Abstract
We prove, by asymptotic center techniques and some inequalities in Banach spaces, that if $E$ is $p$-uniformly convex Banach space, $C$ is a nonempty bounded closed convex subset of $E$, and $T\colon C\rightarrow C$ has lipschitzian iterates (with some restrictions), then the set of fixed-points is not only connected but even a retract of $C$. The results presented in this paper improve and extend some results in [J. Górnicki, A remark on fixed point theorems for lipschitzian mappings, J. Math. Anal. Appl. 183 (1994), 495–508], [J. Górnicki, The methods of Hilbert spaces and structure of the fixed-point set of lipschitzian mapping, Fixed Point Theory and Applications, Hindawi Publ. Corporation, 2009, Article ID 586487].
Citation
Jarosław Górnicki. "Structure of the fixed-point set of mappings with lipschitzian iterates." Topol. Methods Nonlinear Anal. 36 (2) 381 - 393, 2010.
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