A Robust Nonparametric Yeo- Johnson- Transformation- Based Confidence Interval for Quantiles of Skewed Distributions
Alatar, L., Abdelaty, F., Gaafar, M. (2024). A Robust Nonparametric Yeo- Johnson- Transformation- Based Confidence Interval for Quantiles of Skewed Distributions. EKB Journal Management System, 61(5), 157-176. doi: 10.21608/acj.2024.379184
Labiba Hassab Elnaby Alatar; Fatma Gaber Abdelaty; Mohammad Ibrahim Soliman Gaafar. "A Robust Nonparametric Yeo- Johnson- Transformation- Based Confidence Interval for Quantiles of Skewed Distributions". EKB Journal Management System, 61, 5, 2024, 157-176. doi: 10.21608/acj.2024.379184
Alatar, L., Abdelaty, F., Gaafar, M. (2024). 'A Robust Nonparametric Yeo- Johnson- Transformation- Based Confidence Interval for Quantiles of Skewed Distributions', EKB Journal Management System, 61(5), pp. 157-176. doi: 10.21608/acj.2024.379184
Alatar, L., Abdelaty, F., Gaafar, M. A Robust Nonparametric Yeo- Johnson- Transformation- Based Confidence Interval for Quantiles of Skewed Distributions. EKB Journal Management System, 2024; 61(5): 157-176. doi: 10.21608/acj.2024.379184

A Robust Nonparametric Yeo- Johnson- Transformation- Based Confidence Interval for Quantiles of Skewed Distributions

مجلة جامعة الإسکندرية للعلوم الإدارية
Article 5, Volume 61, Issue 5, September 2024, Page 157-176  XML PDF (4.45 MB)
Document Type: المقالة الأصلية
DOI: 10.21608/acj.2024.379184
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Authors
Labiba Hassab Elnaby Alatar1; Fatma Gaber Abdelaty2; Mohammad Ibrahim Soliman Gaafar3
1Assistant Professor at Department of Statistics Faculty of Business, Alexandria University
2Lecturer at Department of Statistics Faculty of Business, Alexandria University
3Lecturer at Department of Statistics Faculty of Business, Alexandria University
Abstract
The main goal of this paper is to introduce a new robust nonparametric confidence interval for population quantiles. To achieve this goal, a robustified version of an exact equal-tailed two-sided confidence interval for normal quantiles is first introduced. The proposed confidence interval uses the Yeo-Johnson family of power transformations to bring the data into approximate normality or at least symmetry. Calculating the robustified confidence interval using the transformed data then transforming back the lower and upper limits of the confidence interval, the new proposed robust nonparametric confidence interval for population quantile is obtained. Through a simulation study, the proposed confidence interval is evaluated and compared with some competitor existing confidence intervals. The criteria used to evaluate and compare the performance of confidence intervals are: the coverage probability (CP), the mean length of confidence intervals (ML), and the root mean squared deviations of confidence interval’s midpoints from the true population quantiles (RMSmdp) of the confidence intervals from the true population quantile. There are no sample size restrictions on the new proposed confidence interval. Simulation results show a significant outperformance of the proposed confidence interval compared to all other competitors under investigation.
Keywords
Robust Estimators; Nonparametric Confidence Intervals; Central and Intermediate Quantiles; Yeo-Johnson Family of Power Transformation; The Bi-weight Location and Scale Estimators; Siddiqui-Bloch-Gastwirth Estimator; Sectioning; Batching; Empirical Likelihood; Kernel Quantile Estimators; Fixed-smoothing Asymptotics
References
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