Abstract
It is shown that if $C$ is a nonempty convex and weakly compact subset of a Banach space $X$ with $M(X)>1$ and $T:C\rightarrow C$ satisfies condition $% (C)$ or is continuous and satisfies condition $(C_{\lambda })$ for some $% \lambda \in (0,1),$ then $T$ has a fixed point. In particular, our theorem holds for uniformly nonsquare Banach spaces. A similar statement is proved for nearly uniformly noncreasy spaces.
Citation
Anna Betiuk-Pilarska. Andrzej Wiśnicki. "On the Suzuki nonexpansive-type mappings." Ann. Funct. Anal. 4 (2) 72 - 86, 2013. https://doi.org/10.15352/afa/1399899526
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