Enhancing the efficiency of the ratio-type estimators of population variance with a blend of information on robust location measures

Naz, Farah; Abid, Muhammad; Nawaz, Tahir; Pang, Tianxiao

doi:10.24200/sci.2019.5633.1385

Cited by 13 publications

(13 citation statements)

References 26 publications

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“…Taking motivation from Shabbir and Gupta [17] and Naz, Abid, Nawaz and Pang [34] we have integrated the above mentioned non-conventional robust measures of dispersion to design a stable ratio product type exponential estimator of population variance defined as. : For Simplification, expanding Eqn.…”

Section: The Proposed Generalized Estimator Of Variancementioning

confidence: 99%

“…The use of these estimators is expanding to a variety of fields such as yield estimation in agriculture, demographic studies, environmental Recently, ratio-type estimators for estimation of population mean have been developed which incorporate auxiliary information on nonconventional measures [28][29][30][31][32]. These non-conventional measures are somewhat robust and outlier resistant which aids in stabilizing the mean square error of the estimators in presence of outliers [8,33,34]. Use of auxiliary information on non-conventional or robust measures for estimation of population variance is still a neglected area.…”

Section: Introductionmentioning

confidence: 99%

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A new improved class of ratio-product type exponential estimators of the population variance

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Several auxiliary information-based estimators of the population variance are available in the existing literature of survey sampling. Mostly, these estimators are based on conventional dispersion measures of the auxiliary variable. In this study, a generalized class of ratio-product type exponential estimators of the population variance is proposed which integrates the auxiliary information on non-conventional dispersion measures under simple random sampling in the ratio-type exponential class of estimators. The performance of the proposed estimators is compared, theoretically and numerically, with the several existing estimators of the population variance. It is established that the proposed class of estimators outperforms the existing estimators in terms of the lower mean square and relative root mean square errors. Moreover, the percentage relative efficiency of the proposed estimators is much higher as compared to their counterparts.

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Section: The Proposed Generalized Estimator Of Variancementioning

confidence: 99%

Section: Introductionmentioning

confidence: 99%

A new improved class of ratio-product type exponential estimators of the population variance

et al. 2020

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“…A major disadvantage related with the estimators proposed by Isaki [3], Upadhyaya and Singh [4], Kadilar and Cingi [5], Subramani and Kumarapandiyan [6][7][8][9] and Khan and Shabbir [10] is that these estimators lose their efficiency and performance ability in the presence of outliers (cf. Abid et al [25][26] and Naz et al [27]). In case of outliers, robust estimators are preferred and are of more practical use, because these estimators are not affected by the outliers.…”

Section: Introductionmentioning

confidence: 97%

An Improved and Robust Class of Variance Estimator

et al. 2020

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The ratio, product, and regression estimators are commonly constructed based on conventional measures such as mean, median, quartiles, semi-interquartile range, semiinterquartile average, coefficient of skewness, and coefficient of kurtosis. In case of the presence of outliers, these conventional measures lose their efficiency/performance ability and hence are of less efficient as compared to those measures which performed efficiently in the presence of outliers. This study offers an improved class of estimators for estimating the population variance using robust dispersion measures such as probability-weighted moments, Gini's, Downton's and Bickel and Lehmann measures of an auxiliary variable. Bias, mean square error, and minimum mean square error of the suggested class of estimators have been derived. Application with two natural data sets is also provided to explain the proposal for practical considerations. In addition, a robustness study is also carried out to evaluate the performance of the proposed estimators in the presence of outliers by using environmental protection data. The results reveal that the proposed estimators perform better than their competitors and are robust, not only in simple conditions but also in the presence of outliers.

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“…[11], Hanif and Shahzad [12] have developed some classes of estimators utilizing 2 supplementary information under simple random sampling scheme. However, for positive correlation, traditional regression-ratio-type estimator is better for the estimation of population parameters (see, e.g., Abid et al [13]; Irfan et al [14]; Naz et al [15], Abid et al [16]). Note that traditional regression-typeratio estimators based on conventional regression coefficient i.e.…”

Section: Introductionmentioning

confidence: 99%

Quantile regression-ratio-type estimators for mean estimation under complete and partial auxiliary information

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Traditional ordinary least square (OLS) regression is commonly utilized to develop regression-ratiotype estimators with traditional measures of location. Abid et al. [1] extended this idea and developed regression-ratio-type estimators with traditional and non-traditional measures of location. In this article, the quantile regression with traditional and non-traditional measures of location is utilized and a class of ratio type mean estimators are proposed. The theoretical mean square error (MSE) expressions are also derived. The work is also extended for two phase sampling (partial information). The pertinence of the proposed and existing group of estimators is shown by considering real data collections originating from different sources. The discoveries are empowering and prevalent execution of the proposed group of estimators is witnessed and documented throughout the article.

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Enhancing the efficiency of the ratio-type estimators of population variance with a blend of information on robust location measures

Cited by 13 publications

References 26 publications

A new improved class of ratio-product type exponential estimators of the population variance

A new improved class of ratio-product type exponential estimators of the population variance

An Improved and Robust Class of Variance Estimator

Quantile regression-ratio-type estimators for mean estimation under complete and partial auxiliary information

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