Publication: On generalization of midpoint type inequalities with generalized fractional integral operators
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Authors
Özdemir, M. Emin
Authors
Budak, Hüseyin
Usta, Fatih
Sarıkaya, Mehmet Zeki
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Springer-Verlag Italia SRL
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Abstract
The Hermite-Hadamard inequality is the first principal result for convex functions defined on a interval of real numbers with a natural geometrical interpretation and a loose number of applications for particular inequalities. In this paper we proposed the Hermite-Hadamard and midpoint type inequalities for functions whose first and second derivatives in absolute value are s-convex through the instrument of generalized fractional integral operator and a considerable amount of results for special means which can naturally be deduced.
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Keywords
Mathematics, Science & technology-other topics, Integral equations, Mathematical operators, Convex functions, Fractional integral operator, Fractional integrals, Generalisation, Geometrical interpretation, Hermite, Hermite-Hadamard inequalities, Integral operators, Midpoint inequality, Real number, Functions, Convex function, Fractional integral operators
Citation
Budak, H. vd. (2019). "On generalization of midpoint type inequalities with generalized fractional integral operators". 113(2), 769-790.