搜索资源列表
mesh
- 网格划分程序,差分格式,非常好用-Meshing procedure
40intermethods
- 40种差分方法,〖推荐〗40种常用差分格式的源代码(Fortran语言),附说明-40interpeter method s
warmingbeam
- 利用warming-beam差分格式求解一维激波管问题-Use warming-beam difference scheme for solving one-dimensional shock tube problem
0002
- 用c++实现的差分格式求解微分方程。两点边值问题的差分格式- yong chafen geshi shijiande qiujie weifenfangcheng
p1ds
- 一个一维对流扩散问题的数值计算 ,对流项采用UDS或CDS差分格式,扩散项采用CDS差分格式-This program solves the one-dimensional convection-diffusion equation with Dirichlet boundary conditionson both ends. The exact solution is compared with solutions obtaine
wudianchafengeshi
- 给出了二维泊松方程在单位正方形上的五点差分格式。并运用线性方程组的古典迭代解法——Jacobi迭代求解出在区域上的数值解。最终绘制数值解的图形。-For two at a loose equation in a unit of the square to five o clock. the format and use of linear equations that of classical iterative solution —
NonlinearAdvectionSI
- 用于解算一维非线性平流扩散方程的半隐式差分格式算法-Computing the numerical solution of nonlinear advection equation via a semi-implicit scheme.
ch11soft
- 继续刚刚的40种常用差分格式的源代码,希望有人需要-cfgs
PROGRAM2
- 继续刚刚的40种常用差分格式的源代码,希望有人需要-cfgs
ch4soft
- 40种常用差分格式的源代码,不知道有没有上传过了-chafengeshi
ch5soft
- 继续刚刚的40种常用差分格式的源代码,希望有人需要-chafengeshi
ch8soft
- 继续刚刚的40种常用差分格式的源代码,希望有人需要-cfgs
ch17soft
- 继续刚刚的40种常用差分格式的源代码,希望有人需要-cfgs
PROGRAM1
- 继续刚刚的40种常用差分格式的源代码,希望有人需要-cfgs
ch23soft
- 继续刚刚的40种常用差分格式的源代码,希望有人需要-cfgs
Five-pointdifferenceschemewithellipticequationssol
- 用五点差分格式解椭圆型方程,微分方程数值解大作业-Five-point difference scheme with the solution equation, numerical solution of differential equations large operations
chafen
- 四十三种差分格式,见证了CFD的发展历程!-Forty-three kinds of difference scheme, witness the development process of CFD!
one_hyperbolic2
- 求解一维双曲方程。空间方向采用四阶差分格式,时间方向采用bvm法-Solving one-dimensional hyperbolic equation. Spatial orientation difference scheme with fourth order, the time direction by bvm method
one_possion1
- 求解一维热方程。空间方向采用四阶差分格式,时间方向采用bvm法-Solving one-dimensional heat equation. Spatial orientation difference scheme with fourth order, the time direction by bvm method
one_possion3
- 求解一维热方程。空间方向采用四阶差分格式,时间方向采用向后euler法和时间积分法-Solving one-dimensional heat equation. Spatial orientation difference scheme with fourth order, the time direction by backward euler method and time integration method