An Intuitionistically Complete System of Basic Intuitionistic Conditional Logic

IF 0.7 1区哲学 0 PHILOSOPHY

JOURNAL OF PHILOSOPHICAL LOGIC Pub Date : 2024-07-03 DOI:10.1007/s10992-024-09763-6

Grigory Olkhovikov

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Abstract

We introduce a basic intuitionistic conditional logic \(\textsf{IntCK}\) that we show to be complete both relative to a special type of Kripke models and relative to a standard translation into first-order intuitionistic logic. We show that \(\textsf{IntCK}\) stands in a very natural relation to other similar logics, like the basic classical conditional logic \(\textsf{CK}\) and the basic intuitionistic modal logic \(\textsf{IK}\). As for the basic intuitionistic conditional logic \(\textsf{ICK}\) proposed in Weiss (Journal of Philosophical Logic, 48, 447–469, 2019), \(\textsf{IntCK}\) extends its language with a diamond-like conditional modality \(\Diamond \hspace{-4.0pt}\rightarrow \), but its (\(\Diamond \hspace{-4.0pt}\rightarrow \))-free fragment is also a proper extension of \(\textsf{ICK}\). We briefly discuss the resulting gap between the two candidate systems of basic intuitionistic conditional logic and the possible pros and cons of both candidates.

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基本直观条件逻辑的直观完备系统

我们引入了一个基本的直觉主义条件逻辑（\textsf{IntCK}\），我们证明它相对于一种特殊类型的克里普克模型和相对于一阶直觉主义逻辑的标准翻译都是完备的。我们证明\(\textsf{IntCK}\)与其他类似逻辑有着非常自然的关系，比如基本经典条件逻辑\(\textsf{CK}\)和基本直观模态逻辑\(\textsf{IK}\)。至于魏斯（Weiss）在《哲学逻辑学杂志》（Journal of Philosophical Logic, 48, 447-469, 2019）中提出的基本直觉主义条件逻辑（basic intuitionistic conditional logic），（\textsf{IntCK}\）用钻石般的条件模态（diamond-like conditional modality）扩展了它的语言。0pt}\rightarrow），但是它的（\(\Diamond \hspace{-4.0pt}\rightarrow \)）自由片段也是\(\textsf{ICTK}\)的适当扩展。我们将简要讨论基本直觉条件逻辑的两个候选系统之间的差距，以及这两个候选系统可能存在的利弊。

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来源期刊

JOURNAL OF PHILOSOPHICAL LOGIC PHILOSOPHY-

CiteScore

2.50

自引率

20.00%

发文量

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.