Conditional Value-at-Risk under ellipsoidal uncertainties

机译：椭球不确定性下的条件风险价值

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Although Value-at-Risk (VaR) has been widely adapted in financial management, Conditional Value-at-risk (CVaR), which is also known as mean excess loss, mean shortfall, or tail VaR, has also gained importance over the past decade. This is largely owing to the more appealing mathematical properties of the latter. Based on Rockafellar and Uryasev's idea, we are going to look into the CVaR under an ellipsoidal distribution. With the ad-hoc primal-dual interior-point algorithm, we will also focus on the technique that minimizes the CVaR under the framework of portfolio selection.

机译：尽管风险价值（VaR）已在财务管理中广泛采用，但有条件风险价值（CVaR）（也称为平均超额损失，平均短缺或尾部VaR）在过去也变得越来越重要十年。这主要是由于后者的数学特性更具吸引力。基于Rockafellar和Uryasev的想法，我们将研究椭圆形分布下的CVaR。使用临时原始对偶内点算法，我们还将关注在投资组合选择框架下将CVaR最小化的技术。

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来源
《Computational Finance and Its Applications III》|2008年|P.217-226|共10页
会议地点 Cadiz(ES)
作者
M. H. Wong;
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作者单位

WIT Transactions on Information and Communication Technologies;

University of Cadiz(ES);

Wessex Institute of Technology(WIT)(GB);

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会议组织
原文格式 PDF
正文语种 eng
中图分类数据处理、数据处理系统;
关键词
conditional value-at-risk (cvar); value-at-risk (var); interior point algorithm; ellipsoidal uncertainties; clustered scenarios; risk management; portfolio management;

机译：条件风险值（cvar）;风险值（var）;内点算法;椭球不确定性;聚类方案;风险管理;组合管理;

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Conditional Value-at-Risk under ellipsoidal uncertainties

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