# Matlab - how to compute PCA on a huge data set [duplicate]

Possible Duplicate:
MATLAB is running out of memory but it should not be

I want to perform PCA analysis on a huge data set of points. To be more specific, I have `size(dataPoints) = [329150 132]` where `328150` is the number of data points and `132` are the number of features.

I want to extract the eigenvectors and their corresponding eigenvalues so that I can perform PCA reconstruction.

However, when I am using the `princomp` function (i.e. `[eigenVectors projectedData eigenValues] = princomp(dataPoints);` I obtain the following error :

``````>> [eigenVectors projectedData eigenValues] = princomp(pointsData);
Error using svd
Out of memory. Type HELP MEMORY for your options.

Error in princomp (line 86)
[U,sigma,coeff] = svd(x0,econFlag); % put in 1/sqrt(n-1) later
``````

However, if I am using a smaller data set, I have no problem.

How can I perform PCA on my whole dataset in Matlab? Have someone encountered this problem?

Edit:

I have modified the `princomp` function and tried to use `svds` instead of `svd`, but however, I am obtaining pretty much the same error. I have dropped the error bellow :

``````Error using horzcat
Out of memory. Type HELP MEMORY for your options.

Error in svds (line 65)
B = [sparse(m,m) A; A' sparse(n,n)];

Error in princomp (line 86)
[U,sigma,coeff] = svds(x0,econFlag); % put in 1/sqrt(n-1) later
``````
-

## marked as duplicate by casperOneOct 8 '12 at 15:07

What about your progress? I wonder whether any of the answers helped with your problem? – petrichor Oct 5 '12 at 12:02

Solution based on Eigen Decomposition

You can first compute PCA on `X'X` as @david said. Specifically, see the script below:

``````sz = [329150 132];
X = rand(sz);

[V D] = eig(X.' * X);
``````

Actually, `V` holds the right singular vectors, and it holds the principal vectors if you put your data vectors in rows. The eigenvalues, `D`, are the variances among each direction. The singular vectors, which are the standard deviations, are computed as the square root of the variances:

``````S = sqrt(D);
``````

Then, the left singular vectors, `U`, are computed using the formula `X = USV'`. Note that `U` refers to the principal components if your data vectors are in columns.

``````U = X*V*S^(-1);
``````

Let us reconstruct the original data matrix and see the L2 reconstruction error:

``````X2 = U*S*V';
L2ReconstructionError = norm(X(:)-X2(:))
``````

It is almost zero:

``````L2ReconstructionError =
6.5143e-012
``````

If your data vectors are in columns and you want to convert your data into eigenspace coefficients, you should do `U.'*X`.

This code snippet takes around 3 seconds in my moderate 64-bit desktop.

Solution based on Randomized PCA

Alternatively, you can use a faster approximate method which is based on randomized PCA. Please see my answer in Cross Validated. You can directly compute `fsvd` and get `U` and `V` instead of using `eig`.

You may employ randomized PCA if the data size is too big. But, I think the previous way is sufficient for the size you gave.

-
Just for clarification, shouldn't it be "The singular values, which are the standard deviations"? – Shadow Oct 17 '14 at 7:02

My guess is that you have a huge data set. You don't need all of the svd coefficients. In this case, use `svds` instead of `svd` :

Taken directly from Matlab help:

`````` s = svds(A,k) computes the k largest singular values and associated singular vectors of matrix A.
``````

From your question, I understand that you don't call `svd` directly. But you might as well take a look at `princomp` (It is editable!) and alter the line that calls it.

-

You probably needed to calculate an n by n matrix in your computation somehow that is to say:

``````329150 * 329150 * 8btyes ~ 866GB`
``````

of space which explains why you're getting a memory error. There seems to be an efficient way to calculate pca using `princomp(X, 'econ')` which I suggest you give it a try.

More on this in stackoverflow and mathworks..

-
`329150` are the number of data point. I have `1321 features. So basically I have to compute a `132 by 132` matrix. – Simon Oct 3 '12 at 5:20
you wouldn't go out of memory with a `132 by 132` matrix. see this, this and this to calculate the required memory for pca. you can just try what I said or just subsample your data. – gokcehan Oct 3 '12 at 8:42

Manually compute X'X (132x132) and svd on it. Or find NIPALS script.

-