凸度量空间中拟循环-非循环映射的重合拟最佳接近点

IF 0.4 Q4 MATHEMATICS

Iranian Journal of Mathematical Sciences and Informatics Pub Date : 2022-04-01 DOI:10.52547/ijmsi.17.1.27

A. Abkar, M. Norouzian

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引用次数: 2

摘要

．引入了凸度量空间中拟循环-非循环对的概念及其相关的重合拟最佳接近点的新概念。通过这种方式，我们推广了M. Gabeleh等人已经提出的重合-最佳接近点的概念。在某些情况下，这个新的映射类包含了循环-非循环映射类的子类。研究了凸度量空间中重合最佳接近点和重合拟最佳接近点的存在性和收敛性。

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Coincidence Quasi-Best Proximity Points for Quasi-Cyclic-Noncyclic Mappings in Convex Metric Spaces

. We introduce the notion of quasi-cyclic-noncyclic pair and its relevant new notion of coincidence quasi-best proximity points in a convex metric space. In this way we generalize the notion of coincidence-best proximity point already introduced by M. Gabeleh et al [14]. It turns out that under some circumstances this new class of mappings contains the class of cyclic-noncyclic mappings as a subclass. The existence and convergence of coincidence-best and coincidence quasi-best proximity points in the setting of convex metric spaces are investigated.

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来源期刊

Iranian Journal of Mathematical Sciences and Informatics MATHEMATICS-

CiteScore

0.90

自引率

0.00%

发文量