참고문헌
- F.L. Hitchcock, The distribution of a product from several sources to numerous localities, Journal of Mathematics and Physics 20 (1941), 224-230.
- C. Koopmans, Optimum utilization of the transportation system, Econometrica: Journal of the Econometric Society (1949), 136-146.
- P. Pandian and G. Natarajan, A new method for finding an optimal solution for transportation problems, International Journal of Mathematical Sciences and Engineering Applications 4 (2010), 59-65.
- Y.P. Aneja and K.P. Nair, Bicriteria transportation problem, Management Science 25 (1979), 73-78.
- H. Isermann, The enumeration of all efficient solutions for a linear multiple-objective transportation problem, Naval Research Logistics Quarterly 26 (1979), 123-139.
- B.I.N.A. Gupta and R.E.E.T.A. Gupta, Multi-criteria simplex method for a linear multiple objective transportation problem, Indian Journal of Pure and Applied Mathematics 14 (1983), 222-232.
- J.L. Ringuest and D.B. Rinks, Interactive solutions for the linear multi-objective transportation problem, European Journal of Operational Research 32 (1987), 96-106.
- H.S. Kasana and K.D. Kumar, An efficient algorithm for multi-objective transportation problems, Asia-Pacific Journal of Operational Research 17 (2000), 27.
- G. Bai and L. Yao, A simple algorithm for the multi-objective transportation model, International Conference on Business Management and Electronic Information 2 (2011), 479-482.
- P. Pandian and D. Anuradha, A new method for solving bi-objective transportation problems, Australian Journal of Basic and Applied Sciences 5 (2011), 67-74.
- M.A. Nomani, I. Ali and A. Ahmed, A new approach for solving multi-objective transportation problems, International Journal of Management Science and Engineering Management 12 (2017), 165-173.
- L. Kaur, M. Rakshit and S. Singh, A new approach to solve multi-objective transportation problem, Applications and Applied Mathematics: An International Journal 13 (2018), 10.
- L.A. Zadeh, Fuzzy sets, Information and Control 8 (1965), 338-353.
- L.A. Zadeh, Fuzzy sets as a basis for a theory of possibility, Fuzzy Sets and Systems 32 (1978), 3-28.
- C. Carlsson and R. Fuller, On possibilistic mean value and variance of fuzzy numbers, European Journal of Operational Research 122 (2001), 315-326.
- A. Gupta, A. Kumar and A. Kaur, Mehar's method to find exact fuzzy optimal solution of unbalanced fully fuzzy multi-objective transportation problems, Optimization Letters 6 (2012), 1737-1751
- S. Dhanasekar, S. Hariharan and P. Sekar, Fuzzy Hungarian MODI algorithm to solve fully fuzzy transportation problems, International Journal of Fuzzy Systems 19 (2017), 1479-1491.
- P. Singh, S. Kumari and P. Singh, Fuzzy efficient interactive goal programming approach for multi-objective transportation problems, International Journal of Applied and Computational Mathematics 3 (2017), 505-525.
- M. Bagheri, A. Ebrahimnejad, S. Razavyan, F. Hosseinzadeh Lotfi and N. Malekmohammadi, Solving the fully fuzzy multi-objective transportation problem based on the common set of weights in DEA, Journal of Intelligent and Fuzzy Systems 39 (2020), 3099-3124.
- M. Niksirat, A New Approach to Solve Fully Fuzzy Multi-Objective Transportation Problem, Fuzzy Information and Engineering 39 (2022), 1-12.
- Y. Kacher and P. Singh, Fuzzy harmonic mean technique for solving fully fuzzy multiobjective transportation problem, Journal of Computational Science 63 (2022), 101782.
- A.N. Revathi, S. Mohanaselvi and B. Said, An efficient neutrosophic technique for uncertain multi objective transportation problem, Neutrosophic Sets and Systems 53 (2023), 27.
- S.G. Bodkhe, Multi-objective transportation problem using fuzzy programming techniques based on exponential membership functions, International Journal of Statistics and Applied Mathematics 8 (2023), 20-24.
- M.M. Miah, A. AlArjani, A. Rashid, A.R. Khan, M.S. Uddin and E.A. Attia, Multiobjective optimization to the transportation problem considering non-linear fuzzy membership functions AIMS Mathematics 8 (2023), 10397-10419.
- K.T. Atanassov, Intuitionistic fuzzy sets, Fuzzy Sets and Systems 20 (1986), 87-96.
- A. Ebrahimnejad and J.L. Verdegay, A new approach for solving fully intuitionistic fuzzy transportation problems, Fuzzy Optimization and Decision Making 17 (2018), 447-474.
- A. Mahmoodirad, T. Allahviranloo and S. Niroomand, A new effective solution method for fully intuitionistic fuzzy transportation problem, Soft Computing (2018), 1-10.
- S.P. Wan, D.F. Li and Z.F. Rui, Possibility mean, variance and covariance of triangular intuitionistic fuzzy numbers, Journal of Intelligent and Fuzzy Systems 24 (2013), 847-858.
- T. Garai, D. Chakraborty and T.K. Roy, A multi-item generalized intuitionistic fuzzy inventory model with inventory level dependent demand using possibility mean, variance and covariance, Journal of Intelligent and Fuzzy Systems 35 (2018), 1021-1036.
- S.K. Roy, A. Ebrahimnejad, J.L. Verdegay and S. Das, New approach for solving intuitionistic fuzzy multi-objective transportation problem, Sadhana 43 (2018), 1-12.
- S. Ghosh, S.K. Roy, A. Ebrahimnejad and J.L. Verdegay, Multi-objective fully intuitionistic fuzzy fixed-charge solid transportation problem, Complex and Intelligent Systems 7 (2021), 1009-1023.
- S. Mahajan and S.K. Gupta, On fully intuitionistic fuzzy multi-objective transportation problems using different membership functions, Annals of Operations Research 296 (2021), 211-241.
- A.A.H. Ahmadini and F. Ahmad, Solving intuitionistic fuzzy multi-objective linear programming problem under neutrosophic environment, AIMS Mathematics 6 (2021), 4556-4580.
- R.K. Bera and S.K. Mondal, A multi-objective transportation problem under quantity dependent credit period and cost structure policies in triangular intuitionistic fuzzy environment, Engineering Applications of Artificial Intelligence 123 (2023), 106396.
- F. Smarandache, A unifying field in logics. Neutrosophy: Neutrosophic Probability, Set and Logic, American Research Press, Rehoboth, New York, 1999.
- I. Deli and Y. Subas, Single valued neutrosophic numbers and their applications to multicriteria decision making problem, Neutrosophic Sets and Systems 2 (2014), 1-13.
- H. Wang, F. Smarandache, Y.Q. Zhang and R. Sunderraman, Single valued neutrosophic sets, Multispace and Multistructure 4 (2010), 410-413.
- R.M. Rizk-Allah, A.E. Hassanien and M. Elhoseny, A multi-objective transportation model under neutrosophic environment, Computers and Electrical Engineering 69 (2018), 705-719.
- H.A.E.W. Khalifa, P. Kumar and S. Mirjalili, A KKM approach for inverse capacitated transportation problem in neutrosophic environment, Sadhana 46 (2021), 1-8.
- K. Khatter, Neutrosophic linear programming using possibilistic mean, Soft Computing 24 (2020), 16847-16867.
- T. Garai, S. Dalapati, H. Garg and T.K. Roy, Possibility mean, variance and standard deviation of single-valued neutrosophic numbers and its applications to multi-attribute decision-making problems, Sadhana 24 (2020), 18795-18809.
- S. Sandhiya and D. Anuradha Solving bi-objective assignment problem under neutrosophic environment, Reliability: Theory and Applications 17 (2022), 164-175.
- J. Intrator and J. Paroush, Sensitivity analysis of the classical transportation problem:A combinatorial approach, Computers and Operations Research 4 (1977), 213-226.
- H. Arsham, Postoptimality analyses of the transportation problem, Journal of the Operational Research Society 43 (1992), 121-139.
- S. Doustdargholi, D.D. Asl and V. Abasgholipour, Sensitivity analysis of righthand-side parameter in transportation problem, Applied Mathematical Sciences 3 (2009), 1501-1511.
- N.M. Badra, Sensitivity analysis of transportation problems, Journal of Applied Sciences Research 3 (2007), 668-675.
- N. Bhatia and A. Kumar, A new method for sensitivity analysis of fuzzy transportation problems, Journal of Intelligent and Fuzzy Systems 25 (2013), 167-175.
- K. Ravinder Reddy, Ch. Rajitha and L.P. Raj Kumar, Sensitivity analysis in fuzzy transportation problems with trapezoidal fuzzy numbers, IOSR Journal of Mathematics 18 (2022), 16-22.
- A. Thamaraiselvi and R. Santhi, A new approach for optimization of real life transportation problem in neutrosophic environment, Mathematical Problems in Engineering 2016 (2016), 1-9.
- A. Singh, A. Kumar and S.S. Appadoo, Modified approach for optimization of real life transportation problem in neutrosophic environment, Mathematical Problems in Engineering 2017 (2017).
- K.P. Sikkannan and V. Shanmugavel, Unraveling neutrosophic transportation problem using costs mean and complete contingency cost table, Neutrosophic Sets and Systems 29 (2019), 165-173.
- R.K. Saini, A. Sangal and M. Manisha, Application of single valued trapezoidal neutrosophic numbers in transportation problem, Neutrosophic Sets and Systems 35 (2020), 33.
- R.M. Umamageswari and G. Uthra, Generalized single valued neutrosophic trapezoidal numbers and their application to solve transportation problem, Studia Rosenthaliana 11 (2020), 164-170.
- A. Kumar, R. Chopra and R.R. Saxena, An efficient enumeration technique for a transportation problem in neutrosophic environment, Neutrosophic Sets and System 47 (2021), 354-365.
- S. Dhouib, Solving the single-valued trapezoidal neutrosophic transportation problems through the novel dhouib-matrix-TP1 heuristic, Mathematical Problems in Engineering 2021 (2021), 1-11.