Multivariate mean estimation with direction-dependent accuracy

Abstract

We consider the problem of estimating the mean of a random vector based on N independent, identically distributed observations. We prove the existence of an estimator that has a near-optimal error in all directions in which the variance of the one dimensional marginal of the random vector is not too small: with probability 1-δ, the procedure returns μN which satisfies that for every direction u ∈ Sd-1, \[ ∈rμN - μ, u CN ( σ(u)(1/δ) + (\|X- X\|22)1/2 )~, \] where σ2(u) = (∈rX,u) and C is a constant. To achieve this, we require only slightly more than the existence of the covariance matrix, in the form of a certain moment-equivalence assumption. The proof relies on novel bounds for the ratio of empirical and true probabilities that hold uniformly over certain classes of random variables.