I have a nonlinear function to minimize, that satisfies a linear inequality constraint and a non-negativity constraint. I use `fmincon`

setting the lower bound to `0`

for this.

It seems that the answer I get does not satisfy `x >= 0`

, although the linear inequality constraint is satisfied. I am not sure if the function I am trying to minimize is convex (It may have local minima), but I do not think this should affect anything.

FYI here is the syntax I am using:

```
h = fmincon(@(x)constraint_test(x,s,Cov), A,b, [],[], 0,[])
```

`constraint_test`

is the function to be minimized, all other variables (`s,Cov,A,b`

) are known.

`constraint_test`

,`s`

,`Cov`

,`A`

and`b`

? Without that information it will be very hard to answer your question. – Chris Taylor Oct 9 '12 at 7:18`help fmincon`

or`doc fmincon`

would have given you a wealth of information on how to analyze this problem yourself. – Rody Oldenhuis Oct 9 '12 at 7:51