How to merge two splay tree with amortized cost of log(n)?

If there are duplicate items in the trees, should the duplicates be merged or not? For example, if the trees are [1,2,3,4] and [1,2,5] should the result be [1,1,2,2,3,4,5] or [1,2,3,4,5]? – Niki Yoshiuchi Oct 4 '10 at 18:21

@niki: it's not that important. assume that duplicate items are not allowed. – user415789 Oct 7 '10 at 9:35
I assume that the splay trees you want to merge hold n
objects each. (i.e. in total, we have 2n
objects). Then I think it is not possible to merge them with amortized log(n)
cost, unless you impose some further assumptions. If you do not have any information about the objects contained in the trees, you will have to look at least at each element of one of the two trees, thus having cost O(n)
.
However, if you can make certain assumptions about the objects, you might be able to do it in O(log(n))
. You might extract certain subtrees so you can insert the whole subtree into the other splay tree. However, I don't know an exact algorithm how to acchieve O(log(n))
. For example, if we know that the biggest object in Tree1
is smaller than the smallest object in Tree2
, then we might just splay the leftmost node of Tree2
and then we hang the root of Tree1
under the new root of Tree2
.

It helped me a lot. and by the way It's impossible to merge 2 splay tree without any condition in O(Log(n)) – user415789 Nov 14 '10 at 17:09