Two-stage sampling for estimating the mean of a negative binomial distribution
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Publication:3753340
DOI10.1080/07474948508836069zbMath0612.62114OpenAlexW1992977145MaRDI QIDQ3753340
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Publication date: 1985
Published in: Sequential Analysis (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1080/07474948508836069
meannegative binomial distributioncoefficient of variationproportional closenessconfidence intervals of prescribed accuracytwo-stage sampling techniques
Related Items (7)
Purely sequential bounded-risk point estimation of the negative binomial means under various loss functions: Multi-sample problems ⋮ Sequential negative binomial problems and statistical ecology: a selected review with new directions ⋮ Purely Sequential and Two-Stage Fixed-Accuracy Confidence Interval Estimation Methods for Count Data from Negative Binomial Distributions in Statistical Ecology: One-Sample and Two-Sample Problems ⋮ Distributions of Sequential and Two-Stage Stopping Times for Fixed-Width Confidence Intervals in Bernoulli Trials: Application in Reliability ⋮ Two-Stage Estimation of Mean in a Negative Binomial Distribution with Applications to Mexican Bean Beetle Data ⋮ Purely sequential bounded-risk point estimation of the negative binomial mean under various loss functions: one-sample problem ⋮ Exact Risks of Sequential Point Estimators of the Exponential Parameter
Cites Work
- Unnamed Item
- A consistent and asymptotically efficient two-stage procedure to construct fixed width confidence intervals for the mean
- Sequential estimation of the mean of the negative binomial distribution
- Stein's two-stage procedure and exact consistency
- An Extension of a Theorem of Chow and Robbins on Sequential Confidence Intervals for the Mean
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