Finite-sample properties of the trimmed mean

Abstract

The trimmed mean of n scalar random variables from a distribution P is the variant of the standard sample mean where the k smallest and k largest values in the sample are discarded for some parameter k. In this paper, we look at the finite-sample properties of the trimmed mean as an estimator for the mean of P. Assuming finite variance, we prove that the trimmed mean is ``sub-Gaussian'' in the sense of achieving Gaussian-type concentration around the mean. Under slightly stronger assumptions, we show the left and right tails of the trimmed mean satisfy a strong ratio-type approximation by the corresponding Gaussian tail, even for very small probabilities of the order e-nc for some c>0. In the more challenging setting of weaker moment assumptions and adversarial sample contamination, we prove that the trimmed mean is minimax-optimal up to constants.