Convexity according to a pair of quasi-arithmetic means and inequalities

We consider a class of generalized convex functions, which are defined according to a pair of quasi-arithmetic means and called (M-phi, M-psi)-convex functions, and establish various Fejer type inequalities for such a function class. These inequalities not merely provide a natural and intrinsic characterization of the (M-phi, M-psi)-convex functions, but actually offer a generalization and refinement of the most part of the concrete Hermite-Hadamard and Fejer type inequalities obtained in earlier studies for different kinds of convexity and fractional integrals. Applications to inequalities involving the gamma function and special means are also included. (C) 2020 Elsevier Inc. All rights reserved.