数学物理方程中的极值原理——具有斜导数边界条件的椭圆方程
The Maximum Principles of Differential Equations in Mathematical Physics—Elliptic Equations with Oblique Derivative Boundary Condition
DOI: 10.12677/pm.2024.146242, PDF,   
作者: 马 雷:上海理工大学理学院,上海
关键词: 椭圆方程斜导数极值原理Elliptic Equations Oblique Derivative The Maximum Principle
摘要: 极值原理则是研究椭圆型偏微分方程的重要工具之一。椭圆方程的极值原理多数情况下都是在狄利克雷边界条件下得出的。本文在此基础上,首先对斜导数边界进行了说明,接着又对一般情形的极值原理进行简单概括,最后得出了带有斜导数边界条件椭圆方程的极值原理。
Abstract: The maximum principle is one of the important tools for studying elliptic partial differential equations. In most situations, the maximum principle is derived under the Dirichlet boundary conditions. This paper considers the oblique derivative boundary conditions. Firstly, we explain the oblique derivative boundary. Then the general maximum principle is introduced. Finally, we obtain the maximum principle with the oblique derivative boundary condition for elliptic.
文章引用:马雷. 数学物理方程中的极值原理——具有斜导数边界条件的椭圆方程[J]. 理论数学, 2024, 14(6): 218-223. https://doi.org/10.12677/pm.2024.146242

参考文献

[1] 齐民友, 吴方同. 广义函数与数学物理方程[M]. 第2版. 北京: 高等教育出版社, 1989: 90-95.
[2] 保继光. 非线性椭圆方程改进的极值原理[J]. 北京师范大学学报(自然科学版), 2000, 36(5): 574-578.
[3] 丁俊堂. 一类非线性散度形椭圆方程的最大值原理[J]. 数学的实践与认识, 2002, 32(1): 114-121.
[4] Gilbarg, D. and Trudinger, N.S. (2003) Elliptic Partial Differential Equations of Second Order. World Publishing Corporation, 32-36.
[5] Evans, L.C. (2017) Partial Differential Equations. 2nd Edition, Higher Education Press, 334-347.
[6] 华东师范大学数学系. 数学分析: 下册[M]. 第5版. 北京: 高等教育出版社, 2001: 118-136.

为你推荐