Abstract
In this paper, we give generalization of an integral inequality. We find its applications in fractional calculus by involving different kinds of fractional integral operators, for example Riemann–Liouville fractional integral, Caputo fractional derivative, Canavati fractional derivative and Widder derivative, Saigo fractional integral operator, etc.
Highlights
In the ocean of inequalities, integral inequalities received great attention by many scientists, for example mathematicians, physicists, and statisticians
I am working as Assistant Professor in the department of Mathematics COMSATS Institute of Information Technology, Attock Campus, Pakistan
Recent paper is on generalization of an integral inequality and its applications in fractional calculus
Summary
Reviewing editor: Lishan Liu, Qufu Normal University, China Additional information is available at the end of the article. Abstarct: In this paper, we give generalization of an integral inequality. We find its applications in fractional calculus by involving different kinds of fractional integral operators, for example Riemann–Liouville fractional integral, Caputo fractional derivative, Canavati fractional derivative and Widder derivative, Saigo fractional integral operator, etc
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