搜索资源列表
MATLAB_FDTD_SARY
- A SIMPLE BUT USFUL 2D FDTD MATLAB CODE3-USFUL 2D FDTD MATLAB CODE3
fdtd_2D_demo_v_1_1
- A SIMPLE BUT USFUL 2D FDTD MATLAB CODE4-USFUL 2D FDTD MATLAB CODE4
FDTDarithmeticprogrammingbasedonMATLABlanguag
- 介绍了时域有限差分(FDTD)法的基本原理,推导了二维TM模Yee算法的FDFD表达式,并结合算例阐述了基于MATLAB编程的基本方法-on the finite-difference time-domain (FDTD) method to the basic principles Derivation of 2D TM mode Yee's theorem expression, and explained with examples based on MATLAB programm
UPML_2D_TMmode
- 二维TM模电磁波FDTD仿真,UPML边界-2D TM electromagnetic FDTD simulation, UPML border
fdtd_planewave
- 二维fdtd程序,模拟TM波,平面波入射-2D fdtd procedures, simulated TM wave, the incident plane wave
FDTDUPML
- 二维FDTD算法,以UPML为边界条件,VC编的-2D FDTD method to UPML as boundary conditions, VC series
FDTD_for_2D_metal_plane_object
- FDTD for 2D metal plane object, It is very valuable reference because is the basement for 3D FDTD program.
2dfdtd2c
- 一个很好的关于2D FDTD的C源代码,适合初学者下载学习
fd2d_3.1
- 2D TM program FDTD fd2d_3.1.c
Taflove_FDTD
- taflov所写的关于FDTD书中的完整程序,包含有1D,2D,3D的完整例子,对初学者非常的有用。
adifdtd1
- 2D ADI FDTD code.采用不同的三对角矩阵解法
2dFDTD
- % A MATLAB implementation of the 2D FDTD theory for scattering off a PEC cylinder,
TafloveFDTD
- Taflove的FDTD书附带程序,1D,2D,3D
_matlab_FDTD-one_two_there.m
- 计算以为二维三维情况下波导的FDTD程序 为MATLAB格式 对初学者很有帮助-Calculations to 2D and 3D FDTD waveguide case procedures Very helpful for beginners to MATLAB format
FDFD_for_PCF_dispersion
- 用FDFD模拟光子晶体光纤的色散的程序,主程序为FDFD.m,计算色散的为dispersion.m-FDFD simulation of photonic crystal fibers with a dispersion of the process, the main program for the FDFD.m, calculated dispersion for dispersion.m
rcs_TE_TM
- 金属圆柱体的RCS散射,采用矩量法编写,在TE波和TM波的情况-Metal cylinder RCS scattering, using moment method to prepare, in the TE wave and TM wave of
Tiny_FDTD_v1
- coed FDTD in 2D gooooood
2D_photonic_crystals
- 用FDTD计算二维光子晶体带隙的Matlab的源程序-the calculation of band gap of 2D photonic crystals by Matlab language
2D_FDTD_CODE
- 2D FDTD simulation code-2D FDTD simulation code
2D_FDTD_scattering
- 2d fdtd it is the code that genarate the out put of the d dimentional systems