Multiple Existence of Solutions for Nonlinear Variational Inequalities

In this paper, the existence of solutions to the variational inequalities involving Ž . N the p-Laplacian type operator div J yٌu on an unbounded domain ⍀ in ‫ޒ‬ is discussed.

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

This paper is about the existence of positive solutions and maximalr minimal solutions for a class of quasi-linear noncoercive equations and variational inequalities. Our main tool is a sub-supersolution method for w x inequalities, based on the discussions in 17 . We established in that paper Ž . t

## 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