A. Akilbasha scite author profile

An innovative method, namely modified slice-sum method using the principle of zero point method is proposed for finding an optimal solution to fully rough interval integer solid transportation problems (FRIISTP). The proposed method yields an optimal solution to the fully rough interval integer solid transportation problem directly. In this method, there is no necessity to find an initial basic feasible solution to FRIISTP and also need not to use the existing MODI and stepping stone methods for testing the optimality to improve the basic feasible solution to the FRIISTP but directly obtain an optimal solution to the given FRIISTP by using the proposed method. The optimal values of decision variables and the objective function of the fully rough interval integer solid transportation problems provided by the proposed method are rough interval integers. The advantages of the proposed method over existing method are discussed in the context of an application example. The modified slice-sum method has been applied to calculate the optimal compromise solutions of FRIISTP, and then it was solved by using TORA software. The proposed method can be served as an appropriate tool for the decision makers when they are handling logistic models of real life situations involving three items with rough interval integer parameters.

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Algorithmic Approach for Solving Transportation Problems

Akilbasha¹,

Natarajan²,

Pandian³

2015

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A new method called modified zero suffix method is proposed for finding an optimal solution for transportation problems in single stage. The solution procedure is given with numerical examples. As this method is very easy to understand and apply, it will help the managers in logistics related issues by aiding them in the decision making process and providing an optimal solution in a simple and effective manner.

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On Bottleneck-Rough Cost Interval Integer Transportation Problems

Akilbasha

Natarajan

Pandian

2018

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Optimizing Fully Fuzzy Interval Integer Transshipment Problems

Natarajan¹,

Pandian²,

Akilbasha³

2020

IJOR

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A. Akilbasha

An innovative exact method for solving fully interval integer transportation problems

Optimizing a fully rough interval integer solid transportation problems

Algorithmic Approach for Solving Transportation Problems

On Bottleneck-Rough Cost Interval Integer Transportation Problems

Optimizing Fully Fuzzy Interval Integer Transshipment Problems

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