How to cite this paper
Shukla, H., Shukla, V & Yadava, S. (2013). EOQ model for deteriorating items with exponential demand rate and shortages.Uncertain Supply Chain Management, 1(2), 67-76.
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.
Chang, C.T., Ouyang, L.Y. &Teng, J.T. (2003). An EOQ model for deteriorating items under supplier credit linked to ordering quantity. Applied Mathematical Modeling, 27, 983-996.
Chang, C.T., Ouyang, L.Y., & Teng, J.T. (2003). An EOQ model for deteriorating items under supplier credits linked to order quantity. Applied Mathematical Modeling, 27, 983-996.
Chung, K.J., & Huang, C.K. (2009). An ordering policy with allowable shortage and permissible delay in payments. Applied Mathematical Modeling, 33, 2518-2525.
Dave, U. (1985).On economic order quantity under conditions of permissible delay in payments. Journal of Operational Research Society, 36, 1069.
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.
Goh, M. (1994). EOQ models with general demand and holding cost function. European Journal
of Operational Research, 73, 50-54.
Goyal, S.K. (1985).Economic order quantity under condition 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.
Huang, Y.F. (2007).Economic order quantity under conditionally permissible delay in payments.
European Journal of Operational Research, 1766, 911-924.
Hwang, H., & Shinn, S.W. (1997).Retailers pricing and lot sizing policy for exponentially deteriorating products under the conditions of permissible delay in payments. Computers & Operations Research, 24, 539-547.
Jagg, 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.
Jamal, A.M.M., Sarker, B.R., & Wang, S. (2000). Optimal payment time for a retailer under permitted delay of payment by the wholesaler. International Journal of Production Economics, 66, 59-66.
Lin, J. (2012). A demand independent inventory control. Yugoslav Journal of Operations Research, 22, 1-7.
Mak, K.L. (1987). Determining optimal production inventory control policies for an inventory system with partial backlogging. Computers and Operations Research, 14 (4), 299-309.
Montgomery, D.C., Bazaraa, M.S., & Keswani, A.K. (1973). Inventory models with mix time of backorders and lost sales. Naval Research Logistic Quarterly, 20 (2), 255-263.
Muhlemann, A.P., & Valtis-Spanopoulos, N.P. (1980). A variable holding cost rate EOQ model. European Journal of Operational Research, 4, 132-135.
Naddor, E. (1966). Inventory Systems, Wiley, New York.
Ouyang, L.Y., Teng,J.T. Goyal, S.K. and Yang, C.T. (2009). An EOQ model for deteriorating items with partially permissible delay in payments linked to order quantity. European Journal of operational Research, 194, 418-431.
Papachristos, S., Skouri, K. (2000).An optimal replenishment policy for deteriorating items with time-varying demand and partial exponential time-backlogging. Operations Research Letters, 27 (4), 175-184.
Park, K.S. (1982).Inventory model with partial back orders. International Journal of System
Science 13 (12), 1313-1317.
Patra, S. K., Lenka, T. K. and 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 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.
Teng, J.T. (2002). On the economic order quantity under conditions of permissible delay in payments. Journal of Operational Research Society, 53, 915-918.
Teng, J.T., Chang, C.T., & 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., & 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.
Teng, J.T., Yang, H.L., & Ouyang, L.Y. (2003). On an EOQ model for deteriorating items with time-varying demand and partial backlogging. Journal of Operational Research Society, 54 (4), 432-436.
Tripathy, C.K. & Mishra, U. (2011).Ordering policy for linear deteriorating items for declining demand with permissible delay in payments. International Journal of Open Problems Computational Mathematics, 4(3), 152-161.
Vander Veen, B. (1967).Introduction to the Theory of Operational Research. Philip Technical Library, Springer-Verlag, New York.
Weiss, H.J. (1982).Economic order quantity model with non linear holding cost. European Journal of Operational Research, 9, 56-60.
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(1), 8-19.
Chang, C.T., Ouyang, L.Y. &Teng, J.T. (2003). An EOQ model for deteriorating items under supplier credit linked to ordering quantity. Applied Mathematical Modeling, 27, 983-996.
Chang, C.T., Ouyang, L.Y., & Teng, J.T. (2003). An EOQ model for deteriorating items under supplier credits linked to order quantity. Applied Mathematical Modeling, 27, 983-996.
Chung, K.J., & Huang, C.K. (2009). An ordering policy with allowable shortage and permissible delay in payments. Applied Mathematical Modeling, 33, 2518-2525.
Dave, U. (1985).On economic order quantity under conditions of permissible delay in payments. Journal of Operational Research Society, 36, 1069.
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.
Goh, M. (1994). EOQ models with general demand and holding cost function. European Journal
of Operational Research, 73, 50-54.
Goyal, S.K. (1985).Economic order quantity under condition 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.
Huang, Y.F. (2007).Economic order quantity under conditionally permissible delay in payments.
European Journal of Operational Research, 1766, 911-924.
Hwang, H., & Shinn, S.W. (1997).Retailers pricing and lot sizing policy for exponentially deteriorating products under the conditions of permissible delay in payments. Computers & Operations Research, 24, 539-547.
Jagg, 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.
Jamal, A.M.M., Sarker, B.R., & Wang, S. (2000). Optimal payment time for a retailer under permitted delay of payment by the wholesaler. International Journal of Production Economics, 66, 59-66.
Lin, J. (2012). A demand independent inventory control. Yugoslav Journal of Operations Research, 22, 1-7.
Mak, K.L. (1987). Determining optimal production inventory control policies for an inventory system with partial backlogging. Computers and Operations Research, 14 (4), 299-309.
Montgomery, D.C., Bazaraa, M.S., & Keswani, A.K. (1973). Inventory models with mix time of backorders and lost sales. Naval Research Logistic Quarterly, 20 (2), 255-263.
Muhlemann, A.P., & Valtis-Spanopoulos, N.P. (1980). A variable holding cost rate EOQ model. European Journal of Operational Research, 4, 132-135.
Naddor, E. (1966). Inventory Systems, Wiley, New York.
Ouyang, L.Y., Teng,J.T. Goyal, S.K. and Yang, C.T. (2009). An EOQ model for deteriorating items with partially permissible delay in payments linked to order quantity. European Journal of operational Research, 194, 418-431.
Papachristos, S., Skouri, K. (2000).An optimal replenishment policy for deteriorating items with time-varying demand and partial exponential time-backlogging. Operations Research Letters, 27 (4), 175-184.
Park, K.S. (1982).Inventory model with partial back orders. International Journal of System
Science 13 (12), 1313-1317.
Patra, S. K., Lenka, T. K. and 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 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.
Teng, J.T. (2002). On the economic order quantity under conditions of permissible delay in payments. Journal of Operational Research Society, 53, 915-918.
Teng, J.T., Chang, C.T., & 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., & 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.
Teng, J.T., Yang, H.L., & Ouyang, L.Y. (2003). On an EOQ model for deteriorating items with time-varying demand and partial backlogging. Journal of Operational Research Society, 54 (4), 432-436.
Tripathy, C.K. & Mishra, U. (2011).Ordering policy for linear deteriorating items for declining demand with permissible delay in payments. International Journal of Open Problems Computational Mathematics, 4(3), 152-161.
Vander Veen, B. (1967).Introduction to the Theory of Operational Research. Philip Technical Library, Springer-Verlag, New York.
Weiss, H.J. (1982).Economic order quantity model with non linear holding cost. European Journal of Operational Research, 9, 56-60.
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(1), 8-19.