How to find the minimum of a three variable function (optimization)?

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Hi, I am trying to write a code that finds the minimum of f(x,y,z)=(x^2 + 2y^2 + 3z^2) ^2
To find the critical points we want to find where the gradient is equal to 0 correct? I am having trouble putting this into code. Does anyone know where I can find resources to write a code for this?
  2 Comments
Walter Roberson
Walter Roberson on 14 Apr 2020
By inspection: What is the smallest value each of the components could be, considered independently of each other? Ignoring cross-terms for the moment that could force the overall expression to be greater, what is the smallest that each term could be? What is the sum of those possibilities? That gives you a first approximation of the minima. Now look again at the cross-terms: is it possible for each of those terms to achieve their minima simultaneously? If so what is the overall minima?
Walter Roberson
Walter Roberson on 14 Apr 2020
If only there were a SYMbolic toolbox that you could ask to SOLVE the GRADIENT.

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Answers (1)

Guru Mohanty
Guru Mohanty on 16 Apr 2020
To find Minimum of a three variable function you follow these two processes.
  1. Using Symbolic Toolbox
  • Define your variables using syms & Construct the function.
  • Find derivative by diff function and make it Zero.
  • By solving the equation using solve function, you can get minima.
2. Using fminsearch
  • Create a function handle for the expression.
  • Use fminsearch to find minimum.
f=@(x,y,z)(x.^2 + 2*y.^2 + 3*z.^2).^2;
[fmin,minVal] = fminsearch(@(b) f(b(1),b(2),b(3)), [1; 1 ; 1]);
  3 Comments
Walter Roberson
Walter Roberson on 9 Apr 2023
The above techniques cannot (easily) handle bounded problems. For bounded problems you would typically use fmincon

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