Litcius/Paper detail

Vector-Valued Graph Trend Filtering With Non-Convex Penalties

Rohan Varma, Harlin Lee, Jelena Kovačević, Yuejie Chi

2020IEEE Transactions on Signal and Information Processing over Networks36 citationsDOIOpen Access PDF

Abstract

This work studies the denoising of piecewise smooth graph signals that exhibit inhomogeneous levels of smoothness over a graph, where the value at each node can be vector-valued. We extend the graph trend filtering framework to denoising vector-valued graph signals with a family of non-convex regularizers, which exhibit superior recovery performance over existing convex regularizers. Using an oracle inequality, we establish the statistical error rates of first-order stationary points of the proposed non-convex method for generic graphs. Furthermore, we present an ADMM-based algorithm to solve the proposed method and establish its convergence. Numerical experiments are conducted on both synthetic and real-world data for denoising, support recovery, event detection, and semi-supervised classification.

Topics & Concepts

Noise reductionGraphPiecewiseRegular polygonMathematicsComputer scienceAlgorithmRate of convergenceMathematical optimizationArtificial intelligenceTheoretical computer scienceChannel (broadcasting)Computer networkGeometryMathematical analysisAdvanced Graph Neural NetworksComplex Network Analysis TechniquesBayesian Modeling and Causal Inference