Robust confidence intervals for a proportion using ranked-set sampling
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Publication:2132040
DOI10.1007/S42952-020-00103-3OpenAlexW3118396782MaRDI QIDQ2132040
Publication date: 27 April 2022
Published in: Journal of the Korean Statistical Society (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/s42952-020-00103-3
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Cites Work
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- New imperfect rankings models for ranked set sampling
- Optimal rank set sampling estimates for a population proportion
- Ranked set sampling: its relevance and impact on statistical inference
- Improved exact confidence intervals for a proportion using ranked-set sampling
- Ranked set sampling: an approach to more efficient data collection
- Confidence curves and improved exact confidence intervals for discrete distributions
- Exact Inference for a Population Proportion Based on a Ranked Set Sample
- Confidence intervals for a population proportion based on a ranked set sample
- Distribution-free statistical intervals via ranked-set sampling
- Ranked Set Sampling Theory with Order Statistics Background
- Characterization of a Ranked-Set Sample with Application to Estimating Distribution Functions
- Nonparametric Two-Sample Procedures for Ranked-Set Samples Data
- The Effect of Imperfect Judgment Rankings on Properties of Procedures Based on the Ranked-Set Samples Analog of the Mann-Whitney-Wilcoxon Statistic
- A New Ranked Set Sample Estimator of Variance
- Testing perfect rankings in ranked‐set sampling with binary data
- On Estimating a Population Proportion via Ranked Set Sampling
- Nonparametric Tests for Perfect Judgment Rankings
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