Go to DBLP homepageDetecting Low Pass Graph Signals via Spectral Pattern: Sampling Complexity and Applications
Abstract: This paper proposes a blind detection problem for low pass graph signals. Without assuming knowledge of the exact graph topology, we aim to detect if a set of graph signal observations are generated from a low pass graph filter. Our problem is motivated by the widely adopted assumption of low pass (a.k.a. smooth) signals required by existing works in graph signal processing (GSP), as well as the longstanding problem of network dynamics identification. Focusing on detecting low pass graph signals on modular graphs whose cutoff frequency coincides with the number of clusters in the graph, we study and leverage the unique spectral pattern exhibited by such low pass graph signals to devise two detectors: one is based on Perron-Frobenius theorem, one is based on the K-means score. We analyze the sample complexity of these detectors considering the effects of graph filter's properties, random delays, and other parameters. We show novel applications of the blind detector on robustifying graph learning, identifying antagonistic ties in opinion dynamics, and detecting anomalies in power systems. Numerical experiments validate our findings.
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