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Robust Training in High Dimensions via Block Coordinate Geometric Median Descent

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arxiv 2106.08882 v1 pith:IPGX6TXR submitted 2021-06-16 cs.LG cs.DCmath.OCstat.ML

Robust Training in High Dimensions via Block Coordinate Geometric Median Descent

classification cs.LG cs.DCmath.OCstat.ML
keywords textscblockbreakdowndescentgeometricmedianpointproblems
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Geometric median (\textsc{Gm}) is a classical method in statistics for achieving a robust estimation of the uncorrupted data; under gross corruption, it achieves the optimal breakdown point of 0.5. However, its computational complexity makes it infeasible for robustifying stochastic gradient descent (SGD) for high-dimensional optimization problems. In this paper, we show that by applying \textsc{Gm} to only a judiciously chosen block of coordinates at a time and using a memory mechanism, one can retain the breakdown point of 0.5 for smooth non-convex problems, with non-asymptotic convergence rates comparable to the SGD with \textsc{Gm}.

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