How can I write summationn constraints for an optimization problem?
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Good morning,
I would like to optimize the following equation:
min
with the following contraints:
x>0
Where is a known set of values, is equal to a [288x1] vector and is also known as a [288x1] vector.
How can I add those constraints? I am trying to use x=fmincon(fun,x0,A,b,Aeq,beq);
Thanks!
Accepted Answer
Matt J
on 29 Sep 2020
Edited: Matt J
on 29 Sep 2020
fmincon is not the best tool to use for a linear program. In the problem-based framework, you can set up the problem to be solved with linprog() as follows:
x=optimvar('x',size(c),'LowerBound',0);
prob=optimproblem('Objective',x.'*price);
prob.Constraints.sumx=sum(x-c)==0;
sol=solve(prob);
2 Comments
Matt J
on 29 Sep 2020
Thing is, I would like to have or understand the code behind it.
TMW will not provide the code, but there are algorithm descriptions here
It sounds like we have answered your original question, so I encourage you to Accept-click the answer. If you have spin-off questions, it would be best if you pose them in a separate thread.
More Answers (1)
Ameer Hamza
on 29 Sep 2020
Something like this
price = rand(288, 1); % example value
c = rand(288, 1); % example value
sum_c = sum(c);
x0 = rand(288, 1); % initial guess
fmincon(@(x) price.'*x, x0, [], [], [], [], [], [], @(x) nlcon(x, sum_c)) % price.'*x is same as sum(price.*x)
function [cneq, ceq] = nlcon(x, sum_c)
cneq = [];
ceq = sum(x) - sum_c;
end
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