APPLICATIONS OF THE GB2 FAMILY OF DISTRIBUTIONS IN MODELING INSURANCE LOSS PROCESSES

被引:62
作者
CUMMINS, JD
DIONNE, G
MCDONALD, JB
PRITCHETT, BM
机构
[1] UNIV MONTREAL,MONTREAL H3C 3J1,QUEBEC,CANADA
[2] BRIGHAM YOUNG UNIV,PROVO,UT 84602
关键词
GENERALIZED-BETA OF THE 1ST KIND; GENERALIZED-BETA OF THE 2ND KIND; LOG T; GENERALIZED GAMMA; PEARSON; BURR; KAPPA; PARETO; LOMAX; LOG CAUCHY; LOGNORMAL; BETA; GAMMA; WEIBULL; FISK; RAYLEIGH; UNIFORM; EXPONENTIAL; INVERSE DISTRIBUTIONS; MAXIMUM LIKELIHOOD ESTIMATION; MAXIMUM PROBABLE YEARLY AGGREGATE LOSS; MEAN RESIDUAL LIFE; INSURANCE LOSS PROCESSES; REINSURANCE;
D O I
10.1016/0167-6687(90)90003-V
中图分类号
F [经济];
学科分类号
02 ;
摘要
This paper investigates the use of a four parameter family of probability distributions, the generalized beta of the second kind (GB2), for modeling insurance loss processes. The GB2 family includes many commonly used distributions such as the lognormal, gamma and Weibull. The GB2 also includes the Burr and generalized gamma distributions. Members of this family and their inverse distributions have significant potential for improving the distributional fit in many applications involving thin or heavy-tailed distributions. Members of the GB2 family can be generated as mixtures of well-known distributions and provide a model for heterogeneity in claims distributions. Examples are presented which consider models of the distribution of individual and of aggregate losses. The results suggest that seemingly slight differences in modeling the tails can result in large differences in reinsurance premiums and quantiles for the distribution of total insurance losses.
引用
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页码:257 / 272
页数:16
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