Abstract
In this paper, a well-known network-structured problem called the transportation problem (TP) is considered in an uncertain environment. The transportation costs, supply and demand are represented by trapezoidal intuitionistic fuzzy numbers (TrIFNs) which are the more generalized form of trapezoidal fuzzy numbers involving a degree of acceptance and a degree of rejection. We formulate the intuitionistic fuzzy TP (IFTP) and propose a solution approach to solve the problem. The IFTP is converted into a deterministic linear programming (LP) problem, which is solved using standard LP algorithms. The main contributions of this paper are fivefold: (1) we convert the formulated IFTP into a deterministic classical LP problem based on ordering of TrIFNs using accuracy function; (2) in contrast to most existing approaches, which provide a crisp solution, we propose a new approach that provides an intuitionistic fuzzy optimal solution; (3) in contrast to existing methods that include negative parts in the obtained intuitionistic fuzzy optimal solution and intuitionistic fuzzy optimal cost, we propose a new method that provides non-negative intuitionistic fuzzy optimal solution and optimal cost; (4) we discuss about the advantages of the proposed method over the existing methods for solving IFTPs; (5) we demonstrate the feasibility and richness of the obtained solutions in the context of two application examples.
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Antony, R. J. P., Savarimuthu, S. J., & Pathinathan, T. (2014). Method for solving the transportation problem using triangular intuitionistic fuzzy number. International Journal of Computing Algorithm, 03, 590–605.
Atanassov, K. T. (1986). Intuitionistic fuzzy sets. Fuzzy Sets and Systems, 20, 87–96.
Ebrahimnejad, A. (2014). A simplified new approach for solving fuzzy transportation problems with generalized trapezoidal fuzzy numbers. Applied Soft Computing, 19, 171–176.
Ebrahimnejad, A. (2015a). Note on “A fuzzy approach to transport optimization problem”. Optimization and Engineering, 17(4), 981–985.
Ebrahimnejad, A. (2015b). An improved approach for solving fuzzy transportation problem with triangular fuzzy numbers. Journal of Intelligent and Fuzzy Systems, 29(2), 963–974.
Ebrahimnejad, A. (2015c). A duality approach for solving bounded linear programming with fuzzy variables based on ranking functions and its application in transportation problems. International Journal of Systems Science, 46, 2048–2060.
Ebrahimnejad, A. (2016a). New method for solving fuzzy transportation problems with LR flat fuzzy numbers. Information Sciences, 357, 108–124.
Ebrahimnejad, A. (2016b). Fuzzy linear programming approach for solving transportation problems with interval-valued trapezoidal fuzzy numbers. Sadhana, 41(3), 299–316.
Ebrahimnejad, A., & Verdegay, J. L. (2016). An efficient computational approach for solving type-2 intuitionistic fuzzy numbers based transportation problems. International Journal of Computational Intelligence Systems, 9(6), 1154–1173.
Hussain, R. J., & Kumar, P. S. (2012). Algorithmic approach for solving intuitionistic fuzzy transportation problem. Applied Mathematical Sciences, 6(80), 3981–3989.
Jimenez, F., & Verdegay, J. L. (1998). Uncertain solid transportation problem. Fuzzy Sets and Systems, 100, 45–57.
Jimenez, F., & Verdegay, J. L. (1999). Solving fuzzy solid transportation problems by an evolutionary algorithm based parametric approach. European Journal of Operational Research, 117, 485–510.
Kaur, A., & Kumar, A. (2012). A new approach for solving fuzzy transportation problems using generalized trapezoidal fuzzy numbers. Applied Soft Computing, 12, 1201–1213.
Kumar, P. S., & Hussain, R. J. (2015). Computationally simple approach for solving fully intuitionistic fuzzy real life transportation problems. International Journal of System Assurance Engineering and Management. https://doi.org/10.1007/s13198-014-0334-2.
Nagoorgani, A., & Abbas, S. (2013). A new method for solving intuitionistic fuzzy transportation problem. Applied Mathematical Science, 7(28), 1357–1365.
Ramík, J., & Vlach, M. (2016). Intuitionistic fuzzy linear programming and duality: A level sets approach. Fuzzy Optimization and Decision Making, 15(4), 457–489.
Silva, R. C., Cruz, C., & Verdegay, J. L. (2013). Fuzzy costs in quadratic programming problems. Fuzzy Optimization and Decision Making, 12(3), 231–248.
Singh, S. K., & Yadav, S. P. (2014). A new approach for solving intuitionistic fuzzy transportation problem of type-2. Annals of Operations Research, 243(1), 349–363.
Singh, S. K., & Yadav, S. P. (2015). Efficient approach for solving type-1 intuitionistic fuzzy transportation problem. International Journal of System Assurance Engineering and Management, 6(3), 259–267. https://doi.org/10.1007/s13198-014-0274-x.
Singh, S. K., & Yadav, S. P. (2016). Intuitionistic fuzzy transportation problem with various kinds of uncertainties in parameters and variables. International Journal of System Assurance Engineering and Management, 7(3), 262–272.
Sudhagar, S., & Ganesan, K. (2012). A fuzzy approach to transport optimization problem. Optimization and Engineering. https://doi.org/10.1007/s11081-012-9202-6.
Varghese, A., & Kuriakose, S. (2012). Centroid of an intuitionistic fuzzy number. Notes on Intuitionistic Fuzzy Sets, 18, 19–24.
Wan, S.-P., & Dong, J.-Y. (2016). Interval-valued intuitionistic fuzzy mathematical programming method for hybrid multi-criteria group decision making with interval-valued intuitionistic fuzzy truth degrees. Information Fusion, 26, 49–65.
Wan, S.-P., Wang, F., Xu, G.-L., Dong, J.-Y., & Tang, J. (2017). An intuitionistic fuzzy programming method for group decision making with interval-valued fuzzy preference relations. Fuzzy Optimization and Decision Making, 16(3), 269–295.
Zadeh, L. A. (1965). Fuzzy sets. Information and Computation, 8, 338–353.
Acknowledgements
Research supported through Projects TIN2014-55024-P and P11-TIC-8001 from the Spanish Ministry of Economy and Competitiveness, and Consejería de Economía, Innovación y Ciencia, Junta de Andalucía (both including FEDER funds) respectively. The first author would also like to thank the office of Vice Chancellor for Research and Technology at Islamic Azad University, Qaemshahr Branch, for their financial support.
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Ebrahimnejad, A., Verdegay, J.L. A new approach for solving fully intuitionistic fuzzy transportation problems. Fuzzy Optim Decis Making 17, 447–474 (2018). https://doi.org/10.1007/s10700-017-9280-1
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DOI: https://doi.org/10.1007/s10700-017-9280-1