SOC Constraint in cplexmiqcp
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Hi,
I am trying to solve a problem which has a second-order cone constraint as follow
The code that I have is:
Qij= cell(1,J);
for j=1:J
Q=zeros(I*J+3*J+J*K+1+I+J+I*J);
Q((j-1)*I+1:j*I,(j-1)*I+1:j*I)=diag(xinom);
Q(I*J+j,I*J+J+j)=-1;
Qij{j}=Q;
end
%l
l=[zeros(I*J+3*J+J*K+1+I,J);Gamma*eye(J);kron(eye(J),ones(I,1))];
%r
r=zeros(J,1);
The problem is with 'l', when it is zero, it works fine but when I put it as above it says that Q is not positive semi-definite.
Can anyone help me?
Thanks
4 Kommentare
Urmila Rajpurohith
am 20 Aug. 2019
Hi Nazanin
Can you provide the values of J,K,xinom and gamma which you are using for the above case.
Nazanin Madani
am 20 Aug. 2019
Urmila Rajpurohith
am 20 Aug. 2019
Provide K value.
Nazanin Madani
am 20 Aug. 2019
Antworten (1)
Urmila Rajpurohith
am 23 Aug. 2019
0 Stimmen
You mentioned that your code is working fine for I=0 but when I tried with I=0, I got the error:
Unable to perform assignment because the size of the left side is 0-by-0 and the size of the right side is 10-by-10
for the line:
Q((j-1)*I+1:j*I,(j-1)*I+1:j*I)=diag(xinom);
When I is not equal to 0, the determination of positive definiteness depends on the values provided as input. Try manually checking whether the matrix you obtain is positive semi definite or not.
1 Kommentar
Nazanin Madani
am 25 Aug. 2019
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