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Central limit theorem and bootstrap approximation in high dimensions: Near 1/n rates via implicit smoothing

Miles E. Lopes

2022The Annals of Statistics15 citationsDOI

Abstract

Nonasymptotic bounds for Gaussian and bootstrap approximation have recently attracted significant interest in high-dimensional statistics. This paper studies Berry–Esseen bounds for such approximations with respect to the multivariate Kolmogorov distance, in the context of a sum of n random vectors that are p-dimensional and i.i.d. Up to now, a growing line of work has established bounds with mild logarithmic dependence on p. However, the problem of developing corresponding bounds with near n−1/2 dependence on n has remained largely unresolved. Within the setting of random vectors that have sub-Gaussian or subexponential entries, this paper establishes bounds with near n−1/2 dependence, for both Gaussian and bootstrap approximation. In addition, the proofs are considerably distinct from other recent approaches, and make use of an “implicit smoothing” operation in the Lindeberg interpolation.

Topics & Concepts

MathematicsCentral limit theoremStein's methodGaussianSmoothingInterpolation (computer graphics)LogarithmUnivariateCombinatoricsLimit (mathematics)Applied mathematicsContext (archaeology)Gaussian random fieldDiscrete mathematicsGaussian processMultivariate statisticsMathematical analysisStatisticsPaleontologyMetric spaceQuantum mechanicsIntrinsic metricConvex metric spaceAnimationComputer scienceComputer graphics (images)BiologyPhysicsBayesian Methods and Mixture ModelsStatistical Methods and InferenceMarkov Chains and Monte Carlo Methods
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