分数积分不等式的误差边界及其应用

IF 3.6 2区数学 Q1 MATHEMATICS, INTERDISCIPLINARY APPLICATIONS

Fractal and Fractional Pub Date : 2024-04-02 DOI:10.3390/fractalfract8040208

Nouf Abdulrahman Alqahtani, S. Qaisar, Arslan Munir, Muhammad Naeem, Hüseyin Budak

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引用次数: 0

摘要

分数微积分是一个用来获得一些著名积分不等式新变体的概念。在本研究中，我们的主要目标是通过使用可微分函数建立新的分式赫米特-哈达马德和辛普森类型估计。此外，我们还证明了一类新的分数积分，它与一阶可微凸函数的著名分数算子（Caputo-Fabrizio）有关。然后，考虑到这一等式的辅助结果，提出了对 Hermite-Hadamard 和 Simpson 型不等式的一些新估计，并将其作为一般化。此外，还得到了凹函数的一些不等式。我们注意到，新建立的结果是对文献中已有的类似不等式的扩展。此外，我们还讨论了特殊手段、矩阵不等式和 q-digamma 函数的应用。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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Error Bounds for Fractional Integral Inequalities with Applications

Fractional calculus has been a concept used to obtain new variants of some well-known integral inequalities. In this study, our main goal is to establish the new fractional Hermite–Hadamard, and Simpson’s type estimates by employing a differentiable function. Furthermore, a novel class of fractional integral related to prominent fractional operator (Caputo–Fabrizio) for differentiable convex functions of first order is proven. Then, taking this equality into account as an auxiliary result, some new estimation of the Hermite–Hadamard and Simpson’s type inequalities as generalization is presented. Moreover, few inequalities for concave function are obtained as well. It is observed that newly established outcomes are the extension of comparable inequalities existing in the literature. Additionally, we discuss the applications to special means, matrix inequalities, and the q-digamma function.

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来源期刊

Fractal and Fractional MATHEMATICS, INTERDISCIPLINARY APPLICATIONS-

CiteScore

4.60

自引率

18.50%

发文量

632

审稿时长

11 weeks

期刊介绍： Fractal and Fractional is an international, scientific, peer-reviewed, open access journal that focuses on the study of fractals and fractional calculus, as well as their applications across various fields of science and engineering. It is published monthly online by MDPI and offers a cutting-edge platform for research papers, reviews, and short notes in this specialized area. The journal, identified by ISSN 2504-3110, encourages scientists to submit their experimental and theoretical findings in great detail, with no limits on the length of manuscripts to ensure reproducibility. A key objective is to facilitate the publication of detailed research, including experimental procedures and calculations. "Fractal and Fractional" also stands out for its unique offerings: it warmly welcomes manuscripts related to research proposals and innovative ideas, and allows for the deposition of electronic files containing detailed calculations and experimental protocols as supplementary material.