Common Fixed Point, Baire's and Cantor's Theorems in Neutrosophic 2- Metric Spaces
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Date
2022
Journal Title
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Publisher
Amer inst Mathematical Sciences-aims
Open Access Color
GOLD
Green Open Access
No
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Abstract
These fundamental Theorems of classical analysis, namely Baire's Theorem and Cantor's Intersection Theorem in the context of Neutrosophic 2-metric spaces, are demonstrated in this article. Naschie discussed high energy physics in relation to the Baire's Theorem and the Cantor space in descriptive set theory. We describe, how to demonstrate the validity and uniqueness of the common fixed-point theorem for four mappings in Neutrosophic 2-metric spaces.
Description
Asjad, Muhammad Imran/0000-0002-1484-5114
ORCID
Keywords
Fuzzy Metric Spaces, Fuzzy 2-Metric Spaces, Neutrosophic Metric Spaces, Common Fixed Point, Cantor set, Social Sciences, Management Science and Operations Research, Baire space, neutrosophic metric spaces, Mathematical analysis, Decision Sciences, fuzzy metric spaces, Fixed Point Theorems in Metric Spaces, QA1-939, FOS: Mathematics, fuzzy 2-metric spaces, Open mapping theorem (functional analysis), Fixed-point theorem, Banach space, Fixed Point Theorems, Application of Soft Set Theory in Decision Making, Pure mathematics, Cantorian-Fractal Theory of Quantum Physics, Statistical and Nonlinear Physics, common fixed point, Discrete mathematics, Physics and Astronomy, Eberlein–Šmulian theorem, Physical Sciences, Baire category theorem, Complete metric space, Geometry and Topology, Uniqueness, Metric space, Lp space, Mathematics
Fields of Science
02 engineering and technology, 01 natural sciences, 0103 physical sciences, 0202 electrical engineering, electronic engineering, information engineering
Citation
Ishtiaq, Umar...et.al. (2023). "Common fixed point, Baire’s and Cantor’s theorems in neutrosophic 2-metric spaces", AIMS Mathematics, Vol.8, No.2, pp.2532-2555.
WoS Q
Q1
Scopus Q
Q1
OpenCitations Citation Count
1
Source
AIMS Mathematics
Volume
8
Issue
2
Start Page
2532
End Page
2555
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Scopus : 2
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