Hájek的BL和psBL的非联想概括的公理化

Q1 Arts and Humanities

Journal of Applied Non-Classical Logics Pub Date : 2020-01-02 DOI:10.1080/11663081.2019.1703468

Y. Petrukhin

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引用次数: 1

摘要

摘要本文考虑Hájek逻辑BL和psBL的非关联推广。正如Cignoli、Esteva、Godo和Torrens所证明的，前者是连续t模及其残差的逻辑。Botur引入了逻辑naBL，即非结合连续t模及其残差的逻辑。因此，naBL可以看作是BL的非联想泛化。然而，Botur并没有提出naBL的公理化。我们通过为naBL构造一个适当的hilbert式演算来填补这一空白。虽然Flondor, Georgescu和Iorgulescu证明了不存在非交换的连续t-范数，但Hájek的psBL可以看作是BL的非交换推广。我们给出了psnaBL-代数的逻辑psnaBL，它可以看作是naBL的非交换泛化、psBL的非关联泛化和BL的非交换和非关联泛化。

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Axiomatization of non-associative generalisations of Hájek's BL and psBL

ABSTRACT In this paper, we consider non-associative generalisations of Hájek's logics BL and psBL. As it was shown by Cignoli, Esteva, Godo, and Torrens, the former is the logic of continuous t-norms and their residua. Botur introduced logic naBL which is the logic of non-associative continuous t-norms and their residua. Thus, naBL can be viewed as a non-associative generalisation of BL. However, Botur has not presented axiomatization of naBL. We fill this gap by constructing an adequate Hilbert-style calculus for naBL. Although, as was shown by Flondor, Georgescu, and Iorgulescu, there are no non-commutative continuous t-norms, Hájek's psBL can be viewed as BL's non-commutative generalisation. We present the logic psnaBL of psnaBL-algebras which can be viewed as naBL's non-commutative generalisation as well as psBL's non-associative generalisation and BL's both non-commutative and non-associative generalisation.

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来源期刊

Journal of Applied Non-Classical Logics Arts and Humanities-Philosophy

CiteScore

1.30

自引率

0.00%

发文量