Results 111 to 120 of about 163 (133)

On Multidimensional Ostrowski-Type Inequalities

Ukrainian Mathematical Journal, 2020
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Weighted Ostrowski, Ostrowski-Gruss and Ostrowski--Cebysev type inequalities on time scales

Publicationes Mathematicae Debrecen, 2012
Recently several authors have extended various classical inequalities to inequalities on time scales, an important concept due to Hilger that enables discrete and continuous results to be proved simultaneously, see in particular \textit{R. Agarwal, M. Bohner and A. Peterson} [Math. Inequal. Appl. 4, 535--557 (2001; Zbl 1021.34005)], \textit{M.
Tuna, Adnan, Jiang, Yong, Liu, Wenjun
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Remarks on Ostrowski-like inequalities

Applied Mathematics and Computation, 2012
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Multivariate Ostrowski Type Inequalities

Acta Mathematica Hungarica, 1997
The distance between the value \(f(x_{1},\cdots,x_{k})\) of a function \(f \in C^{1}(\prod^{k}_{i=1}[a_{i},b_{i}])\) and its integral mean can be estimated by the formula \[ \begin{gathered} \left| \frac{1}{\Pi^{k}_{i=1}(b_{i}-a_{i})} \int^{b_{1}}_{a_{1}}\int^{b_{2}}_{a_{2}} \cdots \int^{b_{k}}_{a_{k}} f(z_{1},\dots,z_{k})dz_{1}\ldots dz_{k} - f(x_{1},\
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Two-Point Ostrowski’s Inequality

Results in Mathematics, 2017
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Grüss and Ostrowski type inequalities

Applied Mathematics and Computation, 2011
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Univariate Ostrowski Inequalities, Revisited

Monatshefte f?r Mathematik, 2002
The author proves several new identities of Montgomery-type (such an identity was used by Montgomery in multiplicative number theory); then certain general Ostrowski type inequalities, involving \(L_p\) (\(p\geq 1\), or \(p=\infty\)) are deduced. There are too many results (17 theorems and a couple of consequences), and too complicated to be stated ...
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Generalizations of the Ostrowski’s inequality

Journal of Interdisciplinary Mathematics, 2006
Using the Taylor-Langrange formula as well as a generalization of this one, we give some generalizations of the integral midpoint inequality as well of the Ostrowski inequality for n -time differentiable mappings. A new sharp generalized weighted Ostrowski type inequality is given.
K. S. Anastasiou, Aristides I. Kechriniotis, B.A. Kotsos   +2 more
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On the weighted Ostrowski inequality

2007
Summary: By utilising an identity of \textit{K. Boukerrioua} and {A. Guezane-Lakoud} [JIPAM, J. Inequal. Pure Appl. Math. 8, No. 2, Paper No. 55, 4 p., electronic only (2007; Zbl 1232.26024)], some weighted Ostrowski type inequalities are established.
Barnett, Neil S, Dragomir, Sever S
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Generalized Ostrowski and Ostrowski-Grüss type inequalities

Rendiconti del Circolo Matematico di Palermo Series 2
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Ghulam Farid, Sajid Mehmood, Bakri A. Younis, Huda Uones Mohamed Ahamd, Ria H. Egami, Ahmed M. Ibrahim Adam   +5 more
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