Abstract
Suppose \({\widehat{\theta}}\) is an estimator of θ in \({\mathbb{R}}\) that satisfies the central limit theorem. In general, inferences on θ are based on the central limit approximation. These have error O(n −1/2), where n is the sample size. Many unsuccessful attempts have been made at finding transformations which reduce this error to O(n −1). The variance stabilizing transformation fails to achieve this. We give alternative transformations that have bias O(n −2), and skewness O(n −3). Examples include the binomial, Poisson, chi-square and hypergeometric distributions.
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Withers, C.S., Nadarajah, S. Reduction of bias and skewness with applications to second order accuracy. Stat Methods Appl 20, 439–450 (2011). https://doi.org/10.1007/s10260-011-0167-y
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DOI: https://doi.org/10.1007/s10260-011-0167-y