Abstract
By using the notion of Jη‐proximal mapping for a nonconvex, lower semicontinuous, η‐subdifferentiable proper functional in reflexive Banach spaces, we introduce and study a class of generalized set‐valued variational‐like inclusions in Banach spaces and show their equivalences with a class of Wiener‐Hopf equations. We propose two new iterative algorithms for the class of generalized set‐valued variational‐like inclusions. Furthermore, we prove the existence of solutions of the generalized set‐valued variational‐like inclusions and the convergence criteria of the two iterative algorithms for the generalized set‐valued variational‐like inclusions in reflexive Banach spaces. The results presented in this paper are new and are an extension of the corresponding results in this direction.
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