Publicação

Robust Hybrid Exponential–logarithmic Mean Estimators in the Presence of Outliers under Ranked Set Sampling: Accepted May 2026

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Detalhes bibliográficos
Resumo:This study proposes a robust class of hybrid exponential-logarithmic estimators for population mean estimation under ranked set sampling in the presence of outliers and ranking errors. The estimators integrate robust regression methods, including Huber-M, Huber-MM, Hampel-M, Tukey-M, least trimmed squares, and least median of squares to improve resistance to contamination. The bias and mean square error (MSE) expressions of the proposed estimators are derived analytically. Simulation and real-data results show that the proposed estimators outperform existing adapted estimators by achieving lower MSE and greater robustness for both symmetric and asymmetric populations, making them more reliable for practical surveys.
Autores principais:Kumar , Anoop
Outros Autores:Kumari, Renu; english, english
Assunto:ranked set sampling robust regression methods mean square error outliers
Ano:2026
País:Portugal
Tipo de documento:artigo
Tipo de acesso:unknown
Instituição associada:Instituto Nacional de Estatística
Idioma:inglês
Origem:REVSTAT-Statistical Journal
Descrição
Resumo:This study proposes a robust class of hybrid exponential-logarithmic estimators for population mean estimation under ranked set sampling in the presence of outliers and ranking errors. The estimators integrate robust regression methods, including Huber-M, Huber-MM, Hampel-M, Tukey-M, least trimmed squares, and least median of squares to improve resistance to contamination. The bias and mean square error (MSE) expressions of the proposed estimators are derived analytically. Simulation and real-data results show that the proposed estimators outperform existing adapted estimators by achieving lower MSE and greater robustness for both symmetric and asymmetric populations, making them more reliable for practical surveys.