Journal of East China Normal University(Natural Science) >

2016 , Vol. 2016 >Issue 4: 60 - 69

DOI: https://doi.org/10.3969/j.issn.1000-5641.2016.04.007

The Bayes estimation of quantile premium in Pareto risk model

  • WEI Si-yi ,
  • ZHANG Yi ,
  • WEN Li-min
Expand
  • 1. School of Mathematics and Information Science, Jiangxi Normal University, Nanchang 330022, China;
    2. School of Computer and Information Engineering, Jiangxi Normal University, Nanchang 330022, China

Received date: 2015-06-24

  Online published: 2016-09-29

Fold

Abstract

Quantile premium principle is one of the important premium principles in non-life insurance actuarial science, which is widely used in insurance practice. The Pareto risk model for quantile premium principle was established by introducing a class of loss function, and using some statistical techniques, and some estimates of risk premium including Bayes premium, Bayes estimate, maximum likelihood estimation and quantile estimation under the quantile premium principle were given. Furthermore, the statistical properties of these estimations were discussed. Finally, the mean error of these estimations were compared by using numerical simulation method.

Key words: quantile premium principle; Pareto risk model; consistency; asymptotical normality

Cite this article

WEI Si-yi , ZHANG Yi , WEN Li-min . The Bayes estimation of quantile premium in Pareto risk model[J]. Journal of East China Normal University(Natural Science), 2016 , 2016(4) : 60 -69 . DOI: 10.3969/j.issn.1000-5641.2016.04.007

References

[1] ASIMIT V A, BADESCU A, VERDONCK T. Optimal risk transfer under quantile-Based risk measures [J]. Social Science Electronic Publishing, 2013, 53(1): 252-265.
[2] 欧阳资生. 厚尾分布的极值分位数估计与极值风险测度研究 [J]. 数理统计与管理, 2008, 27(1): 70-75.
[3] 谢佳利, 杨善朝, 梁鑫. VaR~样本分位数估计的偏差改进 [J]. 数量经济技术经济研究, 2008, 12: 139-148.
[4] GELMAN A, CARLIN J B, STERN H S, et al. Bayesian Data Analysis [M]. New York: Chapman-Hall, 1995.
[5] SZEGO G. Measures of risk [J]. European Journal of Operational Research, 2005, 163: 5-19.
[6] DENUIT M, DHAENE J, GOOVAERTS M, et al. Actuarial Theory for Dependent Risks [M]. [S.l.]: John Wiley Sons Ltd, 2005.
[7] RAMSAY C M. A solution to the ruin problem for pareto distributions [J]. Insurance: Mathematics and Economics, 2003, 33(1): 109-116.
[8] ALBRECHER H, KORTSCHAK D. On ruin probability and aggregate claim representations for pareto claim size distributions [J]. Insurance: Mathematics and Economics, 2009, 45(3): 362-373.
[9] BRAZAUSKAS V, KLEEFELD A. Robust and efficient fitting of the generalized pareto distribution with actuarial applications in view [J]. Insurance: Mathematics and Economics, 2009, 45(3): 424-435.
[10] HE H, ZHOU N, ZHANG R. On estimation for the Pareto distribution [J]. Statistical Methodology, 2014, 21(11): 49-58.
[11] TUDOR C A. Chaos expansion and asymptotic behavior of the Pareto distribution [J]. Statistics and Probability Letters, 2014, 91(3): 62-68.
[12] FAHIDY T Z. Applying pareto distribution theory to electrolytic powder production [J]. Electrochemistry Communications, 2011, 13(3): 262-264.
[13] DIXIT U J, NOOGHABI M J. Efficient estimation in the pareto distribution with the presence of outliers [J]. Statistical Methodology, 2011, 8(4): 340-355.
[14] HARRIS C M. The pareto distribution as a queue service discipline [J]. Operational Research, 1968, 16(2): 307-313.
[15] ARNOLD B C. Pareto distribution [M]. [S.l.]: International Co-operative Publishing House, 1983.
[16] STEINDL J. Random processes and the growth of firms [M]. [S.l.]: Hafner Pub Co, 2004.
[17] HAGSTROEM K G. Remarks on pareto distributions [J]. Skandinavisk Aktuarietidskrift, 1960(1/2): 59-71.
[18] 茆诗松, 王静龙, 濮晓龙. 高等数理统计 [M]. 北京: 高等教育出版社, 2006.
[19] WALKER A M. On the asymptotic behavior of posterior distributions [J]. Journal of the Royal Statistical Society Series B(Methodological), 1969, 31(1): 80-88.
[20] BUHLMANN H, GISLER A. A Course in Credibility Theory and its Applications [M]. Amsterdam: Springer, 2005.
[21] 温利民. 信度估计的理论与方法 [M].  北京: 科学出版社, 2012.
[22] PAN M, WANG R, WU X. On the consistency of credibility premiums regarding esscher principle [J]. Insurance Mathematics and Economics, 2008, 42(1): 119-126.
[23] 郑丹, 章溢, 温利民. 具有时间变化效应的信度模型 [J]. 江西师范大学学报, 2012(3): 249-252.
[24] 方婧, 章溢, 温利民. 聚合风险模型下的信度估计 [J]. 江西师范大学学报, 2012(6): 607-611.
Options
Outlines

/