solve an inequality with LMI approach

1 Feb. 2014
1 Respuesta
Actualizado a las 5 Feb. 2014
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I would like to solve this inequality :
Q*A'+A*Q+L'*B'+B*L < 0

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Amit
Amit el 1 de Feb. de 2014
solve for what? What the variable, what is known?
John D'Errico
John D'Errico el 1 de Feb. de 2014
Obviously, the poster wants to solve for x. Oh, x is not in the equation? So we can choose x=0. Case closed.
Seriously, before you ask a question, think about what you mean by it. What are the unknowns here? What are the knowns? Are they arrays? vectors? Scalars? What size? What do you mean by "solve", as that is not a terribly meaningful thing in terms of an inequality, as there will generally be infinitely many solutions to such a problem.
Once you define your problem, it MIGHT be possible to help you, but until then, impossible. Even then, solving an inequality is, as I said, generally not a well-posed problem.
haifa
haifa el 4 de Feb. de 2014
the variables are the two matrix Q and L: Q: symetric matrix >0 L < 0
Matt J
Matt J el 4 de Feb. de 2014
And the inequality < 0 is element-wise, or is it the positive semi-definite ordering?
haifa
haifa el 5 de Feb. de 2014
Q :is a symetric and semi definite positive L: <0
Matt J
Matt J el 5 de Feb. de 2014
Does L<0 mean that L(i,j)<0 for all i,j ?
haifa
haifa el 5 de Feb. de 2014
no,L is a negativ matrix

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Respuestas (1)

Johan Löfberg
Johan Löfberg el 5 de Feb. de 2014
Editada: Johan Löfberg el 5 de Feb. de 2014

1 voto

With the MATLAB Toolbox YALMIP, and some SDP solver installed (such as SDPT3, SeDuMi, Mosek etc) it would be (you have not clearly said which variables are decision variables, I assume Q (psd) and L (arbitrary))
Q = sdpvar(n,n);
L = sdpvar(m,n,'full');
Constraints = [Q >=0, Q*A'+A*Q+L'*B'+B*L <= 0];
solvesdp(Constraints);
The model is ill-posed though as Q and L arbitrarily close to zero is feasible, which means trouble in practice. Dehomogenioze it, for instance
Constraints = [Q >=0, Q*A'+A*Q+L'*B'+B*L <= -eye(n)];

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haifa
haifa el 5 de Feb. de 2014
I try to find the matrix Q:symetric and semi definite positive, and the negativ matrix L, which satisfy this inequality: Q*A'+A*Q+L'*B'+B*L < 0 knowing that: A=[0 1;0 0];B=[0;1];
haifa
haifa el 5 de Feb. de 2014
I have not this solver SDP
Johan Löfberg
Johan Löfberg el 5 de Feb. de 2014
You have to install a solver (and YALMIP).
Start here http://users.isy.liu.se/johanl/yalmip/pmwiki.php?n=Main.HomePage

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Preguntada:

haifa
haifa
el 1 de Feb. de 2014

Comentada:

Johan Löfberg
Johan Löfberg
el 5 de Feb. de 2014

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