Title of article
The solution and duality of imprecise network problems
Author/Authors
Mehdi Ghatee، نويسنده , , S. Mehdi Hashemi، نويسنده , , Behnam Hashemi، نويسنده , , Mehdi Dehghan، نويسنده ,
Issue Information
دوهفته نامه با شماره پیاپی سال 2008
Pages
24
From page
2767
To page
2790
Abstract
Duality properties have been investigated by many researchers in the recent literature. They are introduced in this paper for a fully fuzzified version of the minimal cost flow problem, which is a basic model in network flow theory. This model illustrates the least cost of the shipment of a commodity through a capacitated network in terms of the imprecisely known available supplies at certain nodes which should be transmitted to fulfil uncertain demands at other nodes. First, we review on the most valuable results on fuzzy duality concepts to facilitate the discussion of this paper. By applying Hukuhara’s difference, approximated and exact multiplication and Wu’s scalar production, we exhibit the flow in network models. Then, we use combinatorial algorithms on a reduced problem which is derived from fully fuzzified MCFP to acquire fuzzy optimal flows. To give duality theorems, we utilize a total order on fuzzy numbers due to the level of risk and realize optimality conditions for providing some efficient combinatorial algorithms. Finally, we compare our results with the previous worthwhile works to demonstrate the efficiency and power of our scheme and the reasonability of our solutions in actual decision-making problems.
Keywords
optimality conditions , Fuzzy cost , Discrete optimization , Fuzzy supply–demand , Duality theorems , Risk taking
Journal title
Computers and Mathematics with Applications
Serial Year
2008
Journal title
Computers and Mathematics with Applications
Record number
920872
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