Free Access
Issue |
RAIRO-Oper. Res.
Volume 55, 2021
Regular articles published in advance of the transition of the journal to Subscribe to Open (S2O). Free supplement sponsored by the Fonds National pour la Science Ouverte
|
|
---|---|---|
Page(s) | S2969 - S2982 | |
DOI | https://doi.org/10.1051/ro/2020136 | |
Published online | 02 March 2021 |
- H.G. Akdemir and F. Tiryaki, Bilevel stochastic transportation problem with exponentially distributed demand. Bitlis Eren Univ. J. Sci. Technol. 2 (2012) 32–37. [Google Scholar]
- P. Anukokila, B. Radhakrishnan and A. Anju, Goal programming approach for solving multi-objective fractional transportation problem with fuzzy parameters. RAIRO: OR 53 (2019) 157–178. [Google Scholar]
- A.K. Bit, M.P. Biswal and S.S. Alam, Fuzzy programming approach to multi-objective solid transportation problem. Fuzzy Sets Syst. 57 (1993) 183–194. [Google Scholar]
- A.K. Bhurjee and G. Panda, Multi-objective optimization problem with bounded parameters. RAIRO: OR 48 (2014) 545–558. [CrossRef] [Google Scholar]
- L. Cooper and L.J. LeBlanc, Stochastic transportation problems and other network related convex problems. Nav. Res. Logistics Q. 24 (1977) 327–336. [Google Scholar]
- A. Das, U.K. Bera and B. Das, A solid transportation problem with mixed constraint in different environment. J. Appl. Anal. Comput. 6 (2016) 179–195. [Google Scholar]
- S.K. Das, T. Mandal and S.A. Edalatpanah, A new approach for solving fully fuzzy linear fractional programming problems using the multi-objective linear programming. RAIRO: OR 51 (2017) 285–297. [CrossRef] [Google Scholar]
- U. Habiba and A. Quddoos, Multiobjective stochastic interval transportation problem involving general form of distributions. Adv. Math. Sci. J. 9 (2020) 3213–3219. [Google Scholar]
- S. Halder, B. Das, G. Panigrahi and M. Maiti, Solving a solid transportation problems through fuzzy ranking. In: Communication, Devices, and Computing. Springer, Singapore (2017) 283–292. [Google Scholar]
- K. Haley, The solid transportation problem. Oper. Res. 10 (1962) 448–463. [Google Scholar]
- K. Holmberg, Separable programming applied to the stochastic transportation problem. Research Report, LITH-MAT-R-1984-15, Department of Mathematics, Linkoping Institute of Technology, Sweden (1984). [Google Scholar]
- K. Holemberg and K.O. Jornsten, Cross decomposition applied to the stochastic transportation problem. Eur. J. Oper. Res. 17 (1984) 361–368. [Google Scholar]
- K. Holemberg and H. Tuy, A production-transportation problem with stochastic demand and concave production costs. Math. Program. 85 (1999) 157–179. [Google Scholar]
- S. Jana, B. Das, G. Panigrahi and M. Maiti, Profit Maximization solid transportation problem with Gaussian type-2 fuzzy environments. Ann. Pure Appl. Math. 2 (2018) 323–335. [Google Scholar]
- G.R. Jahanshahloo, B. Talebian, I.H. Lotfi and J. Sadeghi, Finding a solution for multi-objective linear fractional programming problem based on goal programming and data envelopment analysis. RAIRO: OR 51 (2017) 199–210. [CrossRef] [Google Scholar]
- F. Jimnez and J.L. Verdegay, Uncertain solid transportation problems. Fuzzy Sets Syst. 100 (1998) 45–57. [Google Scholar]
- D.S. Kim and N.V. Tuyen, A note on second-order Karush–Kuhn–Tucker necessary optimality conditions for smooth vector optimization problems. RAIRO:OR 52 (2018) 567–575. [Google Scholar]
- A. Kuiri and B. Das, A non-linear transportation problem with additional constraints in fuzzy environment. J. Emerg. Technol. Innov. Res. 5 (2018) 277–283. [Google Scholar]
- A. Kuiri and B. Das, An application of dynamic programming problem in multi stage transportation problem with fuzzy random parameters. IOSR J. Eng. 9 (2019) 30–41. [Google Scholar]
- D.R. Mahapatra, Multi-choice stochastic transportation problem involving Weibull distribution. Int. J. Optim. Control Theor. App. 4 (2014) 45–55. [Google Scholar]
- D. Mahapatra, S. Roy and M. Biswal, Computation of multi-objective stochastic transportation problem involving normal distribution with joint constraints. J. Fuzzy Math. 19 (2011) 865–876. [Google Scholar]
- D.R. Mahapatra, S.K. Roy and M.P. Biswal, Multi-choice stochastic transportation problem involving extreme value distribution. Appl. Math. Modell. 37 (2013) 2230–2240. [Google Scholar]
- G. Maity and S.K. Roy, Multi-item multi-choice integrated optimisation in inventory transportation problem with stochastic supply. Int. J. Oper. Res. 35 (2019) 318–339. [Google Scholar]
- G. Maity, S.K. Roy and J.L. Verdegay, Analyzing multimodal transportation problem and its application to artificial intelligence. Neural Comput. App. 32 (2020) 2243–2256. [Google Scholar]
- S. Midya and S.K. Roy, Solving single-sink, fixed-charge, multi-objective, multi-index stochastic transportation problem. Am. J. Math. Manage. Sci. 33 (2014) 300–314. [Google Scholar]
- A. Nagarjan and K. Jeyaraman, Solution of chance constrained programming problem for multi-objective interval solid transportation problem under stochastic environment using fuzzy approach. Int. J. Comput. App. 10 (2010) 19–29. [Google Scholar]
- A.K. Ojha and R. Ranjan, Multi-objective geometric programming problem with Karush–Kuhn–Tucker condition using ε constraint method. RAIRO: OR 48 (2014) 429–453. [Google Scholar]
- A. Ojha, B. Das, S. Mondal and M. Maiti, A stochastic discounted multi-objective solid transportation problem for breakable items using analytical hierarchy process. Appl. Math. Modell. 34 (2010) 2256–2271. [Google Scholar]
- A. Ojha, B. Das, S. Mondal and M. Maiti, A solid transportation problem for an item with fixed charge, vechicle cost and price discounted varying charge using genetic algorithm. Appl. Soft Comput. 10 (2010) 100–110. [Google Scholar]
- A. Quddoos, G. Hasan and M.M. Khalid, Multi-choice stochastic transportation problem involving general form of distributions. SpringerPlus 3 (2014) 1–9. [CrossRef] [Google Scholar]
- S.K. Roy, Transportation problem with multi-choice cost and demand and stochastic supply. J. Oper. Res. Soc. Ch. 4 (2016) 193–204. [Google Scholar]
- S.K. Roy and S. Midya, Multi-objective fixed-charge solid transportation problem with product blending under intuitionistic fuzzy environment. Appl. Intell. 49 (2019) 3524–3538. [Google Scholar]
- S.K. Roy, D.R. Mahapatra and M.P. Biswal, Multi-choice stochastic transportation problem with exponential distribution. J. Uncertain Syst. 6 (2012) 200–213. [Google Scholar]
- S.K. Roy, S. Midya and V.F. Yu, Multi-objective fixed-charge transportation problem with random rough variables. Int. J. Uncertainty Fuzziness Knowledge-Based Syst. 26 (2018) 971–996. [Google Scholar]
- S.K. Roy, S. Midya and G.W. Weber, Multi-objective multi-item fixed-charge solid transportation problem under twofold uncertainty. Neural Comput. App. 31 (2019) 8593–8613. [Google Scholar]
- S. Samanta, B. Das and S.K. Mondal, A new method for solving a fuzzy solid transportation model with fuzzy ranking. Asian J. Math. Phys. 2 (2018) 73–83. [Google Scholar]
- A.C. Williams, A stochastic transportation problem. Oper. Res. 11 (1963) 759–770. [Google Scholar]
- D. Wilson, An a priori bounded model for transportation problems with stochastic demand and integer solutions. AIIE Trans. 4 (1972) 186–193. [Google Scholar]
- L. Yang and Y. Feng, A bicriteria solid transportation problem with fixed charge under stochastic environment. Appl. Math. Modell. 31 (2007) 2668–2683. [Google Scholar]
- L. Yang, P. Liu, S. Li, Y. Gao and D.A. Ralescu, Reduction methods of type-2 uncertain variables and their applications to solid transportation problem. Inf. Sci. 291 (2015) 204–237. [Google Scholar]
Current usage metrics show cumulative count of Article Views (full-text article views including HTML views, PDF and ePub downloads, according to the available data) and Abstracts Views on Vision4Press platform.
Data correspond to usage on the plateform after 2015. The current usage metrics is available 48-96 hours after online publication and is updated daily on week days.
Initial download of the metrics may take a while.