How to cite this paper
Kumar, A., Kaanodiaya, K & Pachauri, R. (2011). Retailer’s inventory policy for deteriorating items under partial trade credit policy.International Journal of Industrial Engineering Computations , 2(3), 699-714.
Refrences
Abdul, I. & Murata, A., (2011). An inventory model for deteriorating items with varying demand pattern and unknown time horizon. International Journal of Industrial Engineering Computations 2, 61-86.
Aggarwal, S. P. (1978). A note on an order level inventory model for a system with constant rate of deterioration. Opsearch 15, 184-187.
Aggrawal, S.P., & Jaggi, C.K. (1995). Ordering policies of deteriorating items under permissible delay in payments. Journal of the Operational Research Society, 46, 658-662.
Chang, C. T., (2002). Extended economic order quantity model under cash discount and payment delay. International Journal of Information and Management Science, 13, 57-69.
Chang, K. J., & Liao, J. J. (2006). The optimal ordering policy in a DCF analysis for deteriorating items when trade credit depends on the order quantity. Journal of Production Economics, 100, 116-130.
Chen, M. S., & Chuang, C. C. (1999). An analysis of light buyer’s economic order model under trade credit. Asia-Pacific Journal of Operational Research, 16, 23-24.
Chu, P., Chung K. J. & Lan, S. P. (1998). Economic order quantity of deteriorating items under permissible delay in payments. Computers and Operations Research, 25, 817-824.
Chung, H. J., & Dye, C. Y. (2001). An inventory model for deteriorating items with partial backlogging and permissible delay in payments. International Journal of system Science, 32, 345-352.
Chung, H. J., & Dye, C. Y. (2002). An inventory model for deteriorating items under the condition of permissible delay in payments. Yugoslav Journal of Operational Research, 1, 73-84.
Chung, H. J., Huang, C. H. & Dye, C. Y. (2001). An inventory model for deteriorating items with linear trend demand under the condition of permissible delay in payments. Production Planning and Control, 12, 274-282.
Chung, K. J. (1998a). A theorem on the determination of economic orders quantity under condition of permissible delay in payments. Computers & Operations Research, 25, 49-52.
Chung, K. J. (2000). The inventory replenishment policy for deteriorating items under permissible delay in payments. Opsearch, 37, 267-281.
Chung, K. J. & Huang, Y. F. (2003). The optimal cycle time for EPQ inventory model under permissible delay in payments. International Journal of Production Economics, 84, 307-318.
Chung, K. J. & Liao, J. J. (2004). Lot-sizing decisions under trade credit depending on the order quantity. Computers & Operations Research, 3, 909-928.
Chung, K. J., (1998b) Economic order quantity model when delay in payments is permissible. Journal of Information and Optimization Science, 19, 411-416.
Chung, K. J., Goyal, S. K., & Huang, Y. F. (2005). The Optimal inventory policies under permissible delay in payments depending on the ordering quantity. International Journal of Production Economics, 95, 303-213.
Covert, R. B. & Philip, G. S. (1973). An EOQ model with weibull distribution deterioration. AIIE Trans, 5, 323-326.
Dave, U. & Patel, L. K. (1981). (T, Si) Policy inventory model for deteriorating items with time proportional demand. Journal of Operational Research Society, 32, 137-142.
Ghare, P. M. & Schrader, G. P., (1963). A model for an exponentially decaying inventory. Journal of Industrial Engineering, 14, 238-243.
Giri, B. C. & Chakraborty, A. (2010). Supply chain coordination for a deteriorating product under stock-dependent consumption and unreliable production process. International Journal of Industrial Engineering Computations, 2(1), 179-192.
Hariga, M. A. (1996). Optimal EOQ models for deteriorating items with time–varying demand Journal of Operational Society, 47, 1228-1246.
Huang, Y. F., & Chung K. J., (2003). Optimal replenishment policies in the EOQ model under cash discount and trade credit, Asia-Pacific Journal of Operational Research, 20, 177-190.
Huang, Y. F. & Hsu, K. H. (2008) An EOQ model under retailer partial trade credit policy in supply chain. International Journal of Production Economics, 112, 655-664.
Huang, Y. F. (2007). Economic order quantity under conditionally permissible delay in Payments. European Journal of Operational Research, 176, 911-924.
Hwang, H. & Shinn, S.W. (1997). Retailers pricing and lot sizing policy for exponentially deterioration products under the conditions of permissible delay in payments. Computers & Operation Research, 24, 539-547.
Jaggi, C.K., Goel, S.K. & Mittal, M. (2011). Economic order quantity model for deteriorating items with imperfect quality and permissible delay in payment. International Journal of Industrial Engineering Computations, 2(1), 123-140.
Jamal, A. M. M., Sarker, B. R. & Wang, S. (1997). An ordering policy for deteriorating items with allowable shortages and permissible delay in payment. Journal of the Operational Research Society, 48, 826-833.
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.
Liao, H.C., Tsai C.H. & Su, C. T. (2000). An inventory model with deteriorating items under inflation when a delay in payment permissible. International Journal of Production Economics, 63, 207-214.
Liao, J. J. & Chung, K.J. (2009). An EOQ model for deterioration items under trade credit policy in a supply chain system. Journal of Operation Research Society of Japan, 52, 46-57.
Mondal, B. N., Phaujdar, S. (1989b). An inventory model for deteriorating items and stock-dependent consumption rate. Journal of Operational Research Society, 40, 483-488.
Mondal, B.N., & Phaujdar, S. (1989c). Some EOQ models under permissible delay in payments. International Journal of Management Science, 5, 99-108.
Ouyang, L.Y., Chang, C.T. & Teng, J.T. (2005). An EOQ model for deteriorating items under trade credits. Journal of Operational Research Society, 56, 719-726.
Sachan, R, S. (1984). On (T, Si) policy inventory model for deteriorating items with time proportional demand. Journal of Operational Research Society, 35, 1013-1019.
Salameh, M. K., Abbound, N. E., Ei-Kassar, A. N. & Ghattas, R. E. (2003). Continuous review inventory model with delay in payment. International Journal of Production Economics, 85, 91-95.
Sarker, B. R., Jamal, A. M. M. & Wang, S. (2000). Supply chain model perishable products under inflation and permissible delay in payment. Computers & Operations Research, 27, 59-75.
Sarker, B. R., Jamal, A. M. M. & Wang, S. (2001). Optimal payment time under permissible delay in payment for product with deteriorating. production Planning and Control, 11, 380-390.
Shah, N. H. (1993a). Probabilistic time-scheduling model for an exponentially decaying inventory when delay in payments is permissible. International Journal of Production Economics, 32, 77-82.
Shah, N. H. (1993b). A lot size model for exponentially decaying inventory when delay in payment is permissible. Cahiers du CERO, 35, 115-123.
Shah, N. H. & Mishra, P. (2010). An EOQ model for deteriorating items under supplier credits when demand is stock-dependent. Yugoslav Journal of Operations Research, 20, 1 145-156.
Shah, V. R., Patel, N. C. & Shah, D. K. (1988). Economic ordering quantity when delay in payments of order and shortages are permitted. Gujarat Statistical Review, 15(2) 52-56.
Shah, V. R., Sreehari, M. (1996). An inventory model for a system with multiple storage facility. Opsearch, 33, (2) 96-106.
Shah, Y. K. & Jaiswal M. C. (1977). An order level inventory model for a system with constant rate of deterioration. Opsearch, 14, 174-184.
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 Operational Research Society, 55, 495-503.
Teng, J. T., Chern, M. S., Yang, H. L. & Wang, Y. J. (1999). Deterministic lot size inventory models with shortages and deterioration for fluctuating demand. Naval Research Logistic, 24, 65-72.
Yang, H. L, Teng, J. T. & Chern, M. S. (2001). Deterministic inventory lot-size models under inflation with shortages and deterioration for fluctuating demand. Naval Research Logistic,48, 144-158.
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 inventory model for a system with constant rate of deterioration. Opsearch 15, 184-187.
Aggrawal, S.P., & Jaggi, C.K. (1995). Ordering policies of deteriorating items under permissible delay in payments. Journal of the Operational Research Society, 46, 658-662.
Chang, C. T., (2002). Extended economic order quantity model under cash discount and payment delay. International Journal of Information and Management Science, 13, 57-69.
Chang, K. J., & Liao, J. J. (2006). The optimal ordering policy in a DCF analysis for deteriorating items when trade credit depends on the order quantity. Journal of Production Economics, 100, 116-130.
Chen, M. S., & Chuang, C. C. (1999). An analysis of light buyer’s economic order model under trade credit. Asia-Pacific Journal of Operational Research, 16, 23-24.
Chu, P., Chung K. J. & Lan, S. P. (1998). Economic order quantity of deteriorating items under permissible delay in payments. Computers and Operations Research, 25, 817-824.
Chung, H. J., & Dye, C. Y. (2001). An inventory model for deteriorating items with partial backlogging and permissible delay in payments. International Journal of system Science, 32, 345-352.
Chung, H. J., & Dye, C. Y. (2002). An inventory model for deteriorating items under the condition of permissible delay in payments. Yugoslav Journal of Operational Research, 1, 73-84.
Chung, H. J., Huang, C. H. & Dye, C. Y. (2001). An inventory model for deteriorating items with linear trend demand under the condition of permissible delay in payments. Production Planning and Control, 12, 274-282.
Chung, K. J. (1998a). A theorem on the determination of economic orders quantity under condition of permissible delay in payments. Computers & Operations Research, 25, 49-52.
Chung, K. J. (2000). The inventory replenishment policy for deteriorating items under permissible delay in payments. Opsearch, 37, 267-281.
Chung, K. J. & Huang, Y. F. (2003). The optimal cycle time for EPQ inventory model under permissible delay in payments. International Journal of Production Economics, 84, 307-318.
Chung, K. J. & Liao, J. J. (2004). Lot-sizing decisions under trade credit depending on the order quantity. Computers & Operations Research, 3, 909-928.
Chung, K. J., (1998b) Economic order quantity model when delay in payments is permissible. Journal of Information and Optimization Science, 19, 411-416.
Chung, K. J., Goyal, S. K., & Huang, Y. F. (2005). The Optimal inventory policies under permissible delay in payments depending on the ordering quantity. International Journal of Production Economics, 95, 303-213.
Covert, R. B. & Philip, G. S. (1973). An EOQ model with weibull distribution deterioration. AIIE Trans, 5, 323-326.
Dave, U. & Patel, L. K. (1981). (T, Si) Policy inventory model for deteriorating items with time proportional demand. Journal of Operational Research Society, 32, 137-142.
Ghare, P. M. & Schrader, G. P., (1963). A model for an exponentially decaying inventory. Journal of Industrial Engineering, 14, 238-243.
Giri, B. C. & Chakraborty, A. (2010). Supply chain coordination for a deteriorating product under stock-dependent consumption and unreliable production process. International Journal of Industrial Engineering Computations, 2(1), 179-192.
Hariga, M. A. (1996). Optimal EOQ models for deteriorating items with time–varying demand Journal of Operational Society, 47, 1228-1246.
Huang, Y. F., & Chung K. J., (2003). Optimal replenishment policies in the EOQ model under cash discount and trade credit, Asia-Pacific Journal of Operational Research, 20, 177-190.
Huang, Y. F. & Hsu, K. H. (2008) An EOQ model under retailer partial trade credit policy in supply chain. International Journal of Production Economics, 112, 655-664.
Huang, Y. F. (2007). Economic order quantity under conditionally permissible delay in Payments. European Journal of Operational Research, 176, 911-924.
Hwang, H. & Shinn, S.W. (1997). Retailers pricing and lot sizing policy for exponentially deterioration products under the conditions of permissible delay in payments. Computers & Operation Research, 24, 539-547.
Jaggi, C.K., Goel, S.K. & Mittal, M. (2011). Economic order quantity model for deteriorating items with imperfect quality and permissible delay in payment. International Journal of Industrial Engineering Computations, 2(1), 123-140.
Jamal, A. M. M., Sarker, B. R. & Wang, S. (1997). An ordering policy for deteriorating items with allowable shortages and permissible delay in payment. Journal of the Operational Research Society, 48, 826-833.
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.
Liao, H.C., Tsai C.H. & Su, C. T. (2000). An inventory model with deteriorating items under inflation when a delay in payment permissible. International Journal of Production Economics, 63, 207-214.
Liao, J. J. & Chung, K.J. (2009). An EOQ model for deterioration items under trade credit policy in a supply chain system. Journal of Operation Research Society of Japan, 52, 46-57.
Mondal, B. N., Phaujdar, S. (1989b). An inventory model for deteriorating items and stock-dependent consumption rate. Journal of Operational Research Society, 40, 483-488.
Mondal, B.N., & Phaujdar, S. (1989c). Some EOQ models under permissible delay in payments. International Journal of Management Science, 5, 99-108.
Ouyang, L.Y., Chang, C.T. & Teng, J.T. (2005). An EOQ model for deteriorating items under trade credits. Journal of Operational Research Society, 56, 719-726.
Sachan, R, S. (1984). On (T, Si) policy inventory model for deteriorating items with time proportional demand. Journal of Operational Research Society, 35, 1013-1019.
Salameh, M. K., Abbound, N. E., Ei-Kassar, A. N. & Ghattas, R. E. (2003). Continuous review inventory model with delay in payment. International Journal of Production Economics, 85, 91-95.
Sarker, B. R., Jamal, A. M. M. & Wang, S. (2000). Supply chain model perishable products under inflation and permissible delay in payment. Computers & Operations Research, 27, 59-75.
Sarker, B. R., Jamal, A. M. M. & Wang, S. (2001). Optimal payment time under permissible delay in payment for product with deteriorating. production Planning and Control, 11, 380-390.
Shah, N. H. (1993a). Probabilistic time-scheduling model for an exponentially decaying inventory when delay in payments is permissible. International Journal of Production Economics, 32, 77-82.
Shah, N. H. (1993b). A lot size model for exponentially decaying inventory when delay in payment is permissible. Cahiers du CERO, 35, 115-123.
Shah, N. H. & Mishra, P. (2010). An EOQ model for deteriorating items under supplier credits when demand is stock-dependent. Yugoslav Journal of Operations Research, 20, 1 145-156.
Shah, V. R., Patel, N. C. & Shah, D. K. (1988). Economic ordering quantity when delay in payments of order and shortages are permitted. Gujarat Statistical Review, 15(2) 52-56.
Shah, V. R., Sreehari, M. (1996). An inventory model for a system with multiple storage facility. Opsearch, 33, (2) 96-106.
Shah, Y. K. & Jaiswal M. C. (1977). An order level inventory model for a system with constant rate of deterioration. Opsearch, 14, 174-184.
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 Operational Research Society, 55, 495-503.
Teng, J. T., Chern, M. S., Yang, H. L. & Wang, Y. J. (1999). Deterministic lot size inventory models with shortages and deterioration for fluctuating demand. Naval Research Logistic, 24, 65-72.
Yang, H. L, Teng, J. T. & Chern, M. S. (2001). Deterministic inventory lot-size models under inflation with shortages and deterioration for fluctuating demand. Naval Research Logistic,48, 144-158.
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.