Abstract
This paper aims at studying the convergence of some iteration processes for mixed variational inequalities with convex nondifferentiable functionals and
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-potential,
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-coercive,
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-pseudomonotone or
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-strongly inverse monotone operators in uniformly smooth Banach spaces. Our results generalize corresponding theorems of [I.B. Badriev, O.A. Zadvornov, A decomposition method for variational inequalities of the second kind with strongly inverse-monotone operators, Differ. Equ. 39 (7) (2003) 936–944; I.B. Badriev, O.A. Zadvornov, A.D. Lyashko, A study of variable step iterative methods for variational inequalities of the second kind, Differ. Equ. 40 (7) (2004) 971–983] and [I.B. Badriev, O.A. Zadvornov, A.M. Saddeek, On the iterative methods for solving some variational inequalities of the second kind, in: Contemporary Problems of Mathematical Modeling (Materials of the IX All-Russian School-Seminar, 8–13 September 2001, Abrau-Dyrso), Rostov University Publishers, Rostov-Un-Don, 2001, pp. 36–41].