How to cite this paper
Rabbani, M & Aliabadi, L. (2019). An inventory model with credit, price and marketing dependent demand under permitted delayed payments and shortages: A signomial geometric programming approach.Uncertain Supply Chain Management, 7(1), 33-48.
Refrences
Bayati, M. F., Shishebori, D., & Shahanaghi, K. (2013). E-products pricing problem under uncertainty: a geometric programming approach. International Journal of Operational Research, 16(1), 68-80.
Boyd, S., Kim, S.-J., Vandenberghe, L., & Hassibi, A. (2007). A tutorial on geometric programming. Optimization and engineering, 8(1), 67.
Chiang, M., Tan, C.-W., Palomar, D. P., O'Neill, D., & Julian, D. (2007). Power control by geometric programming. IEEE Transactions on Wireless Communications, 6(7), 2640-2651.
Cunha, L. R. A., Delfino, A. P. S., dos Reis, K. A., & Leiras, A. (2018). Economic production quantity (EPQ) model with partial backordering and a discount for imperfect quality batches. International Journal of Production Research, 1-15.
Diabat, A., Taleizadeh, A. A., & Lashgari, M. (2017). A lot sizing model with partial downstream delayed payment, partial upstream advance payment, and partial backordering for deteriorating items. Journal of Manufacturing Systems, 45, 322-342.
Dye, C.-Y., & Yang, C.-T. (2015). Sustainable trade credit and replenishment decisions with credit-linked demand under carbon emission constraints. European Journal of Operational Research, 244(1), 187-200.
El-Wakeel, M. F., & Al Salman, R. S. (2018). Multi-Product, Multi-Venders Inventory Models With Different Cases of the Rational Function under Linear and Non-Linear Constraints via Geometric Programming Approach. Journal of King Saud University-Science.
Ghoreishi, M., Weber, G.-W., & Mirzazadeh, A. (2015). An inventory model for non-instantaneous deteriorating items with partial backlogging, permissible delay in payments, inflation-and selling price-dependent demand and customer returns. Annals of Operations Research, 226(1), 221-238.
Goyal, S. K. (1985). Economic order quantity under conditions of permissible delay in payments. Journal of the operational research society, 36(4), 335-338.
Ho, C.-H. (2011). The optimal integrated inventory policy with price-and-credit-linked demand under two-level trade credit. Computers & Industrial Engineering, 60(1), 117-126.
Jaggi, C., Sharma, A., & Tiwari, S. (2015). Credit financing in economic ordering policies for non-instantaneous deteriorating items with price dependent demand under permissible delay in payments: A new approach. International Journal of Industrial Engineering Computations, 6(4), 481-502.
Jamal, A., Sarker, B., & Wang, S. (1997). An ordering policy for deteriorating items with allowable shortage and permissible delay in payment. Journal of the operational research society, 48(8), 826-833.
Khanna, A., Kishore, A., & Jaggi, C. (2017). Strategic production modeling for defective items with imperfect inspection process, rework, and sales return under two-level trade credit. International Journal of Industrial Engineering Computations, 8(1), 85-118.
Lashgari, M., Taleizadeh, A. A., & Sana, S. S. (2016). An inventory control problem for deteriorating items with back-ordering and financial considerations under two levels of trade credit linked to order quantity. Journal of Industrial & Management Optimization, 12(3), 1091-1119.
Lee, W. J., & Kim, D. (1993). Optimal and heuristic decision strategies for integrated production and marketing planning. Decision Sciences, 24(6), 1203-1214.
Liao, H.-C., Tsai, C.-H., & Su, C.-T. (2000). An inventory model with deteriorating items under inflation when a delay in payment is permissible. International Journal of Production Economics, 63(2), 207-214.
Maihami, R., & Abadi, I. N. K. (2012). Joint control of inventory and its pricing for non-instantaneously deteriorating items under permissible delay in payments and partial backlogging. Mathematical and Computer Modelling, 55(5-6), 1722-1733.
Maihami, R., Karimi, B., & Ghomi, S. M. T. F. (2017). Effect of two-echelon trade credit on pricing-inventory policy of non-instantaneous deteriorating products with probabilistic demand and deterioration functions. Annals of Operations Research, 257(1-2), 237-273.
Mandal, N. K. (2016). Multi-item fuzzy inventory problem with space constraint via geometric programming method. Yugoslav Journal of Operations Research, 16(1).
Montgomery, D. C., Bazaraa, M., & Keswani, A. K. (1973). Inventory models with a mixture of backorders and lost sales. Naval Research Logistics (NRL), 20(2), 255-263.
Mutapcic, A., Koh, K., Kim, S., & Boyd, S. (2006). GGPLAB version 1.00: a Matlab toolbox for geometric programming: January.
Passy, U., & Wilde, D. (1967). Generalized polynomial optimization. SIAM Journal on Applied Mathematics, 15(5), 1344-1356.
Sadjadi, S. J., Ghazanfari, M., & Yousefli, A. (2010). Fuzzy pricing and marketing planning model: A possibilistic geometric programming approach. Expert Systems with Applications, 37(4), 3392-3397.
Sadjadi, S. J., Oroujee, M., & Aryanezhad, M. B. (2005). Optimal production and marketing planning. Computational Optimization and Applications, 30(2), 195-203.
Samadi, F., Mirzazadeh, A., & Pedram, M. M. (2013). Fuzzy pricing, marketing and service planning in a fuzzy inventory model: A geometric programming approach. Applied Mathematical Modelling, 37(10-11), 6683-6694.
Sharma, B. (2016). An EOQ model for retailers partial permissible delay in payment linked to order quantity with shortages. Mathematics and Computers in Simulation, 125, 99-112.
Shinn, S. W., & Hwang, H. (2003). Optimal pricing and ordering policies for retailers under order-size-dependent delay in payments. Computers & Operations Research, 30(1), 35-50.
Tabatabaei, S. R. M., Sadjadi, S. J., & Makui, A. (2017). Optimal production and marketing planning with geometric programming approach.
Taleizadeh, A. A., Pentico, D. W., Jabalameli, M. S., & Aryanezhad, M. (2013). An EOQ model with partial delayed payment and partial backordering. Omega, 41(2), 354-368.
Teng, J.-T. (2002). On the economic order quantity under conditions of permissible delay in payments. Journal of the operational research society, 53(8), 915-918.
Tripathi, R. P. (2012). An inventory model with shortage and exponential demand rate under Permissible delay in payments. International Journal of Management Science and Engineering Management, 7(2), 134-139.
Xu, G. (2014). Global optimization of signomial geometric programming problems. European Journal of Operational Research, 233(3), 500-510.
Zener, C. (1971). Engineering design by geometric programming: John Wiley & Sons.
Boyd, S., Kim, S.-J., Vandenberghe, L., & Hassibi, A. (2007). A tutorial on geometric programming. Optimization and engineering, 8(1), 67.
Chiang, M., Tan, C.-W., Palomar, D. P., O'Neill, D., & Julian, D. (2007). Power control by geometric programming. IEEE Transactions on Wireless Communications, 6(7), 2640-2651.
Cunha, L. R. A., Delfino, A. P. S., dos Reis, K. A., & Leiras, A. (2018). Economic production quantity (EPQ) model with partial backordering and a discount for imperfect quality batches. International Journal of Production Research, 1-15.
Diabat, A., Taleizadeh, A. A., & Lashgari, M. (2017). A lot sizing model with partial downstream delayed payment, partial upstream advance payment, and partial backordering for deteriorating items. Journal of Manufacturing Systems, 45, 322-342.
Dye, C.-Y., & Yang, C.-T. (2015). Sustainable trade credit and replenishment decisions with credit-linked demand under carbon emission constraints. European Journal of Operational Research, 244(1), 187-200.
El-Wakeel, M. F., & Al Salman, R. S. (2018). Multi-Product, Multi-Venders Inventory Models With Different Cases of the Rational Function under Linear and Non-Linear Constraints via Geometric Programming Approach. Journal of King Saud University-Science.
Ghoreishi, M., Weber, G.-W., & Mirzazadeh, A. (2015). An inventory model for non-instantaneous deteriorating items with partial backlogging, permissible delay in payments, inflation-and selling price-dependent demand and customer returns. Annals of Operations Research, 226(1), 221-238.
Goyal, S. K. (1985). Economic order quantity under conditions of permissible delay in payments. Journal of the operational research society, 36(4), 335-338.
Ho, C.-H. (2011). The optimal integrated inventory policy with price-and-credit-linked demand under two-level trade credit. Computers & Industrial Engineering, 60(1), 117-126.
Jaggi, C., Sharma, A., & Tiwari, S. (2015). Credit financing in economic ordering policies for non-instantaneous deteriorating items with price dependent demand under permissible delay in payments: A new approach. International Journal of Industrial Engineering Computations, 6(4), 481-502.
Jamal, A., Sarker, B., & Wang, S. (1997). An ordering policy for deteriorating items with allowable shortage and permissible delay in payment. Journal of the operational research society, 48(8), 826-833.
Khanna, A., Kishore, A., & Jaggi, C. (2017). Strategic production modeling for defective items with imperfect inspection process, rework, and sales return under two-level trade credit. International Journal of Industrial Engineering Computations, 8(1), 85-118.
Lashgari, M., Taleizadeh, A. A., & Sana, S. S. (2016). An inventory control problem for deteriorating items with back-ordering and financial considerations under two levels of trade credit linked to order quantity. Journal of Industrial & Management Optimization, 12(3), 1091-1119.
Lee, W. J., & Kim, D. (1993). Optimal and heuristic decision strategies for integrated production and marketing planning. Decision Sciences, 24(6), 1203-1214.
Liao, H.-C., Tsai, C.-H., & Su, C.-T. (2000). An inventory model with deteriorating items under inflation when a delay in payment is permissible. International Journal of Production Economics, 63(2), 207-214.
Maihami, R., & Abadi, I. N. K. (2012). Joint control of inventory and its pricing for non-instantaneously deteriorating items under permissible delay in payments and partial backlogging. Mathematical and Computer Modelling, 55(5-6), 1722-1733.
Maihami, R., Karimi, B., & Ghomi, S. M. T. F. (2017). Effect of two-echelon trade credit on pricing-inventory policy of non-instantaneous deteriorating products with probabilistic demand and deterioration functions. Annals of Operations Research, 257(1-2), 237-273.
Mandal, N. K. (2016). Multi-item fuzzy inventory problem with space constraint via geometric programming method. Yugoslav Journal of Operations Research, 16(1).
Montgomery, D. C., Bazaraa, M., & Keswani, A. K. (1973). Inventory models with a mixture of backorders and lost sales. Naval Research Logistics (NRL), 20(2), 255-263.
Mutapcic, A., Koh, K., Kim, S., & Boyd, S. (2006). GGPLAB version 1.00: a Matlab toolbox for geometric programming: January.
Passy, U., & Wilde, D. (1967). Generalized polynomial optimization. SIAM Journal on Applied Mathematics, 15(5), 1344-1356.
Sadjadi, S. J., Ghazanfari, M., & Yousefli, A. (2010). Fuzzy pricing and marketing planning model: A possibilistic geometric programming approach. Expert Systems with Applications, 37(4), 3392-3397.
Sadjadi, S. J., Oroujee, M., & Aryanezhad, M. B. (2005). Optimal production and marketing planning. Computational Optimization and Applications, 30(2), 195-203.
Samadi, F., Mirzazadeh, A., & Pedram, M. M. (2013). Fuzzy pricing, marketing and service planning in a fuzzy inventory model: A geometric programming approach. Applied Mathematical Modelling, 37(10-11), 6683-6694.
Sharma, B. (2016). An EOQ model for retailers partial permissible delay in payment linked to order quantity with shortages. Mathematics and Computers in Simulation, 125, 99-112.
Shinn, S. W., & Hwang, H. (2003). Optimal pricing and ordering policies for retailers under order-size-dependent delay in payments. Computers & Operations Research, 30(1), 35-50.
Tabatabaei, S. R. M., Sadjadi, S. J., & Makui, A. (2017). Optimal production and marketing planning with geometric programming approach.
Taleizadeh, A. A., Pentico, D. W., Jabalameli, M. S., & Aryanezhad, M. (2013). An EOQ model with partial delayed payment and partial backordering. Omega, 41(2), 354-368.
Teng, J.-T. (2002). On the economic order quantity under conditions of permissible delay in payments. Journal of the operational research society, 53(8), 915-918.
Tripathi, R. P. (2012). An inventory model with shortage and exponential demand rate under Permissible delay in payments. International Journal of Management Science and Engineering Management, 7(2), 134-139.
Xu, G. (2014). Global optimization of signomial geometric programming problems. European Journal of Operational Research, 233(3), 500-510.
Zener, C. (1971). Engineering design by geometric programming: John Wiley & Sons.