Results 21 to 30 of about 21,859 (214)
ON NEW OSTROWSKI TYPE INEQUALITIES
AbstractIn this short note, some new inequalities of Ostrowski type involving two functions and their derivatives for mapping whose derivations belong ...
Liu, Wenjun, Dong, Jianwei
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Two-Point Fuzzy Ostrowski Type Inequalities
Two-point fuzzy Ostrowski type inequalities are proved for fuzzy Hölder and fuzzy differentiable functions. The two-point fuzzy Ostrowski type inequality for M-lipshitzian mappings is also obtained.
Muhammad Amer Latif, Sabir Hussain
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On Weighted Montgomery Identity for k Points and Its Associates on Time Scales
The purpose of this paper is to establish a weighted Montgomery identity for k points and then use this identity to prove a new weighted Ostrowski type inequality.
Eze R. Nwaeze, Ana M. Tameru
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Weighted Ostrowski type inequalities for functions with one point of nondifferentiability
We present a weighted generalization involving derivatives of arbitrary order of the recently obtained Ostrowski type inequality for functions with one point of nondifferentiability.
A. Aglić Aljinović +2 more
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The subject of convex analysis and integral inequalities represents a comprehensive and absorbing field of research within the field of mathematical interpretation.
Muhammad Tariq +5 more
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On inequalities of Jensen-Ostrowski type [PDF]
zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Cerone, Pietro +2 more
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More General Ostrowski-Type Inequalities in the Fuzzy Context
In this study, Ostrowski-type inequalities in fuzzy settings were investigated. A detailed theory of fuzzy analysis is provided and utilized to establish the Ostrowski-type inequality in the fuzzy number-valued space.
Muhammad Amer Latif
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A NOTE ON OSTROWSKI TYPE INEQUALITIES
Summary: In the present note we establish two new integral inequalities of the Ostrowski type involving a function of one independent variable. The discrete analogues of the main results are also given.
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THE BEST CONSTANT IN AN INEQUALITY OF OSTROWSKI TYPE
We prove the constant $\frac{1}{2}$ in Dragomir-Wang's inequality [2] is best.
Peachey, Tom +2 more
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A modified class of Ostrowski-type inequalities and error bounds of Hermite–Hadamard inequalities
This paper aims to extend the application of the Ostrowski inequality, a crucial tool for figuring out the error bounds of various numerical quadrature rules, including Simpson’s, trapezoidal, and midpoint rules.
Miguel Vivas-Cortez +4 more
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