Advanced search
Publication Cover
Cogent Engineering Volume 5, 2018 - Issue 1
Submit an article Journal homepage
676
Views
1
CrossRef citations to date
0
Altmetric
Review Article

Three hybrid GAs for discounted fixed charge transportation problems

Farhad Ghassemi Tari Department of Industrial Engineering, Sharif University of Technology , Tehran, IranCorrespondence[email protected]
View further author information
&
Zhrasadat Hashemi Department of Industrial Engineering, Sharif University of Technology , Tehran, Iran
|
Tao Peng Zhejiang University , China
(Reviewing Editor)
Article: 1463833 | Received 15 Jan 2018, Accepted 08 Apr 2018, Published online: 04 May 2018

References

  • Acharya, D. , Basu, M. , & Das, A. (2013). Discounted generalized transportation problem. International Journal of Scientific and Research Publications , 3 (7), 1–6.
  • Adlakha, V. , Kowalski, K. , & Lev, B. (2010). A branching method for the fixed charge transportation problem. OMEGA: The International Journal of Management Science , 38 , 393–397.
  • Aguado, J. S. (2009). Fixed charge transportation problems: A new heuristic approach based on Lagrangean relaxation and the solving of core problems. Annals of Operations Research , 172 (1), 45–69.10.1007/s10479-008-0483-2
  • Alaei, R. , & Ghassemi-Tari, F. (2011). Development of a genetic algorithm for advertising time allocation problems. Journal of Industrial & systems Engineering , 4 (4), 245–255.
  • Altassan, K. M. , El-Sherbiny, M. M. , & Sasidhar, B. (2013). Near optimal solution for the step fixed charge transportation problem. Applied Mathematics & Information Sciences , 7 (2L), 661–669.10.12785/amis/072L41
  • Anholcer, M. (2015). The nonlinear generalized transportation problem with convex costs. Croatian Operational Research Review , 6 , 225–239.10.17535/crorr
  • Ayyagari, R. , Sivakumar, A. , & Kannan, K. (2014). Development of K- means based SVM regression (KSVMR) technique for boiler flue gas estimation. International Journal on Electrical Engineering and Informatics , 6 (2), 359–373.10.15676/ijeei
  • Bhadury, J. , Khurana, S. , Peng, H. S. , & Zong, H. (2006). Optimization modeling in acquisitions: A case study from the motor carrier industry. The Journal of Supply Chain Management , 42 (4), 40–53.10.1111/jscm.2006.42.issue-4
  • Blazewicz, J. , Bouvry, P. , Kovalyov, M. Y. , & Musial, J. (2014). Internet shopping with price sensitive discounts. 4OR, A Quarterly Journal of Operations Research , 12 (1), 35–48.10.1007/s10288-013-0230-7
  • Caplice, C. , & Sheffi, Y. (2003). Optimization-based procurement for transportation services. Journal of Business Logistics , 109–128.10.1002/jbl.2003.24.issue-2
  • Chittu, V. , & Sumathi, N. (2011). A modified genetic algorithm initializing K-means clustering. Global Journal of Computer Science and Technology , 11 (2), 54–62.
  • Das, A. , Basu, M. , & Acharya, D. (2013). Fixed charge capacitated non-linear transportation problem. Journal of Engineering Computers & Applied Sciences , 2 (12), 49–54.
  • Dash, R. , & Dash, R. (2012). Comparative analysis of K-means and genetic algorithm based data clustering. International Journal of Advanced Computer and Mathematical Sciences , 3 (2), 257–265.
  • Donselaar, K. V. , & Sharman, G. (1998). An innovative survey in the transportation and distribution sector. International Journal of Physical Distribution & Logistics Management , 28 (8), 617–629.
  • El-Sherbiny, M. M. , & Alhamali, R. M. (2013). A hybrid particle swarm algorithm with artificial immune learning for solving the fixed charge transportation problem. Computers & Industrial Engineering , 64 (2), 610–620.10.1016/j.cie.2012.12.001
  • Ghassemi Tari, F. (2016). A hybrid dynamic programming for solving fixed cost transportation with discounted mechanism. Journal of Optimization , 2016 (2016), 9.
  • Ghassemi Tari, F. , & Hashemi, Z. (2016). A priority based genetic algorithm for nonlinear transportation costs problems. Computers and Industrial Engineering , 96 (C), 86–95.10.1016/j.cie.2016.03.010
  • Ghassemi-Tari, F. , & Alaei, R. (2013). Scheduling TV commercials using genetic algorithms. International Journal of Production Research , 51 (16), 4921–4929.10.1080/00207543.2013.778431
  • Ghassemi-Tari, F. , & Meshkinfam, S. (2017). Improving performance of GAs by use of selective breading evolutionary process. British Journal of Mathematics & Computer Science , 22 (3), 1–21.10.9734/BJMCS
  • Goossens, D. , & Spieksma, F. C. R. (2009). The transportation problem with exclusionary side constraints. 4OR, A Quarterly Journal of Operations Research , 7 (1), 51–60.10.1007/s10288-007-0067-z
  • Hajiaghaei-Keshteli, M. , Molla-Alizadeh-Zavardehi, S. , & Tavakkoli-Moghaddam, R. (2010). Addressing a nonlinear fixed-charge transportation problem using a spanning tree-based genetic algorithm. Computers & Industrial Engineering , 59 (2), 259–271.10.1016/j.cie.2010.04.007
  • Hashemi, Z. , & Ghassemi, Tari F. (2018). A Prufer-based genetic algorithm for allocation of the vehicles in a discounted transportation cost system. International Journal of Systems Science: Operations & Logistics , 5 (1), 1–5.
  • Hirsch, W. M. , & Dantzig, G. B. (1968). The fixed charge problem. Naval Research Logistics , 15 , 413–424.10.1002/nav.v15.3
  • Jawahar, N. , Gunasekaran, A. , & Balaji, N. (2012). A simulated annealing algorithm to the multi-period fixed charge distribution problem associated with backorder and inventory. International Journal of Production Research , 50 (9), 2533–2554.10.1080/00207543.2011.581013
  • Jo, J. B. , Li, Y. , & Gen, M. (2007). Nonlinear fixed charge transportation problem by spanning tree-based genetic algorithm. Computers & Industrial Engineering , 53 (2), 290–298.10.1016/j.cie.2007.06.022
  • Klose, A. (2008). Algorithms for solving the single-sink fixed-charge transportation problem. Computers & Operations Research , 35 (6), 2079–2092.10.1016/j.cor.2006.10.011
  • Kowalski, K. , & Lev, B. (2008). On step fixed-charge transportation problem. OMEGA: The International Journal of Management Science , 36 , 913–917.10.1016/j.omega.2007.11.001
  • Krile, S. (2013). Efficient heuristic for non-linear transportation problem on the route with multiple ports. Polish Maritime Research , 20 (4), 80–86.
  • Krishna, K. , & Murty, M. N. (1999). Genetic K-means algorithm. IEEE Transactions on Systems, Man and Cybernetics, Part B (Cybernetics) , 29 (3), 433–439.10.1109/3477.764879
  • Loch, G. V. , & Silva, A. C. L. (2014). A computational experiment in a heuristic for the fixed charge transportation problem. International Refereed Journal of Engineering and Science , 3 (4), 1–7.
  • Lotfi, M. M. , & Tavakkoli-Moghaddam, R. (2013). A genetic algorithm using priority-based encoding with new operators for fixed charge transportation problems. Applied Soft Computing , 13 (5), 2711–2726.10.1016/j.asoc.2012.11.016
  • Meshkinfam, S. , & Ghassemi Tari, F. (2016). A genetic algorithm for generalized tardiness flowshop problems. International Journal of Engineering Science and Technology , 8 (9), 219–228.
  • Molla-Alizadeh-Zavardehi, S. , Mahmoodirad, A. , & Rahimian, M. (2014). Step fixed charge transportation problems via genetic algorithm. Indian Journal of Science and Technology , 7 (7), 949–954.
  • Molla-Alizadeh-Zavardehi, S. , Sadi Nezhad, S. , Tavakkoli-Moghaddam, R. , & Yazdani, M. (2013). Solving a fuzzy fixed charge solid transportation problem by metaheuristics. Mathematical and Computer Modelling , 57 (5), 1543–1558.10.1016/j.mcm.2012.12.031
  • Olhager, J. , Pashaei, S. , & Sternberg, H. (2015). Design of global production and distribution networks: A literature review and research agenda. International Journal of Physical Distribution & Logistics Management , 45 (1/2), 138–158.10.1108/IJPDLM-05-2013-0131
  • Osuji, G. A. , Ogbonna – Chukwudi, J. , & Jude, O. (2014). Transportation algorithm with volumediscount on distribution cost (a case study of the Nigerian Bottling Company Plc Owerri Plant). American Journal of Applied Mathematics and Statistics , 2 (5), 318–323.
  • Othman, Z. , Rostamian-Delavar, M. R. , Behnam, S. , & Lessanibahri, S. (2011). Adaptive genetic algorithm for fixed-charge transportation problem. Proceedings of the International Multi Conference of Engineers and Computer Scientists 2011 vol. I IMECS 2011, March 16-18, Hong Kong.
  • Panchal, G. , & Panchal, D. (2015). Solving NP hard problems using genetic algorithm. International Journal of Computer Science and Information Technologies , 6 (2), 1824–1827.
  • Pandey, H. M. , Chaudhary, A. , & Mehrotra, D. (2014). A comparative review of approaches to prevent premature convergence in GA. Applied Soft Computing , 24 , 1047–1077.10.1016/j.asoc.2014.08.025
  • Patil, S. M. , & Argiddi, R. V. (2014). Comparison between quad tree based K-means and EM algorithm for fault prediction. International Journal of Computer Science and Information Technologies , 5 (6), 7984–7988.
  • Sandrock, K. (1988). A simple algorithm for solving small, fixed-charge transportation problems. Journal of the Operational Research Society , 39 , 467–475.10.1057/jors.1988.80
  • Sanei, M. , Mahmoodirad, A. , Niroomand, S. , Jamalian, A. , & Gelareh, S. (2015). Step fixed-charge solid transportation problem: A Lagrangian relaxation heuristic approach. Computational and Applied Mathematic , 1–21.
  • Sheng, S. , Dechen, Z. , & Xiaofei, X. (2006). Genetic algorithm for the transportation problem with discontinuous piecewise linear cost function. International Journal of Computer Science and Network Security , 6 (7A), 182–190.
  • Sun, M. , Aronson, J. E. , McKeown, P. G. , & Drinka, D. (1998). A tabu search heuristic procedure for the fixed charge transportation problem. European Journal of Operational Research , 106 (2), 441–456.10.1016/S0377-2217(97)00284-1
  • Tracey, M. (2004). Transportation effectiveness and manufacturing firm performance. The International Journal of Logistics Management , 15 (2), 31–50.10.1108/09574090410700293
  • Transportation Statistics Annual Report . (2013). Bureau of transportation statistics . US Dept. of Transportation.
  • Vaisi, B. , & Tavakkoli-Moghaddam, R. (2015). Designing a nonlinear integer programming model for a cross-dock by a genetic algorithm. International Journal of Scientific & Technology Research , 4 (3), 11–15.
  • Varma, N. , & Kumar, G. (2015). Solving age-old transportation problems by nonlinear programming methods. IOSR Journal of Mathematics , 11 (1), 16–18.
  • Waldherr, S. , Poppenborg, J. , & Knust, S. (2015). The bottleneck transportation problem with auxiliary resources. 4OR, A Quarterly Journal of Operations Research , Online on Date: 24 March 2015.
  • Wanke, P. F. (2014). Efficiency drivers in the Brazilian trucking industry: A longitudinal study from 2002–2010. International Journal of Physical Distribution & Logistics Management , 44 (7), 540–558.10.1108/IJPDLM-05-2012-0163
  • Wilson, R. (2015). 26th Annual State of Logistics Report. CSCMP released its 26th Annual “State of Logistics Report”. A report by Penske Logistics Corporation.
  • Wu, T. , Liu, Y. , Tang, W. , Li, X. , & Yu, Y. (2017). Constraint genetic algorithm and its application in sintering proportioning. IOP Conference Series: Materials Science and Engineering, The 2nd International Seminar on Advances in Materials Science and Engineering , 28–30 July 2017, Singapore , 231 , 1–5.
  • Xie, F. , & Jia, R. (2012). Nonlinear fixed charge transportation problem by minimum cost flow-based genetic algorithm. Computers and Industrial Engineering , 63 (4), 763–778.10.1016/j.cie.2012.04.016
  • Yam, R. C. M. , & Tang, E. P. Y. (1996). Transportation systems in Hong Kong and Southern China: A manufacturing industries perspective. International Journal of Physical Distribution & Logistics Management , 26 (10), 46–59.
  • Yousefi, K. , Afshari, A. J. , & Hajiaghaei-Keshteli, M. (2017). Genetic algorithm for fixed charge transportation problem with discount models. 13th International Conference on Industrial Engineering , 22–23 February 2017, Mazandaran, Iran.

Related research

People also read lists articles that other readers of this article have read.

Recommended articles lists articles that we recommend and is powered by our AI driven recommendation engine.

Cited by lists all citing articles based on Crossref citations.
Articles with the Crossref icon will open in a new tab.