2019
DOI: 10.24193/subbmath.2019.1.04
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Wirtinger type inequalities via fractional integral operators

Abstract: In this study, we shall present Wirtinger type inequality in the fractional case with conformable fractional operators. (2010): 26A33, 26Dxx, 35A23. Mathematics Subject Classification

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Cited by 2 publications
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“…Remark 3.3. Similarly, if we use the kernel F (x, α) = x 1−α , that is, in the case of the conformable derivative T α of [22], we obtain the inequality of Theorem 3.1 of [1].…”
Section: The Generalized Wirtinger Inequalitymentioning
confidence: 96%
“…Remark 3.3. Similarly, if we use the kernel F (x, α) = x 1−α , that is, in the case of the conformable derivative T α of [22], we obtain the inequality of Theorem 3.1 of [1].…”
Section: The Generalized Wirtinger Inequalitymentioning
confidence: 96%
“…And, the fractional order discrete Chebyshev type inequalities are studied in [3,11]. Also, there are the fractional analogues of some well-known inequlities in the literature, see [1,2,4,5,15,21]. For more knowledge and applications about discrete and continuous fractional calculus, see [8,19,22].…”
Section: Introductionmentioning
confidence: 99%