How to cite this paper
Bhunia, A & Shaikh, A. (2014). A deterministic inventory model for deteriorating items with selling price dependent demand and three-parameter Weibull distributed deterioration.International Journal of Industrial Engineering Computations , 5(3), 497-510.
Refrences
Abad, P.L. (1996). Optimal pricing and lot-sizing under of conditions of perishability and partial backordering, Management Science, 42,1093-1104.
Amutha, R., & Chandrasekaran, E. (2013). An inventory model for deteriorating items with three parameter weibull deterioration and price dependent demand, Journal of Engineering Research & Technology, 2(5), 1931-1935.
Anily, S., & Federgruen, A. (1990). One warehouse multiple retailer systems with vehicle routing costs, Management Science, 36, 32.
Baumol, W. J., & Vinod, H. C. (1970). An inventory theoretic model of freight transport demand, Management Science,16, 413 – 421.
Bhunia, A.K., & Maiti, M. (1998). Deterministic inventory model for deteriorating items with finite rate of replenishment dependent on inventory level, Computers and Operations Research, 25, 997-1006.
Bhunia, A.K., & Maiti, M. (1998). An inventory model of deteriorating items with lot-size dependent replenishment cost and a linear trend in demand, Applied Mathematical Modelling, 23, 301-308.
Buffa, F., & Munn, J. (1989). A recursive algorithm for order cycle that minimizes logistic cost, Journal of Operational Research Society, 40, 357.
Bhunia, A.K., & Shaikh, A.A. (2011). A deterministic model for deteriorating items with displayed inventory level dependent demand rate incorporating marketing decision with transportation cost. International Journal of Industrial Engineering Computations, 2(3), 547-562.
Bhunia A.K., Shaikh, A.A., Maiti, A.K., & Maiti, M. (2013a). A two warehouse deterministic inventory model for deteriorating items with a linear trend in time dependent demand over finite time horizon by elitist real-coded genetic algorithm. International Journal of Industrial Engineering Computations, 4(2), 241-258.
Bhunia, A.K., Shaikh, A.A., & Gupta, R.K. (2013b). A study on two-warehouse partially backlogged deteriorating inventory models under inflation via particle swarm optimization, International Journal of System Science. Article in Press.
Chakrabarty, T., Giri, B.C., & Chaudhuri., K.S. (1998). An EOQ model for items with Weibull distribution deterioration, shortages and trend demand: An extension of Philip’s model., Computers & Operations Research, 25, 649-657.
Constable, G.K., & Whybark, D.C. (1978). Interactions of transportation and inventory decision, Decision Science, 9, 689.
Covert, R.P., & Philip, G.C. (1973). An EOQ model for items with Weibull distribution deterioration, American Institute of Industrial Engineering Transactions, 5, 323-326.
Deb, M., & Chaudhuri, K.S. (1986). An EOQ model for items with finite rate of production and variable rate of deterioration, Opsearch, 23, 175-181.
Emmons, H. (1968). A replenishment model for radioactive nuclide generators. Management Science, 14, 263-273.
Ghare, P., & Schrader, G. (1963). A model for exponential decaying inventories, Journal of Industrial Engineering, 14, 238-243.
Giri, B.C. Jalan,A.K., & Chaudhuri K.S. (2003). Economic order quantity model with weibull deteriorating distribution, shortage and ram-type demand, International journal of System Science, 34,237-243.
Ghosh, S.K., & Chaudhury, K.S. (2004). An order-level inventory model for a deteriorating items with Weibull distribution deterioration, time-quadratic demand and shortages, International Journal of Advanced Modeling and Optimization, 6(1),31-45.
Giri, B.C., C hakrabarty ,T., & Chaudhuri K.S. (1999). Retailer’s optimal policy for perishable product with shortages when supplier offers all-unit quantity and freight cost discounts, Proceeding of National Academy of Sciences, 69(A),III, 315-326.
Giri, B.C. Pal, S., Goswami A., & Chaudhuri K.S. (1996). An inventory model for deteriorating items with stock-dependent demand rate, European Journal of Operational Research, 95, 604-610.
Goswami, A., & Chaudhuri, K. S. (1991). An EOQ model for deteriorating items with shortage and a linear trend in demand, Journal of the Operational Research Socity, 42, 1105-1110.
Goyal, S.K., & Gunasekaran, A. (1995). An integrated production-inventory-marketing model for deteriorating items, Computers & Industrial Engineering, 28, 755-762.
Kawale, S., & Bansode. P. (2012). An EPQ model using weibull deterioration for deterioration item with time varying holding cost, International Journal of Science Engineering and Technology Research, 1(4), 29-33.
Krishnaswamy, K. N., Kulkarni, N. G., & Mathirajan, M. (1995). Inventory models with constraints and changing transportation cost structure, International Journal of Management and Systems, 11, 91 – 110.
Kotler, P. (1971). Marketing Decision Making: A Model Building Approach, Holt. Rinehart, Winston, New York.
Ladany, S., & Sternleib, A. (1974). The intersection of economic ordering quantities and marketing policies, AIIE Trnsactions, 6, 173-175.
Luo, W. (1998). An integrated inventory system for perishable goods with backordering, Computers & Industrial Engineering, 34, 685 – 693.
Mandal, B. N., & Phaujdar, S. (1989). An inventory model for deteriorating items and stock-dependent consumption rate, Journal of Operational Research Society, 40, 483 – 488.
Mandal, M., & Maiti, M. (1997). Inventory model for damageable items with stock-dependent demand and shortages, Opsearch, 34, 156-166.
Misra, R.B.(1975). Optimum Production lot-size model for a system with deteriorating inventory, International Journal of Production Research, 13, 495-505.
Mondal, B., Bhunia, A.K., & Maiti, M. (2007). A model of two storage inventory system under stock dependent selling rate incorporating marketing decisions and transportation cost with optimum release rule, Tamsui Oxford Journal of Mathematical Sciences, 23(3), 243-267.
Padmanabhan, G., & Vrat, P. (1995). EOQ models for perishable items under stock-dependent selling rate, European Journal of Operational Research, 86, 281-292.
Pal, S., Goswami, A., & Chaudhuri, K.S. (1993). A deterministic inventory model for deteriorating items with stock-dependent demand rate, International Journal of Production Economics, 32, 291-299.
Pal. P, Bhunia, A.K., & Goyal, S.K. (2007). On optimal partially integrated production and marketing policy with variable demand under flexibility and reliability consideration via Genetic Algorithm. Applied Mathematics and Computation, 188, 525-537.
Pal, A.K., Bhunia, A.K., & Mukherjee, R.N. (2005). A marketing oriented inventory model with three component demand rate dependent on displayed stock level (DSL), Journal Operational Research Society, 56, 113-118.
Pal, A.K., Bhunia, A.K., & Mukherjee, R.N. (2006). Optimal lot size model for deteriorating items with demand rate dependent on displayed stock level(DSL) and partial backordering, European Journal of Operational Research, 175, 977-991.
Sarkar, B.R., Mukherje,e. S., & Balan, C.V. (1997). An order-level lot-size inventory model with inventory-level dependent demand and deterioration, International Journal of Production Economics, 48, 227-236.
Sana, S., Goyal, S.K., & Chaudhuri, K.S. (2004). A production-inventory model for a deteriorating item with trended demand and shortages, European Journal of Operation Research, 157, 357-371.
Sana, S., Chaudhuri, & K.S. (2004). On a volume flexible production policy for deteriorating item with stock-dependent demand rate, Nonlinear Phenomena in Complex system,7(1),61-68.
Sharma , V. & Chaudhary, R.R. (2013). An inventory model for deteriorating items with weibull deterioration with time dependent demand and shortages, Research Journal of Management Sciences, 2, 28-30.
Subramanyam, S., & Kumaraswamy, S. (1981). EOQ formula under varying marketing policies and conditions, AIIE Transactions, 22, 312-314.
Tripathy.,C. K., & Mishra.,U. (2010). An inventory model for weibull deteriorating items with price dependent demand and time-varying holding cost, Applied Mathematical Sciences, 4, 2171-2179
Urban, T.L. (1992). Deterministic inventory models incorporating marketing decisions, Computers & Industrial Engineering, 22, 85-93.
Amutha, R., & Chandrasekaran, E. (2013). An inventory model for deteriorating items with three parameter weibull deterioration and price dependent demand, Journal of Engineering Research & Technology, 2(5), 1931-1935.
Anily, S., & Federgruen, A. (1990). One warehouse multiple retailer systems with vehicle routing costs, Management Science, 36, 32.
Baumol, W. J., & Vinod, H. C. (1970). An inventory theoretic model of freight transport demand, Management Science,16, 413 – 421.
Bhunia, A.K., & Maiti, M. (1998). Deterministic inventory model for deteriorating items with finite rate of replenishment dependent on inventory level, Computers and Operations Research, 25, 997-1006.
Bhunia, A.K., & Maiti, M. (1998). An inventory model of deteriorating items with lot-size dependent replenishment cost and a linear trend in demand, Applied Mathematical Modelling, 23, 301-308.
Buffa, F., & Munn, J. (1989). A recursive algorithm for order cycle that minimizes logistic cost, Journal of Operational Research Society, 40, 357.
Bhunia, A.K., & Shaikh, A.A. (2011). A deterministic model for deteriorating items with displayed inventory level dependent demand rate incorporating marketing decision with transportation cost. International Journal of Industrial Engineering Computations, 2(3), 547-562.
Bhunia A.K., Shaikh, A.A., Maiti, A.K., & Maiti, M. (2013a). A two warehouse deterministic inventory model for deteriorating items with a linear trend in time dependent demand over finite time horizon by elitist real-coded genetic algorithm. International Journal of Industrial Engineering Computations, 4(2), 241-258.
Bhunia, A.K., Shaikh, A.A., & Gupta, R.K. (2013b). A study on two-warehouse partially backlogged deteriorating inventory models under inflation via particle swarm optimization, International Journal of System Science. Article in Press.
Chakrabarty, T., Giri, B.C., & Chaudhuri., K.S. (1998). An EOQ model for items with Weibull distribution deterioration, shortages and trend demand: An extension of Philip’s model., Computers & Operations Research, 25, 649-657.
Constable, G.K., & Whybark, D.C. (1978). Interactions of transportation and inventory decision, Decision Science, 9, 689.
Covert, R.P., & Philip, G.C. (1973). An EOQ model for items with Weibull distribution deterioration, American Institute of Industrial Engineering Transactions, 5, 323-326.
Deb, M., & Chaudhuri, K.S. (1986). An EOQ model for items with finite rate of production and variable rate of deterioration, Opsearch, 23, 175-181.
Emmons, H. (1968). A replenishment model for radioactive nuclide generators. Management Science, 14, 263-273.
Ghare, P., & Schrader, G. (1963). A model for exponential decaying inventories, Journal of Industrial Engineering, 14, 238-243.
Giri, B.C. Jalan,A.K., & Chaudhuri K.S. (2003). Economic order quantity model with weibull deteriorating distribution, shortage and ram-type demand, International journal of System Science, 34,237-243.
Ghosh, S.K., & Chaudhury, K.S. (2004). An order-level inventory model for a deteriorating items with Weibull distribution deterioration, time-quadratic demand and shortages, International Journal of Advanced Modeling and Optimization, 6(1),31-45.
Giri, B.C., C hakrabarty ,T., & Chaudhuri K.S. (1999). Retailer’s optimal policy for perishable product with shortages when supplier offers all-unit quantity and freight cost discounts, Proceeding of National Academy of Sciences, 69(A),III, 315-326.
Giri, B.C. Pal, S., Goswami A., & Chaudhuri K.S. (1996). An inventory model for deteriorating items with stock-dependent demand rate, European Journal of Operational Research, 95, 604-610.
Goswami, A., & Chaudhuri, K. S. (1991). An EOQ model for deteriorating items with shortage and a linear trend in demand, Journal of the Operational Research Socity, 42, 1105-1110.
Goyal, S.K., & Gunasekaran, A. (1995). An integrated production-inventory-marketing model for deteriorating items, Computers & Industrial Engineering, 28, 755-762.
Kawale, S., & Bansode. P. (2012). An EPQ model using weibull deterioration for deterioration item with time varying holding cost, International Journal of Science Engineering and Technology Research, 1(4), 29-33.
Krishnaswamy, K. N., Kulkarni, N. G., & Mathirajan, M. (1995). Inventory models with constraints and changing transportation cost structure, International Journal of Management and Systems, 11, 91 – 110.
Kotler, P. (1971). Marketing Decision Making: A Model Building Approach, Holt. Rinehart, Winston, New York.
Ladany, S., & Sternleib, A. (1974). The intersection of economic ordering quantities and marketing policies, AIIE Trnsactions, 6, 173-175.
Luo, W. (1998). An integrated inventory system for perishable goods with backordering, Computers & Industrial Engineering, 34, 685 – 693.
Mandal, B. N., & Phaujdar, S. (1989). An inventory model for deteriorating items and stock-dependent consumption rate, Journal of Operational Research Society, 40, 483 – 488.
Mandal, M., & Maiti, M. (1997). Inventory model for damageable items with stock-dependent demand and shortages, Opsearch, 34, 156-166.
Misra, R.B.(1975). Optimum Production lot-size model for a system with deteriorating inventory, International Journal of Production Research, 13, 495-505.
Mondal, B., Bhunia, A.K., & Maiti, M. (2007). A model of two storage inventory system under stock dependent selling rate incorporating marketing decisions and transportation cost with optimum release rule, Tamsui Oxford Journal of Mathematical Sciences, 23(3), 243-267.
Padmanabhan, G., & Vrat, P. (1995). EOQ models for perishable items under stock-dependent selling rate, European Journal of Operational Research, 86, 281-292.
Pal, S., Goswami, A., & Chaudhuri, K.S. (1993). A deterministic inventory model for deteriorating items with stock-dependent demand rate, International Journal of Production Economics, 32, 291-299.
Pal. P, Bhunia, A.K., & Goyal, S.K. (2007). On optimal partially integrated production and marketing policy with variable demand under flexibility and reliability consideration via Genetic Algorithm. Applied Mathematics and Computation, 188, 525-537.
Pal, A.K., Bhunia, A.K., & Mukherjee, R.N. (2005). A marketing oriented inventory model with three component demand rate dependent on displayed stock level (DSL), Journal Operational Research Society, 56, 113-118.
Pal, A.K., Bhunia, A.K., & Mukherjee, R.N. (2006). Optimal lot size model for deteriorating items with demand rate dependent on displayed stock level(DSL) and partial backordering, European Journal of Operational Research, 175, 977-991.
Sarkar, B.R., Mukherje,e. S., & Balan, C.V. (1997). An order-level lot-size inventory model with inventory-level dependent demand and deterioration, International Journal of Production Economics, 48, 227-236.
Sana, S., Goyal, S.K., & Chaudhuri, K.S. (2004). A production-inventory model for a deteriorating item with trended demand and shortages, European Journal of Operation Research, 157, 357-371.
Sana, S., Chaudhuri, & K.S. (2004). On a volume flexible production policy for deteriorating item with stock-dependent demand rate, Nonlinear Phenomena in Complex system,7(1),61-68.
Sharma , V. & Chaudhary, R.R. (2013). An inventory model for deteriorating items with weibull deterioration with time dependent demand and shortages, Research Journal of Management Sciences, 2, 28-30.
Subramanyam, S., & Kumaraswamy, S. (1981). EOQ formula under varying marketing policies and conditions, AIIE Transactions, 22, 312-314.
Tripathy.,C. K., & Mishra.,U. (2010). An inventory model for weibull deteriorating items with price dependent demand and time-varying holding cost, Applied Mathematical Sciences, 4, 2171-2179
Urban, T.L. (1992). Deterministic inventory models incorporating marketing decisions, Computers & Industrial Engineering, 22, 85-93.