Mixed-Order Spectral Clustering for Networks
This work addresses the problem of clustering complex networks more effectively for researchers and practitioners by integrating multiple structural orders, though it is incremental as it builds on existing spectral clustering extensions.
The paper tackled the limitation of spectral clustering methods that consider only single-order structures by proposing Mixed-Order Spectral Clustering (MOSC) to model both second-order and third-order structures simultaneously, resulting in superior performance over existing methods on real-world networks.
Clustering is fundamental for gaining insights from complex networks, and spectral clustering (SC) is a popular approach. Conventional SC focuses on second-order structures (e.g., edges connecting two nodes) without direct consideration of higher-order structures (e.g., triangles and cliques). This has motivated SC extensions that directly consider higher-order structures. However, both approaches are limited to considering a single order. This paper proposes a new Mixed-Order Spectral Clustering (MOSC) approach to model both second-order and third-order structures simultaneously, with two MOSC methods developed based on Graph Laplacian (GL) and Random Walks (RW). MOSC-GL combines edge and triangle adjacency matrices, with theoretical performance guarantee. MOSC-RW combines first-order and second-order random walks for a probabilistic interpretation. We automatically determine the mixing parameter based on cut criteria or triangle density, and construct new structure-aware error metrics for performance evaluation. Experiments on real-world networks show 1) the superior performance of two MOSC methods over existing SC methods, 2) the effectiveness of the mixing parameter determination strategy, and 3) insights offered by the structure-aware error metrics.