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multi_lrr_gpu.m
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multi_lrr_gpu.m
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function [ZZ,Z,E] = multi_lrr(X,lambda,alpha)
% implement the algorithm described in paper "Multi-task Low-rank Affinity Pursuit for Image Segmentation"
% for test use, hard code the affinity matrix number
k=size(X,1); % k*1 cell array, k views
[m,n]=size(X{1}); % every view has the same dimension
% initial matrix cell array
E=cell(k,1);
for i=1:k
E{i}=zeros(m,n);
end
J=cell(k,1);
for i=1:k
J{i}=zeros(n,n);
end
S=cell(k,1);
for i=1:k
S{i}=zeros(n,n);
end
Z=cell(k,1);
for i=1:k
Z{i}=zeros(n,n);
end
W=cell(k,1);
for i=1:k
W{i}=zeros(n,n);
end
Y=cell(k,1);
for i=1:k
Y{i}=zeros(m,n);
end
V=cell(k,1);
for i=1:k
V{i}=zeros(n,n);
end
ZZ=zeros(k,n*n);
% k's iteration vars
Ek=cell(k,1);
for i=1:k
Ek{i}=zeros(m,n);
end
Jk=cell(k,1);
for i=1:k
Jk{i}=zeros(n,n);
end
Sk=cell(k,1);
for i=1:k
Sk{i}=zeros(n,n);
end
Zk=cell(k,1);
for i=1:k
Zk{i}=zeros(n,n);
end
% parameters
mu=1e-6;
max_mu=10^10;
rho=1.9;
epsilon=1e-4;
epsilon2=1e-5; % must be small!
% pre caculate matrix value
xtx=cell(k,1);
for i=1:k
xtx{i}=X{i}'*X{i};
end
invx=cell(k,1);
for i=1:k
invx{i}=inv(xtx{i}+eye(n));
end
Xf=cell(k,1);
for i=1:k
Xf{i}=norm(X{i},'fro');
end
% the residual error and the error between Z,J,S
Xc=cell(k,1);
ZJc=cell(k,1);
ZSc=cell(k,1);
sv=cell(k,1);
for i=1:k
sv{i}=0;
end
svp=cell(k,1);
for i=1:k
svp{i}=0;
end
F=cell(k,1);
MAX_ITER=1000;
iter=0;
convergenced=false;
while ~convergenced
if iter>MAX_ITER
fprintf(1,'max iter num reached!\n');
break;
end
tic
% update J_i
for i=1:k
Jk{i}=J{i};
[JT,svpt]=singular_value_shrinkage_gpu(Z{i}+W{i}/mu,1/mu);
% [JT,svpt]=singular_value_shrinkage(Z{i}+W{i}/mu,1/mu);
J{i}=JT;
svp{i}=svpt;
end
t=toc;
fprintf(1,'singular_value_shrinkage takes %f\n',t);
% update S_i
tic
for i=1:k
Sk{i}=S{i};
S{i}=invx{i}*(xtx{i}-X{i}'*E{i}+Z{i}+(X{i}'*Y{i}+V{i}-W{i})/mu);
end
t=toc;
fprintf(1,'update S takes %f\n',t);
% update Z
for i=1:k
Zk{i}=Z{i};
F{i}=(J{i}+S{i}-(W{i}+V{i})*mu)/2;
end
M=[];
for i=1:k
M=[M;reshape(F{i}',1,n*n)];
end
% update ZZ
ZZ=l21(M,alpha/(2*mu));
% update Z_i
for i=1:k
Zk{i}=Z{i};
Z{i}=reshape(ZZ(i,:),n,n)';
end
% update E_i
for i=1:k
Ek{i}=E{i};
E{i}=l21(X{i}-X{i}*S{i}+Y{i}/mu,lambda/(2*mu)); % bug fixed, parameter should be lambda/(2*mu), not lambda/mu
end
for i=1:k
Xc{i}=X{i}-X{i}*S{i}-E{i};
ZJc{i}=Z{i}-J{i};
ZSc{i}=Z{i}-S{i};
end
% check convergence
% find the max error in multi views
vals=zeros(k,1);
for i=1:k
vals(i)=norm(Xc{i},'fro')/Xf{i};
end
changeX=max(vals);
for i=1:k
vals(i)=norm(ZJc{i},'fro')/Xf{i};
end
changeZJ=max(vals);
for i=1:k
vals(i)=norm(ZSc{i},'fro')/Xf{i};
end
changeZS=max(vals);
for i=1:k
vals(i)=norm(Zk{i}-Z{i},'fro')/Xf{i};
end
changeZ=max(vals);
for i=1:k
vals(i)=norm(Jk{i}-J{i},'fro')/Xf{i};
end
changeJ=max(vals);
for i=1:k
vals(i)=norm(Sk{i}-S{i},'fro')/Xf{i};
end
changeS=max(vals);
for i=1:k
vals(i)=norm(Ek{i}-E{i},'fro')/Xf{i};
end
changeE=max(vals);
tmp=[changeZ changeJ changeS changeE ];
gap=mu*max(tmp);
if mod(iter,50)==0
fprintf(1,'===========================================================================================================\n');
fprintf(1,'gap between two iteration is %f,mu is %f\n',gap,mu);
fprintf(1,'iter %d,mu is %f,ResidualX is %f,changeZJ is %f,changeZS is %f\n',iter,mu,changeX,changeZJ,changeZS);
for i=1:k
fprintf(1,'svp%d %d,',i,svp{i});
end
fprintf(1,'\n');
end
% if changeX <= epsilon && changeZJ <= epsilon && changeZS <= epsilon
if changeX <= epsilon && gap <=epsilon2 && changeZJ <= epsilon && changeZS <= epsilon
convergenced=true;
fprintf(2,'convergenced, iter is %d\n',iter);
fprintf(2,'iter %d,mu is %f,ResidualX is %f,changeZJ is %f,changeZS is %f\n',iter,mu,changeX,changeZJ,changeZS);
for i=1:k
fprintf(1,'svp%d %d,',i,svp{i});
end
fprintf(1,'\n');
end
% update multipliers
for i=1:k
Y{i}=Y{i}+mu*Xc{i};
end
for i=1:k
W{i}=W{i}+mu*ZJc{i};
end
for i=1:k
V{i}=V{i}+mu*ZSc{i};
end
% update parameters
if gap < epsilon2
mu=min(rho*mu,max_mu);
end
iter=iter+1;
end