Abstract
We provide an estimator of the covariance matrix that achieves the optimal rate of convergence (up to constant factors) in the operator norm under two standard notions of data contamination. We allow the adversary to corrupt an \eta -fraction of the sample arbitrarily, while the distribution of the remaining data points only satisfies that the L_{p} -marginal moment with some p \ge 4 is equivalent to the corresponding L_{2} -marginal moment. Despite requiring the existence of only a few moments of the distribution, our estimator achieves the same tail estimates as if the underlying distribution were Gaussian. As a part of our analysis, we prove a non-asymptotic, dimension-free Bai–Yin type theorem in the regime p > 4 .
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