A variational-like inequality for multifunctions with applications

we prove an existence result for strong solutions of an implicit vector variational inequality with multifunctions by following the approach of Theorem 3.1 in [I]. The aim of this paper is to extend Theorem 3.1 in [l] to the multifunction case with moving cones.

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

In this paper, we introduce relaxed η-α-P-monotone mapping, and by utilizing KKM technique and Nadler's Lemma we establish some existence results for the generalized mixed vector variational-like inequality problem. Further, we give the concepts of η-complete semicontinuity and η-strong semicontinui