Integral Inequalities and Differential Equations via Fractional Calculus

Functional Calculus Pub Date : 2020-02-12 DOI:10.5772/intechopen.91140

Z. Dahmani, Meriem Mansouria Belhamiti

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引用次数: 3

Abstract

In this chapter, fractional calculus is used to develop some results on integral inequalities and differential equations. We develop some results related to the Hermite-Hadamard inequality. Then, we establish other integral results related to the Minkowski inequality. We continue to present our results by establishing new classes of fractional integral inequalities using a family of positive functions; these classes of inequalities can be considered as generalizations of order n for some other classical/fractional integral results published recently. As applications on inequalities, we generate new lower bounds estimating the fractional expectations and variances for the beta random variable. Some classical covariance identities, which correspond to the classical case, are generalised for any α ≥ 1, β ≥ 1. For the part of differential equations, we present a contribution that allow us to develop a class of fractional chaotic electrical circuit. We prove recent results for the existence and uniqueness of solutions for a class of Langevin-type equation. Then, by establishing some sufficient conditions, another result for the existence of at least one solution is also discussed.

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分数阶微积分中的积分不等式和微分方程

在这一章中，分数阶微积分被用来发展关于积分不等式和微分方程的一些结果。我们得到了有关Hermite-Hadamard不等式的一些结果。然后，我们建立了与闵可夫斯基不等式相关的其他积分结果。我们继续用一组正函数建立了一类新的分数阶积分不等式来展示我们的结果;这类不等式可以看作是最近发表的一些经典/分数阶积分结果的n阶推广。作为不等式的应用，我们生成了估计beta随机变量分数期望和方差的新下界。对任意α≥1，β≥1的经典协方差恒等式进行了推广。对于微分方程的部分，我们提出了一个贡献，使我们能够开发一类分数阶混沌电路。证明了一类朗格万型方程解的存在唯一性。然后，通过建立一些充分条件，讨论了至少有一个解存在的另一个结果。

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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Functional Calculus

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