Axioms, Vol. 14, Pages 261: Robust Särndal-Type Mean Estimators with Re-Descending Coefficients

Axioms doi: 10.3390/axioms14040261

Authors:
Khudhayr A. Rashedi
Alanazi Talal Abdulrahman
Tariq S. Alshammari
Khalid M. K. Alshammari
Usman Shahzad
Javid Shabbir
Tahir Mehmood
Ishfaq Ahmad

When extreme values or outliers occur in asymmetric datasets, conventional mean estimation methods suffer from low accuracy and reliability. This study introduces a novel class of robust Särndal-type mean estimators utilizing re-descending M-estimator coefficients. These estimators effectively combine the benefits of robust regression techniques and the integration of extreme values to improve mean estimation accuracy under simple random sampling. The proposed methodology leverages distinct re-descending coefficients from prior studies. Performance evaluation is conducted using three real-world datasets and three synthetically generated datasets containing outliers, with results indicating superior performance of the proposed estimators in terms of mean squared error (MSE) and percentage relative efficiency (PRE). Hence, the robustness, adaptability, and practical importance of these estimators are illustrated by these findings for survey sampling and more generally for data-intensive contexts.

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Khudhayr A. Rashedi www.mdpi.com