# Random level function in skip list

I am looking at skip list implementation in Java , and I am wondering the purpose of the following method:

``````public static int randomLevel() {
int lvl = (int)(Math.log(1.-Math.random())/Math.log(1.-P));
return Math.min(lvl, MAX_LEVEL);
}
``````

And what the difference between the above method and

``````Random.nextInt(6);
``````

Can anyone explain that? Thanks.

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`Random.nextInt` should provide a random variable whose probability distribution is (approximately) a discrete uniform distribution over the interval [0, 6). You can learn more about this here.

Note that internally `Random` uses a linear congruential generator where m = 2^48, a = 25214903917, and c = 11.

`randomLevel` instead (approximately) uses a geometric distribution where p = 0.5. You can learn more about the distribution here.

Essentially, `randomLevel` returns `0` with probability 0.5, `1` with 0.25, `2` with 0.125, etc. until `6` with 0.5^7 i.e. 0.0078125* -- far different than the ~0.14 from `Random.nextInt`.

Now the importance of this is that a skip list is an inherently probabilistic data structure. By utilizing multiple sparse levels of linked lists, they can achieve average runtime performance of O(log n) search -- similar to a balanced binary search tree, but less complex and using less space. Using a uniform distribution here would not be appropriate, seeing how to as higher levels are less densely populated in comparison to lower ones (note: below, the levels grow downward) -- which is necessary for the fast searches.

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According to geometric distribution formula, level should be int lvl = (int)(Math.log(Math.random()/p)/Math.log(1.-P)) instead of int lvl = (int)(Math.log(1.-Math.random())/Math.log(1.-P)); whats the reason? –  Foredoomed Aug 22 '12 at 6:45
The cdf is `F(k) = 1 - (1 - p)^k`, so we find `k = log (1 - F(k)) / log (1 - p)` –  oldrinb Aug 22 '12 at 18:31