On Mean Estimation for Heteroscedastic Random Variables
Abstract
We study the problem of estimating the common mean μ of n independent symmetric random variables with different and unknown standard deviations σ1 σ2 ·s σn. We show that, under some mild regularity assumptions on the distribution, there is a fully adaptive estimator μ such that it is invariant to permutations of the elements of the sample and satisfies that, up to logarithmic factors, with high probability, \[ |μ - μ| \σm*, nΣi = nn σi-1 \~, \] where the index m* n satisfies m* ≈ σm*Σi = m*nσi-1.
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