Where First-Order and Monadic Second-Order Logic Coincide

Michael Elberfeld, Martin Grohe, Till Tantau

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.
Original languageEnglish
Pages265-274
Number of pages10
DOIs
Publication statusPublished - 23.08.2012
Event2012 27th Annual IEEE Symposium on Logic in Computer Science - Dubrovnik, Croatia
Duration: 25.06.201228.06.2012

Conference

Conference2012 27th Annual IEEE Symposium on Logic in Computer Science
Country/TerritoryCroatia
CityDubrovnik
Period25.06.1228.06.12

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