High-dimensional Gaussian and bootstrap approximations for robust means

Abstract

Recent years have witnessed much progress on Gaussian and bootstrap approximations to the distribution of sums of independent random vectors with dimension d large relative to the sample size n. However, for any number of moments m>2 that the summands may possess, there exist distributions such that these approximations break down if d grows faster than the polynomial barrier nm2-1. In this paper, we establish Gaussian and bootstrap approximations to the distributions of winsorized and trimmed means that allow d to grow at an exponential rate in n as long as m>2 moments exist. The approximations remain valid under some amount of adversarial contamination. Our implementations of the winsorized and trimmed means do not require knowledge of m. As a consequence, the approximation guarantees ``adapt'' to m.