Journal of Mathematical Inequalities.
Element D.O.O..
Vol. 12.
2018.
P. 619-633
GENERALIZATION OF MAJORIZATION THEOREM-II
This paper begins with a rigorous study of convex functions with the goal of developing the majorization theorems in the form of Taylor representation. In this paper, some new types of Green functions, introduced by Pecaric-Agarwal-Butt-Melaniml (2017) [11] and Taylor's formula, are used to obtain the identities related to majorization type inequalities. We present the monotonicity of the linear functionals deduced from our generalized results by using the family of (n + 1)-convex functions at a point. We give upper bounds and mean value theorems for obtained generalized identities. At the end, we explore some applications.
Authors
Latif N.1
,
Siddique N.2
,
Pecaric J.
3,
4
Publisher
Element D.O.O.
Number of issue
3
Language
English
Pages
731-752
Status
Published
Volume
12
Year
2018
Organizations
- 1 Jubail Ind Coll, Dept Gen Studies, Jubail Ind City, Saudi Arabia
- 2 Govt Coll Univ, Dept Math, Faisalabad 38000, Pakistan
- 3 Univ Zagreb, Fac Text Technol Zagreb, Prilaz Baruna Filipovica 28A, Zagreb 10000, Croatia
- 4 RUDN Univ, 6 Miklukho Maklay St, Moscow 117198, Russia
Keywords
Majorization inequality; Taylor's formula; new Green functions; linear functionals; (n+1)-convex functions at a point; Gruss and Ostrowski-type upper bounds; mean value theorems; n-exponential convexity; applications
Date of creation
19.10.2018
Date of change
19.10.2018
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INTERNATIONAL JOURNAL OF BIOMEDICINE.
INT MEDICAL RESEARCH & DEVELOPMENT CORP.
Vol. 8.
2018.
P. 206-212