References
- Bai, Z. D., Wang, K. Y. and Wong, W. K. (2011) Mean-variance ratio test, a complement to coefficient of variation test and Sharpe ratio test. Statistics and Probability Letters, 81, 1078-1085 https://doi.org/10.1016/j.spl.2011.02.035
- Berger, J. O. and Bernardo, J. M. (1989). Estimating a product of means : Bayesian analysis with reference priors. Journal of the American Statistical Association, 84, 200-207. https://doi.org/10.1080/01621459.1989.10478756
- Berger, J. O. and Bernardo, J. M. (1992). On the development of reference priors (with discussion). In Bayesian Statistics IV, edited by J. M. Bernardo, et al., Oxford University Press, Oxford, 35-60.
- Bernardo, J. M. (1979). Reference posterior distributions for Bayesian inference (with discussion). Journal of Royal Statistical Society B, 41, 113-147.
- Chhikara, R. S. and Folks, L. (1989). The inverse Gaussian distribution; Theory, methodology and applications, Marcel Dekker, New York.
- Cox, D. R. and Reid, N. (1987). Orthogonal parameters and approximate conditional inference (with discussion). Journal of Royal Statistical Society B, 49, 1-39.
- Datta, G. S. and Ghosh, M. (1995). Some remarks on noninformative priors. Journal of the American Statistical Association, 90, 1357-1363. https://doi.org/10.1080/01621459.1995.10476640
- Datta, G. S. and Ghosh, M. (1996). On the invariance of noninformative priors. The Annals of Statistics, 24, 141-159. https://doi.org/10.1214/aos/1033066203
- Datta, G. S. and Mukerjee, R. (2004) Probability matching priors: Higher order asymptotics, Springer, New York.
- DiCiccio, T. J. and Stern, S. E. (1994). Frequentist and Bayesian Bartlett correction of test statistics based on adjusted profile likelihood. Journal of Royal Statistical Society B, 56, 397-408.
- Ghosh, J. K. and Mukerjee, R. (1992). Noninformative priors (with discussion). In Bayesian Statistics IV, edited by J. M. Bernardo, et al., Oxford University Press, Oxford.
- Kang, S. G. (2011). Noninformative priors for the common mean in log-normal distributions. Journal of the Korean Data & Information Science Society, 22, 1241-1250.
- Kang, S. G., Kim, D. H. and Lee, W. D. (2014). Noninformative priors for the log-logistic distribution. Journal of the Korean Data & Information Science Society, 25, 227-235. https://doi.org/10.7465/jkdi.2014.25.1.227
- Mukerjee, R. and Dey, D. K. (1993). Frequentist validity of posterior quantiles in the presence of a nuisance parameter : Higher order asymptotics. Biometrika, 80, 499-505. https://doi.org/10.1093/biomet/80.3.499
- Mukerjee, R. and Ghosh, M. (1997). Second order probability matching priors. Biometrika, 84, 970-975.
- Pratt, J. W. (1964), Robustness of some procedures for the two-sample location problem, Journal of the American Statistical Association, 59, 665-680.
- Niu, C., Guo, X., Xu, W. and Zhu, L. (2014). Testing equality of shape parameters in several inverse Gaussian populations. Metrika, 77, 795-809. https://doi.org/10.1007/s00184-013-0465-5
- Seshadri, V. (1999). The inverse Gaussian distribution; Statistical theory and applications, Springer Verlag, New York.
- Stein, C. (1985). On the coverage probability of confidence sets based on a prior distribution. Sequential Methods in Statistics, Banach Center Publications, 16, 485-514.
- Tian, L. L. (2006) Testing equality of inverse Gaussian means under heterogeneity, based on generalized test variable. Computational Statistics and Data Analysis, 51, 1156-1162. https://doi.org/10.1016/j.csda.2005.11.012
- Tibshirani, R. (1989). Noninformative priors for one parameter of many. Biometrika, 76, 604-608. https://doi.org/10.1093/biomet/76.3.604
- Welch, B. L. and Peers, H. W. (1963). On formulae for confidence points based on integrals of weighted likelihood. Journal of Royal Statistical Society B, 25, 318-329.
- Ye, R. D., Ma, T. F. and Wang, S. G. (2010) Inferences on the common mean of several inverse Gaussian populations. Computational Statistics and Data Analysis, 54, 906-915. https://doi.org/10.1016/j.csda.2009.09.039
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