Iterative algorithms for variational inequalities and associated nonlinear equations involving relaxed Lipschitz operators

We consider the solvability, based on iterative algorithms, of the generalized Ž . variational inequality GVI problems involving the relaxed Lipschitz and relaxed monotone operators.

Let E be a real uniformly smooth Banach space and T : E ª E a strong pseudocontraction with a bounded range. We prove that the Mann and Ishikawa iteration procedures are T-stable. Some related results deal with the stability of these procedures for the iteration approximation of solutions of nonline

In this paper, we extend the auxiliary principle technique to study a class of generalized set-valued strongly nonlinear mixed variational-like inequalities. We prove the existence of a solution of the auxiliary problem for the generalized set-valued strongly nonlinear mixed variational-like inequal

Let X be an arbitrary real Banach space and T : X -\* X be a Lipschitz strongly pseudocontraction. It is proved that certain Ishikawa iteration procedures with errors are both convergent and T-stable. A few related results deal with the convergence and stability of the iteration procedures for the i