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Ali, M.A., Kara, H., Tariboon, J., Asawasamrit, S., Budak, H. and Hezenci, F. (2021) Some New Simpson’s-Formula-Type Inequalities for Twice-Differentiable Convex Functions via Generalized Fractional Operators. Symmetry, 13, Article No. 2249.
https://doi.org/10.3390/sym13122249
has been cited by the following article:
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TITLE:
Some Parameterized Simpson-Mercer Type Inequalities for General Fractional Operators
AUTHORS:
Jen Chieh Lo
KEYWORDS:
Simpson-Mercer-Type Inequalities, Integral Inequalities, Fractional Calculus, Convex Functions
JOURNAL NAME:
Advances in Pure Mathematics,
Vol.16 No.3,
March
23,
2026
ABSTRACT: This paper establishes new parameterized Simpson Mercer-type inequalities for functions of two variables within the framework of generalized fractional integral operators. By deriving novel integral identities for twice partially differentiable mappings, we provide several generalized forms for free parameters. Our results extend and unify a wide range of existing fractional integral inequalities, including those based on the Riemann-Liouville, k-Riemann-Liouville, and other fractional operators. These findings enrich the theory of integral inequalities and offer new tools for applications in convex analysis, numerical integration, and fractional calculus.