VARIATIONAL PRINCIPLE OF THE 2-D STEADY-STATE CONVECTION-DIFFUSION EQUATION WITH FRACTAL DERIVATIVES

被引：0

作者：

LI, Xiumei ^{[1
]}

Ling, Weiwei ^{[1
,2
]}

Xiao, Wenbo ^{[1
]}

Zhan, Zhiliang ^{[1
]}

Zou, Feng ^{[1
]}

机构：

[1] Jiangxi Coll Appl Technol, Coll Social Management, Ganzhou, Jiangxi, Peoples R China

[2] Cent South Univ, Sch Math & Stat, Changsha, Hunan, Peoples R China

来源：

THERMAL SCIENCE | 2023年 / 27卷 / 3A期

关键词：

the convection-diffusion equation; He's fractal derivatives; two-scale transform; fractal variational formulation; MODEL; TRANSPORT; SYSTEM;

D O I：

10.2298/TSCI2303049L

中图分类号：

O414.1 [热力学];

学科分类号：

摘要：

The convection-diffusion equation describes a convection and diffusion process, which is the cornerstone of electrochemistry. The process always takes place in a porous medium or on an uneven boundary, and an abnormal diffusion occurs, which will lead to deviations in prediction of the convection-diffusion process. To overcome the problem, a fractal modification is suggested to deal with the "ab-normal" problem, and a 2-D steady-state convection-diffusion equation with fractal derivatives in the fractal space is established. Furthermore, its fractal variational principle is obtained by the semi-inverse method. The fractal varia-tional formula can not only provide the conservation law in the fractal space in the form of energy, but also give the possible solution structure of the equation.

引用

页码：2049 / 2055

页数：7

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