binary quadratic optimization under linear constraints

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Hi guys.
I have to find an optimal gradient and intercept of a straight to minimize the sum of squared deviations to fit a 2D data points set, with linear constraints.
So, i have to solve the binary quadratic optimization problem: minF(ki,bi)=min(sum(ki*xj+bi-yj))^2 where (xj,yj) are the coordinates of the j-th data set point.
i have also to define some constraints, such as:
ki<=Kmax;
Hmin <= ki*xj+bi-yj <= Hmax
i've tried to use fmincon and quadprog but i was not able to solve my problem. could someone give me some tips?
many thanks

Respuesta aceptada

John D'Errico
John D'Errico el 20 de Mzo. de 2021
How is this not just a linear least squares estimation of the two unknown parameters? There is nothing binary about this, except that you have two unknowns. That is a misuse of the word, and will just confuse people.
As far as the quadratic optimization goes, again, you are trying define the problem in terms of flowery words, when a simple solution exists.
While you can use polyfit but for the constraints, those constraints make it a problem for lsqlin, which can trivially solve your problem. This is a simple linear least squares estimation problem, subject to linear inequality constaints.
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alessio morabito
alessio morabito el 28 de Mzo. de 2021
Many thanks John. You're right, but i didn't know that matlab could do this.
But now i've to implement another optimization in the algorithm:
i've to minimize (in the sense of least squares) the difference between Rj and Ri, with:
Ri=unknown variable;
Rj=[xj-(Si+Ri*A)]^2+[yj-(Zi+Ri*B)]^2]; (all terms are known, excluding Ri)
such that m<=Rj-Ri<=M
is now quadprog the best way to solve this problem?
Thanks in advance

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