Refinements of Ostrowski Type Integral Inequalities Involving Atangana-Baleanu Fractional Integral Operator

In this article, first, we deduce an equality involving the Atangana-Baleanu (AB)-fractional integral operator. Next, employing this equality, we present some novel generalization of Ostrowski type inequality using the Holder inequality, the power-mean inequality, Young's inequality, and the Jensen integral inequality for the convexity of |Upsilon|. We also deduced some new special cases from the main results. There exists a solid connection between fractional operators and convexity because of their fascinating properties in the mathematical sciences. Scientific inequalities of this nature and, particularly, the methods included have applications in different fields in which symmetry plays a notable role. It is assumed that the results presented in this article will show new directions in the field of fractional calculus.

Automated summary

This article deduces an equality involving the AB-fractional integral operator and presents novel generalizations of Ostrowski type inequality regarding convexity using various inequalities. There is a solid connection between fractional operators and convexity, with applications in different fields where symmetry plays a notable role. The results in this article are expected to guide new directions in the field of fractional calculus.