On Composing Finite Forests with Modal Logics

IF 0.7 4区 数学 Q3 COMPUTER SCIENCE, THEORY & METHODS
Bartosz Bednarczyk, Stephane Demri, Raul Fervari, Alessio Mansutti
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引用次数: 0

Abstract

We study the expressivity and complexity of two modal logics interpreted on finite forests and equipped with standard modalities to reason on submodels. The logic \(\mathsf {ML} ({\color{black}{{\vert\!\!\vert\!\vert}}})\) extends the modal logic K with the composition operator \({\color{black}{{\vert\!\!\vert\!\vert}}}\) from ambient logic whereas \(\mathsf {ML} (\mathbin {\ast })\) features the separating conjunction \(\mathbin {\ast }\) from separation logic. Both operators are second-order in nature. We show that \(\mathsf {ML} ({\color{black}{{\vert\!\!\vert\!\vert}}})\) is as expressive as the graded modal logic \(\mathsf {GML}\) (on trees) whereas \(\mathsf {ML} (\mathbin {\ast })\) is strictly less expressive than \(\mathsf {GML}\) . Moreover, we establish that the satisfiability problem is Tower-complete for \(\mathsf {ML} (\mathbin {\ast })\) , whereas it is (only) AExpPol-complete for \(\mathsf {ML} ({\color{black}{{\vert\!\!\vert\!\vert}}})\) , a result that is surprising given their relative expressivity. As by-products, we solve open problems related to sister logics such as static ambient logic and modal separation logic.
用模态逻辑构造有限森林
我们研究了在有限森林上解释的两个模态逻辑的表达性和复杂性,并配备了在子模型上推理的标准模态。逻辑\(\mathsf{ML}({\color{black}{{\vert\!\!\vert\!\vert}})\)用环境逻辑中的复合运算符\({\ color{black}{\vert \!\ vert\)扩展了模态逻辑K,而\(\math sf{ML}(\mathbin{\sast}))的特征是分离逻辑中的分离连词\(\mathibin{\ast})。这两个算子本质上都是二阶的。我们证明了\(\mathsf{ML}({\color{black}{{\vert\!\!\vert\!\vert}})\)与分级模态逻辑\(\mahsf{GML}\)(在树上)一样具有表达性,而\(\matsf{ML}(\mathbin{\ast}。此外,我们证明了可满足性问题对于\(\mathsf{ML}(\mathbin{\ast})\)是Tower完备的,而对于\(\ mathsf{ML}({\color{black}{\vert\!\!\vert\!\vert}}))\是(仅)AExpPol完备的,考虑到它们的相对表达性,这一结果令人惊讶。作为副产品,我们解决了与姐妹逻辑相关的开放问题,如静态环境逻辑和模态分离逻辑。
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来源期刊
ACM Transactions on Computational Logic
ACM Transactions on Computational Logic 工程技术-计算机:理论方法
CiteScore
2.30
自引率
0.00%
发文量
37
审稿时长
>12 weeks
期刊介绍: TOCL welcomes submissions related to all aspects of logic as it pertains to topics in computer science. This area has a great tradition in computer science. Several researchers who earned the ACM Turing award have also contributed to this field, namely Edgar Codd (relational database systems), Stephen Cook (complexity of logical theories), Edsger W. Dijkstra, Robert W. Floyd, Tony Hoare, Amir Pnueli, Dana Scott, Edmond M. Clarke, Allen E. Emerson, and Joseph Sifakis (program logics, program derivation and verification, programming languages semantics), Robin Milner (interactive theorem proving, concurrency calculi, and functional programming), and John McCarthy (functional programming and logics in AI). Logic continues to play an important role in computer science and has permeated several of its areas, including artificial intelligence, computational complexity, database systems, and programming languages. The Editorial Board of this journal seeks and hopes to attract high-quality submissions in all the above-mentioned areas of computational logic so that TOCL becomes the standard reference in the field. Both theoretical and applied papers are sought. Submissions showing novel use of logic in computer science are especially welcome.
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