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Article type: Research Article
Authors: Jasrotia, Swati | Singh, Uday Pratap | Raj, Kuldip; *
Affiliations: School of Mathematics, Shri Mata Vaishno Devi University, Katra, Jammu and Kashmir, India
Correspondence: [*] Corresponding author. Kuldip Raj, School of Mathematics, Shri Mata Vaishno Devi University, Katra, Jammu and Kashmir, India. E-mail: [email protected].
Abstract: In this article, we introduce and study some difference sequence spaces of fuzzy numbers by making use of λ-statistical convergence of order (η, δ + γ) . With the aid of MATLAB software, it appears that the statistical convergence of order (η, δ + γ) is well defined every time when (δ + γ) > η and this convergence fails when (δ + γ) < η. Moreover, we try to set up relations between (Δv, λ)-statistical convergence of order (η, δ + γ) and strongly (Δv, p, λ)-Cesàro summability of order (η, δ + γ) and give some compelling instances to show that the converse of these relations is not valid. In addition to the above results, we also graphically exhibits that if a sequence of fuzzy numbers is bounded and statistically convergent of order (η, δ + γ) in (Δv, λ), then it need not be strongly (Δv, p, λ)-Cesàro summable of order (η, δ + γ).
Keywords: Cesàro summability, difference operator, fuzzy numbers, λ-statistical convergence
DOI: 10.3233/JIFS-201539
Journal: Journal of Intelligent & Fuzzy Systems, vol. 40, no. 3, pp. 4695-4703, 2021
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