代码搜索:Scattering
找到约 189 项符合「Scattering」的源代码
代码结果 189
www.eeworm.com/read/121168/14767963
m mie_bistaic_far_scattering_dg.m
function Mie_bistaic_far_scattering()
%%本程序计算导体球的远场后向收发分置散射场
%%%%%%%%%%%%%%%%%%%%%%%%%%%%系统参数设置%%%%%%%%%%%%%%%%%%%%%%%%%
m=800+800*i;%%导体球的反射率
M=800;%%采样点数
% a=0.0745;%%球半径
a=0.0505;%%球半径
www.eeworm.com/read/241323/13156422
m contents.m
% SCHRODINGER TOOLBOX
% Version of April 1999
%==========================================================================
% is a toolbox of MATLAB files which which gives the neophyte
%
www.eeworm.com/read/343152/11968480
txt readme.txt
MiePlot v4.0
In 1908, Gustav Mie developed a rigorous method to calculate the intensity of light scattered by uniform spheres. Although Mie's solution was precise, it involved a huge number of cal
www.eeworm.com/read/241517/13137931
mcd uhf amplifier design using scattering parameters.mcd
www.eeworm.com/read/475381/6779140
pdf diversity in double-scattering mimo channels.pdf
www.eeworm.com/read/389832/8496559
m losstest.m
% MATLAB function losstest.m checks out whether
% or not a Q-port network is lossless. For that
% purpose, the network's Q-by-Q scattering matrix, S,
% must be specified.
% Invocation of function
www.eeworm.com/read/430775/8728866
m losstest.m
% MATLAB function losstest.m checks out whether
% or not a Q-port network is lossless. For that
% purpose, the network's Q-by-Q scattering matrix, S,
% must be specified.
% Invocation of function
www.eeworm.com/read/386752/8728894
m losstest.m
% MATLAB function losstest.m checks out whether
% or not a Q-port network is lossless. For that
% purpose, the network's Q-by-Q scattering matrix, S,
% must be specified.
% Invocation of function
www.eeworm.com/read/423357/10568868
m mie_rain1r.m
function result = Mie_rain1r(fGHz, TK, nsteps, dD)
% Comparison of Efficiencies of rain extinction, scattering, absorption
% backscattering and asymmetric scattering,
% between Mie and Rayl
www.eeworm.com/read/241323/13156356
m transm.m
%> The file calculates the transmission coefficient in 1D
%> potential scattering using the Numerov algorithm for integration.
%> The scattering potential is nonzero only on [0,1].
%> A