Robust Sparse Estimation for Gaussians with Optimal Error under Huber Contamination

March 15, 2024 ยท Declared Dead ยท ๐Ÿ› International Conference on Machine Learning

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Authors Ilias Diakonikolas, Daniel M. Kane, Sushrut Karmalkar, Ankit Pensia, Thanasis Pittas arXiv ID 2403.10416 Category cs.LG: Machine Learning Cross-listed cs.DS, math.ST, stat.ML Citations 1 Venue International Conference on Machine Learning Last Checked 4 months ago
Abstract
We study Gaussian sparse estimation tasks in Huber's contamination model with a focus on mean estimation, PCA, and linear regression. For each of these tasks, we give the first sample and computationally efficient robust estimators with optimal error guarantees, within constant factors. All prior efficient algorithms for these tasks incur quantitatively suboptimal error. Concretely, for Gaussian robust $k$-sparse mean estimation on $\mathbb{R}^d$ with corruption rate $ฮต>0$, our algorithm has sample complexity $(k^2/ฮต^2)\mathrm{polylog}(d/ฮต)$, runs in sample polynomial time, and approximates the target mean within $\ell_2$-error $O(ฮต)$. Previous efficient algorithms inherently incur error $ฮฉ(ฮต\sqrt{\log(1/ฮต)})$. At the technical level, we develop a novel multidimensional filtering method in the sparse regime that may find other applications.
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