局部分数自然变换及其在康托尔集微分方程中的应用

D. Ziane, M. Cherif
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引用次数: 0

摘要

我们在本文中所做的工作是局部分数导数与自然变换(我们可以称之为局部分数自然变换)之间的耦合方法,我们在本文中提供了一些基本结果和性质。我们将这种方法应用于康托尔集上的一些线性局部分数微分方程,得到了无差异解。结果表明,当我们将该变换与该算子结合时,它是有效的。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
The local fractional natural transform and its applications to differential equations on Cantor sets
The work that we have done in this paper is the coupling method between the local fractional derivative and the Natural transform (we can call it the local fractional Natural transform), where we have provided some essential results and properties. We have applied this method to some linear local fractional differential equations on Cantor sets to get nondifferentiable solutions. The results show this transform’s effectiveness when we combine it with this operator.
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