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Lets say we are dealing with the keys 1-15. To get the worst case performance of a regular BST, you would insert the keys in ascending or descending order as follows:

1, 2, 3, 4, 5, 6, 7, 8, 9, 10, 11, 12, 13, 14, 15

Then the BST would essentially become a linked list.

For best case of a BST you would insert the keys in the following order, they are arranged in such a way that the next key inserted is half of the total range to be inserted, so the first is 15/2 = 8, then 8/2 = 4 etc...

8, 4, 12, 2, 6, 10, 14, 1, 3, 5, 7, 9, 11, 13, 15

Then the BST would be a well balanced tree with optimal height 3.

The best case for a red black tree can also be constructed with the best case from a BST. But how do we construct the worst case for a red black tree? Is it the same as the worst case for a BST? Is there a specific pattern that will yield the worst case?

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Hey this is a great question, I think. And I am particularly interested in knowing the answer. Perhaps people at cstheory stackexchange can help here. So if you can post it there? – sukunrt Mar 2 '13 at 0:00
I came across this paper: citeseerx.ist.psu.edu/viewdoc/summary?doi= – sukunrt Mar 3 '13 at 10:21
Could you clarify half of the total range to be inserted? Just curious, and couldn't figure it out – keyser Jul 31 '13 at 17:36

You are looking for a skinny tree, right? This can be produced by inserting [1 ... , 2^(n+1)-2] in reverse order.

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You won't be able to. A Red-Black Tree keeps itself "bushy", so it would rotate to fix the imbalance. The length of your above worst case for a Red-Black Tree is limited to two elements, but that's still not a "bad" case; it's what's expected, as lg(2) = 1, and you have 1 layer past the root with two elements. As soon as you add the third element, you get this:

B                   B
 \                 / \
  R       =>      R   R
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just because the tree balances itself, does not mean there is no worst case. in the rb tree instance, the worst case probably involves a sequence of insertions that the self balancing rules operate poorly around – Jordan May 17 '13 at 11:49
That's true, there is a worst case, but it won't be a linear array as you've posted. Did I misunderstand your question? Edit: there's a worst case for a given collection of elements. – Jonathan Landrum May 17 '13 at 20:09
The numbers separated by commas are meant to represent order of insertion not an array. Does that clarify things? – Jordan May 20 '13 at 12:14
Yes, and that makes the problem quite interesting. Would be a good thesis topic. – Jonathan Landrum May 20 '13 at 13:43

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