Advances and Applications in Statistics

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EFFICIENCY OF LOGARITHMIC RATIO CUM LOGARITHMIC PRODUCT ESTIMATORS IN DOUBLE SAMPLING USING IMPUTATION TECHNIQUES

Authors

  • Bhargob Gohain
  • Jyotishman Das
  • Deepjan Gohain
  • B. K. Singh

Keywords:

missing data, bias, mean squared error (MSE), two-phase sampling, ratio, product, large sample approximation, simple random sampling

DOI:

https://doi.org/10.17654/0972361725003

Abstract

In literature, there are many estimators of finite population mean, some of which are superior to the others. In practical situations, all the information on sample units may not be available due to non-response in sample surveys. Thus, our objective in this study is to get more precise estimators of the finite population mean of the study variable under two-phase sampling in case of missing data. Three new logarithmic ratio cum logarithmic product type imputation methods and corresponding point estimators have been introduced and observed to be better under two-phase sampling, which adds contribution to the field of imputation techniques. The bias and mean square errors of the proposed estimators are calculated in terms of population parameters. The performance of the proposed estimators is compared theoretically and empirically as well with existing traditional estimators.

Received: March 20, 2024
Revised: September 7, 2024
Accepted: October 4, 2024

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Published

05-11-2024

Issue

Vol. 92 No. 1 (2025)

Section

Articles

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How to Cite

EFFICIENCY OF LOGARITHMIC RATIO CUM LOGARITHMIC PRODUCT ESTIMATORS IN DOUBLE SAMPLING USING IMPUTATION TECHNIQUES. (2024). Advances and Applications in Statistics , 92(1), 55-76. https://doi.org/10.17654/0972361725003

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