Asymptotic behavior of nonexpansive mappings in normed linear spaces |
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Authors: | Elon Kohlberg Abraham Neyman |
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Institution: | (1) Institute for Advanced Studies, The Hebrew University of Jerusalem, Jerusalem, Israel;(2) Department of Mathematics, University of California, Berkeley, California, USA |
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Abstract: | LetT be a nonexpansive mapping on a normed linear spaceX. We show that there exists a linear functional.f, ‖f‖=1, such that, for allx∈X, limn→x
f(T
n
x/n)=limn→x‖T
n
x/n
‖=α, where α≡inf
y∈c
‖Ty-y‖. This means, ifX is reflexive, that there is a faceF of the ball of radius α to whichT
n
x/n converges weakly for allx (infz∈f
g(T
n
x/n-z)→0, for every linear functionalg); ifX is strictly conves as well as reflexive, the convergence is to a point; and ifX satisfies the stronger condition that its dual has Fréchet differentiable norm then the convergence is strong. Furthermore,
we show that each of the foregoing conditions on X is satisfied if and only if the associated convergence property holds for
all nonexpansiveT.
Supported by National Science Foundation Grant MCS-79-066. |
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Keywords: | |
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