199,275 research outputs found

    Improvement of an Ostrowski Type Inequality for Monotonic Mappings and its Application for Some Special Means

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    We first improve two Ostrowski type inequalities for monotonic functions, then provide its application for special means

    On Weighted Ostrowski Type Inequalities for Operators and Vector-Valued Functions

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    Some weighted Ostrowski type integral inequalities for operators and vector-valued functions in Banach spaces are given. Applications for linear operators in Banach spaces and differential equations are also provided

    Ostrowski Type Inequalities for Functions whose Modulus of the Derivatives are Convex and Applications

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    Some inequalities of the Ostrowski type for functions whose modulus of derivatives are convex and applications for special means and to the f and HH−divergences in Information theory are given

    Some generalizations of Ostrowski inequality

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    碩士在這篇論文我們建立了一些Ostrowski型態的不等式,推廣並改良前人所做的一些結果。In this paper, we establish some inequalities which improve some Ostrowski type inequalities.第一章:導論………………………………………………………………1 1.1:已建立的Ostrowski不等式 1.2:由Dragomir, Tseng, Yang跟Chou所建立的結果 第二章:一些加權的Ostrowski不等式的改良……………………………7 參考文獻…………………………………………………………………20學號: 603190066, 學年度: 10

    An Ostrowski Type Inequality for Weighted Mappings with Bounded Second Derivatives

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    A weighted integral inequality of Ostrowski type for mappings whose second derivatives are bounded is proved. The inequality is extended to account for applications in numerical integration

    Better Bounds for an Inequality of the Ostrowski Type with Applications

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    In this paper we improve a recent result by Matić, Pečarić and Ujević [6] and apply it for special means and cumulative probability functions

    NEW OSTROWSKI TYPE INEQUALITIES FOR m-CONVEX FUNCTIONS AND APPLICATIONS

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    In this paper we establish new inequalities of Ostrowski type, for functions whose derivatives in absolute value are m-convex. We also give some applications to special means of positive real numbers. Finally, we obtain some error estimates for the midpoint formula

    Ostrowski's Inequality for Vector-Valued Functions and Applications

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    Some Ostrowski type inequalities for vector-valued functions are obtained. Applications for operatorial inequalities and numerical approximation for the solutions of certain differential equations in Banach spaces are also given

    The Perturbed Median Principle for Integral Inequalities with Applications

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    In this paper a perturbed version of the Median Principle introduced by the author in 'The median principle for inequalities and applications' is developed. Applications for various Riemann- Stieltjes integral and Lebesgue integral inequalities are also provided

    Ostrowski-Type Fractional Integral Inequalities: A Survey

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    This paper presents an extensive review of some recent results on fractional Ostrowski-type inequalities associated with a variety of convexities and different kinds of fractional integrals. We have taken into account the classical convex functions, quasi-convex functions, (ζ,m)-convex functions, s-convex functions, (s,r)-convex functions, strongly convex functions, harmonically convex functions, h-convex functions, Godunova-Levin-convex functions, MT-convex functions, P-convex functions, m-convex functions, (s,m)-convex functions, exponentially s-convex functions, (β,m)-convex functions, exponential-convex functions, ζ¯,β,γ,δ-convex functions, quasi-geometrically convex functions, s−e-convex functions and n-polynomial exponentially s-convex functions. Riemann–Liouville fractional integral, Katugampola fractional integral, k-Riemann–Liouville, Riemann–Liouville fractional integrals with respect to another function, Hadamard fractional integral, fractional integrals with exponential kernel and Atagana-Baleanu fractional integrals are included. Results for Ostrowski-Mercer-type inequalities, Ostrowski-type inequalities for preinvex functions, Ostrowski-type inequalities for Quantum-Calculus and Ostrowski-type inequalities of tensorial type are also presented
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