How to *svd* and *nmf* an extremely sparse matrix of dimension say (70000, 70000)? The sparse version of this matrix can be stored as a less than 700M binary file on disk. Can I factorize it in a sparse format (like file on disk or storable in memory) without reconstruct the whole matrix which will be impossible to store in memory (even hard to store on disk)?

I know there are *irlba* in **R**, *sklearn* and *pymf* in **python**. But it seems they need to reconstruct the matrix (? I did not dig much.).The problem of *svd* is that I cannot save the matrices *S,V and D*, but what if I specify a K and only save the matrices *S_k, V_k and D_k* corresponding to k-largest eigenvalue? And as for *nmf*, I want to factorize it into *W* of size say (70000, 100) and *H* of size (100, 70000) which are able to be stored in memory.

And if there are certain ways to do so, what is the expected time to compute *svd* and *nmf* ? Any help will be appreciated!

And Why NMF(Non-negative Matrix Factorization) is not a tag?

`Matrix`

package`m2 <- Matrix(0, nrow = 7*10^4, ncol = 7*10^4, sparse = TRUE)`

is only`281632 bytes`

. – Khashaa Jan 3 '15 at 16:46