How to cite this paper
Shah, N., Pareek, S & Sangal, I. (2012). EOQ in fuzzy environment and trade credit.International Journal of Industrial Engineering Computations , 3(2), 133-144.
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.
Chang H. J., & Dye C. Y. (2001). An inventory model for deteriorating items with partial backlogging and permissible delay in payments. International Journal of Systems Science, 32, 345-352.
Chang, S. C., Yao J. S., & Lee H. M. (1998). Economic reorder point for fuzzy backorder quantity. European Journal of Operational Research, 109, 183-202.
Chung, K. J. (1998). A theorem on the determination of economic order quantity under conditions of permissible delay in payments. Journal of Information and Optimization Science, 25: 49-52.
De, S. K., & Goswami, A. (2006). An EOQ model with fuzzy inflation rate and fuzzy deterioration rate when a delay in payment is permissible. International Journal of Systems Science, 37(5), 323-335.
De, S. K., Kundu, P. K., Goswami, A. (2003). An economic production quantity inventory model involving fuzzy demand rate and fuzzy deterioration rate. Journal of Applied Mathematics and Computing, 12(1-2), 251-260.
Gani, A. N., & Maheswari, S. (2010). Supply chain model for the retailer’s ordering policy under two levels of delay payments in fuzzy environment. Applied Mathematical Sciences, 4(24), 1155-1164.
Goyal, S. K. (1985). Economic order quantity under condition of permissible delay in payments. Journal of Operational Research Society, 36(4), 335-338.
Huang, Y. F. (2007). Supply chain model for the retailer’s ordering policy under two levels of delay payments derived algebraically. Opsearch, 44(4), 366-377.
Huang, Y. F., & Chung K. J. (2003). Optimal replenishment and payment policies in the EOQ model under cash discount and trade credit. Asia Pacific Journal of Operational Research, 20, 177-190.
Hwang, H. & Shinn, S. W. (1997). Retailer’s pricing and lot sizing policy for exponentially deteriorating product under the condition of permissible delay in payments. Computers and Operations Research, 24, 539-547.
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 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.
Klir, G., & Yuan B. (2005). Fuzzy sets and fuzzy logic, theory and applications. Prentice, Hall of India.
Lee, H. M., & Yao J. S. (1998). Economic production quantity for fuzzy demand quantity and fuzzy production quantity. European Journal of Operational Research, 109, 203-211.
Lee, K. (2005). First Course on Fuzzy Theory and Applications. Springer-Verlag, Berlin Heidelberg.
Lin, D. C., & Yao, J. S. (2000). Fuzzy economic production for production inventory. Fuzzy Sets and Systems, 111, 465-495.
Sarker B. R., Jamal A. M. M., & Wang S. (2000). Optimal payment time under permissible delay for products with deterioration. Production Planning & Control, 11, 380-390.
Shah Nita H. and Shah Y. K. (1998). “A discrete-in-time probabilistic inventory model for deteriorating items under conditions of permissible delay in payments”, International Journal of Systems Science, 29: 121-126.
Shah, N. H. (1993-a). A lot – size model for exponentially decaying inventory when delay in payments is permissible”, Cahiers du Centre D’ Etudes de Recherche Operationnell Operations Research, Statistics and Applied Mathematik, 35, 1-9.
Shah, N. H. (1993-b). A probabilistic order level system when delay in payments is permissible. Journal of the Korean Operations Research and Management Science, 18(2), 175-183.
Shinn S. W., & Hwang H. (2003). Optimal pricing and ordering policies for retailers under order-size-dependent delay in payments. Computers and Operations Research, 30, 35-50.
Shinn S. W., Hwang H. P., & Sung S. (1996). Joint price and lot size determination under conditions of permissible delay in payments and quantity discounts for freight cost. European Journal of Operational Research, 91, 528-542.
Teng J. T. (2002). On the economic order quantity under conditions of permissible delay in payments. Journal of Operational Research Society, 53, 915-918.
Teng J. T., Chang C. T., & Goyal S. K. (2005). Optimal pricing and ordering policy under permissible delay in payments. International Journal of Production Economics, 97, 121-129.
Yao J. S., Chang S. C., & Su J. S. (2000). Fuzzy inventory without backorder for fuzzy order quantity and fuzzy total demand quantity. Computer and Operations Research, 27, 935-962.
Chang H. J., & Dye C. Y. (2001). An inventory model for deteriorating items with partial backlogging and permissible delay in payments. International Journal of Systems Science, 32, 345-352.
Chang, S. C., Yao J. S., & Lee H. M. (1998). Economic reorder point for fuzzy backorder quantity. European Journal of Operational Research, 109, 183-202.
Chung, K. J. (1998). A theorem on the determination of economic order quantity under conditions of permissible delay in payments. Journal of Information and Optimization Science, 25: 49-52.
De, S. K., & Goswami, A. (2006). An EOQ model with fuzzy inflation rate and fuzzy deterioration rate when a delay in payment is permissible. International Journal of Systems Science, 37(5), 323-335.
De, S. K., Kundu, P. K., Goswami, A. (2003). An economic production quantity inventory model involving fuzzy demand rate and fuzzy deterioration rate. Journal of Applied Mathematics and Computing, 12(1-2), 251-260.
Gani, A. N., & Maheswari, S. (2010). Supply chain model for the retailer’s ordering policy under two levels of delay payments in fuzzy environment. Applied Mathematical Sciences, 4(24), 1155-1164.
Goyal, S. K. (1985). Economic order quantity under condition of permissible delay in payments. Journal of Operational Research Society, 36(4), 335-338.
Huang, Y. F. (2007). Supply chain model for the retailer’s ordering policy under two levels of delay payments derived algebraically. Opsearch, 44(4), 366-377.
Huang, Y. F., & Chung K. J. (2003). Optimal replenishment and payment policies in the EOQ model under cash discount and trade credit. Asia Pacific Journal of Operational Research, 20, 177-190.
Hwang, H. & Shinn, S. W. (1997). Retailer’s pricing and lot sizing policy for exponentially deteriorating product under the condition of permissible delay in payments. Computers and Operations Research, 24, 539-547.
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 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.
Klir, G., & Yuan B. (2005). Fuzzy sets and fuzzy logic, theory and applications. Prentice, Hall of India.
Lee, H. M., & Yao J. S. (1998). Economic production quantity for fuzzy demand quantity and fuzzy production quantity. European Journal of Operational Research, 109, 203-211.
Lee, K. (2005). First Course on Fuzzy Theory and Applications. Springer-Verlag, Berlin Heidelberg.
Lin, D. C., & Yao, J. S. (2000). Fuzzy economic production for production inventory. Fuzzy Sets and Systems, 111, 465-495.
Sarker B. R., Jamal A. M. M., & Wang S. (2000). Optimal payment time under permissible delay for products with deterioration. Production Planning & Control, 11, 380-390.
Shah Nita H. and Shah Y. K. (1998). “A discrete-in-time probabilistic inventory model for deteriorating items under conditions of permissible delay in payments”, International Journal of Systems Science, 29: 121-126.
Shah, N. H. (1993-a). A lot – size model for exponentially decaying inventory when delay in payments is permissible”, Cahiers du Centre D’ Etudes de Recherche Operationnell Operations Research, Statistics and Applied Mathematik, 35, 1-9.
Shah, N. H. (1993-b). A probabilistic order level system when delay in payments is permissible. Journal of the Korean Operations Research and Management Science, 18(2), 175-183.
Shinn S. W., & Hwang H. (2003). Optimal pricing and ordering policies for retailers under order-size-dependent delay in payments. Computers and Operations Research, 30, 35-50.
Shinn S. W., Hwang H. P., & Sung S. (1996). Joint price and lot size determination under conditions of permissible delay in payments and quantity discounts for freight cost. European Journal of Operational Research, 91, 528-542.
Teng J. T. (2002). On the economic order quantity under conditions of permissible delay in payments. Journal of Operational Research Society, 53, 915-918.
Teng J. T., Chang C. T., & Goyal S. K. (2005). Optimal pricing and ordering policy under permissible delay in payments. International Journal of Production Economics, 97, 121-129.
Yao J. S., Chang S. C., & Su J. S. (2000). Fuzzy inventory without backorder for fuzzy order quantity and fuzzy total demand quantity. Computer and Operations Research, 27, 935-962.