Application of Fuzzy Multi-objective Programming to Develop an Inventory Control Model
Subject Areas : Business ManagementMohammad Amin Nayebi 1 , Naser Hamidi 2 , Abbas Panahi niya 3 , Hesam Saedi 4
1 - Azad University, Qazvin Branch, Young Researchers Club, Qazvin, Iran
2 - Department of Industrial Management, Faculty of Management and Accounting, Islamic Azad University, Qazvin Branch, Qazvin, Iran
3 - Department of Industrial Management, Faculty of Management and Accounting, Islamic Azad University, Qazvin Branch, Qazvin, Iran
4 - Graduate student of Industrial Management, Islamic Azad University, Qazvin, Iran
Keywords: Multi-objective programming, Inventory control, Fuzzy numbers and Fuzzy Non Linear Programming (FNLP),
Abstract :
In this paper, we presented the multi-item inventory control model whose objectives are minimizing total cost and minimizing the number of manpower. This model is formulated under four constraints consisting of storage spaces, budgetary, allowable shortage quantities and periodic order quantities. The last two constraints are considered as interval. In the presented model, shortage is allowable and lead-time is zero. The parameters such as demands, costs (including: setting, maintenance, shortage) and constraint resources are fuzzy. The type of fuzzy numbers in demand & cost is triangular and the numbers of constraint resources are positive trapezoid. In solution methodology, first we converted the cost objective and manpower objective functions to six objective functions and then reduced fuzzy constraints to crisp constraints via defuzzification. Then we solved the resulted crisp multi objective model using Fuzzy Non Linear Programming (FNLP). Finally we presented a numerical example to solve and describe the model applying Lingo software package.
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Shundi, H. (2006). The Theory of Fuzzy Sets and its Application in Industrial Engineering and Management. Tehran: Publication of Spreading Basic Sciences, (In Persian).
Yadvalle, V.S.S. (2005), "Multi item deterministic fuzzy inventory model", operation research, Vol 22, No 3, 287-295.
Zadeh, A.L. (1965), "Fuzzy sets", information and control, NO 38, 335-338.
Zimmerman, H.J. (1985), "Application of sets theory to mathematical programming", Information science No 16
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Abo el ata, M.O. and K.A.M kot. (1997), "Multi item EOQ inventory model whit varing holding cost under two restrictions: A geometric programming approach", production planning and control, vol 8, No 4, 608-611.
Chan, W.M., R.N. Ibrahim. (2003), "An EPQ model: Integrating lower pricing, rework and reject situations", production planning of control, Vol 14, No 97, 588-595.
Georg, J., B.Yuan,(2001), "Fuzzy sets and fuzzy logic theory and applications". Prentic Hall of India.
Katagiri, H. and H. Ishii. (2002), "Fuzzy inventory problem for perishable commodities", European journal of operation research, No138, 545-553.
Kumar, S. and A.G. Wami. (2006), "An EOQ model whit fuzzy inflation rate and fuzzy deterioration rate when: a delay in poment is permissible", System science, vol 31, No 5, 323-335.
Matty, K. (2005), "Numerical approach of multi objective optimal control problem in imprecise environment", Springer Science, No 42, 313-330.
Shundi, H. (2006). The Theory of Fuzzy Sets and its Application in Industrial Engineering and Management. Tehran: Publication of Spreading Basic Sciences, (In Persian).
Yadvalle, V.S.S. (2005), "Multi item deterministic fuzzy inventory model", operation research, Vol 22, No 3, 287-295.
Zadeh, A.L. (1965), "Fuzzy sets", information and control, NO 38, 335-338.
Zimmerman, H.J. (1985), "Application of sets theory to mathematical programming", Information science No 16