Markowitz, H.: Portfolio selection. J. Finance 7, 77–91 (1952)
Markowitz, H., Selection, P.: Efficient Diversification of Investments. Wiley, New York (1959)
Simkowitz, M., Beedles, W.: Diversification in a three moment world. J. Financ. Quant. Anal. 13, 927–941 (1978)
Mossion, J.: Optimal multiperiod portfolio policies. J .Business 41, 215–229 (1968)
Li, D., Chan, T.F., Ng, W.L.: Safety-first dynamic portfolio selection Dynamics of Continuous. Discret. Impuls. Syst. Series B: Appl. Algoritm. 4, 585–600 (1998)
Li, D., Ng, W.L.: Optimal dynamic portfolio selection: multiperiod mean–variance formulation. Math. Finance 10, 387–406 (2000)
Calafiore, G.C.: Multi-period portfolio optimization with linear control policies. Automatica 44, 2463–2473 (2008)
Zhu, S.S., Li, D., Wang, S.Y.: Risk control over bankruptcy in dynamic portfolio selection: a generalized mean–variance formulation. IEEE Trans. Autom. Control 49, 447–457 (2004)
Yu, M., Takahashi, S., Inoue, H., Wang, S.Y.: Dynamic portfolio optimization with risk control for absolute deviation model. Eur. J. Oper. Res. 201(2), 349–364 (2010)
Yan, W., Li, S.R.: A class of multi-period semi-variance portfolio selection with a four-factor futures price model. J. Appl. Math. Comput. 29, 19–34 (2009)
Pınar, M.Ç.: Robust scenario optimization based on downside-risk measure for multi-period portfolio selection. OR Spectrum 29, 295–309 (2007)
Zhang, W.G, Liu, Y.J., Xu, W.J.: A possibilistic mean-semivariance-entropy model for multi-period portfolio selection with transaction costs. Eur. J. Oper. Res. 222, 41–349 (2012)
Zhang, W.G, Liu, Y.-J., Xu, W.-J.: A new fuzzy programming approach for multi-period portfolio Optimization with return demand and risk control. Fuzzy Sets Syst. 246, 107–126 (2014)
Liu, Y.J., Zhang, W.G., Xu, W.J.: Fuzzy multi-period portfolio selection optimization models using multiple criteria. Automatica 48, 3042–3053 (2012)
Liu, Y.J., Zhang, W.G., Zhang, P.: A multi-period portfolio selection optimization model by using interval analysis. Econ. Model. 33, 113–119 (2013)
León, T., Liem, V., Vercher, M.E.: Viability of infeasible portfolio selection problems: A fuzzy approach. Eur. J. Oper. Res. 139, 178–189 (2002)
Tanaka, V, Guo, P., Türksen, I.B.: Portfolio selection based on fuzzy probabilities and possibility distributions. Fuzzy Sets Syst. 111, 387–397 (2000)
Inuiguchi, M., Tanino, T.: Portfolio selection under independent possibilistic information. Fuzzy Sets. Syst. 115, 83–92 (2000)
Giove, S., Funari, S., Nardelli, C.: An interval portfolio selection problems based on regret function. Eur.J. Oper. Res. 170, 253–264 (2006)
Zhang, W.G., Liu, W.A., Wang, Y.L.: On admissible efficient portfolio selection: models and algorithms. Appl. Math. Comput. 176, 208–218 (2006)
Carlsson, C., Fullér, R.: On possibilistic mean value and variance of fuzzy numbers. Fuzzy Sets Syst. 122, 315–326 (2001)
Huang, X.: Risk Curve and Fuzzy Portfolio Selection. Comput. Math. Appl. 55, 1102–1112 (2008)
Zhang, W.G., Wang, Y.-L., Chen, Z.-P., Nie, Z-K.: Possibilistic mean–variance models and efficient frontiers for portfolio selection problem. Inf. Sci. 177, 2787–2801 (2007)
Li, X., Qin, Z., Kar, S.: Mean-variance-skewness model for portfolio selection with fuzzy returns. Eur. J. Oper. Res. 202, 239–247 (2010)
Carlsson, C., Fullér, R., Majlender, P.: A possibilistic approach to selecting portfolios with highest utility score. Fuzzy Sets Syst. 131, 13–21 (2002)
Bienstock, D.: Computational study of a family of mixed-integer quadratic programming problems. Math. Program. 74, 121–140 (1996)
Bertsimas, D., Shioda, R.: Algorithms for cardinality-constrained quadratic optimization. Comput. Optim. Appl. 43, 1–22 (2009)
Li, D., Sun, X., Wang, J.: Optimal lot solution to cardinality constrained mean-variance formulation for portfolio selection. Math. Finance 16, 83–101 (2006)
Shaw, D.X., Liu, S., Kopman, L.: Lagrangian relaxation procedure for cardinality- constrained portfolio optimization. Optim. Methods Software 23, 411–420 (2008)
Cesarone, F., Scozzari, A., Tardella, F.: A new method for mean-variance portfolio optimization with cardinality constraints. Annals. Oper. Res. 205, 213–234 (2013)
Cui, X.T., Zheng, X.J., Zhu, S.S., Sun, X.L.: Convex relaxations and MIQCQP reformulations for a class of cardinality-constrained portfolio selection problems. J. Global Optim. 56, 1409–1423 (2013)
Sun, X.L., Zheng, X.J., Li, D.: Recent Advances in Mathematical Programming with Semi-continuous Variables and Cardinality Constraint. J. Oper. Res. Soc. China 1, 55–77 (2013)
Murray, W., Shek, H.: A local relaxation method for the cardinality constrained portfolio optimization problem. Comput. Optim. Appl. 53, 681–709 (2012)
Moeini, M., Le Thi, H.A., Dinh, T.P.: Portfolio selection under downside risk measures and cardinality constraints based on DC programming and DCA. Comput. Manag. Sci. 6, 459–475 (2009)
Le Thi, H.A., Moeini, M.: Long-Short Portfolio Optimization Under Cardinality Constraints by Difference of Convex Functions Algorithm. J. Optim. Theory Appl. 161, 199–224 (2014)
Anagnostopoulos, K.P., Mamanis, G.: The mean-variance cardinality constrained portfolio optimization problem: an experimental evaluation of five multiobjective evolutionary algorithms. Expert Syst. Appl. 38, 14208–14217 (2011)
Fernández, A., Gómez, S.: Portfolio selection using neural networks. Comput. Oper. Res. 34, 1177–1191 (2007)
Ruiz-Torrubiano, R., Suarez, A.: Hybrid approaches and dimensionality reduction for portfolio selection with cardinality constrains. IEEE Comput. Intel. Magazine 5, 92–107 (2010)
Woodside-Oriakhi, M., Lucas, C., Beasley, J.E.: Heuristic algorithms for the cardinality constrained efficient frontier. Eur J. Oper. Res. 213, 538–550 (2011)
Deng, G.F., Lin, W.T., Lo, C.C.: Markowitz-based portfolio selection with cardinality constraints using improved particle swarm optimization. Expert Syst. Appl. 39, 4558–4566 (2012)
Soleimani, H., Golmakani, H.R., Salimi, M.H.: Markowitz-based portfolio selection with minimum transaction lots, cardinality constraints and regarding sector capitalization using genetic algorithm. Expert Syst. Appl. 36, 5058–5063 (2009)
Vercher, E., BermÚdez, J.D.: A Possibilistic Mean-Downside Risk-Skewness Model for Efficient Portfolio Selection. IEEE Trans. Fuzzy Syst. 3, 585–595 (2013)
Saeidifar, A., Pasha, E.: The possibilistic moments of fuzzy numbers and their applications. J. Comput. Appl. Mathe. 2, 1028–1042 (2009)
Deng, X., Li, R.: A portfolio selection model with borrowing constraint based on possibility theory. Appl. Soft Comput. 12, 754–758 (2012)
Sadjadi, S.J., Seyedhosseini, S.M., Hassanlou, Kh.: Fuzzy multi period portfolio selection with different rates for borrowing and Lending. Appl. Soft Comput. 11, 3821–3826 (2011)
Arnott, R.D., Wagner, W.H.: The measurement and control of trading costs. Financ. Anal. J. 6, 73–80 (1990)
Yoshimoto, A.: The mean–variance approach to portfolio optimization subject to transaction costs. J. Oper. Res. Soc. Japan 39, 99–117 (1996)
Bertsimas, D., Pachamanova, D.: Robust multiperiod portfolio management in the presence of transaction costs. Comput. Oper. Res. 35, 3–17 (2008)
Gulpınar, N., Rustem, B., Settergren, R.: Multistage stochastic mean-variance portfolio analysis with transaction cost. Innov. Financ. Econ. Netw. 3, 46–63 (2003)
Vercher, E., Bermudez, J., Segura, J.: Fuzzy portfolio optimization under downside risk measures. Fuzzy Sets Syst. 158, 769–782 (2007)