Equilibrium of supply chain network with retailers' behavior being probabilistic loss aversion and loss aversion

被引：0

作者：

Hu J.-S. ^{[1
]}

Zhu T.-S. ^{[1
]}

Wang Y.-B. ^{[1
]}

机构：

[1] School of International Business, Qingdao University, Qingdao

来源：

Kongzhi yu Juece/Control and Decision | 2016年 / 31卷 / 07期

关键词：

Cumulative prospect theory; Loss aversion; Probabilistic loss aversion; Supply chain network;

D O I：

10.13195/j.kzyjc.2015.0738

中图分类号：

学科分类号：

摘要：

The effect of retailers' probabilistic loss aversion and loss aversion bounded rational behavior on the equilibrium of supply chain network is studied. Based on the variational inequality and complementary theory, the manufacturers' optimal behaviors and supply-demand equilibrium in demand markets are modeled. Based on the cumulative prospect theory, the retailers' concave prospect functions are established. Based on the variational inequality, the equilibrium of retail market is described. Comparative statics analysis show that, the retailers' equilibrium quantities decrease as the degree of attention to the worst increase, the retailers' equilibrium quantities increase as the degree of attention to the best increase, the retailers' equilibrium quantities decrease as the degree of likelihood sensitivity to loss increase, and the retailers' equilibrium quantities decrease as the degree of loss aversion increase. © 2016, Editorial Office of Control and Decision. All right reserved.

引用

页码：1296 / 1304

页数：8

共 20 条

[1] Nagurney A., Dong J., Zhang D., A supply chain network equilibrium model, Trans Research Part E: Logistics and Transportation Review, 38, 5, pp. 281-303, (2002)
[2] Dong J., Zhang D., Nagurney A., A supply chain network equilibrium model with random demand, European J of Operational Research, 156, 1, pp. 194-212, (2004)
[3] Hu J.S., Xu Y.J., A supply chain network equilibrium model with fuzzy demand in consideration of capacity constrains, J of Management in China, 9, 1, pp. 139-143, (2012)
[4] Zhang T.Z., Liu Z.Y., Teng C.X., Et al., A multi-commodity flow supply chain network equilibrium model, Systems Engineering-Theory & Practice, 25, 7, pp. 61-66, (2005)
[5] Hu J.S., Xu Y.J., Liu F.X., Et al., Multi-products flow supply chain network equilibrium with fuzzy demand, Control and Decision, 27, 5, pp. 665-672, (2012)
[6] Hammond D., Beullens P., Closed-loop supply chain network equilibrium under legislation, European J of Operational Research, 183, 2, pp. 895-908, (2007)
[7] Yang G.F., Wang Z.P., Li X.Q., The optimization of the closed-loop supply chain network, Trans Research Part E, 45, 1, pp. 16-28, (2009)
[8] Nagurney A., Cruz J., Dong J., Et al., Supply chain networks, electronic commerce, and supply side and demand side risk, European J of Operational Research, 164, 2, pp. 120-142, (2005)
[9] Hu J.S., Li Z.Q., Hu X.G., Et al., Supply chain network dual channel equilibrium with production capacity constraints and price rigidities, Computer Integrated Manufacturing Systems, 18, 4, pp. 849-858, (2012)
[10] Nagurney A., Supply chain network design under profit maximization and oligopolistic competition, Trans Research Part E, 46, 3, pp. 281-294, (2010)

← 1 2 →