Kleene代数、正则语言和子结构逻辑

International Symposium on Games, Automata, Logics and Formal Verification Pub Date : 2014-08-25 DOI:10.4204/EPTCS.161.7

C. Wurm

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引用次数: 5

摘要

我们引入了两个子结构命题逻辑KL、KL+，它们使用了析取、融合和一元(拟)指数连接。对于二者，我们证明了Kleene代数解释及其变体的强完备性。我们还证明了语言模型的强完备性，其中每个逻辑都有不同的解释。我们证明了这两种逻辑的割规则都是允许的，并且两者都有一个可判定的推论关系。

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Kleene Algebras, Regular Languages and Substructural Logics

We introduce the two substructural propositional logics KL, KL+, which use disjunction, fusion and a unary, (quasi-)exponential connective. For both we prove strong completeness with respect to the interpretation in Kleene algebras and a variant thereof. We also prove strong completeness for language models, where each logic comes with a different interpretation. We show that for both logics the cut rule is admissible and both have a decidable consequence relation.

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International Symposium on Games, Automata, Logics and Formal Verification

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