Modelling the joint distribution of competing risks survival times using copula functions
- 作者:Vladimir K. Kaishev ; Dimitrina S. Dimitrova ; Steven Haberman
- 关键词:Dependent competing risk model ; Disease elimination ; Failure times ; Overall survival function ; Copulas ; Spline function
- 刊名:Insurance ; Mathematics and Economics
- 出版年:2007
- 期刊代码:25_01676687
- 类别:mt
- 出版时间:November 2007
- 卷:41
- 期:3
- 页码:339-361
- 文件大小:1965 K
摘要
The problem of modelling the joint distribution of survival times in a competing risks model, using copula functions, is considered. In order to evaluate this joint distribution and the related overall survival function, a system of non-linear differential equations is solved, which relates the crude and net survival functions of the modelled competing risks, through the copula. A similar approach to modelling dependent multiple decrements was applied by Carriere [Carriere, J., 1994. Dependent decrement theory. Transactions, Society of Actuaries XLVI, 45–65] who used a Gaussian copula applied to an incomplete double-decrement model which makes it difficult to calculate any actuarial functions and draw relevant conclusions. Here, we extend this methodology by studying the effect of complete and partial elimination of up to four competing risks on the overall survival function, the life expectancy and life annuity values. We further investigate how different choices of the copula function affect the resulting joint distribution of survival times and in particular the actuarial functions which are of importance in pricing life insurance and annuity products. For illustrative purposes, we have used a real data set and used extrapolation to prepare a complete multiple-decrement model up to age 120. Extensive numerical results illustrate the sensitivity of the model with respect to the choice of copula and its parameter(s).