Stochastic Approximation Approaches to the Stochastic Variational Inequality Problem

Author

Jiang, Houyuan ; Xu, Huifu

Author_Institution

Judge Bus. Sch., Univ. of Cambridge, Cambridge

Volume

53

Issue

6

fYear

2008

fDate

7/1/2008 12:00:00 AM

Firstpage

1462

Lastpage

1475

Abstract

Stochastic approximation methods have been extensively studied in the literature for solving systems of stochastic equations and stochastic optimization problems where function values and first order derivatives are not observable but can be approximated through simulation. In this paper, we investigate stochastic approximation methods for solving stochastic variational inequality problems (SVIP) where the underlying functions are the expected value of stochastic functions. Two types of methods are proposed: stochastic approximation methods based on projections and stochastic approximation methods based on reformulations of SVIP. Global convergence results of the proposed methods are obtained under appropriate conditions.

Keywords

approximation theory; stochastic processes; variational techniques; first order derivatives; stochastic approximation approach; stochastic equations; stochastic optimization problem; stochastic variational inequality problem; Approximation methods; Books; Convergence; Equations; Game theory; Oligopoly; Optimization methods; Stochastic processes; Stochastic systems; Uncertainty; Projection method; simulation; stochastic approximation; stochastic complementarity problems; stochastic variational inequalities;

fLanguage

English

Journal_Title

Automatic Control, IEEE Transactions on

Publisher

ieee

ISSN

0018-9286

Type

jour

DOI

10.1109/TAC.2008.925853

Filename

4610024