可合分数阶微积分的经典性质

IF 0.2 Q4 MATHEMATICS
M Musraini, R. Efendi, Endang Lily, Ponco Hidayah
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引用次数: 7

摘要

近年来,引入了一种经典微积分形式的分数的定义,称为适形分数微积分。符合分数阶微积分概念的主要思想是如何确定有理数或实数的分数阶导数和积分。本研究中使用的符合分数阶微积分最流行的定义之一是由Katugampola定义的。这个定义满足经典微积分中有关可适分数阶导数和可适分数阶积分的某些方面。在适形分数阶导数的分支中,给出了分数阶导数在商性质、乘积性质和Rolle定理中的一些附加结果。给出了在经典微积分中的应用,如确定函数单调性。然后,在分数阶积分的情况下,这个定义表明分数阶导数和分数阶积分是互为逆的。在可调分数阶积分上也满足一些经典积分性质。此外,本研究还表明分数阶积分作为和的极限。然后给出了分数阶积分的比较性质。最后,中值定理和第二中值定理也适用于分数阶积分。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Classical Properties on Conformable Fractional Calculus
Recently, a definition of fractional which refers to classical calculus form called conformable fractional calculus has been introduced. The main idea of the concept of conformable fractional calculus is how to determine the derivative and integral with fractional order either rational numbers or real numbers. One of the most popular definitions of conformable fractional calculus is defined by Katugampola which is used in this study. This definition satisfies in some respects of classical calculus involved conformable fractional derivative and conformable fractional integral. In the branch of conformable fractional derivatives, some of the additional results such as analysis of fractional derivative in quotient property, product property and Rolle theorem are given. An application on classical calculus such as determining monotonicity of function is also given. Then, in the case of fractional integral, this definition showed that the fractional derivative and the fractional integral are inverses of each other. Some of the classical integral properties are also satisfied on conformable fractional integral. Additionally, this study also has shown that fractional integral acts as a limit of a sum. After that, comparison properties on fractional integral are provided. Finally, the mean value theorem and the second mean value theorem are also applicable for fractional integral.
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来源期刊
CiteScore
0.60
自引率
0.00%
发文量
2
期刊介绍: The “Italian Journal of Pure and Applied Mathematics” publishes original research works containing significant results in the field of pure and applied mathematics.
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