8 模态逻辑的有值非确定性语义

IF 0.7 1区 哲学 0 PHILOSOPHY
Pawel Pawlowski, Daniel Skurt
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引用次数: 0

摘要

本文的目的是研究模态逻辑的一个特定非确定性语义族,它有八个真值。这些八值语义可以追溯到 Omori 和 Skurt(2016 年),其中该族的一个特定成员被用来表征正常模态逻辑 K。这些语义中的真值传达了关于命题的真/假、命题是否必要/不必要以及命题是否可能/不可能的信息。每个三元组都有一个唯一的值。在本文中,我们将研究在假定其他连接词的解释保持不变的前提下,通过改变(\Box \)模态的解释可以得到哪些模态逻辑。我们将说明哪些公理对\(\Box \)的特定解释负责。此外,我们还将研究这些公理的子集。我们将证明公理的某些组合等价于众所周知的模态公理。我们对所有系统都应用了等级评估技术,以重新获得必要规则下的封闭性。我们还指出,所得到的一些逻辑并不是 S5 的子逻辑,并简要评述了这些公理所强制的相应框架条件。最后,我们为所有这些系统勾画了一个元完备性证明。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
8 Valued Non-Deterministic Semantics for Modal Logics

The aim of this paper is to study a particular family of non-deterministic semantics for modal logics that has eight truth-values. These eight-valued semantics can be traced back to Omori and Skurt (2016), where a particular member of this family was used to characterize the normal modal logic K. The truth-values in these semantics convey information about a proposition’s truth/falsity, whether the proposition is necessary/not necessary, and whether it is possible/not possible. Each of these triples is represented by a unique value. In this paper we will study which modal logics can be obtained by changing the interpretation of the \(\Box \) modality, assuming that the interpretation of other connectives stays constant. We will show what axioms are responsible for a particular interpretations of \(\Box \). Furthermore, we will study subsets of these axioms. We show that some of the combinations of the axioms are equivalent to well-known modal axioms. We apply the level-valuation technique to all of the systems to regain the closure under the rule of necessitation. We also point out that some of the resulting logics are not sublogics of S5 and comment briefly on the corresponding frame conditions that are forced by these axioms. Ultimately, we sketch a proof of meta-completeness for all of these systems.

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来源期刊
CiteScore
2.50
自引率
20.00%
发文量
43
期刊介绍: The Journal of Philosophical Logic aims to provide a forum for work at the crossroads of philosophy and logic, old and new, with contributions ranging from conceptual to technical.  Accordingly, the Journal invites papers in all of the traditional areas of philosophical logic, including but not limited to: various versions of modal, temporal, epistemic, and deontic logic; constructive logics; relevance and other sub-classical logics; many-valued logics; logics of conditionals; quantum logic; decision theory, inductive logic, logics of belief change, and formal epistemology; defeasible and nonmonotonic logics; formal philosophy of language; vagueness; and theories of truth and validity. In addition to publishing papers on philosophical logic in this familiar sense of the term, the Journal also invites papers on extensions of logic to new areas of application, and on the philosophical issues to which these give rise. The Journal places a special emphasis on the applications of philosophical logic in other disciplines, not only in mathematics and the natural sciences but also, for example, in computer science, artificial intelligence, cognitive science, linguistics, jurisprudence, and the social sciences, such as economics, sociology, and political science.
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