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Michal Feckan, Jinrong Wang
(Beteiligte)
Fractional Hermite-Hadamard Inequalities
2018. XII, 375 S. 240 mm
Verlag/Jahr: DE GRUYTER 2018
ISBN: 3-11-052220-9 (3110522209)
Neue ISBN: 978-3-11-052220-4 (9783110522204)
Preis und Lieferzeit: Bitte klicken
This book extends classical Hermite-Hadamard type inequalities to the fractional case via establishing fractional integral identities, and discusses Riemann-Liouville and Hadamard integrals, respectively, by various convex functions. Illustrating theoretical results via applications in special means of real numbers, it is an essential reference for applied mathematicians and engineers working with fractional calculus. ContentsIntroductionPreliminariesFractional integral identitiesHermite-Hadamard inequalities involving Riemann-Liouville fractional integralsHermite-Hadamard inequalities involving Hadamard fractional integrals
Table of Content:
Chapter 1 Introduction
1.1 Fractional Calculus via Application and Computation
1.2 Motivation of Fractional Hermite-Hadamardīs Inequality
1.3 Main Contents
Chapter 2 Preliminaries
2.1 Definitions of Special Functions and Fractional Integrals
2.2 Definitions of Convex Functions
2.3 Singular Integrals via Series
2.4 Elementary Inequalities
Chapter 3 Fractional Integral Identities
3.1 Identities involving Riemann-Liouville Fractional Integrals
3.2 Identities involving Hadamard Fractional Integrals
Chapter 4 Hermite-Hadamardīs inequalities involving Riemann-Liouville fractional integrals
4.1 Inequalities via Convex Functions
4.2 Inequalities via r-Convex Functions
4.3 Inequalities via s-Convex Functions
4.4 Inequalities via m-Convex Functions
4.5 Inequalities via (s, m)-convex Functions
4.6 Inequalities via Preinvex Convex Functions
4.7 Inequalities via (beta,m)-geometrically Convex Functions
4.8 Inequalities via geometrical-arithmetically s-Convex Functions
4.9 Inequalities via ( ,m)-logarithmically Convex Functions
4.10 Inequalities via s-GodunovaLevin functions
4.11 Inequalities via AG(log)-convex Functions
Chapter 5 Hermite-Hadamardīs inequalities involving Hadamard fractional integrals
5.1 Inequalities via Convex Functions
5.2 Inequalities via s-e-ondition Functions
5.3 Inequalities via geometric-geometric co-ordinated Convex Function
5.4 Inequalities via Geometric-Geometric-Convex Functions
5.5 Inequalities via Geometric-Arithmetic-Convex Functions
References
Jinrong Wang, Guizhou University, Guiyang, China; Michal Feckan, Comenius University in Bratislava, Slovakia.