模糊赋范空间中的最佳邻近点结果

Q2 Pharmacology, Toxicology and Pharmaceutics
Raghad I. Sabri, Buthainah A. A. Ahmed
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引用次数: 1

摘要

不动点(简称FP)理论是解决几个实际问题的有力工具,因为许多问题可以简化为FP问题。Banach压缩映射是FP理论中的一个基本定理。这一思想在几个领域有着广泛的应用;因此,它以多种方式发展起来。然而,所有这些结果都依赖于FP在某个合适空间上的存在性和唯一性。由于FP问题在非自映射的情况下不可能有解,因此提供了最佳邻近点(简称Bpp)的概念来接近最佳解。本文研究了模糊赋范空间(简称FN空间)中非自映射Bpp的存在性和唯一性,得到了最佳解。在引入Bpp的定义之后,对于不同的模糊近端收缩,如????,Bpp的存在性和唯一性在FN空间中显示??????模糊近端压缩映射与????h????h-模糊近端压缩映射。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Best Proximity Point Results in Fuzzy Normed Spaces
Fixed point (briefly FP ) theory is a potent tool for resolving several actual problems since many problems may be simplified to the FP problem. The idea of Banach contraction mapping is a foundational theorem in FP theory. This idea has wide applications in several fields; hence, it has been developed in numerous ways. Nevertheless, all of these results are reliant on the existence and uniqueness of a FP on some suitable space. Because the FP problem could not have a solution in the case of nonself-mappings, the idea of the best proximity point (briefly Bpp) is offered to approach the best solution. This paper investigates the existence and uniqueness of the Bpp of nonself-mappings in fuzzy normed space(briefly FN space) to arrive at the best solution. Following the introduction of the definition of the Bpp, the existence, and uniqueness of the Bpp are shown in a FN space for diverse fuzzy proximal contractions such as ?????? fuzzy proximal contractive mapping and ????h ????h - fuzzy proximal contractive mapping.
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来源期刊
Science and Technology Indonesia
Science and Technology Indonesia Pharmacology, Toxicology and Pharmaceutics-Pharmacology, Toxicology and Pharmaceutics (miscellaneous)
CiteScore
1.80
自引率
0.00%
发文量
72
审稿时长
8 weeks
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