Liko, RozanaSrivastava, Hari M.Mohammed, Pshtiwan O.Kashuri, ArtionAl-Sarairah, EmanSahoo, Soubhagya K.Soliman, Mohamed S.2023-10-152023-10-1520222022Liko, R., Srivastava, H. M., Mohammed, P. O., Kashuri, A., Al-Sarairah, E., Sahoo, S. K., & Soliman, M. S. (2022). Parameterized Quantum Fractional Integral Inequalities Defined by Using n-Polynomial Convex Functions. Axioms, 11(12), 727. https://doi.org/10.3390/axioms11120727https://doi.org/10.3390/axioms11120727http://hdl.handle.net/1828/15511Convexity performs the appropriate role in the theoretical study of inequalities according to the nature and behaviour. There is a strong relation between symmetry and convexity. In this article, we consider a new parameterized quantum fractional integral identity. Following that, our main results are established, which consist of some integral inequalities of Ostrowski and midpoint type pertaining to n-polynomial convex functions. From our main results, we discuss in detail several special cases. Finally, an example and an application to special means of positive real numbers are presented to support our theoretical results.enOstrowski inequalityRiemann–Liouville q-fractional integralsq-Hölder’s inequalityq-power mean inequalityn-polynomial convex functionsspecial meansArticle