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Reseach Article

On Possibilistic Multi-Objective Multi-item Solid Transportation Problems

by H. A. Khalifa
International Journal of Computer Applications
Foundation of Computer Science (FCS), NY, USA
Volume 114 - Number 13
Year of Publication: 2015
Authors: H. A. Khalifa
10.5120/20037-1725

H. A. Khalifa . On Possibilistic Multi-Objective Multi-item Solid Transportation Problems. International Journal of Computer Applications. 114, 13 ( March 2015), 9-15. DOI=10.5120/20037-1725

@article{ 10.5120/20037-1725,
author = { H. A. Khalifa },
title = { On Possibilistic Multi-Objective Multi-item Solid Transportation Problems },
journal = { International Journal of Computer Applications },
issue_date = { March 2015 },
volume = { 114 },
number = { 13 },
month = { March },
year = { 2015 },
issn = { 0975-8887 },
pages = { 9-15 },
numpages = {9},
url = { https://ijcaonline.org/archives/volume114/number13/20037-1725/ },
doi = { 10.5120/20037-1725 },
publisher = {Foundation of Computer Science (FCS), NY, USA},
address = {New York, USA}
}
%0 Journal Article
%1 2024-02-06T22:52:39.550597+05:30
%A H. A. Khalifa
%T On Possibilistic Multi-Objective Multi-item Solid Transportation Problems
%J International Journal of Computer Applications
%@ 0975-8887
%V 114
%N 13
%P 9-15
%D 2015
%I Foundation of Computer Science (FCS), NY, USA
Abstract

The solid transportation problem (STP) arises when bounds are given on three item properties. These properties are usually: sources destination and type of product or mode of transport. In this paper, a possibilistic multi-objective multi-item solid transportation problem (Poss MOMISTP) is studied. The problem is considered by incorporating possibilistic data into the objective functions coefficients. The efficient solutions and the stability of Poss MOMISTP problem are investigated. The concept of -Possibly efficient is introduced in which the ordinary efficient solution is -tended based on the -level of possibilistic variables. A necessary and sufficient condition for such solution is established. A relationship between solutions of possibilistic levels is constructed. The stability set of the first kind corresponding to one solution of the -level of possibilistic variables is determined. An illustrative numerical example is given in the sake of the paper to clarify the obtained results.

References
  1. Ammar, E. E. , and Youness, E. A. , (2005). Study on multi-objective transportation problem with fuzzy numbers, Applied mathematics and Computation, (166): 241-253.
  2. Ammar, E. E. , and Khalifa,H. A. , (2014). Study on multi-objective solid transportation problem with fuzzy numbers, European Journal of Scientific Research, (125): 7-19.
  3. Ammar, E. E. , and Khalifa,H. A. , (2015). Study on possibilistic multiobjective solid transportation problems, International Journal of Current Research, (7): 11942-11953.
  4. Bazaraa, M. S. , Jarvis, J. J. , Sherall, H. D. , (1990). Linear Programming and Network Flows, Wiloy, New York, 294-299.
  5. Haley, K. B. , (1962), The solid transportation problem, Operations Research, (10): 448-463.
  6. Hussein, M. L. , (1998). Complete solutions of multiple objective transportation problems with possibilistic coefficients, Fuzzy Sets and Systems, (93): 293-299.
  7. Jimenez, F. , Verdegay, J. L. , (1998), Uncertain solid transportation problems, Fuzzy Sets and Systems, (100): 45-57.
  8. Kundu, P. , Kar, S. , and Maiti, M. , (2013). Multi-objective multi-item solid transportation problem in fuzzy environment, Applied mathematical Modeling, (37): 2028-2038.
  9. Ojha, A. , Das, B. , Mondal, S. , and Maiti, M. , (2010). A solid transportation problem for an item with fixed charge, Vechicle cost and price discounted varying charge using genetic algorithm, Applied Soft Computing, (10): 100-110.
  10. Luhandjula, M. K. , (1987) . Multiple objective programming problems with possibilistic coefficients, Fuzzy Sets and Systems, (21): 135-145.
  11. Nanda, S. Nanda and S. Majumdar, (1992), Fuzzy Rough Sets, Fuzzy Sets and Systems, 45: 157-160.
  12. Panian, P. , and Anuradha, D. , (2010). A new approach for solving solid transportation problems, Applied Mathematical Sciences, (4): 3603-3610.
  13. Shell, E. , (1955), Distribution of a product by several properties, Directorate of Management Analysis, Proc, 2nd Symp. On Linear Programming (2): 615-642, DCSComptroller H. Q. U. S. A. F. , Washington, Dc.
  14. Steuer, R. E. , (1986) . Multicriteria optimization: Theory, Computation and Application, Wiley, New York, 120-132.
Index Terms

Computer Science
Information Sciences

Keywords

Multi-objective multi-item solid transportation problems Possibilistic variables -possibly efficient Parametric analysis.