Approximate Bayesianity of Frequentist Confidence Intervals for a Binomial Proportion
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Publication:5885446
DOI10.1080/00031305.2016.1208630OpenAlexW2499174651MaRDI QIDQ5885446
Rolf Larsson, Måns Thulin, Shaobo Jin
Publication date: 3 April 2023
Published in: The American Statistician (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1080/00031305.2016.1208630
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Cites Work
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- The cost of using exact confidence intervals for a binomial proportion
- Decision-theoretic justifications for Bayesian hypothesis testing using credible sets
- An improved confidence interval for a linear function of binomial proportions
- Goodness-of-fit statistics for discrete multivariate data
- Probability matching priors: Higher order asymptotics
- Interval estimation for a binomial proportion. (With comments and a rejoinder).
- One-sided confidence intervals in discrete distributions
- Confidence intervals for a binomial proportion and asymptotic expansions
- Neutral noninformative and informative conjugate beta and gamma prior distributions
- Higher-order approximations for interval estimation in binomial settings
- Simple and Effective Confidence Intervals for Proportions and Differences of Proportions Result from Adding Two Successes and Two Failures
- The optimal method to make inferences about a linear combination of proportions
- Posterior predictive arguments in favor of the Bayes-Laplace prior as the consensus prior for binomial and multinomial parameters
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