1,530 research outputs found

    Fejer Polynomials and Non-Linear Dynamics

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    Some applications of the Fejer polynomials to the problems in non-linear dynamics will be presented. This is a joint talk with D. Dmitrishin, P. Hagelstein, A. Khamitova and M. Tohanianu

    FEJER TYPE INEQUALITIES FOR HARMONICALLY (s, m)-CONVEX FUNCTIONS

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    iscan, imdat/0000-0001-6749-0591;WOS: 000388622400010In this paper, a new weighted identity involving harmonically symmetric functions and differentiable functions is established. By using the notion of harmonic symmetricity, harmonic (s, m)-convexity, analysis and some auxiliary results, some new Fejer type integral inequalities are presented for the class of harmonically (s, m)-convex functions.Higher Education Commission of PakistanHigher Education Commission of PakistanThis research article is partially supported by Higher Education Commission of Pakistan

    On Refinements of Hermite-Hadamard-Fejer Type Inequalities for Fractional Integral Operators

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    WOS: 000435011100027In this paper, utilizing convex functions, we first establish new refinements of Hermite-Hadamard-Fejer type inequalities via Riemann-Liouville fractional integral operators. A generalized refinements of Hermite-Hadamard-Fejer type inequalities for fractional integral operators with exponential kernel is also obtained. The results given in this paper would provide extensions of those presented in earlier studies

    Inequalities of Fejer Type Related to Generalized Convex Functions

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    This paper deals with some Fejer type inequalities related to (η1, η2)-convex functions. In fact the difference between the right and middle part of Fejer inequality is estimated without using Hölder’s inequality when the absolute value of the derivative of considered function is (η1, η2)-convex. Furthermore we give two estimation results when the derivative of considered function is bounded and satisfies a Lipschitz condition.</span

    Inequalities of Fejer Type Related to Generalized Convex Functions

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    This paper deals with some Fejer type inequalities related to (η1, η2)-convex functions. In fact the difference between the right and middle part of Fejer inequality is estimated without using Hölder’s inequality when the absolute value of the derivative of considered function is (η1, η2)-convex. Furthermore we give two estimation results when the derivative of considered function is bounded and satisfies a Lipschitz condition.</span

    On Some New Inequalities of Hermite-Hadamard-Fejer Type Involving Convex Functions

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    In this paper, we establish some inequalities of Hermite-Hadamard-Fejer type for m-convex functions and s-convex functions

    Regional micronutrient supply in Hungary on the example of Fejer county

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    The author gives information about regional micronutrient supply in Hungary on the example of Fejer county. The general information of the couny, the physical and chemical characteristics of the soils are shown. The Cu-, Zn-, and Mn-supply of the soils, the plant analysis results and the micronutrients balance-sheets are also discussed

    Fejer-Hadamard Inequlality for Convex Functions on the Coordinates in a Rectangle from the Plane

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    We give Fejer-Hadamard inequality for convex functions on coordinates in the rectangle from the plane. We define some mappings associated to it and discuss their properties

    On the approximation of Riemann integrable functions by Fejer means

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    Continuing previous investigations on the approximation of Riemann integrable functions by trigonometric convolution processes, this paper is concerned with a direct estimate of Steckin-type as well as with the saturation problem for the Fejer means. (orig.)Available from TIB Hannover: RN 2414(473) / FIZ - Fachinformationszzentrum Karlsruhe / TIB - Technische InformationsbibliothekSIGLEDEGerman

    Some New Hermite-Hadamard-Fejer Type Inequlaties via k-Fractional Integrals Concerning Differentiable Generalized Relative Semi-(r; m, h1, h2)-Preinvex Mappings

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    In this article, we first presented a new identity concerning differentiable mappings defined on m-invex set via k-fractional integrals. By using the notion of generalized relative semi-(r;m,h1,h2)-preinvexity and the obtained identity as an auxiliary result, some new estimates with respect to Hermite-Hadamard-Fejer type inequalities via k-fractional integrals are established. It is pointed out that some new special cases can be deduced from main results of the article.</jats:p
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