Fractional Heat Conduction in an Infinite Medium with a Spherical Inclusion

被引:28
|
作者
Povstenko, Yuriy [1 ,2 ]
机构
[1] Jan Dlugosz Univ Czestochowa, Inst Math & Comp Sci, PL-42200 Czestochowa, Poland
[2] European Univ Informat & Econ EWSIE, Dept Comp Sci, PL-03741 Warsaw, Poland
来源
ENTROPY | 2013年 / 15卷 / 10期
关键词
fractional calculus; non-Fourier heat conduction; fractional diffusion-wave equation; perfect thermal contact; Laplace transform; Mittag-Leffler function; Wright function; Mainardi function; ANOMALOUS DIFFUSION; ENTROPY; DYNAMICS; EQUATION; RELAXATION; TRANSPORT; TSALLIS;
D O I
10.3390/e15104122
中图分类号
O4 [物理学];
学科分类号
0702 ;
摘要
The problem of fractional heat conduction in a composite medium consisting of a spherical inclusion (0 < r < R) and a matrix (R < r < infinity) being in perfect thermal contact at r = R is considered. The heat conduction in each region is described by the time-fractional heat conduction equation with the Caputo derivative of fractional order 0 < alpha <= 2 and 0 < beta < 2, respectively. The Laplace transform with respect to time is used. The approximate solution valid for small values of time is obtained in terms of the Mittag-Leffler, Wright, and Mainardi functions.
引用
收藏
页码:4122 / 4133
页数:12
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