卡普托分数阶导数不等式的$(h-m)$-凸性

IF 0.4 Q4 MATHEMATICS Journal of Mathematical Extension Pub Date : 2020-06-23 DOI:10.30495/JME.V0I0.1349

G. Farid, V. Mishra

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引用次数: 1

摘要

本研究的目的是建立一些新的Caputo分数积分不等式。应用$（h-m）$凸性的定义和一些直接不等式，建立了左、右侧Caputo分式导数之和的上界。此外，还分析了一个模不等式和一个Hadamard型不等式。这些结果为所有可从$（h-m）$凸性推导的特定函数提供了各种分式不等式，参见Remark\ref{rem1}。

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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Caputo fractional derivative inequalities via $(h-m)$-convexity

The aim of this study is to establish some new Caputo fractional integral inequalities. By applying definition of $(h-m)$-convexity and some straightforward inequalities an upper bound of the sum of left and right sided Caputo fractional derivatives has been established. Furthermore, a modulus inequality and a Hadamard type inequality have been analyzed. These results provide various fractional inequalities for all particular functions deducible from $(h-m)$-convexity, see Remark \ref{rem1}.

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Journal of Mathematical Extension MATHEMATICS-

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审稿时长

24 weeks