德摩根格的逆逻辑

Pub Date : 2023-07-31 DOI:10.1002/malq.202100076
Adam Přenosil
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引用次数: 1

摘要

研究了由指定值的上闭集的De Morgan格构成的矩阵所决定的逻辑,如给定有限布尔代数中的不假保存逻辑和四元子直接不可约De Morgan格中的Shramko的不假保存逻辑。研究这些逻辑的关键工具是n滤波器的格理论概念。我们研究了De Morgan格上的所有(完全、一致和经典)n-滤波器的逻辑,它们是Belnap和Dunn的四值逻辑(Priest和Kleene的三值逻辑以及经典逻辑)的非辅助推广。然后,我们展示了如何找到由有限De Morgan格的有限素数逆集决定的任何逻辑的有限hilbert式公理化和由有限De Morgan格上的有限滤子族决定的任何逻辑的有限根曾式公理化。作为一个应用,我们公理化了Shramko的逻辑,除了假。
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Logics of upsets of De Morgan lattices

We study logics determined by matrices consisting of a De Morgan lattice with an upward closed set of designated values, such as the logic of non-falsity preservation in a given finite Boolean algebra and Shramko's logic of non-falsity preservation in the four-element subdirectly irreducible De Morgan lattice. The key tool in the study of these logics is the lattice-theoretic notion of an n-filter. We study the logics of all (complete, consistent, and classical) n-filters on De Morgan lattices, which are non-adjunctive generalizations of the four-valued logic of Belnap and Dunn (of the three-valued logics of Priest and Kleene, and of classical logic). We then show how to find a finite Hilbert-style axiomatization of any logic determined by a finite family of prime upsets of finite De Morgan lattices and a finite Gentzen-style axiomatization of any logic determined by a finite family of filters on finite De Morgan lattices. As an application, we axiomatize Shramko's logic of anything but falsehood.

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