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Determination of Bounds for the Jensen Gap and Its Applications

Hidayat Ullah, Muhammad Adil Khan, Tareq Saeed

2021Mathematics21 citationsDOIOpen Access PDF

Abstract

The Jensen inequality has been reported as one of the most consequential inequalities that has a lot of applications in diverse fields of science. For this reason, the Jensen inequality has become one of the most discussed developmental inequalities in the current literature on mathematical inequalities. The main intention of this article is to find some novel bounds for the Jensen difference while using some classes of twice differentiable convex functions. We obtain the proposed bounds by utilizing the power mean and Höilder inequalities, the notion of convexity and the prominent Jensen inequality for concave function. We deduce several inequalities for power and quasi-arithmetic means as a consequence of main results. Furthermore, we also establish different improvements for Hölder inequality with the help of obtained results. Moreover, we present some applications of the main results in information theory.

Topics & Concepts

Jensen's inequalityInequalityConvexityMathematicsConvex functionDifferentiable functionLog sum inequalityPower (physics)Kantorovich inequalityRegular polygonInequality of arithmetic and geometric meansFunction (biology)Mathematical economicsPure mathematicsConcave functionCalculus (dental)Applied mathematicsRearrangement inequalityMathematical analysisLinear inequalityConvex optimizationConvex analysisEconomicsQuantum mechanicsDentistryMedicineBiologyPhysicsEvolutionary biologyGeometryFinancial economicsMathematical Inequalities and ApplicationsFunctional Equations Stability ResultsMathematics and Applications