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inequalities described by convex functions is estimated. As consequences, estimates for the distance from a

) -convex functions. These inequalities provide upper bounds, boundedness, continuity, and Hadamard type

A new class of (h, g; m)-convex functions is presented, together with its properties, thus

and the 3-convexity of the function. Further, we define linear functionals as the nonnegative differences

, nonanalytic, characterization of bijective convex functions h : Δ → Ω not using the second derivative of h.

We state new general linear identities and inequalities involving n-convex functions using Hermite

Sigma(m)(i=1) p(i)f(x(i)) , where f is an n-convex function with even n. We also give integral analogues

Mittag-Leffler functions in the kernels. By using (s, m)-convex functions bounds of these operators

Recently introduced new class of (h, g; m)-convex functions unifies a certain range of convexity

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