Note that your function seems to be unbounded (result: `-inf`

), because

`P0`

is unconstrained and can therefore grow to `+∞`

, leading to `A ⇒ -∞`

`n`

is unconstrained and can therefore shrink to `-∞`

, leading to `A ⇒ -∞`

`xk`

and `yk`

can be chosen such that the sum of all squares is minimal, therefore, you are taking the log of a tiny number, which tends to `-∞`

, leading to `A ⇒ -∞`

So, you'd probably have to use some constraints or scaling; if you have the optimization toolbox, it's `fmincon`

you're looking for.

If you don't have the toolbox: there's `fminsearchbnd`

and `fminsearchcon`

, available from the file exchange, or my very own `optimize`

.

Anyway, here's how you'd implement your problem using `fminsearch`

:

```
%// Some dummy values (for testing)
N = 30;
w = rand(N,1); x = rand(N,1);
P = rand(N,1); y = rand(N,1);
constant = rand;
%// Define Q = [P0 n xk yk]. Then:
A = @(Q) sum( w.*(P - Q(1) + 10*Q(2)*log(sqrt((Q(3)-x).^2 + (Q(4)-y).^2))) )/constant;
%// Most local optimization algorithms need an initial estimate:
Q0 = rand(4,1);
%// Now you can put everything in fminsearch:
[solution, fval] = fminsearch(A, Q0)
```

`wi`

? And I assume you mean that the function is the sum of all elements? I also assume the function`A`

takes as an input vectors`xi`

and`yi`

? – Rody Oldenhuis Mar 12 '14 at 15:24