Gradual Weisfeiler-Leman: Slow and Steady Wins the Race

Gradual Weisfeiler-Leman: Slow and Steady Wins the Race

Abstract

The classical Weisfeiler-Leman algorithm aka color refinement is fundamental for graph learning and central for successful graph kernels and graph neural networks. Originally developed for graph isomorphism testing, the algorithm iteratively refines vertex colors. On many datasets, the stable coloring is reached after a few iterations and the optimal number of iterations for machine learning tasks is typically even lower. This suggests that the colors diverge too fast, defining a similarity that is too coarse. We generalize the concept of color refinement and propose a framework for gradual neighborhood refinement, which allows a slower convergence to the stable coloring and thus provides a more fine-grained refinement hierarchy and vertex similarity. We assign new colors by clustering vertex neighborhoods, replacing the original injective color assignment function. Our approach is used to derive new variants of existing graph kernels and to approximate the graph edit distance via optimal assignments regarding vertex similarity. We show that in both tasks, our method outperforms the original color refinement with only moderate increase in running time advancing the state of the art.

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Authors
  • Bause, Franka
  • Kriege, Nils M.
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Shortfacts
Category
Technical Report (Working Paper)
Divisions
Data Mining and Machine Learning
Subjects
Kuenstliche Intelligenz
Publisher
CoRR arXiv
Date
19 September 2022
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