Efficient Integration of Multi-View Attributed Graphs for Clustering and Embedding

TL;DR

This paper introduces a spectrum-guided Laplacian aggregation scheme with two algorithms, SGLA and SGLA+, that effectively and efficiently integrate multi-view attributed graphs for improved clustering and embedding performance.

Contribution

The paper proposes a novel spectral aggregation framework and two algorithms that outperform existing methods in both quality and computational efficiency for multi-view attributed graph analysis.

Findings

SGLA and SGLA+ outperform 12 baselines in clustering and embedding tasks.

The methods are significantly faster, often by orders of magnitude.

Extensive experiments validate superior result quality and efficiency.

Abstract

A multi-view attributed graph (MVAG) G captures the diverse relationships and properties of real-world entities through multiple graph views and attribute views. Effectively utilizing all views in G is essential for MVAG clustering and embedding, which are important for applications like recommendation systems, anomaly detection, social network analysis, etc. Existing methods either achieve inferior result quality or incur significant computational costs to handle large-scale MVAGs. In this paper, we present a spectrum-guided Laplacian aggregation scheme with an effective objective formulation and two efficient algorithms SGLA and SGLA+, to cohesively integrate all views of G into an MVAG Laplacian matrix, which readily enables classic graph algorithms to handle G with superior performance in clustering and embedding tasks. We begin by conducting a theoretical analysis to design an integrated objective that consists of two components, the eigengap and connectivity objectives, aiming to link the spectral properties of the aggregated MVAG Laplacian with the underlying community and connectivity properties of G. A constrained optimization problem is then formulated for the integration, which is computationally expensive to solve. Thus, we first develop the SGLA algorithm, which already achieves excellent performance compared with existing methods. To further enhance efficiency, we design SGLA+ to reduce the number of costly objective evaluations via sampling and approximation to quickly find an approximate optimum. Extensive experiments compare our methods against 12 baselines for clustering and 8 baselines for embedding on 8 multi-view attributed graphs, validating the superior performance of SGLA and SGLA+ in terms of result quality and efficiency. Compared with the most effective baselines, our methods are significantly faster, often by up to orders of magnitude.