New Approach to Solving a System of Variational Inequalities and Hierarchical

In this paper, using the coincidence degree theory obtained in [1], we deal with the existence of positive solutions to a system of variational inequalities in a reflexive Banach space and then give an example as an application of the results. (~) 1998 Elsevier Science Ltd. All rights reserved.

The convergence of projection methods is based on a new iterative algorithm for the approximation-solvability of the following system of nonlinear variational inequalities (SNVI): determine elements r\* , g\* E K such that WY!/\*) + x\* -y\*,r-x') 20, for all x E K and for p > 0, and (-rT(x') + y' -

The augmented Lagrangian method (also referred to as an alternating direction method) solves a class of variational inequalities (VI) via solving a series of sub-VI problems. The method is effective whenever the subproblems can be solved efficiently. However, the subproblem to be solved in each iter

This paper presents a new class of projection and contraction methods for solving monotone variational inequality problems. The methods can be viewed as combinations of some existing projection and contraction methods and the method of shortest residuals, a special case of conjugate gradient methods