Splitting Methods for Pseudomonotone Mixed Variational Inequalities

We prove the existence of solutions of densely pseudomonotone variational inequalities. Some particular cases in reflexive Banach spaces are presented which include several previously known results. New conditions are derived for monotone and densely pseudomonotone variational inequalities using the

In this paper, we use the auxiliary principle technique to prove the existence of a solution of some new classes of variational inequalities, which are called the generalized mixed variational-like inequalities. This technique is used to analyze an iterative algorithm. Several special cases, which c

## Abstract We consider a numerical method that enables us to verify the existence of solutions for variational inequalities. This method is based on the infinite dimensional fixed point theorems and explicit error estimates for finite element approximations. Using the finite element approximations

In this paper we deal with the existence theory for a problem and give the proof of the existence by a penalty argument. We shall treat the problem for a variational inequality by introducing the penalized differential equation and then taking the limits of the equation resulting from the penalized