Applications of fixed-point methods to discrete variational and quasi-variational inequalities

Some new discrete inequalities involving monotonic or convex functions are obtained. While these are interesting inequalities in their own right, they can be applied to solving certain types of discrete variational problems effectively.

In this paper, we study the equivalence characterizations of several modified fixedpoint equations to variational inequalities (VI). Based on these equations, we give some applications in constructing iterative methods for the solution of the VI. Especially, we show global convergence, the sublinear

The purpose of this paper is to provide an application of a non-compact version, due to Park, of Browder's fixed point theorem to generalized variational inequalities. In a non-compact setting, we establish a fairly general existence theorem on a generalized variational inequality using the result o