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Strong convergence for monotone bilevel equilibria with constraints of variational inequalities and fixed points using subgradient extragradient implicit rule

Long He, Yun-Ling Cui, Lu-Chuan Ceng, Tu-Yan Zhao, Dan‐Qiong Wang, Huiying Hu

2021Journal of Inequalities and Applications45 citationsDOIOpen Access PDF

Abstract

Abstract In a real Hilbert space, let GSVI and CFPP represent a general system of variational inequalities and a common fixed point problem of a countable family of nonexpansive mappings and an asymptotically nonexpansive mapping, respectively. In this paper, via a new subgradient extragradient implicit rule, we introduce and analyze two iterative algorithms for solving the monotone bilevel equilibrium problem (MBEP) with the GSVI and CFPP constraints, i.e., a strongly monotone equilibrium problem over the common solution set of another monotone equilibrium problem, the GSVI and the CFPP. Some strong convergence results for the proposed algorithms are established under the mild assumptions, and they are also applied for finding a common solution of the GSVI, VIP, and FPP, where the VIP and FPP stand for a variational inequality problem and a fixed point problem, respectively.

Topics & Concepts

Subgradient methodVariational inequalityMathematicsMonotone polygonHilbert spaceFixed pointCountable setStrongly monotoneConvergence (economics)Applied mathematicsMathematical optimizationPure mathematicsMathematical analysisGeometryEconomic growthEconomicsOptimization and Variational AnalysisFixed Point Theorems AnalysisAdvanced Optimization Algorithms Research
Strong convergence for monotone bilevel equilibria with constraints of variational inequalities and fixed points using subgradient extragradient implicit rule | Litcius