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A Fuzzy Approach to Multi-Objective Solid Transportation Problem with Mixed Constraints Using Hyperbolic Membership Function

Nurdan Kara
Nurdan Kara
 e 
Hale Gonce Kocken
Hale Gonce Kocken
   | 09 dic 2021
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Pubblicato online: 09 dic 2021
Pagine: 158 - 167
Ricevuto: 23 set 2021
Accettato: 12 nov 2021
DOI: https://doi.org/10.2478/cait-2021-0049
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© 2021 Nurdan Kara et al., published by Sciendo
This work is licensed under the Creative Commons Attribution-NonCommercial-NoDerivatives 4.0 International License.

1. Anuradha, D., M. Jayalakshmi, G. Deepa, V. Sujatha. Solution of Multiobjective Solid Transportation Problem in Fuzzy Approach. – AIP Conference, Vol. 2177, 2019, No 1, pp. 5-5. Search in Google Scholar

2. Bit, A. K., M. P. Biswal, S. S. Alam. Fuzzy Programming Approach to Multiobjective Solid Transportation Problem. – Fuzzy Sets and Systems, Vol. 57, 1993, pp. 183-194.10.1016/0165-0114(93)90158-E Search in Google Scholar

3. Bit, A. K. Fuzzy Programming with Hyperbolic Membership Functions for Multiobjective Capacitated Transportation Problem. – Operational Research Society of India, Vol. 41, 2004, pp. 106-120.10.1007/BF03398837 Search in Google Scholar

4. Bit, A. K. Fuzzy Programming with Hyperbolic Membership Functions for Multi-Objective Capacitated Solid Transportation Problem. – The Journal of Fuzzy Mathematics, Vol. 13, 2005, pp. 373-385. Search in Google Scholar

5. Bodkhe, S. G., V. H. Bajaj, D. B. Dhaigude. Fuzzy Programming Technique to Solve Multi-Objective Solid Transportation Problem with Some Non-Linear Membership Functions. – Advances in Computational Research, Vol. 2, 2010, No 1, pp. 15-20. Search in Google Scholar

6. Chen, L., J. Peng, B. Zhang. Uncertain Goal Programming Models for Bicriteria Solid Transportation Problem. – Applied Soft Computing, Vol. 51, 2017, pp. 49-59.10.1016/j.asoc.2016.11.027 Search in Google Scholar

7. Leberling, H. On Finding Compromise Solutions in Multicriteria Problems Using the Fuzzy Min-Operator. – Fuzzy Sets and Systems, Vol. 6, 1981, No 2, pp. 105-118.10.1016/0165-0114(81)90019-1 Search in Google Scholar

8. Peidro, D., P. Vasant. Transportation Planning with Modified S-Curve Membership Functions Using an Interactive Fuzzy Multi-Objective Approach. – Applied Soft Computing, Vol. 11, 2011, No 2, pp. 2656-2663.10.1016/j.asoc.2010.10.014 Search in Google Scholar

9. Peneva, V., I. Popchev. Fuzzy Multicriteria Decision Making. – Cybernetics and Information Technologies, Vol. 2, 2002, No 1, pp. 1-26. Search in Google Scholar

10. Pramanik, S., D. K. Jana, M. Maiti. Multi-Objective Solid Transportation Problem in Imprecise Environments. – Journal of Transportation Security, Vol. 6, 2013, No 2, pp. 131-150.10.1007/s12198-013-0108-0 Search in Google Scholar

11. Rath, P., R. B. Dash. Solution of Fuzzy Multi-Objective Linear Programming Problems Using Fuzzy Programming Techniques Based on Hyperbolic Membership Functions. – Journal of Computer and Mathematical Sciences, Vol. 7, 2016, No 12, pp. 653-662. Search in Google Scholar

12. Rath, P., R. B. Dash. Solution of Fuzzy Multi-Objective Linear Programming Problems Using Fuzzy Programming Techniques Based on Exponential Membership Functions. – Inter J. Mathematics Trends and Tech, Vol 41, 2017, pp. 289-292.10.14445/22315373/IJMTT-V41P529 Search in Google Scholar

13. Verma, R., M. P. Biswal, A. Biswas. Fuzzy Programming Technique to Solve Multi-Objective Transportation Problems with Some Non-Linear Membership Functions. – Fuzzy Sets and Systems, Vol. 91, 1997, No 1, pp. 37-43.10.1016/S0165-0114(96)00148-0 Search in Google Scholar

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