Open Access
Issue |
RAIRO-Oper. Res.
Volume 58, Number 4, July-August 2024
|
|
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Page(s) | 2733 - 2766 | |
DOI | https://doi.org/10.1051/ro/2024086 | |
Published online | 02 July 2024 |
- R.K. Ahuja, Algorithms for the minimax transportation problem. Nav. Res. Logist. Q. 33 (1986) 725–739. [CrossRef] [Google Scholar]
- E. Ammar and E. Youness, Study on multiobjective transportation problem with fuzzy numbers. Appl. Math. Comput. 166 (2005) 241–253. [MathSciNet] [Google Scholar]
- S. Bansal and M.C. Puri, A min max problem. Math. Oper. Res. 24 (1977) 191–200. [Google Scholar]
- D. Barman, A. Kuiri and B. Das, A two-vehicle two-stage solid transportation problem with bi-fuzzy coefficients through genetic algorithm. Int. J. Math. Oper. Res. 18 (2021) 444–464. [CrossRef] [MathSciNet] [Google Scholar]
- J. Behnamian, S.M.T. Fatemi Ghomi, F. Jolai and O. Amirtaheri, Realistic two-stage flow shop batch scheduling problems with transportation capacity and times. Appl. Math. Model. 36 (2012) 723–735. [CrossRef] [MathSciNet] [Google Scholar]
- A. Biswas, A.A. Shaikh and S.T.A. Niaki, Multi-objective non-linear fixed charge transportation problem with multiple modes of transportation in crisp and interval environments. Appl. Soft. Comput. 80 (2019) 628–649. [CrossRef] [Google Scholar]
- G.A. Bula, H.M. Afsar, F.A. González, C. Prodhon and N. Velasco, Bi-objective vehicle routing problem for hazardous materials transportation. J. Clean. Prod. 206 (2019) 976–986. [CrossRef] [Google Scholar]
- H.I. Calvete, C. Gale, J.A. Iranzo and P. Toth, A metaheuristic for the two-stage fixed-charge transportation problem. Comput. Oper. Res. 95 (2018) 113–122. [CrossRef] [Google Scholar]
- D. Chakraborty, D.K. Jana and T.K. Roy, Multi-objective multi-item solid transportation problem with fuzzy inequality constraints. J. Inequal. Appl. 2014 (2014) 1–21. [CrossRef] [Google Scholar]
- P. Charnsethikul and S. Svetasreni, The constrained bottleneck transportation problem. J. Math. Stat. 3 (2007) 24–27. [CrossRef] [MathSciNet] [Google Scholar]
- N. Chikhi, M. Abbas, R. Benmansour, A. Bekrar and S. Hanafi, A two-stage flow shop scheduling problem with transportation considerations. 4OR 13 (2015) 381–402. [CrossRef] [MathSciNet] [Google Scholar]
- O. Cosma, P.C. Pop and C.P. Sitar, An efficient iterated local search heuristic algorithm for the two-stage fixed-charge transportation problem. Carpathian J. Math. 35 (2019) 153–164. [CrossRef] [MathSciNet] [Google Scholar]
- O. Cosma, P.C. Pop and D. Danciulescu, A parallel algorithm for solving a two-stage fixed-charge transportation problem. Informatica 31 (2020) 681–706. [Google Scholar]
- K. Dahiya and V. Verma, Capacitated transportation problem with bounds on rim conditions. Eur. J. Oper. Res. 178 (2007) 718–737. [CrossRef] [Google Scholar]
- G.B. Dantzig, Linear Programming and Extensions. RAND Corporation, Santa Monica, CA (1963). [Google Scholar]
- G. Dogaru and C. Nistor, Considerations on time minimization in transportation problem with impurities. Sci. Study Res. 19 (2009) 213–219. [Google Scholar]
- W. Grabowski, Transportation problem with minimization of time. Prz. Stat. 11 (1964) 333–359. [Google Scholar]
- K. Gupta and R. Arora, Optimum cost-time trade-off pairs in a fractional plus fractional capacitated transportation problem with restricted flow. Invest. Oper. 41 (2020) 27–41. [Google Scholar]
- K. Gupta and S.R. Arora, Bottleneck capacitated transportation problem with bounds on rim conditions. Opsearch 50 (2013) 491–503. [CrossRef] [MathSciNet] [Google Scholar]
- S. Gupta, I. Ali and A. Ahmed, Efficient fuzzy goal programming model for multi-objective production distribution problem. Int. J. Appl. Comput. Math. 76 (2018) 1–19. [CrossRef] [Google Scholar]
- P.L. Hammer, Time-minimizing transportation problems. Nav. Res. Logist. Q. 16 (1969) 345–357. [CrossRef] [Google Scholar]
- Y. Hinojosa, J. Puerto and F. Saldanha-da-Gama, A two-stage stochastic transportation problem with fixed handling costs and a priori selection of the distribution channels. TOP 22 (2014) 1123–1147. [CrossRef] [MathSciNet] [Google Scholar]
- M. Jain and P.K. Saksena, Time minimizing transportation problem with fractional bottleneck objective function. Yugosl. J. Oper. 22 (2012) 115–129. [CrossRef] [MathSciNet] [Google Scholar]
- E. Jain, K. Dahiya and V. Verma, Three-phase time minimization transportation problem. Eng. Optim. 53 (2021) 461–473. [CrossRef] [MathSciNet] [Google Scholar]
- D. Kannan, K. Govindan and H. Soleimani, Artificial immune system and sheep flock algorithms for two-stage fixed-charge transportation problem. Optimization 63 (2014) 1465–1479. [CrossRef] [MathSciNet] [Google Scholar]
- P. Kaur, A. Sharma, V. Verma and K. Dahiya, An alternate approach to solve two-level hierarchical time minimization transportation problem. 4OR 20 (2012) 23–61. [Google Scholar]
- P. Kaur, V. Verma and K. Dahiya, Capacitated two-stage time minimization transportation problem with restricted flow. RAIRO-Oper. Res. 51 (2017) 1169–1184. [Google Scholar]
- S. Khanna, H.C. Bakhsi and S.R. Arora, Time minimization transportation problem with restricted flow. Cahiers du CERO 25 (1983) 65–74. [Google Scholar]
- A. Khurana and S.R. Arora, The sum of a linear and a linear fractional transportation problem with restricted and enhanced flow. J. Interdiscip. Math. 9 (2006) 373–383. [CrossRef] [MathSciNet] [Google Scholar]
- A. Khurana, D. Thirwani and S.R. Arora, An algorithm for solving fixed charge bi-criterion indefinite quadratic transportation problem with restricted flow. Int. J. Optim.: Theory Methods App. 1 (2009) 367–380. [Google Scholar]
- J.B. Orlin, A polynomial time primal network simplex algorithm for minimum cut flows. Math. Program. 78 (1997) 109–129. [Google Scholar]
- P. Pandian and G. Natarajan, Solving two stage transportation problems, in International Conference on Logic, Information, Control and Computation, edited by P. Balasubramaniam. Vol. 140. Springer Berlin Heidelberg, Berlin, Heidelberg (2011) 159–165. [Google Scholar]
- J.A. Paul and M. Zhang, Supply location and transportation planning for hurricanes: a two-stage stochastic programming framework. Eur. J. Oper. Res. 274 (2019) 108–125. [CrossRef] [Google Scholar]
- G.V. Sarma, The transportation problem with objective of simultaneous minimization of total transportation cost and transportation time to each destination. Opsearch 35 (1998) 238–260. [CrossRef] [MathSciNet] [Google Scholar]
- D. Sengupta and U.K. Bera, Reduction of type-2 lognormal uncertain variable and its application to a two-stage solid transportation problem, in Operations Research and Optimization: FOTA 2016. Springer Proceedings in Mathematics & Statistics, edited by S. Kar, U. Maulik and X. Li. Vol. 225. Springer Singapore (2018) 333–345. [Google Scholar]
- V. Sharma, K. Dahiya and V. Verma, A note on a two-stage interval time minimization transportation problem. ASOR Bull. 27 (2008) 12–18. [Google Scholar]
- V. Sharma, K. Dahiya and V. Verma, Capacitated two-stage time minimization transportation problem. Asia-Pac. J. Oper. Res. 27 (2010) 457–476. [CrossRef] [MathSciNet] [Google Scholar]
- A. Sharma, V. Verma, P. Kaur and K. Dahiya, An iterative algorithm for two-level hierarchical time minimization transportation problem. Euro. J. Oper. Res. 246 (2015) 700–707. [CrossRef] [Google Scholar]
- P. Singh, Multiple-objective fractional costs transportation problem with bottleneck time and impurities. J. Inf. Optim. Sci. 36 (2015) 421–449. [MathSciNet] [Google Scholar]
- P. Singh and P.K. Saxena, Multiple objective cost-bottleneck time transportation problem with additional impurity constraints. Asia-Pac. J. Oper. Res. 17 (2000) 181–197. [Google Scholar]
- S. Sungeeta, T. Renu and S. Deepali, A review on fuzzy and stochastic extensions of the multi-index transportation problem. Yugosl. J. Oper. Res. 27 (2017) 3–29. [CrossRef] [MathSciNet] [Google Scholar]
- L. Tang and H. Gong, A hybrid two-stage transportation and batch scheduling problem. Appl. Math. Model. 32 (2008) 2467–2479. [CrossRef] [MathSciNet] [Google Scholar]
- D. Thirwani, S.R. Arora and S. Khanna, An algorithm for solving fixed charge bi-criterion transportation problem with restricted flow. Optimization 40 (1997) 193–206. [CrossRef] [MathSciNet] [Google Scholar]
- J.M. Vinotha, W. Ritha and A. Abraham, Total time minimization of fuzzy transportation problem. J. Intell. Fuzzy Syst. 23 (2012) 93–99. [CrossRef] [Google Scholar]
- F. Xie and Z. Li, An iterative solution technique for capacitated two-stage time minimization transportation problem. 4OR 20 (2022) 637–684. [CrossRef] [MathSciNet] [Google Scholar]
- F. Xie, M.M. Butt and Z. Li, A feasible flow-based iterative algorithm for the two-level hierarchical time minimization transportation problem. Comput. Oper. Res. 86 (2017) 124–139. [CrossRef] [MathSciNet] [Google Scholar]
- H. Zhu, A two stage scheduling with transportation and batching. Inf. Process. Lett. 112 (2012) 728–731. [CrossRef] [Google Scholar]
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