How to cite this paper
Tripathi, R & Kumar, M. (2014). A new model for deteriorating items with inflation under permissible delay in payments.International Journal of Industrial Engineering Computations , 5(3), 365-374.
Refrences
Buzacott, J. A. (1975). Economics order quantities with inflation. Operational Research Quarterly, 26, 553 – 558.
Covert, R.P., & Phillip, G.C. (1973). An EOQ model with Weibull distribution deterioration. AIIE Transportations, 5, 323 – 326.
Chung, K.J., & Ting, P.S. (1994). On replenishment schedule for deteriorating items with time – proportional demand. Production Planning and Control, 5(4), 392 – 396.
Dutta, T.K., & Pal, A.K. (1991). Effects on inflation and time value of money on an inventory model with linear time – dependent rate and shortages. European Journal of Operational Research, 52, 326 – 333.
Dave, U., & Patel, L.K. (1981). (T,Si) policy inventory model for deteriorating items with time proportional demand. Journal of Operation Research Society, 32, 137 –142.
Donalson, W. A. (1977). Inventory replenishment policy for a linear trend in demand. An analytical solution. Operational Research Quarterly, 28, 663 – 670.
Donaldson, W.A. (1977). Inventory replenishment policy for a linear trend in demand, an analytical solution. Operations Research Quarterly, 28, 663 – 670.
Dutta, T.K., & Pal., A.K. (1988). Order level inventory system with power demand pattern for items with variable rate of deterioration. Indian Journal of Pure and Applied Mathematics 19, 1043 – 1053.
Ghare P.M., & Schrader, S.K. (1963). A model for exponentially decaying inventory. Journal of Industrial Engineering, 14 (5), 238 – 243.
Goyal, S.K. (1986). On improving replenishment policies for real trend in demand. Eng. Cost prod. Econ. 10, 73 – 76.
Goyal, S.K., Kusy, M., & Soni, R. (1986). A note on economic order intervals for an item with linear trend demand Eng. Costs Prod. Econ. 10, 253 – 255.
Harris, F.W. (1913). How many parts to make at once. Factory Mag. Manage, 135 – 136-152.
Henery, R.J. (1976). Inventory replenishment policy for increasing demand. Journal of the Operational Research Society, 30(7), 611 – 617.
Haringa, M. (1996). Optimal EOQ models for deteriorating items with time – varying demand. Journal of the Operational Research Society, 47, 1228 – 1246.
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.
Hsieh, T.P., & Dye, C.Y. (2010). Pricing and lot sizing policies for deteriorating items with partial backlogging under inflation. Expert Systems with Applications, 37, 7234 – 7242.
Kharna, K.S., & Chaudhuri. (2003). A note on an order – level inventory model for a deteriorating item with time dependent quadratic demand. Computer and Operations Research, 30, 1901–1916.
Goyal, S.K., & Giri, B.C. (2001). Recent trends in modeling of deteriorating inventory. European Journal of Operational Research. 134, 1 – 16.
Lin, J.J., & Haung K.N. (2010). Deteriorating Inventory model deteriorating items with trade credits financing and capacity constraints. Computational and Industrial Engineering ,59, 611 – 618.
Lin, Y.H., Lin. C., & Lin, B. (2010). On conflict and cooperation in a two – echelon inventory model for deteriorating items. Computers and Industrial Engineering, 59, 703 – 711.
Liao, H.C. Tsai, C.H., & Su, C.T. (2001). An inventory model for deteriorating items under inflation when a delay in payment is permissible. International Journal of Production Economics, 63, 207 – 214.
Resh, M., Friedman, M., & Barbosa, L.C. (1976). On a general solution of the deterministic lot size problem with time – proportional demand. Operations Research 24, 718 – 725.
Sachan, R.S., (1984). On (T,Si). policy inventory model for deteriorating items with time proportional demand. Journal of Operation Research Society, 35, 1013 – 1019.
Sana, S.S. (2010). Optimal selling price and lot size with varying deterioration and partial backlogging. Applied Mathematics and Computation, 217, 185 – 194.
Sarkar, B. (2011). An EOQ model with delay in payments and time varying deterioration rate. Mathematical and Computer Modeling (Article in press).
Sarkar, B. (2012). An EOQ model with delay in payments and time varying deterioration rate. Mathematical and Computer Modeling, 55, 367 – 377.
Sana, S., & Chaudhuri, K.S. (2008). A deterministic EOQ model with delays in payments and price discount offers. European Journal Operational Research, 184, 509 – 533.
Silver, E.A., & Meal, H.C. (1969). A simple modification of the EOQ for the case of varying demand rate. Production and Inventory Management ,10, 52 – 65.
Teng, J.T., Min, J., & Pan, Q. (2012). Economic order quantity model with trade credit financing for non – decreasing demand. Omega, 40, 328 – 335.
Vrat, P., & Padmanabhan, G. (1990). An inventory model under inflation for stock dependent consumption rate items. International Journal of Production Economics, 19, 379 – 383.
Covert, R.P., & Phillip, G.C. (1973). An EOQ model with Weibull distribution deterioration. AIIE Transportations, 5, 323 – 326.
Chung, K.J., & Ting, P.S. (1994). On replenishment schedule for deteriorating items with time – proportional demand. Production Planning and Control, 5(4), 392 – 396.
Dutta, T.K., & Pal, A.K. (1991). Effects on inflation and time value of money on an inventory model with linear time – dependent rate and shortages. European Journal of Operational Research, 52, 326 – 333.
Dave, U., & Patel, L.K. (1981). (T,Si) policy inventory model for deteriorating items with time proportional demand. Journal of Operation Research Society, 32, 137 –142.
Donalson, W. A. (1977). Inventory replenishment policy for a linear trend in demand. An analytical solution. Operational Research Quarterly, 28, 663 – 670.
Donaldson, W.A. (1977). Inventory replenishment policy for a linear trend in demand, an analytical solution. Operations Research Quarterly, 28, 663 – 670.
Dutta, T.K., & Pal., A.K. (1988). Order level inventory system with power demand pattern for items with variable rate of deterioration. Indian Journal of Pure and Applied Mathematics 19, 1043 – 1053.
Ghare P.M., & Schrader, S.K. (1963). A model for exponentially decaying inventory. Journal of Industrial Engineering, 14 (5), 238 – 243.
Goyal, S.K. (1986). On improving replenishment policies for real trend in demand. Eng. Cost prod. Econ. 10, 73 – 76.
Goyal, S.K., Kusy, M., & Soni, R. (1986). A note on economic order intervals for an item with linear trend demand Eng. Costs Prod. Econ. 10, 253 – 255.
Harris, F.W. (1913). How many parts to make at once. Factory Mag. Manage, 135 – 136-152.
Henery, R.J. (1976). Inventory replenishment policy for increasing demand. Journal of the Operational Research Society, 30(7), 611 – 617.
Haringa, M. (1996). Optimal EOQ models for deteriorating items with time – varying demand. Journal of the Operational Research Society, 47, 1228 – 1246.
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.
Hsieh, T.P., & Dye, C.Y. (2010). Pricing and lot sizing policies for deteriorating items with partial backlogging under inflation. Expert Systems with Applications, 37, 7234 – 7242.
Kharna, K.S., & Chaudhuri. (2003). A note on an order – level inventory model for a deteriorating item with time dependent quadratic demand. Computer and Operations Research, 30, 1901–1916.
Goyal, S.K., & Giri, B.C. (2001). Recent trends in modeling of deteriorating inventory. European Journal of Operational Research. 134, 1 – 16.
Lin, J.J., & Haung K.N. (2010). Deteriorating Inventory model deteriorating items with trade credits financing and capacity constraints. Computational and Industrial Engineering ,59, 611 – 618.
Lin, Y.H., Lin. C., & Lin, B. (2010). On conflict and cooperation in a two – echelon inventory model for deteriorating items. Computers and Industrial Engineering, 59, 703 – 711.
Liao, H.C. Tsai, C.H., & Su, C.T. (2001). An inventory model for deteriorating items under inflation when a delay in payment is permissible. International Journal of Production Economics, 63, 207 – 214.
Resh, M., Friedman, M., & Barbosa, L.C. (1976). On a general solution of the deterministic lot size problem with time – proportional demand. Operations Research 24, 718 – 725.
Sachan, R.S., (1984). On (T,Si). policy inventory model for deteriorating items with time proportional demand. Journal of Operation Research Society, 35, 1013 – 1019.
Sana, S.S. (2010). Optimal selling price and lot size with varying deterioration and partial backlogging. Applied Mathematics and Computation, 217, 185 – 194.
Sarkar, B. (2011). An EOQ model with delay in payments and time varying deterioration rate. Mathematical and Computer Modeling (Article in press).
Sarkar, B. (2012). An EOQ model with delay in payments and time varying deterioration rate. Mathematical and Computer Modeling, 55, 367 – 377.
Sana, S., & Chaudhuri, K.S. (2008). A deterministic EOQ model with delays in payments and price discount offers. European Journal Operational Research, 184, 509 – 533.
Silver, E.A., & Meal, H.C. (1969). A simple modification of the EOQ for the case of varying demand rate. Production and Inventory Management ,10, 52 – 65.
Teng, J.T., Min, J., & Pan, Q. (2012). Economic order quantity model with trade credit financing for non – decreasing demand. Omega, 40, 328 – 335.
Vrat, P., & Padmanabhan, G. (1990). An inventory model under inflation for stock dependent consumption rate items. International Journal of Production Economics, 19, 379 – 383.