Constructing quantile confidence intervals using extended simple random sample in finite populations |
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Authors: | Omer Ozturk Narayanaswamy Balakrishnan |
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Affiliation: | 1. Department of Statistics, The Ohio State University, Columbus, OH, USA;2. Department of Mathematics and Statistics, MacMaster University, Hamilton, ON, Canada |
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Abstract: | This paper constructs quantile confidence intervals based on extended simple random sample (SRS) from a finite population, where ranks of population units are all known. Extended simple random sample borrows additional information from unmeasured observations in the population by conditioning on the population ranks of the measured units in SRS. The confidence intervals are improved using Rao-Blackwell theorem over the conditional distribution of sample ranks given the measured sample units. Empirical evidence shows that the proposed confidence intervals have shorter lengths than confidence intervals constructed from an SRS sample. |
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Keywords: | Rao-Blackwell theorem inner quantiles outer quantiles ranked set sample judgment post stratified sample |
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