前半纳尔逊代数上的非常真算子

Pub Date : 2024-05-03 DOI:10.1007/s11225-024-10109-1
Shokoofeh Ghorbani
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引用次数: 0

摘要

在本文中,我们将非常真算子的概念用于前半-尼尔逊代数,并研究了非常真前半-尼尔逊代数的性质。我们研究了非常真 N 演绎系统,并利用它们建立了非常真前半纳尔逊代数的统一结构。我们获得了这一拓扑的一些性质。最后,我们构建了相应的具有强否定的非常真半直觉逻辑,并基于非常真半纳尔逊数组证明了该逻辑的可代数性。
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Very True Operators on Pre-semi-Nelson Algebras

In this paper, we use the concept of very true operator to pre-semi-Nelson algebras and investigate the properties of very true pre-semi-Nelson algebras. We study the very true N-deductive systems and use them to establish the uniform structure on very true pre-semi-Nelson algebras. We obtain some properties of this topology. Finally, the corresponding logic very true semi-intuitionistic logic with strong negation is constructed and algebraizable of this logic is proved based on very true semi-Nelson algebras.

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