Neutrosophic Sets and Systems (Nov 2020)

Neutrosophic Triplet m-Banach Spaces

  • Abdullah Kargın,
  • Azize Dayan,
  • İsmet Yıldız ,
  • Adil Kılıç

DOI
https://doi.org/10.5281/zenodo.4300539
Journal volume & issue
Vol. 38
pp. 383 – 398

Abstract

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Neutrosophic triplet theory has an important place in neutrosophic theory. Since the neutrosophic triplet set (Nts), which have the feature of having multiple unit elements, have different units than the classical unit, they have more features than the classical set. Also, Banach spaces are complete normed vector space defined by real and complex numbers that are studied historically in functional analysis. Thus, normed space and Banach space have an important place in functional analysis. In this article, neutrosophic triplet m - Banach spaces (NtmBs) are firstly obtained. Then, some definitions and examples are given for NtmBs. Based on these definitions, new theorems are given and proved. In addition, it is shown that NtmBs is different from neutrosophic triplet Banach space (NtBs). Furthermore, it is shown that relationship between NtmBs and NtBs. So, we added a new structure to functional analysis and neutrosophic triplet theory.

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