Portfolio selection based on semivariance and distance correlation under minimum variance framework

Sun Ruili; Ma Tiefeng; Liu Shuangzhe

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Portfolio selection based on semivariance and distance correlation under minimum variance framework

机译：最小方差框架下基于半方差和距离相关的投资组合选择

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摘要

In the minimum variance model, the covariance matrix plays an important role because it measures the risk and relationship of asset returns simultaneously under the normality assumption. However, in practice, the distribution of asset returns is nonnormal and has an obvious fat-tail nature. In addition, the risk is one-sided. In this paper, the main objective is to propose a better tool to replace the covariance matrix. The covariance matrix can be decomposed into two parts: a diagonal variance matrix and a square matrix with its elements being the Pearson correlation coefficient. A substitution of the covariance matrix is presented by replacing the variance and Pearson correlation coefficient in the decomposition of the covariance matrix with a semivariance and distance correlation coefficient, respectively. The proposed portfolio optimization strategy is applied to empirical data, and the numerical studies show the strategy performs well.

机译：在最小方差模型中，协方差矩阵起着重要作用，因为它在正态性假设下同时测量资产收益的风险和关系。但是，实际上，资产收益的分配是非正态的，并且具有明显的尾部特征。另外，风险是单方面的。本文的主要目的是提出一种更好的工具来替换协方差矩阵。协方差矩阵可分解为两部分：对角方差矩阵和方阵，其元素为Pearson相关系数。通过分别用半方差和距离相关系数替换协方差矩阵分解中的方差和Pearson相关系数来表示协方差矩阵的替换。提出的投资组合优化策略被应用于经验数据，数值研究表明该策略表现良好。

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来源
《Statistica neerlandica》 |2019年第3期|373-394|共22页
作者
Sun Ruili; Ma Tiefeng; Liu Shuangzhe;
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作者单位

Zhongyuan Bank, Zhongyuan Bank Postdoctoral Programme, Zhengzhou, Henan, Peoples R China;

Southwestern Univ Finance & Econ, Sch Stat, Chengdu, Sichuan, Peoples R China;

Univ Canberra, Fac Sci & Technol, Canberra, ACT 2601, Australia;

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原文格式 PDF
正文语种 eng
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关键词
distance correlation; downside risk; fat-tail; portfolio optimization; semivariance;

机译：距离相关;下行风险;脂肪尾;投资组合优化;半变性;

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1. Portfolio selection based on semivariance and distance correlation under minimum variance framework [J] . Sun Ruili, Ma Tiefeng, Liu Shuangzhe Statistica neerlandica . 2019,第3期

机译：基于MISIVARIACIENICE框架下的半变性和距离相关的投资组合选择
2. Mean-variance and mean-semivariance portfolio selection: a multivariate nonparametric approach [J] . Hanen Ben Salah, Jan G. De Gooijer, Ali Gannoun, Financial Markets and Portfolio Management . 2018,第4期

机译：均方差和均半方差投资组合选择：多元非参数方法
3. Multi-period fuzzy mean-semi variance portfolio selection problem with transaction cost and minimum transaction lots using genetic algorithm [J] . Barati M., Mohammadi M., Naderi B. International Journal of Industrial Engineering Computations . 2016,第2期

机译：交易成本最小交易手的多周期模糊均值-半方差投资组合选择问题的遗传算法
4. Adaptive rolling window selection for minimum variance portfolio estimation based on reinforcement learning [C] . Bruno Gašperov, Fredi Šarić, Stjepan Begušić, . 2020

机译：基于强化学习的最小方差投资组合估计的自适应滚动窗口选择
5. Large Portfolio Selection Under Mean-Variance Framework [D] . Ao, Mengmeng. 2016

机译：平均方差框架下的大型投资组合选择
6. Research on regularized mean–variance portfolio selection strategy with modified Roy safety-first principle [O] . Ebenezer Fiifi Emire Atta Mills, Dawen Yan, Bo Yu, -1

机译：改进的罗伊安全第一原理的均值-方差组合投资选择策略研究
7. Mean–variance and mean–semivariance portfolio selection: a multivariate nonparametric approach [O] . Hanen Ben Salah, Jan G. De Gooijer, Ali Gannoun, 2018

机译：平均方差和均值 - 半决赛组合选择：多变量非参数方法

Portfolio selection based on semivariance and distance correlation under minimum variance framework

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