Abstract
We introduce and study a new system of generalized H(., .)-eta-cocoercive operator inclusions in Banach spaces. Using the resolvent operator technique associated with H(. , .)-eta-cocoercive operators, we suggest and analyze a new generalized algorithm of nonlinear set-valued variational inclusions and establish strong convergence of iterative sequences produced by the method. We highlight the applicability of our results by examples in function spaces.