基于均值-CVaR的投资组合优化问题研究
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摘要
投资组合优化研究的是投资者如何通过合理的资金分配来达到既定收益下风险最小化或者既定风险水平下收益最大化,即如何选择最优资产组合。目前,该理论作为主要的分析工具已经被广泛应用于投资和理财中。投资组合优化理论不仅可以指导投资者做出科学的投资决策,而且还可以使金融投资实行真正的科学化管理。
本文在已有研究成果的基础上,基于CVaR方法,建立均值—CVaR投资组合优化模型,然后,从上证50指数样本股中选取了10只股票构成一个投资组合,分析了在同样置信水平下均值—方差模型和均值—CVaR的表现,研究了加入无风险资产之后对均值—方差模型和均值—CVaR模型有效前沿的影响。研究结果表明,CVaR能够更好地度量风险,尤其是当资产收益率不满足正态分布时;随着置信水平的提高,CVaR值不断变大,说明CVaR方法对尾部损失测量的精度更高;无风险资产的加入会使得均值—CVaR模型有效前沿发生变化。从整体上看,基于CVaR的均值—CVaR优化模型,无论是从精度上还是广度上,在对投资组合的风险度量和风险控制方面都比均值—方差模型或是均值—VaR模型具有更好的适应性。
Portfolio optimization studies the investors how to achieve minimum risk under the defined benefit level or maximum benefit under the given level of risk through reasonable distribution of funds. That is how to select the optimal portfolio. At present, the theory as the main analytical tool has been widely used in the investment and financial management. Portfolio optimization theory can not only guide investors to make scientific investment decisions, but also the financial investment is a real scientific management.
In the basis of existing research results, the paper based on CVaR ways to build mean-CVaR portfolio optimization model. Then select 10 stocks from the sample stocks in the SSE 50 Index to research and analyze the results. Then, we compared the mean-CVaR model with the Mean-Variance model, choose a better measure under the same confidence level. The results show that CVaR can better measure risk, especially when the return on assets does not meet the normal distribution;with the increase of confidence level CVaR also increases, indicating that CVaR can better measure the tail loss; risk-free assets would make the mean-CVaR efficient frontier model change. Overall, mean-CVaR is more adaptive than mean- variance or mean-VaR both from the accuracy or breadth in the portfolio's risk measurement and risk control.
本文在已有研究成果的基础上,基于CVaR方法,建立均值—CVaR投资组合优化模型,然后,从上证50指数样本股中选取了10只股票构成一个投资组合,分析了在同样置信水平下均值—方差模型和均值—CVaR的表现,研究了加入无风险资产之后对均值—方差模型和均值—CVaR模型有效前沿的影响。研究结果表明,CVaR能够更好地度量风险,尤其是当资产收益率不满足正态分布时;随着置信水平的提高,CVaR值不断变大,说明CVaR方法对尾部损失测量的精度更高;无风险资产的加入会使得均值—CVaR模型有效前沿发生变化。从整体上看,基于CVaR的均值—CVaR优化模型,无论是从精度上还是广度上,在对投资组合的风险度量和风险控制方面都比均值—方差模型或是均值—VaR模型具有更好的适应性。
Portfolio optimization studies the investors how to achieve minimum risk under the defined benefit level or maximum benefit under the given level of risk through reasonable distribution of funds. That is how to select the optimal portfolio. At present, the theory as the main analytical tool has been widely used in the investment and financial management. Portfolio optimization theory can not only guide investors to make scientific investment decisions, but also the financial investment is a real scientific management.
In the basis of existing research results, the paper based on CVaR ways to build mean-CVaR portfolio optimization model. Then select 10 stocks from the sample stocks in the SSE 50 Index to research and analyze the results. Then, we compared the mean-CVaR model with the Mean-Variance model, choose a better measure under the same confidence level. The results show that CVaR can better measure risk, especially when the return on assets does not meet the normal distribution;with the increase of confidence level CVaR also increases, indicating that CVaR can better measure the tail loss; risk-free assets would make the mean-CVaR efficient frontier model change. Overall, mean-CVaR is more adaptive than mean- variance or mean-VaR both from the accuracy or breadth in the portfolio's risk measurement and risk control.
引文
1 Markowitz H M. Portfolio Selection[J]. Journal of Finance,1952 (7):77-91
2 Konno H, Yamazaki H. Mean-absolute deviation portfolio optimization model and its application to Tokyo stock market[J]. Management Science,1991 (37):519-531.
3 Tobin J. Liquidity Preference as a behavior toward risk[J]. Review of Economic Studies,1958(39): 65-86
4 Sharp W. Capital Asset Prices:A theory of Capital Market Equilibrium under conditions of risk [J]. Journal of Finance,1964 (19):425-442
5 Limner J. The valuation of risky assets and the selection of risky investments in stock portfolios and capital budgets [J]. Review of Economics and Statistics,1965 (47):13-47
6 Perold A F. Large-scale portfolio optimization [J]. Management Science,1984 (30):1143-1160
7 Cai X Q, Teo K L, Yang X Q, Zhou X Y. Portfolio optimization under a minimax rule [J]. Management Science,2000 (46):957-972
8 JP Morgan. Riskmetrics-Technical document 3thed. New York:Morgan Guaranty Trust Company Global Research,1994.
9 Campabell R, Huisman R, Keoedijk K. Optimal portfolio selection in a Value-at-Risk frame work[J]. Journal of Banking&Finance,2001 (4):1789-1804
10 Artzner P, Delbaen F, Heath D. Coherence measures of risk[J]. Mathematical Finance,1999(9)
11 Rockfeller T, Uryasev S. Conditional Value-at-Risk for general loss distribution[J]. Journal of Banking&Finance,2002 (26):45-71.
12 Rockfdlar R T, Uryasev S. Conditional Value-at-risk for general loss distribution[J]. Journal of Banking&Finance,2002 (4):1445-1471
13唐小我.非负约束条件下组合证券投资决策方法研究[J].系统工程,1994(6):23-29
14宋逢明.基金分离下中国股市交易量模型的实证研究[J].中国管理科学,2000(3)
15屠新曙,厉斌,王春峰.效用函数意义下投资组合有效选择问题的研究[J].中国管理科学,2002(10):15-19
16张维,陈金龙.度量与控制金融风险的新方法[J].武汉理工大学学报(信息与管理工程版)2002(2):60-63
17王建华,李楚霖.CVaR与投资组合优化统一模型[J].系统工程理论方法应用,2002(1):68-71
18岳瑞峰,李振东.基于VaR和RAROC的保险基金最优投资研究[J].河北省科学院院报,2003(20):136-137
19陈学华.风险管理的CVaR方法及其简化模型[J].数量经济技术经济研究,2006(4)
20刘小茂等.VaR与CVaR的比较研究及实证分析[J].华中科技大学学报,2005(10)
21文风华等.一致性风险及其算法与实证研究[J].系统工程理论与实践,2004(10)
22荣喜民等.不同均值一风险准则下的资产组合有效前沿比较研究[J].系统工程学报,2005(6):198-202
23刘志东等.有交易成本的证券投资研究[J].经济数学,2006(3)
24刘小茂,李楚霖,王建华.风险资产组合的均值--CVaR有效前沿(Ⅱ)[J].管理工程学报,2005,19(1):1-5
25[美]威廉.F.夏普(Sharpe W F)投资组合理论与资本市场[M].胡坚译.北京:机械工业出版社,2001:54-86
26[美]哈利.M.马科维茨.资产组合选择和资本市场的均值—方差分析[M].朱菁,欧阳向军译.上海:上海人民出版社,2006
27朱平辉.投资风险管理[M].厦门:厦门大学出版社,2007:1-67
28施兵超,杨文泽.金融风险管理[M].上海:上海财经大学出版社,2002:1-146
29[美]菲利普·乔瑞.VAR:风险价值—金融风险管理新标准[M].张海鱼译.北京:中信出版社,2000
30[英]马克·洛尔(Lore,M).金融风险管理手册[M].陈斌等译.机械工业出版社,2002
31[美]斯特朗.投资组合管理(第3版)[M].黄卉,周萌等译.北京:清华大学出版社,2005:105-149
32[英]Cormac Butler,风险值概论[M].于研,刘丹丹,陈勇译.上海:上海财经大学出版社,2002:64-97
33[美]米歇尔·科罗赫,丹·加莱,罗伯特·马克(Michel Crouhy & Dan Galai & Robert Mark).风险管理[M].曾刚,罗晓军,卢爽译.北京:中国财政经济出版社,2005
34刘晓星.基于CVaR的投资组合优化模型研究[J].商业研究,2006:15-18
35李婷,张卫国.基于VaR约束和无风险资产的证券组合选择[J].西安交通大学学报,1997(31)
36罗付岩,唐邵玲.基于fattailed-GARCH的VaR模型[J].系统工程,2005(11)
37戴晓凤,晏艳阳.现代投资学—组合投资分析与管理[M].湖南:湖南人民出版社,2003
38曲圣宁,田新时.风险管理中VaR模型的缺陷及CVaR模型研究[J].统计与决策,2005(5)
39徐永春,高岳林.金融风险管理的CVaR方法及实证分析[J].求索,2009(2)
40刘晓焕,袁广信.基于CVaR的开放式基金市场风险的研究[J].中南财经政法大学学报(自然科学版),2009(2)
41刘俊山.基于风险测度理论的VaR与CVaR的比较研究[J].数量经济技术经济研究,2007(3)
42席金平,吴润衡CVaR在商业银行风险度量中的比较分析与应用[J].山西财经大学学报,2009(4)
43陈彦斌,徐绪松,杨小青.半绝对离差证券组合投资模型[J].武汉大学学报理学版,2002
2 Konno H, Yamazaki H. Mean-absolute deviation portfolio optimization model and its application to Tokyo stock market[J]. Management Science,1991 (37):519-531.
3 Tobin J. Liquidity Preference as a behavior toward risk[J]. Review of Economic Studies,1958(39): 65-86
4 Sharp W. Capital Asset Prices:A theory of Capital Market Equilibrium under conditions of risk [J]. Journal of Finance,1964 (19):425-442
5 Limner J. The valuation of risky assets and the selection of risky investments in stock portfolios and capital budgets [J]. Review of Economics and Statistics,1965 (47):13-47
6 Perold A F. Large-scale portfolio optimization [J]. Management Science,1984 (30):1143-1160
7 Cai X Q, Teo K L, Yang X Q, Zhou X Y. Portfolio optimization under a minimax rule [J]. Management Science,2000 (46):957-972
8 JP Morgan. Riskmetrics-Technical document 3thed. New York:Morgan Guaranty Trust Company Global Research,1994.
9 Campabell R, Huisman R, Keoedijk K. Optimal portfolio selection in a Value-at-Risk frame work[J]. Journal of Banking&Finance,2001 (4):1789-1804
10 Artzner P, Delbaen F, Heath D. Coherence measures of risk[J]. Mathematical Finance,1999(9)
11 Rockfeller T, Uryasev S. Conditional Value-at-Risk for general loss distribution[J]. Journal of Banking&Finance,2002 (26):45-71.
12 Rockfdlar R T, Uryasev S. Conditional Value-at-risk for general loss distribution[J]. Journal of Banking&Finance,2002 (4):1445-1471
13唐小我.非负约束条件下组合证券投资决策方法研究[J].系统工程,1994(6):23-29
14宋逢明.基金分离下中国股市交易量模型的实证研究[J].中国管理科学,2000(3)
15屠新曙,厉斌,王春峰.效用函数意义下投资组合有效选择问题的研究[J].中国管理科学,2002(10):15-19
16张维,陈金龙.度量与控制金融风险的新方法[J].武汉理工大学学报(信息与管理工程版)2002(2):60-63
17王建华,李楚霖.CVaR与投资组合优化统一模型[J].系统工程理论方法应用,2002(1):68-71
18岳瑞峰,李振东.基于VaR和RAROC的保险基金最优投资研究[J].河北省科学院院报,2003(20):136-137
19陈学华.风险管理的CVaR方法及其简化模型[J].数量经济技术经济研究,2006(4)
20刘小茂等.VaR与CVaR的比较研究及实证分析[J].华中科技大学学报,2005(10)
21文风华等.一致性风险及其算法与实证研究[J].系统工程理论与实践,2004(10)
22荣喜民等.不同均值一风险准则下的资产组合有效前沿比较研究[J].系统工程学报,2005(6):198-202
23刘志东等.有交易成本的证券投资研究[J].经济数学,2006(3)
24刘小茂,李楚霖,王建华.风险资产组合的均值--CVaR有效前沿(Ⅱ)[J].管理工程学报,2005,19(1):1-5
25[美]威廉.F.夏普(Sharpe W F)投资组合理论与资本市场[M].胡坚译.北京:机械工业出版社,2001:54-86
26[美]哈利.M.马科维茨.资产组合选择和资本市场的均值—方差分析[M].朱菁,欧阳向军译.上海:上海人民出版社,2006
27朱平辉.投资风险管理[M].厦门:厦门大学出版社,2007:1-67
28施兵超,杨文泽.金融风险管理[M].上海:上海财经大学出版社,2002:1-146
29[美]菲利普·乔瑞.VAR:风险价值—金融风险管理新标准[M].张海鱼译.北京:中信出版社,2000
30[英]马克·洛尔(Lore,M).金融风险管理手册[M].陈斌等译.机械工业出版社,2002
31[美]斯特朗.投资组合管理(第3版)[M].黄卉,周萌等译.北京:清华大学出版社,2005:105-149
32[英]Cormac Butler,风险值概论[M].于研,刘丹丹,陈勇译.上海:上海财经大学出版社,2002:64-97
33[美]米歇尔·科罗赫,丹·加莱,罗伯特·马克(Michel Crouhy & Dan Galai & Robert Mark).风险管理[M].曾刚,罗晓军,卢爽译.北京:中国财政经济出版社,2005
34刘晓星.基于CVaR的投资组合优化模型研究[J].商业研究,2006:15-18
35李婷,张卫国.基于VaR约束和无风险资产的证券组合选择[J].西安交通大学学报,1997(31)
36罗付岩,唐邵玲.基于fattailed-GARCH的VaR模型[J].系统工程,2005(11)
37戴晓凤,晏艳阳.现代投资学—组合投资分析与管理[M].湖南:湖南人民出版社,2003
38曲圣宁,田新时.风险管理中VaR模型的缺陷及CVaR模型研究[J].统计与决策,2005(5)
39徐永春,高岳林.金融风险管理的CVaR方法及实证分析[J].求索,2009(2)
40刘晓焕,袁广信.基于CVaR的开放式基金市场风险的研究[J].中南财经政法大学学报(自然科学版),2009(2)
41刘俊山.基于风险测度理论的VaR与CVaR的比较研究[J].数量经济技术经济研究,2007(3)
42席金平,吴润衡CVaR在商业银行风险度量中的比较分析与应用[J].山西财经大学学报,2009(4)
43陈彦斌,徐绪松,杨小青.半绝对离差证券组合投资模型[J].武汉大学学报理学版,2002