Worst VAR Scenarios: A Remark

ERN: Value-at-Risk (Topic) Pub Date : 2005-12-15 DOI:10.2139/ssrn.887178
Roger J. A. Laeven
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引用次数: 17

Abstract

Theorem 15 of Embrechts et al. [Embrechts, Paul, Hoing, Andrea, Puccetti, Giovanni, 2005. Worst VaR scenarios. Insurance: Math. Econom. 37, 115-134] proves that comonotonicity gives rise to the on-average-most-adverse Value-at-Risk scenario for a function of dependent risks, when the marginal distributions are known but the dependence structure between the risks is unknown. This note extends this result to the case where, rather than no information, partial information is available on the dependence structure between the risks. A result of Kaas et al. [Kaas, Rob, Dhaene, Jan, Goovaerts, Marc J., 2000. Upper and lower bounds for sums of random variables. Insurance: Math. Econom. 23, 151-168] is also generalized for this purpose.
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最糟糕的VAR情景:评论
Embrechts定理15 et . [Paul, Hoing, Andrea, Puccetti, Giovanni, 2005]。最糟糕的VaR情况。保险:数学。[经济学,37,115-134]证明,当边际分布已知,但风险之间的依赖结构未知时,对于依赖风险函数,共同性会产生平均最不利风险价值情景。本说明将此结果扩展到以下情况,即在风险之间的依赖结构上可以获得部分信息,而不是没有信息。Kaas的结果et al. [Kaas, Rob, Dhaene, Jan, Goovaerts, Marc J., 2000]。随机变量和的上界和下界。保险:数学。经济学。23,151-168]也为此目的进行了概括。
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ERN: Value-at-Risk (Topic)
ERN: Value-at-Risk (Topic)
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