摘要
文章利用Runge-Kutta差分式对Laplace方程的二阶微分式进行了算法编程求数值解,并在屏幕上模拟输出了计算的曲面外形,它为进一步研究液面的物理特性奠定了基础,也为数值计算液体表面上的微观分子间相互作用的力学特性提供了方法。
In this paper the differential of Laplace equations has been calculated by program with Runge Kutta difference equations,and curved surface has been simulated in the computer monitor.The paper may provide the basis of studying physical features of liquid surface,and provide the method for culculating the mechnical features of liquid surface between the molecules.
出处
《合肥工业大学学报(自然科学版)》
CAS
CSCD
1998年第2期98-101,共4页
Journal of Hefei University of Technology:Natural Science
关键词
液面曲面
液体表面
外形
R-K差分法
liquid curved surface,Laplace differential,Runge Kutta difference equations,solution