A FUZZY PRODUCTION INVENTORY MODEL WITH RANDOM DETERIORATION RATE AND DEMAND RATE USING REGULAR WEIGHTED POINT TECHNIQUE
| Autor: | K. Dhanam, R. Dhanalakshmi |
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| Rok vydání: | 2017 |
| Předmět: | |
| DOI: | 10.5281/zenodo.841816 |
| Popis: | This paper deals, a fuzzy production inventory model with two warehouse have been considered. In this model the deterioration rate and demand rate considered as random and the production rate depends directly on demand rate. The lotus petal fuzzy number is defined and its properties are given. The parameters involved in this model are represented by lotus petal fuzzy number. The average total cost is defuzzified by the regular weighted point technique. The analytical expressions for expected inventory level in temporary warehouse and permanent warehouse at time t2, expected deterioration level, maximum inventory level and average total cost are derived for the proposed model by using nonlinear programming technique. A numerical example is presented to illustrate the results. {"references":["1.\tChung KJ,Ting TS, A heuristic for replenishment for deteriorating items with a linear trend in demand, J Oper Res Soc, 44 (1993),1235-1241. 2.\tFaritha.A Asma and Henry Amirtharaj.E.C, Solving multi objective inventory model of deteriorating items with two constraints using fuzzy optimization technique, Intern. J. Fuzzy mathematical Archive, 10 (ISSN: 2320-3242(P), 2320-3250(online)) (2016), 41-48. 3.\tGoyal SK, Giri BC, recent trends in modelling of deteriorating inventory, Eur J Oper Res, 134 (2001), 1-16. 4.\tMishra VK, Singh LS, Deteriorating inventory model with time dependent demand and partial backlogging, Appl Math Sci, 4 (2010), 3611-3619. 5.\tNiketa D, Trivedi, NehalJ.Shukla and Nita H. Shah, Inventory model for deteriorating items with fixed life under quadratic demand and nonlinear holding cost, IJEIT, 3 (ISSN:2277-3754) (2014). 6.\tSamanta.G.P, Ajanta roy,A Production inventory model with deteriorating items and shortages, Yugoslav Journal or Operation Research, 2 (2004), 219-230. 7.\tWee HM, A deterministic lot-size inventory model for deteriorating items with shortages and a declining market, Comput Oper, 22 (1995)345-356. 8.\tWhitin TM, The theory of inventory management, Princeton: Princeton University Press (1957). 9.\tZadeh.L.A, Fuzzy sets, Information and Control,8 (1965), 338-353."]} |
| Databáze: | OpenAIRE |
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