References
- Abu Bakar, S., N. Hamzah, M. Maghsoudi, and S. Nadarajah. 2015. Modeling loss data using composite models. Insurance: Mathematics and Economics 61 (C):146–54.
- Afify, A. Z., H. M. Yousof, G. G. Hamedani, and G. R. Aryal. 2016. The exponentiated weibull-pareto distribution with application. Journal of Statistical Theory and Applications 15 (4):326–44. doi:10.2991/jsta.2016.15.4.2.
- Aminzadeh, M. S., and M. Deng. 2019. Bayesian predictive modeling for inverse gamma-pareto composite distribution. Communications in Statistics - Theory and Methods 48 (8):1938–54. doi:10.1080/03610926.2018.1440595.
- Bozdogan, H. 1987. Model selection and Akaike’s Information Criterion (AIC): The general theory and its analytical extensions. Psychometrika 52 (3):345–70. doi:10.1007/BF02294361.
- Burnham, K. P., and D. R. Anderson. 2002. Model selection and multimodel inference, 2nd ed. New York: Springer-Verlag.
- Cooray, K., and M. M. A. Ananda. 2005. Modeling actuarial data with a composite lognormal-pareto model. Scandinavian Actuarial Journal 2005 (5):321–34. doi:10.1080/03461230510009763.
- Davison, A. 2019. SMPracticals: Practicals for Use with Davison (2003) Statistical Models. R Package Version 1:3–4.
- Grün, B., and T. Miljkovic. 2019. Extending composite loss models using a general framework of advanced computational tools. Scandinavian Actuarial Journal 2019 (8):642–60. doi:10.1080/03461238.2019.1596151.
- Gupta, R. D., and D. Kundu. 1999. Theory & methods: Generalized exponential distributions. Australian < Html_Ent Glyph="@Amp;" Ascii="&"/> New Zealand Journal of Statistics 41 (2):173–88. doi:10.1111/1467-842X.00072.
- Hurvich, C. M., and C.-L. Tsai. 1989. Regression and time series model selection in small samples. Biometrika 76 (2):297–307. doi:10.1093/biomet/76.2.297.
- Mudholkar, G. S., and D. K. Srivastava. 1993. Exponentiated weibull family for analyzing bathtub failure-rate data. IEEE Transactions on Reliability 42 (2):299–302. doi:10.1109/24.229504.
- Nadarajah, S. 2005a. Exponentiated beta distributions. Computers & Mathematics with Applications 49 (7-8):1029–35. doi:10.1016/j.camwa.2004.11.008.
- Nadarajah, S. 2005b. Exponentiated pareto distributions. Statistics 39 (3):255–60. doi:10.1080/02331880500065488.
- Nadarajah, S. 2006. The exponentiated gumbel distribution with climate application. Environmetrics 17 (1):13–23. doi:10.1002/env.739.
- Nadarajah, S., and A. K. Gupta. 2007. The exponentiated gamma distribution with application to drought data. Calcutta Statistical Association Bulletin 59 (1-2):29–54. doi:10.1177/0008068320070103.
- Preda, V., and R. Ciumara. 2006. On composite models: Weibull-pareto and lognormal-pareto. - a comparative study. Romanian Journal of Economic Forecasting 3:32–46.
- Reynkens, T., and R. Verbelen. 2020. ReIns: Functions from” Reinsurance: Actuarial and Statistical Aspects”. R package version 1.0.10.
- Scollnik, D. P. M. 2007. On composite lognormal-Pareto models. Scandinavian Actuarial Journal 2007 (1):20–33. doi:10.1080/03461230601110447.
- Teodorescu, S., and R. Vernic. 2006. A composite exponential-pareto distribution. The Annals of the “Ovidius” University of Constanta, Mathematics Series 14 (1):99–108.