The Berry-Esseen Bound for High-dimensional Self-normalized Sums
classification
🧮 math.PR
math.STstat.TH
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boundhigh-dimensionalself-normalizedabsoluteberry-esseenstatisticsadvancementsapproximation
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This manuscript studies the Gaussian approximation of the coordinate-wise maximum of self-normalized statistics in high-dimensional settings. We derive an explicit Berry-Esseen bound under weak assumptions on the absolute moments. When the third absolute moment is finite, our bound scales as $\log^{5/4}(d)/n^{1/8}$ where $n$ is the sample size and $d$ is the dimension. Hence, our bound tends to zero as long as $\log(d)=o(n^{1/10})$. Our results on self-normalized statistics represent substantial advancements, as such a bound has not been previously available in the high-dimensional central limit theorem (CLT) literature.
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