whose objective is the design and implementation of a computer program that serves as an assistant in solving problems and in answering questions that require reasoning. The Journal of Automated Reasoning provides a forum and a means for exchanging information for those interested purely in theory, those interested primarily in implementation, and those interested in specific research and industrial applications.
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