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Extreme-value based estimation of the conditional tail moment with application to reinsurance rating

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  • Goegebeur, Yuri
  • Guillou, Armelle
  • Pedersen, Tine
  • Qin, Jing

Abstract

We study the estimation of the conditional tail moment, defined for a non-negative random variable X as θβ,p=E(Xβ|X>U(1/p)), β>0, p∈(0,1), provided E(Xβ)<∞, where U denotes the tail quantile function given by U(x)=inf⁡{y:F(y)⩾1−1/x}, x>1, associated to the distribution function F of X. The focus will be on situations where p is small, i.e., smaller than 1/n, where n is the number of observations on X that is available for estimation. This situation corresponds to extrapolation outside the data range, and requires extreme value arguments to construct an appropriate estimator. The asymptotic properties of the estimator, properly normalised, are established under suitable conditions. The developed methodology is applied to estimation of the expected payment and the variance of the payment under an excess-of-loss reinsurance contract. We examine the finite sample performance of the estimators by a simulation experiment and illustrate their practical use on the Secura Belgian Re automobile claim data.

Suggested Citation

  • Goegebeur, Yuri & Guillou, Armelle & Pedersen, Tine & Qin, Jing, 2022. "Extreme-value based estimation of the conditional tail moment with application to reinsurance rating," Insurance: Mathematics and Economics, Elsevier, vol. 107(C), pages 102-122.
  • Handle: RePEc:eee:insuma:v:107:y:2022:i:c:p:102-122
    DOI: 10.1016/j.insmatheco.2022.08.003
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    References listed on IDEAS

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    1. Danielsson, J. & de Haan, L. & Peng, L. & de Vries, C. G., 2001. "Using a Bootstrap Method to Choose the Sample Fraction in Tail Index Estimation," Journal of Multivariate Analysis, Elsevier, vol. 76(2), pages 226-248, February.
    2. Drees, Holger & Kaufmann, Edgar, 1998. "Selecting the optimal sample fraction in univariate extreme value estimation," Stochastic Processes and their Applications, Elsevier, vol. 75(2), pages 149-172, July.
    3. Cai, Jun & Tan, Ken Seng, 2007. "Optimal Retention for a Stop-loss Reinsurance Under the VaR and CTE Risk Measures," ASTIN Bulletin, Cambridge University Press, vol. 37(1), pages 93-112, May.
    4. Armelle Guillou & Peter Hall, 2001. "A diagnostic for selecting the threshold in extreme value analysis," Journal of the Royal Statistical Society Series B, Royal Statistical Society, vol. 63(2), pages 293-305.
    5. Philippe Artzner & Freddy Delbaen & Jean‐Marc Eber & David Heath, 1999. "Coherent Measures of Risk," Mathematical Finance, Wiley Blackwell, vol. 9(3), pages 203-228, July.
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    Cited by:

    1. Yunran Wei & Ricardas Zitikis, 2022. "Assessing the difference between integrated quantiles and integrated cumulative distribution functions," Papers 2210.16880, arXiv.org, revised Apr 2023.
    2. Goegebeur, Yuri & Guillou, Armelle & Qin, Jing, 2024. "Dependent conditional tail expectation for extreme levels," Stochastic Processes and their Applications, Elsevier, vol. 171(C).
    3. Daouia, Abdelaati & Stupfler, Gilles & Usseglio-Carleve, Antoine, 2024. "A unified theory of extreme Expected Shortfall inference," TSE Working Papers 24-1565, Toulouse School of Economics (TSE).
    4. Wei, Yunran & Zitikis, Ričardas, 2023. "Assessing the difference between integrated quantiles and integrated cumulative distribution functions," Insurance: Mathematics and Economics, Elsevier, vol. 111(C), pages 163-172.

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    More about this item

    Keywords

    Conditional tail moment; Pareto-type distribution; Tail index; Excess-of-loss reinsurance; Second order condition; Order statistics;
    All these keywords.

    JEL classification:

    • C02 - Mathematical and Quantitative Methods - - General - - - Mathematical Economics
    • C10 - Mathematical and Quantitative Methods - - Econometric and Statistical Methods and Methodology: General - - - General
    • G22 - Financial Economics - - Financial Institutions and Services - - - Insurance; Insurance Companies; Actuarial Studies

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