Bayesian Confidence Interval for the Ratio of Marginal Probabilities in the Matched-Pair Design |
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| Authors: | Lei Shi Peng Bai |
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| Affiliation: | 1. Statistics and Mathematics School , Yunnan University of Finance and Economics , Kunming, P.R. China shi_lei65@ hotmail.com;3. Statistics and Mathematics School , Yunnan University of Finance and Economics , Kunming, P.R. China |
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| Abstract: | This article studies the construction of a Bayesian confidence interval for the ratio of marginal probabilities in matched-pair designs. Under a Dirichlet prior distribution, the exact posterior distribution of the ratio is derived. The tail confidence interval and the highest posterior density (HPD) interval are studied, and their frequentist performances are investigated by simulation in terms of mean coverage probability and mean expected length of the interval. An advantage of Bayesian confidence interval is that it is always well defined for any data structure and has shorter mean expected width. We also find that the Bayesian tail interval at Jeffreys prior performs as well as or better than the frequentist confidence intervals. |
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| Keywords: | Bayesian analysis Confidence interval Dirichlet prior Matched-pair design Ratio |
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