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Balanced binary search tree gives an O(log(n)) guaranteed search time.

Tango trees achieves a search of O(log(log(n)) while compromising small amount of memory per node. While I understand that from theoretical point of view log(n) and log(log(n)) makes a huge difference, for majority of practical applications it provides almost no advantage.

For example even for a huge number like n = 10^20 (which is like few thousand petabytes) the difference between log(n) = 64 and log(log(n)) = 6 is pretty negligible. So is there any practical usage of a Tango tree?

  • I wouldn't call one order of magnitude (64/6) "pretty negligible". – Paul R Feb 3 '15 at 8:14
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    @PaulR this order of magnitude is achieved when you search through 10^20 elements. To get the difference that one can notice (1 second) I need a number way higher then 10^1000. – Salvador Dali Feb 3 '15 at 8:24
  • It's absolutely negligible if you are dealing with a regular problem. If you are doing some calculations that require worknig with HUGE(REALLY HUGE) numbers then maybe. – Christo Feb 4 '15 at 7:14
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    @Chris please look carefully at the question. If you even take the number of atoms in the universe (n=10^81) the difference will be negligible log(n) = 270 and log(log(n)) = 8 – Salvador Dali Feb 4 '15 at 8:18
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tl;dr: no, use a splay tree instead.

Tango trees don't give you O(log log n) worst case lookups -- the average case is I think O(log n log log n). What they do is run at most O(log log n) times more slowly than a binary tree with an oracle that performs rotations to optimize the access patterns.

Splay trees might run O(1) times more slowly than the aforementioned theoretical magic tree -- this is the Dynamic Optimality conjecture. Splay trees are much simpler than tango trees and will have lower constant factors to boot. I can't imagine a practical application where the tango tree guarantee would be useful.

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