Results 81 to 90 of about 185 (156)
A version of Hermite-Hadamard-Mercer inequality and associated results
Over the past decade, the Hermite-Hadamard inequality has attracted significant attention from mathematicians, leading to the development of various extensions and generalizations involving different fractional operators, stochastic processes ...
Zhenglin Zhang +5 more
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Generalizations of Jensen-Mercer's inequality
The article deals with the generalizations of Jensen-Mercer's inequality using affine combinations which can be represented as convex combinations. The generalized Jensen-Mercer's inequality is also obtained for the convex function of several variables applying affine combinations of the simplex.
openaire +2 more sources
New Results on Majorized Discrete Jensen–Mercer Inequality for Raina Fractional Operators
As the most important inequality, the Hermite–Hadamard–Mercer inequality has attracted the interest of numerous additional mathematicians. Numerous findings on this inequality have been developed in recent years.
Çetin Yildiz +2 more
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Examining privilege and power in US urban parks and open space during the double crises of antiblack racism and COVID-19. [PDF]
Hoover FA, Lim TC.
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The effects of IMF loan conditions on poverty in the developing world. [PDF]
Biglaiser G, McGauvran RJ.
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This study generalizes Hermite–Hadamard–Mercer type inequalities using Riemann–Liouville fractional integrals within the framework of multiplicative calculus.
Abdul Mateen +3 more
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Proceedings of the 17TH International Congress on Circumpolar Health, August 12-15, 2018, Copenhagen, Denmark (ICCH17). [PDF]
Koch A.
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On New Generalized Hermite–Hadamard–Mercer-Type Inequalities for Raina Functions
In this research, we demonstrate novel Hermite–Hadamard–Mercer fractional integral inequalities using a wide class of fractional integral operators (the Raina fractional operator).
Zeynep Çiftci +4 more
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This paper presents a unified framework for extending Jensen- and Mercer-type inequalities within the h-convex function space. By leveraging the supermultiplicative and superadditive properties of the weight function h ( t ) $h(t)$ , we refine classical ...
Sajid Ali, Rabia Bibi
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The goal of this study is to develop numerous Hermite–Hadamard–Mercer (H–H–M)-type inequalities involving various fractional integral operators, including classical, Riemann–Liouville (R.L), k-Riemann–Liouville (k-R.L), and their generalized fractional ...
Talib Hussain +2 more
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