How to cite this paper
Salehi, K. (2014). An approach for solving multi-objective assignment problem with interval parameters.Management Science Letters , 4(9), 2155-2160.
Refrences
Belacela, N., & Boulasselb, M.R. (2001). Multicriteria fuzzy assignment method: a useful tool to assist medical diagnosis. Artificial Intelligence Medicine, 21, 201–207.
Bit, A.K., Biswal, M.P., & Alam, S.S. (1994). Fuzzy programming approach to multi-objective assignment problem. Journal of Fuzzy Mathematics (USA), 2, 905-909.
Bogomolnaia, A. (2001). A new solution to the random assignment problem. Journal of Economic Theory, 100, 295–328.
Bogomolnaia, A., & Moulin, H. (2002). A simple random assignment problem with a unique solution. Economic Theory, 19(3), 623-636.
Coppersmith, D., & Sorkin, G.B. (1999). Constructive bounds and exact expectation for the random assignment problem. Random Structure Algorithm, 15(2), 113–144.
Feng, Y., & Yang, L. (2006). A two-objective fuzzy k-cardinality assignment problem. Journal of Computational Applied Mathematics, 197, 233–244.
Kagade, K. L., & Bajaj, V. H. (2010). Fuzzy method for solving multi-objective assignment problem with interval cost. Journal of Statistics and Mathematics, 1, 01-09.
Kumar, A. and Gupta, A. (2012). Assignment and Travelling Salesman Problems with Coefficients as LR Fuzzy Parameters. International Journal of Applied Science and Engineering, 10(3), 155-170.
Lin, C.J., & Wen, U.P. (2004). The labeling algorithm for the fuzzy assignment problem. Fuzzy Set and Systems, 142, 373–391.
Lin,C.J., Wen, U.P., & Lin, P.Y. (2011). Advanced sensitivity analysis of the fuzzy assignment problem. Applied Soft Computation, 11, 5341–5349
Liu, L., & Gao, X. (2009). Fuzzy weighted equilibrium multi-job assignment problem and genetic algorithm. Applied Mathematical Modeling, 33, 3926–3935.
Liu, L., & Li, Y. (2006). The fuzzy quadratic assignment problem with penalty: new models and genetic algorithm. Applied Mathematical Computation, 174, 1229–1244.
Marler, R. T., & Arora, J. S. (2004). Survey of multi-objective optimization methods for engineering. Structural and multidisciplinary optimization, 26(6), 369-395.
Mukherjee, S., & Basu, K. (2010). Application of fuzzy ranking method for solving assignment problems with fuzzy costs. International Journal of Computational and Applied Mathematics, 5, 359-368.
Mukherjee, S., & Basu, K. (2011). Solving intuitionistic fuzzy assignment problem by using similarity measures and score functions. International Journal of Pure and Applied Sciences and Technology, 2(1), 1-18.
Ridwan, M. (2004). Fuzzy preference based traffic assignment problem. Transportation Research Part C, 12, 209–233.
Saati, S., Memariani, A., & Jahanshahloo, G.R. (2002). Efficiency analysis and ranking of decision making units with fuzzy data. Fuzzy Optimization and Decision Making, 1(3), 255-267.
Zhou, F., Huang, G.H., Chen, G.X., & Guo, H.C. (2009). Enhanced-interval linear programming. European Journal of Operational Research, 199, 323–333
Bit, A.K., Biswal, M.P., & Alam, S.S. (1994). Fuzzy programming approach to multi-objective assignment problem. Journal of Fuzzy Mathematics (USA), 2, 905-909.
Bogomolnaia, A. (2001). A new solution to the random assignment problem. Journal of Economic Theory, 100, 295–328.
Bogomolnaia, A., & Moulin, H. (2002). A simple random assignment problem with a unique solution. Economic Theory, 19(3), 623-636.
Coppersmith, D., & Sorkin, G.B. (1999). Constructive bounds and exact expectation for the random assignment problem. Random Structure Algorithm, 15(2), 113–144.
Feng, Y., & Yang, L. (2006). A two-objective fuzzy k-cardinality assignment problem. Journal of Computational Applied Mathematics, 197, 233–244.
Kagade, K. L., & Bajaj, V. H. (2010). Fuzzy method for solving multi-objective assignment problem with interval cost. Journal of Statistics and Mathematics, 1, 01-09.
Kumar, A. and Gupta, A. (2012). Assignment and Travelling Salesman Problems with Coefficients as LR Fuzzy Parameters. International Journal of Applied Science and Engineering, 10(3), 155-170.
Lin, C.J., & Wen, U.P. (2004). The labeling algorithm for the fuzzy assignment problem. Fuzzy Set and Systems, 142, 373–391.
Lin,C.J., Wen, U.P., & Lin, P.Y. (2011). Advanced sensitivity analysis of the fuzzy assignment problem. Applied Soft Computation, 11, 5341–5349
Liu, L., & Gao, X. (2009). Fuzzy weighted equilibrium multi-job assignment problem and genetic algorithm. Applied Mathematical Modeling, 33, 3926–3935.
Liu, L., & Li, Y. (2006). The fuzzy quadratic assignment problem with penalty: new models and genetic algorithm. Applied Mathematical Computation, 174, 1229–1244.
Marler, R. T., & Arora, J. S. (2004). Survey of multi-objective optimization methods for engineering. Structural and multidisciplinary optimization, 26(6), 369-395.
Mukherjee, S., & Basu, K. (2010). Application of fuzzy ranking method for solving assignment problems with fuzzy costs. International Journal of Computational and Applied Mathematics, 5, 359-368.
Mukherjee, S., & Basu, K. (2011). Solving intuitionistic fuzzy assignment problem by using similarity measures and score functions. International Journal of Pure and Applied Sciences and Technology, 2(1), 1-18.
Ridwan, M. (2004). Fuzzy preference based traffic assignment problem. Transportation Research Part C, 12, 209–233.
Saati, S., Memariani, A., & Jahanshahloo, G.R. (2002). Efficiency analysis and ranking of decision making units with fuzzy data. Fuzzy Optimization and Decision Making, 1(3), 255-267.
Zhou, F., Huang, G.H., Chen, G.X., & Guo, H.C. (2009). Enhanced-interval linear programming. European Journal of Operational Research, 199, 323–333