https://orcid.org/0000-0002-9813-9064
References
- Ahmad, M. 2007. A short note on Conway-Maxwell-hyper Poisson distribution. Pakistan Journal of Statistics 23:135–7.
- Bardwell, G. E., and E. L. Crow. 1964. A two-parameter family of hyper-Poisson distributions. Journal of the American Statistical Association 59 (305):133–41. doi:10.1080/01621459.1964.10480706.
- Bohning, D. 1998. Zero-inflated Poisson models and CA MAN: A tutorial collection of evidence. Biometrical Journal 40:833–43.
- Cohen, A. C. 1963. Estimation in mixtures of discrete distributions. Calcutta: Statistical Publishing Society.
- Crow, E. L., and G. E. Bardwell. 1965. Estimation of the parameters of the hyper-Poisson distributions. In Classical and contagious discrete distributions, ed. G. P. Patil, 127–40. Oxford: Pergamon Press.
- Falls, L. W., W. O. Williford, and M. C. Carter. 1971. Probability distributions for thunderstorm activity at Cape Kennedy, Florida. Journal of Applied Meteorology 10 (1):97–104. doi:10.1175/1520-0450(1971)010<0097:PDFTAA>2.0.CO;2.
- Famoye, F., and K. P. Singh. 2021. Zero-inflated generalized Poisson regression model with an application to domestic violence data. Journal of Data Science 4 (1):117–30. doi:10.6339/JDS.2006.04(1).257.
- Hasan, M. T., and G. Sneddon. 2009. Zero-inflated Poisson regression for longitudinal data. Communications in Statistics - Simulation and Computation 38 (3):638–53. doi:10.1080/03610910802601332.
- Johnson, N. L., A. W. Kemp, and S. Kotz. 2005. Univariate discrete distributions, vol. 444. New York: John Wiley and Sons.
- Kemp, C. D. 2002. q-analogues of the hyper-Poisson distribution. Journal of Statistical Planning and Inference 101 (1–2):179–83. doi:10.1016/S0378-3758(01)00166-5.
- Kemp, C. D., and A. W. Kemp. 1965. Some properties of the Hermite distribution. Biometrika 52 (3):381–94.
- Kumar, C. S. 2009. Some properties of Kemp family of distributions. Statistica 69:311–6.
- Kumar, C. S., and B. U. Nair. 2011. A modied version of hyper-Poisson distribution and its applications. Journal of Statistics and Applications 6:23–34.
- Kumar, C. S., and B. U. Nair. 2016. On generalized hyper-Poisson distribution of order k and its application. Communications in Statistics - Theory and Methods 45 (22):6720–31. doi:10.1080/03610926.2014.966842.
- Kumar, C. S., and R. Ramachandran. 2019. On zero-inflated hyper-Poisson distribution and its applications. Communications in Statistics- Simulation and Computation. doi:10.1080/03610918.2019.1659362 (In Press).
- Kumar, C. S., and R. Ramachandran. 2020. On some aspects of a zero-inflated overdispersed model and its applications. Journal of Applied Statistics 47 (3):506–23. doi:10.1080/02664763.2019.1645098.
- Kumar, C. S., and A. Riyaz. 2016. An order k version of the alternative zero-inflated logarithmic series distribution and its applications. Journal of Applied Statistics 43 (14):2681–95. doi:10.1080/02664763.2016.1142949.
- Kumar, C. S., and A. S. Satheenthar. 2021. A new class of lifetime distribution with decreasing failure rate: Properties and applications. Communications in Statistics-Simulation and Computation doi:10.1080/03610918.2021.1936555 (In Press).
- Lambert, D. 1992. Zero-inflated Poisson regression, with an application to defects in manufacturing. Technometrics 34 (1):1–14. doi:10.2307/1269547.
- Martin, D. C., and S. Katti. 1965. Fitting of certain contagious distributions to some available data by the maximum likelihood method. Biometrics 21 (1):34–48. doi:10.2307/2528350.
- Mathai, A. M., and H. J. Haubold. 2008. Special functions for applied scientists. NewYork: Springer-Verlag.
- Nisida, T. 1962. On the multiple exponential channel queuing system with hyper-Poisson arrivals. Journal of the Operations Research Society 5:57–66.
- Rao, C. R. 1965. Linear statistical inference and its applications. New York: John Wiley and Sons.
- Roohi, A., and M. Ahmad. 2003. Estimation of the parameter of hyper-Poisson distribution using negative moments. Pakistan Journal of Statistics 19:99–105.
- Sim, S. Z., S. H. Ong, and R. C. Gupta. 2018. Zero-inflated Conway-Maxwell Poisson distribution to analyze discrete data. The International Journal of Biostatistics 14 (1). doi:10.1515/ijb-2016-0070 (available online).
- Singh, S. N. 1962. Note on inflated Poisson distribution. Journal of the Indian Statistical Association 33:140–4.
- Slater, L. J. 1966. Generalized hypergeometric functions. Cambridge: Cambridge University Press.
- Staff, P. J. 1964. The displaced Poisson distribution. Australian Journal of Statistics 6 (1):12–20. doi:10.1111/j.1467-842X.1964.tb00146.x.
- Wagh, Y. S., and K. K. Kamalja. 2018. Zero-inflated models and estimation in zero-inflated Poisson distribution. Communications in Statistics - Simulation and Computation 47 (8):2248–65. doi:10.1080/03610918.2017.1341526.