Boundedness of Fractional Integral Operators Containing Mittag-Leffler Function via Exponentially s-Convex Functions

Boundedness of Fractional Integral Operators Containing Mittag-Leffler Function via Exponentially s-Convex Functions

The main objective of this paper is to obtain the fractional integral operator inequalities which provide bounds of the sum of these operators at an arbitrary point. These inequalities are derived for s-exponentially convex functions. Furthermore, a Hadamard inequality is obtained for fractional int...

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Veröffentlicht in:Journal of Mathematics 2020, Vol.2020 (2020), p.1-7
Hauptverfasser: Geng, Shengtao, Pecaric, Josip E., Akbar, S. B., Nazeer, Waqas, Farid, G., Hong, Gang, Zou, Junzhong
Format: Artikel
Sprache:eng
Schlagworte:
Analysis
Convex analysis
Goal programming
Inequalities
Inequality
Integrals
Mathematical functions
Mathematics
Numerical analysis
Operators (mathematics)
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Zusammenfassung:The main objective of this paper is to obtain the fractional integral operator inequalities which provide bounds of the sum of these operators at an arbitrary point. These inequalities are derived for s-exponentially convex functions. Furthermore, a Hadamard inequality is obtained for fractional integrals by using exponentially symmetric functions. The results of this paper contain several such consequences for known fractional integrals and functions which are convex, exponentially convex, and s-convex.
ISSN:2314-4629
2314-4785
DOI:10.1155/2020/3584105