Advanced search
Publication Cover
Optimization
A Journal of Mathematical Programming and Operations Research
Volume 71, 2022 - Issue 13
Submit an article Journal homepage
280
Views
6
CrossRef citations to date
0
Altmetric
Research Article

Uncertain random mean–variance–skewness models for the portfolio optimization problem

Jia Zhaia School of Economics, Beijing International Studies University, Beijing, People’s Republic of ChinaCorrespondence[email protected]
View further author information
,
Manying Baib School of Economics and Management, Beihang University, Beijing, People’s Republic of ChinaView further author information
&
Junzhang Haoc Post-Doctoral Working Station, China Central Depository & Clearing Co., Ltd., Beijing, People’s Republic of China;d Post-Doctoral Research Station, Fudan University, Shanghai, People’s Republic of ChinaView further author information
Pages 3941-3964 | Received 30 Apr 2020, Accepted 16 Apr 2021, Published online: 20 May 2021

References

  • Markowitz H. Portfolio selection. J Finance. 1952;7(1):77–91.
  • Samuelson PA. The fundamental approximation theorem of portfolio analysis in terms of means, variances and higher moments. Rev Econ Stud. 1970;37(4):537–542.
  • Arditti FD. Risk and the required return on equity. Am Financ Assoc. 1967;22(1):19–36.
  • Konno H, Shirakawa H, Yamazaki H. A mean absolute deviation-skewness portfolio optimization model. Ann Oper Res. 1993;45:205–220.
  • Chunhachina P, Dandapani K, Hamid S, et al. Portfolio selection and skewness: evidence from international stock markets. J Bank Financ. 1997;21(2):143–167.
  • Liu S, Wang SY, Qiu W. Mean-variance-skewness model for portfolio selection with transaction costs. Int J Syst Sci. 2003;34(4):255–262.
  • Theodossiou P, Savva CS. Skewness and the relation between risk and return. Manage Sci. 2015;62(6):1598–1609.
  • Zhao S, Lu Q, Han L, et al. A mean-CVaR-skewness portfolio optimization model based on asymmetric Laplace distribution. Ann Oper Res. 2015;226(1):727–739.
  • Lu Y, Li J. Mean-variance-skewness portfolio selection model based on RBF-GA. Manage Sci Eng. 2017;11(1):47–53.
  • Carlsson C, Fullér R, Majlender P. A possibilistic approach to selecting portfolios with highest utility score. Fuzzy Sets Syst. 2002;131(1):13–21.
  • Huang X. Portfolio selection with fuzzy returns. J Intell Fuzzy Syst. 2007;18(4):383–390.
  • Zhang W, Wang Y-L, Chen Z-P, et al. Possibilistic mean–variance models and efficient frontiers for portfolio selection problem. Inf Sci. 2007;177(13):2787–2801.
  • Gupta P, Mehlawat MK, Saxena A. Asset portfolio optimization using fuzzy mathematical programming. Inf Sci. 2008;178(6):1734–1755.
  • Qin Z, Li X, Ji X. Portfolio selection based on fuzzy cross-entropy. J Comput Appl Math. 2009;228(1):139–149.
  • Li X, Qin Z, Kar S. Mean-variance-skewness model for portfolio selection with fuzzy returns. Eur J Oper Res. 2010;202(1):239–247.
  • Asano T. Portfolio inertia under ambiguity. Math Soc Sci. 2006;52(3):223–232.
  • Kara G, Özmen A, Weber G. Stability advances in robust portfolio optimization under parallelepiped uncertainty. Cent Eur J Oper Res. 2019;27(1):241–261.
  • Sawik BT. Conditional value-at-risk vs. value-at-risk to multi-objective portfolio optimization. Appl Manage Sci. 2012;15:277–305.
  • Sawik B. Application of multi-criteria mathematical programming models for assignment of services in a hospital. Appl Manage Sci. 2013;16:39–53.
  • Foroozesh N, Tavakkoli-Moghaddam R, Meysam Mousavi S, et al. A new comprehensive possibilistic group decision approach for resilient supplier selection with mean–variance–skewness–kurtosis and asymmetric information under interval-valued fuzzy uncertainty. Neural Comput Appl. 2019;31(11):6959–6979.
  • Liu B. Uncertainty theory. Berlin: Springer-Verlag; 2007.
  • Huang X. Portfolio analysis: from probabilistic to credibilistic and uncertain approaches. Berlin: Springer-Verlag; 2010.
  • Huang X. Mean-risk model for uncertain portfolio selection. Fuzzy Optim Decis Mak. 2011;10(1):71–89.
  • Huang X. A risk index model for portfolio selection with returns subject to experts’ estimations. Fuzzy Optim Decis Mak. 2012;11(4):451–463.
  • Huang X. Mean–variance models for portfolio selection subject to experts’ estimations. Expert Syst Appl. 2012;39(5):5887–5893.
  • Huang X, Zhao T. Mean-chance model for portfolio selection based on uncertain measure. Insur Math Econ. 2014;59:243–250.
  • Huang X, Zhao T, Kudratova S. Uncertain mean-variance and mean-semivariance models for optimal project selection and scheduling. Knowl Based Syst. 2016;93:1–11.
  • Huang X, Qiao L. An uncertain risk index model for multi-period portfolio selection. Inf Sci. 2012;217:108–116.
  • Liu Y, Qin Z. Mean semi-absolute deviation model for uncertain portfolio optimization problem. J Uncertain Syst. 2012;6(4):299–307.
  • Qin Z, Kar S, Zheng H. Uncertain portfolio adjusting model using semiabsolute deviation. Soft Comput. 2016;20(2):717–725.
  • Zhai J, Bai M. Mean-risk model for uncertain portfolio selection with background risk. J Comput Appl Math. 2018;330:59–69.
  • Chen W, Wang Y, Gupta P, et al. A novel hybrid heuristic algorithm for a new uncertain mean-variance-skewness portfolio selection model with real constraints. Appl Intell. 2018;48(9):2996–3018.
  • Chen W, Yun Wang J, Zhang SL. Uncertain portfolio selection with high-order moments. J Intell Fuzzy Syst. 2017;33(3):1397–1411.
  • Chen W, Li D, Liu Y. A novel hybrid ICA-FA algorithm for multiperiod uncertain portfolio optimization model based on multiple criteria. IEEE Trans Fuzzy Syst. 2019;27(5):1023–1036.
  • Liu Y. Uncertain random variables: a mixture of uncertainty and randomness. Soft Comput. 2013;17(4):625–634.
  • Liu Y. Uncertain random programming with applications. Fuzzy Optim Decis Mak. 2013;12(2):153–169.
  • Zhou J, Yang F, Wang K. Multi-objective optimization in uncertain random environments. Fuzzy Optim Decis Mak. 2014;13(4):397–413.
  • Qin Z. Mean-variance model for portfolio optimization problem in the simultaneous presence of random and uncertain returns. Eur J Oper Res. 2015;245(2):480–488.
  • Liu Y, Ralescu DA. Value-at-risk in uncertain random risk analysis. Inf Sci. 2017;391-392:1–8.
  • Qin Z, Dai Y, Haitao Z. Uncertain random portfolio optimization models based on value-at-risk. J Intell Fuzzy Syst. 2017;32(6):4523–4531.
  • Mehralizade R, Amini M, Gildeh BS, et al. Uncertain random portfolio selection based on risk curve. Soft Comput. 2020;24(17):13331–13345.
  • Chen L, Bian Y, Di H. Elliptic entropy of uncertain random variables with application to portfolio selection. Soft Comput. 2020;25:1–15.
  • Liu B. Uncertainty theory: a branch of mathematics for modeling human uncertainty. Berlin: Springer-Verlag; 2010.

Reprints and Corporate Permissions

Please note: Selecting permissions does not provide access to the full text of the article, please see our help page How do I view content?

To request a reprint or corporate permissions for this article, please click on the relevant link below:

Order Reprints Request Corporate Permissions

Academic Permissions

Please note: Selecting permissions does not provide access to the full text of the article, please see our help page How do I view content?

Obtain permissions instantly via Rightslink by clicking on the button below:

Request Academic Permissions

If you are unable to obtain permissions via Rightslink, please complete and submit this Permissions form. For more information, please visit our Permissions help page.

Related research

People also read lists articles that other readers of this article have read.

Recommended articles lists articles that we recommend and is powered by our AI driven recommendation engine.

Cited by lists all citing articles based on Crossref citations.
Articles with the Crossref icon will open in a new tab.