A self-adaptive projection method with improved step-size for solving variational inequalities

In this paper, we propose a hybrid nonlinear decomposition-projection method for solving a class of monotone variational inequality problems. The algorithm utilizes the problems' structure conductive to decomposition and a projection step to get the next iterate. To make the method more practical, w

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

In this study, we propose a new alternating direction method for solving linear variational variational inequality problems (LVIP). It is simple in the sense that, at each iteration, it needs only to perform a projection onto a simple set and some matrix-vector multiplications. The simplicity of the

The approximate solution of a system for variational inequality with different mapping in Hilbert spaces has been studied, based on the convergence of projection methods. However, little research has been done in Banach space. The primary reason is that projection mapping lacks preferable properties