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Is it possible to get a uniformly distributed random value (calling the function means it's equally likely to get any value in the tree) from a balanced binary search tree in O(log n) time?

My initial idea was to generate a random number 0, 1, or 2. If 0, take the left path from the current node, if 1, take the right path, otherwise the value of the node is the random value. If you hit a leaf node, take the value of that node. I don't think this would be randomly distributed though.

This is out of curiosity, not for a specific application.

Let me know if you need any clarifications.

An example is if you have the tree

    / \
   2   5

The numbers 1, 2, 3, and 5 would be returned uniformly when calling int get_random_number()

Clarification: All other normal BST operations should remain O(log n), like insert(), delete(), etc.

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Which part? Maybe I should provide an example? –  gsingh2011 Nov 9 '12 at 0:57
Uniform? Just pick a random integer <= number of tree nodes, then traverse to that node and return it. –  Aziz Nov 9 '12 at 0:58
@Aziz. If you pick the last node, that's O(n) time. –  gsingh2011 Nov 9 '12 at 0:59
But in fact, you only want to pick a (uniform) random node from the tree? (which happens to have a number on it) –  wildplasser Nov 9 '12 at 1:00
@wildplasser If you keep the tree as an array, finding the element to delete would be O(n) unless you do binary search, but then you'd have to keep it sorted, so it wouldn't remain O(log n). I also don't get what you mean by "only the big O will get bigger". That's what I'm concerned about... –  gsingh2011 Nov 9 '12 at 1:22

1 Answer 1

up vote 9 down vote accepted

Your idea will not create a random distribution. The root has a 1/3 chance of being picked no matter the size of the tree.

If you know the number of elements in the tree, generate a number k between 1 and N, and get the kth largest element of the tree. See here for a way to do that in O(logn) for balanced trees.

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This is clever. I'll read that link and possibly select this if there's no better answer. –  gsingh2011 Nov 9 '12 at 1:06
OK, good point. –  Al Kepp Nov 9 '12 at 1:07

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