Minimum Covariance Determinant-Based Quantile Robust Regression-Type Estimators for Mean Parameter

Shahzad, Usman; Al‐Noor, Nadia H.; Afshan, Noureen; Alilah, David Anekeya; Hanif, Muhammad; Anas, Malik Muhammad

doi:10.1155/2021/5255839

Cited by 6 publications

(6 citation statements)

References 41 publications

(30 reference statements)

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“…In a different vein, Rueda and Arcos [17] investigated population quantiles using exponentiation method. Shahzad et al [18]

and Shahzad et al [19]

introduced a robust estimation approach for the population mean using quantile regression within the framework of systematic sampling and robust covariance matrices, respectively. Lastly, Yadav and Prasad [20] , utilizing robust quantile regression methodologies

, examined exponential estimation methods in sampling theory.…”

Section: Introductionmentioning

confidence: 99%

Dual-type quantile regression approach for mean estimation incorporating sampled and non-sampled data

Alomair,

Iftikhar

2024

Heliyon

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“…In a different vein, Rueda and Arcos [17] investigated population quantiles using exponentiation method. Shahzad et al [18]

and Shahzad et al [19]

, examined exponential estimation methods in sampling theory.…”

Section: Introductionmentioning

confidence: 99%

Dual-type quantile regression approach for mean estimation incorporating sampled and non-sampled data

Alomair,

Iftikhar

2024

Heliyon

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“…Shahzad et al [31] proposed a robust estimation technique for the population mean utilizing quantile regression in the context of systematic sampling. Shahzad et al [32] proposed the utilization of quantile regression with minimum covariance determinant-based measures of the location to derive a class of quantile regression-type mean estimators.…”

Section: Introductionmentioning

confidence: 99%

A New Class of Quantile Regression Ratio-Type Estimators for Finite Population Mean in Stratified Random Sampling

Koç

2023

Axioms

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Quantile regression is one of the alternative regression techniques used when the assumptions of classical regression analysis are not met, and it estimates the values of the study variable in various quantiles of the distribution. This study proposes ratio-type estimators of a population mean using the information on quantile regression for stratified random sampling. The proposed ratio-type estimators are investigated with the help of the mean square error equations. Efficiency comparisons between the proposed estimators and classical estimators are presented in certain conditions. Under these obtained conditions, it is seen that the proposed estimators outperform the classical estimators. In addition, the theoretical results are supported by a real data application.

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“…Shahzad et al [17,18] proposed a group of robust regression estimators under a stratified and systematic random sampling framework using quantile regression. Taking a step further, Shahzad et al [19] harnessed the potential of quantile regression in conjunction with measures derived from the minimum covariance determinant to establish another group of estimators. By extending Shahzad et al's [17] work, Koc and Koc [20], and Yadav and Prasad [21] also provided regression-and exponential-type mean estimators using quantile regression coefficients.…”

Section: Introductionmentioning

confidence: 99%

“…Koc et al [40] merged auxiliary information with Poisson regression coefficients. So, taking motivation from relveant studies [15][16][17][18][19][20][21], the EWMA-based adapted quantile regression type mean estimators, i.e., (T zb q (0.25)…”

mentioning

confidence: 99%

Compromised-Imputation and EWMA-Based Memory-Type Mean Estimators Using Quantile Regression

Alomair,

Shahzad

2023

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Survey sampling commonly faces the challenge of missing information, prompting the development of various imputation-based mean estimation methods to address this concern. Among these, ratio-type regression estimators have been devised to compute population parameters using only current sample data. However, recent pioneering research has revolutionized this approach by integrating both past and current sample information through the application of exponentially weighted moving averages (EWMA). This groundbreaking methodology has given rise to the creation of memory-type estimators tailored for surveys conducted over time. In this paper, we present novel imputation-based memory-type mean estimators that leverage EWMA and quantile regression to handle missing observations. For the performance assessment between traditional, adapted and proposed estimators, real-life time-scaled datasets related to the stock market and humidity are considered. Furthermore, we conduct a simulation study using an asymmetric dataset to further validate the effectiveness of the introduced estimators. The humidity data results show that the proposed estimators (Tpq(0.25), Tpq(0.45), Tpq(0.25)′, Tpq(0.45)′, Tpq(0.25)″, Tpq(0.45)″) have the minimum MSE. The stock market data results show that the proposed estimators (Tpq(0.85), Tpq(0.85)′, Tpq(0.85)″) also have the minimum MSE. Additionally, the simulation results demonstrate that the proposed estimators (Tpq(0.45), Tpq(0.45)′, Tpq(0.45)″) have the minimum MSE when compared to traditional and adapted estimators. Therefore, in conclusion, the use of the proposed estimators is recommended over traditional and adapted ones.

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Minimum Covariance Determinant-Based Quantile Robust Regression-Type Estimators for Mean Parameter

Cited by 6 publications

References 41 publications

Dual-type quantile regression approach for mean estimation incorporating sampled and non-sampled data

Dual-type quantile regression approach for mean estimation incorporating sampled and non-sampled data

A New Class of Quantile Regression Ratio-Type Estimators for Finite Population Mean in Stratified Random Sampling

Compromised-Imputation and EWMA-Based Memory-Type Mean Estimators Using Quantile Regression

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