Abstract
In this paper, we introduce the notion of general A -monotone operators in Banach spaces, study some properties of general A -monotone operator and the new proximal mapping associated with the general A -monotone operators. By using Alber’s inequalities, Nalder’s results and the new proximal mapping technique, we also construct two new class of perturbed iterative algorithms with mixed errors for solving a new class of nonlinear set-valued relaxed cocoercive operator inclusions and study applications of general A -monotone operators to the approximation-solvability of the nonlinear set-valued relaxed cocoercive operator inclusion problems in Banach spaces. Furthermore, the general A -monotone operators are illustrated by some examples. The results presented in this paper improve and generalize the corresponding results on strongly monotone quasi-variational inclusions and nonlinear implicit quasi-variational inclusions.
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