Some properties of h-MN-convexity and Jensen's type inequalities

Abstract

In this work, we introduce the class of h-MN-convex functions by generalizing the concept of MN-convexity and combining it with h-convexity. Namely, Let I,J be two intervals subset of (0,∞) such that (0,1)⊂eq J and [a,b]⊂eq I. Consider a non-negative function h: (0,∞) (0,∞) and let M:[0,1] [a,b] (0<a<b) be a Mean function given by M(t)=M( h(t);a,b ); where by M( h(t);a,b ) we mean one of the following functions: Ah( a,b ):=h( 1 - t )a + h(t) b, Gh( a,b )=ah(1-t) bh(t) and Hh( a,b ):=abh(t) a + h( 1 - t )b = 1Ah( 1a,1b ); with the property that M( h(0);a,b )=a and M( h(1);a,b )=b. A function f : I (0,∞) is said to be h-MN-convex (concave) if the inequality align* f (M(t;x, y)) () \, N(h(t);f (x), f (y)), align* holds for all x,y ∈ I and t∈ [0,1], where M and N are two mean functions. In this way, nine classes of h-MN-convex functions are established and some of their analytic properties are explored and investigated. Characterizations of each type are given. Various Jensen's type inequalities and their converses are proved.