代码搜索:sparse
找到约 3,324 项符合「sparse」的源代码
代码结果 3,324
www.eeworm.com/read/235612/14060201
m event_diph2.m
function amat=event_diph2(amat,t,x,v,x0,x1,z0,ndelx,theta,amp,flag,noversamp)
% EVENT_DIPH2: construct a dipping event with sparse diffraction superposition
%
% amat=event_diph(amat,t,x,v,x0,x1,z0,
www.eeworm.com/read/431224/8697718
m gcall.m
function gcall(a)
global DAE
if ~a.n, return, end
T = DAE.x(a.T);
x = DAE.x(a.x);
G = DAE.y(a.G);
V = DAE.y(a.vbus);
Kp = a.con(:,3);
Tref = a.con(:,8);
G_max = a.con(:,9);
DAE.g = DAE.g + sparse(
www.eeworm.com/read/384940/8831470
m gcall.m
function gcall(a)
global DAE
if ~a.n, return, end
T = DAE.x(a.T);
x = DAE.x(a.x);
G = DAE.y(a.G);
V = DAE.y(a.vbus);
Kp = a.con(:,3);
Tref = a.con(:,8);
G_max = a.con(:,9);
DAE.g = DAE.g + sparse(
www.eeworm.com/read/11139/198246
entries
/15-15-medium-mica2-grid.txt/1.2/Wed Jul 12 17:02:40 2006//
/15-15-sparse-mica2-grid.txt/1.2/Wed Jul 12 17:02:40 2006//
/15-15-tight-mica2-grid.txt/1.2/Wed Jul 12 17:02:40 2006//
/layout.py/1.2/Wed
www.eeworm.com/read/445149/6339691
m fit_2.m
%function
clc;clear;
tic;
starttime=datestr(now)
m0=5;m=5;
t=1500;
N=2000;
%t1=5;t2=95;
A=sparse([]);
node1_degree=zeros(1,m0);
node2_degree=zeros(1,N);
%先生成全耦合网络
for i=1:m0
for j=1:
www.eeworm.com/read/4799/40868
cpp stdafx.cpp
// stdafx.cpp : 只包括标准包含文件的源文件
// sparse_correspondence_and_reconstruction_unrectify.pch 将作为预编译头
// stdafx.obj 将包含预编译类型信息
#include "stdafx.h"
// TODO: 在 STDAFX.H 中
// 引用任何所需的附加头文件,而不是在此文件中引用
www.eeworm.com/read/383940/2605774
entries
/15-15-medium-mica2-grid.txt/1.2/Wed Jul 12 17:02:40 2006//
/15-15-sparse-mica2-grid.txt/1.2/Wed Jul 12 17:02:40 2006//
/15-15-tight-mica2-grid.txt/1.2/Wed Jul 12 17:02:40 2006//
/layout.py/1.2/Wed Ju
www.eeworm.com/read/255941/12045683
m cex_main.m
Num_x=69;
Num_y=81;
N=Num_x*Num_y;
lembda=1.55;
k_=2*pi/lembda;
C_ex=sparse(N,N);
Cex_temp=zeros(1,5);
j=0;
for m=1:1:Num_x
for n=1:1:Num_y
boundary_b=0; %是否是边界,0 不是;1 是普通边
www.eeworm.com/read/255941/12045687
m cey_main.m
Num_x=69;
Num_y=81;
N=Num_x*Num_y;
lembda=1.55;
k_=2*pi/lembda;
C_ey=sparse(N,N);
Cey_temp=zeros(1,5);
j=0;
for m=1:1:Num_x
for n=1:1:Num_y
boundary_b=0; %是否是边界,0 不是;1 是普通边
www.eeworm.com/read/297831/7993115
m random_walk.m
clear all;
r(001,002)=1;
r(002,003)=1;
r(3,5)=4;
r(5,7)=1;
r(3,4)=1;
r(4,6)=2;
r=0-r
g=1./r
%g_temp=g