Fractal-fractional estimations of Bullen-type inequalities with applications

Fractal-fractional estimations of Bullen-type inequalities with applications

The study of inequalities inside fractal domains has been stimulated by the growing interest in fractional calculus for the applied and mathematical sciences. This work uses extended fractional integrals in fractal domains to prove new Bullen-type inequalities for differentiable convex functions. By...

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Bibliographic Details
Main Authors: Saad Ihsan Butt, Muhammad Umar Yasin, Sanja Tipurić-Spužević, Bandar Bin-Mohsin
Format: Article
Language:English
Published: Elsevier 2024-12-01
Series:Ain Shams Engineering Journal
Subjects:
Extended fractal-fractional integral operators
Probability density functions
Bullen inequalities
Convex function
Optimise bounds
Quadrature formulas
Online Access:http://www.sciencedirect.com/science/article/pii/S2090447924004775
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Summary:The study of inequalities inside fractal domains has been stimulated by the growing interest in fractional calculus for the applied and mathematical sciences. This work uses extended fractional integrals in fractal domains to prove new Bullen-type inequalities for differentiable convex functions. By showing how these operators and inequalities can convert classical inequalities into fractal sets, it fills a vacuum in the literature on fractal-fractional integral inequalities. Using extended fractional integral operators, we derive new fractal-fractional estimates and Bullen-type inequalities, accompanied by thorough mathematical derivations and graphical validations. We show optimal results derived from new Bullen-type inequalities for fractal domains. We confirm our results with mathematical examples and graphs, improving models for complicated problems in fractal contexts. In particular, our findings have important ramifications for special means on fractal sets, probability density functions, and quadrature formulas, as well as for future study and applications.
ISSN:2090-4479

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