Improved Concentration for Mean Estimators via Shrinkage

Abstract

We study a class of robust mean estimators μ obtained by adaptively shrinking the weights of sample points far from a base estimator . Given a data-dependent scaling factor α and a weighting function w:[0, ∞) [0,1], we let μ = + 1nΣi=1n(Xi - )w(α|Xi-|) . We prove that, under mild assumptions over w, these estimators achieve stronger concentration bounds than the base estimate , including sub-Gaussian guarantees. This framework unifies and extends several existing approaches to robust mean estimation in R. Through numerical experiments, we show that our shrinking approach translates to faster concentration, even for small sample sizes.

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