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FURTHER IMPROVEMENT OF AN EXTENSION OF HOLDER-TYPE INEQUALITY functionals. Moreover, we study the action of related linear functionals on families of exponentially convex
On Zipf-Mandelbrot entropy and 3-convex functions the n-exponential convexity and the log-convexity of the functions associated with the linear
Generalized fractional integral inequalities for exponentially (s, m) -convex functions fractional integral operators for s-convex, m-convex, (s, m) -convex, exponentially convex, exponentially s-convex
On Shannon and Zipf–Mandelbrot entropies and related results construct new family of exponentially convex functions and Cauchy-type means. © 2019, The Author(s).
On (h, g; m)-Convexity and the Hermite-Hadamard Inequality or exponentially (s, m)-convex functions. Also, the Hermite-Hadamard inequality for an (h, g; m)convex function
GENERALIZED STEFFENSEN-TYPE INEQUALITIES BY ABEL-GONTSCHAROFF POLYNOMIAL, we present mean value theorems and n-exponential convexity for these functionals. We also give
GENERALIZATION OF MAJORIZATION THEOREM-IIThis paper begins with a rigorous study of convex functions with the goal of developing
Boundedness of Fractional Integral Operators Containing Mittag-Leffler Function via Exponentially s -Convex Functions fractional integrals and functions which are convex, exponentially convex, and s-convex. © 2020 Gang Hong et
Generalization of cyclic refinements of Jensen’s inequality by Fink’s identityWe generalize cyclic refinements of Jensen’s inequality from a convex function to a higher
GENERALIZED STEFFENSEN'S INEQUALITY BY MONTGOMERY IDENTITIES AND GREEN FUNCTIONS + 1)-convex functions and exponentially convex functions.
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