An intersection theorem for set-valued mappings

Ravi P. Agarwal; Mircea Balaj; Donal O'Regan

doi:10.13025/25147

An intersection theorem for set-valued mappings

Ravi P. Agarwal
, Mircea Balaj
, Donal O'Regan

Mathematics

Texas A&M University
University of Oradea

Research output: Contribution to a Journal (Peer & Non Peer) › Article › peer-review

3 Citations (Scopus)

Abstract

Given a nonempty convex set X in a locally convex Hausdorff topological vector space, a nonempty set Y and two set-valued mappings T: X â‡‰ X, S: Y â‡‰ X we prove that under suitable conditions one can find an x â̂̂ X which is simultaneously a fixed point for T and a common point for the family of values of S. Applying our intersection theorem, we establish a common fixed point theorem, a saddle point theorem, as well as existence results for the solutions of some equilibrium and complementarity problems.

Original language	English
Pages (from-to)	269-278
Number of pages	10
Journal	Applications of Mathematics
Volume	58
Issue number	3
DOIs	https://doi.org/10.13025/25147 https://doi.org/10.1007/s10492-013-0013-7
Publication status	Published - Jun 2013

Keywords

complementarity problem
equilibrium problem
fixed point
intersection theorem
saddle point

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10.13025/25147Licence: CC BY-NC-ND
10.1007/s10492-013-0013-7

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abstract = "Given a nonempty convex set X in a locally convex Hausdorff topological vector space, a nonempty set Y and two set-valued mappings T: X {\^a}‡‰ X, S: Y {\^a}‡‰ X we prove that under suitable conditions one can find an x {\^a}{\^̂} X which is simultaneously a fixed point for T and a common point for the family of values of S. Applying our intersection theorem, we establish a common fixed point theorem, a saddle point theorem, as well as existence results for the solutions of some equilibrium and complementarity problems.",

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AU - Agarwal, Ravi P.

AU - Balaj, Mircea

AU - O'Regan, Donal

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N2 - Given a nonempty convex set X in a locally convex Hausdorff topological vector space, a nonempty set Y and two set-valued mappings T: X â‡‰ X, S: Y â‡‰ X we prove that under suitable conditions one can find an x â̂̂ X which is simultaneously a fixed point for T and a common point for the family of values of S. Applying our intersection theorem, we establish a common fixed point theorem, a saddle point theorem, as well as existence results for the solutions of some equilibrium and complementarity problems.

AB - Given a nonempty convex set X in a locally convex Hausdorff topological vector space, a nonempty set Y and two set-valued mappings T: X â‡‰ X, S: Y â‡‰ X we prove that under suitable conditions one can find an x â̂̂ X which is simultaneously a fixed point for T and a common point for the family of values of S. Applying our intersection theorem, we establish a common fixed point theorem, a saddle point theorem, as well as existence results for the solutions of some equilibrium and complementarity problems.

KW - complementarity problem

KW - equilibrium problem

KW - fixed point

KW - intersection theorem

KW - saddle point

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JF - Applications of Mathematics

IS - 3

ER -

An intersection theorem for set-valued mappings

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