On G(σ, h)-Convexity of the Functions and Applications to Hermite-Hadamard’s Inequality

The aim of this chapter is to introduce the notion of G(σ, h)-convex functions a generalized exponentially (σ, h)-convex functions. We show that for suitable choices of real function h(.), the class of G(σ, h)-convex functions reduces to some other new classes of Gσ-convex functions. We also show that for G = exp $${\mathrm {G}}=\exp $$ , we have another new class which is called as G(σ, h)-convex function. For the applications of this class we derive some new variants of Hermite-Hadamard’s inequality using the class of G(σ, h)-convex functions. In the last section, we define the class of strongly G(σ, h)-convexity. We also derive a new Hermite-Hadamard like inequality involving strongly G(σ, h)-convexity. Several new special cases which can be deduced from the main results of the chapter are also discussed.