Risk Measures Based on Benchmark Loss Distributions

V. Bignozzi, Matteo Burzoni, Cosimo Munari
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引用次数: 19

Abstract

We introduce a class of quantile-based risk measures that generalize Value at Risk (VaR) and, likewise Expected Shortfall (ES), take into account both the frequency and the severity of losses. Under VaR a single confidence level is assigned regardless of the size of potential losses. We allow for a range of confidence levels that depend on the loss magnitude. The key ingredient is a benchmark loss distribution (BLD), i.e.~a function that associates to each potential loss a maximal acceptable probability of occurrence. The corresponding risk measure, called Loss VaR (LVaR), determines the minimal capital injection that is required to align the loss distribution of a risky position to the target BLD. By design, one has full flexibility in the choice of the BLD profile and, therefore, in the range of relevant quantiles. Special attention is given to piecewise constant functions and to tail distributions of benchmark random losses, in which case the acceptability condition imposed by the BLD boils down to first-order stochastic dominance. We provide a comprehensive study of the main finance theoretical and statistical properties of LVaR with a focus on their comparison with VaR and ES. Merits and drawbacks are discussed and applications to capital adequacy, portfolio risk management and catastrophic risk are presented.
基于基准损失分布的风险度量
我们引入了一类基于分位数的风险度量,它概括了风险价值(VaR),同样也考虑了损失的频率和严重程度。在风险价值下,无论潜在损失的大小,都分配一个单一的置信水平。我们允许根据损失幅度确定一系列置信水平。关键因素是基准损失分布(BLD),即一个函数,它将每个潜在损失与发生的最大可接受概率联系起来。相应的风险度量称为损失VaR (LVaR),它决定了将风险头寸的损失分配与目标BLD保持一致所需的最小资本注入。通过设计,人们在BLD配置文件的选择上具有充分的灵活性,因此,在相关分位数的范围内。特别注意了分段常数函数和基准随机损失的尾部分布,在这种情况下,BLD的可接受条件归结为一阶随机优势。我们对LVaR的主要金融理论和统计特性进行了全面的研究,重点是与VaR和ES的比较。讨论了其优缺点,并介绍了在资本充足率、投资组合风险管理和巨灾风险管理中的应用。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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