On subreducts of subresiduated lattices and some related logics

IF 0.7 4区 数学 Q3 COMPUTER SCIENCE, THEORY & METHODS Journal of Logic and Computation Pub Date : 2024-07-23 DOI:10.1093/logcom/exad042
JosÉ Luis Castiglioni, Víctor FernÁndez, Héctor Federico Mallea, HernÁn Javier San MartÍn
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Abstract

Subresiduated lattices were introduced during the decade of 1970 by Epstein and Horn as an algebraic counterpart of some logics with strong implication previously studied by Lewy and Hacking. These logics are examples of subintuitionistic logics, i.e. logics in the language of intuitionistic logic that are defined semantically by using Kripke models, in the same way as intuitionistic logic is defined, but without requiring of the models some of the properties required in the intuitionistic case. Also in relation with the study of subintuitionistic logics, Celani and Jansana get these algebras as the elements of a subvariety of that of weak Heyting algebras. Here, we study both the implicative and the implicative-infimum subreducts of subresiduated lattices. Besides, we propose a calculus whose equivalent algebraic semantics is given by these classes of algebras. Several expansions of these calculi are also studied together with some interesting properties of them.
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论子残差网格的子残差和一些相关逻辑
亚残差格是爱泼斯坦和霍恩在 1970 年的十年间提出的,作为路易和哈金之前研究的一些强蕴涵逻辑的代数对应物。这些逻辑是亚直观逻辑的例子,即直观逻辑语言中的逻辑,它们通过使用克里普克模型进行语义定义,与直观逻辑的定义方式相同,但不要求模型具有直观逻辑所要求的某些性质。同样是关于亚直观逻辑的研究,塞拉尼和扬萨纳把这些代数当作弱海廷代数的一个子品种的元素。在这里,我们研究了亚残差格的蕴涵和蕴涵-最小子归结。此外,我们还提出了一种微积分,它的等价代数语义是由这些代数给出的。我们还研究了这些计算的若干扩展及其一些有趣的性质。
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来源期刊
Journal of Logic and Computation
Journal of Logic and Computation 工程技术-计算机:理论方法
CiteScore
1.90
自引率
14.30%
发文量
82
审稿时长
6-12 weeks
期刊介绍: Logic has found application in virtually all aspects of Information Technology, from software engineering and hardware to programming and artificial intelligence. Indeed, logic, artificial intelligence and theoretical computing are influencing each other to the extent that a new interdisciplinary area of Logic and Computation is emerging. The Journal of Logic and Computation aims to promote the growth of logic and computing, including, among others, the following areas of interest: Logical Systems, such as classical and non-classical logic, constructive logic, categorical logic, modal logic, type theory, feasible maths.... Logical issues in logic programming, knowledge-based systems and automated reasoning; logical issues in knowledge representation, such as non-monotonic reasoning and systems of knowledge and belief; logics and semantics of programming; specification and verification of programs and systems; applications of logic in hardware and VLSI, natural language, concurrent computation, planning, and databases. The bulk of the content is technical scientific papers, although letters, reviews, and discussions, as well as relevant conference reviews, are included.
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