Title of article :
Best approximation, coincidence and fixed point theorems for quasi-lower semicontinuous set-valued maps in hyperconvex metric spaces
Original Research Article
Author/Authors :
A. Amini-Harandi، نويسنده , , A.P. Farajzadeh، نويسنده ,
Issue Information :
روزنامه با شماره پیاپی سال 2009
Abstract :
Suppose XX is a compact admissible subset of a hyperconvex metric spaces MM, and suppose F:X⊸MF:X⊸M is a quasi-lower semicontinuous set-valued map whose values are nonempty admissible. Suppose also G:X⊸XG:X⊸X is a continuous, onto quasi-convex set-valued map with compact, admissible values. Then there exists an x0∈Xx0∈X such that
View the MathML sourced(G(x0),F(x0))=infx∈Xd(x,F(x0)).
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As applications, we give some coincidence and fixed point results for weakly inward set-valued maps. Our results, generalize some well-known results in literature.
Keywords :
Hyperconvex metric space , best approximation , Quasi-lower semicontinuous map , Fixed point , coincidence point , Weakly inward map
Journal title :
Nonlinear Analysis Theory, Methods & Applications
Journal title :
Nonlinear Analysis Theory, Methods & Applications
