How write these equation in Matlab for optimization
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Dear Friends,
I want to write this optimization problem in matlab.
Anybody here to help me write thi in Matlab please.
the only one decision variable is 
Accepted Answer
Thiago Henrique Gomes Lobato
on 5 Jul 2020
First you don't need the variable w, your problem is to maximize corr(Q,S), which is a unconstrained problem in x. Second, by your problem definition, Q is a single value, and correlation between single values doesn't make much sense, so I believe what you mean by corr is that the values should be equal or Q is a vector and you forgot a summation index. Considering the second hypothesis an example of how to do it could be seen here:
% Random data
S = 1:100;
c = randn(100,4);1
% Function to minimize
f = @(x,S,c)-min(min((corrcoef(S', (x*c')/sum(x) )) )); % Negative so min = max. Two min's since corrcoef gives a matrix as output
% Minimizer
[x,fval] = fminsearch(@(x)f(x,S,c),[1,1,1,1])
You can use this code as basis to implement your problem.
11 Comments
Muhammad Usama
on 5 Jul 2020
Muhammad Usama
on 5 Jul 2020
Thiago Henrique Gomes Lobato
on 5 Jul 2020
You can use corr, it will give the same answer, I just forgot about it. You would just need to change the line to
f = @(x,S,c)-corr(S', ((x*c')/sum(x))' );
Muhammad Usama
on 5 Jul 2020
Edited: Muhammad Usama
on 5 Jul 2020
Thiago Henrique Gomes Lobato
on 5 Jul 2020
I replaced sum with a matrix operation. If you want to have the sum it would be:
sum(x.*c,2)'/sum(x)
Which is the same
Muhammad Usama
on 5 Jul 2020
Thiago Henrique Gomes Lobato
on 5 Jul 2020
sum(abs(x).*c,2)'/sum(abs(x))
Muhammad Usama
on 5 Jul 2020
Thiago Henrique Gomes Lobato
on 5 Jul 2020
Suppose the optimizer finds a value of -2 for a x entry. When it goes to the function the -2 becomes +2 because of the absolute. Which means that if you do
[x,fval] = fminsearch(@(x)f(x,S,c),[1,1,1,1])
x = abs(x);
You will still get the same cost function, i.e., the abs(x) is exact the same minimum.
Muhammad Usama
on 5 Jul 2020
Thiago Henrique Gomes Lobato
on 5 Jul 2020
You have this already. Note that you divide by sum(x). This is a linear operation, so it would be the same as:
(x/(sum(x)))*c'
which would give: sum(x) ==1. In other words, if you normalize x by it's sum you'll get the same result as the not normalized one.
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on 5 Jul 2020
on 5 Jul 2020
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