**Background info**

I recently handed in an assigment for my class on algorithms and datastructures. The assignment was to implement a solution to find the maximum-subarray of randomly generated arrays. We were asked to implement both a brute force algorithm, and a recursive divide-and-conquer algorithm.

We were then asked to analyze the running times, to see at which problem size the brute force algorithm would be faster than the recursive solution. This was done by measuring running time (Using System.nanoTime() measurements) of both algorithms for increasing problem sizes.

However, determining this turned out to be a bit trickier than I expected.

**Curiosity**

If I start off by running both of the algorithms with problems sizes of 5000, more than 10 times, the running time for the recursive algorithm drops, from one run to the next, by a factor of about 10 (from ~1800µS to execute, to ~200µS to execute) and it stays that much faster for the rest of the iterations. See picture below for an example

The 2nd and 3rd column is just to verify that both algorithms return the correct maximum subarray

This was tested on OS X 10.7.3 with Java 1.6.0_29 - the results were the same when executed on a PC running Windows 7 and Java 1.6 (exact version number unknown).

The source code for the program can be found here: https://gist.github.com/2274983

**My question is this:** What causes the algorithm to suddenly perform that much better after being "warmed up"?