Expansions about the Gamma for the Distribution and Quantiles of a Standard Estimate |
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| Authors: | Christopher S. Withers Saralees Nadarajah |
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| Affiliation: | 1. Applied Mathematics Group, Industrial Research Limited, Lower Hutt, New Zealand
2. School of Mathematics, University of Manchester, Manchester, M13 9PL, UK
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| Abstract: | We give expansions for the distribution, density, and quantiles of an estimate, building on results of Cornish, Fisher, Hill, Davis and the authors. The estimate is assumed to be non-lattice with the standard expansions for its cumulants. By expanding about a skew variable with matched skewness, one can drastically reduce the number of terms needed for a given level of accuracy. The building blocks generalize the Hermite polynomials. We demonstrate with expansions about the gamma. |
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