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I'm looking for the one algorithm or data structure which is so unknown yet useful that you think it's a horrible oversight by the computer science or programming community. If only we could all learn this one thing, a lot of good would be done to many future programs.

The best one I can come up with is interpolation search, which only very few programmers know, whereas everyone knows binary search. I think there's little doubt that searching an ordered list quickly is a pretty useful and fundamenteal algorithm.

The two are almost identical to implement - so that's not an issue.

It performs O(log(log(n))) on uniformly distributed data, versus binary searches O(log(n)). That means searching 4 billion numbers requires only 5 probes vs. 32, that's a LOT better!

On non-perfectly uniform data, it still performs really well most of the time. Only when the data is really skewed is it as bad as binary search or worse. It's O(n) worst case when the data is highly skewed, but this is pretty uncommon in most real world situations.

Even still, one can construct a even/odd algorithm to alternate between the two and get the worst case of binary search with the average case of interpolation search to mitigate the extreme situations.

There is really no good reason this is so overlooked by most programmers/libraries.

Can anyone else beat that?

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sounds like a rep troll; not a real question IMO –  Mitch Wheat Jul 1 '09 at 8:18
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Suggestion: community mode like all the other "hidden features of Foo", "best Bar ever", ... questions. –  VolkerK Jul 1 '09 at 8:26
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"5 probes vs 32 for 4 billion entries" may sound like a huge improvement but it's along the lines of "I have an algorithm that only takes 1e-7 seconds while the next best one takes a whopping 1e-5 seconds, making mine 100 times faster". There's little difference between the two absolute figures. That level of improvement only becomes relevant as 'n' approaches truly huge numbers. –  paxdiablo Jul 1 '09 at 8:28
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Voted to reopen. This question should see the light of day soon, but probably won't get as much exposure. –  Cerebrus Jul 1 '09 at 10:05
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Re-opened (but I was still in two minds about it - you get the benefit of the doubt). Best of luck with your answers. –  paxdiablo Jul 1 '09 at 16:04

3 Answers 3

I nominate smoothsort. In-place, time complexity O(n log n) worst case / O(n) best case.

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Not a bad nomination! I had never heard of this one either - and it does fix a major problem with heapsort. I think mergesort is generally preferable to heapsort generally because it better exploits locality while sorting. I did a little checking and found mixed results on whether it's better in practice or not though - have you see this paper discussing it's performance characteristics? I couldn't find any others. iwi.eldoc.ub.rug.nl/FILES/root/1991/InfProcLettBron/… –  Chris Harris Jul 2 '09 at 17:51

The trie/ternary tree ... Quick prefix matches! I've certainly used them more than heaps or explicit linked list structures (implicit linked lists with "next"s are often useful, though).

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The whole field of tries is much-neglected. Early, naive, tries are memory-hungry, and not terribly fast, but there has been some superb work in more recent years; see Judy trees, burst trees, fusion trees, and more. They are now serious competition to any kind of binary tree, and even hashtables in some situations. –  Tom Anderson Nov 29 '10 at 13:13

Another nomination for smoothsort. It's theoretically quite beautiful and is asymptotically as good as it gets.

In case you're curious, I wrote up an explanation of how the sort works and where it comes from on my personal site.

Also, I totally agree that interpolation search is really awesome. I'm glad someone else has heard of this one. :-)

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