References
- Akaike, H. 1974. A new look at the statistical model identification. IEEE Transactions on Automatic Control 19 (6):716–23.
- Aryuyuen, S., and W. Bodhisuwan. 2013. The negative binomial-generalized exponential (NB-GE) distribution. Applied Mathematical Sciences 7 (22):1093–105.
- Bhati, D., D. V. S. Sastry, and P. Z. M. Qadri. 2015. A new generalized Poisson-Lindley distribution: Applications and properties. Austrian Journal of Statistics 44 (4):35–51. doi:https://doi.org/10.17713/ajs.v44i4.54.
- Denthet, S., A. Thongteeraparp, and W. Bodhisuwan. 2016. Mixed distribution of negative binomial and two parameter Lindley distributions. In 12th International Conference on Mathematics, Statistics, and Their Applications (ICMSA) 104–107.
- Ghitany, M. E., and D. K. Al-Mutairi. 2009. Estimation methods for the discrete Poisson Lindley distribution. Journal of Statistical Computation and Simulation 79 (1):1–9.
- Gómez-Déniz, E., J. M. Sarabia, and E. Calderín-Ojeda. 2008. Univariate and multivariate of the negative binomial-inverse Gaussian distributions with applications. Insurance: Mathematics and Economics 42 (1):39–49. doi:https://doi.org/10.1016/j.insmatheco.2006.12.001.
- Klugman, S. A., H. H. Panjer, and G. E. Willmot. 2008. Loss Models: From Data to Decision. 3rd ed. USA: John Wiley and Sons.
- Kongrod, S., W. Bodhisuwan, and P. Payakkapong. 2014. The negative binomial-Erlang distribution with applications. International Journal of Pure and Applied Mathematics 92 (3):389–401.
- Lindley, D. V. 1958. Fiducial distributions and Bayes’ theorem. Journal of the Royal Statistical Society: Series B (Methodological) 20 (1):102–7.
- Lord, D., and S. R. Geedipally. 2011. The negative binomial-Lindley distribution as a tool for analyzing crash data characterized by large amount of zeros. Accident Analysis & Prevention 43 (5):1738–42.
- Sankaran, M. 1970. The discrete Poisson-Lindley distribution. Biometrics 26 (1):145–9. doi:https://doi.org/10.2307/2529053.
- Shanker, R., S. Sharma, and R. Shanker. 2013. A two-Parameter Lindley distribution for modeling waiting and survival times data. Applied Mathematics 04 (02):363–8. doi:https://doi.org/10.4236/am.2013.42056.
- Shanker, R., K. K. Shukla, R. Shanker, and T. A. Leonida. 2017. A three-parameter Lindley distribution. American Journal of Mathematics and Statistics 7 (1):15–26.
- Wang, Z. 2011. One mixed negative binomial distribution with application. Journal of Statistical Planning and Inference 141 (3):1153–60.
- Zamani, H., and N. Ismail. 2010. Negative binomial-Lindley distribution and its application. Journal of Mathematics and Statistics 6 (1):4–9. doi:https://doi.org/10.3844/jmssp.2010.4.9.