# How to implement regularized least squares in matlab

I am trying to implement in Matlab the paper Reducing boundary artifacts in image deconvolution available here.

The problem I am running into is that I don't know how to implement in matlab the regularized least square problem described in the paper.

Can anyone give me some suggestions? Until now I found the lasso function in matlab but I am not sure this is what I need. Thank you.

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Try to formulate it in matrix form like `min(|| X*w - Y || + k*||w||)`, etc... – Serg Jan 9 '14 at 18:38

``````A=double(A);
[M,N]=size(A);
Dm=eye(M);
Dn=eye(N);
Dxx=diff(Dm,2,1); % 2nd derivative
Dyy=diff(Dn,2,1);
LA=kron(Dxx,Dn)+kron(Dm,Dyy); %Laplacian operator

I=eye(M*N);
A1=zeros(size(A));
A1(1:alpha,:)=1;  % alpha in formula (1) and (2) from paper, boundary margin
A1(M-alpha:M,:)=1;
B1=zeros(size(B));     % B is A' in the formula
B1(1:alpha,:)=1;
B1(M:M+alpha,:)=1;   % B1 is A-A', boundary elements padded as the paper shows

H=[LA;sqrt(lambda)*I(A1,:)];  % consolidate the laplacian operator in the 1st part and the norm in the 2nd part
y=[zeros(size(LA,1),1);B(B1)]; % convert the original problem to a matrix equation Hx=y
X=reshape(H\y, M,N);
``````
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There is an error on the second line after A1 is defined. Could you also explain the code, please? – catalaur Jan 9 '14 at 19:18
Thank you catalaur. Code corrected now. – lennon310 Jan 9 '14 at 19:21
I converted the optimization form to a matrix equation. Basically if you are trying to optimize |ax-b|^2+|cx-d|^2, you are equivalently solving [a;c]x = [b;d]. That's how H and y are formed in the code. The boundary subtraction may be revised further (perhaps after better understanding of the paper), but the basic method that handle optimization as a matrix equation form is presented – lennon310 Jan 9 '14 at 19:22
Another question: who is Im and In (did you mean Dm and Dn) ? – catalaur Jan 9 '14 at 19:31
correct, updated – lennon310 Jan 9 '14 at 19:32