Advancements in Integral Inequalities Through Hattaf Fractional Operators

Gauhar  Rahman; Nabil  Mlaiki; Ahmad  Aloqaily; Muhammad  Samraiz; Çetin Yildiz

doi:10.37256/cm.6120256060

Advancements in Integral Inequalities Through Hattaf Fractional Operators

Authors

Gauhar Rahman Department of Mathematics and Statistics, Hazara University, Mansehra, Pakistan
Nabil Mlaiki Department of Mathematics and Sciences, Prince Sultan University, Riyadh, Saudi Arabia
Ahmad Aloqaily Department of Mathematics and Sciences, Prince Sultan University, Riyadh, Saudi Arabia
Muhammad Samraiz Department of Mathematics, University of Sargodha, Sargodha, Pakistan
Çetin Yildiz Department of Mathematics, K. K. Education Faculty, Atatürk University, Campus, Erzurum, Turkey

DOI:

https://doi.org/10.37256/cm.6120256060

Keywords:

young inequality, convex function, power-mean inequality, fractional operators

Abstract

In studies of inequality theory, integral identities are developed to support numerous inequalities. Various fractional integral and derivative operators have been employed recently to accomplish these identities. In this article, we first establish an integral identity by employing Hattaf fractional integral operators. Then, we use this identity to give some novel generalizations of integral inequalities for the convexity of |ℵ| using the Jensen integral inequality, Young's inequality, power-mean inequality, and Hölder inequality. The main motivating goal of this study is to use Hattaf-fractional integral operators with strong kernel structure to derive new and general form of integral inequalities.

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Published

2025-02-14

How to Cite

Rahman G, Mlaiki N, Aloqaily A, Samraiz M, Yildiz Çetin. Advancements in Integral Inequalities Through Hattaf Fractional Operators. Contemp. Math. [Internet]. 2025 Feb. 14 [cited 2025 Feb. 23];6(1):1110-26. Available from: https://ojs.wiserpub.com/index.php/CM/article/view/6060

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Issue

Contemporary Mathematics, Volume 6 Issue 1 (2025)

Section

Research Article

License

This work is licensed under a Creative Commons Attribution 4.0 International License.