Padé approximant related to inequalities involving the constant e and a generalized Carleman-type inequality. [PDF]
J Inequal Appl, 2017 Chen CP, Zhang HJ.
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An accurate approximation formula for gamma function. [PDF]
J Inequal Appl, 2018 Yang ZH, Tian JF.
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Fractional Hermite-Hadamard inequalities containing generalized Mittag-Leffler function. [PDF]
J Inequal Appl, 2017 Mihai MV, Awan MU, Noor MA, Noor KI.
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Explicit bounds of unknown function of some new weakly singular retarded integral inequalities for discontinuous functions and their applications. [PDF]
J Inequal Appl, 2017 Li Z, Wang WS.
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Inequalities for α-fractional differentiable functions. [PDF]
J Inequal Appl, 2017 Chu YM +3 more
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Some new retarded nonlinear Volterra-Fredholm type integral inequalities with maxima in two variables and their applications. [PDF]
J Inequal Appl, 2017 Xu R, Ma X.
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Multidimensional Fractional Iyengar Type Inequalities for Radial Functions
Progress in Fractional Differentiation and Applications, 2022Here we derive a variety of multivariate fractional Iyengar type inequalities for radial functions de ned on the shell and ball. Our approach is based on the polar coordinates in R , N 2, and the related multivariate polar integration formula.
G. Anastassiou
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On the Norm of a Multidimensional Hilbert-Type Operator
Sarajevo Journal of MathematicsIn this paper we consider multidimensional Hilbert-type integral inequalities with non-conjugate exponents and homogeneous kernels of negative degree. As an application, we define related Hilbert-type integral operators and consider their norms.
Bicheng Yang, M. Krnić
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On a New Inequality Similar to the Hardy - Hilbert Integral Inequality
Sarajevo Journal of MathematicsA new inequality similar to the Hardy-Hilbert integral inequality is proved. Some special cases are also deduced.
W. T. Sulaiman
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On a Refinement of Hardy’s Inequalities via Superquadratic And Subquadratic Functions
Sarajevo Journal of MathematicsLet $A_k$ be an integral operator defined by$$A_kf(x):=\frac{1}{K(x)} \iom2 k(x,y)f(y)d\oy,$$where $k:\Omega_1\times \Omega_2 \to \R$ is a general nonnegative kernel,and$(\Omega_1,\Sigma_1,\mu_1)$, $(\Omega_2,\Sigma_2,\mu_2)$ are measure spaces with ...
G. Farid, Kristina Krulic, J. Pečarić
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