If this takes forever to solve in your tests, you are probably going into virtual memory for the solve. A 15k square (full) matrix will require 1.8 gigabytes of RAM to store in memory.

```
>> 15000^2*8
ans =
1.8e+09
```

You will need some serious RAM to solve this, as well as the 64 bit version of MATLAB. NO factorization will help you unless you have enough RAM to solve the problem.

If your matrix is truly sparse, then are you using MATLAB's sparse form to store it? If not, then MATLAB does NOT know the matrix is sparse, and does not use a sparse factorization.

How sparse is A? Many people think that a matrix that is half full of zeros is "sparse". That would be a waste of time. On a matrix that size, you need something that is well over 99% zeros to truly gain from a sparse factorization of the matrix. This is because of fill-in. The resulting factorized matrix is almost always nearly full otherwise.

If you CANNOT get more RAM (RAM is cheeeeeeeeep you know, certainly once you consider the time you have wasted trying to solve this) then you will need to try an iterative solver. Since these tools do not factorize your matrix, if it is truly sparse, then they will not go into virtual memory. This is a HUGE savings.

Since iterative tools often require a preconditioner to work as well as possible, it can take some study to find the best preconditioner.

`tic`

and`toc`

(and if you do, report the results since it would be good to know) – nneonneo Oct 11 '12 at 3:48