https://orcid.org/0000-0003-2687-0138
References
- B.C. Arnold, E. Castillo, and J.M. Sarabia, Conditional Specification of Statistical Models, Springer Series in Statistics, New York, 1999.
- J.K. Filus, L.Z. Filus, and B.C. Arnold, Families of multivariate distributions involving ‘Triangular’ transformations, Commun. Stat. - Theory Methods 39 (2009), pp. 107–116.
- I. Ghosh, F. Marques, and S. Chakraborty, A new bivariate Poisson distribution via conditional specification: Properties and applications, J. Appl. Stat. (2020), pp. 1–23. doi:https://doi.org/10.1080/02664763.2020.1793307
- M.A. Islam and R.I. Chowdhury, Analysis of Repeated Measures Data, Springer Nature, Singapore, 2017.
- Y. Jelmer, Introduction to nloptr: An R interface to NLopt, preprint (2020). Available at https://cran.r-project.org/web/packages/nloptr/vignettes/nloptr.pdf.
- N.L. Johnson, A.W. Kemp, and S. Kotz, Univariate Discrete Distributions, John Wiley & Sons, New Jersey, 2005.
- C.C. Kokonendji and P. Puig, Fisher dispersion index for multivariate count distributions: A review and a new proposal, J. Multivar. Anal. 165 (2018), pp. 180–193.
- L. Kopylev and B. Sinha, On the asymptotic distribution of likelihood ratio test when parameters lie on the boundary, Sankhyaā: Ser. B 73 (2008), pp. 20–41.
- A. Kyriakoussis and H. Papageorgiou, On characterization of Power Series distributions by a marginal distribution and a regression function, Ann. Inst. Stat. Math. 41 (1989), pp. 671–676.
- R.E. Leiter and M.A. Hamdan, Some bivariate probability models applicable to traffic accidents and fatalities, Int. Stat. Rev. 41 (1973), pp. 87–100.
- S. Loukas and C.D. Kemp, On the chi-square-of-fit statistic for bivariate discrete distributions, J. R. Stat. Soc. Ser. D 35 (1986), pp. 525–529.
- G. Molenberghs and G. Verbeke, Likelihood ratio, score, and Wald tests in a constrained parameter space, Am. Stat. 61 (2007), pp. 22–27.
- K.F. Sellers, S.D. Morris, and N. Balakrishnan, Bivariate Conway–Maxwell–Poisson distribution: Formulation, properties, and inference, J. Multi. Anal. 150 (2016), pp. 152–168.
- V. Seshadri and G.P. Patil, A characterization of a bivariate distribution by the marginal and the conditional distributions of the same component, Ann. Inst. Stat. Math. 15 (1964), pp. 215–221.