Red-black tree access by ordinal index

I have a red-black tree (binary tree, all the leaves are within 2 levels). I can navigate through nodes: to left, right or parent. I know the entire count of nodes.

I have to find the N-th smallest element in a tree. Is there any way to do this faster than in O(n)? Any ideas of optimizing access by index?

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In each node X you should store, how many nodes are in subtree with X as a root.

``````count(LEAF) = 1
count(NODE) = count(NODE->LEFT) + count(NODE->RIGHT) + 1
``````

During each insert/delete you should use this equation to update counts in nodes affected by rotations.

After that solution is simple

``````NODE nth(NODE root, int n) {
if (root->left->count <= n) return nth(root->left, n);
if ( root->left->count + 1 == n) return root;
return nth(root->right, n - root->left->count - 1);
}
``````
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Thanks. Actually I'm modifying the .NET `SortedDictionary` to be ordered, but now I see there's no easy way. –  Dmitry Fedorkov Mar 31 '12 at 8:50

you can add one attribute in each node that shows number of childrens of this node . with this attribute you can find N-th smallest node with O(lgn) .

now just you need to handle this attribute when you insert (or delete) any node into the tree. if there is no rotation then it's easy to handle but when you have rotation it's a little difficult but you can do it.

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