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Recently, I'm trying to solve all the exercises in CLRS. but there are some of them i can't figure out. Here is one of them, from CLRS exercise 12.4-2:

Describe a binary search tree on n nodes such that the average depth of a node in the tree is Θ(lg n) but the height of the tree is ω(lg n). Give an asymptotic upper bound on the height of an n-node binary search tree in which the average depth of a node is Θ(lg n).

Can anyone share some ideas or references to solve this problem? Thanks.

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With w you mean the ω (small letter Omega), right? –  Gumbo Feb 13 '12 at 8:35
    
@Gumbo yes, thanks. –  meteorgan Feb 13 '12 at 8:54

2 Answers 2

up vote 4 down vote accepted

So let's suppose that we build the tree this way: given n nodes, take f(n) nodes and set them aside. Then build a tree by building a perfect binary tree where the root has a left subtree that's a perfect binary tree of n - f(n) - 1 nodes and a right subtree that's a chain of length f(n). We'll pick f(n) later.

So what's the average depth in the tree? Since we just want an asymptotic bound, let's pick n such that n - f(n) - 1 is one less than a perfect power of two, say, 2^k - 1. In that case, the sum of the heights in this part of the tree is 1*2 + 2*3 + 4*4 + 8*5 + ... + 2^(k-1) * k, which is (IIRC) about k 2^k, which is just about (n - f(n)) log (n - f(n)) by our choice of k. In the other part of the tree, the total depth is about f(n)^2. This means that the average path length is about ((n - f(n))log (n - f(n)) + f(n)^2) / n. Also, the height of the tree is f(n). So we want to maximize f(n) while keeping the average depth O(log n).

To do this, we need to find f(n) such that

  1. n - f(n) = Θ(n), or the log term in the numerator disappears and the height isn't logarithmic,
  2. f(n)^2 / n = O(log n), or the second term in the numerator gets too big.

If you pick f(n) = Θ(sqrt(n log n)), I think that 1 and 2 are satisfied maximally. So I'd wager (though I could be totally wrong about this) that this is as good as you can get. You get a tree of height Θ(sqrt(n log n)) that has average depth Θ(Log n).

Hope this helps! If my math is way off, please let me know. It's late now and I haven't done my usual double-checking. :-)

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This is close but I think you want a perfect tree with a tail off one of the leaf nodes, rather than having a perfect left sub-tree with the whole right tree being a chain. Basically you want to pack as many nodes near the top of the tree as possible, then have one long chain coming off the tree. –  robert king Feb 13 '12 at 9:56
    
@robertking- Hmm, that's a good point. Reworking the math doesn't make it seem like this does much asymptotically, because only O(log n) of the nodes from the chain would be discounted. But I think you're right. –  templatetypedef Feb 13 '12 at 20:42
    
with @robertking's point, i think this should be the answer. –  meteorgan Feb 14 '12 at 3:57

first maximize the height of the tree. (have a tree where each node only has one child node, so you have a long chain going downward).

Check the average depth. (obviously the average depth will be too high).

while the average depth is too high, you must decrease the height of the tree by one. There are many ways to decrease the height of the tree by one. Choose the way which minimizes the average height. (prove by induction that each time you should select the one that minimizes the average height). Keep going until you fall under the average height requirement. (e.g. calculate using induction a formula for the height and the average depth).

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Do you have a concrete answer? I like your reasoning a lot, and I'm curious what answer you arrived at. –  templatetypedef Feb 13 '12 at 16:28
    
I have no answer at all. To be honest i would use your technique if I were to try it out. –  robert king Feb 13 '12 at 21:30

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