Inequalities for m-polynomial exponentially s-type convex
functions in fractional calculus
Pshtiwan Othman Mohammeda, Artion Kashurib, Bahaaeldin Abdallac,*, Y. S. Hamedd, Khadijah M. Abualnajad
ABSTRACT: In this article, we introduce a new class of functions named the m-polynomial exponentially s-type convex
and we study some of its algebraic properties. We investigate a new integral inequality of Hermite-Hadamard (H-H)
type by using the new introduced definition. Also, we prove a new midpoint identity. By examining this identity we
can deduce some integral inequalities of midpoint type for the new introduced definition. Several special cases are
discussed in details which emphasize that the results accounted in this paper unify and extend various results in this
field of study. Finally, we provide some applications on the Bessel functions and special means of distinct positive real
numbers to demonstrate the applicability of the new results.