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/418304/10954425
m gycall.m
function Gycall(a)
global Bus DAE
if ~a.n, return, end
V = DAE.V(a.bus);
DAE.J22 = DAE.J22 + sparse(a.bus,a.bus,-2*a.Be.*V,Bus.n,Bus.n);
www.eeworm.com/read/418304/10954485
m glambda.m
function glambda(p,lambda)
global DAE Bus
if ~p.n, return, end
DAE.gp = sparse(p.bus,1,lambda*p.con(:,3),Bus.n,1) + DAE.gp;
DAE.gq = sparse(p.bus,1,lambda*p.con(:,4),Bus.n,1) + DAE.gq;
www.eeworm.com/read/418304/10954507
m glcall.m
function Glcall(p)
global DAE Bus
if ~p.n, return, end
DAE.Gl = DAE.Gl + sparse(p.bus,1,p.con(:,3),2*Bus.n,1);
DAE.Gl = DAE.Gl + sparse(p.bus+Bus.n,1,p.con(:,4),2*Bus.n,1);
www.eeworm.com/read/418304/10954758
m fm_busfreq.m
function fm_busfreq(flag)
%FM_BUSFREQ defines bus frequency measurement
%
%
%Author: Federico Milano
%Date: 19-Dec-2003
%Version: 1.0.0
%
%E-mail: fmilano@thunderbox.uwaterloo.ca
%Web-si
www.eeworm.com/read/418304/10954804
m fm_lf.m
function fm_lf(flag)
% FM_LF compute power flow equations and Jacobian for
% transmission lines.
%
% FM_LF(FLAG)
% FLAG = 1: power flow equations
% FLAG = 2: power flow Jacobian matrix
www.eeworm.com/read/418304/10955070
m fm_sssc.m
function fm_sssc(flag)
% FM_SSSC define Static Synchronous Series Compensators - SSSC
%
% FM_SSSC(FLAG)
% FLAG = 1 algebraic equations
% FLAG = 2 algebraic Jacobians
% FLAG = 3 diffe
www.eeworm.com/read/418304/10955119
m glambda.m
function glambda(p,lambda,kg)
global DAE Bus
if ~p.n, return, end
DAE.gp = DAE.gp - sparse(p.bus,1,(lambda+kg*p.con(:,15)).*p.con(:,3),Bus.n,1);
www.eeworm.com/read/418304/10955137
m glcall.m
function Glcall(p)
global DAE Bus
if ~p.n, return, end
DAE.Gl = DAE.Gl - sparse(p.bus,1,p.con(:,3),2*Bus.n,1);
www.eeworm.com/read/418304/10955139
m gkcall.m
function Gkcall(p)
global DAE Bus
if ~p.n, return, end
DAE.Gk = DAE.Gk - sparse(p.bus,1,p.con(:,15).*p.con(:,3),2*Bus.n,1);
www.eeworm.com/read/418304/10955217
m fm_upfc.m
function fm_upfc(flag)
% FM_UPFC define Unified Power Flow Controller - UPFC
%
% FM_UPFC(FLAG)
% FLAG = 1 algebraic equations
% FLAG = 2 algebraic Jacobians
% FLAG = 3 differential