How to cite this paper
Tripathi, R & Pandey, H. (2015). Inventory model with Weibull time-dependent demand rate and completely backlogged permissible delay in payments.Uncertain Supply Chain Management, 3(4), 321-332.
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.
Agarwal, R., Rajput, D., & Varshney, N.K. (2009). Integrated inventory system with the effect of inflation and credit period. International Journal of Applied Engineering Research, 4(11), 2337-2348.
Baker, R.C., & Urban, T.L. (1988). A deterministic inventory system with inventory- level dependent demand rate. Journal of operational Research Society, 39, 823-831.
Barron, L.E.C. (2009). Economic production quantity with rework process at a single- stage manufacturing system with planned backorders. Computers and Industrial Engineering, 57, 1105-1113.
Chen, S. C., C?rdenas-Barr?n, L. E., & Teng, J. T. (2014). Retailer’s economic order quantity when the supplier offers conditionally permissible delay in payments link to order quantity. International Journal of Production Economics,155, 284-291.
Chiu, Y.P. (2003). Determining the optimal lot size for the finite production model with random defective rate, the rework process and backlogging. Engineering Optimization, 35(4), 427-437.
Chung, K.J. (1998). A theorem on the determination of economic order quantity under condition of permissible delay in payments. Computers and Operations Research,25, 49-52.
Chu, P., Chung, K.J., & Lan, S.P. (1998). Economic order quantity of deteriorating items under permissible delay in payments. Computer and Operational Research, 25, 817-824.
Datta, T.K., & Pal, A.K. (1990). A note on an inventory model with inventory level with inventory- level- dependent demand rate. Journal of Operational Research Society, 41(10), 971-975.
Datta, T.K., & Pal, A.K. (1991). Effects of inflation and time- value of money on an inventory model with linear time – dependent demand rate and shortages. European Journal of Operational Research, 52, 1-8.
Dye, C.Y., Hsieh,T.P., & Ouyang, L.Y. (2007). Determining optimal selling price and lot size with a varying rate of deterioration and exponential partial backlogging. Tamsui Oxford Journal of Mathematical Sciences, 181, 668-678.
Goyal, S.K. (1985). Economic order quantity under conditions of permissible delay in payments. Journal of Operational Research Society, 36, 335-338.
Goyal, S.K., & Giri, B.C. (2003). The production inventory problem of a product with time varying demand, production and deterioration rate. European Journal of Operational Research, 147, 549-557.
Gupta, R., & Vrat, P. (1986). Inventory model for stock – dependent consumption rate. Opsearch, 23(1), 19-24.
Hollier, R.H., & Mak, K.L. (1983). Inventory replenishment policies for deteriorating items in a declining market. International Journal of Production Economics, 21, 813-826.
Hwang, H., & Shinn, S.W. (1997). Retailer’s pricing and lot sizing policy for exponentially deteriorating products under the condition of permissible delay in payments. Computer and Operational Research, 24, 539-547.
Jamal, A.M.M., Sarker, B.R., & Mandal,S. (2004). Optimal manufacturing batch size with rework process at single- stage production system. Computers and Industrial Engineering, 47(1), 77-89.
Khouja, M., & Mehrez, A. (1996). Optimal inventory policy under different supplier credits. Journal of Manufacturing System, 15, 334-339.
Liao, J.J. (2007). On an EPQ model for deteriorating items under permissible delay in payments. Applied Mathematical Modelling, 31, 393-403.
Liao. J.J. (2008). An EOQ model with non-instantaneous receipt and exponentially deteriorating items under two- level trade credits. International Journal of Production Economics, 113, 853-861.
Lin, J., & Julian, H.C. (2012). A demand independent inventory control. Yugoslav Journal of Operations Research, 22, 1-7.
Mandal, B.N., & Phaujdar, S. (1989). An inventory model for deteriorating items and stock- dependent consumption rate. Journal of operational Research Society, 40(5), 483 -488.
Misra, R.B. (1979). A note on optimal inventory management under inflation. Noval Research Logistics, 26, 161-165.
Ouyang, L.Y., & Chang, C.T. (2013).Optimal production lot with imperfect production process under permissible delay in payments and complete backlogging. International Journal of Production Economics, 144(2), 610-617.
Park, K.S. (1982). Inventory models with partial backorders. International Journal of System Science, 13, 1313-1317.
Ray, J., & Chaudhuri, K.S. (1997). An EOQ model with stock- dependent demand, shortages, inflation and time- discounting. International Journal of Production Economics , 53, 171-180.
Sarker, B.R., Jamal, A.M.M., & Wang, S. (2000). Optimal payment time under permissible delay in payment for product with deterioration. Production Planning and Control, 11, 380-390.
Sarker, B.R., Jamal, A.M.M., & Mandal, S. (2008). Optimal batch sizing in a multi-stage production system with rework consideration. European Journal of Operational Research, 184(3), 915-929.
Shah, N.H. (1993). A lot size model for exponentially decaying inventory when delay in payments is permissible. Cah,du,CERO, 35,115-123.
Shinn, S.W. (1997). Determining optimal retail price and lot size under delay items supplier credit. Computer and Industrial Engineering, 33, 717-720.
Silver, E.A., & Meal, H.C. (1969). A simple modification of the EOQ model for the case of a varying demand rate. Production and Inventory Management, 10, 52-65.
Silver, E.A., & Meal, H.C. (1973). A heuristic for selecting lot size quantities for the case of a deterministic time – varying demand rate and discrete opportunities of replenishment. Journal of operational Research Society, 14, 64 – 74.
Tripathy, C. K., & Mishra, U. (2010). An inventory model for Weibull Time- dependent demand rate with completely backlogged shortages. International Mathematical Forum, 5(54). 2675-2687.
Tripathi, R.P. (2011). EOQ model with time- dependent demand rate and time- dependent holding cost function. International Journal of Operations Research and Information System, 2(3), 79-92.
Tripathi, R.P., Misra, S.S., & Shukla, H.S. (2011). A cash flow oriented EOQ model of deteriorating items with time- dependent demand rate under permissible delay in payments. International Journal of Business and Information Technology, 1(2), 153-158.
Tripathi R.P. and Kumar ,M. (2011). Credit financing in economic ordering policies of time-
dependent. International Journal of Business, Management and Social Sciences, 2(3), 75-84
Tripathi, R.P. (2013). An inventory model with shortages and exponential demand rate under permissible delay in payments. International Journal of Management Science and Engineering Management, 7(2), 134-139.
Urban, T.L. (2012). An extension of inventory models incorporating financing agreements with both suppliers and customers. Applied Mathematical Modelling, 36, 6323-6330.
Uthayakumar, R., & Geetha, K.V. (2009). A replenishment policy for non- instantaneous deteriorating inventory system with partial backlogging. Tamsui Oxford Journal of Mathematical Sciences, 25, 313-332.
Wee, H.M. (1995). A deterministic lot-size inventory model for deteriorating items with shortages and declining Market. Computers and Operations Research, 22, 345-356.
Wu, K.S. (1998). An ordering policy for items with weibull distribution deterioration under permissible delay in payments. Tamsui Oxford Journal of Mathematical Sciences, 14, 39-54.
Agarwal, R., Rajput, D., & Varshney, N.K. (2009). Integrated inventory system with the effect of inflation and credit period. International Journal of Applied Engineering Research, 4(11), 2337-2348.
Baker, R.C., & Urban, T.L. (1988). A deterministic inventory system with inventory- level dependent demand rate. Journal of operational Research Society, 39, 823-831.
Barron, L.E.C. (2009). Economic production quantity with rework process at a single- stage manufacturing system with planned backorders. Computers and Industrial Engineering, 57, 1105-1113.
Chen, S. C., C?rdenas-Barr?n, L. E., & Teng, J. T. (2014). Retailer’s economic order quantity when the supplier offers conditionally permissible delay in payments link to order quantity. International Journal of Production Economics,155, 284-291.
Chiu, Y.P. (2003). Determining the optimal lot size for the finite production model with random defective rate, the rework process and backlogging. Engineering Optimization, 35(4), 427-437.
Chung, K.J. (1998). A theorem on the determination of economic order quantity under condition of permissible delay in payments. Computers and Operations Research,25, 49-52.
Chu, P., Chung, K.J., & Lan, S.P. (1998). Economic order quantity of deteriorating items under permissible delay in payments. Computer and Operational Research, 25, 817-824.
Datta, T.K., & Pal, A.K. (1990). A note on an inventory model with inventory level with inventory- level- dependent demand rate. Journal of Operational Research Society, 41(10), 971-975.
Datta, T.K., & Pal, A.K. (1991). Effects of inflation and time- value of money on an inventory model with linear time – dependent demand rate and shortages. European Journal of Operational Research, 52, 1-8.
Dye, C.Y., Hsieh,T.P., & Ouyang, L.Y. (2007). Determining optimal selling price and lot size with a varying rate of deterioration and exponential partial backlogging. Tamsui Oxford Journal of Mathematical Sciences, 181, 668-678.
Goyal, S.K. (1985). Economic order quantity under conditions of permissible delay in payments. Journal of Operational Research Society, 36, 335-338.
Goyal, S.K., & Giri, B.C. (2003). The production inventory problem of a product with time varying demand, production and deterioration rate. European Journal of Operational Research, 147, 549-557.
Gupta, R., & Vrat, P. (1986). Inventory model for stock – dependent consumption rate. Opsearch, 23(1), 19-24.
Hollier, R.H., & Mak, K.L. (1983). Inventory replenishment policies for deteriorating items in a declining market. International Journal of Production Economics, 21, 813-826.
Hwang, H., & Shinn, S.W. (1997). Retailer’s pricing and lot sizing policy for exponentially deteriorating products under the condition of permissible delay in payments. Computer and Operational Research, 24, 539-547.
Jamal, A.M.M., Sarker, B.R., & Mandal,S. (2004). Optimal manufacturing batch size with rework process at single- stage production system. Computers and Industrial Engineering, 47(1), 77-89.
Khouja, M., & Mehrez, A. (1996). Optimal inventory policy under different supplier credits. Journal of Manufacturing System, 15, 334-339.
Liao, J.J. (2007). On an EPQ model for deteriorating items under permissible delay in payments. Applied Mathematical Modelling, 31, 393-403.
Liao. J.J. (2008). An EOQ model with non-instantaneous receipt and exponentially deteriorating items under two- level trade credits. International Journal of Production Economics, 113, 853-861.
Lin, J., & Julian, H.C. (2012). A demand independent inventory control. Yugoslav Journal of Operations Research, 22, 1-7.
Mandal, B.N., & Phaujdar, S. (1989). An inventory model for deteriorating items and stock- dependent consumption rate. Journal of operational Research Society, 40(5), 483 -488.
Misra, R.B. (1979). A note on optimal inventory management under inflation. Noval Research Logistics, 26, 161-165.
Ouyang, L.Y., & Chang, C.T. (2013).Optimal production lot with imperfect production process under permissible delay in payments and complete backlogging. International Journal of Production Economics, 144(2), 610-617.
Park, K.S. (1982). Inventory models with partial backorders. International Journal of System Science, 13, 1313-1317.
Ray, J., & Chaudhuri, K.S. (1997). An EOQ model with stock- dependent demand, shortages, inflation and time- discounting. International Journal of Production Economics , 53, 171-180.
Sarker, B.R., Jamal, A.M.M., & Wang, S. (2000). Optimal payment time under permissible delay in payment for product with deterioration. Production Planning and Control, 11, 380-390.
Sarker, B.R., Jamal, A.M.M., & Mandal, S. (2008). Optimal batch sizing in a multi-stage production system with rework consideration. European Journal of Operational Research, 184(3), 915-929.
Shah, N.H. (1993). A lot size model for exponentially decaying inventory when delay in payments is permissible. Cah,du,CERO, 35,115-123.
Shinn, S.W. (1997). Determining optimal retail price and lot size under delay items supplier credit. Computer and Industrial Engineering, 33, 717-720.
Silver, E.A., & Meal, H.C. (1969). A simple modification of the EOQ model for the case of a varying demand rate. Production and Inventory Management, 10, 52-65.
Silver, E.A., & Meal, H.C. (1973). A heuristic for selecting lot size quantities for the case of a deterministic time – varying demand rate and discrete opportunities of replenishment. Journal of operational Research Society, 14, 64 – 74.
Tripathy, C. K., & Mishra, U. (2010). An inventory model for Weibull Time- dependent demand rate with completely backlogged shortages. International Mathematical Forum, 5(54). 2675-2687.
Tripathi, R.P. (2011). EOQ model with time- dependent demand rate and time- dependent holding cost function. International Journal of Operations Research and Information System, 2(3), 79-92.
Tripathi, R.P., Misra, S.S., & Shukla, H.S. (2011). A cash flow oriented EOQ model of deteriorating items with time- dependent demand rate under permissible delay in payments. International Journal of Business and Information Technology, 1(2), 153-158.
Tripathi R.P. and Kumar ,M. (2011). Credit financing in economic ordering policies of time-
dependent. International Journal of Business, Management and Social Sciences, 2(3), 75-84
Tripathi, R.P. (2013). An inventory model with shortages and exponential demand rate under permissible delay in payments. International Journal of Management Science and Engineering Management, 7(2), 134-139.
Urban, T.L. (2012). An extension of inventory models incorporating financing agreements with both suppliers and customers. Applied Mathematical Modelling, 36, 6323-6330.
Uthayakumar, R., & Geetha, K.V. (2009). A replenishment policy for non- instantaneous deteriorating inventory system with partial backlogging. Tamsui Oxford Journal of Mathematical Sciences, 25, 313-332.
Wee, H.M. (1995). A deterministic lot-size inventory model for deteriorating items with shortages and declining Market. Computers and Operations Research, 22, 345-356.
Wu, K.S. (1998). An ordering policy for items with weibull distribution deterioration under permissible delay in payments. Tamsui Oxford Journal of Mathematical Sciences, 14, 39-54.