How to cite this paper
Kumar, N., Singh, S & Kumari, R. (2013). Two-warehouse inventory model of deteriorating items with three-component demand rate and time-proportional backlogging rate in fuzzy environment.International Journal of Industrial Engineering Computations , 4(4), 587-598.
Refrences
Abad, P.L. (1996). Optimal pricing and lot sizing under conditions of perishability and partial backordering. Management Science, 42, 1093–1104.
Abad, P.L. (2001). Optimal price and order size for a reseller under partial backordering. Computers & Operations Research, 28, 53–65.
Das, D., Kar, M.B., Roy, A., & Kar, S. (2012). Two-warehouse production model for deteriorating inventory items with stock-dependent demand under inflation over a random planning horizon. Central European Journal of Operations Research, 20(2), 251–280.
Datta, T.K., Paul, K., & Pal, A.K. (1998). Demand promotion by up-gradation under stock-dependent demand situation – a model. International Journal of Production Economics, 55(1), 31–38.
Dave, U. (1988). On the EOQ models with two levels of storage. Opsearch, 25, 190–196.
Dye, C.Y. (2002). A deteriorating inventory model with stock-dependent demand and partial backlogging under conditions of permissible delay in payment. Opsearch, 39, 3(4), 189–201.
Dye, C.Y., & Ouyang, L.Y. (2005). An EOQ model for perishable items under stock-dependent selling rate and time dependent partial backlogging. European Journal of Operational Research, 163, 776 – 783.
Dye, C.Y., Ouyang, L.Y., & Hsieh, T.P. (2007). Deterministic inventory model for deteriorating items with capacity constraint and time-proportional backlogging rate. European Journal of Operational Research, 178(3), 789–807.
Fathollah Bayati, M., Rasti Barzoki, M., & Hejazi, S. R. (2011). A joint lot-sizing and marketing model with reworks, scraps and imperfect products.International Journal of Industrial Engineering Computations, 2(2), 395-408.
Goswami, A., & Chaudhuri, K.S. (1998). On an inventory model with two levels of storage and stock-dependent demand rate. International Journal of Systems Sciences, 29, 249–254.
Guchhait, P., Maiti, M.K., & Maiti, M. (2013). Two storage inventory model of a deteriorating item with variable demand under partial credit period. Applied Soft Computing, 13 (1), 428-448.
Gupta, R., & Vrat, P. (1986). Inventory model with multi-items under constraint systems for stock dependent consumption rate. Operations Research, 24(1), 41–42.
Hartley, R. V. (1976). Operations Research—A Managerial Emphasis, Good Year Publishing Company, California, 315–317.
Jaggi, C.K., Aggarwal, K.K., & Verma, P. (2010). Inventory and pricing strategies for deteriorating items with limited capacity and time-proportional backlogging rate. International Journal of Operational Research, 8(3), 331–354.
Kar, S., Bhunia, A.K., & Maiti, M. (2001). Deterministic inventory model with two levels of storage, a linear trend in demand and a fixed time horizon. Computers & Operations Research, 28, 1315–1331.
Levin, R.I., McLaughlin, C.P., Lamone, R.P., & Kottas, J.F. (1972). Productions Operations Management: Contemporary Policy for Managing Operating Systems, pp.373, McGraw-Hill, New York.
Mandal, B.N., & Phaujdar, S. (1989). An inventory model for deteriorating items and stock-dependent consumption rate. Journal Operational Research Society, 40(5), 483–488.
Muluneh, E.K., & Rao, K.S. (2012). EPQ models for deteriorating items with stock-dependent production rate and time-dependent demand having three-parameter Weibull decay. International Journal of Operational Research, 14(3), 271–300.
Murdeshwar, T.A., & Sathe, Y.S. (1985). Some aspects of lot size model with two levels of storage, Opsearch, 22, 255–262.
Pakkala, T.P.M., & Achary, K.K. (1992). A deterministic inventory model for deteriorating items with two warehouses and finite replenishment rate. European Journal of Operational Research, 57, 71–76.
Pakkala, T.P.M., & Achary, K.K. (1992). Discrete time inventory model for deteriorating items with two warehouses. Opsearch, 29, 90–103.
Panda, D., Maiti, M.K., & Maiti, M. (2010). Two warehouse inventory models for single vendor multiple retailers with price and stock dependent demand. Applied Mathematical Modelling, 34 (11), 3571 – 3585.
Sarma, K.V.S. (1987). A deterministic order level inventory model for deteriorating items with two storage facilities. European Journal of Operational Research, 29, 70–73.
Sarma, K.V.S. (1983). A deterministic inventory model with two level of storage and an optimum release rule. Opsearch, 20, 175–180.
Singh, S.R., Kumar, N., & Kumari, R. (2008). Two-Warehouse inventory model for deteriorating items with partial backlogging under the conditions of permissible delay in payments. International Transactions in Mathematical Sciences & Computer, 1(1), 123–134.
Singh, S.R., Kumar, N., & Kumari, R. (2009). Two-warehouse inventory model for deteriorating items with shortages under inflation and time-value of money. International Journal of Computational and Applied Mathematics, 4(1), 83–94.
Singh, S.R., Kumar, N., & Kumari, R. (2010). An inventory model for deteriorating items with shortages and stock-dependent demand under inflation for two-shops under one management. Opsearch, 47(4), 311–329.
Singh, S.R., Kumar, N., & Kumari, R. (2010). An inventory model for deteriorating items with shortages and stock-dependent demand under inflation for two-shops under one management. Opsearch, 47(4), 311–329.
Singh, S.R., Kumar, N., & Kumari, R. (2011-a). Two-warehouse fuzzy inventory model under the conditions of permissible delay in payments. International Journal of Operational Research, 11(1), 78–99.
Singh, S.R., Kumari, R., & Kumar, N. (2011-b). A deterministic two-warehouse inventory model for deteriorating items with sock-dependent demand and shortages under the conditions of permissible delay. International Journal of Mathematical Modelling and Optimization, 11(3), 357–375.
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), 92-102.
Wee, H.M., Yu, J.C.P., & Law, S.T. (2005). Two-warehouse inventory model with partial backordering and Weibull distribution deterioration under inflation. Journal of the Chinese Institute of Industrial Engineers, 22(6), 451–462.
Yang, H.L. (2004). Two-warehouse inventory models for deteriorating items with shortages under inflation. European Journal of Operational Research, 157, 344–356.
Yang, H.L. (2006). Two-warehouse partial backlogging inventory models for deteriorating items under inflation. International Journal Production Economics, 103(1), 362–370.
Zhou, Y.W., & Yang, S.L. (2005). A two-warehouse inventory model for items with stock-level-dependent demand rate. International Journal Production Economics, 95(1), 215–228.
Abad, P.L. (2001). Optimal price and order size for a reseller under partial backordering. Computers & Operations Research, 28, 53–65.
Das, D., Kar, M.B., Roy, A., & Kar, S. (2012). Two-warehouse production model for deteriorating inventory items with stock-dependent demand under inflation over a random planning horizon. Central European Journal of Operations Research, 20(2), 251–280.
Datta, T.K., Paul, K., & Pal, A.K. (1998). Demand promotion by up-gradation under stock-dependent demand situation – a model. International Journal of Production Economics, 55(1), 31–38.
Dave, U. (1988). On the EOQ models with two levels of storage. Opsearch, 25, 190–196.
Dye, C.Y. (2002). A deteriorating inventory model with stock-dependent demand and partial backlogging under conditions of permissible delay in payment. Opsearch, 39, 3(4), 189–201.
Dye, C.Y., & Ouyang, L.Y. (2005). An EOQ model for perishable items under stock-dependent selling rate and time dependent partial backlogging. European Journal of Operational Research, 163, 776 – 783.
Dye, C.Y., Ouyang, L.Y., & Hsieh, T.P. (2007). Deterministic inventory model for deteriorating items with capacity constraint and time-proportional backlogging rate. European Journal of Operational Research, 178(3), 789–807.
Fathollah Bayati, M., Rasti Barzoki, M., & Hejazi, S. R. (2011). A joint lot-sizing and marketing model with reworks, scraps and imperfect products.International Journal of Industrial Engineering Computations, 2(2), 395-408.
Goswami, A., & Chaudhuri, K.S. (1998). On an inventory model with two levels of storage and stock-dependent demand rate. International Journal of Systems Sciences, 29, 249–254.
Guchhait, P., Maiti, M.K., & Maiti, M. (2013). Two storage inventory model of a deteriorating item with variable demand under partial credit period. Applied Soft Computing, 13 (1), 428-448.
Gupta, R., & Vrat, P. (1986). Inventory model with multi-items under constraint systems for stock dependent consumption rate. Operations Research, 24(1), 41–42.
Hartley, R. V. (1976). Operations Research—A Managerial Emphasis, Good Year Publishing Company, California, 315–317.
Jaggi, C.K., Aggarwal, K.K., & Verma, P. (2010). Inventory and pricing strategies for deteriorating items with limited capacity and time-proportional backlogging rate. International Journal of Operational Research, 8(3), 331–354.
Kar, S., Bhunia, A.K., & Maiti, M. (2001). Deterministic inventory model with two levels of storage, a linear trend in demand and a fixed time horizon. Computers & Operations Research, 28, 1315–1331.
Levin, R.I., McLaughlin, C.P., Lamone, R.P., & Kottas, J.F. (1972). Productions Operations Management: Contemporary Policy for Managing Operating Systems, pp.373, McGraw-Hill, New York.
Mandal, B.N., & Phaujdar, S. (1989). An inventory model for deteriorating items and stock-dependent consumption rate. Journal Operational Research Society, 40(5), 483–488.
Muluneh, E.K., & Rao, K.S. (2012). EPQ models for deteriorating items with stock-dependent production rate and time-dependent demand having three-parameter Weibull decay. International Journal of Operational Research, 14(3), 271–300.
Murdeshwar, T.A., & Sathe, Y.S. (1985). Some aspects of lot size model with two levels of storage, Opsearch, 22, 255–262.
Pakkala, T.P.M., & Achary, K.K. (1992). A deterministic inventory model for deteriorating items with two warehouses and finite replenishment rate. European Journal of Operational Research, 57, 71–76.
Pakkala, T.P.M., & Achary, K.K. (1992). Discrete time inventory model for deteriorating items with two warehouses. Opsearch, 29, 90–103.
Panda, D., Maiti, M.K., & Maiti, M. (2010). Two warehouse inventory models for single vendor multiple retailers with price and stock dependent demand. Applied Mathematical Modelling, 34 (11), 3571 – 3585.
Sarma, K.V.S. (1987). A deterministic order level inventory model for deteriorating items with two storage facilities. European Journal of Operational Research, 29, 70–73.
Sarma, K.V.S. (1983). A deterministic inventory model with two level of storage and an optimum release rule. Opsearch, 20, 175–180.
Singh, S.R., Kumar, N., & Kumari, R. (2008). Two-Warehouse inventory model for deteriorating items with partial backlogging under the conditions of permissible delay in payments. International Transactions in Mathematical Sciences & Computer, 1(1), 123–134.
Singh, S.R., Kumar, N., & Kumari, R. (2009). Two-warehouse inventory model for deteriorating items with shortages under inflation and time-value of money. International Journal of Computational and Applied Mathematics, 4(1), 83–94.
Singh, S.R., Kumar, N., & Kumari, R. (2010). An inventory model for deteriorating items with shortages and stock-dependent demand under inflation for two-shops under one management. Opsearch, 47(4), 311–329.
Singh, S.R., Kumar, N., & Kumari, R. (2010). An inventory model for deteriorating items with shortages and stock-dependent demand under inflation for two-shops under one management. Opsearch, 47(4), 311–329.
Singh, S.R., Kumar, N., & Kumari, R. (2011-a). Two-warehouse fuzzy inventory model under the conditions of permissible delay in payments. International Journal of Operational Research, 11(1), 78–99.
Singh, S.R., Kumari, R., & Kumar, N. (2011-b). A deterministic two-warehouse inventory model for deteriorating items with sock-dependent demand and shortages under the conditions of permissible delay. International Journal of Mathematical Modelling and Optimization, 11(3), 357–375.
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), 92-102.
Wee, H.M., Yu, J.C.P., & Law, S.T. (2005). Two-warehouse inventory model with partial backordering and Weibull distribution deterioration under inflation. Journal of the Chinese Institute of Industrial Engineers, 22(6), 451–462.
Yang, H.L. (2004). Two-warehouse inventory models for deteriorating items with shortages under inflation. European Journal of Operational Research, 157, 344–356.
Yang, H.L. (2006). Two-warehouse partial backlogging inventory models for deteriorating items under inflation. International Journal Production Economics, 103(1), 362–370.
Zhou, Y.W., & Yang, S.L. (2005). A two-warehouse inventory model for items with stock-level-dependent demand rate. International Journal Production Economics, 95(1), 215–228.