For a data matrix of size n-by-p, `PRINCOMP`

will return a coefficient matrix of size p-by-p where each column is a principal component expressed using the original dimensions, so in your case you will create an output matrix of size:

```
1036800*1036800*8 bytes ~ 7.8 TB
```

Consider using `PRINCOMP(X,'econ')`

to return only the PCs with significant variance

Alternatively, consider performing PCA by SVD: in your case `n<<p`

, and the covariance matrix is impossible to compute. Therefore, instead of decomposing the p-by-p matrix `XX'`

, it is sufficient to only decompose the smaller n-by-n matrix `X'X`

. Refer to this paper for reference.

### EDIT:

Here's my implementation, the outputs of this function match those of PRINCOMP (the first three anyway):

```
function [PC,Y,varPC] = pca_by_svd(X)
% PCA_BY_SVD
% X data matrix of size n-by-p where n<<p
% PC columns are first n principal components
% Y data projected on those PCs
% varPC variance along the PCs
%
X0 = bsxfun(@minus, X, mean(X,1)); % shift data to zero-mean
[U,S,PC] = svd(X0,'econ'); % SVD decomposition
Y = X0*PC; % project X on PC
varPC = diag(S'*S)' / (size(X,1)-1); % variance explained
end
```

I just tried it on my 4GB machine, and it ran just fine:

```
» x = rand(16,1036800);
» [PC, Y, varPC] = pca_by_svd(x);
» whos
Name Size Bytes Class Attributes
PC 1036800x16 132710400 double
Y 16x16 2048 double
varPC 1x16 128 double
x 16x1036800 132710400 double
```

### Update:

The `princomp`

function became deprecated in favor of `pca`

introduced in R2012b, which includes many more options.

`24GB`

... I am now jealous! – Amro Jul 5 '10 at 19:38contiguousmemory space available ... this is certainly not 24GB. After the total memory available, the`memory`

command should also tell you what is the maximum size (max contiguous space) for a single variable. – Hoki Apr 22 '15 at 17:48