# [a b]=cholcov function returns a=[] and b=NaN for a symmetric positive definite matrix

I have this matrix:

``````S=   6.84370358358718e-006    -7.45833473076585e-007
-7.45833473076565e-007     7.11723106043725e-006
``````

It is symmetric:

``````S-S'=                     0    -2.00111533788828e-020
2.00111533788828e-020                         0
``````

and is positive definite:

``````eig(S)= 6.22219831321029e-006    and     7.73873633081414e-006
``````

When I use `[a b]=cholcov(S)`, it returns returns `a=[]` and `b=NaN`. It is written in MatLab help that`[T,num] = cholcov(SIGMA)` ... `If SIGMA is not square and symmetric, num is NaN and T is empty.`

Of course the `chol(S)` function decomposes this function without any error. I don't know the difference between `chol` and `cholcov` and it is not important, since I don't have any choices. The error comes from `mvnrnd(zeros(1,2),S)` function, when I try to generate some random numbers:

```??? Error using ==> mvnrnd at 118 SIGMA must be a symmetric positive semi-definite matrix.```

Can anyone tell me what's wrong here? thanks.

-

You wrote:

``````S-S'=                     0    -2.00111533788828e-020
2.00111533788828e-020                         0
``````

That says that S is not symmetric. It's ALMOST symmetric. But... not quite. If this is due to numerics, you might be able to fix this with:

``````symmetricS = mean(cat(3,S,S'),3);
``````
-
Thanks a lot. I thought Matlab considers e-20 zero! –  Ramin Nov 25 '12 at 17:33
``````S = (S + S')/2;