Where First-Order and Monadic Second-Order Logic Coincide

Michael Elberfeld, Martin Grohe, Till Tantau
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引用次数: 4

Abstract

We study on which classes of graphs first-order logic (FO) and monadic second-order logic (MSO) have the same expressive power. We show that for each class of graphs that is closed under taking subgraphs, FO and MSO have the same expressive power on the class if, and only if, it has bounded tree depth. Tree depth is a graph invariant that measures the similarity of a graph to a star in a similar way that tree width measures the similarity of a graph to a tree. For classes just closed under taking induced subgraphs, we show an analogous result for guarded second-order logic (GSO), the variant of MSO that not only allows quantification over vertex sets but also over edge sets. A key tool in our proof is a Feferman-Vaught-type theorem that is constructive and still works for unbounded partitions.
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一阶逻辑和一元二阶逻辑在哪里重合
研究了哪一类图的一阶逻辑(FO)和一元二阶逻辑(MSO)具有相同的表达能力。我们证明了对于每一类对取子图封闭的图,当且仅当该类具有有界树深度时,FO和MSO在该类上具有相同的表达能力。树深度是一个图不变量,它测量图与星形的相似度,就像树宽度测量图与树的相似度一样。对于在取诱导子图下封闭的类,我们给出了保护二阶逻辑(GSO)的类似结果,保护二阶逻辑是MSO的变体,它不仅允许在顶点集上量化,而且允许在边集上量化。我们证明的一个关键工具是费曼-沃特型定理,它是建设性的,并且仍然适用于无界分区。
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LICS '22: 37th Annual ACM/IEEE Symposium on Logic in Computer Science, Haifa, Israel, August 2 - 5, 2022 LICS '20: 35th Annual ACM/IEEE Symposium on Logic in Computer Science, Saarbrücken, Germany, July 8-11, 2020 Local normal forms and their use in algorithmic meta theorems (Invited Talk) A short story of the CSP dichotomy conjecture LICS 2017 foreword
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