Based on the notion of A - monotonicity, a new class of nonlinear variational inclusion problems is presented. Since A - monotonicity generalizes H - monotonicity (and in turn, generalizes maximal monotonicity), results thus obtained, are general in nature.
Here we consider the solvability based on iterative algorithms of the generalized variational inequalities and associated nonlinear equations.
The solvability of a class of monotone nonlinear variational inequality problems in a reflexive Banach space setting is presented.
A class of existence theorems in the context of solving a general class of nonlinear implicit inclusion problems are examined based on -maximal relaxed accretive mappings in a real Banach space setting.
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