Degree theory for a generalized set-valued variational inequality with an application in Banach spaces

In this paper, we introduce and study a new class of generalized set-valued implicit variational inclusions in real Banach spsces. By using Nadler's Theorem and the resolvent operator technique for tn-accretive mapping in real Banach spaces, we construct some new iterative algorithms for solving thi

In this paper, we introduce a new class of accretive operators-(H(•, •), η)-accretive operators, which generalize many existing monotone or accretive operators. The resolvent operator associated with an (H(•, •), η)-accretive operator is defined and its Lipschitz continuity is presented. By using th

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

In this paper, we study the existence of nonzero solutions for a class of set-valued variational inequalities involving setcontractive mappings by using the fixed point index approach in reflexive Banach spaces. Some new existence theorems of nonzero solutions for this class of set-valued variationa