If you inspect the kmeans.m function, then the code for the cosine-distance boils down to two critical sections that might throw an out-of-memory errors. First let me introduce the main variables involved:
X: rows are observation vectors, columns are dimensions (data)C: rows are centroids, columns are dimensions (cluster centroids)
1)
The first piece of code is normalizing the data rows to unit length (this was previously pointed out in @John's deleted answer, though for the wrong reasons):
[n,p] = size(X); %# in your case, X is a matrix of size 1000000x1000
Xnorm = sqrt(sum(X.^2, 2)); %# norm of each instance vector
X = X ./ Xnorm(:,ones(1,p)); %# normalize to unit length
The above tries to vectorize the operation using ONE-indexing to repeat the norm vector by as many columns the data have, then doing an element-wise division. Just check the variable sizes to understand the problem with such approach:
>> whos X Xnorm
Name Size Bytes Class Attributes
X 1017564x1000 83056640 double sparse
Xnorm 1017564x1 12210776 double sparse
Thus Xnorm(:,ones(1,p)) will attempt to allocate a temporary matrix of size 12210776*1000 bytes = 11.3722 GB which is clearly what causes the out-of-memory error...
(For those interested, a double sparse matrix X internally needs 12*nnz(X) + 4*size(X,2) bytes for storage, while the full representation takes prod(size(X))*8 bytes. In your case, that's around 80MB vs 11.5GB of memory needed!)
This line could have been written in a different (probably slower) way, that avoids the huge space requirement that is usually a downside of vectorization. Simply loop over each row and divide by the norm. Even better, we can use the BSXFUN function which was specifically designed for such cases (avoiding the use of REPMAT and indexing tricks):
X = bsxfun(@rdivide, X, Xnorm);
The funny thing is that there are commented sections of code in other places of the KMEANS file, where this issue was clearly considered, and thus opted to use a slower for-loop, yet guaranteed not to run out of memory...
2)
The second critical section is where the actual computation of the distance occurs. The code of interest is the following:
n = size(X,1);
nclusts = size(C,1);
D = zeros(n,nclusts);
for i = 1:nclusts
D(:,i) = max(1 - X*C(i,:)', 0);
end
Basically it computes the inner-product of each data instance with every cluster centroid (one centroid at a time, against the entire data vectors). Again, in the chance that this causes an issue, you could simply unroll the vectorized product into a step-by-step loop, with something like:
for i = 1:nclusts
for j = 1:n
D(j,i) = max(1 - dot(X(j,:),C(i,:)), 0);
end
end
So you get the idea; When your matrices are really big, you have to be careful about operations that would create large intermediate results, and replace them when possible with an explicit loop which operates on smaller scales.
BTW, you are not experiencing the same problems when using the euclidean distance because it was written with a loop instead of a single-line vectorized solution. Here is the section that computes the distance function:
for i = 1:nclusts
D(:,i) = (X(:,1) - C(i,1)).^2;
for j = 2:p
D(:,i) = D(:,i) + (X(:,j) - C(i,j)).^2;
end
% D(:,i) = sum((X - C(repmat(i,n,1),:)).^2, 2); %# <--- commented code
end
Still, I am surprised that the BSXFUN was again not used instead:
for i=1:nclusts
D(:,i) = sum(bsxfun(@minus, X, C(i,:)).^2, 2);
end
Please note that I haven't attempted to cluster the entire data until completion. I am running on a 32-bit machine with 4GB (of which MATLAB can only access 3GB due to architecture restrictions), so please report back whether the proposed changes actually make a difference on your 64-bit/8GB hardware ;)
f=load(filename); v=spconvert(f); save output.mat vthen upload that MAT-file (which should be much smaller)