How to cite this paper
Tripathi, R. (2013). Inventory model with different demand rate and different holding cost.International Journal of Industrial Engineering Computations , 4(3), 437-446.
Refrences
Aggarwal, S.P., & Jaggi, C.K. (1995). Ordering policies of deteriorating items under permissible delay in payments. Journal of Operational Research Society, 46, 658-662.
Alfares, H.K. (2007). Inventory model with stock – level dependent demand rate and variable holding cost. International Journal of Production Economics, 108, 259 -265.
Chung, K.J., & Liao, J.J. (2009). The optimal ordering policy of the EOQ model under trade credit depending on the ordering quantity from the DCF approach. European Journal of Operational Research, 196, 563 – 568.
Datta, T.K., & Pal, A.K. (1990). A note on inventory model with inventory level demand rate. Journal of the Operations Research Society, 41(10), 971-975.
Dye, C.Y., Ouyang, L.Y., & Hsieh, T.P. (2007). Inventory and pricing strategies for deteriorating items with shortages: A discounted cash flow approach. Computers & Industrial Engineering, 52, 29- 40.
Giri, B.C., Goswami, A., & Chaudhuri, K.S. (1996). An EOQ model for deteriorating items with time- varying demand and costs. Journal of the Operational Research Society, 47(11), 1398- 1405.
Goh, M. (1994). EOQ model with general demand and holding cost function. European Journal of Operational Research, 73, 50-54.
Goyal, S.K (1985). Economic order quantity under conditions of permissible delay in payments. Journal of Operational Research Society, 36, 335-338.
Hou, K.L. (2006). An inventory model for deteriorating items with stock dependent consumption rate and shortages under inflation and time discounting. European Journal of operational Research, 168, 463- 474.
Hou, K.L., & Lin, L.C. (2009). A cash flow oriented EOQ model with deteriorating items under permissible delay in payments. Journal of Applied Sciences, 9(9), 1791–1994.
Hung, K.C. (2011).An inventory model with generalized type demand, deterioration and backorder rates. European Journal of Operational Research, 208, 239- 242.
Hsu, L. F. (2012). A note on “An economic order quantity (EOQ) for items with imperfect quality and inspection errors”. International Journal of Industrial Engineering Computations, 3(4), 695-702.
Khanra, S. Ghosh, S.K., & Chaudhuri, K.S. (2011). An EOQ model for a deteriorating item with time–dependent quadratic demand under permissible delay in payment. Applied Mathematics and Computation, 218, 1- 9.
Jaggi, C.K., Aggarwal, K.K., & Goel, S.K. (2007). Retailer’s optimal ordering policy under two stage trade credit financing. Advanced Modeling and Optimization, 9(1), 67-80.
Jaggi, C. K., Goel, S. K., & Mittal, M. (2011). Economic order quantity model for deteriorating items with imperfect quality and permissible delay on payment.International Journal of Industrial Engineering Computations, 2(1), 123-140.
Liao, H.C., Tsai, C.H., & Su, C.T. (2000). An inventory model with deteriorating items under inflation when a delay in payment is permissible. International Journal of Production Economics, 63, 207 – 214.
Liao, J.J., & Huang, K.N. (2010).Deterministic inventory model for deteriorating items with trade credit financing and capacity constraints. Computers and Industrial Engineering, 59, 611-618.
Muhlemann, A.P. and Valtis-Spanopoulos, N.P. (1980). A variable holding cost rate EOQ model. European Journal of Operational Research, 4, 132- 135.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(5), 291-299.
Van der Veen, B. (1967) . Introduction to the theory of operational Research. Philips Technical Library, Springer- Verlag, New York.Weiss, H.J. (1982). Economic order quantity models with non – linear holding cost. European Journal of Operational Research, 9, 56-60.
Roy, M., Gupta, R.K., & Dasgupta, T. (2012). A technique for determining the optimum mix of logistics service providers of a make-to-order supply chain by formulating and solving a constrained nonlinear cost optimization problem. Decision Science Letters, 2, 95-108.
Sarkar, B. (2012).An EOQ model with delay in payments and time – varying deterioration rate. Mathematical and Computer modeling, 55(3–4), 367-377.
Sana, S.S. (2010). Optimal selling price and lot size with time varying deterioration and partial backlogging. Applied Mathematics and Computation, 217, 185- 194.
Teng, J.T., Chang, C.T., and Goyal, S.K (2005). Optimal pricing and ordering policy under permissible delay in payments. International Journal of Production Economics, 97, 121-129.
Teng, J.T., Min, J., & Pan, Q. (2012).Economic order quantity model with trade credit financing for non – decreasing demand. Omega, 40, 328-335.
Tripathi, R.P., Misra, S.S, and Shukla, H.S. (2010). A cash flow EOQ model under permissible delay in payments. International Journal of Engineering, Science and Technology, 2(11), 75-84.
Alfares, H.K. (2007). Inventory model with stock – level dependent demand rate and variable holding cost. International Journal of Production Economics, 108, 259 -265.
Chung, K.J., & Liao, J.J. (2009). The optimal ordering policy of the EOQ model under trade credit depending on the ordering quantity from the DCF approach. European Journal of Operational Research, 196, 563 – 568.
Datta, T.K., & Pal, A.K. (1990). A note on inventory model with inventory level demand rate. Journal of the Operations Research Society, 41(10), 971-975.
Dye, C.Y., Ouyang, L.Y., & Hsieh, T.P. (2007). Inventory and pricing strategies for deteriorating items with shortages: A discounted cash flow approach. Computers & Industrial Engineering, 52, 29- 40.
Giri, B.C., Goswami, A., & Chaudhuri, K.S. (1996). An EOQ model for deteriorating items with time- varying demand and costs. Journal of the Operational Research Society, 47(11), 1398- 1405.
Goh, M. (1994). EOQ model with general demand and holding cost function. European Journal of Operational Research, 73, 50-54.
Goyal, S.K (1985). Economic order quantity under conditions of permissible delay in payments. Journal of Operational Research Society, 36, 335-338.
Hou, K.L. (2006). An inventory model for deteriorating items with stock dependent consumption rate and shortages under inflation and time discounting. European Journal of operational Research, 168, 463- 474.
Hou, K.L., & Lin, L.C. (2009). A cash flow oriented EOQ model with deteriorating items under permissible delay in payments. Journal of Applied Sciences, 9(9), 1791–1994.
Hung, K.C. (2011).An inventory model with generalized type demand, deterioration and backorder rates. European Journal of Operational Research, 208, 239- 242.
Hsu, L. F. (2012). A note on “An economic order quantity (EOQ) for items with imperfect quality and inspection errors”. International Journal of Industrial Engineering Computations, 3(4), 695-702.
Khanra, S. Ghosh, S.K., & Chaudhuri, K.S. (2011). An EOQ model for a deteriorating item with time–dependent quadratic demand under permissible delay in payment. Applied Mathematics and Computation, 218, 1- 9.
Jaggi, C.K., Aggarwal, K.K., & Goel, S.K. (2007). Retailer’s optimal ordering policy under two stage trade credit financing. Advanced Modeling and Optimization, 9(1), 67-80.
Jaggi, C. K., Goel, S. K., & Mittal, M. (2011). Economic order quantity model for deteriorating items with imperfect quality and permissible delay on payment.International Journal of Industrial Engineering Computations, 2(1), 123-140.
Liao, H.C., Tsai, C.H., & Su, C.T. (2000). An inventory model with deteriorating items under inflation when a delay in payment is permissible. International Journal of Production Economics, 63, 207 – 214.
Liao, J.J., & Huang, K.N. (2010).Deterministic inventory model for deteriorating items with trade credit financing and capacity constraints. Computers and Industrial Engineering, 59, 611-618.
Muhlemann, A.P. and Valtis-Spanopoulos, N.P. (1980). A variable holding cost rate EOQ model. European Journal of Operational Research, 4, 132- 135.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(5), 291-299.
Van der Veen, B. (1967) . Introduction to the theory of operational Research. Philips Technical Library, Springer- Verlag, New York.Weiss, H.J. (1982). Economic order quantity models with non – linear holding cost. European Journal of Operational Research, 9, 56-60.
Roy, M., Gupta, R.K., & Dasgupta, T. (2012). A technique for determining the optimum mix of logistics service providers of a make-to-order supply chain by formulating and solving a constrained nonlinear cost optimization problem. Decision Science Letters, 2, 95-108.
Sarkar, B. (2012).An EOQ model with delay in payments and time – varying deterioration rate. Mathematical and Computer modeling, 55(3–4), 367-377.
Sana, S.S. (2010). Optimal selling price and lot size with time varying deterioration and partial backlogging. Applied Mathematics and Computation, 217, 185- 194.
Teng, J.T., Chang, C.T., and Goyal, S.K (2005). Optimal pricing and ordering policy under permissible delay in payments. International Journal of Production Economics, 97, 121-129.
Teng, J.T., Min, J., & Pan, Q. (2012).Economic order quantity model with trade credit financing for non – decreasing demand. Omega, 40, 328-335.
Tripathi, R.P., Misra, S.S, and Shukla, H.S. (2010). A cash flow EOQ model under permissible delay in payments. International Journal of Engineering, Science and Technology, 2(11), 75-84.