i have a BST where i insert keys from 1...n randomly (every permutation is done with 1/n! probability). my question is why the resulting trees are not uniform even if the permutation are uniform ?

What do yo mean 'uniform' trees? Trees that are balanced? – florin Mar 21 '11 at 21:38

2He means why the structure of the trees are different when the data is the same – corsiKa Mar 21 '11 at 21:39

@glowcoder thank you, that exactly what i mean – Mooh Mar 21 '11 at 21:41

look at my answer  consider the structure of the tree at each insert, and where the next element will go. You'll see without some sort of rebalancing, adding the elements in sorted order makes for a very poorly optimized tree!! – corsiKa Mar 21 '11 at 21:46
A lot depends on the implementation of the tree. Is it self balancing? Consider the simple trees of 1 2 3 and 3 2 1
Very simple tree:
add 1
1
add 2
1
\
2
add 3
1
\
2
\
3
then 3 2 1
add 3
3
add 2
3
/
2
add 1
3
/
2
/
1
Now do 2 3 1
2
2
\
3
2
/ \
1 3
a binary search tree is not just a uniform search tree... a tree is built in the order in which new values are saved in it. as glowcoder already showed, that doesnt guarantee uniformity...
having a uniform distribution of random numbers does not guarantee an order of values that is optimal to build a binary tree
to have a minimum effort search via a binary tree, the tree must be rebuild regularly. That usually happens in nonbusinesshours, where an algorithm may read the whole tree into a linked list and then, from that list, builds a new tree with optimum uniformity