Previous article Next article A Bayesian Approach to the Problem of Ranking Binomial ProbabilitiesR. P. Bland and T. L. BratcherR. P. Bland and T. L. Bratcherhttps://doi.org/10.1137/0116068PDFBibTexSections ToolsAdd to favoritesExport CitationTrack CitationsEmail SectionsAbout[1] David B. Duncan, Bayes rules for a common multiple comparisons problem and related Student-t problems, Ann. Math. Statist., 32 (1961), 1013–1033 MR0130741 0114.11103 CrossrefISIGoogle Scholar[2] David B. Duncan, A Bayesian approach to multiple comparisons, Technometries, 7 (1965), 171–222 0133.12203 CrossrefISIGoogle Scholar[3A] E. L. Lehmann, A theory of some multiple decision problems. I, Ann. Math. Statist., 28 (1957), 1–25 MR0084952 0078.33402 CrossrefISIGoogle Scholar[3B] E. L. Lehmann, A theory of some multiple decision problems. II, Ann. Math. Statist., 28 (1957), 547–572 MR0096338 0080.35704 CrossrefISIGoogle Scholar[4] Howard Raiffa and , Robert Schlaifer, Applied statistical decision theory, Studies in Managerial Economics, Division of Research, Graduate School of Business Administration, Harvard University, Boston, Mass., 1961xxviii+356 pp. (2 inserts) MR0117844 Google Scholar[5] H. Weiler, The use of incomplete beta functions for prior distributions in binomial sampling, Technometrics, 7 (1965), 335–347 MR0191068 CrossrefISIGoogle Scholar Previous article Next article FiguresRelatedReferencesCited byDetails Bayesian minimum sample size designs for the bernoulli selection problemSequential Analysis, Vol. 7, No. 1 Cross Ref Bayesian sequential methods for choosing the better of two binomial populationSequential Analysis, Vol. 5, No. 2 Cross Ref A bayes procedure for selecting the population with the largestpth quantile1 December 1984 | Annals of the Institute of Statistical Mathematics, Vol. 36, No. 1 Cross Ref Minimum Bayes Risk t -Intervals for Multiple ComparisonsJournal of the American Statistical Association, Vol. 70, No. 352 Cross Ref On comparing binomial probabilities from a bayesian viewpoint23 December 2010 | Communications in Statistics, Vol. 4, No. 10 Cross Ref Bayesian procedures for ranking and selection problemsAnnals of the Institute of Statistical Mathematics, Vol. 26, No. 1 Cross Ref A bayes solution for the problem of ranking Poisson parametersAnnals of the Institute of Statistical Mathematics, Vol. 23, No. 1 Cross Ref BAYESIAN COMPARISONS OF THE ORIGINS OF TRANSLATED EXPONENTIAL DISTRIBUTIONS126 February 2008 | Australian Journal of Statistics, Vol. 12, No. 3 Cross Ref Volume 16, Issue 4| 1968SIAM Journal on Applied Mathematics History Submitted:24 January 1966Accepted:01 March 1968Published online:12 July 2006 InformationCopyright © 1968 Society for Industrial and Applied MathematicsPDF Download Article & Publication DataArticle DOI:10.1137/0116068Article page range:pp. 843-850ISSN (print):0036-1399ISSN (online):1095-712XPublisher:Society for Industrial and Applied Mathematics