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General Raina fractional integral inequalities on coordinates of convex functions

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2021

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Abstract

Integral inequality is an interesting mathematical model due to its wide and significant applications in mathematical analysis and fractional calculus. In this study, authors have established some generalized Raina fractional integral inequalities using an (l1, h1) -(l2, h2) -convex function on coordinates. Also, we obtain an integral identity for partial differentiable functions. As an effect of this result, two interesting integral inequalities for the (l1, h1) -(l2, h2) -convex function on coordinates are given. Finally, we can say that our findings recapture some recent results as special cases. © 2021, The Author(s).

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Coordinated Convex Function, Hermite–Hadamard Inequality, Raina Fractional Integral Operators

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Baleanu, Dumitru...et al. (2021). "General Raina fractional integral inequalities on coordinates of convex functions", Advances in Difference Equation, Vol. 2021, No. 1.

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Advances in Difference Equations

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2021

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1

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