A Study on the Modified Form of Riemann-Type Fractional Inequalities via Convex Functions and Related Applications

Samraiz, Muhammad; Malik, Maria; Saeed, Kanwal; Naheed, Saima; Etemad, Sina; Sen, Manuel De la; Rezapour, Shahram

doi:10.3390/sym14122682

Symmetry

2022

DOI: 10.3390/sym14122682

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A Study on the Modified Form of Riemann-Type Fractional Inequalities via Convex Functions and Related Applications

Muhammad Samraiz

Maria Malik

Kanwal Saeed

et al.

Abstract: In this article, we provide constraints for the sum by employing a generalized modified form of fractional integrals of Riemann-type via convex functions. The mean fractional inequalities for functions with convex absolute value derivatives are discovered. Hermite–Hadamard-type fractional inequalities for a symmetric convex function are explored. These results are achieved using a fresh and innovative methodology for the modified form of generalized fractional integrals. Some applications for the results explo… Show more

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2023

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Some Milne’s rule type inequalities in quantum calculus

Sial,

Budak,

Ali

2023

Filomat

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The main goal of the current study is to establish some new Milne?s rule type inequalities for single-time differentiable convex functions in the setting of quantum calculus. For this, we establish a quantum integral identity and then we prove some new inequalities of Milne?s rule type for quantum differentiable convex functions. These inequalities are very important in Open-Newton?s Cotes formulas because, with the help of these inequalities, we can find the bounds of Milne?s rule for differentiable convex functions in classical or quantum calculus. The method adopted in this work to prove these inequalities are very easy and less conditional compared to some existing results. Finally, we give some mathematical examples to show the validity of newly established inequalities.

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Some Milne’s rule type inequalities in quantum calculus

Sial,

Budak,

Ali

2023

Filomat

View full text Add to dashboard Cite

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A Study on the Modified Form of Riemann-Type Fractional Inequalities via Convex Functions and Related Applications

Cited by 1 publication

References 30 publications

Some Milne’s rule type inequalities in quantum calculus

Some Milne’s rule type inequalities in quantum calculus

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