Properties of the Solution Set for Generalized Equilibrium Problems with Lower and Upper Bounds in FC-Metric Spaces

Kai Ting Wen

doi:10.4028/www.scientific.net/AMR.671-674.1557

Paper Titles

Numerical Simulation of Buried Structure Response to Strong Dynamic Load
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Numerical Simulation of Ground Shock Produced by Chemical Explosion in Closed Soil
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A Wavelet Collocation Precise Integration Method for Laminated Rectangular Plates with Four Sides Clamped
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Numerical Simulation of Shock Wave Around-Flow in Explosion Test
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Properties of the Solution Set for Generalized Equilibrium Problems with Lower and Upper Bounds in FC-Metric Spaces
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Stability Analysis of Stiffened Plates Based on State-Vector Equation
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Studying on Deduction of Unit Weight Mean Square Error of No-Equal Precision Independent Surveying Values about Literatures[1-2]
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A Constraint Model for Interface Stress Element Method without Virtual Elements
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A Flow-Condition-Based Interpolation Method Combined with Splitting Algorithm for Wind Field Calculation
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HomeAdvanced Materials ResearchAdvanced Materials Research Vols. 671-674Properties of the Solution Set for Generalized...

Properties of the Solution Set for Generalized Equilibrium Problems with Lower and Upper Bounds in FC-Metric Spaces

Abstract:

The equilibrium problem includes many fundamental mathematical problems, e.g., optimization problems, saddle point problems, fixed point problems, economics problems, comple- mentarity problems, variational inequality problems, mechanics, engineering, and others as special cases. In this paper, properties of the solution set for generalized equilibrium problems with lower and upper bounds in FC-metric spaces are studied. In noncompact setting, we obtain that the solution set for generalized equilibrium problems with lower and upper bounds is nonempty and compact. Our results improve and generalize some recent results in the reference therein.