Raymond Molzon scite author profile

Raymond Molzon

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Optimal-order bounds on the rate of convergence to normality in the multivariate delta method

Pinelis¹,

Molzon²

2016

Electron. J. Statist.

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Uniform and nonuniform Berry-Esseen (BE) bounds of optimal orders on the closeness to normality for general abstract nonlinear statistics are given, which are then used to obtain optimal bounds on the rate of convergence in the delta method for vector statistics. Specific applications to Pearson's, non-central Student's and Hotelling's statistics, sphericity test statistics, a regularized canonical correlation, and maximum likelihood estimators (MLEs) are given; all these uniform and nonuniform BE bounds appear to be the first known results of these kinds, except for uniform BE bounds for MLEs. When applied to the well-studied case of the central Student statistic, our general results compare well with known ones in that case, obtained previously by specialized methods. The proofs use a Stein-type method developed by Chen and Shao, a Cramér-type of tilt transform, exponential and Rosenthal-type inequalities for sums of random vectors established by Pinelis, Sakhanenko, and Utev, as well as a number of other, quite recent results motivated by this study. The method allows one to obtain bounds with explicit and rather moderate-size constants, at least as far as the uniform bounds are concerned. For instance, one has the uniform BE bound 3.61 E(Y 6 1 + Z 6 1 ) (1 + σ −3 )/ √ n for the Pearson sample correlation coefficient based on independent identically distributed random pairs

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Optimal-order bounds on the rate of convergence to normality in the multivariate delta method

Pinelis¹,

Molzon²

2009

Preprint

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Berry-Esseen bounds for nonlinear statistics, and asymptotic relative efficiency between correlation statistics

Molzon¹

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Raymond Molzon

Optimal-order bounds on the rate of convergence to normality in the multivariate delta method

Optimal-order bounds on the rate of convergence to normality in the multivariate delta method

Berry-Esseen bounds for nonlinear statistics, and asymptotic relative efficiency between correlation statistics

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