安全和共安全语言的一阶逻辑表征

IF 0.6 4区 数学 Q4 COMPUTER SCIENCE, THEORY & METHODS
Alessandro Cimatti, Luca Geatti, Nicola Gigante, Angelo Montanari, Stefano Tonetta
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引用次数: 0

摘要

线性时间逻辑(LTL)是最流行的时间逻辑之一,它在计算机科学的各个分支中发挥着重要作用。在其广泛使用的各种原因中,有其强大的基础性质:LTL相当于无反ω -自动机,无星形ω -正则表达式,并且(根据Kamp定理)相当于线性阶理论(FO-TLO)。安全和共同安全语言,其中一个有限的前缀足以分别确定一个单词是否属于该语言,在降低LTL的模型检查和反应性合成等问题的复杂性方面起着至关重要的作用。SafetyLTL(分别地。coSafetyLTL)是LTL的一个片段,其中只有通用的(相对于。(存在)的时间模式是允许的,它承认安全(尊重)。(共同安全)语言。本文的主要贡献是引入了FO-TLO的一个片段,称为SafetyFO,以及它的双coSafetyFO,它们相对于ltl可定义的安全和共同安全语言在表达上是完整的。我们证明了它们分别准确地表征了SafetyLTL和coSafetyLTL,这一结果与Kamp定理相结合,并提供了从一阶语言的角度更清晰地表征(片段)LTL的观点。此外,它还提供了一个直接的、紧凑的和自包含的证明,证明任何可以在LTL中定义的安全语言也可以在SafetyLTL中定义。作为一个副产品,我们得到了一些有趣的结果,关于SafetyLTL的弱明天算子的表达能力,在有限和无限的单词上解释。此外,我们证明了,当在有限的单词上解释时,SafetyLTL(相对于。coSafetyLTL)没有明天(代表)。,弱明天)操作员捕获安全(resp。有限字上的LTL片段。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
A first-order logic characterization of safety and co-safety languages
Linear Temporal Logic (LTL) is one of the most popular temporal logics, that comes into play in a variety of branches of computer science. Among the various reasons of its widespread use there are its strong foundational properties: LTL is equivalent to counter-free omega-automata, to star-free omega-regular expressions, and (by Kamp's theorem) to the First-Order Theory of Linear Orders (FO-TLO). Safety and co-safety languages, where a finite prefix suffices to establish whether a word does not belong or belongs to the language, respectively, play a crucial role in lowering the complexity of problems like model checking and reactive synthesis for LTL. SafetyLTL (resp., coSafetyLTL) is a fragment of LTL where only universal (resp., existential) temporal modalities are allowed, that recognises safety (resp., co-safety) languages only. The main contribution of this paper is the introduction of a fragment of FO-TLO, called SafetyFO, and of its dual coSafetyFO, which are expressively complete with respect to the LTL-definable safety and co-safety languages. We prove that they exactly characterize SafetyLTL and coSafetyLTL, respectively, a result that joins Kamp's theorem, and provides a clearer view of the characterization of (fragments of) LTL in terms of first-order languages. In addition, it gives a direct, compact, and self-contained proof that any safety language definable in LTL is definable in SafetyLTL as well. As a by-product, we obtain some interesting results on the expressive power of the weak tomorrow operator of SafetyLTL, interpreted over finite and infinite words. Moreover, we prove that, when interpreted over finite words, SafetyLTL (resp. coSafetyLTL) devoid of the tomorrow (resp., weak tomorrow) operator captures the safety (resp., co-safety) fragment of LTL over finite words.
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来源期刊
Logical Methods in Computer Science
Logical Methods in Computer Science 工程技术-计算机:理论方法
CiteScore
1.80
自引率
0.00%
发文量
105
审稿时长
6-12 weeks
期刊介绍: Logical Methods in Computer Science is a fully refereed, open access, free, electronic journal. It welcomes papers on theoretical and practical areas in computer science involving logical methods, taken in a broad sense; some particular areas within its scope are listed below. Papers are refereed in the traditional way, with two or more referees per paper. Copyright is retained by the author. Topics of Logical Methods in Computer Science: Algebraic methods Automata and logic Automated deduction Categorical models and logic Coalgebraic methods Computability and Logic Computer-aided verification Concurrency theory Constraint programming Cyber-physical systems Database theory Defeasible reasoning Domain theory Emerging topics: Computational systems in biology Emerging topics: Quantum computation and logic Finite model theory Formalized mathematics Functional programming and lambda calculus Inductive logic and learning Interactive proof checking Logic and algorithms Logic and complexity Logic and games Logic and probability Logic for knowledge representation Logic programming Logics of programs Modal and temporal logics Program analysis and type checking Program development and specification Proof complexity Real time and hybrid systems Reasoning about actions and planning Satisfiability Security Semantics of programming languages Term rewriting and equational logic Type theory and constructive mathematics.
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