| 1 |
Klugkist, I. and Hoijtink, H. (2007). The Bayes factor for inequality and about equality constrained models, Computational Statistics and Data Analysis, 51, 6367-6379.
DOI
ScienceOn
|
| 2 |
Kuiper, R. M., Hoijtink, H.J.A. and Silvapulle, M. J. (2011). An Akaike-type information criterion for model selection under inequality constraints, Biometrika, 98, 495-501.
DOI
|
| 3 |
Kuiper, R. M., Hoijtink, H. J. A. and Silvapulle, M. J., (2012). Generalization of the order-restricted information criterion for multivariate normal linear models, Journal of Statistical Planning and Inference, 142, 2454-2463.
DOI
|
| 4 |
Lindley, D. V. (1957). A statistical paradox, Biometrika, 44, 187-192.
DOI
|
| 5 |
Liu, L., Lee, C. C. and Peng, J. (2002). Max-min multiple comparison procedure for isotonic does-response curves, Journal of Statistical Planning and Inference, 107, 133-141.
DOI
|
| 6 |
Liu, L. (2001). Simultaneous statistical inference for monotone dose-response means, Doctoral dissertation, Memorial University of Newfoundland, St, John's, Canada.
|
| 7 |
Marden, J. H. and Allen, L. R. (2002). Molecules, muscles, and machines: Universal performance characteristics of motors, The National Academy of Sciences USA, 99, 4161-4166.
DOI
ScienceOn
|
| 8 |
Marden, J. I. and Gao. Y. H.(2002). Rank-based procedures for structural hypotheses of the covariance matrix, Sankhya, 64, 653-677
|
| 9 |
Dunson, D. B. and Neelon, B. (2003). Bayesian inference on order-constrained parameters in generalized linear models, Biometrics, 59, 286-295.
DOI
ScienceOn
|
| 10 |
Dykstra, R. L., Robertson, T. and Silvapulle, M. J. (2002). Statistical inference under inequality constraints, Special issue, Journal of Statistical Planning and Inference, 107, 1-2.
DOI
|
| 11 |
Galindo-Garre, F. G.and Vermunt, J. K. (2004). The order restricted association model : Two estimation algorithms and issues in testing, Psychometrika, 68, 614-654.
|
| 12 |
Galindo-Garre, F. G. and Vermunt, J. K. (2005). Testing log-linear models with inequality constraints: A comparison of asymptotic, bootstrap and posterior predictive p-values, Statistical Netherlandica, 59, 82-94.
DOI
|
| 13 |
Goodman, L. A., (1979). Simple models for the analysis of association in cross-classifications having ordered categories, Journal of the American Statistical Association, 74, 537-552.
DOI
ScienceOn
|
| 14 |
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.
|
| 15 |
Hoijtink, H. (2013). Objective Bayes factors for inequality constrained hypotheses, International Statistical Review, 81, 207-229
DOI
|
| 16 |
Hoijtink, H., Klugkist, I. and Boelen, P. A. (2008). Bayesian Evaluation of Informative Hypotheses, Springer, New York.
|
| 17 |
Iliopoulos, G., Kateri, M. and Ntzoufras, I. (2007). Bayesian estimation of unrestricted and order-restricted association models for two-way contingency table, Computational Statistics and Data Analysis, 51, 4643-4655.
DOI
|
| 18 |
Iliopoulos, G., Kateri, M. and Ntzoufras, I. (2009). Bayesian model comparison for the order-restricted RC association model, Psychometrika, 74, 561-587.
DOI
|
| 19 |
Johnson, N. L. and Kotz, S. (1972). Distributions in Statistics, John & Wiley, New York.
|
| 20 |
Akaike, H. (1987). Factor analysis and AIC, Psychometrika, 52, 317-332.
DOI
|
| 21 |
Anraku, K. (1999). An information criterion for parameters under a simple order restriction, Biometrika, 86, 141-152
DOI
|
| 22 |
Agresti, A., Chuang, C. and Kezouh, A. (1987). Order-restricted score parameters in association models for contingency tables, Journal of the American Statistical Association, 82, 619-623.
DOI
|
| 23 |
Agresti, A. and Coull, B. A. (2002). The analysis of contingency tables under inequality constraints, Journal of Statistical Planning and Inference, 107, 45-73.
DOI
|
| 24 |
Albert. J. and Chib, S. (1991). Bayesian Analysis of binary and polychotomous response Data, Journal of the American Statistical Association, 88, 669-679
|
| 25 |
Bacchetti, P. (1989). Addictive isotonic models, Journal of the American Statistical Association, 84, 289-294.
|
| 26 |
Barlow, R. E., Bartholomew, D. J., Bremner, J. M. and Brunk, H. D. (1972). Statistical Inference Under Order Restrictions, New York, NY: Wiley.
|
| 27 |
Dickey, J. (1971). The weighted likelihood ration, linear hypotheses on normal location parameters, The Annals of Statistics, 42, 204-223.
DOI
|
| 28 |
Dickey, J. (1976). Approximate posterior distributions, Journal of the American Statistical Association, 71, 680-689.
DOI
|
| 29 |
Dickey, J. and Lientz, B. P. (1970). The weighted likelihood ration, sharp hypotheses about chances, the order of a Markov Chain, Annals of Mathematical Statistics, 41, 214-226.
DOI
|
| 30 |
Van Wesel, F., Hoijtink, H. and Klugkist, I. (2011). Choosing priors for constrained analysis of variance: Methods based on training data, Scandinavian Journal of Statistics, 38, 666-690.
DOI
|
| 31 |
Maxwell, I. E. (1961). Maxwell, E. A. Recent trends in factor analysis, Journal of the Royal Statistical Society, 124, 49-59.
DOI
|
| 32 |
Verdinelli, I. and Wasserman, L. (1995). Computing Bayes factors using a generalization of the Savage-Dickey density ratio, Journal of the American Statistical Association, 90, 613-618.
|
| 33 |
Wetzels, R., Vandekerckhove, J., Tuerlinckx, F. and Wagenmakers, E. (2010). Bayesian parameter estimation in the expectancy valence model of the Iowa gambling task, Journal of Mathematical Psychology, 54, 14-27.
DOI
|
| 34 |
Williams, D. A. (1977). Some inference procedures for monotonically ordered normal means, Biometrika, 64, 9-14.
DOI
|
| 35 |
Marcus, R. and Peritz, E. (1976). Some simultaneous confidence bounds in normal models with restricted alternatives, Journal of the Royal Statistical Society, 38, 157-165.
|
| 36 |
Marcus, R. (1982). Some results on simultaneous confidence intervals for monotone contrasts in one-way ANOVA model, Communications in Statistics A, 11, 615-622.
DOI
|
| 37 |
Moreno, E. (2005). Objective Bayesian methods for one-sided testing, Journal of the American Statistical Association, 14, 181-198.
|
| 38 |
Oh, M. S. (2013). Bayesian multiple comparison of models for binary data with inequality constraints, Statistics and Computing, 23, 481-490.
DOI
|
| 39 |
Oh, M. S. and Shin, D. W. (2011). A unified Bayesian inference on treatment means with order constraints, Computational Statistics and Data Analysis, 55, 924-934.
DOI
ScienceOn
|
| 40 |
Ritov, Y. and Gilula, Z. (1993). The order restricted RC model for ordered contingency tables: estimation and testing for fit, Annals of Statistics, 19, 2090-2101.
|
| 41 |
Mulder, J., Hoijtink, H. and Klugkist, I. (2010). Equality and inequality constrained multivariate linear models: Objective model selection using constrained posterior priors, Journal of Statistical Planning and Inference, 140, 887-906.
DOI
ScienceOn
|
| 42 |
Monton-Jones, T., Diggle, P., Parker, L., Dickinson, H. O. and Binks, K. (2000). Addictive isotonic regression models in epidemiology, Statistics in Medicine, 19, 849-859.
DOI
|
| 43 |
Mulder, J. (2014a). Prior adjusted default Bayes factors for testing (in) equality constrained hypotheses, Computational Statistics and Data Analysis, 71, 448-463.
DOI
|
| 44 |
Mulder, J. (2014b). Bayes factors for testing inequality constrained hypotheses: Issues with prior specification, British Journal of Mathematical and Statistical Psychology, 67, 153-171.
DOI
|
| 45 |
Nashimoto, K. and Wright, F. T. (2005). A note on multiple comparison procedures for detecting difference in simply ordered means, Statistics and Probability Letters, 73, 393-401.
DOI
|
| 46 |
Oh, M. S. (1999). Estimation of posterior density functions from a posterior sample, Computational Statistics and Data Analysis, 29, 411-427.
DOI
ScienceOn
|
| 47 |
Klugkist, I., Kata, B. and Hoijtink, H. (2005). Bayesian model selection using encompassing priors, Statistica Neerlandica, 59, 57-59.
DOI
|
| 48 |
Klugkist, I., Laudy, O. and Hoijtink, H. (2005). Inequality constrained analysis of variance: A Bayesian approach, Psychological Methods, 10, 477-493.
DOI
|
| 49 |
Laudy, O. and Hoijtink, H. (2007). Bayesian methods for the analysis of inequality and equality constrained contingency tables, Statistical Methods in Medical Research, 16, 123-138.
DOI
|
| 50 |
Oh, M. S. (2014a). Bayesian test one quality of score parameters in the order restricted RC association model, Computational Statistics and Data Analysis, 72, 147-157.
DOI
|
| 51 |
Oh, M. S. (2014b). Bayesian comparison of model swith inequality and equality constraints, Statistics and Probability Letters, 84, 176-182.
DOI
|
| 52 |
Robertson, T., Wright, F. T. and Dykstra, R. L. (1988). Order Restricted Statistical Inference, John Wiley and Sons, New York.
|
| 53 |
Schwarz, G. (1978). Estimating the dimension of a model, Annals of Statistics, 6, 461-464.
DOI
ScienceOn
|
| 54 |
Shang, J., Cavanaugh, J. E. and Wright, F. T. (2008). A Bayesian multiple comparison procedure for orderrestricted mixed models, International Statistical Review, 76, 268-284.
DOI
|
| 55 |
Shayamall, D. P. and Dunson, D. B. (2005). Estimation of order-restricted means from correlated data, Biometrika, 92, 703-715.
DOI
|
| 56 |
Silvapulle, M. J. and Sen, P. K. (2004). Constrained Statistical Inference, Wiley, New York.
|
| 57 |
Tarantola, C., Consonni, G. and Dellaportas, P. (2008). Bayesian clustering of row effects models, Journal of Statistical Planning and Inference, 138, 2223-2235.
DOI
|
| 58 |
Taylor, J. M. G., Wang, L. and Li, Z. (2007). Analysis on binary responses with ordered covariates and missing data, Statistics in Medicine, 26, 3443-3458.
DOI
|
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