Quadratic-Equation-Constrained Optimization

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Yize Wang el 12 de En. de 2021

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https://es.mathworks.com/matlabcentral/answers/714498-quadratic-equation-constrained-optimization

Comentada: Johan Löfberg el 31 de Mzo. de 2021

Respuesta aceptada: Bruno Luong

Dear all,

I am trying to solve a bilevel optimization as follows,

I then transformed the lower-level optimization with KKT conditions and obtained a new optimization problem:

The toughness is the constraint

. I am wondering whether there exists a solver that can efficient deal with this constraint?

Thank you all in advance.

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Bruno Luong el 12 de En. de 2021

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Editada: Bruno Luong el 12 de En. de 2021

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There is

https://www.mathworks.com/help/optim/ug/coneprog.html

but only for linear objective function.

You migh iterate on by relaxing succesively the cone constraint and second order objective like this

while not converge
   x1 = quadprog(...) % ignoring tau change (remove it as opt variable)
   x2 = coneprog(...) % replace quadratic objective (x2'*H*x2 + f'*x2) by linear (2*x1'*H + f')*x2
until converge

Otherwise you can always call FMINCON but I guess you already know that?

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Yize Wang el 12 de En. de 2021

Thanks a lot!

Johan Löfberg el 31 de Mzo. de 2021

Late to the game here, but the discussion above is not correct. A constraint of the form mu'*x=0 is nonconvex and cannot be represented using second-order cones. If that was the case, P=NP as it would allow us to solve linear bilevel programming problems in polynomial time, as these can be used to encode integer programs...

It appears the discussion confuses x'*Asc*x == 0 (a nonconvex quadratic constraint) and the generation of a SOCP constraints ||Asc*x + 0|| <= 0 + 0*x (note the linear operator inside the norm)

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