Fixed points of $G$-monotone mappings in metric and modular spaces

Pub Date : 2024-03-03 DOI:10.12775/tmna.2024.003
Dau Hong Quan, A. Wiśnicki
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Abstract

Let $C$ be a bounded, closed and convex subset of a reflexive metric space with a digraph $G$ such that $G$-intervals along walks are closed and convex. In the main theorem we show that if $T\colon C\rightarrow C$ is a monotone $G$-nonexpansive mapping and there exists $c\in C$ such that $Tc\in [c,\rightarrow )_{G}$, then $T$ has a fixed point provided for each $a\in C$, $[a,a]_{G}$ has the fixed point property for nonexpansive mappings. In particular, it gives an essential generalization of the Dehaish-Khamsi theorem concerning partial orders in complete uniformly convex hyperbolic metric spaces. Some counterparts of this result for modular spaces, and for commutative families of mappings are given too.
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度量空间和模态空间中 G$ 单调映射的定点
让 $C$ 是一个有界的、封闭的和凸的反身度量空间的子集,它有一个数图 $G$,使得沿走道的 $G$ 间隔是封闭的和凸的。在主定理中,我们证明了如果 $T\colon C\rightarrow C$ 是一个单调的 $G$ 非膨胀映射,并且存在 $c\in C$ 使得 $Tc\in [c,\rightarrow )_{G}$,那么 $T$ 有一个固定点,条件是对于 C$ 中的每个 $a\,$[a,a]_{G}$ 具有非膨胀映射的固定点性质。特别是,它给出了关于完全均匀凸双曲度量空间中部分阶的德海什-卡姆西(Dehaish-Khamsi)定理的基本概括。此外,还给出了这一结果在模块空间和交换映射族中的一些对应关系。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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