严格蕴涵正交逻辑的序列演算

Q2 Arts and Humanities

Bulletin of the Section of Logic Pub Date : 2021-11-09 DOI:10.18778/0138-0680.2021.22

Tomoaki Kawano

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引用次数: 2

摘要

在这项研究中，讨论了一个涉及蕴涵的最小量子逻辑（\（\bf-MQL\））的新的序列演算。由Nishimura建立了\（\bf-MQL\）的序演算\（\bf GO\），它相对于正交模型（O-模型）是完备的。由于\（\bf-GO\）不包含蕴涵，本研究采用严格蕴涵，构造了两个新的连续演算\（\mathbf{GOI}_1\)和\（\mathbf{GOI}_2\)作为\（\bf-GO\）的展开式。两者\（\mathbf{GOI}_1\)和\（\mathbf{GOI}_2\)相对于O型而言是完整的。本文证明了这些新系统的完备性和可判定性定理。此外，还讨论了有关新规则的一些细节及其严格含义。

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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Sequent Calculi for Orthologic with Strict Implication

In this study, new sequent calculi for a minimal quantum logic (\(\bf MQL\)) are discussed that involve an implication. The sequent calculus \(\bf GO\) for \(\bf MQL\) was established by Nishimura, and it is complete with respect to ortho-models (O-models). As \(\bf GO\) does not contain implications, this study adopts the strict implication and constructs two new sequent calculi \(\mathbf{GOI}_1\) and \(\mathbf{GOI}_2\) as the expansions of \(\bf GO\). Both \(\mathbf{GOI}_1\) and \(\mathbf{GOI}_2\) are complete with respect to the O-models. In this study, the completeness and decidability theorems for these new systems are proven. Furthermore, some details pertaining to new rules and the strict implication are discussed.

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来源期刊

Bulletin of the Section of Logic Arts and Humanities-Philosophy

CiteScore

0.90

自引率

0.00%

发文量

审稿时长

8 weeks