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Abstract: This correspondence relates to the remark in a recent paper by D.G. Luenberger [ibid., vol. SSC-4, pp. 182-188, July 1968] that any norm defined on a vector space is a real convex function.

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In this paper, we describe s-logarithmically convex functions in the first and second sense which are connected with the ordinary logatihmic convex and... Skip to main content Due to a planned power ...

Definition 1.3 ([2]). Let A function is said to be s-convex in the second sense if. for all and. If is a convex function on with and, Then we have Hermite-Hardamard’s inequality. (1.1) ...

R.-F. Bai, F. Qi and B.-Y. Xi, “Hermite-Hadamard Type Inequalities for the mand (α, m)-Logarithmically Convex Functions,” Filomat, Vol. 27, No. 1, 2013, 1-7. has been cited by the following article: ...

This correspondence relates to the remark in a recent paper by D.G. Luenberger [ibid., vol. SSC-4, pp. 182-188, July 1968] that any norm defined on a vector space is a real convex function. Although ...