2) fractional diffusion equation
分数阶扩散方程
1.
Solution of semiboundless mixed problem of fractional diffusion equation;
分数阶扩散方程半无界混合问题的解
2.
In this paper, our work is focused on the theoretical investigation and numericalcomputation of the fractional diffusion equations (FDEs), which are of interest not onlyin their own right, but also in that they constitute the principal parts in many otherFPDEs.
本文从理论和数值计算两方面对分数阶扩散方程(FDEs)及其相关问题进行深入研究,主要内容包括以下三个方面:我们引进了一类新的利用分数阶导数定义的分数阶空间,并证明了此类空间与传统的分数阶Sobolev空间在范数意义下是等价的。
3) fractional anomalous diffusion
分数阶反常扩散
4) fractional reaction-dispersion equation
分数阶反应-扩散方程
1.
In this paper,a time-fractional reaction-dispersion equation was considered which the first order derivative was replaced by a Caputo fractional derivative,and an implicit difference scheme was given.
本文考虑分数阶反应-扩散方程。
5) fractional diffusion-wave equation
分数阶扩散-波动方程
1.
Separation of variables method for fractional diffusion-wave equation with initial-boundary value problem in three dimensions;
分离变量法解三维的分数阶扩散-波动方程的初边值问题
2.
Mixed boundary value problems for the one-dimensional non-homogeneous fractional diffusion-wave equation;
求解一维非齐次分数阶扩散-波动方程的混合边值问题
6) Riesz space fractional diffusion equation
空间分数阶扩散方程
1.
In this paper a Riesz space fractional diffusion equation on a finite domain is considered.
在有限区域内考虑具有初边值问题的Riesz空间分数阶扩散方程,传统扩散方程中的二阶空间导数由Riesz分数阶导数α(1<α≤2)代替就得到Riesz空间分数阶扩散方程。
补充资料:分数阶积分与微分
分数阶积分与微分
og fractional integration and differentia-
分数阶积分的逆运算称为分数阶微分:若几介F,则f为F的:阶分数阶导数(na ctional deriVative).若0<戊
说明:补充资料仅用于学习参考,请勿用于其它任何用途。
参考词条