Bootstrap Lower Confidence Limits of Superstructure Process Capability Indices for Esscher-Transformed Laplace Distribution

Q3 Mathematics

Stochastics and Quality Control Pub Date : 2017-01-01 DOI:10.1515/eqc-2017-0010

Sebastian George, Ajitha Sasi

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引用次数: 0

Abstract

Abstract This article is a comparative study between the parametric asymptotic lower confidence limits and bootstrap lower confidence limits for the basic quantile based process capability indices based on the unified super-structure C N p ⁢ ( u , v ) {C_{N_{p}}(u,v)} when the distribution of the quality characteristic follows an asymmetric non-normal distribution. We illustrate this method when the distribution of the quality characteristic is a member of the family of Esscher-transformed Laplace models introduced by S. George and D. George [11]. We obtain the bias corrected and accelerated (BCa) bootstrap confidence intervals of C N p ⁢ ( u , v ) {C_{N_{p}}(u,v)} , which provide lower confidence intervals with coverage probability nearer to the nominal value compared to the asymptotic confidence intervals. We conclude that for asymmetric and peaked processes, the BCa confidence interval is a better alternative compared to the usual confidence intervals under the assumption that the quality characteristic follows a Gaussian type distribution. Numerical examples are given based on some real data.

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esscher -变换拉普拉斯分布下上层建筑过程能力指标的自举下限

摘要本文比较研究了基于统一超结构C N p _ (u,v) {C_{N_{p}}(u,v)}的质量特性服从非对称非正态分布时，基于基本分位数的过程能力指标的参数渐近置信下限与自举置信下限。当质量特征的分布是S. George和D. George[11]引入的esscher变换拉普拉斯模型族的成员时，我们说明了这种方法。我们得到了C N p _ (u,v) {C_{N_{p}}(u,v)}的偏差校正和加速(BCa)自助置信区间，与渐近置信区间相比，它提供了更低的置信区间，覆盖概率更接近标称值。我们得出结论，对于非对称和峰值过程，在质量特征遵循高斯型分布的假设下，与通常的置信区间相比，BCa置信区间是更好的选择。根据实际数据给出了数值算例。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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来源期刊

Stochastics and Quality Control Mathematics-Discrete Mathematics and Combinatorics

CiteScore

1.10

自引率

0.00%

发文量