Some New Mathematical Integral Inequalities Pertaining to Generalized Harmonic Convexity with Applications

The subject of convex analysis and integral inequalities represents a comprehensive and absorbing field of research within the field of mathematical interpretation. In recent times, the strategies of convex theory and integral inequalities have become the subject of intensive research at historical and contemporary times because of their applications in various branches of sciences. In this work, we reveal the idea of a new version of generalized harmonic convexity i.e., an m-polynomial p-harmonic s-type convex function. We discuss this new idea by employing some examples and demonstrating some interesting algebraic properties. Furthermore, this work leads us to establish some new generalized Hermite-Hadamard- and generalized Ostrowski-type integral identities. Additionally, employing Holder's inequality and the power-mean inequality, we present some refinements of the H-H (Hermite-Hadamard) inequality and Ostrowski inequalities. Finally, we investigate some applications to special means involving the established results. These new results yield us some generalizations of the prior results in the literature. We believe that the methodology and concept examined in this paper will further inspire interested researchers.

Automated summary

This article discusses the importance of convex analysis and integral inequalities in mathematical interpretation and their applications in various sciences. It introduces a new concept of generalized harmonic convexity and establishes new integral identities as well as refinements of existing inequalities. The results contribute to the generalization of prior research.