An extragradient algorithm for solving bilevel pseudomonotone variational inequalities

In this work, we suggest and analyze an extragradient method for solving general nonconvex variational inequalities using the technique of the projection operator. We prove that the convergence of the extragradient method requires only pseudomonotonicity, which is a weaker condition than requiring m

In this paper, we propose two methods for solving variational inequalities. In the first method, we modified the extragradient method by using a new step size while the second method can be viewed as an extension of the first one by performing an additional projection step at each iteration and anot

The purpose of this paper is to investigate the convergence of general approximate proximal algorithm (resp. general Bregmanfunction-based approximate proximal algorithm) for solving the generalized variational inequality problem (for short, GVI(T , ) where T is a multifunction). The general approxi