Random Variables and Signals
Topic 16: Conditional Expectation for Two Random Variables
If X and Y are random variables on (S,F,P) and ∈ F with P(MP > 0, then,
One important case is when M = {Y = y} for some y ∈ R. Then we have that
Using our old trick, let
Using this approach, it can be shown that
Another important case: g(X,Y)=g(X)
Note that this is the same equation we had, for example
Iterated Expectation
Sometimes we want to work with f$ _{Y|X} $(y|x) and f$ _X,/math>(x) instead of f<math>_{XY} $(x,y). This can make computation of E[g(X,Y)] easier in some cases. We can write
Note that E[g(X,Y)|X=x] is a function of x ∈ R. We will call this function h.
We can create a random variable h(X). We will use the notation
So we have
which is a real-valued function of x ∈ R, and h(X), which is a random variable since it is a function of random variable X.
Now we can write
So,
We call this iterated expectation.
An important special case is when g(X,Y)=Y, in which case, we have
Example $ \qquad $ Suppose we have a stick of length l. We break the stick at a uniformly chosen point Y, then again at a uniformly chosen point X. Find E[X].
We do not know f$ _{XY} $ or f_$ _X $, but we know f$ _{X|Y} $ or f_$ _Y $
Use E[X}=E[E[X|Y]]. Now
since X is uniform on [0,y] given Y=y. So,
Then
References
- M. Comer. ECE 600. Class Lecture. Random Variables and Signals. Faculty of Electrical Engineering, Purdue University. Fall 2013.
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