How to cite this paper
Bhunia, A., Shaikh, A., Pareek, S & Dhaka, V. (2015). A memo on stock model with partial backlogging under delay in payments.Uncertain Supply Chain Management, 3(1), 11-20.
Refrences
Baker, R.C., & Urban, T.L. (1988). A deterministic inventory system with an inventory level dependent demand rate. Journal of the Operational Research Society, 39, 823-831.
Bhunia, A.K., & Shaikh, A.A. (2011a). A deterministic model for deteriorating items with displayed inventory level dependent demand rate incorporating marketing decision with transportation cost. International Journal of Industrial Engineering Computations, 2(3), 547-562.
Bhunia, A.K., Shaikh, A.A., Maiti, A.K., & Maiti, M. (2013). A two warehouse deterministic inventory model for deteriorating items with a linear trend in time dependent demand over finite time horizon by Elitist Real-Coded Genetic Algorithm. International Journal Industrial Engineering and Computations, 4(2), 241-258.
Bhunia, A.K., & Shaikh, A.A. (2014). A deterministic inventory model for deteriorating items with selling price dependent demand and three-parameter Weibull distributed deterioration. International Journal of Industrial Engineering Computations, 5(3), 497-510.
Chang., C. T. (2004). Inventory models with stock dependent demand and nonlinear holding costs for deteriorating items. Asia –Pacific journal of Operational Research, 21, 435-446.
Datta, T.K., & Pal, A.K. (1990). A note on an inventory-level-dependent demand rate. Journal of the Operational Research Society, 41, 971-975.
Datta, T.K., & Paul, K. (2001). An inventory system with stock-dependent, price-sensitive demand rate. Production Planning & Control, 12, 13-20.
Goh, M. (1994). EOQ models with general demand and holding cost functions. European Journal of Operational Research, 73, 50-54.
Goyal, S. K., & Chang, C. T. (2009). Optimal ordering and transfer Policy for an inventory with stock dependent demand. European Journal of Operational Research, 196, 177-185.
Hou, K. L., & Lin, L. C. (2006). An EOQ models for deteriorating items with price & stock- dependent selling rate under inflation & time value of money. International Journal of System Sciences, 37, 1131-1139.
Levin, R.I., McLaughlin, C.P., Lamone, R.P., & Kottas, J.F. (1972). Production/Operations Management: Contemporary Policy for Managing Operating Systems. McGraw-Hill, New York.
Mandal, B.N., & Phaujdar, S. (1989). An inventory model for deteriorating items and stock-dependent consumption rate. Journal of the Operational Research Society, 40, 483-488.
Padmanabhan, G., & Vrat, P. (1995). EOQ models for perishable items under stock- dependent selling rate. European Journal of Operational Research, 86, 281-292.
Pal, S., Goswami, A., & Chaudhari, K. S. (1993). A deterministic inventory model for deteriorating items with stock dependent rate. International Journal of Production Economics, 32, 291-299.
Pal, P., Das, C.B., Panda, A., & Bhunia, A.K. (2005). An application of real-coded genetic algorithm (for mixed integer non-linear programming in an optimal two-warehouse inventory policy for deteriorating items with a linear trend in demand and a fixed planning horizon. International Journal of Computer Mathematics, 82, 163-175.
Silver, E.A., & Peterson, R. (1985). Decision Systems for inventory Management and Production Planning. 2nd Edition, Wiley, Newyork.
Tsu-Pang, H., Chang-Yuan, D., & Liang-Yuh, O. (2010). Optimal lot size for an item with partial backlogging rate when demand is stimulated by inventory above a certain stock level. Mathematical and computing Modelling, 51, 13-32.
Urban, T. L. (1992). An inventory model with an inventory level dependent demand rate & relaxed terminal conditions. Journal of the Operational Research Society, 43, 721-724.
Whitin, T. M. (1957). The Theory of Inventory Management. Princeton University Press, Princeton, N. J.
Wolfe, H. B. (1968). A model for control of style merchandise. Industrial Management Review, 9, 69-82.
Bhunia, A.K., & Shaikh, A.A. (2011a). A deterministic model for deteriorating items with displayed inventory level dependent demand rate incorporating marketing decision with transportation cost. International Journal of Industrial Engineering Computations, 2(3), 547-562.
Bhunia, A.K., Shaikh, A.A., Maiti, A.K., & Maiti, M. (2013). A two warehouse deterministic inventory model for deteriorating items with a linear trend in time dependent demand over finite time horizon by Elitist Real-Coded Genetic Algorithm. International Journal Industrial Engineering and Computations, 4(2), 241-258.
Bhunia, A.K., & Shaikh, A.A. (2014). A deterministic inventory model for deteriorating items with selling price dependent demand and three-parameter Weibull distributed deterioration. International Journal of Industrial Engineering Computations, 5(3), 497-510.
Chang., C. T. (2004). Inventory models with stock dependent demand and nonlinear holding costs for deteriorating items. Asia –Pacific journal of Operational Research, 21, 435-446.
Datta, T.K., & Pal, A.K. (1990). A note on an inventory-level-dependent demand rate. Journal of the Operational Research Society, 41, 971-975.
Datta, T.K., & Paul, K. (2001). An inventory system with stock-dependent, price-sensitive demand rate. Production Planning & Control, 12, 13-20.
Goh, M. (1994). EOQ models with general demand and holding cost functions. European Journal of Operational Research, 73, 50-54.
Goyal, S. K., & Chang, C. T. (2009). Optimal ordering and transfer Policy for an inventory with stock dependent demand. European Journal of Operational Research, 196, 177-185.
Hou, K. L., & Lin, L. C. (2006). An EOQ models for deteriorating items with price & stock- dependent selling rate under inflation & time value of money. International Journal of System Sciences, 37, 1131-1139.
Levin, R.I., McLaughlin, C.P., Lamone, R.P., & Kottas, J.F. (1972). Production/Operations Management: Contemporary Policy for Managing Operating Systems. McGraw-Hill, New York.
Mandal, B.N., & Phaujdar, S. (1989). An inventory model for deteriorating items and stock-dependent consumption rate. Journal of the Operational Research Society, 40, 483-488.
Padmanabhan, G., & Vrat, P. (1995). EOQ models for perishable items under stock- dependent selling rate. European Journal of Operational Research, 86, 281-292.
Pal, S., Goswami, A., & Chaudhari, K. S. (1993). A deterministic inventory model for deteriorating items with stock dependent rate. International Journal of Production Economics, 32, 291-299.
Pal, P., Das, C.B., Panda, A., & Bhunia, A.K. (2005). An application of real-coded genetic algorithm (for mixed integer non-linear programming in an optimal two-warehouse inventory policy for deteriorating items with a linear trend in demand and a fixed planning horizon. International Journal of Computer Mathematics, 82, 163-175.
Silver, E.A., & Peterson, R. (1985). Decision Systems for inventory Management and Production Planning. 2nd Edition, Wiley, Newyork.
Tsu-Pang, H., Chang-Yuan, D., & Liang-Yuh, O. (2010). Optimal lot size for an item with partial backlogging rate when demand is stimulated by inventory above a certain stock level. Mathematical and computing Modelling, 51, 13-32.
Urban, T. L. (1992). An inventory model with an inventory level dependent demand rate & relaxed terminal conditions. Journal of the Operational Research Society, 43, 721-724.
Whitin, T. M. (1957). The Theory of Inventory Management. Princeton University Press, Princeton, N. J.
Wolfe, H. B. (1968). A model for control of style merchandise. Industrial Management Review, 9, 69-82.