# Confused on claim in CLRS randomly built binary search tree proof

Not sure if I should put this on math stackexchange instead, but oh well.

On page 300 of CLRS...

``````Theorem 12.4
The expected height of a randomly built binary search tree on n distinct keys is O(lgn).
``````

They define 3 random variables...

``````'Xn' is the height of a randomly built binary search on n keys.
'Yn' is the "exponential height", where Yn = 2^(Xn)
'Rn' is the position that the root key would occupy if the key's were sorted, its rank.
``````

And indicator random variables `Zn,1 Zn,2 Zn,3 ... Zn,n`...

``````'Zn,i = I{Rn = i}'
``````

So they go on to make the proof (see the text), but in the midst of it they make the following claim...

``````We claim that the indicator random variable Zn,i = I{Rn = i} is independent of the
values of Yi-1 and Yn-i. Having chosen Rn = i, the left subtree (whose exponential
height is Yi-1) is randomly built on the i-1 keys whose ranks are less than i. This
subtree is just like any other randomly built binary search tree on i-1 keys.
Other than the number of keys it contains, this subtree's structure is not affected
at all by the choice of Rn = i, and hence the random variables Yi-1 and Zn,i are
independent.
``````

Likewise for Yn-i. My issue is that part, Other than the number of keys it contains... Yes, the structures of the subtrees are unaffected by Rn, but the fact that Rn affects the number of keys in the subtrees seems to imply a dependence due to how it limits the height of the subtrees.

I'm obviously missing some key relationship. Any help is appreciated, thanks.

-
Am I the only old guy who had to go search for "CLRS algorithm" in order to figure out what book he's talking about? –  Jim Mischel Apr 18 '11 at 22:26
@Jim: Possibly. CLR book is very famous. @confused: I have flagged this Q to move to math.se. –  Aryabhatta Apr 18 '11 at 22:35