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Article type: Research Article
Authors: Önder, Zerrin | Çanak, İbrahim; *
Affiliations: Department of Mathematics, Ege University, İzmir, Turkey
Correspondence: [*] Corresponding author. İbrahim Çanak, Department of Mathematics, Ege University, 35100 İzmir, Turkey. Tel.: +90 232 3115418; Fax: +90 232 3881036; E-mail: [email protected].
Abstract: Let 0 ≠ p (x) be a nondecreasing real valued function on [0, ∞) such that p (0) =0 and liminfx→∞p(λx)p(x)>1foreveryλ>1. Given a fuzzy-number-valued continuous function f (x) on [0, ∞), we define s(x):=∫0xf(t)dtandσ(x):=1p(x)∫0xs(t)dp(t),x>0. It is known that the limit limx→∞s(x)=μ exists, then the limit limx→∞σ(x)=μ also exists. But the converse of this implication need not be satisfied in general. In this paper, our goal is to find a condition under which the existence of limx→∞σ(x)=μ follows from that of limx→∞s(x)=μ . As special cases, we obtain some Tauberian conditions of slowly decreasing type and Landau type for the Cesàro summability method of improper integrals of fuzzy-number-valued functions.
Keywords: Fuzzy-number-valued functions, fuzzy Riemann-Stieltjes integral, Tauberian theorems, weighted mean method of integrals, slowly decreasing function
DOI: 10.3233/JIFS-161596
Journal: Journal of Intelligent & Fuzzy Systems, vol. 33, no. 1, pp. 293-303, 2017
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