On hemicontinuity of bifunctions for solving equilibrium problems

On hemicontinuity of bifunctions for solving equilibrium problems

This paper deals with solving equilibrium problems under local conditions on equilibrium bifunctions. Some techniques first considered for multivalued mixed variational inequalities are investigated and applied to equilibrium problems. It results that the notion of hemicontinuity is not needed on th...

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Bibliographic Details
Main Author: Alleche Boualem
Format: Article
Language:English
Published: De Gruyter 2014-05-01
Series:Advances in Nonlinear Analysis
Subjects:
equilibrium problem
variational inequality problem
multivalued mapping
hemicontinuity
pseudomonotonicity
quasimonotonicity
65k10
90c33
91b50
Online Access:https://doi.org/10.1515/anona-2013-0030
Description
Summary:This paper deals with solving equilibrium problems under local conditions on equilibrium bifunctions. Some techniques first considered for multivalued mixed variational inequalities are investigated and applied to equilibrium problems. It results that the notion of hemicontinuity is not needed on the whole space when solving equilibrium problems involving pseudomonotone or quasimonotone bifunctions. Generalizations of some well-known results concerning existence of solutions of equilibrium problems are obtained and applications to equilibrium problems involving two, rather than one, bifunctions are given.
ISSN:2191-9496
2191-950X

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