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Learned Robust PCA: A Scalable Deep Unfolding Approach for High-Dimensional Outlier Detection

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arxiv 2110.05649 v1 pith:2N4ZTMCL submitted 2021-10-11 cs.LG cs.CVcs.ITcs.NAmath.ITmath.NA

Learned Robust PCA: A Scalable Deep Unfolding Approach for High-Dimensional Outlier Detection

classification cs.LG cs.CVcs.ITcs.NAmath.ITmath.NA
keywords lrpcarpcadeeplearnedrobustunfoldingapproachhigh-dimensional
verification ladder T0 review T1 audit T2 compute T3 formal T4 reserved
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Robust principal component analysis (RPCA) is a critical tool in modern machine learning, which detects outliers in the task of low-rank matrix reconstruction. In this paper, we propose a scalable and learnable non-convex approach for high-dimensional RPCA problems, which we call Learned Robust PCA (LRPCA). LRPCA is highly efficient, and its free parameters can be effectively learned to optimize via deep unfolding. Moreover, we extend deep unfolding from finite iterations to infinite iterations via a novel feedforward-recurrent-mixed neural network model. We establish the recovery guarantee of LRPCA under mild assumptions for RPCA. Numerical experiments show that LRPCA outperforms the state-of-the-art RPCA algorithms, such as ScaledGD and AltProj, on both synthetic datasets and real-world applications.

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  1. Robust Heteroskedastic Matrix Factorization: A Generalization of PCA that Flags Outliers and Handles Missing Data

    astro-ph.IM 2026-07 conditional novelty 5.0

    A robust, heteroskedastic matrix factorization method generalizes PCA to handle per-feature uncertainties, missing data, and outlier detection via Student-t likelihood iterative reweighting.