网格展开的无选择二元性:带否定操作符的逻辑应用

IF 0.6 3区 数学 Q2 LOGIC
Chrysafis Hartonas
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引用次数: 0

摘要

霍利迪和贝扎尼什维利提出了一个相关的项目,旨在获得 "其他类代数[\(\ldots \)]的无选择空间对偶性,为非经典逻辑提供无选择完备性证明"。我们在本文中提出了一种完成霍利迪-贝扎尼什维利项目的方法(统一地,对于任何正常晶格展开)。这是通过以一种无选择的方式重铸作者最近的关系表示和对偶性结果来实现的。这些结果解决了具有准运算符的网格的一般表示和对偶性问题,将琼森-塔尔斯基(Jónsson-Tarski)的 BAO 方法和邓恩(Dunn)的分布式广义伽罗瓦逻辑的后续方法扩展到了可以不假定分布性的上下文中。为了说明这一点,我们把这个框架应用于具有某种形式的(准)互补算子的网格(及其逻辑),为具有最小或伽罗瓦准互补的网格,或包括德摩根代数在内的渐开线网格,以及作为特例的正交网格和布尔代数,在关系框架和无选择对偶性中获得了对应结果和规范扩展。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Choice-Free Dualities for Lattice Expansions: Application to Logics with a Negation Operator

Constructive dualities have recently been proposed for some lattice-based algebras and a related project has been outlined by Holliday and Bezhanishvili, aiming at obtaining “choice-free spatial dualities for other classes of algebras [\(\ldots \)], giving rise to choice-free completeness proofs for non-classical logics”. We present in this article a way to complete the Holliday–Bezhanishvili project (uniformly, for any normal lattice expansion). This is done by recasting in a choice-free manner recent relational representation and duality results by the author. These results addressed the general representation and duality problem for lattices with quasi-operators, extending the Jónsson–Tarski approach for BAOs, and Dunn’s follow-up approach for distributive generalized Galois logics, to contexts where distributivity may not be assumed. To illustrate, we apply the framework to lattices (and their logics) with some form or other of a (quasi)complementation operator, obtaining correspondence results and canonical extensions in relational frames and choice-free dualities for lattices with a minimal, or a Galois quasi-complement, or involutive lattices, including De Morgan algebras, as well as Ortholattices and Boolean algebras, as special cases.

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来源期刊
Studia Logica
Studia Logica MATHEMATICS-LOGIC
CiteScore
1.70
自引率
14.30%
发文量
43
审稿时长
6-12 weeks
期刊介绍: The leading idea of Lvov-Warsaw School of Logic, Philosophy and Mathematics was to investigate philosophical problems by means of rigorous methods of mathematics. Evidence of the great success the School experienced is the fact that it has become generally recognized as Polish Style Logic. Today Polish Style Logic is no longer exclusively a Polish speciality. It is represented by numerous logicians, mathematicians and philosophers from research centers all over the world.
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