On Weisfeiler-Leman invariance: Subgraph counts and related graph properties

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The k-dimensional Weisfeiler-Leman algorithm (k-WL) is a fruitful approach to the Graph Isomorphism problem. 2-WL corresponds to the original algorithm suggested by Weisfeiler and Leman over 50 years ago. 1-WL is the classical color refinement routine. Indistinguishability by k-WL is an equivalence relation on graphs that is of fundamental importance for isomorphism testing, descriptive complexity theory, and graph similarity testing which is also of some relevance in artificial intelligence. Focusing on dimensions k=1,2, we investigate subgraph patterns whose counts are k-WL invariant, and whose occurrence is k-WL invariant. We achieve a complete description of all such patterns for dimension k=1 and considerably extend the previous results known for k=2.

论文关键词:Isomorphism and similarity of graphs,Weisfeiler-Leman algorithm,Subgraph counts

论文评审过程:Received 29 November 2019, Revised 3 April 2020, Accepted 20 April 2020, Available online 6 May 2020, Version of Record 12 May 2020.

论文官网地址:https://doi.org/10.1016/j.jcss.2020.04.003