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한국통계학회 논문집 = Communications of the Korean Statistical Society, v.15 no.1, 2008년, pp.13 - 26
Bae, Re-Na (Division of Applied Mathematics, Hanyang University) , Kang, Yun-Hee (Division of Applied Mathematics, Hanyang University) , Hong, Min-Young (Division of Applied Mathematics, Hanyang University) , Kim, Seong-W. (Division of Applied Mathematics, Hanyang University)
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Inference on the present data will be more reliable when the data arising from previous similar studies are available. The data arising from previous studies are referred as historical data. The power prior is defined by the likelihood function based on the historical data to the power 주제어
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Bartholomew, D. J. (1959a). A test of homogeneity for ordered alternatives. Biometrika, 46, 36-48
Bartholomew, D. J. (1959b). A test of homogeneity for ordered alternatives. II. Biometrika, 46, 328-335
Bartholomew, D. J. (1961a). A test of homogeneity of means under restricted alternatives (with discussions). Journal of the Royal Statistical Society, Ser. B, 23, 239-281
Bartholomew, D. J. (1961b). Ordered tests in the analysis of variance. Biometrika, 48, 325-332
Berger, J. O. and Pericchi, L. R. (1996). The intrinsic Bayes factor for model selection and prediction. Journal of the American Statistical Association, 91, 109-122
Bohrer, R. and Francis, G. K. (1972). Sharp one-sided confidence bounds over positive regions. The Annals of Mathematical Statistics, 43, 1541-1548
Ibrahim, J. G. and Chen, M. H. (2000). Power prior distributions for regression models. Statistical Science, 15, 46-60
Gelfand, A. E., Hills, S. E., Racine-poon, A. and Smith, A. F. M. (1900). Illustration of Bayesian inference in normal data models using Gibbs sampling. Journal of the American Statistical Association, 85, 972-985
Gopalan, R. and Berry, D. A. (1998). Bayesian multiple comparisons using Dirichlet process priors. Journal of the American Statistical Association, 93, 1130-1139
Hayter, A. J. (1990). A one-sided studentized range test for testing against a simple ordered alternative. Journal of the American Statistical Association, 85, 778-785
Kim, S. W. and Sun, D. (2000). Intrinsic priors for model selection using an encompassing model with applications to censored failure time data. Lifetime Data Analysis, 6, 251-269
Kim, H. J. and Kim, S. W. (2001). Two-sample Bayesian tests using intrinsic Bayes factors for multivariate normal observations. Communications in Statistics-Computation and Simulation, 30, 426-436
Liu, L. (2001). Simultaneous statistical inference for monotone dose-response mean. Doctoral dessertation, Memorial University of Newfoundland, St. John's, Canada
Pauler, D. K., Wakefield, J. C. and Kass, R. E. (1999). Bayes factors and approximations for variance component models. Journal of the American Statistical Association, 94, 1242-1253
Son, Y. and Kim, S. W. (2005). Bayesian single change point detection in a sequence of multivariate normal observations. Journal of Theoretical and Applied Statistics, 39, 373-387
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