# does matlab cache solutions for eigs

I seem to be getting different performance results when using `eigs`. On the same matrix, calling
`[c, v] = eigs(A, 2, 'sm');` somtimes takes 30 seconds and sometimes 2 seconds.
I need to know whether there's a speedup using some caching on subsequent calls for `eigs` on the same matrix since I need to report the times...

-
Really? 30 seconds? How big is this matrix? Maybe you're running something in the process that takes up a lot of CPU? –  Eitan T May 22 '12 at 16:35

If so, this doesn't appear to be a generic feature. I ran this test from the command line

``````A = randn(10000);
B = randn(10000);
C = B;
tic; [c1,v1] = eigs(A,2,'sm'); toc;
tic; [c2,v2] = eigs(A,2,'sm'); toc;
tic; [c3,v3] = eigs(B,2,'sm'); toc;
tic; [c4,v4] = eigs(C,2,'sm'); toc
``````

and got this result

Elapsed time is 32.373128 seconds.

Elapsed time is 28.412905 seconds.

Elapsed time is 32.752616 seconds.

Elapsed time is 29.024055 seconds.

I'm surprised, because usually MATLAB tries to outsmart you and will store results for reuse.

-
This would be a bad thing IF MATLAB tried to circumvent repeated calls, by simply returning the last thing it did. What if your function is a random process? Would you want MATLAB to return the same result? For example, should repeated calls to rand return the same result? Of course not. But in fact, eigs uses a random starting value, so it COULD generate different results down at the least significant bit. Or, it might return the same set of eigenvectors, but with a different sign. –  user85109 May 22 '12 at 17:57
@woodchips: MATLAB is a scripted language. The interpreter can often determine whether a repeated function call will return the same value, especially with built-in functions. It may be, as you say, that MATLAB knows eigs uses a call to rand and so should begin from scratch each time. –  Marc May 22 '12 at 18:10
Sorry, but I know for a fact that MATLAB does NOT do as you say, and I can prove that to be a true statement. It has never been true since version 3.2 (as far back as I go as a heavy user, though I had a copy of an earlier version) and it is still not true in the most recent release. –  user85109 May 22 '12 at 18:28
@woodchips: I stand corrected. I can't find any documentation that says the interpreter reuses intermediate results. I swear I've seen the second call to a function return much faster, but maybe that's in my head. –  Marc May 22 '12 at 19:09

Under some circumstances, a large enough matrix might push things into virtual memory, or not, depending upon whether there is a large enough block of contiguous RAM available. Or, you may be doing something on the side.

You can verify what is happening by watching a process monitor as you do the test. Are there suddenly large amounts of disk accesses? If so, then virtual memory is being touched. Is there a different, unrelated process active that is hogging the CPU?

-