As of August 2024, International Journal "Notes on Intuitionistic Fuzzy Sets" is being indexed in Scopus.
Please check our Instructions to Authors and send your manuscripts to nifs.journal@gmail.com. Next issue: September/October 2024.

Open Call for Papers: International Workshop on Intuitionistic Fuzzy Sets • 13 December 2024 • Banska Bystrica, Slovakia/ online (hybrid mode).
Deadline for submissions: 16 November 2024.

Issue:Multiobjective intuitionistic fuzzy linear programming and its application in transportation model

From Ifigenia, the wiki for intuitionistic fuzzy sets and generalized nets
Revision as of 18:20, 28 August 2024 by Vassia Atanassova (talk | contribs) (Text replacement - ""Notes on IFS", Volume" to ""Notes on Intuitionistic Fuzzy Sets", Volume")
(diff) ← Older revision | Latest revision (diff) | Newer revision → (diff)
Jump to navigation Jump to search
shortcut
http://ifigenia.org/wiki/issue:nifs/13/1/34-51
Title of paper: Multiobjective intuitionistic fuzzy linear programming and its application in transportation model
Author(s):
Bablu Jana
Department of Mathematics, Bengal Engineering and Science University, Shibpur, Howrah, West-Bengal, Pin 711103, India
Tapan Kumar Roy
Department of Mathematics, Bengal Engineering and Science University, Shibpur, Howrah, West-Bengal, Pin 711103, India
Published in: "Notes on Intuitionistic Fuzzy Sets", Volume 13 (2007) Number 1, pages 34—51
Download:  PDF (365  Kb, File info)
Abstract: This paper presents a new Intuitionistic Fuzzy Optimization (IFO) approach to solve the a Multi-Objective Linear Programming Problem (MOLPP) under uncertainty. The idea is based on extension of fuzzy optimization. This approach is an application of the intuitionistic fuzzy set. First we have considered a multi-objective linear programming with equality and inequality constraints with Intuitionistic Fuzzy (IF) goals. Their fuzzy non-linear membership and non-membership function have been taken for the degree of rejection of objectives and constraints together with the degree of

satisfaction. Then it converts the said problem into a conventional linear programming problem. Finally we have showed application of this approach in the Capacitated Transportation Problem. Numerical examples are provided to illustrate our new approach.

Keywords: Fuzzy optimization, Intuitionistic fuzzy sets, Pareto optimal, Non-membership function, Capacitated transportation problem
References:
  1. A. K. Bit, M. P. Biswal and S. S. Alam, “Fuzzy programming approach to multiobjective solid transportation problem.”, Fuzzy Sets and Systems 57 (1993) 183-194.
  2. A. K. Bit, M. P. Biswal and S. S. Alam, “Fuzzy Programming Approach to Multicriteria Decision Making Transportation Problem.” , Fuzzy sets and systems 50 (1992) 135 – 141.
  3. R. E. Bellman, L. A. Zadeh, “Decision making in a fuzzy environment.” Management Science 17 (1970) B141-B164.
  4. D. Chanas, “Fuzzy programming in multiobjective linear programming- a parametric approach”, Fuzzy Set and system 29 (1989) 303-313
  5. K. Atanassov, “Idea for intuitionistic fuzzy sets equation” Notes on Intuitionistic Fuzzy Sets, 1 (1995) 17-24.
  6. K. Atanassov, “Intuitionistic fuzzy sets”, Fuzzy sets and systems, 20 (1986) 87-96.
  7. K. Atanassov, “Two theorems for Intuitionistic fuzzy sets”, Fuzzy sets and systems, 110 (2000) 267-269.
  8. J. Kacprzyk, “A generalization of fuzzy multistage decision making and control via linguistic quantifiers” Internat. J. Control, 38(1983) 1249-1270.
  9. H. Rommelfanger, “Inequality relation in fuzzy constraint and its use in linear optimization” in:J.L. Verdegay and M. Delgado, Eds., The interface between artificial intelligence and operational research in fuzzy environment( Verlag TUV, Rheinland, Koln, 1989) 195-211.
  10. H. Tanaka and K. Asai, “Fuzzy linear programming problems with fuzzy numbers” Fuzzy sets and systems, 13(1984) 1-10.
  11. M. Sakawa, and H. Yano, “Interactive decision making for multi-objective linear fractional programming problems with fuzzy parameters.”, Cybernetics Systems 16 (1985) 377-394.
  12. M. Sakawa and H.Yano, “An interactive fuzzy satisfaction method for multiobjective non-linear programming problem with fuzzy parameters” Fuzzy sets and System, 30 (1989)221-238.
  13. H.J.Zimmermann, “Fuzzy sets – Theory and its application” (Kluwer, Dordrecht,1985).
  14. S. K. Das A. Goswami, S. S. Alam, “Multiobjective transportation problem with interval; cost, source and destination parameters.”, European Journal of Operational Research 117 (1999) 100-112.
Citations:

The list of publications, citing this article may be empty or incomplete. If you can provide relevant data, please, write on the talk page.