maximizing objective function with equality and inequality constraints

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Az.Sa am 20 Jan. 2023

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Kommentiert: Torsten am 23 Jun. 2023

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Hi,

I want to estimate x_1 ,...,x_4 by maximizing

subject to

and

which function can help me to solve this problem ,

Also, how can I convert this objective function to be convex if that is possible.

Thanks in advance

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Torsten am 20 Jan. 2023

Bearbeitet: Torsten am 23 Jan. 2023

x1=x2=x3=0, x4=1

Should be obvious because the coefficient of x4 has the maximum value of all coefficients.

And your objective function is convex.

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Aditya am 23 Jan. 2023

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Bearbeitet: Aditya am 23 Jan. 2023

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Hi,

I understand that you want to solve this linear programming problem.

The solution for your example is trivial, as pointed out by @Torsten in comments.

In general, you can also use the linprog function to solve such problems. Here is an example to arrive at the trivial solution for your example.

Based on the documentation of linprog, I have defined the variables:

f = [4.22117991, 4.21111679, 4.22994893, 4.23060394];
Aeq = [1, 1, 1, 1];
lb = [0, 0, 0, 0];
beq = [1];
x = linprog(-f, [], [], Aeq, beq, lb, []);

You can see that the variable x is [0;0;0;1] which is the trivial solution to this problem.

The reason why I have passed negative f ( -f ) is because linprog minimizes the objective function. So, in order to maximize f, we minimize -f.

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Aditya Mahamuni am 23 Jun. 2023

And what can i do if i want to use the linprog function in simulink and use it at every time step ? Because when i use it, it shows me an error that "the function 'linprog' is not supported for code generation."

Torsten am 23 Jun. 2023

I have no experience with this coupling, but this contribution might be helpful:

https://uk.mathworks.com/matlabcentral/answers/228714-linear-programming-using-simulink

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