Scalable kernels for graphs with continuous attributes

Feragen, Aasa, Kasenburg, Niklas, Petersen, Jens, Bruijne, Marleen de, Borgwardt, Karsten

Neural Information Processing Systems 

While graphs with continuous node attributes arise in many applications, state-of-the-art graph kernels for comparing continuous-attributed graphs suffer from a high runtime complexity; for instance, the popular shortest path kernel scales as $\mathcal{O}(n^4)$, where $n$ is the number of nodes. In this paper, we present a class of path kernels with computational complexity $\mathcal{O}(n^2 (m + \delta^2))$, where $\delta$ is the graph diameter and $m$ the number of edges. Due to the sparsity and small diameter of real-world graphs, these kernels scale comfortably to large graphs. In our experiments, the presented kernels outperform state-of-the-art kernels in terms of speed and accuracy on classification benchmark datasets.

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