# Random Binary Search Tree

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
• He 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 re-balancing, 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:

1

1
\
2

1
\
2
\
3
``````

then 3 2 1

``````3

3
/
2

3
/
2
/
1
``````

Now do 2 3 1

``````2

2
\
3

2
/ \
1   3
``````
• Simple, straight to the point, and graphical. +1. – T.K. Mar 21 '11 at 21:54

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 non-business-hours, where an algorithm may read the whole tree into a linked list and then, from that list, builds a new tree with optimum uniformity