Results 1 to 10 of about 1,825 (154)
Newton–Simpson-type inequalities via majorization
Journal of Inequalities and Applications, 2023 In this article, the main objective is construction of fractional Newton–Simpson-type inequalities with the concept of majorization. We established a new identity on estimates of definite integrals utilizing majorization and this identity will lead us to
Saad Ihsan Butt +3 more
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INTEGRAL INEQUALITIES OF SIMPSON TYPE VIA WEIGHTED INTEGRALS
Проблемы анализа, 2023 In this work, we use weighted integrals to obtain new integral inequalities of the Simpson type for the class of pℎ, 𝑚, 𝑠q-convex functions of the second type.
J. E. Napoles +2 more
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On Fractional Simpson-Type Inequalities via Harmonic Convexity
MathematicsIn this paper, we establish some Simpson-type inequalities within the framework of Riemann–Liouville fractional calculus, specifically tailored for differentiable harmonically convex functions.
Li Liao +3 more
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Simpson type inequalities and applications [PDF]
The Journal of Analysis, 2021 AbstractA new generalized integral identity involving first order differentiable functions is obtained. Using this identity as an auxiliary result, we then obtain some new refinements of Simpson type inequalities using a new class called as strongly (s, m)-convex functions of higher order of $$\sigma >0$$ σ
Awan, Muhammad Uzair +4 more
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On Generalization of Bullen-Simpson's Inequality [PDF]
Rocky Mountain Journal of Mathematics, 2005 Generalization of Bullen-Simpson's inequality for (2r)-convex functions is given, by using some Euler type identities. A number of inequalities, for functions whose derivatives are either functions of bounded variation or Lipschitzian functions or functions in L_p-spaces, are proved.
Matić, M., Pečarić, J., Vukelić, A.
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Fractal and Fractional, 2022 The present paper provides several corrected dual-Simpson-type inequalities for functions whose local fractional derivatives are generalized convex. To that end, we derive a new local fractional integral identity as an auxiliary result.
Abdelghani Lakhdari +3 more
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New version of fractional Simpson type inequalities for twice differentiable functions
Advances in Difference Equations, 2021 Simpson inequalities for differentiable convex functions and their fractional versions have been studied extensively. Simpson type inequalities for twice differentiable functions are also investigated. More precisely, Budak et al.
Fatih Hezenci +2 more
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American's desire for less wealth inequality does not depend on how you ask them [PDF]
Judgment and Decision Making, 2013 A large body of survey research offers evidence that citizens are not always fully aware of the economic and political realities in their respective countries.
Michael I. Norton, Dan Ariely
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Simpson type inequalities via φ–convexity [PDF]
AIP Conference Proceedings, 2016 In this paper, we obtain some Simpson type inequalities for functions whose derivatives in absolute value are $ $-convex.
Ozdemir, MUHAMET EMİN +2 more
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Improvement of Some Hayashi–Ostrowski Type Inequalities with Applications in a Probability Setting
Mathematics, 2022 Different types of mathematical inequalities have been largely analyzed and employed. In this paper, we introduce improvements to some Ostrowski type inequalities and present their corresponding proofs.
Mohammad W. Alomari +3 more
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