Le, Tuan Anh and Dao, Thi Thanh Binh (2021): Portfolio optimization under mean-CVaR simulation with copulas on the Vietnamese stock exchange. Published in: Investment Management and Financial Innovations , Vol. 18, No. 2 (2021): pp. 273-286.
Preview |
PDF
MPRA_paper_111105.pdf Download (850kB) | Preview |
Abstract
This paper studies how to construct and compare various optimal portfolio frame-works for investors in the context of the Vietnamese stock market. The aim of the study is to help investors to find solutions for constructing an optimal portfolio strategy using modern investment frameworks in the Vietnamese stock market. The study contains a census of the top 43 companies listed on the Ho Chi Minh stock exchange (HOSE) over the ten-year period from July 2010 to January 2021. Optimal portfolios are constructed using Mean-Variance Framework, Mean-CVaR Framework under different copula simulations. Two-thirds of the data from 26/03/2014 to 27/1/2021 consists of the data of Vietnamese stocks during the COVID-19 recession, which caused depression globally; however, the results obtained during this period still provide a consistent outcome with the results for other periods. Furthermore, by randomly attempting different stocks in the research sample, the results also perform the same outcome as previous analyses. At about the same CvaR level of about 2.1%, for example, the Gaussian copula portfolio has daily Mean Return of 0.121%, the t copula portfolio has 0.12% Mean Return, while Mean-CvaR with the Raw Return portfolio has a lower Return at 0.103%, and the last portfolio of Mean-Variance with Raw Return has 0.102% Mean Return. Empirical results for all 10 portfolio levels showed that CVaR copula simulations significantly outperform the historical Mean-CVaR framework and Mean-Variance framework in the context of the Vietnamese stock exchange.
| Item Type: | MPRA Paper |
|---|---|
| Original Title: | Portfolio optimization under mean-CVaR simulation with copulas on the Vietnamese stock exchange |
| Language: | English |
| Keywords: | Gaussian copula, t copula, simulation, Mean-CVaR, Mean-Variance, portfolio optimization, Vietnam |
| Subjects: | C - Mathematical and Quantitative Methods > C6 - Mathematical Methods ; Programming Models ; Mathematical and Simulation Modeling > C61 - Optimization Techniques ; Programming Models ; Dynamic Analysis G - Financial Economics > G1 - General Financial Markets > G11 - Portfolio Choice ; Investment Decisions G - Financial Economics > G1 - General Financial Markets > G17 - Financial Forecasting and Simulation |
| Item ID: | 111105 |
| Depositing User: | Ms Thi Thanh Binh DAO |
| Date Deposited: | 23 Dec 2021 14:02 |
| Last Modified: | 23 Dec 2021 14:02 |
| References: | 1. Alexander, S., Coleman, T. F., & Li, Y. (2006). Minimizing CVaR and VaR for a Portfolio of Derivatives. Journal of Banking and Finance, 30(2), 583-605. https://doi.org/10.1016/j.jbankfin.2005.04.012 2. Andersson, F., A., Mausser, H., Rosen, D., & Uryasev, S. (2001). Credit Risk Optimization with Conditional Value-at-Risk Criterion. Mathematical Programming, 89(2), 273-291. Retrieved from https://link.springer.com/article/10.1007/ PL00011399 3. Artzner, P. F.-M. (1999). Coherent Measures of Risk. Mathematical Finance, 9(3), 203-228. https://doi.org/10.1111/1467-9965.00068 4. Chen, A. H., Fabozzi, F. J., & Huang, D. (2012). Portfolio Revision under MeanVariance and Mean-CVaR with Transaction Costs. Review of Quantitative Finance and Accounting, 39(4), 509-526. Retrieved from https:// ink.library.smu.edu.sg/lkcsb_research/4785/ 5. Chirag Shekhar, & Mark Trede. (2017). Portfolio Optimization Using Multivariate t-Copulas with Conditionally Skewed Margins. Review of Economics & Finance. Retrieved from https://econpapers.repec.org/article/bapjournl/170303.htm 6. Cuong Thanh NGUYEN, M. H. (2019). Modeling Stock Price Volatility: Empirical Evidence from the Ho Chi Minh City Stock Exchange in Vietnam. Journal of Asian Finance, Economics and Business, 6(3), 19-26. https://doi.org/10.13106/jafeb.2019.vol6.no3.19 7. Dao, B. T. (2014). Optimal Portfolio with Options in a Framework of Mean-CVaR. SSRN Electronic Journal. Retrieved from https://papers.ssrn.com/sol3/papers.cfmabstract_id=2543722 8. Hafsa, H. (2015). CVaR in Portfolio Optimization: An Essay on the French Market. International Journal of Financial Research, 6(2). https://doi.org/10.5430/ijfr.v6n2p101 9. Hu, J. (2012). An Empirical Comparison of Different Approaches in Portfolio Selection (U.U.D.M. Project Report 2012:7). Retrieved from https://uu.diva-portal.org/smash/get/diva2:529501/FULLTEXT01.pdf 10. Isaksson, D. (2016). Robust Portfolio Optimization with Expected Shortfall. Retrieved from http://kth.divaportal.org/smash/record.jsf?pid=diva2%3A934147&dswid=6030 11. Iyengar, Garud, & Ka, Alfred. (2009). Fast gradient descent method for Mean-CVaR optimization. Annals of Operations Research, 205. Retrieved from https://ideas.repec.org/a/spr/annopr/v205y2013i1p20321210.1007s10479-012-1245-8.html 12. Kakouris, I., & Rustem, B. (2013). Robust Portfolio Optimization with Copulas. European Journal of Operational Research, 235(1), 28-37. https://doi.org/10.1016/j.ejor.2013.12.022 13. Kolm, P. N., Tutuncu, R., & Fabozzi, F. J. (2014). 60 Years of Portfolio Optimization: Practical Challenges and Current Trends. European Journal of Operational Research, 234(2), 356-371. https://doi.org/10.1016/j.ejor.2013.10.060 14. Krokhmal, P. J. (2002). Portfolio Optimization With Conditional Value-At-Risk Objective and Constraints. Journal of Risk, 4, 43-68. http://dx.doi.org/10.21314/JOR.2002.057 15. Krzemienowski, A., & Szymczyk, S. (2016). Portfolio optimization with a copula-based extension of conditional value-at-risk. Annals of Operations Research. Retrieved from https://link.springer.com/article/10.1007/s10479-0141625-3 16. Lim, A., Shanthikumar, J., & Vahn, G. (2009). Fragility of CVaR in portfolio optimization. UC Berkeley: Center for Risk Management Research. Retrieved from https://escholarship.org/uc/item/5pp7z1z8 17. Linh H. Nguyen, Linh X. D. Nguyen, & Emmanuel Adegbite. (2018). Does Mean-CVaR Outperform Mean variance? Theoretical and Practical Perspectives. Retrieved from https://papers.ssrn.com/sol3/papers.cfm?abstract_id=3143827 18. Markowitz, H. (1952). Portfolio Selection. Journal of Finance, 7(1), 77-91. https://doi.org/10.1111/j.1540-6261.1952.tb01525.x 19. Markowitz, H. (1959). Portfolio Selection: Efficient Diversification of Investments (pp. 95-112). New York: John Wiley Sons. Retrieved from https://www.jstor.org/stable/j.ctt1bh4c8h 20. Nhat NGUYEN, Trung NGUYEN, Tuan TRAN, & An Mai. (2020). Shrinkage Model Selection for Portfolio Optimization on Vietnam Stock Market. Journal of Asian Finance, Economics and Business, 7(9), 135-145. http://dx.doi.org/10.13106/jafeb.2020.vol7.no9.135 21. Rockafellar, R. T., & Uryasev, S. (2000). Optimization of Conditional Value-at-Risk. Journal of Risk, 2, 21-42. Retrieved from https://www.risk.net/journalrisk/2161159/optimizationconditional-value-risk 22. Rockafellar, R. T., & Uryasev, S. (2002). Conditional Value-at-Risk for General Loss Distributions. Journal of Banking and Finance, 26(7), 1443-1471. https://doi.org/10.1016/S0378-4266(02)00271-6 23. Topaloglou, Nikolas, Hercules Vladimirou, & Stavros A. Zenios. (2002). CVaR Models with Selective Hedging for International Asset Allocation. Journal of Banking and Finance, 26(7), 1535-1561. https://doi.org/10.1016/S0378-4266(02)00289-3 24. Trabelsi, N., & Tiwari, A. K. (2019). Market-Risk Optimization among the Developed and Emerging Markets with CVaR Measure and Copula Simulation. Risks, 7(3), 78. https://doi.org/10.3390/risks7030078 25. Xubiao He, Pu Gong. ( 2007). Measuring the coupled risks: A copula-based CVaR model. Journal of Computational and Applied Mathematics, 223(2), 1066-1080. https://doi.org/10.1016/j.cam.2008.03.046 26. Zhang, Q. (2016). Multiportfolio Optimization with CVaR Risk Measure. Electronic Theses and Dissertations, 5685. Retrieved from https://scholar.uwindsor.ca/etd/5685/ |
| URI: | https://mpra.ub.uni-muenchen.de/id/eprint/111105 |
All papers reproduced by permission. Reproduction and distribution subject to the approval of the copyright owners.
 |
View Item |
