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OPTIMAL REINSURANCE FROM THE VIEWPOINTS OF BOTH AN INSURER AND A REINSURER UNDER THE CVAR RISK MEASURE AND VAJDA CONDITION

Published online by Cambridge University Press:  12 April 2021

Yanhong Chen*
Affiliation:
College of Finance and Statistics Hunan UniversityChangsha, Hunan410082People’s Republic of China E-Mail: [email protected]

Abstract

In this paper, we study the optimal reinsurance contracts that minimize the convex combination of the Conditional Value-at-Risk (CVaR) of the insurer’s loss and the reinsurer’s loss over the class of ceded loss functions such that the retained loss function is increasing and the ceded loss function satisfies Vajda condition. Among a general class of reinsurance premium principles that satisfy the properties of risk loading and convex order preserving, the optimal solutions are obtained. Our results show that the optimal ceded loss functions are in the form of five interconnected segments for general reinsurance premium principles, and they can be further simplified to four interconnected segments if more properties are added to reinsurance premium principles. Finally, we derive optimal parameters for the expected value premium principle and give a numerical study to analyze the impact of the weighting factor on the optimal reinsurance.

Type
Research Article
Copyright
© 2021 by Astin Bulletin. All rights reserved

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Footnotes

*

Supported by the National Natural Science Foundation of China (No. 11901184) and the Natural Science Foundation of Hunan Province (No. 2020JJ5025).

References

Arrow, K. (1963) Uncertainty and the welfare econimics of medical care. American Economic Review, 53(5), 941973.Google Scholar
Asimit, A., Cheung, K., Chong, W. and Hu, J. (2020) Pareto-optimal insurance contracts with premium budget and minimum charge constraints. Insurance: Mathematics and Economics, 95, 1727.Google Scholar
Assa, H. (2015) On optimal reinsurance policy with distortion risk measures and premiums. Insurance: Mathematics and Economics, 61, 7075.Google Scholar
Azenes (2018) Exis, Finmas Swiss Solvency Test 2019: Major Changes in the Market Risk Standard Model, https://effixis.ch/downloads/2018-10-31-finma-new-sst.pdf.Google Scholar
Bcbs (2016) Minimum Capital Requirements for Market Risk, January 2016, Basel Committee on Banking Supervision, Basel: Bank for International Settlements, https://www.bis.org/bcbs/publ/d352.htm.Google Scholar
Bcbs (2019) Minimum Capital Requirements for Market Risk, February 2019, Basel Committee on Banking Supervision, Basel: Bank for International Settlements, https://www.bis.org/bcbs/publ/d457.htm.Google Scholar
Borch, K. (1960) Reciprocal reinsurance treaties seen as a two-person co-operative game. Scandinavian Actuarial Journal, 1960(1–2), 2958.CrossRefGoogle Scholar
Borch, K. (1969) The optimal reinsurance treaty. Astin Bulletin, 5(2), 293297.CrossRefGoogle Scholar
Cai, J., Fang, Y., Li, Z. and Willmot, G. (2013) Optimal reciprocal reinsurance treaties under the joint survival probability and the joint probability. Journal of Risk and Insurance, 80(1), 145168.CrossRefGoogle Scholar
Cai, J., Lemieux, C. and Liu, F. (2015) Optimal reinsurance from the perspectives of both an insurer and a reinsurer. Astin Bulletin, 46(3), 815849.CrossRefGoogle Scholar
Cai, J., Liu, H. and Wang, R. (2017) Pareto-optimal reinsrance arrangements under general model settings. Insurance: Mathematics and Economics, 77, 2437.Google Scholar
Cai, J. and Tan, K. (2007) Optimal retention for a stop-loss reinsurance under the VaR and CTE risk measures. Astin Bulletin, 37(1), 93112.CrossRefGoogle Scholar
Cai, J., Tan, K., Weng, C. and Zhang, Y. Optimal reinsurance under VaR and CTE risk measures. Insurance: Mathematics and Economics, 43(1), 185196.Google Scholar
Cai, J. and Weng, C. (2016) Optimal reinsurance with expectile. Scandinavian Actuarial Journal, 2016(7), 624645.CrossRefGoogle Scholar
Chen, Y. and Hu, Y. (2020) Optimal reinsurance from the perspectives of both insurers and reinsurers under the VaR risk measure and Vajda condition. Communications in Statistics–Theory and Methods, https://doi.org/10.1080/03610926.2019.1710197.CrossRefGoogle Scholar
Cheung, K., Sung, K., Yam, S. and Yung, S. (2014) Optimal reinsurance under general law-invariant risk measures. Scandinavian Actuarial Journal, 2014(1), 7291.CrossRefGoogle Scholar
Cheung, K. and Wang, W. (2017) Optimal reinsurance from the perspectives of both insurers and reinsurers under general distortion risk measures. SSRN Electronic Journal. 10.2139/ssrn.3048626.Google Scholar
Chi, Y. (2012) Reinsurance arrangements minimizing the risk-adjusted value of an insurer’s liability. Astin Bulletin, 42(2), 529557.Google Scholar
Chi, Y. and Weng, C. (2013) Optimal reinsurance subject to Vajda condition. Insurance: Mathematics and Economics, 53, 179189.Google Scholar
Cui, W., Yang, J. and Wu, L. (2013) Optimal reinsurance minimizing the distortion risk measure under general reinsurance premium principles. Insurance: Mathematics and Economics, 53, 7485.Google Scholar
Dhaene, J., Denuit, M., Goovaerts, M.J., Kaas, R. and Vyncke, D. (2002) The concept of comonotonicity in acturial science and finance: Theory. Insurance: Mathematics and Economics, 31(1), 333.Google Scholar
Embrechts, P., Mao, T., Wang, Q. and Wang, R. (2020) Bayes risk, elicitability, and the Expected Shortfall, Available at SSRN: https://papers.ssrn.com/sol3/papers.cfm?abstract-id=3708379.Google Scholar
Fang, Y. and Qu, Z. (2014) Optimal combination of quota-share and stop-loss reinsurance treaties under the joint survival probability. IMA journal of Management Mathematics, 25(1), 89103.CrossRefGoogle Scholar
Föllmer, H. and Schied, A. (2004) Stochastic Finance, An introduction in Discrete Time, 2nd revised and extended edition. Berlin, New York: Welter de Gruyter.CrossRefGoogle Scholar
Hesselager, O. (1990) Some results on optimal reinsurance in terms of the adjustment coefficient. Scandinavian Actuarial Journal, 1, 8095.CrossRefGoogle Scholar
Hesselager, O. (1993) Extensions of Ohlin’s lemma with applications to optimal reinsurance structures. Insurance: Mathematics and Economics, 13(1), 8397.Google Scholar
Huang, Y. and Yin, C. (2019) A unifying approach to constrained and unconstrained optimal reinsurance. Journal of Computational and Applied Mathematics, 360, 117.CrossRefGoogle Scholar
Hürlimann, W. (2011) Optimal reinsurance revisited -point of view of ceded and reinsurer. Astin Bulletin, 41(2), 547574.Google Scholar
Jiang, W., Hong, H. and Ren, J. (2018) On pareto-optimal reinsurance with constraints under distortion risk measures. European Actuarial Journal, 8(1), 215243.CrossRefGoogle Scholar
Jiang, W., Ren, J. and Zitikis, R. (2017) Optimal reinsurance policies under the VaR risk measures when the interests of both the cedent and the reinsurer are taken into account. Risks, 5(11), 1132.CrossRefGoogle Scholar
Kaluszka, M. (2005) Truncated stop loss as optimal reinsurance agreement in one-period models. Astin Bulletin, 35, 337349.CrossRefGoogle Scholar
Lo, A. (2017a) A unifying approach to risk-measure-based optimal reinsurance problems with practical constraints. Scandinavian Actuarial Journal, 7, 584605.CrossRefGoogle Scholar
Lo, A. (2017b) A Neyman-Pearson perspective on optimal reinsurance with constraints. Astin Bulletin, 47(2), 467499.Google Scholar
Lo, A. and Tang, Z. (2019) Pareto-optimal reinsurance policies in the presence of individual risk constraints. Annals of Operations Research, 274(1–2), 395423.CrossRefGoogle Scholar
Ohlin, J. (1969) On a class of measures of dispersion with application to optimal reinsurance. Astin Bulletin, 5(2), 249266.CrossRefGoogle Scholar
Raviv, A. (1979) The design of an optimal insurance policy. American Economic Review, 69(1), 8496.Google Scholar
Vajda, S. (1962) Minimum variance reinsurance. Astin Bulletin, 2(2), 257260.CrossRefGoogle Scholar
Wang, R. and Zitikis, R. (2020) An Axiomatic foundation for the expected shortfall, Management Science (online), https://doi.org/10.1287/mnsc.2020.3617.Google Scholar
Young, V. (1999) Optimal insurance under Wang’s premium principle. Insurance: Mathematics and Economics, 25, 109122.Google Scholar
Young, V. (2004) Premium principles. In Encyclopedia of Actuarial Science (eds. Teugels, J. and Sundt, B. ), vol. 3. John Wiley & Sons.CrossRefGoogle Scholar
Zheng, Y. and Cui, W. (2014) Optimal reinsurance with premium constraint under distortion risk measures. Insurance: Mathematics and Economics, 59, 109120.Google Scholar
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