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- Title
Fractional Hermite–Hadamard-Type Inequalities for Differentiable Preinvex Mappings and Applications to Modified Bessel and q-Digamma Functions.
- Authors
Tariq, Muhammad; Ahmad, Hijaz; Shaikh, Asif Ali; Ntouyas, Sotiris K.; Hınçal, Evren; Qureshi, Sania
- Abstract
The theory of convexity pertaining to fractional calculus is a well-established concept that has attracted significant attention in mathematics and various scientific disciplines for over a century. In the realm of applied mathematics, convexity, particularly in relation to fractional analysis, finds extensive and remarkable applications. In this manuscript, we establish new fractional identities. Employing these identities, some extensions of the fractional H-H type inequality via generalized preinvexities are explored. Finally, we discuss some applications to the q-digamma and Bessel functions via the established results. We believe that the methodologies and approaches presented in this work will intrigue and spark the researcher's interest even more.
- Subjects
BESSEL functions; FRACTIONAL calculus; RESEARCH personnel; MATHEMATICS; CONVEX functions; DIFFERENTIABLE dynamical systems
- Publication
Mathematical & Computational Applications, 2023, Vol 28, Issue 6, p108
- ISSN
1300-686X
- Publication type
Article
- DOI
10.3390/mca28060108