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Robust Principal Component Analysis: A Median of Means Approach

Debolina Paul, Saptarshi Chakraborty, Swagatam Das

2023IEEE Transactions on Neural Networks and Learning Systems15 citationsDOI

Abstract

Principal component analysis (PCA) is a fundamental tool for data visualization, denoising, and dimensionality reduction. It is widely popular in statistics, machine learning, computer vision, and related fields. However, PCA is well-known to fall prey to outliers and often fails to detect the true underlying low-dimensional structure within the dataset. Following the Median of Means (MoM) philosophy, recent supervised learning methods have shown great success in dealing with outlying observations without much compromise to their large sample theoretical properties. This article proposes a PCA procedure based on the MoM principle. Called the MoMPCA, the proposed method is not only computationally appealing but also achieves optimal convergence rates under minimal assumptions. In particular, we explore the nonasymptotic error bounds of the obtained solution via the aid of the Rademacher complexities while granting absolutely no assumption on the outlying observations. The derived concentration results are not dependent on the dimension because the analysis is conducted in a separable Hilbert space, and the results only depend on the fourth moment of the underlying distribution in the corresponding norm. The proposal's efficacy is also thoroughly showcased through simulations and real data applications.

Topics & Concepts

Principal component analysisOutlierDimensionality reductionCurse of dimensionalityComputer scienceArtificial intelligenceSeparable spaceMoment (physics)Robust principal component analysisMathematicsSparse PCADimension (graph theory)Pattern recognition (psychology)AlgorithmApplied mathematicsClassical mechanicsMathematical analysisPhysicsPure mathematicsSparse and Compressive Sensing TechniquesAdvanced Statistical Methods and ModelsFace and Expression Recognition