Optimize two objective functions using fmincon
Mostrar comentarios más antiguos
I have two objective functions which would optimize same variables. I have done the optimization individually and they are working fine. Now, I need to incorporate those two objective functions in fmincon. Is there any way to do it?
3 comentarios
Torsten
el 26 de Jul. de 2017
You must specify how you form the new objective function from the two individual objectives within the "mixed" optimization.
Best wishes
Torsten.
INDREEYAJEET SINGH
el 21 de En. de 2022
Even I have same challenge, do you have solution for this now?
Torsten
el 21 de En. de 2022
If you want to buy a meal of high quality, you get a different food composition as if you want a low-priced meal.
If you define some standard for the quality, you can get the lowest-priced meal with this prescribed quality.
So there is a curve that - given a certain quality of the meal - gives you the meal with the lowest price for this quality. This is called "pareto-optimum":
So you must first decide how to weigh the two criteria from your two optimizations to get a common optimum.
Respuesta aceptada
Walter Roberson
el 26 de Jul. de 2017
0 votos
23 comentarios
safi58
el 27 de Jul. de 2017
safi58
el 27 de Jul. de 2017
Walter Roberson
el 27 de Jul. de 2017
Can po or loss be negative? Are po and loss both functions of some variable(s) or is po possibly constant?
safi58
el 27 de Jul. de 2017
Walter Roberson
el 27 de Jul. de 2017
If po is constant, then maximizing eta is the same as minimizing loss, and there is no need to calculate eta . (If you are trying to minimize eta, then that would be the same as maximizing loss, which seldom makes sense unless you are trying to produce something like Vanta Black.)
So... you have two loss functions and you want to minimize both of them. But how important is minimizing one compared to the other? Are the two even on the same scale? Is the scale linear?
But you do not seem to be concerned about that, only about getting some formula. So just minimize the sum of the squares of the two losses.
safi58
el 28 de Jul. de 2017
Editada: Walter Roberson
el 28 de Jul. de 2017
Walter Roberson
el 28 de Jul. de 2017
If each of those functions, OPTM_1 and OPTM_2 emit an eta value (rather than a loss directly), then they will be larger when the loss is least, so you would be wanting to minimize their negative when minimizing individually. However, if you square a negative then you get a positive, so you do not need the negative for the joint minimization:
joint_obj = @(x) OPTM_1(x).^2 + OPTM_2(x).^2;
joint_constraint = @(x) merge_constraints(x, @Constraints_1, @Constraints_2);
[x,fval,exitflag] = fmincon(joint_obj, x0, A, b, Aeq, beq, lb, ub, joint_constraint, options)
togther with
function [merged_c, merged_ceq] = merge_constraints(x, cfun1, cfun2)
[c1, ceq1] = cfun1(x);
[c2, ceq2] = cfun2(x);
merged_c = [c1(:); c2(:)];
merged_ceq = [ceq1(:); ceq2(:)];
In the special case where you have no linear equality constraints, instead of the merge_constraints function I show here, you could instead use
VEC = @(M) M(:);
joint_constraint = @(x) deal([VEC(Constraints_1(x); VEC(Constraints_2(x)], []);
This assumes that your constraint functions might return arrays or vectors of uncertain orientation. In some cases you might be able to reduce down to
joint_constraint = @(x) deal([Constraints_1(x), Constraints_2(x)], [])
safi58
el 28 de Jul. de 2017
Editada: Walter Roberson
el 28 de Jul. de 2017
Walter Roberson
el 28 de Jul. de 2017
If you minimize the losses individually first and calculate eta values from the minimized loss, then you will get out two numeric values, not a function. Notice that you write
f(x) = eta1^2 + eta2^2
but x does not appear on the right hand side, because eta1 and eta2 are constant in x at that point.
safi58
el 31 de Jul. de 2017
Walter Roberson
el 31 de Jul. de 2017
[optm1, foptm1, exitflag] = fmincon(@(x) -eta1(x), x0, A, b, Aeq, beq, lb, ub, @(x)Constraints_1(x), options);
[optm2, foptm2, exitflag] = fmincon(@(x) -eta2(x), x0, A, b, Aeq, beq, lb, ub, @(x)Constraints_2(x),options);
f = @(x) (optm1 - eta1(x)).^2 + (optm2 - eta2(x)).^2
Look at that more carefully. arg(max(eta1)) is the argument that maximizes eta1, and your eta1 is a function of several variables so the argument that maximizes it is going to be a vector. Then in f, you are taking the vector of locations, and subtracting from it a function value . This should suggest to you that you are doing the wrong thing.
It would make more sense if you had
optim1 = eta1( arg(max(eta1)) )
that is, the function value at the place that it is maximized. For the code I gave on the first two lines, that would correspond to
f = @(x) (foptm1 - eta1(x)).^2 + (foptm2 - eta2(x)).^2
which would be a distance from the maximum points.
safi58
el 1 de Ag. de 2017
safi58
el 3 de Ag. de 2017
Walter Roberson
el 3 de Ag. de 2017
All of those can go in the same file.
safi58
el 4 de Ag. de 2017
Walter Roberson
el 4 de Ag. de 2017
I will need your current code
safi58
el 4 de Ag. de 2017
safi58
el 4 de Ag. de 2017
Walter Roberson
el 4 de Ag. de 2017
eta1 = po/(po + loss_1(joint_obj));
eta2 = po/(po + loss_2(joint_obj));
safi58
el 7 de Ag. de 2017
Walter Roberson
el 7 de Ag. de 2017
eta1 = po/(po + loss_1(x));
eta2 = po/(po + loss_2(x));
safi58
el 9 de Ag. de 2017
Walter Roberson
el 9 de Ag. de 2017
Sorry, I do not understand the question?
Más respuestas (0)
Categorías
Más información sobre Get Started with Optimization Toolbox en Centro de ayuda y File Exchange.
el 26 de Jul. de 2017
el 21 de En. de 2022
Community Treasure Hunt
Find the treasures in MATLAB Central and discover how the community can help you!
Start Hunting!
Translated by 
