# How to use princomp () function in R when covariance matrix has zero's?

While using `princomp()` function in R, the following error is encountered : `"covariance matrix is not non-negative definite"`.

I think, this is due to some values being zero (actually close to zero, but becomes zero during rounding) in the covariance matrix.

Is there a work around to proceed with PCA when covariance matrix contains zeros ?

[FYI : obtaining the covariance matrix is an intermediate step within the `princomp()` call. Data file to reproduce this error can be downloaded from here - http://tinyurl.com/6rtxrc3]

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Adding a sample input to make the the problem reproducible is useful to answerers. –  Richie Cotton Dec 19 '11 at 13:52
If you look at `stats:::princomp.default` you'll see that the error occurs when you have negative eigenvalues in the covariance matrix. –  Richie Cotton Dec 19 '11 at 13:57
@ Richie Cotton : I wish I can provide. My data is huge (10K x 10K) and I haven't figured out the part that is causing the error. I will be happy to know if there is a way in which I can extract troubling part of data and post it here ! –  384X21 Dec 19 '11 at 14:01
`cv <- matrix(c(1, 2, 2, 1), nrow = 2); princomp(covmat = cv)` reproduces the error. Don't know how relevant it is to your dataset. –  Richie Cotton Dec 19 '11 at 14:40
Thanks ! I could reproduce it from a small portion of original matrix, 1K x 1K (file size 5.5 MB). I was wondering how to post it. I am sure some elements of covariance matrix will be zero (or close to it) as my input data has large chunks of identical values. –  384X21 Dec 19 '11 at 14:45

The first strategy might be to decrease the tolerance argument. Looks to me that `princomp` won't pass on a tolerance argument but that `prcomp` does accept a 'tol' argument. If not effective, this should identify vectors which have nearly-zero covariance:

``````nr0=0.001
which(abs(cov(M)) < nr0, arr.ind=TRUE)
``````

And this would identify vectors with negative eigenvalues:

``````which(eigen(M)\$values < 0)
``````

Using the h9 example on the help(qr) page:

``````> which(abs(cov(h9)) < .001, arr.ind=TRUE)
row col
[1,]   9   4
[2,]   8   5
[3,]   9   5
[4,]   7   6
[5,]   8   6
[6,]   9   6
[7,]   6   7
[8,]   7   7
[9,]   8   7
[10,]   9   7
[11,]   5   8
[12,]   6   8
[13,]   7   8
[14,]   8   8
[15,]   9   8
[16,]   4   9
[17,]   5   9
[18,]   6   9
[19,]   7   9
[20,]   8   9
[21,]   9   9
> qr(h9[-9,-9])\$rank
[1] 7                  # rank deficient, at least at the default tolerance
> qr(h9[-(8:9),-(8:9)])\$ take out only the vector  with the most dependencies
[1] 6                   #Still rank deficient
> qr(h9[-(7:9),-(7:9)])\$rank
[1] 6
``````

Another approach might be to use the `alias` function:

``````alias( lm( rnorm(NROW(dfrm)) ~ dfrm) )
``````
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Nice. I hadn't come across `alias` before. –  Richie Cotton Dec 22 '11 at 16:13