Functional inequalities involving numerical differentiation formulas of order two

Abstract

We write expressions connected with numerical differentiation formulas of order 2 in the form of Stieltjes integral, then we use Ohlin lemma and Levin-Stechkin theorem to study inequalities connected with these expressions. In particular, we present a new proof of the inequality equation Dr f(x+y2)≤1(y-x)2∫xy-2mm∫xyf(s+t2)ds\:dt ≤1y-x∫xyf(t)dt equation satisfied by every convex function f: and we obtain extensions of Dr. Then we deal with nonsymmetric inequalities of a similar form.