Haezendonck–Goovaerts risk measure with a heavy tailed loss |
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| Institution: | 1. School of Statistics and Research Center of Applied Statistics, Jiangxi University of Finance and Economics, Nanchang, Jiangxi 330013, PR China;2. Department of Risk Management and Insurance, Georgia State University, Atlanta, GA 30303, USA;1. Graduate School of Engineering Science, Osaka University 1-3 Machikaneyama-cho, Toyonaka, Osaka 560-8531, Japan;2. Department of Energy and Technology, Swedish University of Agricultural Sciences, Sweden;3. Department of Mathematics, Linköping University, Sweden;1. School of Statistics, Jiangxi University of Finance and Economics, Nanchang, Jiangxi, 330013, PR China;2. Research Center of Applied Statistics, Jiangxi University of Finance and Economics, Nanchang, Jiangxi, 330013, PR China;3. School of Mathematics and Statistics, Central South University, Changsha, Hunan, 410075, PR China;4. School of Mathematics and Information Sciences, Guangxi University, Nanning, Guangxi, 530004, PR China;1. Department of Statistics and Actuarial Science, University of Waterloo, Waterloo, ON, N2L 3G1, Canada;2. Department of Risk and Insurance, Wisconsin School of Business, University of Wisconsin–Madison, Madison, WI, 53706, USA;1. School of Mathematics and Computer Science, Jiangxi Science and Technology Normal University, Nanchang 330038, PR China;2. Department of Mathematics, Nanchang Normal University, Nanchang 330032, PR China |
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| Abstract: | Recently Haezendonck–Goovaerts (H–G) risk measure has received much attention in (re)insurance and portfolio management. Some nonparametric inferences have been proposed in the literature. When the loss variable does not have enough moments, which depends on the involved Young function, the nonparametric estimator in Ahn and Shyamalkumar (2014) has a nonnormal limit, which challenges interval estimation. Motivated by the fact that many loss variables in insurance and finance could have a heavier tail such as an infinite variance, this paper proposes a new estimator which estimates the tail by extreme value theory and the middle part nonparametrically. It turns out that the proposed new estimator always has a normal limit regardless of the tail heaviness of the loss variable. Hence an interval with asymptotically correct confidence level can be obtained easily either by the normal approximation method via estimating the asymptotic variance or by a bootstrap method. A simulation study and real data analysis confirm the effectiveness of the proposed new inference procedure for estimating the H–G risk measure. |
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| Keywords: | Empirical process Fixed level Haezendonck–Goovaerts risk measure Heavy tail Intermediate level |
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