Results 41 to 50 of about 290 (146)
Contraction Mappings in Intuitionistic Fuzzy Rectangular Extended B‐Metric Spaces
Mathematical Problems in Engineering, Volume 2022, Issue 1, 2022., 2022 In this study, we present the notion of intuitionistic fuzzy rectangular extended b‐metric spaces as a generalization of intuitionistic fuzzy metric spaces and intuitionistic fuzzy rectangular b‐metric spaces. Some well‐known fixed‐point results in metric fixed‐point theory are generalized in the sense of intuitionistic fuzzy rectangular extended b ...
Doha Kattan +3 more
wiley +1 more source
The Role of Lacunary Statistical Convergence for Double sequences in Neutrosophic Normed Spaces [PDF]
Neutrosophic Sets and SystemsThis paper introduces and explores the concept of lacunary statistical convergence of double sequence within the framework neutrosophic normed spaces. Neutrosophic normed spaces extend classical normed spaces by incorporating neutrosophic numbers, which ...
Jenifer. P, Jeyaraman. M
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On $\mathcal{I}_{\theta }$-convergence in Neutrosophic Normed Spaces
Fundamental Journal of Mathematics and Applications, 2021 The purpose of this article is to investigate lacunary ideal convergence of sequences in neutrosophic normed space (NNS). Also, an original notion, named lacunary convergence of sequence in NNS, is defined. Also, lacunary $% \mathcal{I}$-limit points and lacunary $\mathcal{I}$-cluster points of sequences in NNS have been examined. Furthermore, lacunary
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Ideal Convergence in neutrosophic 2-normed space via the parameter µ and Zweier Operator [PDF]
Neutrosophic Sets and SystemsThis paper introduces a novel convergence concept termed μ− Zweier ideal convergence within neutrosophic 2-normed spaces (briefly, N2NS). The parameter μ = (μn) represents a non-decreasing sequence of positive real numbers, with each μn tending to ...
Mobeen Ahmad +3 more
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Application to Lipschitzian and Integral Systems via a Quadruple Coincidence Point in Fuzzy Metric Spaces [PDF]
, 2022 In this paper, the results of a quadruple coincidence point (QCP) are established for commuting mapping in the setting of fuzzy metric spaces (FMSs) without using a partially ordered set.
De la Sen Parte, Manuel +1 more
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Cesàro Statistical Convergence on Neutrosophic Normed Spaces
Turkish Journal of Mathematics and Computer Science, 2022 Cesàro statistical convergence in neutrosophic normed spaces is investigated in this research. Additionally, in this study, we concentrate at several features of Cesàro statistical convergence in NNS such as concepts of Cesàro statistically Cauchy, Cesàro statistically convergent neutrosophic normed Cauchy.
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Certain aspects of Nörlund ℐ-statistical convergence of sequences in neutrosophic normed spaces
Demonstratio Mathematica, 2023 The aim of this article is to investigate the neutrosophic Nörlund ℐ-statistically convergent sequence space. We present some neutrosophic normed spaces (NNSs) in Nörlund convergent spaces.
Kişi Ömer +2 more
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Arithmetic statistically convergent on neutrosophic normed spaces
Gümüşhane Üniversitesi Fen Bilimleri Enstitüsü Dergisi, 2023 This work is concerned with several important different types of convergence that will be described on neutrosophic normed spaces. In the study, arithmetic convergence was combined with different types of statistical convergence and then integrated into the structure of neutrophic spaces established through the membership function. For this purpose, in
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On deferred I-statistical rough convergence of difference sequences in neutrosophic normed spaces [PDF]
Neutrosophic Sets and SystemsIn this study, using the concepts of deferred density and the notion of the ideal I, we extend the idea of rough convergence by introducing the notion of deferred I–statistical rough convergence via difference operators in the framework of neutrosophic ...
Mukhtar Ahmad +2 more
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LACUNARY STATISTICAL CONVERGENCE OF ORDER α IN PARTIAL METRIC SPACES [PDF]
, 2023 The present study introduces the notions of statistical convergence of order $\alpha$ and strongly $q-$ summability of order $\alpha$ in partial metric spaces.
Bayram, Erdal, Bektaş, Çiğdem A.
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