Interior projection-like methods for monotone variational inequalities

Iterative Methods for Equilibrium Problems, Variational Inequalities and Fixed Points

A Relaxed Extra Gradient Approximation Method of Two Inverse-Strongly Monotone Mappings for a General System of Variational Inequalities, Fixed Point and Equilibrium Problems

Interior Proximal Method for Variational Inequalities on Non-polyhedral Sets

Interior proximal methods for variational inequalities are, in fact, designed to handle problems on polyhedral convex sets or balls, only. Using a slightly modified concept of Bregman functions, we suggest an interior proximal method for solving variational inequalities (with maximal monotone operators) on convex, in general non-polyhedral sets, including in particular the case in which the set...

A Descent-projection Method for Solving Monotone Structured Variational Inequalities

In this paper, a new descent-projection method with a new search direction for monotone structured variational inequalities is proposed. The method is simple, which needs only projections and some function evaluations, so its computational load is very tiny. Under mild conditions on the problem’s data, the method is proved to converges globally. Some preliminary computational results are also r...

Note on the Paper: Interior Proximal Method for Variational Inequalities on Non-polyhedral Sets

In this paper we clarify that the interior proximal method developed in [6] (vol. 27 of this journal) for solving variational inequalities with monotone operators converges under essentially weaker conditions concerning the functions describing the ”feasible” set as well as the operator of the variational inequality.