A supply chain under limited-time promotion: The effect of customer sensitivity. (English) Zbl 1138.90337
Summary: We consider a two-echelon supply chain with a supplier and a retailer facing stochastic customer demands. The supplier is a leader who determines a wholesale price. In response, the retailer orders products and sets a price which affects customer demands. The goal of both players is to maximize their profits. We find the Stackelberg equilibrium and show that it is unique, not only when the supply chain is in a steady-state but also when it is in a transient state induced by a supplier’s promotion. There is a maximum length to the promotion, however, beyond which the equilibrium ceases to exist. Moreover, if customer sensitivity increases, then the wholesale equilibrium price decreases, product orders increase and product prices drop. This effect, well-observed in real life, does not, however, necessarily imply that the promotion is always beneficial. Conditions for the profitability of a limited-time promotion are shown and analyzed numerically. We discuss both open-loop and feedback policies and derive the conditions necessary for them to remain optimal under stochastic demand fluctuations.
MSC:
| 90B06 | Transportation, logistics and supply chain management |
| 91A60 | Probabilistic games; gambling |
References:
| [1] | Anupindi, R.; Bassok, Y., Supply contracts with quantity commitments and stochastic demand, (Tayur, S.; Ganeshan, R.; Magazine, M. J., Quantitative Models for Supply Chain Management (1998), Kluwer) · Zbl 0964.90504 |
| [2] | Arcelus, F. G.; Srinivasan, G., Discount strategies for one-time-only sales, IIE Transactions, 27, 618-624 (1995) |
| [3] | Bils, M., Pricing in a customer market, Quarterly Journal of Economics, 104, 4, 699-717 (1989) |
| [4] | Cachon, G., Supply chain coordination with contracts, (Graves, Steve; de Kok, T., Handbooks in Operations Research and Management Science: Supply Chain Management (2003), North Holland) · Zbl 1232.90173 |
| [5] | Cachon, G.; Netessine, S., Game theory in supply chain analysis, (Simchi-Levi, D.; Wu, S. D.; Shen, Z.-J., Handbook of Quantitative Supply Chain Analysis: Modeling in the eBusiness Era (2004), Kluwer) · Zbl 1138.91365 |
| [6] | Chan, Z.J., Shen, M., Simchi-Levi, D., Swann, J., 2003. Coordination of pricing and inventory decisions: A survey and classification. Working paper, Georgia Institute of Technology, Atlanta, GA.; Chan, Z.J., Shen, M., Simchi-Levi, D., Swann, J., 2003. Coordination of pricing and inventory decisions: A survey and classification. Working paper, Georgia Institute of Technology, Atlanta, GA. · Zbl 1125.91322 |
| [7] | Chevalier, J. A.; Kashyap, A. K.; Rossi, P. E., Why don’t prices rise during periods of peak demand? Evidence from scanner data, American Economic Review, 93, 1, 15-37 (2003) |
| [8] | Desai, V. S., Marketing-production decisions under independent and integrated channel structures, Annals of Operations Research, 34, 276-306 (1992) · Zbl 0729.91037 |
| [9] | Desai, V. S., Interactions between members of a marketing-production channel under seasonal demand, European Journal of Operational Research., 90, 115-141 (1996) · Zbl 0914.90176 |
| [10] | Eliashberg, J.; Steinberg, R., Marketing-production decisions in an industrial channel of distribution, Management Science, 33, 981-1000 (1987) · Zbl 0626.90031 |
| [11] | Elmaghraby, W.; Keskinocak, P., Dynamic pricing in the presence of inventory considerations: Research overview, current practice, and future directions, Management Science, 49, 10, 1287-1309 (2003) · Zbl 1232.90042 |
| [12] | Jedidi, K.; Mela, C. F.; Gupta, S., Managing advertising and promotion for long-run profitability, Marketing Science, 18, 1, 1-22 (1999) |
| [13] | Jorgenson, S., Optimal production, purchasing and pricing: A differential game approach, European Journal of Operational Research, 23, 64-76 (1986) · Zbl 0582.90047 |
| [14] | Kopalle, P. K.; Mela, C. F.; Marsh, L., The dynamic effect of discounting on sales: Empirical analysis and normative pricing implications, Marketing Science, 18, 3, 317-332 (1999) |
| [15] | Silver, E. A.; Pyke, D. F.; Petterson, R., Inventory Management and Production Planning and Scheduling (1998), Wiley: Wiley New York |
| [16] | Simaan, M.; Cruz, J. B., On the Stackelberg strategy in nonzero sum games, Journal of Optimization Theory and Applications, 11, 533-555 (1973) · Zbl 0243.90056 |
| [17] | Tersine, R. J.; Barman, S., Economic purchasing strategies for temporary price discounts, European Journal of Operational Research, 80, 328-343 (1995) · Zbl 0928.90005 |
| [18] | Warner, E. J.; Barsky, R. B., The timing and magnitude of retail store markdowns: Evidence from weekends and holidays, Quarterly Journal of Economics, 110, 2, 321-352 (1995) |
| [19] | Yano, C. A.; Gilbert, S. M., Coordinating pricing and production/procurement decisions: A review, (Chakravarty, A.; Eliashberg, J., Managing Business Interfaces: Marketing, Engineering and Manufacturing Perspectives (2002), Kluwer) |
| [20] | Zerrillo, P.; Iacobucci, D., Trade promotions: A call for a more rational approach, Business Horizons, July-August (1995) |
This reference list is based on information provided by the publisher or from digital mathematics libraries. Its items are heuristically matched to zbMATH identifiers and may contain data conversion errors. In some cases that data have been complemented/enhanced by data from zbMATH Open. This attempts to reflect the references listed in the original paper as accurately as possible without claiming completeness or a perfect matching.
