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.