Fractional derivatives of constant and variable orders applied to anomalous relaxation models in heat transfer problems

Yang Xiao-Jun

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Fractional derivatives of constant and variable orders applied to anomalous relaxation models in heat transfer problems

机译：恒定和可变阶数的分数导数应用于传热问题的异常弛豫模型

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In this paper, we address a class of the fractional derivatives of constant and variable orders for the first time. Fractional-order relaxation equations of constants and variable orders in the sense of Caputo type are modeled from mathematical view of point. The comparative results of the anomalous relaxation among the various fractional derivatives are also given. They are very efficient in description of the complex phenomenon arising in heat transfer.

机译：在本文中，我们首次讨论了一类恒定和可变阶的分数导数。从Caputo类型的意义上讲，常数和变量阶的分数阶松弛方程是从数学观点出发建模的。还给出了各种分数导数之间异常弛豫的比较结果。它们对于描述传热中产生的复杂现象非常有效。

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《Thermal science》 |2017年第3期|共11页
作者
Yang Xiao-Jun;
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中图分类热力工程、热机;
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Fractional derivatives of constant and variable orders applied to anomalous relaxation models in heat transfer problems

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