Author:
Sun Hai-Lin,Chen Xiao-Jun
Abstract
AbstractThe stochastic variational inequality (SVI) provides a unified form of optimality conditions of stochastic optimization and stochastic games which have wide applications in science, engineering, economics and finance. In the recent two decades, one-stage SVI has been studied extensively and widely used in modeling equilibrium problems under uncertainty. Moreover, the recently proposed two-stage SVI and multistage SVI can be applied to the case when the decision makers want to make decisions at different stages in a stochastic environment. The two-stage SVI is a foundation of multistage SVI, which is to find a pair of “here-and-now” solution and “wait-and-see” solution. This paper provides a survey of recent developments in analysis, algorithms and applications of the two-stage SVI.
Publisher
Springer Science and Business Media LLC
Subject
Management Science and Operations Research
Reference48 articles.
1. Cottle, R.W., Pang, J.S., Stone, R.E.: The Linear Complementarity Problem. Academic Press, New York (1992)
2. Facchinei, F., Pang, J.S.: Finite-Dimensional Variational Inequalities and Complementarity Problems. Springer, New York (2003)
3. Lin, G.H., Fukushima, M.: Stochastic equilibrium problems and stochastic mathematical programs with equilibrium constraints: a survey. Pac. J. Optim. 6, 455–482 (2010)
4. Shanbhag, U.: Stochastic variational inequality problems: applications, analysis, and algorithms. In: INFORMS Tutorials in Operations Research. pp. 71–107 (2013)
5. Chen, X., Wets, R.J.-B.: Special Issue: Stochastic Equilibrium and Variational Inequalities. Math. Program. 165 (2017)
Cited by
23 articles.
订阅此论文施引文献
订阅此论文施引文献,注册后可以免费订阅5篇论文的施引文献,订阅后可以查看论文全部施引文献