运用奥曼-塞拉诺风险指数

IF 3.6 Q1 BUSINESS, FINANCE
Doron Nisani, Amit Shelef, OrrOSON David
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引用次数: 1

摘要

目的本研究的目的是估计Aumann–Serrano风险指数的收敛阶。设计/方法/方法本研究使用Aumann–Serrano Riskines指数和矩生成函数之间的等效关系,并对每两个统计矩之间的统计显著性进行汇总比较。因此,本研究能够找到指数对其稳定值的收敛顺序。发现这项研究发现,Aumann–Serrano Riskines指数的第一个最佳估计值在不少于其第七个统计时刻达到。然而,这项研究也发现,它的第二个最佳近似可以用它的第二统计矩来实现。研究局限性/含义本研究的含义支持标准差作为Aumann–Serrano风险指数的统计充分近似值,从而加强了金融市场资产定价的CAPM方法。原创性/价值这项研究在理论和实践上为理解风险结构提供了新的视角,因为它可以提高资产定价的准确性。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Putting the Aumann–Serrano Riskiness Index to work
Purpose The purpose of this study is to estimate the convergence order of the Aumann–Serrano Riskiness Index. Design/methodology/approach This study uses the equivalent relation between the Aumann–Serrano Riskiness Index and the moment generating function and aggregately compares between each two statistical moments for statistical significance. Thus, this study enables to find the convergence order of the index to its stable value. Findings This study finds that the first-best estimation of the Aumann–Serrano Riskiness Index is reached in no less than its seventh statistical moment. However, this study also finds that its second-best approximation could be achieved with its second statistical moment. Research limitations/implications The implications of this research support the standard deviation as a statistically sufficient approximation of Aumann–Serrano Riskiness Index, thus strengthening the CAPM methodology for asset pricing in the financial markets. Originality/value This research sheds a new light, both in theory and in practice, on understanding of the risk’s structure, as it may improve accuracy of asset pricing.
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来源期刊
CiteScore
4.30
自引率
0.00%
发文量
18
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