On a Generalization of Heyting Algebras II

Amirhossein Akbar Tabatabai, Majid Alizadeh, Masoud Memarzadeh
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Abstract

A $\nabla$-algebra is a natural generalization of a Heyting algebra, unifying several algebraic structures, including bounded lattices, Heyting algebras, temporal Heyting algebras, and the algebraic representation of dynamic topological systems. In the prequel to this paper [3], we explored the algebraic properties of various varieties of $\nabla$-algebras, their subdirectly-irreducible and simple elements, their closure under Dedekind-MacNeille completion, and their Kripke-style representation. In this sequel, we first introduce $\nabla$-spaces as a common generalization of Priestley and Esakia spaces, through which we develop a duality theory for certain categories of $\nabla$-algebras. Then, we reframe these dualities in terms of spectral spaces and provide an algebraic characterization of natural families of dynamic topological systems over Priestley, Esakia, and spectral spaces. Additionally, we present a ring-theoretic representation for some families of $\nabla$-algebras. Finally, we introduce several logical systems to capture different varieties of $\nabla$-algebras, offering their algebraic, Kripke, topological, and ring-theoretic semantics, and establish a deductive interpolation theorem for some of these systems.
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论海廷代数的广义化 II
$\nabla$-代数是海廷代数的自然广义化,它统一了多种代数结构,包括有界网格、海廷代数、时态海廷代数以及动态拓扑系统的代数表示。在本文的前传[3]中,我们探讨了$\nabla$-gebras的各种代数性质、它们的次直接不可约元素和简单元素、它们在Dedekind-MacNeille完成下的闭包以及它们的克里普克式表示。在这个续篇中,我们首先介绍了$\nabla$空间作为普里斯特里空间和埃萨基亚空间的普通泛化,通过它我们发展了$\nabla$-gebras的某些类别的对偶理论。然后,我们用谱空间来重构这些对偶性,并提供了普里斯特里、埃萨基亚和谱空间上动态拓扑系统自然族的代数特征。此外,我们还提出了一些 $\nabla$- 算法族的环论表示。最后,我们引入了几个逻辑系统来捕捉不同种类的$\nabla$-gebras,提供了它们的代数、克里普克、拓扑和环论语义,并为其中一些系统建立了演绎插值定理。
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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