How to cite this paper
Tyagi, A. (2014). An optimization of an inventory model of decaying-lot depleted by declining market demand and extended with discretely variable holding costs.International Journal of Industrial Engineering Computations , 5(1), 71-86.
Refrences
Abad, P.L. (2000). Optimal lot size for a perishable good under conditions of finite production and partial backordering and lost sale. Computers & Industrial Engineering, 38, 457–465.
Aggarwal, S.P. (1978). A note on an order-level model for a system with constant rate of deterioration. Opsearch, 15, 184-187.
Alfares, H.K. (2007). Inventory model with stock-level dependent demand rate and variable holding cost. International Journal of Production Economics, 108, 12, 259–265.
Bhunia, A. K. & Shaikh, A.A. (2011). A deterministic model for deteriorating items with displayed inventory level dependent demand rate incorporating marketing decisions with transportation cost. International Journal of Industrial Engineering Computations, 2, 547–562.
Chang, H.J. & Dye, C.Y. (1999). An EOQ model for deteriorating items with time varying demand and partial backlogging. Journal of the Operational Research Society, 50, 1176–1182.
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 and industrial Engineering, 52, 29-40.
Ferguson, M., Hayaraman, V. & Souza, G.C. (2007). Note: An application of the EOQ model with nonlinear holding cost to inventory management of perishables. European Journal of Operational Research, 180, 1, 485–490.
Hollier, R.H. & Mak, K.L. (1983). Inventory replenishment policies for deteriorating items in a declining market. International Journal of Production Research, 21, 813–826.
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.
Hung, K.C. (2011).An inventory model with generalized type demand, deterioration and backorder rates. European Journal of Operational Research, 208, 239- 242.
Jaggi, C.K., Aggarwal, K.K., & Goel, S.K. (2006). Optimal order policy for deteriorating items With inflation induced demand. International Journal of Production Economics, 103, 707-714.
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(2), 237-248.
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.
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.
Lin, J. (2012). A demand independent inventory control. Yugoslav Journal of Operations Research, 22, 1-7.
Mishra, V.K. & Singh, L.S. (2011). Deteriorating inventory model for time dependent demand and holding cost with partial backlogging. International Journal of Management Science and Engineering Management, 6, 4, 267-271.
Park, K.S. (1982). Inventory models with partial backorders. International Journal of Systems Science, 13, 1313–1317.
Papachristos, S. & Skouri, K. (2000). An optimal replenishment policy for deteriorating items with time-varying demand and partial exponential type-backlogging. Operations Research Letters, 27, 175–184.
Papachristos, S. & Skouri, K. (2003). An inventory model with deteriorating items, quantity discount, pricing and time-dependent partial backlogging. International Journal of Production Economics, 83, 247–256.
Patra, S. K., Lenka, T. K., & Ratha, P.C. (2010).An order level EOQ model for deteriorating items in a single warehouse system with price dependent demand in non-linear form. International Journal of Computational and Applied Mathematics, 5(3), 277-288.
Sana, S.S. (2010). Optimal selling price and lot size with time varying deterioration and partial backlogging. Applied Mathematics and Computation, 217, 185- 194.
Skouri, K., Konstantaras, I., Papachristos, S., & Teng, J.T. (2011). Supply chain models for deteriorating products with ramp type demand rate under permissible delay in payments. Expert Systems with Applications, 38, 14861-14869.
Taleizadeh, A.A., Widyadana, G.A., Wee, H.M., & Biabani, J. (2011). Multi products single machine economic production quantity model with multiple batch size. International Journal of Industrial Engineering Computations, 2(2), 213-224.
Taleizadeh, A.A., C?rdenas-Barr?n, L.E., Biabani, J., & Nikousokhan, R. (2012). Multi products single machine EPQ model with immediate rework process. International Journal of Industrial Engineering Computations, 3(2), 93-102.
Teng, J.T., Yang, H.L., & Ouyang, L.Y. (2003). On an EOQ model for deteriorating items with timevarying demand and partial backlogging. Journal of Operational Research Society, 54 (4), 432-436.
Teng, J.T., & Yang, H.L. (2004). Deterministic economic order quantity models with partial backlogging when demand and cost are fluctuating with time. Journal of the Operational Research Society, 55 (5), 495-503.
Teng, J.T., Oyang, L.Y., & Chen, L.H. (2007).A comparison between two pricing and lot-sizing models with partial backlogging and deteriorated items. International Journal of Production Economics, 105 (1), 190-203.
Tyagi, A.P., Pandey, R.K. & Singh, S.R. (2012). Optimization of inventory model for decaying item with variable holding cost and power demand. Proceedings of National Conference on Trends & Advances in Mechanical Engineering, ISBN: 978-93-5087-574-2, 774-781.
Tripathi, R.P. (2013). Inventory model with different demand rate and different holding cost. International Journal of Industrial Engineering Computations, 4, 437–446.
Weiss, H.J. (1982). Economic order quantity models with nonlinear holding costs. European Journal of Operational Research, 9, 56–60.
Wee, H.M. (1995). A deterministic lot-size inventory model for deteriorating items with shortages and a declining market. Computers & Operations Research, 22, 345–356.
Wang, S.P. (2002). An inventory replenishment policy for deteriorating items with shortages and partial backlogging. Computers & Operations Research, 29, 2043–2051.
Yang, H.L. (2005).A comparison among various partial backlogging inventory lot-size models for deteriorating items on the basis of maximum profit. International Journal of Production Economics, 96 (1), 119-128.
Yang, H. L., Teng, J. T. & Chern, M. S. (2010). An inventory model under inflation for deteriorating items with stock-dependent consumption rate and partial backlogging shortages. International Journal of Production Economics, 123, 8–19.
Aggarwal, S.P. (1978). A note on an order-level model for a system with constant rate of deterioration. Opsearch, 15, 184-187.
Alfares, H.K. (2007). Inventory model with stock-level dependent demand rate and variable holding cost. International Journal of Production Economics, 108, 12, 259–265.
Bhunia, A. K. & Shaikh, A.A. (2011). A deterministic model for deteriorating items with displayed inventory level dependent demand rate incorporating marketing decisions with transportation cost. International Journal of Industrial Engineering Computations, 2, 547–562.
Chang, H.J. & Dye, C.Y. (1999). An EOQ model for deteriorating items with time varying demand and partial backlogging. Journal of the Operational Research Society, 50, 1176–1182.
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 and industrial Engineering, 52, 29-40.
Ferguson, M., Hayaraman, V. & Souza, G.C. (2007). Note: An application of the EOQ model with nonlinear holding cost to inventory management of perishables. European Journal of Operational Research, 180, 1, 485–490.
Hollier, R.H. & Mak, K.L. (1983). Inventory replenishment policies for deteriorating items in a declining market. International Journal of Production Research, 21, 813–826.
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.
Hung, K.C. (2011).An inventory model with generalized type demand, deterioration and backorder rates. European Journal of Operational Research, 208, 239- 242.
Jaggi, C.K., Aggarwal, K.K., & Goel, S.K. (2006). Optimal order policy for deteriorating items With inflation induced demand. International Journal of Production Economics, 103, 707-714.
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(2), 237-248.
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.
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.
Lin, J. (2012). A demand independent inventory control. Yugoslav Journal of Operations Research, 22, 1-7.
Mishra, V.K. & Singh, L.S. (2011). Deteriorating inventory model for time dependent demand and holding cost with partial backlogging. International Journal of Management Science and Engineering Management, 6, 4, 267-271.
Park, K.S. (1982). Inventory models with partial backorders. International Journal of Systems Science, 13, 1313–1317.
Papachristos, S. & Skouri, K. (2000). An optimal replenishment policy for deteriorating items with time-varying demand and partial exponential type-backlogging. Operations Research Letters, 27, 175–184.
Papachristos, S. & Skouri, K. (2003). An inventory model with deteriorating items, quantity discount, pricing and time-dependent partial backlogging. International Journal of Production Economics, 83, 247–256.
Patra, S. K., Lenka, T. K., & Ratha, P.C. (2010).An order level EOQ model for deteriorating items in a single warehouse system with price dependent demand in non-linear form. International Journal of Computational and Applied Mathematics, 5(3), 277-288.
Sana, S.S. (2010). Optimal selling price and lot size with time varying deterioration and partial backlogging. Applied Mathematics and Computation, 217, 185- 194.
Skouri, K., Konstantaras, I., Papachristos, S., & Teng, J.T. (2011). Supply chain models for deteriorating products with ramp type demand rate under permissible delay in payments. Expert Systems with Applications, 38, 14861-14869.
Taleizadeh, A.A., Widyadana, G.A., Wee, H.M., & Biabani, J. (2011). Multi products single machine economic production quantity model with multiple batch size. International Journal of Industrial Engineering Computations, 2(2), 213-224.
Taleizadeh, A.A., C?rdenas-Barr?n, L.E., Biabani, J., & Nikousokhan, R. (2012). Multi products single machine EPQ model with immediate rework process. International Journal of Industrial Engineering Computations, 3(2), 93-102.
Teng, J.T., Yang, H.L., & Ouyang, L.Y. (2003). On an EOQ model for deteriorating items with timevarying demand and partial backlogging. Journal of Operational Research Society, 54 (4), 432-436.
Teng, J.T., & Yang, H.L. (2004). Deterministic economic order quantity models with partial backlogging when demand and cost are fluctuating with time. Journal of the Operational Research Society, 55 (5), 495-503.
Teng, J.T., Oyang, L.Y., & Chen, L.H. (2007).A comparison between two pricing and lot-sizing models with partial backlogging and deteriorated items. International Journal of Production Economics, 105 (1), 190-203.
Tyagi, A.P., Pandey, R.K. & Singh, S.R. (2012). Optimization of inventory model for decaying item with variable holding cost and power demand. Proceedings of National Conference on Trends & Advances in Mechanical Engineering, ISBN: 978-93-5087-574-2, 774-781.
Tripathi, R.P. (2013). Inventory model with different demand rate and different holding cost. International Journal of Industrial Engineering Computations, 4, 437–446.
Weiss, H.J. (1982). Economic order quantity models with nonlinear holding costs. European Journal of Operational Research, 9, 56–60.
Wee, H.M. (1995). A deterministic lot-size inventory model for deteriorating items with shortages and a declining market. Computers & Operations Research, 22, 345–356.
Wang, S.P. (2002). An inventory replenishment policy for deteriorating items with shortages and partial backlogging. Computers & Operations Research, 29, 2043–2051.
Yang, H.L. (2005).A comparison among various partial backlogging inventory lot-size models for deteriorating items on the basis of maximum profit. International Journal of Production Economics, 96 (1), 119-128.
Yang, H. L., Teng, J. T. & Chern, M. S. (2010). An inventory model under inflation for deteriorating items with stock-dependent consumption rate and partial backlogging shortages. International Journal of Production Economics, 123, 8–19.